\renewcommand{\thehlo}{Sep 23 2001} \renewcommand{\thehre}{Adams E$_2$ term for $S^0$} \dm{1} \begin{bdl} \item[1/1] \mb{1/1} \begin{gl} \item[1] {\rm Sq(2)[0]} \\ $h_{1}:$ [0] \end{gl} \end{bdl} \dm{2} \begin{bdl} \item[2/2] \mb{2/2} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \dm{3} \begin{bdl} \item[3/3] \mb{3/3} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \\ $h_{2}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/3] \mb{2/3} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{2}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/3] \mb{1/3} \begin{gl} \item[2] {\rm Sq(4)[0]} \\ $h_{2}:$ [0] \end{gl} \end{bdl} \dm{6} \begin{bdl} \item[2/6] \mb{2/6} \begin{gl} \item[3] {\rm Sq(4)[2]} \\ $h_{2}:$ [2] \end{gl} \end{bdl} \dm{7} \begin{bdl} \item[4/7] \mb{4/7} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{3}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[3/7] \mb{3/7} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{3}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/7] \mb{2/7} \begin{gl} \item[4] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{3}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/7] \mb{1/7} \begin{gl} \item[3] {\rm Sq(8)[0]} \\ $h_{3}:$ [0] \end{gl} \end{bdl} \dm{8} \begin{bdl} \item[3/8] \mb{3/8} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[2/8] \mb{2/8} \begin{gl} \item[5] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \dm{9} \begin{bdl} \item[5/9] \mb{5/9} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[4/9] \mb{4/9} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[3/9] \mb{3/9} \begin{gl} \item[4] {\rm Sq(2)[5]} \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \dm{10} \begin{bdl} \item[6/10] \mb{6/10} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \dm{11} \begin{bdl} \item[7/11] \mb{7/11} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[6/11] \mb{6/11} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[5/11] \mb{5/11} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \dm{14} \begin{bdl} \item[6/14] \mb{6/14} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[5/14] \mb{5/14} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[4/14] \mb{4/14} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[3/14] \mb{3/14} \begin{gl} \item[5] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[2/14] \mb{2/14} \begin{gl} \item[6] {\rm Sq(8)[3]} \\ $h_{3}:$ [3] \end{gl} \end{bdl} \dm{15} \begin{bdl} \item[8/15] \mb{8/15} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[7/15] \mb{7/15} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[6/15] \mb{6/15} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[5/15] \mb{5/15} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[4/15] \mb{4/15} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[3/15] \mb{3/15} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/15] \mb{2/15} \begin{gl} \item[7] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{4}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/15] \mb{1/15} \begin{gl} \item[4] {\rm Sq(16)[0]} \\ $h_{4}:$ [0] \end{gl} \end{bdl} \dm{16} \begin{bdl} \item[7/16] \mb{7/16} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[6/16] \mb{6/16} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[2/16] \mb{2/16} \begin{gl} \item[8] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{4}:$ [1] \end{gl} \end{bdl} \dm{17} \begin{bdl} \item[9/17] \mb{9/17} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[8/17] \mb{8/17} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[7/17] \mb{7/17} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[6/17] \mb{6/17} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[5/17] \mb{5/17} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[4/17] \mb{4/17} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[3/17] \mb{3/17} \begin{gl} \item[7] {\rm Sq(2)[8]} \\ $h_{1}:$ [8] \\ $h_{4}:$ [1] \end{gl} \end{bdl} \dm{18} \begin{bdl} \item[10/18] \mb{10/18} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[5/18] \mb{5/18} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[4/18] \mb{4/18} \begin{gl} \item[6] {\rm Sq(5)[5] + Sq(2,1)[5]} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \\ $h_{4}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[3/18] \mb{3/18} \begin{gl} \item[8] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[2/18] \mb{2/18} \begin{gl} \item[9] {\rm Sq(4)[4] + Sq(1,1)[4]} \\ $h_{2}:$ [4] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \dm{19} \begin{bdl} \item[11/19] \mb{11/19} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[10/19] \mb{10/19} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[9/19] \mb{9/19} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[3/19] \mb{3/19} \begin{gl} \item[9] {\rm Sq(6)[6] + Sq(3,1)[6] + Sq(0,2)[6]} \end{gl} \end{bdl} \dm{20} \begin{bdl} \item[6/20] \mb{6/20} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[5/20] \mb{5/20} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[4/20] \mb{4/20} \begin{gl} \item[8] {\rm Sq(7)[5] + Sq(4,1)[5] + Sq(1,2)[5] + Sq(0,0,1)[5]} \end{gl} \end{bdl} \dm{21} \begin{bdl} \item[5/21] \mb{5/21} \begin{gl} \item[9] {\rm Sq(2)[8]} \\ $h_{1}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[3/21] \mb{3/21} \begin{gl} \item[10] {\rm Sq(4)[9]} \\ $h_{2}:$ [9] \\ $h_{3}:$ [6] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \dm{22} \begin{bdl} \item[10/22] \mb{10/22} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[9/22] \mb{9/22} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[8/22] \mb{8/22} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[4/22] \mb{4/22} \begin{gl} \item[9] {\rm Sq(4)[9] + Sq(1,1)[9]} \\ $h_{2}:$ [9] \end{gl} \end{bdl} \dm{23} \begin{bdl} \item[12/23] \mb{12/23} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[11/23] \mb{11/23} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[10/23] \mb{10/23} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[9/23] \mb{9/23} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/23] \mb{8/23} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[7/23] \mb{7/23} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[6/23] \mb{6/23} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[5/23] \mb{5/23} \begin{gl} \item[10] {\rm Sq(4)[8]} \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[4/23] \mb{4/23} \begin{gl} \item[10] {\rm Sq(3)[10] + Sq(0,1)[10]} \\ $h_{4}:$ [3] \end{gl} \end{bdl} \dm{24} \begin{bdl} \item[11/24] \mb{11/24} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[10/24] \mb{10/24} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[5/24] \mb{5/24} \begin{gl} \item[11] {\rm Sq(2)[10]} \\ $h_{1}:$ [10] \\ $h_{3}:$ [5] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \dm{25} \begin{bdl} \item[13/25] \mb{13/25} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[12/25] \mb{12/25} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[11/25] \mb{11/25} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[10/25] \mb{10/25} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[9/25] \mb{9/25} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[8/25] \mb{8/25} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \dm{26} \begin{bdl} \item[14/26] \mb{14/26} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[9/26] \mb{9/26} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/26] \mb{8/26} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[7/26] \mb{7/26} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[6/26] \mb{6/26} \begin{gl} \item[9] {\rm Sq(3)[11]} \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \dm{27} \begin{bdl} \item[15/27] \mb{15/27} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[14/27] \mb{14/27} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[13/27] \mb{13/27} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \dm{28} \begin{bdl} \item[10/28] \mb{10/28} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[9/28] \mb{9/28} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[8/28] \mb{8/28} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \dm{29} \begin{bdl} \item[9/29] \mb{9/29} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[8/29] \mb{8/29} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[7/29] \mb{7/29} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \dm{30} \begin{bdl} \item[14/30] \mb{14/30} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[13/30] \mb{13/30} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[12/30] \mb{12/30} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[11/30] \mb{11/30} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[10/30] \mb{10/30} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[9/30] \mb{9/30} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/30] \mb{8/30} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[7/30] \mb{7/30} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[6/30] \mb{6/30} \begin{gl} \item[10] {\rm Sq(2,2)[10]} \end{gl} \end{bdl} \begin{bdl} \item[5/30] \mb{5/30} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[4/30] \mb{4/30} \begin{gl} \item[11] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[3/30] \mb{3/30} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{4}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[2/30] \mb{2/30} \begin{gl} \item[10] {\rm Sq(16)[4] + Sq(9,0,1)[4] + Sq(6,1,1)[4] + Sq(3,2,1)[4] + Sq(0,3,1)[4]} \\ $h_{4}:$ [4] \end{gl} \end{bdl} \dm{31} \begin{bdl} \item[16/31] \mb{16/31} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[15/31] \mb{15/31} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[14/31] \mb{14/31} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[13/31] \mb{13/31} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[12/31] \mb{12/31} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[11/31] \mb{11/31} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[10/31] \mb{10/31} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[9/31] \mb{9/31} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[8/31] \mb{8/31} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[7/31] \mb{7/31} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[6/31] \mb{6/31} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[5/31] \mb{5/31} \begin{gl} \item[13] {\rm Sq(2,0,1)[10]} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[4/31] \mb{4/31} \begin{gl} \item[12] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[3/31] \mb{3/31} \begin{gl} \item[12] {\rm Sq(2)[10]} \\ $h_{1}:$ [10] \\ $h_{4}:$ [8] \item[13] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/31] \mb{2/31} \begin{gl} \item[11] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{5}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/31] \mb{1/31} \begin{gl} \item[5] {\rm Sq(32)[0]} \\ $h_{5}:$ [0] \end{gl} \end{bdl} \dm{32} \begin{bdl} \item[15/32] \mb{15/32} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[14/32] \mb{14/32} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[9/32] \mb{9/32} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[8/32] \mb{8/32} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[7/32] \mb{7/32} \begin{gl} \item[10] {\rm Sq(3)[10]} \end{gl} \end{bdl} \begin{bdl} \item[6/32] \mb{6/32} \begin{gl} \item[12] {\rm Sq(3)[12] + Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[4/32] \mb{4/32} \begin{gl} \item[13] {\rm Sq(6,2)[10] + Sq(3,3)[10] + Sq(2,1,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[2/32] \mb{2/32} \begin{gl} \item[12] {\rm Sq(2)[5]} \\ $h_{1}:$ [5] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \dm{33} \begin{bdl} \item[17/33] \mb{17/33} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[16/33] \mb{16/33} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[15/33] \mb{15/33} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[14/33] \mb{14/33} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[13/33] \mb{13/33} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[12/33] \mb{12/33} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[7/33] \mb{7/33} \begin{gl} \item[11] {\rm Sq(2)[12]} \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[5/33] \mb{5/33} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[4/33] \mb{4/33} \begin{gl} \item[14] {\rm Sq(3)[12]} \end{gl} \end{bdl} \begin{bdl} \item[3/33] \mb{3/33} \begin{gl} \item[14] {\rm Sq(2)[12]} \\ $h_{1}:$ [12] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \dm{34} \begin{bdl} \item[18/34] \mb{18/34} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[13/34] \mb{13/34} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[12/34] \mb{12/34} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[11/34] \mb{11/34} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[10/34] \mb{10/34} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[9/34] \mb{9/34} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[8/34] \mb{8/34} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[6/34] \mb{6/34} \begin{gl} \item[13] {\rm Sq(4)[13]} \\ $h_{2}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[4/34] \mb{4/34} \begin{gl} \item[15] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{1}:$ [14] \\ $h_{2}:$ [13] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[3/34] \mb{3/34} \begin{gl} \item[15] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{5}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[2/34] \mb{2/34} \begin{gl} \item[13] {\rm Sq(4)[5]} \\ $h_{2}:$ [5] \\ $h_{5}:$ [2] \end{gl} \end{bdl} \dm{35} \begin{bdl} \item[19/35] \mb{19/35} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[18/35] \mb{18/35} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[17/35] \mb{17/35} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[9/35] \mb{9/35} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[8/35] \mb{8/35} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[7/35] \mb{7/35} \begin{gl} \item[12] {\rm Sq(0,2)[10]} \end{gl} \end{bdl} \begin{bdl} \item[5/35] \mb{5/35} \begin{gl} \item[16] {\rm Sq(3)[14] + Sq(0,1)[14]} \\ $h_{2}:$ [13] \\ $h_{4}:$ [8] \end{gl} \end{bdl} \dm{36} \begin{bdl} \item[14/36] \mb{14/36} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[13/36] \mb{13/36} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[12/36] \mb{12/36} \begin{gl} \item[7] {\rm Sq(3)[7]} \end{gl} \end{bdl} \begin{bdl} \item[6/36] \mb{6/36} \begin{gl} \item[14] {\rm Sq(0,2)[13]} \end{gl} \end{bdl} \dm{37} \begin{bdl} \item[13/37] \mb{13/37} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[12/37] \mb{12/37} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[11/37] \mb{11/37} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[10/37] \mb{10/37} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[9/37] \mb{9/37} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[8/37] \mb{8/37} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[7/37] \mb{7/37} \begin{gl} \item[13] {\rm Sq(2)[14]} \\ $h_{1}:$ [14] \\ $h_{2}:$ [13] \\ $h_{3}:$ [10] \item[14] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[6/37] \mb{6/37} \begin{gl} \item[15] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[5/37] \mb{5/37} \begin{gl} \item[17] {\rm Sq(2,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[3/37] \mb{3/37} \begin{gl} \item[16] {\rm Sq(4)[13] + Sq(1,1)[13]} \\ $h_{2}:$ [13] \\ $h_{5}:$ [3] \end{gl} \end{bdl} \dm{38} \begin{bdl} \item[18/38] \mb{18/38} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[17/38] \mb{17/38} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[16/38] \mb{16/38} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[9/38] \mb{9/38} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[8/38] \mb{8/38} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[7/38] \mb{7/38} \begin{gl} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[6/38] \mb{6/38} \begin{gl} \item[16] {\rm Sq(3,1)[15]} \item[17] {\rm Sq(2)[17]} \\ $h_{1}:$ [17] \\ $h_{2}:$ [16] \\ $h_{3}:$ [13] \\ $h_{4}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[5/38] \mb{5/38} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{3}:$ [12] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[4/38] \mb{4/38} \begin{gl} \item[16] {\rm Sq(5,1)[12] + Sq(2,2)[12]} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{3}:$ [13] \\ $h_{5}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[3/38] \mb{3/38} \begin{gl} \item[17] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{3}:$ [11] \\ $h_{5}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[2/38] \mb{2/38} \begin{gl} \item[14] {\rm Sq(8)[5] + Sq(2,2)[5]} \\ $h_{3}:$ [5] \\ $h_{5}:$ [3] \end{gl} \end{bdl} \dm{39} \begin{bdl} \item[20/39] \mb{20/39} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[19/39] \mb{19/39} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[18/39] \mb{18/39} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[17/39] \mb{17/39} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[16/39] \mb{16/39} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[15/39] \mb{15/39} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[14/39] \mb{14/39} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[13/39] \mb{13/39} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[12/39] \mb{12/39} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[9/39] \mb{9/39} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[7/39] \mb{7/39} \begin{gl} \item[16] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[5/39] \mb{5/39} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \\ $h_{3}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[4/39] \mb{4/39} \begin{gl} \item[18] {\rm Sq(3)[16] + Sq(0,1)[16]} \\ $h_{5}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[3/39] \mb{3/39} \begin{gl} \item[18] {\rm Sq(2)[14]} \\ $h_{1}:$ [14] \\ $h_{3}:$ [12] \\ $h_{5}:$ [5] \end{gl} \end{bdl} \dm{40} \begin{bdl} \item[19/40] \mb{19/40} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[18/40] \mb{18/40} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[13/40] \mb{13/40} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[12/40] \mb{12/40} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[11/40] \mb{11/40} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[10/40] \mb{10/40} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[8/40] \mb{8/40} \begin{gl} \item[18] {\rm Sq(0,2)[12]} \end{gl} \end{bdl} \begin{bdl} \item[6/40] \mb{6/40} \begin{gl} \item[18] {\rm Sq(3)[18] + Sq(0,1)[18]} \\ $h_{5}:$ [1] \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{1}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[5/40] \mb{5/40} \begin{gl} \item[20] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \\ $h_{5}:$ [2] \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[4/40] \mb{4/40} \begin{gl} \item[19] {\rm Sq(7)[15] + Sq(4,1)[15]} \item[20] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \\ $h_{2}:$ [16] \\ $h_{3}:$ [14] \\ $h_{5}:$ [4] \end{gl} \end{bdl} \dm{41} \begin{bdl} \item[21/41] \mb{21/41} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[20/41] \mb{20/41} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[19/41] \mb{19/41} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[18/41] \mb{18/41} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[17/41] \mb{17/41} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[16/41] \mb{16/41} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[11/41] \mb{11/41} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[10/41] \mb{10/41} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[7/41] \mb{7/41} \begin{gl} \item[17] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[5/41] \mb{5/41} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[4/41] \mb{4/41} \begin{gl} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[3/41] \mb{3/41} \begin{gl} \item[19] {\rm Sq(5,1)[13]} \end{gl} \end{bdl} \dm{42} \begin{bdl} \item[22/42] \mb{22/42} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[17/42] \mb{17/42} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[16/42] \mb{16/42} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[15/42] \mb{15/42} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[14/42] \mb{14/42} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[13/42] \mb{13/42} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[12/42] \mb{12/42} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[9/42] \mb{9/42} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[8/42] \mb{8/42} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \\ $h_{1}:$ [17] \\ $h_{5}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[7/42] \mb{7/42} \begin{gl} \item[18] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{5}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[6/42] \mb{6/42} \begin{gl} \item[20] {\rm Sq(3)[20]} \\ $h_{5}:$ [2] \end{gl} \end{bdl} \dm{43} \begin{bdl} \item[23/43] \mb{23/43} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[22/43] \mb{22/43} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[21/43] \mb{21/43} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[13/43] \mb{13/43} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[12/43] \mb{12/43} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[11/43] \mb{11/43} \begin{gl} \item[11] {\rm Sq(3)[14]} \end{gl} \end{bdl} \dm{44} \begin{bdl} \item[18/44] \mb{18/44} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[17/44] \mb{17/44} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[16/44] \mb{16/44} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[10/44] \mb{10/44} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[6/44] \mb{6/44} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[5/44] \mb{5/44} \begin{gl} \item[23] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[4/44] \mb{4/44} \begin{gl} \item[22] {\rm Sq(1,1)[19]} \end{gl} \end{bdl} \dm{45} \begin{bdl} \item[17/45] \mb{17/45} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[16/45] \mb{16/45} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[15/45] \mb{15/45} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[12/45] \mb{12/45} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[9/45] \mb{9/45} \begin{gl} \item[20] {\rm Sq(3,1)[18] + Sq(0,2)[18]} \end{gl} \end{bdl} \begin{bdl} \item[7/45] \mb{7/45} \begin{gl} \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [20] \\ $h_{3}:$ [16] \\ $h_{5}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[6/45] \mb{6/45} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{5}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[5/45] \mb{5/45} \begin{gl} \item[24] {\rm Sq(3,1)[20] + Sq(3,1)[19]} \\ $h_{5}:$ [3] \item[25] {\rm Sq(2)[22]} \\ $h_{1}:$ [22] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[4/45] \mb{4/45} \begin{gl} \item[23] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{3}:$ [17] \\ $h_{4}:$ [11] \\ $h_{5}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[3/45] \mb{3/45} \begin{gl} \item[20] {\rm Sq(8)[14] + Sq(5,1)[14]} \\ $h_{3}:$ [14] \\ $h_{4}:$ [10] \\ $h_{5}:$ [6] \end{gl} \end{bdl} \dm{46} \begin{bdl} \item[22/46] \mb{22/46} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[21/46] \mb{21/46} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[20/46] \mb{20/46} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[19/46] \mb{19/46} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[18/46] \mb{18/46} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[17/46] \mb{17/46} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[16/46] \mb{16/46} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[15/46] \mb{15/46} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[14/46] \mb{14/46} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[11/46] \mb{11/46} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[8/46] \mb{8/46} \begin{gl} \item[20] {\rm Sq(2,2)[16] + Sq(1,0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[7/46] \mb{7/46} \begin{gl} \item[20] {\rm Sq(3)[21] + Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[6/46] \mb{6/46} \begin{gl} \item[23] {\rm Sq(2)[24]} \\ $h_{1}:$ [24] \\ $h_{5}:$ [4] \end{gl} \end{bdl} \dm{47} \begin{bdl} \item[24/47] \mb{24/47} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[23/47] \mb{23/47} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[22/47] \mb{22/47} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[21/47] \mb{21/47} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[20/47] \mb{20/47} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[19/47] \mb{19/47} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[18/47] \mb{18/47} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[17/47] \mb{17/47} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[16/47] \mb{16/47} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[15/47] \mb{15/47} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[14/47] \mb{14/47} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[13/47] \mb{13/47} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[10/47] \mb{10/47} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[8/47] \mb{8/47} \begin{gl} \item[21] {\rm Sq(3)[19] + Sq(0,1)[19]} \\ $h_{5}:$ [3] \item[22] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[7/47] \mb{7/47} \begin{gl} \item[21] {\rm Sq(2)[23]} \\ $h_{1}:$ [23] \\ $h_{3}:$ [18] \\ $h_{4}:$ [12] \\ $h_{5}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[6/47] \mb{6/47} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[5/47] \mb{5/47} \begin{gl} \item[26] {\rm Sq(4)[22]} \\ $h_{2}:$ [22] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \dm{48} \begin{bdl} \item[23/48] \mb{23/48} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[22/48] \mb{22/48} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[17/48] \mb{17/48} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[16/48] \mb{16/48} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[15/48] \mb{15/48} \begin{gl} \item[10] {\rm Sq(3)[10]} \end{gl} \end{bdl} \begin{bdl} \item[14/48] \mb{14/48} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[12/48] \mb{12/48} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[9/48] \mb{9/48} \begin{gl} \item[21] {\rm Sq(2)[21]} \\ $h_{1}:$ [21] \\ $h_{5}:$ [2] \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[8/48] \mb{8/48} \begin{gl} \item[23] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[7/48] \mb{7/48} \begin{gl} \item[22] {\rm Sq(5)[21] + Sq(2,1)[21]} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \\ $h_{5}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[6/48] \mb{6/48} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [24] \\ $h_{5}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[5/48] \mb{5/48} \begin{gl} \item[27] {\rm Sq(1,1)[23]} \\ $h_{5}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[4/48] \mb{4/48} \begin{gl} \item[24] {\rm Sq(8)[19] + Sq(5,1)[19] + Sq(2,2)[19] + Sq(1,0,1)[19]} \\ $h_{3}:$ [19] \end{gl} \end{bdl} \dm{49} \begin{bdl} \item[25/49] \mb{25/49} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[24/49] \mb{24/49} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[23/49] \mb{23/49} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[22/49] \mb{22/49} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[21/49] \mb{21/49} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[20/49] \mb{20/49} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[15/49] \mb{15/49} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[14/49] \mb{14/49} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[11/49] \mb{11/49} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[6/49] \mb{6/49} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [27] \\ $h_{5}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[5/49] \mb{5/49} \begin{gl} \item[28] {\rm Sq(5)[23] + Sq(2,1)[23]} \\ $h_{5}:$ [6] \end{gl} \end{bdl} \dm{50} \begin{bdl} \item[26/50] \mb{26/50} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[21/50] \mb{21/50} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[20/50] \mb{20/50} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[19/50] \mb{19/50} \begin{gl} \item[7] {\rm Sq(1,1)[10] + Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[18/50] \mb{18/50} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[17/50] \mb{17/50} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[16/50] \mb{16/50} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[13/50] \mb{13/50} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[10/50] \mb{10/50} \begin{gl} \item[17] {\rm Sq(3,1)[20] + Sq(0,2)[20]} \end{gl} \end{bdl} \begin{bdl} \item[6/50] \mb{6/50} \begin{gl} \item[27] {\rm Sq(1,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[4/50] \mb{4/50} \begin{gl} \item[25] {\rm Sq(6)[20] + Sq(0,2)[20]} \\ $h_{5}:$ [9] \end{gl} \end{bdl} \dm{51} \begin{bdl} \item[27/51] \mb{27/51} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[26/51] \mb{26/51} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[25/51] \mb{25/51} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[17/51] \mb{17/51} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[16/51] \mb{16/51} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[15/51] \mb{15/51} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[12/51] \mb{12/51} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[9/51] \mb{9/51} \begin{gl} \item[23] {\rm Sq(2,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[8/51] \mb{8/51} \begin{gl} \item[24] {\rm Sq(4)[22]} \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[7/51] \mb{7/51} \begin{gl} \item[24] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \\ $h_{3}:$ [21] \\ $h_{5}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[6/51] \mb{6/51} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \\ $h_{3}:$ [23] \\ $h_{5}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[5/51] \mb{5/51} \begin{gl} \item[29] {\rm Sq(7)[23] + Sq(4,1)[23] + Sq(1,2)[23] + Sq(0,0,1)[23]} \\ $h_{3}:$ [22] \\ $h_{5}:$ [8] \end{gl} \end{bdl} \dm{52} \begin{bdl} \item[22/52] \mb{22/52} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[21/52] \mb{21/52} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[20/52] \mb{20/52} \begin{gl} \item[7] {\rm Sq(3)[7]} \end{gl} \end{bdl} \begin{bdl} \item[14/52] \mb{14/52} \begin{gl} \item[14] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[11/52] \mb{11/52} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[8/52] \mb{8/52} \begin{gl} \item[25] {\rm Sq(5)[23] + Sq(2,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[6/52] \mb{6/52} \begin{gl} \item[29] {\rm Sq(2)[29]} \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \\ $h_{3}:$ [25] \\ $h_{5}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[5/52] \mb{5/52} \begin{gl} \item[30] {\rm Sq(5)[24] + Sq(2,1)[24]} \end{gl} \end{bdl} \dm{53} \begin{bdl} \item[21/53] \mb{21/53} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[20/53] \mb{20/53} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[19/53] \mb{19/53} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[18/53] \mb{18/53} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[17/53] \mb{17/53} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[16/53] \mb{16/53} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[15/53] \mb{15/53} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[14/53] \mb{14/53} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[13/53] \mb{13/53} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \item[18] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[12/53] \mb{12/53} \begin{gl} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[11/53] \mb{11/53} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[10/53] \mb{10/53} \begin{gl} \item[18] {\rm Sq(3,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[9/53] \mb{9/53} \begin{gl} \item[24] {\rm Sq(3)[24] + Sq(0,1)[24]} \\ $h_{5}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[7/53] \mb{7/53} \begin{gl} \item[25] {\rm Sq(4)[27] + Sq(1,1)[27]} \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[5/53] \mb{5/53} \begin{gl} \item[31] {\rm Sq(4)[25] + Sq(1,1)[25]} \\ $h_{2}:$ [25] \\ $h_{4}:$ [16] \\ $h_{5}:$ [9] \end{gl} \end{bdl} \dm{54} \begin{bdl} \item[26/54] \mb{26/54} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[25/54] \mb{25/54} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[24/54] \mb{24/54} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[17/54] \mb{17/54} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[16/54] \mb{16/54} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \\ $h_{3}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[15/54] \mb{15/54} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[14/54] \mb{14/54} \begin{gl} \item[16] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[13/54] \mb{13/54} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[12/54] \mb{12/54} \begin{gl} \item[17] {\rm Sq(0,1)[14]} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[11/54] \mb{11/54} \begin{gl} \item[16] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[17] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[10/54] \mb{10/54} \begin{gl} \item[19] {\rm Sq(7)[21] + Sq(1,2)[21]} \item[20] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [24] \\ $h_{4}:$ [18] \\ $h_{5}:$ [5], [4] \end{gl} \end{bdl} \begin{bdl} \item[9/54] \mb{9/54} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{5}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/54] \mb{8/54} \begin{gl} \item[26] {\rm Sq(1,1)[24]} \\ $h_{5}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[6/54] \mb{6/54} \begin{gl} \item[30] {\rm Sq(3)[30] + Sq(0,1)[30]} \end{gl} \end{bdl} \dm{55} \begin{bdl} \item[28/55] \mb{28/55} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[27/55] \mb{27/55} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[26/55] \mb{26/55} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[25/55] \mb{25/55} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[24/55] \mb{24/55} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[23/55] \mb{23/55} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[22/55] \mb{22/55} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[21/55] \mb{21/55} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[20/55] \mb{20/55} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[17/55] \mb{17/55} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[14/55] \mb{14/55} \begin{gl} \item[17] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[12/55] \mb{12/55} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[11/55] \mb{11/55} \begin{gl} \item[18] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[7/55] \mb{7/55} \begin{gl} \item[26] {\rm Sq(2)[30]} \\ $h_{1}:$ [30] \end{gl} \end{bdl} \dm{56} \begin{bdl} \item[27/56] \mb{27/56} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[26/56] \mb{26/56} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[21/56] \mb{21/56} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[20/56] \mb{20/56} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[19/56] \mb{19/56} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[18/56] \mb{18/56} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[16/56] \mb{16/56} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[13/56] \mb{13/56} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[12/56] \mb{12/56} \begin{gl} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{2}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[11/56] \mb{11/56} \begin{gl} \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[10/56] \mb{10/56} \begin{gl} \item[21] {\rm Sq(1,1)[24]} \item[22] {\rm Sq(3)[25] + Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[9/56] \mb{9/56} \begin{gl} \item[26] {\rm Sq(3)[26]} \\ $h_{5}:$ [5] \end{gl} \end{bdl} \dm{57} \begin{bdl} \item[29/57] \mb{29/57} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[28/57] \mb{28/57} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[27/57] \mb{27/57} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[26/57] \mb{26/57} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[25/57] \mb{25/57} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[24/57] \mb{24/57} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[19/57] \mb{19/57} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[18/57] \mb{18/57} \begin{gl} \item[14] {\rm Sq(3)[18] + Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[15/57] \mb{15/57} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[12/57] \mb{12/57} \begin{gl} \item[21] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[11/57] \mb{11/57} \begin{gl} \item[20] {\rm Sq(2)[22]} \\ $h_{1}:$ [22] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[10/57] \mb{10/57} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \\ $h_{4}:$ [19] \\ $h_{5}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[9/57] \mb{9/57} \begin{gl} \item[27] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [26] \\ $h_{5}:$ [6] \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \\ $h_{5}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[8/57] \mb{8/57} \begin{gl} \item[27] {\rm Sq(3)[26]} \\ $h_{5}:$ [6] \item[28] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{5}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[7/57] \mb{7/57} \begin{gl} \item[27] {\rm Sq(1,1)[30]} \end{gl} \end{bdl} \dm{58} \begin{bdl} \item[30/58] \mb{30/58} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[25/58] \mb{25/58} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[24/58] \mb{24/58} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[23/58] \mb{23/58} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[22/58] \mb{22/58} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[21/58] \mb{21/58} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[20/58] \mb{20/58} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[17/58] \mb{17/58} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[14/58] \mb{14/58} \begin{gl} \item[18] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[8/58] \mb{8/58} \begin{gl} \item[29] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[7/58] \mb{7/58} \begin{gl} \item[28] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[6/58] \mb{6/58} \begin{gl} \item[31] {\rm Sq(7)[30]} \end{gl} \end{bdl} \dm{59} \begin{bdl} \item[31/59] \mb{31/59} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[30/59] \mb{30/59} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[29/59] \mb{29/59} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[21/59] \mb{21/59} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[20/59] \mb{20/59} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[19/59] \mb{19/59} \begin{gl} \item[11] {\rm Sq(3)[14]} \end{gl} \end{bdl} \begin{bdl} \item[16/59] \mb{16/59} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[13/59] \mb{13/59} \begin{gl} \item[22] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[12/59] \mb{12/59} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[11/59] \mb{11/59} \begin{gl} \item[21] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[10/59] \mb{10/59} \begin{gl} \item[24] {\rm Sq(1,1)[26]} \end{gl} \end{bdl} \dm{60} \begin{bdl} \item[26/60] \mb{26/60} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[25/60] \mb{25/60} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[24/60] \mb{24/60} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[18/60] \mb{18/60} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[15/60] \mb{15/60} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[14/60] \mb{14/60} \begin{gl} \item[19] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[13/60] \mb{13/60} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[12/60] \mb{12/60} \begin{gl} \item[23] {\rm Sq(3,1)[18] + Sq(0,2)[18]} \item[24] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[11/60] \mb{11/60} \begin{gl} \item[22] {\rm Sq(2)[24]} \\ $h_{1}:$ [24] \\ $h_{3}:$ [18] \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[10/60] \mb{10/60} \begin{gl} \item[25] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[9/60] \mb{9/60} \begin{gl} \item[29] {\rm Sq(1,1)[28] + Sq(1,1)[27]} \item[30] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \\ $h_{5}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[8/60] \mb{8/60} \begin{gl} \item[30] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \\ $h_{5}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[7/60] \mb{7/60} \begin{gl} \item[29] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \dm{61} \begin{bdl} \item[25/61] \mb{25/61} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[24/61] \mb{24/61} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[23/61] \mb{23/61} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[20/61] \mb{20/61} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[17/61] \mb{17/61} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[14/61] \mb{14/61} \begin{gl} \item[20] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[13/61] \mb{13/61} \begin{gl} \item[24] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[12/61] \mb{12/61} \begin{gl} \item[25] {\rm Sq(1)[25] + Sq(1)[24]} \\ $h_{0}:$ [25], [24] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[11/61] \mb{11/61} \begin{gl} \item[24] {\rm Sq(3)[24]} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[10/61] \mb{10/61} \begin{gl} \item[26] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[9/61] \mb{9/61} \begin{gl} \item[31] {\rm Sq(2,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[8/61] \mb{8/61} \begin{gl} \item[31] {\rm Sq(1)[31] + Sq(1)[30]} \\ $h_{0}:$ [31], [30] \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[7/61] \mb{7/61} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \item[31] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[6/61] \mb{6/61} \begin{gl} \item[32] {\rm Sq(8,1)[29] + Sq(1,1,1)[29]} \item[33] {\rm Sq(4,2)[30] + Sq(1,3)[30]} \end{gl} \end{bdl} \begin{bdl} \item[4/61] \mb{4/61} \begin{gl} \item[26] {\rm Sq(14,1)[20] + Sq(7,1,1)[20]} \end{gl} \end{bdl} \dm{62} \begin{bdl} \item[30/62] \mb{30/62} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[29/62] \mb{29/62} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[28/62] \mb{28/62} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[27/62] \mb{27/62} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[26/62] \mb{26/62} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[25/62] \mb{25/62} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[24/62] \mb{24/62} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[23/62] \mb{23/62} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[22/62] \mb{22/62} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[21/62] \mb{21/62} \begin{gl} \item[14] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[20/62] \mb{20/62} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[19/62] \mb{19/62} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \item[13] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{4}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[18/62] \mb{18/62} \begin{gl} \item[16] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[17/62] \mb{17/62} \begin{gl} \item[21] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[16/62] \mb{16/62} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{4}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[15/62] \mb{15/62} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[14/62] \mb{14/62} \begin{gl} \item[21] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[13/62] \mb{13/62} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[12/62] \mb{12/62} \begin{gl} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \item[27] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[11/62] \mb{11/62} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[10/62] \mb{10/62} \begin{gl} \item[27] {\rm Sq(3,1)[28] + Sq(3,1)[27]} \item[28] {\rm Sq(3)[29]} \item[29] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[9/62] \mb{9/62} \begin{gl} \item[32] {\rm Sq(1)[34] + Sq(1)[33]} \\ $h_{0}:$ [34], [33] \\ $h_{5}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[8/62] \mb{8/62} \begin{gl} \item[32] {\rm Sq(0,2)[27]} \item[33] {\rm Sq(3)[29] + Sq(0,1)[29]} \item[34] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{5}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[7/62] \mb{7/62} \begin{gl} \item[32] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{5}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[6/62] \mb{6/62} \begin{gl} \item[34] {\rm Sq(7,1)[31] + Sq(4,2)[31] + Sq(1,3)[31] + Sq(3,0,1)[31] + Sq(0,1,1)[31]} \\ $h_{5}:$ [13] \item[35] {\rm Sq(1)[34] + Sq(1)[32]} \\ $h_{0}:$ [34], [32] \\ $h_{5}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[5/62] \mb{5/62} \begin{gl} \item[32] {\rm Sq(15)[24] + Sq(12,1)[24] + Sq(9,2)[24] + Sq(8,0,1)[24] + Sq(5,1,1)[24] + Sq(2,2,1)[24] + Sq(1,0,2)[24] + Sq(0,0,0,1)[24]} \item[33] {\rm Sq(2)[26]} \\ $h_{1}:$ [26] \item[34] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{5}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[4/62] \mb{4/62} \begin{gl} \item[27] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{5}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[3/62] \mb{3/62} \begin{gl} \item[21] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{5}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[2/62] \mb{2/62} \begin{gl} \item[15] {\rm Sq(32)[5] + Sq(26,2)[5] + Sq(8,8)[5] + Sq(25,0,1)[5] + Sq(7,1,1,1)[5] + Sq(1,3,1,1)[5]} \\ $h_{5}:$ [5] \end{gl} \end{bdl} \dm{63} \begin{bdl} \item[32/63] \mb{32/63} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[31/63] \mb{31/63} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[30/63] \mb{30/63} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[29/63] \mb{29/63} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[28/63] \mb{28/63} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[27/63] \mb{27/63} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[26/63] \mb{26/63} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[25/63] \mb{25/63} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[24/63] \mb{24/63} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[23/63] \mb{23/63} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[22/63] \mb{22/63} \begin{gl} \item[11] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[21/63] \mb{21/63} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[20/63] \mb{20/63} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[19/63] \mb{19/63} \begin{gl} \item[14] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[18/63] \mb{18/63} \begin{gl} \item[17] {\rm Sq(0,1)[20]} \item[18] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[17/63] \mb{17/63} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[16/63] \mb{16/63} \begin{gl} \item[22] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[23] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[15/63] \mb{15/63} \begin{gl} \item[20] {\rm Sq(0,1)[20]} \item[21] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[14/63] \mb{14/63} \begin{gl} \item[22] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[13/63] \mb{13/63} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[12/63] \mb{12/63} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[11/63] \mb{11/63} \begin{gl} \item[28] {\rm Sq(2)[29]} \\ $h_{1}:$ [29] \\ $h_{3}:$ [22] \item[29] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [28] \\ $h_{2}:$ [25] \item[30] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[10/63] \mb{10/63} \begin{gl} \item[30] {\rm Sq(1,1)[30] + Sq(4)[29] + Sq(1,1)[29]} \\ $h_{2}:$ [29] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[9/63] \mb{9/63} \begin{gl} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \\ $h_{4}:$ [23] \\ $h_{5}:$ [12] \item[35] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[8/63] \mb{8/63} \begin{gl} \item[35] {\rm Sq(1)[34] + Sq(1)[33]} \\ $h_{0}:$ [34], [33] \\ $h_{2}:$ [29] \\ $h_{4}:$ [22] \\ $h_{5}:$ [10] \item[36] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[7/63] \mb{7/63} \begin{gl} \item[33] {\rm Sq(3)[32]} \item[34] {\rm Sq(3)[33]} \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[6/63] \mb{6/63} \begin{gl} \item[36] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[5/63] \mb{5/63} \begin{gl} \item[35] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[4/63] \mb{4/63} \begin{gl} \item[28] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[3/63] \mb{3/63} \begin{gl} \item[22] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \\ $h_{5}:$ [12] \item[23] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/63] \mb{2/63} \begin{gl} \item[16] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{6}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/63] \mb{1/63} \begin{gl} \item[6] {\rm Sq(64)[0]} \\ $h_{6}:$ [0] \end{gl} \end{bdl} \dm{64} \begin{bdl} \item[31/64] \mb{31/64} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[30/64] \mb{30/64} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[25/64] \mb{25/64} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[24/64] \mb{24/64} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[23/64] \mb{23/64} \begin{gl} \item[10] {\rm Sq(3)[10]} \end{gl} \end{bdl} \begin{bdl} \item[22/64] \mb{22/64} \begin{gl} \item[12] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[20/64] \mb{20/64} \begin{gl} \item[16] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[17/64] \mb{17/64} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[16/64] \mb{16/64} \begin{gl} \item[24] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[15/64] \mb{15/64} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[14/64] \mb{14/64} \begin{gl} \item[23] {\rm Sq(1,1)[24]} \item[24] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[10/64] \mb{10/64} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32]} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [33] \\ $h_{3}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[9/64] \mb{9/64} \begin{gl} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{3}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[8/64] \mb{8/64} \begin{gl} \item[37] {\rm Sq(1,1)[30]} \\ $h_{3}:$ [27] \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [31] \item[39] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{1}:$ [33] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[7/64] \mb{7/64} \begin{gl} \item[36] {\rm Sq(4)[33] + Sq(1,1)[32]} \\ $h_{2}:$ [33] \item[37] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[6/64] \mb{6/64} \begin{gl} \item[38] {\rm Sq(3)[33] + Sq(3)[32]} \end{gl} \end{bdl} \begin{bdl} \item[5/64] \mb{5/64} \begin{gl} \item[36] {\rm Sq(4)[26]} \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[4/64] \mb{4/64} \begin{gl} \item[29] {\rm Sq(2)[22]} \\ $h_{1}:$ [22] \\ $h_{5}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[2/64] \mb{2/64} \begin{gl} \item[17] {\rm Sq(2)[6]} \\ $h_{1}:$ [6] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \dm{65} \begin{bdl} \item[33/65] \mb{33/65} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[32/65] \mb{32/65} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[31/65] \mb{31/65} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[30/65] \mb{30/65} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[29/65] \mb{29/65} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[28/65] \mb{28/65} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[23/65] \mb{23/65} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[22/65] \mb{22/65} \begin{gl} \item[13] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[19/65] \mb{19/65} \begin{gl} \item[15] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[16/65] \mb{16/65} \begin{gl} \item[25] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[15/65] \mb{15/65} \begin{gl} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[14/65] \mb{14/65} \begin{gl} \item[25] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[13/65] \mb{13/65} \begin{gl} \item[28] {\rm Sq(1,1)[26]} \item[29] {\rm Sq(1,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[12/65] \mb{12/65} \begin{gl} \item[29] {\rm Sq(3)[28]} \\ $h_{5}:$ [7] \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[11/65] \mb{11/65} \begin{gl} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[10/65] \mb{10/65} \begin{gl} \item[34] {\rm Sq(3,1)[29] + Sq(0,2)[29]} \end{gl} \end{bdl} \begin{bdl} \item[9/65] \mb{9/65} \begin{gl} \item[37] {\rm Sq(3)[35] + Sq(0,1)[35]} \\ $h_{2}:$ [33], [32] \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [37] \\ $h_{2}:$ [32] \\ $h_{3}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[8/65] \mb{8/65} \begin{gl} \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[7/65] \mb{7/65} \begin{gl} \item[38] {\rm Sq(4)[34]} \\ $h_{2}:$ [34] \\ $h_{4}:$ [27] \\ $h_{5}:$ [13] \item[39] {\rm Sq(3)[36]} \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[6/65] \mb{6/65} \begin{gl} \item[39] {\rm Sq(1,1)[34] + Sq(4)[32]} \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[5/65] \mb{5/65} \begin{gl} \item[37] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [29] \\ $h_{2}:$ [27] \\ $h_{5}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[4/65] \mb{4/65} \begin{gl} \item[30] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \\ $h_{5}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[3/65] \mb{3/65} \begin{gl} \item[24] {\rm Sq(4)[15]} \\ $h_{2}:$ [15] \\ $h_{5}:$ [13] \item[25] {\rm Sq(2)[17]} \\ $h_{1}:$ [17] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \dm{66} \begin{bdl} \item[34/66] \mb{34/66} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[29/66] \mb{29/66} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[28/66] \mb{28/66} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[27/66] \mb{27/66} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[26/66] \mb{26/66} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[25/66] \mb{25/66} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[24/66] \mb{24/66} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[21/66] \mb{21/66} \begin{gl} \item[17] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[18/66] \mb{18/66} \begin{gl} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[15/66] \mb{15/66} \begin{gl} \item[24] {\rm Sq(0,1)[24] + Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[12/66] \mb{12/66} \begin{gl} \item[31] {\rm Sq(0,2)[24]} \item[32] {\rm Sq(1)[34] + Sq(1)[33]} \\ $h_{0}:$ [34], [33] \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[11/66] \mb{11/66} \begin{gl} \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [34] \\ $h_{2}:$ [30] \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[10/66] \mb{10/66} \begin{gl} \item[35] {\rm Sq(5)[32] + Sq(2,1)[32]} \item[36] {\rm Sq(1,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[8/66] \mb{8/66} \begin{gl} \item[41] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[7/66] \mb{7/66} \begin{gl} \item[40] {\rm Sq(3)[38] + Sq(0,1)[38]} \item[41] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[6/66] \mb{6/66} \begin{gl} \item[40] {\rm Sq(2,1)[33] + Sq(2,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[4/66] \mb{4/66} \begin{gl} \item[31] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [25] \\ $h_{2}:$ [23] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[3/66] \mb{3/66} \begin{gl} \item[26] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \\ $h_{2}:$ [16] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[2/66] \mb{2/66} \begin{gl} \item[18] {\rm Sq(4)[6]} \\ $h_{2}:$ [6] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \dm{67} \begin{bdl} \item[35/67] \mb{35/67} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[34/67] \mb{34/67} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[33/67] \mb{33/67} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[25/67] \mb{25/67} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[24/67] \mb{24/67} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[23/67] \mb{23/67} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[20/67] \mb{20/67} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[17/67] \mb{17/67} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[16/67] \mb{16/67} \begin{gl} \item[26] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[15/67] \mb{15/67} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[14/67] \mb{14/67} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[12/67] \mb{12/67} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[11/67] \mb{11/67} \begin{gl} \item[35] {\rm Sq(0,1)[34]} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{3}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[10/67] \mb{10/67} \begin{gl} \item[37] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[9/67] \mb{9/67} \begin{gl} \item[39] {\rm Sq(0,2)[32]} \item[40] {\rm Sq(1,1)[39] + Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[8/67] \mb{8/67} \begin{gl} \item[42] {\rm Sq(2)[40]} \\ $h_{1}:$ [40] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[7/67] \mb{7/67} \begin{gl} \item[42] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[6/67] \mb{6/67} \begin{gl} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [36] \\ $h_{4}:$ [30] \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[5/67] \mb{5/67} \begin{gl} \item[38] {\rm Sq(7)[26] + Sq(4,1)[26] + Sq(0,0,1)[26]} \item[39] {\rm Sq(3)[30] + Sq(0,1)[30]} \end{gl} \end{bdl} \dm{68} \begin{bdl} \item[30/68] \mb{30/68} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[29/68] \mb{29/68} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[28/68] \mb{28/68} \begin{gl} \item[7] {\rm Sq(3)[7]} \end{gl} \end{bdl} \begin{bdl} \item[22/68] \mb{22/68} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[19/68] \mb{19/68} \begin{gl} \item[16] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[16/68] \mb{16/68} \begin{gl} \item[27] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[15/68] \mb{15/68} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [27] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[14/68] \mb{14/68} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[13/68] \mb{13/68} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(1)[35] + Sq(1)[34]} \\ $h_{0}:$ [35], [34] \\ $h_{2}:$ [29] \\ $h_{3}:$ [25] \\ $h_{4}:$ [16] \\ $h_{5}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[12/68] \mb{12/68} \begin{gl} \item[34] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32] \\ $h_{4}:$ [15] \\ $h_{5}:$ [8] \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [32] \\ $h_{3}:$ [25], [24] \end{gl} \end{bdl} \begin{bdl} \item[11/68] \mb{11/68} \begin{gl} \item[37] {\rm Sq(3)[36] + Sq(3)[35] + Sq(0,1)[35]} \\ $h_{2}:$ [34] \\ $h_{4}:$ [18] \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[10/68] \mb{10/68} \begin{gl} \item[38] {\rm Sq(2)[39]} \\ $h_{1}:$ [39] \\ $h_{2}:$ [37] \\ $h_{3}:$ [31] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[9/68] \mb{9/68} \begin{gl} \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[8/68] \mb{8/68} \begin{gl} \item[43] {\rm Sq(0,1)[40]} \item[44] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[7/68] \mb{7/68} \begin{gl} \item[43] {\rm Sq(4)[39] + Sq(1,1)[39]} \\ $h_{2}:$ [39] \\ $h_{3}:$ [33] \item[44] {\rm Sq(0,1)[40]} \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[6/68] \mb{6/68} \begin{gl} \item[43] {\rm Sq(2)[39]} \\ $h_{1}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[5/68] \mb{5/68} \begin{gl} \item[40] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[4/68] \mb{4/68} \begin{gl} \item[32] {\rm Sq(3)[26] + Sq(0,1)[26]} \end{gl} \end{bdl} \dm{69} \begin{bdl} \item[29/69] \mb{29/69} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[28/69] \mb{28/69} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[27/69] \mb{27/69} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[26/69] \mb{26/69} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[25/69] \mb{25/69} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[24/69] \mb{24/69} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[23/69] \mb{23/69} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[22/69] \mb{22/69} \begin{gl} \item[15] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[21/69] \mb{21/69} \begin{gl} \item[18] {\rm Sq(0,1)[17]} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[20/69] \mb{20/69} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[19/69] \mb{19/69} \begin{gl} \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[18/69] \mb{18/69} \begin{gl} \item[20] {\rm Sq(3,1)[24]} \item[21] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[15/69] \mb{15/69} \begin{gl} \item[27] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[13/69] \mb{13/69} \begin{gl} \item[32] {\rm Sq(3)[33] + Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[11/69] \mb{11/69} \begin{gl} \item[39] {\rm Sq(4)[35] + Sq(1,1)[35]} \\ $h_{2}:$ [35] \\ $h_{3}:$ [27] \\ $h_{4}:$ [19] \item[40] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [36] \\ $h_{4}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[10/69] \mb{10/69} \begin{gl} \item[40] {\rm Sq(3)[40]} \end{gl} \end{bdl} \begin{bdl} \item[9/69] \mb{9/69} \begin{gl} \item[42] {\rm Sq(2)[43]} \\ $h_{1}:$ [43] \\ $h_{3}:$ [33] \item[43] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [41] \\ $h_{3}:$ [33], [32] \end{gl} \end{bdl} \begin{bdl} \item[8/69] \mb{8/69} \begin{gl} \item[45] {\rm Sq(4)[40] + Sq(1,1)[40]} \\ $h_{2}:$ [40] \item[46] {\rm Sq(3)[42] + Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[7/69] \mb{7/69} \begin{gl} \item[45] {\rm Sq(1)[45] + Sq(1)[44]} \\ $h_{0}:$ [45], [44] \\ $h_{1}:$ [43] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[6/69] \mb{6/69} \begin{gl} \item[44] {\rm Sq(3)[39] + Sq(3)[38] + Sq(0,1)[38]} \\ $h_{3}:$ [32] \item[45] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[5/69] \mb{5/69} \begin{gl} \item[41] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[4/69] \mb{4/69} \begin{gl} \item[33] {\rm Sq(2,1)[25] + Sq(2,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[3/69] \mb{3/69} \begin{gl} \item[27] {\rm Sq(4)[18]} \\ $h_{2}:$ [18] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \dm{70} \begin{bdl} \item[34/70] \mb{34/70} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[33/70] \mb{33/70} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[32/70] \mb{32/70} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[25/70] \mb{25/70} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[24/70] \mb{24/70} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[23/70] \mb{23/70} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[22/70] \mb{22/70} \begin{gl} \item[16] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[21/70] \mb{21/70} \begin{gl} \item[20] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[20/70] \mb{20/70} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[19/70] \mb{19/70} \begin{gl} \item[18] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[18/70] \mb{18/70} \begin{gl} \item[22] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[17/70] \mb{17/70} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[16/70] \mb{16/70} \begin{gl} \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[15/70] \mb{15/70} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[14/70] \mb{14/70} \begin{gl} \item[29] {\rm Sq(3,1)[28] + Sq(0,2)[28]} \item[30] {\rm Sq(0,1)[30]} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[12/70] \mb{12/70} \begin{gl} \item[36] {\rm Sq(3)[38] + Sq(0,1)[38]} \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[10/70] \mb{10/70} \begin{gl} \item[41] {\rm Sq(2)[42]} \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[9/70] \mb{9/70} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[8/70] \mb{8/70} \begin{gl} \item[47] {\rm Sq(3)[44]} \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[7/70] \mb{7/70} \begin{gl} \item[46] {\rm Sq(2)[44]} \\ $h_{1}:$ [44] \\ $h_{3}:$ [36] \item[47] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[6/70] \mb{6/70} \begin{gl} \item[46] {\rm Sq(4)[39] + Sq(1,1)[38]} \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[5/70] \mb{5/70} \begin{gl} \item[42] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \\ $h_{5}:$ [18] \item[43] {\rm Sq(1)[35] + Sq(1)[34]} \\ $h_{0}:$ [35], [34] \\ $h_{3}:$ [28] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[4/70] \mb{4/70} \begin{gl} \item[34] {\rm Sq(5)[26] + Sq(2,1)[26]} \item[35] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [23] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[3/70] \mb{3/70} \begin{gl} \item[28] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [16] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[2/70] \mb{2/70} \begin{gl} \item[19] {\rm Sq(8)[6] + Sq(2,2)[6]} \\ $h_{3}:$ [6] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \dm{71} \begin{bdl} \item[36/71] \mb{36/71} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[35/71] \mb{35/71} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[34/71] \mb{34/71} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[33/71] \mb{33/71} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[32/71] \mb{32/71} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[31/71] \mb{31/71} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[30/71] \mb{30/71} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[29/71] \mb{29/71} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[28/71] \mb{28/71} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[25/71] \mb{25/71} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[22/71] \mb{22/71} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[20/71] \mb{20/71} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[19/71] \mb{19/71} \begin{gl} \item[20] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[16/71] \mb{16/71} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[15/71] \mb{15/71} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{1}:$ [31] \\ $h_{3}:$ [23] \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [30] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[14/71] \mb{14/71} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[13/71] \mb{13/71} \begin{gl} \item[33] {\rm Sq(0,2)[31]} \item[34] {\rm Sq(1,1)[34]} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[12/71] \mb{12/71} \begin{gl} \item[37] {\rm Sq(3)[40] + Sq(0,1)[40] + Sq(3)[39] + Sq(0,1)[39]} \item[38] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \\ $h_{4}:$ [19] \\ $h_{5}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[11/71] \mb{11/71} \begin{gl} \item[41] {\rm Sq(0,1)[40]} \\ $h_{4}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[10/71] \mb{10/71} \begin{gl} \item[42] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [41] \\ $h_{3}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[9/71] \mb{9/71} \begin{gl} \item[45] {\rm Sq(3)[45] + Sq(0,1)[45]} \\ $h_{2}:$ [43] \\ $h_{3}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[7/71] \mb{7/71} \begin{gl} \item[48] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{3}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[6/71] \mb{6/71} \begin{gl} \item[47] {\rm Sq(1,1)[40]} \item[48] {\rm Sq(2)[42]} \\ $h_{1}:$ [42] \\ $h_{5}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[5/71] \mb{5/71} \begin{gl} \item[44] {\rm Sq(2)[34]} \\ $h_{1}:$ [34] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[4/71] \mb{4/71} \begin{gl} \item[36] {\rm Sq(3)[27] + Sq(0,1)[27]} \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[3/71] \mb{3/71} \begin{gl} \item[29] {\rm Sq(2)[19]} \\ $h_{1}:$ [19] \\ $h_{3}:$ [17] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \dm{72} \begin{bdl} \item[35/72] \mb{35/72} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[34/72] \mb{34/72} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[29/72] \mb{29/72} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[28/72] \mb{28/72} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[27/72] \mb{27/72} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[26/72] \mb{26/72} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[24/72] \mb{24/72} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[21/72] \mb{21/72} \begin{gl} \item[21] {\rm Sq(0,1)[19]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[20/72] \mb{20/72} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[19/72] \mb{19/72} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[18/72] \mb{18/72} \begin{gl} \item[23] {\rm Sq(0,1)[26]} \item[24] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[15/72] \mb{15/72} \begin{gl} \item[31] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[13/72] \mb{13/72} \begin{gl} \item[36] {\rm Sq(2)[37]} \\ $h_{1}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[12/72] \mb{12/72} \begin{gl} \item[39] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{1}:$ [41] \\ $h_{2}:$ [40] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[11/72] \mb{11/72} \begin{gl} \item[42] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[10/72] \mb{10/72} \begin{gl} \item[43] {\rm Sq(3)[44]} \end{gl} \end{bdl} \begin{bdl} \item[9/72] \mb{9/72} \begin{gl} \item[46] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [45] \\ $h_{3}:$ [40] \\ $h_{4}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[8/72] \mb{8/72} \begin{gl} \item[48] {\rm Sq(3)[46]} \\ $h_{3}:$ [39] \\ $h_{4}:$ [27] \item[49] {\rm Sq(3)[47] + Sq(0,1)[47]} \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[6/72] \mb{6/72} \begin{gl} \item[49] {\rm Sq(3)[43] + Sq(0,1)[43]} \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[5/72] \mb{5/72} \begin{gl} \item[45] {\rm Sq(2)[36]} \\ $h_{1}:$ [36] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[4/72] \mb{4/72} \begin{gl} \item[37] {\rm Sq(2)[29]} \\ $h_{1}:$ [29] \\ $h_{2}:$ [27] \\ $h_{3}:$ [25] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \dm{73} \begin{bdl} \item[37/73] \mb{37/73} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[36/73] \mb{36/73} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[35/73] \mb{35/73} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[34/73] \mb{34/73} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[33/73] \mb{33/73} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[32/73] \mb{32/73} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[27/73] \mb{27/73} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[26/73] \mb{26/73} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[23/73] \mb{23/73} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[20/73] \mb{20/73} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[19/73] \mb{19/73} \begin{gl} \item[22] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[18/73] \mb{18/73} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[17/73] \mb{17/73} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[16/73] \mb{16/73} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[15/73] \mb{15/73} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[14/73] \mb{14/73} \begin{gl} \item[34] {\rm Sq(0,1)[35] + Sq(3)[34] + Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[9/73] \mb{9/73} \begin{gl} \item[47] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [49] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[8/73] \mb{8/73} \begin{gl} \item[50] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[7/73] \mb{7/73} \begin{gl} \item[49] {\rm Sq(3)[47]} \\ $h_{4}:$ [31] \item[50] {\rm Sq(3)[48] + Sq(0,1)[47]} \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{5}:$ [20] \item[51] {\rm Sq(2)[49]} \\ $h_{1}:$ [49] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \dm{74} \begin{bdl} \item[38/74] \mb{38/74} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[33/74] \mb{33/74} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[32/74] \mb{32/74} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[31/74] \mb{31/74} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[30/74] \mb{30/74} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[29/74] \mb{29/74} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[28/74] \mb{28/74} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[25/74] \mb{25/74} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[22/74] \mb{22/74} \begin{gl} \item[18] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[19/74] \mb{19/74} \begin{gl} \item[23] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[16/74] \mb{16/74} \begin{gl} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[15/74] \mb{15/74} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[14/74] \mb{14/74} \begin{gl} \item[35] {\rm Sq(3)[36]} \\ $h_{2}:$ [35], [34] \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[13/74] \mb{13/74} \begin{gl} \item[37] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[12/74] \mb{12/74} \begin{gl} \item[40] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [41] \\ $h_{3}:$ [36] \\ $h_{4}:$ [21] \\ $h_{5}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[11/74] \mb{11/74} \begin{gl} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [37] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[10/74] \mb{10/74} \begin{gl} \item[44] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{3}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[9/74] \mb{9/74} \begin{gl} \item[48] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[8/74] \mb{8/74} \begin{gl} \item[51] {\rm Sq(1,1)[48]} \item[52] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{1}:$ [51] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[7/74] \mb{7/74} \begin{gl} \item[52] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[6/74] \mb{6/74} \begin{gl} \item[50] {\rm Sq(2,1)[42]} \\ $h_{3}:$ [39], [38] \item[51] {\rm Sq(3)[45]} \\ $h_{6}:$ [2] \end{gl} \end{bdl} \dm{75} \begin{bdl} \item[39/75] \mb{39/75} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[38/75] \mb{38/75} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[37/75] \mb{37/75} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[29/75] \mb{29/75} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[28/75] \mb{28/75} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[27/75] \mb{27/75} \begin{gl} \item[11] {\rm Sq(3)[14]} \end{gl} \end{bdl} \begin{bdl} \item[24/75] \mb{24/75} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[21/75] \mb{21/75} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[20/75] \mb{20/75} \begin{gl} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[19/75] \mb{19/75} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[18/75] \mb{18/75} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[15/75] \mb{15/75} \begin{gl} \item[34] {\rm Sq(3,1)[31] + Sq(3,1)[30] + Sq(3,1)[29] + Sq(0,2)[29]} \end{gl} \end{bdl} \begin{bdl} \item[11/75] \mb{11/75} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [43] \\ $h_{3}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[10/75] \mb{10/75} \begin{gl} \item[45] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{3}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[9/75] \mb{9/75} \begin{gl} \item[49] {\rm Sq(1,1)[49]} \\ $h_{3}:$ [43] \item[50] {\rm Sq(1)[54] + Sq(1)[53]} \\ $h_{0}:$ [54], [53] \\ $h_{1}:$ [51] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[8/75] \mb{8/75} \begin{gl} \item[53] {\rm Sq(3)[50] + Sq(0,1)[50] + Sq(0,1)[49]} \\ $h_{4}:$ [29] \item[54] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{3}:$ [44] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[7/75] \mb{7/75} \begin{gl} \item[53] {\rm Sq(1,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[6/75] \mb{6/75} \begin{gl} \item[52] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [40] \\ $h_{5}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[5/75] \mb{5/75} \begin{gl} \item[46] {\rm Sq(2,1)[36]} \\ $h_{3}:$ [32] \\ $h_{5}:$ [22] \end{gl} \end{bdl} \dm{76} \begin{bdl} \item[34/76] \mb{34/76} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[33/76] \mb{33/76} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[32/76] \mb{32/76} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[26/76] \mb{26/76} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[23/76] \mb{23/76} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[22/76] \mb{22/76} \begin{gl} \item[19] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[21/76] \mb{21/76} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[20/76] \mb{20/76} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[19/76] \mb{19/76} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[18/76] \mb{18/76} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[17/76] \mb{17/76} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \item[32] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[16/76] \mb{16/76} \begin{gl} \item[32] {\rm Sq(3,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[15/76] \mb{15/76} \begin{gl} \item[35] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[14/76] \mb{14/76} \begin{gl} \item[37] {\rm Sq(3,1)[34] + Sq(0,2)[33]} \item[38] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[10/76] \mb{10/76} \begin{gl} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{1}:$ [49] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[9/76] \mb{9/76} \begin{gl} \item[51] {\rm Sq(5,1)[46] + Sq(2,2)[46] + Sq(5,1)[45] + Sq(2,2)[45]} \item[52] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{1}:$ [53] \\ $h_{2}:$ [50] \\ $h_{3}:$ [46] \\ $h_{4}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[8/76] \mb{8/76} \begin{gl} \item[55] {\rm Sq(2)[53]} \\ $h_{1}:$ [53] \item[56] {\rm Sq(1)[55] + Sq(1)[54]} \\ $h_{0}:$ [55], [54] \\ $h_{2}:$ [49] \\ $h_{4}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[7/76] \mb{7/76} \begin{gl} \item[54] {\rm Sq(3)[51] + Sq(0,1)[51] + Sq(3)[50] + Sq(0,1)[50]} \\ $h_{3}:$ [44] \\ $h_{4}:$ [33] \item[55] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{3}:$ [44] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[6/76] \mb{6/76} \begin{gl} \item[53] {\rm Sq(2,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[5/76] \mb{5/76} \begin{gl} \item[47] {\rm Sq(6)[36] + Sq(0,2)[36]} \\ $h_{4}:$ [26] \end{gl} \end{bdl} \dm{77} \begin{bdl} \item[33/77] \mb{33/77} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[32/77] \mb{32/77} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[31/77] \mb{31/77} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[28/77] \mb{28/77} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[25/77] \mb{25/77} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[22/77] \mb{22/77} \begin{gl} \item[20] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[21/77] \mb{21/77} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[20/77] \mb{20/77} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[19/77] \mb{19/77} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[18/77] \mb{18/77} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[17/77] \mb{17/77} \begin{gl} \item[33] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[34] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[16/77] \mb{16/77} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[15/77] \mb{15/77} \begin{gl} \item[36] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38], [37] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[14/77] \mb{14/77} \begin{gl} \item[39] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [37] \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[13/77] \mb{13/77} \begin{gl} \item[38] {\rm Sq(1,1)[40]} \item[39] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[12/77] \mb{12/77} \begin{gl} \item[41] {\rm Sq(3)[44] + Sq(0,1)[44]} \item[42] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[11/77] \mb{11/77} \begin{gl} \item[45] {\rm Sq(1,1)[44]} \item[46] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[10/77] \mb{10/77} \begin{gl} \item[47] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[9/77] \mb{9/77} \begin{gl} \item[53] {\rm Sq(1)[58] + Sq(1)[57]} \\ $h_{0}:$ [58], [57] \item[54] {\rm Sq(1)[59] + Sq(1)[57]} \\ $h_{0}:$ [59], [57] \\ $h_{1}:$ [55] \\ $h_{2}:$ [51] \\ $h_{3}:$ [47] \\ $h_{4}:$ [32] \\ $h_{5}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[8/77] \mb{8/77} \begin{gl} \item[57] {\rm Sq(1,1)[52]} \item[58] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[7/77] \mb{7/77} \begin{gl} \item[56] {\rm Sq(3,1)[49]} \item[57] {\rm Sq(1,1)[51]} \item[58] {\rm Sq(2)[53]} \\ $h_{1}:$ [53] \item[59] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{2}:$ [51] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[6/77] \mb{6/77} \begin{gl} \item[54] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \\ $h_{4}:$ [33], [32] \item[55] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[5/77] \mb{5/77} \begin{gl} \item[48] {\rm Sq(3,1)[37]} \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[4/77] \mb{4/77} \begin{gl} \item[38] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [28] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[3/77] \mb{3/77} \begin{gl} \item[30] {\rm Sq(8)[19] + Sq(5,1)[19]} \\ $h_{3}:$ [19] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \dm{78} \begin{bdl} \item[38/78] \mb{38/78} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[37/78] \mb{37/78} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[36/78] \mb{36/78} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[35/78] \mb{35/78} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[34/78] \mb{34/78} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[33/78] \mb{33/78} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[32/78] \mb{32/78} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[31/78] \mb{31/78} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[30/78] \mb{30/78} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[27/78] \mb{27/78} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[24/78] \mb{24/78} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[23/78] \mb{23/78} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[21/78] \mb{21/78} \begin{gl} \item[26] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[20/78] \mb{20/78} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[19/78] \mb{19/78} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[18/78] \mb{18/78} \begin{gl} \item[31] {\rm Sq(0,1)[31] + Sq(0,1)[30]} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32] + Sq(0,1)[30]} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[13/78] \mb{13/78} \begin{gl} \item[40] {\rm Sq(2)[41]} \\ $h_{1}:$ [41] \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[12/78] \mb{12/78} \begin{gl} \item[43] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[11/78] \mb{11/78} \begin{gl} \item[47] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[10/78] \mb{10/78} \begin{gl} \item[48] {\rm Sq(3,1)[47]} \item[49] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[9/78] \mb{9/78} \begin{gl} \item[55] {\rm Sq(1,1)[53]} \item[56] {\rm Sq(1)[62] + Sq(1)[61]} \\ $h_{0}:$ [62], [61] \\ $h_{4}:$ [36] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[8/78] \mb{8/78} \begin{gl} \item[60] {\rm Sq(2)[58] + Sq(2)[57]} \\ $h_{1}:$ [58], [57] \\ $h_{4}:$ [34], [33] \item[61] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{1}:$ [57] \\ $h_{3}:$ [48] \\ $h_{4}:$ [34], [33] \item[62] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{1}:$ [57] \\ $h_{3}:$ [48] \\ $h_{4}:$ [35], [34], [33] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[7/78] \mb{7/78} \begin{gl} \item[60] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{3}:$ [47] \item[61] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{3}:$ [47] \\ $h_{4}:$ [37] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[6/78] \mb{6/78} \begin{gl} \item[56] {\rm Sq(7)[45] + Sq(1,2)[45]} \item[57] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \\ $h_{6}:$ [4] \item[58] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [35] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[5/78] \mb{5/78} \begin{gl} \item[49] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{4}:$ [28] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[4/78] \mb{4/78} \begin{gl} \item[39] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{4}:$ [23] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[3/78] \mb{3/78} \begin{gl} \item[31] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{4}:$ [16] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[2/78] \mb{2/78} \begin{gl} \item[20] {\rm Sq(16)[6]} \\ $h_{4}:$ [6] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \dm{79} \begin{bdl} \item[40/79] \mb{40/79} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[39/79] \mb{39/79} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[38/79] \mb{38/79} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[37/79] \mb{37/79} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[36/79] \mb{36/79} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[35/79] \mb{35/79} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[34/79] \mb{34/79} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[33/79] \mb{33/79} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[32/79] \mb{32/79} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[31/79] \mb{31/79} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[30/79] \mb{30/79} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[29/79] \mb{29/79} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[26/79] \mb{26/79} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[24/79] \mb{24/79} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[23/79] \mb{23/79} \begin{gl} \item[19] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[20/79] \mb{20/79} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[19/79] \mb{19/79} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [32] \\ $h_{2}:$ [28] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [33] \\ $h_{2}:$ [29] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[18/79] \mb{18/79} \begin{gl} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[17/79] \mb{17/79} \begin{gl} \item[35] {\rm Sq(3)[33]} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[16/79] \mb{16/79} \begin{gl} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[15/79] \mb{15/79} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [38], [37] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[14/79] \mb{14/79} \begin{gl} \item[41] {\rm Sq(0,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[13/79] \mb{13/79} \begin{gl} \item[42] {\rm Sq(4,2)[36] + Sq(1,3)[36] + Sq(3,0,1)[36] + Sq(0,1,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[11/79] \mb{11/79} \begin{gl} \item[48] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[10/79] \mb{10/79} \begin{gl} \item[50] {\rm Sq(2)[55]} \\ $h_{1}:$ [55] \\ $h_{2}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[9/79] \mb{9/79} \begin{gl} \item[57] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [60] \\ $h_{2}:$ [56] \\ $h_{3}:$ [49], [48] \\ $h_{4}:$ [39], [38] \end{gl} \end{bdl} \begin{bdl} \item[8/79] \mb{8/79} \begin{gl} \item[63] {\rm Sq(3)[59] + Sq(0,1)[59] + Sq(3)[56] + Sq(0,1)[56]} \\ $h_{6}:$ [3] \item[64] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{2}:$ [55], [54] \\ $h_{4}:$ [37], [36] \end{gl} \end{bdl} \begin{bdl} \item[7/79] \mb{7/79} \begin{gl} \item[62] {\rm Sq(3)[54]} \\ $h_{2}:$ [53] \\ $h_{4}:$ [38] \item[63] {\rm Sq(2)[57]} \\ $h_{1}:$ [57] \\ $h_{3}:$ [49] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[6/79] \mb{6/79} \begin{gl} \item[59] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{2}:$ [47] \\ $h_{4}:$ [36] \\ $h_{5}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[5/79] \mb{5/79} \begin{gl} \item[50] {\rm Sq(2,0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[3/79] \mb{3/79} \begin{gl} \item[32] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \\ $h_{4}:$ [17] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \dm{80} \begin{bdl} \item[39/80] \mb{39/80} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[38/80] \mb{38/80} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[33/80] \mb{33/80} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[32/80] \mb{32/80} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[31/80] \mb{31/80} \begin{gl} \item[10] {\rm Sq(3)[10]} \end{gl} \end{bdl} \begin{bdl} \item[30/80] \mb{30/80} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[28/80] \mb{28/80} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[25/80] \mb{25/80} \begin{gl} \item[21] {\rm Sq(0,1)[20]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[24/80] \mb{24/80} \begin{gl} \item[22] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[23/80] \mb{23/80} \begin{gl} \item[20] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[22/80] \mb{22/80} \begin{gl} \item[21] {\rm Sq(1,1)[25]} \item[22] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[19/80] \mb{19/80} \begin{gl} \item[32] {\rm Sq(0,1)[32] + Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[17/80] \mb{17/80} \begin{gl} \item[38] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{1}:$ [35] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[16/80] \mb{16/80} \begin{gl} \item[36] {\rm Sq(3,1)[34] + Sq(0,2)[34]} \item[37] {\rm Sq(1,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[15/80] \mb{15/80} \begin{gl} \item[38] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[14/80] \mb{14/80} \begin{gl} \item[42] {\rm Sq(3)[41] + Sq(0,1)[41]} \item[43] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [38] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[13/80] \mb{13/80} \begin{gl} \item[43] {\rm Sq(3)[43] + Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[12/80] \mb{12/80} \begin{gl} \item[44] {\rm Sq(3,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[10/80] \mb{10/80} \begin{gl} \item[51] {\rm Sq(3)[56] + Sq(0,1)[56] + Sq(3)[55] + Sq(0,1)[55]} \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[9/80] \mb{9/80} \begin{gl} \item[58] {\rm Sq(4)[57]} \\ $h_{2}:$ [57] \item[59] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[8/80] \mb{8/80} \begin{gl} \item[65] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [63] \\ $h_{2}:$ [59], [56] \\ $h_{3}:$ [51] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[7/80] \mb{7/80} \begin{gl} \item[64] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{2}:$ [55] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[6/80] \mb{6/80} \begin{gl} \item[60] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [48] \\ $h_{6}:$ [6] \item[61] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{1}:$ [50] \\ $h_{2}:$ [48] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[5/80] \mb{5/80} \begin{gl} \item[51] {\rm Sq(1,1)[38]} \\ $h_{6}:$ [5] \item[52] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[4/80] \mb{4/80} \begin{gl} \item[40] {\rm Sq(6,2)[27]} \item[41] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \\ $h_{4}:$ [25] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \dm{81} \begin{bdl} \item[41/81] \mb{41/81} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[40/81] \mb{40/81} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[39/81] \mb{39/81} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[38/81] \mb{38/81} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[37/81] \mb{37/81} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[36/81] \mb{36/81} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[31/81] \mb{31/81} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[30/81] \mb{30/81} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[27/81] \mb{27/81} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[24/81] \mb{24/81} \begin{gl} \item[23] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[23/81] \mb{23/81} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[22/81] \mb{22/81} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[21/81] \mb{21/81} \begin{gl} \item[27] {\rm Sq(1,1)[28]} \item[28] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[20/81] \mb{20/81} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[19/81] \mb{19/81} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[18/81] \mb{18/81} \begin{gl} \item[36] {\rm Sq(0,1)[35]} \item[37] {\rm Sq(0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[15/81] \mb{15/81} \begin{gl} \item[39] {\rm Sq(3,1)[38] + Sq(3,1)[37] + Sq(0,2)[37]} \item[40] {\rm Sq(2)[42]} \\ $h_{1}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[13/81] \mb{13/81} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[12/81] \mb{12/81} \begin{gl} \item[45] {\rm Sq(3)[48]} \end{gl} \end{bdl} \begin{bdl} \item[11/81] \mb{11/81} \begin{gl} \item[49] {\rm Sq(2)[51]} \\ $h_{1}:$ [51] \\ $h_{6}:$ [1] \item[50] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{2}:$ [49] \\ $h_{4}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[10/81] \mb{10/81} \begin{gl} \item[52] {\rm Sq(0,2)[51]} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{2}:$ [55] \\ $h_{3}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[9/81] \mb{9/81} \begin{gl} \item[60] {\rm Sq(3)[64] + Sq(0,1)[64]} \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[8/81] \mb{8/81} \begin{gl} \item[66] {\rm Sq(2,1)[58] + Sq(5)[57] + Sq(5)[56]} \\ $h_{4}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[7/81] \mb{7/81} \begin{gl} \item[65] {\rm Sq(4)[56]} \\ $h_{2}:$ [56] \\ $h_{3}:$ [50] \\ $h_{4}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[6/81] \mb{6/81} \begin{gl} \item[62] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{1}:$ [51] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[5/81] \mb{5/81} \begin{gl} \item[53] {\rm Sq(5)[38] + Sq(2,1)[38]} \\ $h_{6}:$ [6] \item[54] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \\ $h_{4}:$ [31] \\ $h_{6}:$ [7], [6] \end{gl} \end{bdl} \begin{bdl} \item[4/81] \mb{4/81} \begin{gl} \item[42] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [31] \\ $h_{4}:$ [26] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[3/81] \mb{3/81} \begin{gl} \item[33] {\rm Sq(4)[20]} \\ $h_{2}:$ [20] \\ $h_{4}:$ [18] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \dm{82} \begin{bdl} \item[42/82] \mb{42/82} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[37/82] \mb{37/82} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[36/82] \mb{36/82} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[35/82] \mb{35/82} \begin{gl} \item[7] {\rm Sq(1,1)[10] + Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[34/82] \mb{34/82} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[33/82] \mb{33/82} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[32/82] \mb{32/82} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[29/82] \mb{29/82} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[26/82] \mb{26/82} \begin{gl} \item[17] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[23/82] \mb{23/82} \begin{gl} \item[22] {\rm Sq(0,1)[22] + Sq(3)[21]} \end{gl} \end{bdl} \begin{bdl} \item[20/82] \mb{20/82} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[19/82] \mb{19/82} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[18/82] \mb{18/82} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [35] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37], [35] \end{gl} \end{bdl} \begin{bdl} \item[17/82] \mb{17/82} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[16/82] \mb{16/82} \begin{gl} \item[38] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[14/82] \mb{14/82} \begin{gl} \item[44] {\rm Sq(4)[42]} \\ $h_{2}:$ [42] \item[45] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[12/82] \mb{12/82} \begin{gl} \item[46] {\rm Sq(0,2)[45]} \item[47] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{1}:$ [49] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[11/82] \mb{11/82} \begin{gl} \item[51] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[10/82] \mb{10/82} \begin{gl} \item[54] {\rm Sq(3)[59]} \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[9/82] \mb{9/82} \begin{gl} \item[61] {\rm Sq(3,1)[59] + Sq(6)[57] + Sq(0,2)[57]} \end{gl} \end{bdl} \begin{bdl} \item[8/82] \mb{8/82} \begin{gl} \item[67] {\rm Sq(1,1)[62]} \\ $h_{3}:$ [53] \item[68] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{2}:$ [62] \\ $h_{4}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[7/82] \mb{7/82} \begin{gl} \item[66] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{2}:$ [59] \\ $h_{3}:$ [52] \\ $h_{4}:$ [42], [41] \\ $h_{5}:$ [28] \item[67] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{4}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[6/82] \mb{6/82} \begin{gl} \item[63] {\rm Sq(3)[51] + Sq(0,1)[51]} \\ $h_{2}:$ [50] \\ $h_{3}:$ [46] \\ $h_{4}:$ [39], [38] \\ $h_{5}:$ [29] \item[64] {\rm Sq(3)[52] + Sq(0,1)[52] + Sq(0,1)[51]} \\ $h_{4}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[4/82] \mb{4/82} \begin{gl} \item[43] {\rm Sq(6)[30] + Sq(0,2)[30]} \\ $h_{6}:$ [9] \end{gl} \end{bdl} \dm{83} \begin{bdl} \item[43/83] \mb{43/83} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[42/83] \mb{42/83} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[41/83] \mb{41/83} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[33/83] \mb{33/83} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[32/83] \mb{32/83} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[31/83] \mb{31/83} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[28/83] \mb{28/83} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[25/83] \mb{25/83} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[24/83] \mb{24/83} \begin{gl} \item[24] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[23/83] \mb{23/83} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[22/83] \mb{22/83} \begin{gl} \item[24] {\rm Sq(0,1)[27]} \item[25] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[20/83] \mb{20/83} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[19/83] \mb{19/83} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[18/83] \mb{18/83} \begin{gl} \item[40] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[17/83] \mb{17/83} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [37] \\ $h_{3}:$ [32] \item[43] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [38] \\ $h_{2}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[16/83] \mb{16/83} \begin{gl} \item[39] {\rm Sq(1,1)[38]} \item[40] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[15/83] \mb{15/83} \begin{gl} \item[41] {\rm Sq(1,2)[40] + Sq(0,0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[13/83] \mb{13/83} \begin{gl} \item[45] {\rm Sq(3)[45] + Sq(0,1)[45]} \\ $h_{2}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[11/83] \mb{11/83} \begin{gl} \item[52] {\rm Sq(3)[52]} \end{gl} \end{bdl} \begin{bdl} \item[10/83] \mb{10/83} \begin{gl} \item[55] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \\ $h_{2}:$ [58] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[7/83] \mb{7/83} \begin{gl} \item[68] {\rm Sq(2)[64]} \\ $h_{1}:$ [64] \\ $h_{3}:$ [53] \\ $h_{4}:$ [43] \item[69] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{2}:$ [60] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[6/83] \mb{6/83} \begin{gl} \item[65] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{2}:$ [51] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[5/83] \mb{5/83} \begin{gl} \item[55] {\rm Sq(1,2)[38] + Sq(0,0,1)[38]} \\ $h_{6}:$ [8] \item[56] {\rm Sq(4)[40] + Sq(1,1)[40]} \\ $h_{2}:$ [40] \\ $h_{4}:$ [32] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \dm{84} \begin{bdl} \item[38/84] \mb{38/84} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[37/84] \mb{37/84} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[36/84] \mb{36/84} \begin{gl} \item[7] {\rm Sq(3)[7]} \end{gl} \end{bdl} \begin{bdl} \item[30/84] \mb{30/84} \begin{gl} \item[14] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[27/84] \mb{27/84} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[24/84] \mb{24/84} \begin{gl} \item[25] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[23/84] \mb{23/84} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[22/84] \mb{22/84} \begin{gl} \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[21/84] \mb{21/84} \begin{gl} \item[29] {\rm Sq(1,1)[30]} \item[30] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[20/84] \mb{20/84} \begin{gl} \item[33] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [33] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[19/84] \mb{19/84} \begin{gl} \item[37] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [36] \\ $h_{4}:$ [20] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[18/84] \mb{18/84} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[17/84] \mb{17/84} \begin{gl} \item[44] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[16/84] \mb{16/84} \begin{gl} \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[15/84] \mb{15/84} \begin{gl} \item[42] {\rm Sq(0,1)[45]} \item[43] {\rm Sq(3)[45]} \end{gl} \end{bdl} \begin{bdl} \item[14/84] \mb{14/84} \begin{gl} \item[46] {\rm Sq(5)[43]} \end{gl} \end{bdl} \begin{bdl} \item[10/84] \mb{10/84} \begin{gl} \item[56] {\rm Sq(3,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[9/84] \mb{9/84} \begin{gl} \item[62] {\rm Sq(3)[68] + Sq(0,1)[68] + Sq(0,1)[67]} \\ $h_{2}:$ [66] \\ $h_{3}:$ [57] \\ $h_{4}:$ [46], [45] \end{gl} \end{bdl} \begin{bdl} \item[8/84] \mb{8/84} \begin{gl} \item[69] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{1}:$ [68] \\ $h_{3}:$ [58] \\ $h_{4}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[7/84] \mb{7/84} \begin{gl} \item[70] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{4}:$ [45], [44] \end{gl} \end{bdl} \begin{bdl} \item[6/84] \mb{6/84} \begin{gl} \item[66] {\rm Sq(2)[55]} \\ $h_{1}:$ [55] \\ $h_{2}:$ [53] \\ $h_{6}:$ [9] \item[67] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{4}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[5/84] \mb{5/84} \begin{gl} \item[57] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[4/84] \mb{4/84} \begin{gl} \item[44] {\rm Sq(11,1)[29] + Sq(4,1,1)[29] + Sq(1,2,1)[29]} \item[45] {\rm Sq(4)[33]} \\ $h_{2}:$ [33] \\ $h_{3}:$ [30] \\ $h_{4}:$ [27] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \dm{85} \begin{bdl} \item[37/85] \mb{37/85} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[36/85] \mb{36/85} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[35/85] \mb{35/85} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[34/85] \mb{34/85} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[33/85] \mb{33/85} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[32/85] \mb{32/85} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[31/85] \mb{31/85} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[30/85] \mb{30/85} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[29/85] \mb{29/85} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \item[18] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[28/85] \mb{28/85} \begin{gl} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[27/85] \mb{27/85} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[26/85] \mb{26/85} \begin{gl} \item[18] {\rm Sq(3,1)[22]} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[23/85] \mb{23/85} \begin{gl} \item[25] {\rm Sq(0,1)[25] + Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[21/85] \mb{21/85} \begin{gl} \item[31] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[20/85] \mb{20/85} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[19/85] \mb{19/85} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[18/85] \mb{18/85} \begin{gl} \item[44] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [40] \\ $h_{4}:$ [26] \item[45] {\rm Sq(1)[47] + Sq(1)[45]} \\ $h_{0}:$ [47], [45] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[17/85] \mb{17/85} \begin{gl} \item[45] {\rm Sq(1,1)[38]} \item[46] {\rm Sq(0,1)[39]} \item[47] {\rm Sq(1)[44] + Sq(1)[42]} \\ $h_{0}:$ [44], [42] \\ $h_{2}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[16/85] \mb{16/85} \begin{gl} \item[42] {\rm Sq(3)[41]} \item[43] {\rm Sq(2)[43] + Sq(2)[42]} \\ $h_{1}:$ [43], [42] \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[15/85] \mb{15/85} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \item[45] {\rm Sq(1)[48] + Sq(1)[47]} \\ $h_{0}:$ [48], [47] \end{gl} \end{bdl} \begin{bdl} \item[14/85] \mb{14/85} \begin{gl} \item[47] {\rm Sq(3,1)[43] + Sq(0,2)[43]} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[13/85] \mb{13/85} \begin{gl} \item[46] {\rm Sq(5)[45]} \end{gl} \end{bdl} \begin{bdl} \item[11/85] \mb{11/85} \begin{gl} \item[53] {\rm Sq(2)[56]} \\ $h_{1}:$ [56] \\ $h_{5}:$ [19] \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [54] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[10/85] \mb{10/85} \begin{gl} \item[57] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[9/85] \mb{9/85} \begin{gl} \item[63] {\rm Sq(3,1)[65]} \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[8/85] \mb{8/85} \begin{gl} \item[70] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \\ $h_{3}:$ [60] \\ $h_{4}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[7/85] \mb{7/85} \begin{gl} \item[71] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [64] \\ $h_{3}:$ [56] \\ $h_{4}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[6/85] \mb{6/85} \begin{gl} \item[68] {\rm Sq(3)[56] + Sq(0,1)[56] + Sq(3)[55]} \item[69] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[5/85] \mb{5/85} \begin{gl} \item[58] {\rm Sq(4)[43] + Sq(1,1)[43]} \\ $h_{2}:$ [43] \\ $h_{6}:$ [9] \item[59] {\rm Sq(2)[44]} \\ $h_{1}:$ [44] \\ $h_{4}:$ [34] \item[60] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[4/85] \mb{4/85} \begin{gl} \item[46] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[3/85] \mb{3/85} \begin{gl} \item[34] {\rm Sq(7,3)[19]} \end{gl} \end{bdl} \dm{86} \begin{bdl} \item[42/86] \mb{42/86} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[41/86] \mb{41/86} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[40/86] \mb{40/86} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[33/86] \mb{33/86} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[32/86] \mb{32/86} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \\ $h_{3}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[31/86] \mb{31/86} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[30/86] \mb{30/86} \begin{gl} \item[16] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[29/86] \mb{29/86} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[28/86] \mb{28/86} \begin{gl} \item[17] {\rm Sq(0,1)[14]} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[27/86] \mb{27/86} \begin{gl} \item[16] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[26/86] \mb{26/86} \begin{gl} \item[20] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[25/86] \mb{25/86} \begin{gl} \item[24] {\rm Sq(1,1)[24]} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[24/86] \mb{24/86} \begin{gl} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[23/86] \mb{23/86} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[22/86] \mb{22/86} \begin{gl} \item[27] {\rm Sq(0,1)[29]} \item[28] {\rm Sq(0,1)[30]} \item[29] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[19/86] \mb{19/86} \begin{gl} \item[40] {\rm Sq(3)[43] + Sq(0,1)[43] + Sq(0,1)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[17/86] \mb{17/86} \begin{gl} \item[48] {\rm Sq(1)[46] + Sq(1)[45]} \\ $h_{0}:$ [46], [45] \\ $h_{1}:$ [43], [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[49] {\rm Sq(1)[47] + Sq(1)[45]} \\ $h_{0}:$ [47], [45] \\ $h_{1}:$ [43] \\ $h_{2}:$ [40], [39] \\ $h_{3}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[16/86] \mb{16/86} \begin{gl} \item[45] {\rm Sq(0,1)[43] + Sq(3)[42] + Sq(0,1)[42]} \item[46] {\rm Sq(3)[43] + Sq(3)[42]} \item[47] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[15/86] \mb{15/86} \begin{gl} \item[46] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \end{gl} \end{bdl} \begin{bdl} \item[14/86] \mb{14/86} \begin{gl} \item[49] {\rm Sq(3,1)[44]} \item[50] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \\ $h_{2}:$ [45] \\ $h_{3}:$ [42] \\ $h_{4}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[13/86] \mb{13/86} \begin{gl} \item[47] {\rm Sq(1)[49] + Sq(1)[48]} \\ $h_{0}:$ [49], [48] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[12/86] \mb{12/86} \begin{gl} \item[48] {\rm Sq(5,1)[48] + Sq(2,2)[48]} \item[49] {\rm Sq(1)[56] + Sq(1)[55]} \\ $h_{0}:$ [56], [55] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[11/86] \mb{11/86} \begin{gl} \item[55] {\rm Sq(5)[54] + Sq(2,1)[54]} \item[56] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[10/86] \mb{10/86} \begin{gl} \item[58] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \\ $h_{6}:$ [4] \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[9/86] \mb{9/86} \begin{gl} \item[64] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/86] \mb{8/86} \begin{gl} \item[71] {\rm Sq(1,1)[69]} \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[7/86] \mb{7/86} \begin{gl} \item[72] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \\ $h_{4}:$ [47] \item[73] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{2}:$ [65] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[6/86] \mb{6/86} \begin{gl} \item[70] {\rm Sq(4)[55]} \\ $h_{2}:$ [55] \\ $h_{6}:$ [10] \item[71] {\rm Sq(2)[59]} \\ $h_{1}:$ [59] \\ $h_{2}:$ [56] \\ $h_{4}:$ [44] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[5/86] \mb{5/86} \begin{gl} \item[61] {\rm Sq(3)[45] + Sq(0,1)[45] + Sq(3)[44] + Sq(0,1)[44]} \\ $h_{4}:$ [36] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[4/86] \mb{4/86} \begin{gl} \item[47] {\rm Sq(2)[34]} \\ $h_{1}:$ [34] \end{gl} \end{bdl} \dm{87} \begin{bdl} \item[44/87] \mb{44/87} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[43/87] \mb{43/87} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[42/87] \mb{42/87} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[41/87] \mb{41/87} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[40/87] \mb{40/87} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[39/87] \mb{39/87} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[38/87] \mb{38/87} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[37/87] \mb{37/87} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[36/87] \mb{36/87} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[33/87] \mb{33/87} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[30/87] \mb{30/87} \begin{gl} \item[17] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[28/87] \mb{28/87} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[27/87] \mb{27/87} \begin{gl} \item[18] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[24/87] \mb{24/87} \begin{gl} \item[27] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[23/87] \mb{23/87} \begin{gl} \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [27] \\ $h_{2}:$ [26] \item[28] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{1}:$ [29] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[22/87] \mb{22/87} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [29] \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[21/87] \mb{21/87} \begin{gl} \item[32] {\rm Sq(1,1)[33]} \item[33] {\rm Sq(0,1)[34]} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[20/87] \mb{20/87} \begin{gl} \item[35] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[19/87] \mb{19/87} \begin{gl} \item[41] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [42] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[18/87] \mb{18/87} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[17/87] \mb{17/87} \begin{gl} \item[50] {\rm Sq(3)[44] + Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[15/87] \mb{15/87} \begin{gl} \item[47] {\rm Sq(3)[48] + Sq(0,1)[48] + Sq(3)[47]} \item[48] {\rm Sq(2)[49]} \\ $h_{1}:$ [49] \\ $h_{2}:$ [46] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[13/87] \mb{13/87} \begin{gl} \item[48] {\rm Sq(0,2)[46]} \item[49] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[12/87] \mb{12/87} \begin{gl} \item[50] {\rm Sq(3)[54] + Sq(0,1)[54]} \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[11/87] \mb{11/87} \begin{gl} \item[57] {\rm Sq(2)[58]} \\ $h_{1}:$ [58] \\ $h_{3}:$ [51] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[10/87] \mb{10/87} \begin{gl} \item[60] {\rm Sq(3)[63] + Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[9/87] \mb{9/87} \begin{gl} \item[65] {\rm Sq(3)[70] + Sq(0,1)[70]} \\ $h_{4}:$ [49] \end{gl} \end{bdl} \begin{bdl} \item[7/87] \mb{7/87} \begin{gl} \item[74] {\rm Sq(3)[69] + Sq(0,1)[69] + Sq(3)[68]} \end{gl} \end{bdl} \begin{bdl} \item[6/87] \mb{6/87} \begin{gl} \item[72] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \\ $h_{3}:$ [51] \\ $h_{4}:$ [45] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[5/87] \mb{5/87} \begin{gl} \item[62] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \\ $h_{2}:$ [44] \\ $h_{3}:$ [40] \end{gl} \end{bdl} \dm{88} \begin{bdl} \item[43/88] \mb{43/88} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[42/88] \mb{42/88} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[37/88] \mb{37/88} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[36/88] \mb{36/88} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[35/88] \mb{35/88} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[34/88] \mb{34/88} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[32/88] \mb{32/88} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[29/88] \mb{29/88} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[28/88] \mb{28/88} \begin{gl} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{2}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[27/88] \mb{27/88} \begin{gl} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[26/88] \mb{26/88} \begin{gl} \item[21] {\rm Sq(0,1)[24]} \item[22] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[23/88] \mb{23/88} \begin{gl} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[21/88] \mb{21/88} \begin{gl} \item[35] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[20/88] \mb{20/88} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[19/88] \mb{19/88} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [47] \\ $h_{2}:$ [44] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[18/88] \mb{18/88} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [46] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[17/88] \mb{17/88} \begin{gl} \item[51] {\rm Sq(0,1)[46] + Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[16/88] \mb{16/88} \begin{gl} \item[48] {\rm Sq(1,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[14/88] \mb{14/88} \begin{gl} \item[51] {\rm Sq(3)[47] + Sq(0,1)[47]} \\ $h_{6}:$ [1] \item[52] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{1}:$ [49] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[13/88] \mb{13/88} \begin{gl} \item[50] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \\ $h_{6}:$ [2] \item[51] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{3}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[12/88] \mb{12/88} \begin{gl} \item[51] {\rm Sq(1,1)[54]} \item[52] {\rm Sq(0,1)[55]} \item[53] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{1}:$ [57] \\ $h_{2}:$ [54] \\ $h_{3}:$ [49] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[11/88] \mb{11/88} \begin{gl} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{2}:$ [57] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[10/88] \mb{10/88} \begin{gl} \item[61] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [63] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[9/88] \mb{9/88} \begin{gl} \item[66] {\rm Sq(3)[71]} \\ $h_{6}:$ [5] \item[67] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{4}:$ [50] \\ $h_{5}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[8/88] \mb{8/88} \begin{gl} \item[72] {\rm Sq(3)[72]} \\ $h_{4}:$ [49] \\ $h_{5}:$ [27] \item[73] {\rm Sq(2)[74]} \\ $h_{1}:$ [74] \\ $h_{4}:$ [49] \\ $h_{5}:$ [27] \end{gl} \end{bdl} \dm{89} \begin{bdl} \item[45/89] \mb{45/89} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[44/89] \mb{44/89} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[43/89] \mb{43/89} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[42/89] \mb{42/89} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[41/89] \mb{41/89} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[40/89] \mb{40/89} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[35/89] \mb{35/89} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[34/89] \mb{34/89} \begin{gl} \item[14] {\rm Sq(3)[18] + Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[31/89] \mb{31/89} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[28/89] \mb{28/89} \begin{gl} \item[21] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[27/89] \mb{27/89} \begin{gl} \item[20] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[26/89] \mb{26/89} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[25/89] \mb{25/89} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[24/89] \mb{24/89} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[23/89] \mb{23/89} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[22/89] \mb{22/89} \begin{gl} \item[32] {\rm Sq(0,1)[33] + Sq(0,1)[32]} \item[33] {\rm Sq(3)[34] + Sq(0,1)[34] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[19/89] \mb{19/89} \begin{gl} \item[43] {\rm Sq(0,1)[46]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[18/89] \mb{18/89} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[16/89] \mb{16/89} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[15/89] \mb{15/89} \begin{gl} \item[49] {\rm Sq(2)[51]} \\ $h_{1}:$ [51] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[13/89] \mb{13/89} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[12/89] \mb{12/89} \begin{gl} \item[54] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[11/89] \mb{11/89} \begin{gl} \item[59] {\rm Sq(3)[60]} \end{gl} \end{bdl} \begin{bdl} \item[10/89] \mb{10/89} \begin{gl} \item[62] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{1}:$ [66] \\ $h_{2}:$ [64] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[9/89] \mb{9/89} \begin{gl} \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{2}:$ [71] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[8/89] \mb{8/89} \begin{gl} \item[74] {\rm Sq(1,1)[73]} \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[7/89] \mb{7/89} \begin{gl} \item[75] {\rm Sq(3)[72]} \\ $h_{2}:$ [70] \\ $h_{4}:$ [51] \\ $h_{5}:$ [31] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \dm{90} \begin{bdl} \item[46/90] \mb{46/90} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[41/90] \mb{41/90} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[40/90] \mb{40/90} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[39/90] \mb{39/90} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[38/90] \mb{38/90} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[37/90] \mb{37/90} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[36/90] \mb{36/90} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[33/90] \mb{33/90} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[30/90] \mb{30/90} \begin{gl} \item[18] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[27/90] \mb{27/90} \begin{gl} \item[21] {\rm Sq(0,1)[22] + Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[24/90] \mb{24/90} \begin{gl} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[23/90] \mb{23/90} \begin{gl} \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [33] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[22/90] \mb{22/90} \begin{gl} \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[21/90] \mb{21/90} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37] + Sq(3)[36]} \item[38] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[20/90] \mb{20/90} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[19/90] \mb{19/90} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[52] + Sq(1)[51]} \\ $h_{0}:$ [53], [52], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [47] \\ $h_{3}:$ [40] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[18/90] \mb{18/90} \begin{gl} \item[51] {\rm Sq(1,1)[50]} \item[52] {\rm Sq(0,1)[51]} \item[53] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{3}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[17/90] \mb{17/90} \begin{gl} \item[52] {\rm Sq(0,1)[48]} \item[53] {\rm Sq(1)[51] + Sq(1)[50]} \\ $h_{0}:$ [51], [50] \\ $h_{3}:$ [40], [39] \end{gl} \end{bdl} \begin{bdl} \item[16/90] \mb{16/90} \begin{gl} \item[50] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{1}:$ [49] \\ $h_{6}:$ [1] \item[51] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{1}:$ [49] \\ $h_{3}:$ [41] \\ $h_{6}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[15/90] \mb{15/90} \begin{gl} \item[50] {\rm Sq(3)[51]} \item[51] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{6}:$ [2] \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[14/90] \mb{14/90} \begin{gl} \item[53] {\rm Sq(3)[50]} \\ $h_{6}:$ [2] \item[54] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[13/90] \mb{13/90} \begin{gl} \item[53] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[12/90] \mb{12/90} \begin{gl} \item[55] {\rm Sq(3,1)[54] + Sq(3,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[11/90] \mb{11/90} \begin{gl} \item[60] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[10/90] \mb{10/90} \begin{gl} \item[63] {\rm Sq(3)[66] + Sq(0,1)[66]} \end{gl} \end{bdl} \dm{91} \begin{bdl} \item[47/91] \mb{47/91} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[46/91] \mb{46/91} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[45/91] \mb{45/91} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[37/91] \mb{37/91} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[36/91] \mb{36/91} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[35/91] \mb{35/91} \begin{gl} \item[11] {\rm Sq(3)[14]} \end{gl} \end{bdl} \begin{bdl} \item[32/91] \mb{32/91} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[29/91] \mb{29/91} \begin{gl} \item[22] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[28/91] \mb{28/91} \begin{gl} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[27/91] \mb{27/91} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[26/91] \mb{26/91} \begin{gl} \item[24] {\rm Sq(0,1)[26]} \item[25] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[23/91] \mb{23/91} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[21/91] \mb{21/91} \begin{gl} \item[39] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[20/91] \mb{20/91} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[19/91] \mb{19/91} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [52] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43] \\ $h_{4}:$ [29], [28] \end{gl} \end{bdl} \begin{bdl} \item[18/91] \mb{18/91} \begin{gl} \item[54] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[17/91] \mb{17/91} \begin{gl} \item[54] {\rm Sq(3,1)[47] + Sq(3,1)[46] + Sq(0,2)[46]} \item[55] {\rm Sq(0,1)[49]} \item[56] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[16/91] \mb{16/91} \begin{gl} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{3}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[15/91] \mb{15/91} \begin{gl} \item[53] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[14/91] \mb{14/91} \begin{gl} \item[55] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[13/91] \mb{13/91} \begin{gl} \item[54] {\rm Sq(2)[55]} \\ $h_{1}:$ [55] \item[55] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[12/91] \mb{12/91} \begin{gl} \item[56] {\rm Sq(0,2)[55]} \item[57] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[11/91] \mb{11/91} \begin{gl} \item[61] {\rm Sq(1,1)[61]} \item[62] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{2}:$ [61] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[10/91] \mb{10/91} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [66] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[9/91] \mb{9/91} \begin{gl} \item[69] {\rm Sq(3)[74]} \\ $h_{6}:$ [7] \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[8/91] \mb{8/91} \begin{gl} \item[75] {\rm Sq(2,1)[74]} \end{gl} \end{bdl} \begin{bdl} \item[6/91] \mb{6/91} \begin{gl} \item[73] {\rm Sq(2,1)[62]} \\ $h_{4}:$ [47] \end{gl} \end{bdl} \dm{92} \begin{bdl} \item[42/92] \mb{42/92} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[41/92] \mb{41/92} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[40/92] \mb{40/92} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[34/92] \mb{34/92} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[31/92] \mb{31/92} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[30/92] \mb{30/92} \begin{gl} \item[19] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[29/92] \mb{29/92} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[28/92] \mb{28/92} \begin{gl} \item[23] {\rm Sq(0,1)[21]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[27/92] \mb{27/92} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \item[24] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[26/92] \mb{26/92} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[25/92] \mb{25/92} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \item[30] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[24/92] \mb{24/92} \begin{gl} \item[30] {\rm Sq(3,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[23/92] \mb{23/92} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[22/92] \mb{22/92} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[19/92] \mb{19/92} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[18/92] \mb{18/92} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[16/92] \mb{16/92} \begin{gl} \item[53] {\rm Sq(3)[51] + Sq(0,1)[51] + Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[14/92] \mb{14/92} \begin{gl} \item[56] {\rm Sq(0,2)[48]} \item[57] {\rm Sq(2)[54]} \\ $h_{1}:$ [54] \item[58] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{3}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[13/92] \mb{13/92} \begin{gl} \item[56] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[12/92] \mb{12/92} \begin{gl} \item[58] {\rm Sq(1,1)[59]} \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[11/92] \mb{11/92} \begin{gl} \item[63] {\rm Sq(3,1)[60] + Sq(0,2)[60]} \item[64] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[10/92] \mb{10/92} \begin{gl} \item[65] {\rm Sq(2,1)[66]} \item[66] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [69] \\ $h_{2}:$ [68] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[9/92] \mb{9/92} \begin{gl} \item[71] {\rm Sq(2)[75]} \\ $h_{1}:$ [75] \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [74] \\ $h_{6}:$ [8] \item[73] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [74] \\ $h_{4}:$ [58], [57] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[8/92] \mb{8/92} \begin{gl} \item[76] {\rm Sq(1,1)[75]} \\ $h_{6}:$ [7] \item[77] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{4}:$ [56] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[7/92] \mb{7/92} \begin{gl} \item[76] {\rm Sq(2)[73]} \\ $h_{1}:$ [73] \\ $h_{3}:$ [68] \\ $h_{4}:$ [54] \\ $h_{5}:$ [32] \item[77] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[6/92] \mb{6/92} \begin{gl} \item[74] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[5/92] \mb{5/92} \begin{gl} \item[63] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[4/92] \mb{4/92} \begin{gl} \item[48] {\rm Sq(2,2)[34]} \end{gl} \end{bdl} \dm{93} \begin{bdl} \item[41/93] \mb{41/93} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[40/93] \mb{40/93} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[39/93] \mb{39/93} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[36/93] \mb{36/93} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[33/93] \mb{33/93} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[30/93] \mb{30/93} \begin{gl} \item[20] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[29/93] \mb{29/93} \begin{gl} \item[24] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[28/93] \mb{28/93} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[27/93] \mb{27/93} \begin{gl} \item[25] {\rm Sq(0,1)[25] + Sq(0,1)[24]} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[26/93] \mb{26/93} \begin{gl} \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[25/93] \mb{25/93} \begin{gl} \item[31] {\rm Sq(2)[30]} \\ $h_{1}:$ [30] \item[32] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[24/93] \mb{24/93} \begin{gl} \item[31] {\rm Sq(1,1)[31]} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[23/93] \mb{23/93} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[22/93] \mb{22/93} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[21/93] \mb{21/93} \begin{gl} \item[40] {\rm Sq(0,1)[39]} \item[41] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[20/93] \mb{20/93} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[18/93] \mb{18/93} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[17/93] \mb{17/93} \begin{gl} \item[57] {\rm Sq(3)[52] + Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[15/93] \mb{15/93} \begin{gl} \item[54] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{2}:$ [53] \\ $h_{3}:$ [49] \\ $h_{6}:$ [3] \item[55] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{1}:$ [57] \\ $h_{2}:$ [54] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[14/93] \mb{14/93} \begin{gl} \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{6}:$ [3] \item[60] {\rm Sq(1)[60] + Sq(1)[58]} \\ $h_{0}:$ [60], [58] \\ $h_{2}:$ [53] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[13/93] \mb{13/93} \begin{gl} \item[57] {\rm Sq(1,1)[55]} \\ $h_{6}:$ [3] \item[58] {\rm Sq(3)[57] + Sq(0,1)[57] + Sq(0,1)[56]} \\ $h_{6}:$ [3] \item[59] {\rm Sq(2)[58]} \\ $h_{1}:$ [58] \\ $h_{3}:$ [48] \item[60] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{2}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[12/93] \mb{12/93} \begin{gl} \item[60] {\rm Sq(3)[61]} \item[61] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{3}:$ [56], [55] \\ $h_{4}:$ [47] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[11/93] \mb{11/93} \begin{gl} \item[65] {\rm Sq(2)[65]} \\ $h_{1}:$ [65] \item[66] {\rm Sq(1)[69] + Sq(1)[67]} \\ $h_{0}:$ [69], [67] \\ $h_{3}:$ [59] \\ $h_{4}:$ [48] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[10/93] \mb{10/93} \begin{gl} \item[67] {\rm Sq(3)[70] + Sq(0,1)[70] + Sq(3)[69]} \item[68] {\rm Sq(2)[71]} \\ $h_{1}:$ [71] \\ $h_{4}:$ [55] \item[69] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{3}:$ [64] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[9/93] \mb{9/93} \begin{gl} \item[74] {\rm Sq(1)[79] + Sq(1)[78]} \\ $h_{0}:$ [79], [78] \\ $h_{3}:$ [71] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[8/93] \mb{8/93} \begin{gl} \item[78] {\rm Sq(7)[74] + Sq(1,2)[74]} \item[79] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[7/93] \mb{7/93} \begin{gl} \item[78] {\rm Sq(2,2)[70]} \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[6/93] \mb{6/93} \begin{gl} \item[75] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{4}:$ [49] \\ $h_{5}:$ [34], [32] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[5/93] \mb{5/93} \begin{gl} \item[64] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \item[65] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [39] \\ $h_{5}:$ [27] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[4/93] \mb{4/93} \begin{gl} \item[49] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{4}:$ [31] \\ $h_{5}:$ [21] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[3/93] \mb{3/93} \begin{gl} \item[35] {\rm Sq(16)[20] + Sq(10,2)[20] + Sq(7,3)[20] + Sq(6,1,1)[20] + Sq(3,2,1)[20] + Sq(0,3,1)[20]} \\ $h_{4}:$ [20] \\ $h_{5}:$ [15] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \dm{94} \begin{bdl} \item[46/94] \mb{46/94} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[45/94] \mb{45/94} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[44/94] \mb{44/94} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[43/94] \mb{43/94} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[42/94] \mb{42/94} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[41/94] \mb{41/94} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[40/94] \mb{40/94} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[39/94] \mb{39/94} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[38/94] \mb{38/94} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[37/94] \mb{37/94} \begin{gl} \item[14] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[36/94] \mb{36/94} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[35/94] \mb{35/94} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \item[13] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{4}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[34/94] \mb{34/94} \begin{gl} \item[16] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[33/94] \mb{33/94} \begin{gl} \item[21] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[32/94] \mb{32/94} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{4}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[31/94] \mb{31/94} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[30/94] \mb{30/94} \begin{gl} \item[21] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[29/94] \mb{29/94} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[28/94] \mb{28/94} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [22] \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[27/94] \mb{27/94} \begin{gl} \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [24] \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[26/94] \mb{26/94} \begin{gl} \item[29] {\rm Sq(0,1)[29] + Sq(0,1)[28]} \item[30] {\rm Sq(3)[30] + Sq(0,1)[30] + Sq(0,1)[28]} \item[31] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[25/94] \mb{25/94} \begin{gl} \item[33] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[24/94] \mb{24/94} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[23/94] \mb{23/94} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[22/94] \mb{22/94} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[21/94] \mb{21/94} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[20/94] \mb{20/94} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[19/94] \mb{19/94} \begin{gl} \item[49] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[17/94] \mb{17/94} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[16/94] \mb{16/94} \begin{gl} \item[54] {\rm Sq(5)[52] + Sq(2,1)[52] + Sq(5)[51] + Sq(2,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[15/94] \mb{15/94} \begin{gl} \item[56] {\rm Sq(3)[58] + Sq(0,1)[58] + Sq(3)[57]} \end{gl} \end{bdl} \begin{bdl} \item[14/94] \mb{14/94} \begin{gl} \item[61] {\rm Sq(2)[57]} \\ $h_{1}:$ [57] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[13/94] \mb{13/94} \begin{gl} \item[61] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{1}:$ [60] \\ $h_{2}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[12/94] \mb{12/94} \begin{gl} \item[62] {\rm Sq(4)[61] + Sq(1,1)[61]} \\ $h_{2}:$ [61] \item[63] {\rm Sq(2)[65]} \\ $h_{1}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[11/94] \mb{11/94} \begin{gl} \item[67] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \\ $h_{3}:$ [60] \item[68] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [64] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[10/94] \mb{10/94} \begin{gl} \item[70] {\rm Sq(3)[73] + Sq(0,1)[73] + Sq(3)[71]} \item[71] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [69] \\ $h_{6}:$ [11] \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[9/94] \mb{9/94} \begin{gl} \item[75] {\rm Sq(0,1)[76]} \\ $h_{6}:$ [10] \item[76] {\rm Sq(2)[78]} \\ $h_{1}:$ [78] \\ $h_{2}:$ [75] \\ $h_{6}:$ [10] \item[77] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[8/94] \mb{8/94} \begin{gl} \item[80] {\rm Sq(5,1)[74] + Sq(1,0,1)[74]} \end{gl} \end{bdl} \begin{bdl} \item[6/94] \mb{6/94} \begin{gl} \item[76] {\rm Sq(3)[63] + Sq(0,1)[63]} \\ $h_{6}:$ [13] \item[77] {\rm Sq(2)[64]} \\ $h_{1}:$ [64] \\ $h_{4}:$ [50] \end{gl} \end{bdl} \begin{bdl} \item[4/94] \mb{4/94} \begin{gl} \item[50] {\rm Sq(2)[35]} \\ $h_{1}:$ [35] \\ $h_{4}:$ [32] \\ $h_{5}:$ [22] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \dm{95} \begin{bdl} \item[48/95] \mb{48/95} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[47/95] \mb{47/95} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[46/95] \mb{46/95} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[45/95] \mb{45/95} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[44/95] \mb{44/95} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[43/95] \mb{43/95} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[42/95] \mb{42/95} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[41/95] \mb{41/95} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[40/95] \mb{40/95} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[39/95] \mb{39/95} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[38/95] \mb{38/95} \begin{gl} \item[11] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[37/95] \mb{37/95} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[36/95] \mb{36/95} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[35/95] \mb{35/95} \begin{gl} \item[14] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[34/95] \mb{34/95} \begin{gl} \item[17] {\rm Sq(0,1)[20]} \item[18] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[33/95] \mb{33/95} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[32/95] \mb{32/95} \begin{gl} \item[22] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[23] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[31/95] \mb{31/95} \begin{gl} \item[20] {\rm Sq(0,1)[20]} \item[21] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[30/95] \mb{30/95} \begin{gl} \item[22] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[29/95] \mb{29/95} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[28/95] \mb{28/95} \begin{gl} \item[28] {\rm Sq(0,1)[25]} \item[29] {\rm Sq(1)[31] + Sq(1)[30]} \\ $h_{0}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[27/95] \mb{27/95} \begin{gl} \item[29] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [30] \\ $h_{2}:$ [26] \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [27], [26] \\ $h_{3}:$ [21] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [31] \\ $h_{2}:$ [27], [26] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[26/95] \mb{26/95} \begin{gl} \item[33] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [28] \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [30], [28] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[25/95] \mb{25/95} \begin{gl} \item[34] {\rm Sq(3)[31]} \item[35] {\rm Sq(0,1)[32]} \item[36] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [30] \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[24/95] \mb{24/95} \begin{gl} \item[34] {\rm Sq(1,1)[33]} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[23/95] \mb{23/95} \begin{gl} \item[37] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [39] \\ $h_{2}:$ [36] \\ $h_{4}:$ [21] \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[22/95] \mb{22/95} \begin{gl} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(0,1)[41]} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[21/95] \mb{21/95} \begin{gl} \item[43] {\rm Sq(0,1)[41]} \item[44] {\rm Sq(3)[41]} \end{gl} \end{bdl} \begin{bdl} \item[19/95] \mb{19/95} \begin{gl} \item[50] {\rm Sq(1,1)[55]} \item[51] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[18/95] \mb{18/95} \begin{gl} \item[57] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[16/95] \mb{16/95} \begin{gl} \item[55] {\rm Sq(3,1)[50] + Sq(0,2)[50]} \item[56] {\rm Sq(3)[54] + Sq(0,1)[54]} \\ $h_{6}:$ [3] \item[57] {\rm Sq(2)[56]} \\ $h_{1}:$ [56] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[15/95] \mb{15/95} \begin{gl} \item[57] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \\ $h_{3}:$ [51] \\ $h_{4}:$ [42] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[14/95] \mb{14/95} \begin{gl} \item[62] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{2}:$ [56] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[13/95] \mb{13/95} \begin{gl} \item[62] {\rm Sq(0,1)[60]} \\ $h_{2}:$ [58] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[11/95] \mb{11/95} \begin{gl} \item[69] {\rm Sq(4)[65]} \\ $h_{2}:$ [65] \item[70] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[10/95] \mb{10/95} \begin{gl} \item[73] {\rm Sq(1,1)[73] + Sq(1,1)[71]} \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [75] \\ $h_{2}:$ [72] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[9/95] \mb{9/95} \begin{gl} \item[78] {\rm Sq(2)[80]} \\ $h_{1}:$ [80] \item[79] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [76] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[8/95] \mb{8/95} \begin{gl} \item[81] {\rm Sq(0,1)[78]} \\ $h_{6}:$ [10] \item[82] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[7/95] \mb{7/95} \begin{gl} \item[79] {\rm Sq(6,1)[72] + Sq(3,2)[72] + Sq(0,3)[72]} \item[80] {\rm Sq(3)[75] + Sq(0,1)[75]} \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[6/95] \mb{6/95} \begin{gl} \item[78] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{2}:$ [63] \\ $h_{4}:$ [52], [51] \end{gl} \end{bdl} \begin{bdl} \item[5/95] \mb{5/95} \begin{gl} \item[66] {\rm Sq(10)[47] + Sq(4,2)[47] + Sq(0,1,1)[47]} \\ $h_{6}:$ [13] \item[67] {\rm Sq(4)[48] + Sq(1,1)[48]} \\ $h_{2}:$ [48] \\ $h_{4}:$ [40] \end{gl} \end{bdl} \dm{96} \begin{bdl} \item[47/96] \mb{47/96} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[46/96] \mb{46/96} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[41/96] \mb{41/96} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[40/96] \mb{40/96} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[39/96] \mb{39/96} \begin{gl} \item[10] {\rm Sq(3)[10]} \end{gl} \end{bdl} \begin{bdl} \item[38/96] \mb{38/96} \begin{gl} \item[12] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[36/96] \mb{36/96} \begin{gl} \item[16] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[33/96] \mb{33/96} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[32/96] \mb{32/96} \begin{gl} \item[24] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[31/96] \mb{31/96} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[30/96] \mb{30/96} \begin{gl} \item[23] {\rm Sq(1,1)[24]} \item[24] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[27/96] \mb{27/96} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32] + Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[25/96] \mb{25/96} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[24/96] \mb{24/96} \begin{gl} \item[36] {\rm Sq(1,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[23/96] \mb{23/96} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [40] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[22/96] \mb{22/96} \begin{gl} \item[43] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[44] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [40] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[21/96] \mb{21/96} \begin{gl} \item[45] {\rm Sq(0,1)[43]} \item[46] {\rm Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[20/96] \mb{20/96} \begin{gl} \item[45] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[18/96] \mb{18/96} \begin{gl} \item[58] {\rm Sq(3,1)[56] + Sq(3,1)[55] + Sq(0,2)[54]} \item[59] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[17/96] \mb{17/96} \begin{gl} \item[59] {\rm Sq(2)[56] + Sq(2)[55]} \\ $h_{1}:$ [56], [55] \\ $h_{6}:$ [2] \item[60] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{1}:$ [57], [55] \\ $h_{6}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[16/96] \mb{16/96} \begin{gl} \item[58] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[15/96] \mb{15/96} \begin{gl} \item[58] {\rm Sq(3)[61]} \item[59] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{2}:$ [59] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[14/96] \mb{14/96} \begin{gl} \item[63] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{2}:$ [57] \\ $h_{6}:$ [6] \item[64] {\rm Sq(1)[65] + Sq(1)[64]} \\ $h_{0}:$ [65], [64] \\ $h_{2}:$ [60], [58] \\ $h_{5}:$ [29] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[13/96] \mb{13/96} \begin{gl} \item[63] {\rm Sq(1,1)[61]} \\ $h_{6}:$ [5] \item[64] {\rm Sq(3)[62] + Sq(0,1)[62]} \item[65] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{2}:$ [60] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[12/96] \mb{12/96} \begin{gl} \item[64] {\rm Sq(3,1)[62] + Sq(6)[61] + Sq(0,2)[61]} \item[65] {\rm Sq(3)[67]} \\ $h_{3}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[10/96] \mb{10/96} \begin{gl} \item[75] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[9/96] \mb{9/96} \begin{gl} \item[80] {\rm Sq(3)[80]} \\ $h_{2}:$ [78] \item[81] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[8/96] \mb{8/96} \begin{gl} \item[83] {\rm Sq(1,1)[78]} \item[84] {\rm Sq(2)[80]} \\ $h_{1}:$ [80] \\ $h_{2}:$ [78] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[6/96] \mb{6/96} \begin{gl} \item[79] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{1}:$ [66] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[5/96] \mb{5/96} \begin{gl} \item[68] {\rm Sq(3)[50]} \\ $h_{6}:$ [14] \end{gl} \end{bdl} \dm{97} \begin{bdl} \item[49/97] \mb{49/97} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[48/97] \mb{48/97} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[47/97] \mb{47/97} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[46/97] \mb{46/97} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[45/97] \mb{45/97} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[44/97] \mb{44/97} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[39/97] \mb{39/97} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[38/97] \mb{38/97} \begin{gl} \item[13] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[35/97] \mb{35/97} \begin{gl} \item[15] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[32/97] \mb{32/97} \begin{gl} \item[25] {\rm Sq(3)[21] + Sq(0,1)[21] + Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[31/97] \mb{31/97} \begin{gl} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[30/97] \mb{30/97} \begin{gl} \item[25] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[29/97] \mb{29/97} \begin{gl} \item[28] {\rm Sq(0,1)[28]} \item[29] {\rm Sq(3)[29] + Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[28/97] \mb{28/97} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[27/97] \mb{27/97} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[26/97] \mb{26/97} \begin{gl} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[23/97] \mb{23/97} \begin{gl} \item[40] {\rm Sq(0,1)[41]} \item[41] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [43] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[22/97] \mb{22/97} \begin{gl} \item[45] {\rm Sq(0,1)[44] + Sq(3)[43] + Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[20/97] \mb{20/97} \begin{gl} \item[46] {\rm Sq(0,1)[50]} \item[47] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[19/97] \mb{19/97} \begin{gl} \item[52] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[17/97] \mb{17/97} \begin{gl} \item[61] {\rm Sq(3)[56] + Sq(3)[55] + Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[16/97] \mb{16/97} \begin{gl} \item[59] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{3}:$ [52], [51] \end{gl} \end{bdl} \begin{bdl} \item[15/97] \mb{15/97} \begin{gl} \item[60] {\rm Sq(3,1)[58] + Sq(3,1)[57] + Sq(0,2)[56]} \item[61] {\rm Sq(1)[66] + Sq(1)[65]} \\ $h_{0}:$ [66], [65] \\ $h_{3}:$ [54], [53] \end{gl} \end{bdl} \begin{bdl} \item[14/97] \mb{14/97} \begin{gl} \item[65] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{1}:$ [63] \\ $h_{6}:$ [7] \item[66] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{1}:$ [63] \\ $h_{3}:$ [53] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[13/97] \mb{13/97} \begin{gl} \item[66] {\rm Sq(2)[64]} \\ $h_{1}:$ [64] \\ $h_{2}:$ [62] \item[67] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{6}:$ [6] \item[68] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{3}:$ [55] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[12/97] \mb{12/97} \begin{gl} \item[66] {\rm Sq(0,2)[63]} \item[67] {\rm Sq(1,1)[68]} \\ $h_{6}:$ [7] \item[68] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[11/97] \mb{11/97} \begin{gl} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [71] \\ $h_{3}:$ [63] \\ $h_{4}:$ [54] \\ $h_{5}:$ [36], [35] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[10/97] \mb{10/97} \begin{gl} \item[76] {\rm Sq(1,2)[69] + Sq(0,0,1)[69]} \item[77] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [75] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[9/97] \mb{9/97} \begin{gl} \item[82] {\rm Sq(3)[81]} \\ $h_{6}:$ [13] \item[83] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [83] \\ $h_{2}:$ [80] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[8/97] \mb{8/97} \begin{gl} \item[85] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[7/97] \mb{7/97} \begin{gl} \item[81] {\rm Sq(11)[72] + Sq(5,2)[72] + Sq(1,1,1)[72]} \item[82] {\rm Sq(4)[76]} \\ $h_{2}:$ [76] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \dm{98} \begin{bdl} \item[50/98] \mb{50/98} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[45/98] \mb{45/98} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[44/98] \mb{44/98} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[43/98] \mb{43/98} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[42/98] \mb{42/98} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[41/98] \mb{41/98} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[40/98] \mb{40/98} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[37/98] \mb{37/98} \begin{gl} \item[17] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[34/98] \mb{34/98} \begin{gl} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[31/98] \mb{31/98} \begin{gl} \item[24] {\rm Sq(0,1)[24] + Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[28/98] \mb{28/98} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[27/98] \mb{27/98} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[26/98] \mb{26/98} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [34] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36], [34] \end{gl} \end{bdl} \begin{bdl} \item[25/98] \mb{25/98} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[24/98] \mb{24/98} \begin{gl} \item[38] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[22/98] \mb{22/98} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[21/98] \mb{21/98} \begin{gl} \item[47] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[19/98] \mb{19/98} \begin{gl} \item[53] {\rm Sq(0,1)[59] + Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[18/98] \mb{18/98} \begin{gl} \item[60] {\rm Sq(2,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[15/98] \mb{15/98} \begin{gl} \item[62] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[14/98] \mb{14/98} \begin{gl} \item[67] {\rm Sq(3)[63] + Sq(0,1)[63]} \item[68] {\rm Sq(0,1)[64]} \item[69] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[13/98] \mb{13/98} \begin{gl} \item[69] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[12/98] \mb{12/98} \begin{gl} \item[69] {\rm Sq(4)[69] + Sq(1,1)[69]} \\ $h_{2}:$ [69] \\ $h_{3}:$ [61] \\ $h_{5}:$ [35] \item[70] {\rm Sq(1,1)[70]} \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[11/98] \mb{11/98} \begin{gl} \item[73] {\rm Sq(1,1)[74] + Sq(4)[73]} \\ $h_{2}:$ [73] \item[74] {\rm Sq(2)[76]} \\ $h_{1}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[10/98] \mb{10/98} \begin{gl} \item[78] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{3}:$ [70], [69] \item[79] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [82] \\ $h_{2}:$ [79] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[9/98] \mb{9/98} \begin{gl} \item[84] {\rm Sq(1,1)[82] + Sq(1,1)[81]} \\ $h_{3}:$ [75] \item[85] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [81] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[8/98] \mb{8/98} \begin{gl} \item[86] {\rm Sq(0,2)[78]} \\ $h_{6}:$ [12] \item[87] {\rm Sq(4)[79] + Sq(1,1)[79]} \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[6/98] \mb{6/98} \begin{gl} \item[80] {\rm Sq(3)[68] + Sq(0,1)[68]} \\ $h_{2}:$ [66] \\ $h_{4}:$ [55] \\ $h_{5}:$ [39] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \dm{99} \begin{bdl} \item[51/99] \mb{51/99} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[50/99] \mb{50/99} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[49/99] \mb{49/99} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[41/99] \mb{41/99} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[40/99] \mb{40/99} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[39/99] \mb{39/99} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[36/99] \mb{36/99} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[33/99] \mb{33/99} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[32/99] \mb{32/99} \begin{gl} \item[26] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[31/99] \mb{31/99} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[30/99] \mb{30/99} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[28/99] \mb{28/99} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[27/99] \mb{27/99} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[26/99] \mb{26/99} \begin{gl} \item[40] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[25/99] \mb{25/99} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [30] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[24/99] \mb{24/99} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[23/99] \mb{23/99} \begin{gl} \item[42] {\rm Sq(3)[45]} \end{gl} \end{bdl} \begin{bdl} \item[21/99] \mb{21/99} \begin{gl} \item[48] {\rm Sq(0,1)[46]} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[20/99] \mb{20/99} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[18/99] \mb{18/99} \begin{gl} \item[61] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[17/99] \mb{17/99} \begin{gl} \item[62] {\rm Sq(0,2)[54]} \item[63] {\rm Sq(3)[59] + Sq(0,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[16/99] \mb{16/99} \begin{gl} \item[60] {\rm Sq(4)[58] + Sq(1,1)[58]} \\ $h_{2}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[15/99] \mb{15/99} \begin{gl} \item[63] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{2}:$ [63] \\ $h_{3}:$ [58] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[14/99] \mb{14/99} \begin{gl} \item[70] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{2}:$ [63] \\ $h_{3}:$ [56] \\ $h_{6}:$ [8] \item[71] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [65], [64] \\ $h_{5}:$ [30] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[13/99] \mb{13/99} \begin{gl} \item[70] {\rm Sq(0,1)[67]} \\ $h_{3}:$ [58] \\ $h_{6}:$ [7] \item[71] {\rm Sq(3)[68] + Sq(0,1)[68] + Sq(3)[67]} \\ $h_{2}:$ [64] \\ $h_{6}:$ [7] \item[72] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [70] \\ $h_{3}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[12/99] \mb{12/99} \begin{gl} \item[71] {\rm Sq(2)[74]} \\ $h_{1}:$ [74] \item[72] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[11/99] \mb{11/99} \begin{gl} \item[75] {\rm Sq(3)[77] + Sq(0,1)[77] + Sq(0,1)[76]} \\ $h_{3}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[10/99] \mb{10/99} \begin{gl} \item[80] {\rm Sq(3)[82]} \\ $h_{2}:$ [80] \item[81] {\rm Sq(1)[87] + Sq(1)[86]} \\ $h_{0}:$ [87], [86] \\ $h_{1}:$ [84] \\ $h_{2}:$ [81] \\ $h_{3}:$ [71] \\ $h_{5}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[9/99] \mb{9/99} \begin{gl} \item[86] {\rm Sq(0,2)[80]} \item[87] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [83] \\ $h_{5}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[8/99] \mb{8/99} \begin{gl} \item[88] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[7/99] \mb{7/99} \begin{gl} \item[83] {\rm Sq(0,2)[76]} \\ $h_{6}:$ [14] \item[84] {\rm Sq(3,1)[77]} \item[85] {\rm Sq(5)[78] + Sq(2,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[6/99] \mb{6/99} \begin{gl} \item[81] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{3}:$ [63] \\ $h_{4}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[5/99] \mb{5/99} \begin{gl} \item[69] {\rm Sq(3,1)[50]} \\ $h_{3}:$ [48] \\ $h_{4}:$ [44] \end{gl} \end{bdl} \dm{100} \begin{bdl} \item[46/100] \mb{46/100} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[45/100] \mb{45/100} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[44/100] \mb{44/100} \begin{gl} \item[7] {\rm Sq(3)[7]} \end{gl} \end{bdl} \begin{bdl} \item[38/100] \mb{38/100} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[35/100] \mb{35/100} \begin{gl} \item[16] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[32/100] \mb{32/100} \begin{gl} \item[27] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[31/100] \mb{31/100} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [27] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[30/100] \mb{30/100} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[29/100] \mb{29/100} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[28/100] \mb{28/100} \begin{gl} \item[33] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [33] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[27/100] \mb{27/100} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [18] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [28] \\ $h_{4}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[26/100] \mb{26/100} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[25/100] \mb{25/100} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[24/100] \mb{24/100} \begin{gl} \item[42] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[23/100] \mb{23/100} \begin{gl} \item[43] {\rm Sq(0,1)[46]} \item[44] {\rm Sq(0,1)[47]} \item[45] {\rm Sq(3)[47]} \end{gl} \end{bdl} \begin{bdl} \item[22/100] \mb{22/100} \begin{gl} \item[48] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[20/100] \mb{20/100} \begin{gl} \item[49] {\rm Sq(1,1)[52]} \item[50] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[19/100] \mb{19/100} \begin{gl} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[18/100] \mb{18/100} \begin{gl} \item[62] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[17/100] \mb{17/100} \begin{gl} \item[64] {\rm Sq(1,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[16/100] \mb{16/100} \begin{gl} \item[61] {\rm Sq(5)[59] + Sq(2,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[14/100] \mb{14/100} \begin{gl} \item[72] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{1}:$ [70] \\ $h_{2}:$ [67] \\ $h_{3}:$ [59], [58], [57] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[13/100] \mb{13/100} \begin{gl} \item[73] {\rm Sq(1,1)[68]} \item[74] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [67] \\ $h_{6}:$ [8] \item[75] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{1}:$ [71] \\ $h_{2}:$ [68] \\ $h_{3}:$ [60] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[12/100] \mb{12/100} \begin{gl} \item[73] {\rm Sq(3)[74]} \\ $h_{6}:$ [8] \item[74] {\rm Sq(2)[75]} \\ $h_{1}:$ [75] \\ $h_{3}:$ [65] \\ $h_{6}:$ [8] \item[75] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [71] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[11/100] \mb{11/100} \begin{gl} \item[76] {\rm Sq(3)[78] + Sq(0,1)[78]} \\ $h_{2}:$ [76] \\ $h_{3}:$ [67] \item[77] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [76] \item[78] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [77] \\ $h_{3}:$ [69] \\ $h_{4}:$ [57] \\ $h_{5}:$ [40] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[10/100] \mb{10/100} \begin{gl} \item[82] {\rm Sq(3)[85] + Sq(0,1)[85]} \item[83] {\rm Sq(2)[86]} \\ $h_{1}:$ [86] \item[84] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [82] \\ $h_{3}:$ [74] \\ $h_{4}:$ [63] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[9/100] \mb{9/100} \begin{gl} \item[88] {\rm Sq(3)[86]} \\ $h_{6}:$ [15] \item[89] {\rm Sq(3)[87] + Sq(0,1)[87]} \\ $h_{3}:$ [78] \item[90] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{3}:$ [79], [78] \\ $h_{6}:$ [16], [15] \end{gl} \end{bdl} \begin{bdl} \item[8/100] \mb{8/100} \begin{gl} \item[89] {\rm Sq(4)[81]} \\ $h_{2}:$ [81] \item[90] {\rm Sq(2)[83]} \\ $h_{1}:$ [83] \\ $h_{2}:$ [82] \\ $h_{3}:$ [78] \\ $h_{6}:$ [13] \item[91] {\rm Sq(2)[84]} \\ $h_{1}:$ [84] \item[92] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{3}:$ [78] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[7/100] \mb{7/100} \begin{gl} \item[86] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[6/100] \mb{6/100} \begin{gl} \item[82] {\rm Sq(5)[68]} \\ $h_{6}:$ [17] \item[83] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{1}:$ [69] \\ $h_{3}:$ [64] \\ $h_{4}:$ [60], [59] \\ $h_{5}:$ [41] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[5/100] \mb{5/100} \begin{gl} \item[70] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{4}:$ [46] \\ $h_{5}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[4/100] \mb{4/100} \begin{gl} \item[51] {\rm Sq(2,2)[35]} \\ $h_{4}:$ [34] \end{gl} \end{bdl} \dm{101} \begin{bdl} \item[45/101] \mb{45/101} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[44/101] \mb{44/101} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[43/101] \mb{43/101} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[42/101] \mb{42/101} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[41/101] \mb{41/101} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[40/101] \mb{40/101} \begin{gl} \item[15] {\rm Sq(3)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[39/101] \mb{39/101} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[38/101] \mb{38/101} \begin{gl} \item[15] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[37/101] \mb{37/101} \begin{gl} \item[18] {\rm Sq(0,1)[17]} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[36/101] \mb{36/101} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[35/101] \mb{35/101} \begin{gl} \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[34/101] \mb{34/101} \begin{gl} \item[20] {\rm Sq(3,1)[24]} \item[21] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[31/101] \mb{31/101} \begin{gl} \item[27] {\rm Sq(3)[27] + Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[29/101] \mb{29/101} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[28/101] \mb{28/101} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[27/101] \mb{27/101} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[26/101] \mb{26/101} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [39] \\ $h_{4}:$ [24] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{3}:$ [33] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[25/101] \mb{25/101} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45] + Sq(1)[43]} \\ $h_{0}:$ [45], [43] \\ $h_{2}:$ [38] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[24/101] \mb{24/101} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[45] + Sq(2)[44]} \\ $h_{1}:$ [45], [44] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[23/101] \mb{23/101} \begin{gl} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{3}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[22/101] \mb{22/101} \begin{gl} \item[49] {\rm Sq(0,1)[48]} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[21/101] \mb{21/101} \begin{gl} \item[50] {\rm Sq(0,1)[48]} \item[51] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[20/101] \mb{20/101} \begin{gl} \item[51] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[19/101] \mb{19/101} \begin{gl} \item[55] {\rm Sq(3,1)[59] + Sq(3,1)[58] + Sq(0,2)[58]} \item[56] {\rm Sq(0,1)[61]} \item[57] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/101] \mb{18/101} \begin{gl} \item[63] {\rm Sq(3)[63]} \item[64] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{5}:$ [26] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[17/101] \mb{17/101} \begin{gl} \item[65] {\rm Sq(3)[60] + Sq(0,1)[60]} \\ $h_{6}:$ [3] \item[66] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{6}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[16/101] \mb{16/101} \begin{gl} \item[62] {\rm Sq(1,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[15/101] \mb{15/101} \begin{gl} \item[64] {\rm Sq(3)[70] + Sq(0,1)[70]} \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[14/101] \mb{14/101} \begin{gl} \item[73] {\rm Sq(0,2)[64]} \end{gl} \end{bdl} \begin{bdl} \item[13/101] \mb{13/101} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{1}:$ [74], [73] \\ $h_{2}:$ [70], [69] \\ $h_{3}:$ [63] \\ $h_{4}:$ [48] \\ $h_{5}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[12/101] \mb{12/101} \begin{gl} \item[76] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[11/101] \mb{11/101} \begin{gl} \item[79] {\rm Sq(2,1)[76]} \item[80] {\rm Sq(5)[77] + Sq(2,1)[77] + Sq(5)[76]} \item[81] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [83] \\ $h_{3}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[10/101] \mb{10/101} \begin{gl} \item[85] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [77] \item[86] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{1}:$ [88] \\ $h_{2}:$ [85] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[9/101] \mb{9/101} \begin{gl} \item[91] {\rm Sq(3)[88] + Sq(0,1)[88]} \\ $h_{3}:$ [80] \item[92] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \\ $h_{2}:$ [87] \\ $h_{3}:$ [80] \item[93] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [80] \item[94] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [86] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[8/101] \mb{8/101} \begin{gl} \item[93] {\rm Sq(3)[84]} \item[94] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[7/101] \mb{7/101} \begin{gl} \item[87] {\rm Sq(3,1)[79]} \\ $h_{6}:$ [16] \item[88] {\rm Sq(3)[81] + Sq(0,1)[81]} \\ $h_{6}:$ [16] \item[89] {\rm Sq(2)[82]} \\ $h_{1}:$ [82] \\ $h_{2}:$ [80] \\ $h_{3}:$ [76] \\ $h_{4}:$ [70] \\ $h_{5}:$ [46] \\ $h_{6}:$ [17], [16] \end{gl} \end{bdl} \begin{bdl} \item[5/101] \mb{5/101} \begin{gl} \item[71] {\rm Sq(5,1)[50] + Sq(2,2)[50]} \\ $h_{6}:$ [16] \end{gl} \end{bdl} \dm{102} \begin{bdl} \item[50/102] \mb{50/102} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[49/102] \mb{49/102} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[48/102] \mb{48/102} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[41/102] \mb{41/102} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[40/102] \mb{40/102} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[39/102] \mb{39/102} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[38/102] \mb{38/102} \begin{gl} \item[16] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[37/102] \mb{37/102} \begin{gl} \item[20] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[36/102] \mb{36/102} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[35/102] \mb{35/102} \begin{gl} \item[18] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[34/102] \mb{34/102} \begin{gl} \item[22] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[33/102] \mb{33/102} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[32/102] \mb{32/102} \begin{gl} \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[31/102] \mb{31/102} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[30/102] \mb{30/102} \begin{gl} \item[29] {\rm Sq(3)[30]} \item[30] {\rm Sq(0,1)[31]} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[27/102] \mb{27/102} \begin{gl} \item[40] {\rm Sq(0,1)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[25/102] \mb{25/102} \begin{gl} \item[48] {\rm Sq(1)[47] + Sq(1)[46]} \\ $h_{0}:$ [47], [46] \\ $h_{1}:$ [44] \\ $h_{2}:$ [39] \\ $h_{3}:$ [34] \item[49] {\rm Sq(1)[48] + Sq(1)[46]} \\ $h_{0}:$ [48], [46] \\ $h_{1}:$ [44], [43] \\ $h_{2}:$ [41] \\ $h_{3}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[24/102] \mb{24/102} \begin{gl} \item[46] {\rm Sq(0,1)[44] + Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45] + Sq(3)[44] + Sq(0,1)[43]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \\ $h_{3}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[23/102] \mb{23/102} \begin{gl} \item[47] {\rm Sq(0,1)[48]} \item[48] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[22/102] \mb{22/102} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[21/102] \mb{21/102} \begin{gl} \item[52] {\rm Sq(0,1)[49]} \item[53] {\rm Sq(0,1)[50]} \item[54] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[20/102] \mb{20/102} \begin{gl} \item[52] {\rm Sq(0,1)[54]} \item[53] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[19/102] \mb{19/102} \begin{gl} \item[58] {\rm Sq(3)[62]} \item[59] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/102] \mb{18/102} \begin{gl} \item[65] {\rm Sq(0,1)[64]} \item[66] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{1}:$ [65] \\ $h_{4}:$ [50] \\ $h_{6}:$ [5], [4] \end{gl} \end{bdl} \begin{bdl} \item[17/102] \mb{17/102} \begin{gl} \item[67] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{6}:$ [4] \item[68] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [62] \\ $h_{6}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[16/102] \mb{16/102} \begin{gl} \item[63] {\rm Sq(0,2)[60]} \item[64] {\rm Sq(1,1)[63]} \\ $h_{6}:$ [5] \item[65] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{6}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[15/102] \mb{15/102} \begin{gl} \item[65] {\rm Sq(1,1)[71]} \end{gl} \end{bdl} \begin{bdl} \item[14/102] \mb{14/102} \begin{gl} \item[74] {\rm Sq(3)[74] + Sq(0,1)[74]} \item[75] {\rm Sq(1)[78] + Sq(1)[77]} \\ $h_{0}:$ [78], [77] \\ $h_{2}:$ [71] \\ $h_{5}:$ [35], [34] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[13/102] \mb{13/102} \begin{gl} \item[77] {\rm Sq(3)[73] + Sq(0,1)[73]} \item[78] {\rm Sq(3)[75] + Sq(0,1)[75] + Sq(0,1)[73]} \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[12/102] \mb{12/102} \begin{gl} \item[77] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{1}:$ [80], [79] \\ $h_{3}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[11/102] \mb{11/102} \begin{gl} \item[82] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{3}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[10/102] \mb{10/102} \begin{gl} \item[87] {\rm Sq(3)[88] + Sq(0,1)[88]} \\ $h_{6}:$ [18] \item[88] {\rm Sq(3)[89]} \item[89] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \\ $h_{2}:$ [86] \\ $h_{3}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[9/102] \mb{9/102} \begin{gl} \item[95] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [93] \\ $h_{3}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[8/102] \mb{8/102} \begin{gl} \item[95] {\rm Sq(3)[86] + Sq(0,1)[86]} \\ $h_{3}:$ [79] \item[96] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \\ $h_{2}:$ [83] \\ $h_{3}:$ [80] \\ $h_{4}:$ [74] \\ $h_{6}:$ [16] \item[97] {\rm Sq(2)[88]} \\ $h_{1}:$ [88] \\ $h_{2}:$ [85], [84], [83] \\ $h_{3}:$ [80] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[6/102] \mb{6/102} \begin{gl} \item[84] {\rm Sq(2)[71]} \\ $h_{1}:$ [71] \\ $h_{3}:$ [66] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \dm{103} \begin{bdl} \item[52/103] \mb{52/103} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[51/103] \mb{51/103} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[50/103] \mb{50/103} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[49/103] \mb{49/103} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[48/103] \mb{48/103} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[47/103] \mb{47/103} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[46/103] \mb{46/103} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[45/103] \mb{45/103} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[44/103] \mb{44/103} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[41/103] \mb{41/103} \begin{gl} \item[18] {\rm Sq(3)[16] + Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[38/103] \mb{38/103} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[36/103] \mb{36/103} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[35/103] \mb{35/103} \begin{gl} \item[20] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[32/103] \mb{32/103} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[31/103] \mb{31/103} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [31] \\ $h_{2}:$ [28] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[30/103] \mb{30/103} \begin{gl} \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [30] \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[29/103] \mb{29/103} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \item[35] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[28/103] \mb{28/103} \begin{gl} \item[35] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[27/103] \mb{27/103} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \\ $h_{4}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[26/103] \mb{26/103} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[25/103] \mb{25/103} \begin{gl} \item[50] {\rm Sq(3)[45] + Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[23/103] \mb{23/103} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[22/103] \mb{22/103} \begin{gl} \item[53] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[20/103] \mb{20/103} \begin{gl} \item[54] {\rm Sq(0,1)[56] + Sq(0,1)[55]} \item[55] {\rm Sq(2)[59] + Sq(2)[58]} \\ $h_{1}:$ [59], [58] \end{gl} \end{bdl} \begin{bdl} \item[19/103] \mb{19/103} \begin{gl} \item[60] {\rm Sq(2,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[15/103] \mb{15/103} \begin{gl} \item[66] {\rm Sq(0,1)[73]} \item[67] {\rm Sq(2)[74]} \\ $h_{1}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[14/103] \mb{14/103} \begin{gl} \item[76] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [78], [77] \\ $h_{2}:$ [74], [73] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[13/103] \mb{13/103} \begin{gl} \item[79] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [73] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[12/103] \mb{12/103} \begin{gl} \item[78] {\rm Sq(0,1)[80]} \\ $h_{6}:$ [9] \item[79] {\rm Sq(3)[80]} \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[11/103] \mb{11/103} \begin{gl} \item[83] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[10/103] \mb{10/103} \begin{gl} \item[90] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[9/103] \mb{9/103} \begin{gl} \item[96] {\rm Sq(3)[93] + Sq(0,1)[93]} \\ $h_{3}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[7/103] \mb{7/103} \begin{gl} \item[90] {\rm Sq(9)[78] + Sq(6,1)[78]} \item[91] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [84] \\ $h_{3}:$ [79] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[6/103] \mb{6/103} \begin{gl} \item[85] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{3}:$ [68] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[5/103] \mb{5/103} \begin{gl} \item[72] {\rm Sq(1,1)[51]} \\ $h_{6}:$ [19] \end{gl} \end{bdl} \dm{104} \begin{bdl} \item[51/104] \mb{51/104} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[50/104] \mb{50/104} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[45/104] \mb{45/104} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[44/104] \mb{44/104} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[43/104] \mb{43/104} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[42/104] \mb{42/104} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[40/104] \mb{40/104} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[37/104] \mb{37/104} \begin{gl} \item[21] {\rm Sq(0,1)[19]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[36/104] \mb{36/104} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[35/104] \mb{35/104} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[34/104] \mb{34/104} \begin{gl} \item[23] {\rm Sq(0,1)[26]} \item[24] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[31/104] \mb{31/104} \begin{gl} \item[31] {\rm Sq(3)[31] + Sq(0,1)[30] + Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[29/104] \mb{29/104} \begin{gl} \item[36] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[28/104] \mb{28/104} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[27/104] \mb{27/104} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[26/104] \mb{26/104} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[52] + Sq(1)[51]} \\ $h_{0}:$ [52], [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[25/104] \mb{25/104} \begin{gl} \item[51] {\rm Sq(0,1)[47]} \item[52] {\rm Sq(3)[48] + Sq(0,1)[48] + Sq(3)[46]} \end{gl} \end{bdl} \begin{bdl} \item[24/104] \mb{24/104} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[22/104] \mb{22/104} \begin{gl} \item[54] {\rm Sq(0,1)[52]} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[21/104] \mb{21/104} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{1}:$ [55] \\ $h_{2}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[20/104] \mb{20/104} \begin{gl} \item[56] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{2}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[19/104] \mb{19/104} \begin{gl} \item[61] {\rm Sq(0,1)[65]} \item[62] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/104] \mb{18/104} \begin{gl} \item[67] {\rm Sq(0,2)[62]} \item[68] {\rm Sq(3)[67] + Sq(0,1)[67]} \item[69] {\rm Sq(1)[70] + Sq(1)[69]} \\ $h_{0}:$ [70], [69] \\ $h_{2}:$ [66] \\ $h_{5}:$ [28] \\ $h_{6}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[17/104] \mb{17/104} \begin{gl} \item[69] {\rm Sq(3)[64]} \\ $h_{6}:$ [5] \item[70] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[16/104] \mb{16/104} \begin{gl} \item[66] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[14/104] \mb{14/104} \begin{gl} \item[77] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [68], [67] \end{gl} \end{bdl} \begin{bdl} \item[13/104] \mb{13/104} \begin{gl} \item[80] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{1}:$ [79], [78] \item[81] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{3}:$ [68], [67] \end{gl} \end{bdl} \begin{bdl} \item[12/104] \mb{12/104} \begin{gl} \item[80] {\rm Sq(2,1)[76]} \item[81] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [83] \\ $h_{2}:$ [80] \\ $h_{3}:$ [71] \\ $h_{6}:$ [10] \item[82] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{3}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[11/104] \mb{11/104} \begin{gl} \item[84] {\rm Sq(3)[87] + Sq(0,1)[87]} \\ $h_{3}:$ [76] \\ $h_{6}:$ [14] \item[85] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{3}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[10/104] \mb{10/104} \begin{gl} \item[91] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[9/104] \mb{9/104} \begin{gl} \item[97] {\rm Sq(1,1)[93]} \item[98] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [93] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[8/104] \mb{8/104} \begin{gl} \item[98] {\rm Sq(5)[86] + Sq(2,1)[86]} \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[6/104] \mb{6/104} \begin{gl} \item[86] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [72] \\ $h_{2}:$ [71] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[5/104] \mb{5/104} \begin{gl} \item[73] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[4/104] \mb{4/104} \begin{gl} \item[52] {\rm Sq(12)[35] + Sq(3,3)[35] + Sq(0,4)[35] + Sq(2,1,1)[35]} \\ $h_{6}:$ [19] \end{gl} \end{bdl} \dm{105} \begin{bdl} \item[53/105] \mb{53/105} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[52/105] \mb{52/105} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[51/105] \mb{51/105} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[50/105] \mb{50/105} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[49/105] \mb{49/105} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[48/105] \mb{48/105} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[43/105] \mb{43/105} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[42/105] \mb{42/105} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[39/105] \mb{39/105} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[36/105] \mb{36/105} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[35/105] \mb{35/105} \begin{gl} \item[22] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[34/105] \mb{34/105} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[33/105] \mb{33/105} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[32/105] \mb{32/105} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[31/105] \mb{31/105} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[30/105] \mb{30/105} \begin{gl} \item[34] {\rm Sq(3)[33]} \item[35] {\rm Sq(0,1)[34] + Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[27/105] \mb{27/105} \begin{gl} \item[43] {\rm Sq(0,1)[47] + Sq(0,1)[46]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[26/105] \mb{26/105} \begin{gl} \item[50] {\rm Sq(3)[50] + Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[24/105] \mb{24/105} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[23/105] \mb{23/105} \begin{gl} \item[51] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[21/105] \mb{21/105} \begin{gl} \item[57] {\rm Sq(1,1)[52]} \item[58] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[20/105] \mb{20/105} \begin{gl} \item[57] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[19/105] \mb{19/105} \begin{gl} \item[63] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[18/105] \mb{18/105} \begin{gl} \item[70] {\rm Sq(1,1)[67]} \item[71] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \\ $h_{2}:$ [67] \\ $h_{4}:$ [52] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[17/105] \mb{17/105} \begin{gl} \item[71] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{2}:$ [64] \\ $h_{6}:$ [6] \item[72] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [64] \\ $h_{6}:$ [6] \item[73] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{1}:$ [66] \\ $h_{2}:$ [65], [64] \end{gl} \end{bdl} \begin{bdl} \item[16/105] \mb{16/105} \begin{gl} \item[67] {\rm Sq(3)[67]} \\ $h_{6}:$ [6] \item[68] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{6}:$ [6] \item[69] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[15/105] \mb{15/105} \begin{gl} \item[68] {\rm Sq(1,1)[74]} \item[69] {\rm Sq(1,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[14/105] \mb{14/105} \begin{gl} \item[78] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [78], [77] \\ $h_{3}:$ [69] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[13/105] \mb{13/105} \begin{gl} \item[82] {\rm Sq(0,1)[79]} \\ $h_{3}:$ [70] \\ $h_{6}:$ [11] \item[83] {\rm Sq(2)[80]} \\ $h_{1}:$ [80] \\ $h_{3}:$ [70] \\ $h_{4}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[11/105] \mb{11/105} \begin{gl} \item[86] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{2}:$ [88] \\ $h_{3}:$ [78] \\ $h_{4}:$ [63] \item[87] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[10/105] \mb{10/105} \begin{gl} \item[92] {\rm Sq(1,1)[95]} \\ $h_{3}:$ [84] \item[93] {\rm Sq(3)[96]} \item[94] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [97] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[9/105] \mb{9/105} \begin{gl} \item[99] {\rm Sq(2,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[8/105] \mb{8/105} \begin{gl} \item[99] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[7/105] \mb{7/105} \begin{gl} \item[92] {\rm Sq(6)[82] + Sq(0,2)[82]} \end{gl} \end{bdl} \dm{106} \begin{bdl} \item[54/106] \mb{54/106} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[49/106] \mb{49/106} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[48/106] \mb{48/106} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[47/106] \mb{47/106} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[46/106] \mb{46/106} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[45/106] \mb{45/106} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[44/106] \mb{44/106} \begin{gl} \item[11] {\rm Sq(3)[9]} \end{gl} \end{bdl} \begin{bdl} \item[41/106] \mb{41/106} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[38/106] \mb{38/106} \begin{gl} \item[18] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[35/106] \mb{35/106} \begin{gl} \item[23] {\rm Sq(0,1)[24] + Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[32/106] \mb{32/106} \begin{gl} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[31/106] \mb{31/106} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[30/106] \mb{30/106} \begin{gl} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [33] \item[37] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[29/106] \mb{29/106} \begin{gl} \item[37] {\rm Sq(0,1)[36]} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[28/106] \mb{28/106} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[27/106] \mb{27/106} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[52] + Sq(1)[51]} \\ $h_{0}:$ [53], [52], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[26/106] \mb{26/106} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[25/106] \mb{25/106} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[24/106] \mb{24/106} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[23/106] \mb{23/106} \begin{gl} \item[52] {\rm Sq(0,1)[54]} \item[53] {\rm Sq(0,1)[55]} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[22/106] \mb{22/106} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[21/106] \mb{21/106} \begin{gl} \item[59] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[20/106] \mb{20/106} \begin{gl} \item[58] {\rm Sq(2,1)[58]} \item[59] {\rm Sq(2,1)[59]} \item[60] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[16/106] \mb{16/106} \begin{gl} \item[70] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[15/106] \mb{15/106} \begin{gl} \item[70] {\rm Sq(0,2)[73]} \item[71] {\rm Sq(3)[77] + Sq(0,1)[77]} \item[72] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[14/106] \mb{14/106} \begin{gl} \item[79] {\rm Sq(1,2)[74] + Sq(0,0,1)[74] + Sq(1,2)[73] + Sq(0,0,1)[73]} \item[80] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [83], [82] \\ $h_{2}:$ [79] \\ $h_{4}:$ [55], [54] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[13/106] \mb{13/106} \begin{gl} \item[84] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [79] \\ $h_{4}:$ [57] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[12/106] \mb{12/106} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \\ $h_{3}:$ [75] \\ $h_{6}:$ [11] \item[84] {\rm Sq(3)[84]} \\ $h_{4}:$ [61] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[10/106] \mb{10/106} \begin{gl} \item[95] {\rm Sq(3)[98] + Sq(0,1)[98]} \\ $h_{3}:$ [86] \item[96] {\rm Sq(2)[99]} \\ $h_{1}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[9/106] \mb{9/106} \begin{gl} \item[100] {\rm Sq(5)[95]} \item[101] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [88] \\ $h_{4}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[8/106] \mb{8/106} \begin{gl} \item[100] {\rm Sq(1,1)[90]} \\ $h_{3}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[6/106] \mb{6/106} \begin{gl} \item[87] {\rm Sq(1,2)[70] + Sq(0,0,1)[70]} \end{gl} \end{bdl} \dm{107} \begin{bdl} \item[55/107] \mb{55/107} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[54/107] \mb{54/107} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[53/107] \mb{53/107} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[45/107] \mb{45/107} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[44/107] \mb{44/107} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[43/107] \mb{43/107} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[40/107] \mb{40/107} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[37/107] \mb{37/107} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[36/107] \mb{36/107} \begin{gl} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[35/107] \mb{35/107} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[34/107] \mb{34/107} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[31/107] \mb{31/107} \begin{gl} \item[34] {\rm Sq(0,1)[35] + Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[29/107] \mb{29/107} \begin{gl} \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[28/107] \mb{28/107} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[27/107] \mb{27/107} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [52], [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43] \\ $h_{4}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[26/107] \mb{26/107} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [52], [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[25/107] \mb{25/107} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[24/107] \mb{24/107} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[23/107] \mb{23/107} \begin{gl} \item[55] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[22/107] \mb{22/107} \begin{gl} \item[58] {\rm Sq(0,1)[57]} \item[59] {\rm Sq(0,1)[58]} \item[60] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[21/107] \mb{21/107} \begin{gl} \item[60] {\rm Sq(0,1)[57]} \item[61] {\rm Sq(2)[58]} \\ $h_{1}:$ [58] \item[62] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[20/107] \mb{20/107} \begin{gl} \item[61] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \item[62] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[19/107] \mb{19/107} \begin{gl} \item[64] {\rm Sq(1,1)[69] + Sq(1,1)[68]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[18/107] \mb{18/107} \begin{gl} \item[72] {\rm Sq(1,1)[69]} \item[73] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [70], [69] \\ $h_{5}:$ [32], [30] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[17/107] \mb{17/107} \begin{gl} \item[74] {\rm Sq(1,1)[66]} \item[75] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [66] \\ $h_{5}:$ [32] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[16/107] \mb{16/107} \begin{gl} \item[71] {\rm Sq(0,1)[69] + Sq(0,1)[68]} \item[72] {\rm Sq(2)[71]} \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[14/107] \mb{14/107} \begin{gl} \item[81] {\rm Sq(0,2)[77]} \end{gl} \end{bdl} \begin{bdl} \item[13/107] \mb{13/107} \begin{gl} \item[85] {\rm Sq(1,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[12/107] \mb{12/107} \begin{gl} \item[85] {\rm Sq(2,2)[76] + Sq(1,0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[11/107] \mb{11/107} \begin{gl} \item[88] {\rm Sq(2)[95]} \\ $h_{1}:$ [95] \\ $h_{3}:$ [83] \item[89] {\rm Sq(2)[96]} \\ $h_{1}:$ [96] \\ $h_{6}:$ [15] \item[90] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [91] \\ $h_{3}:$ [82] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[10/107] \mb{10/107} \begin{gl} \item[97] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[9/107] \mb{9/107} \begin{gl} \item[102] {\rm Sq(7)[93] + Sq(4,1)[93] + Sq(1,2)[93] + Sq(0,0,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[8/107] \mb{8/107} \begin{gl} \item[101] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[7/107] \mb{7/107} \begin{gl} \item[93] {\rm Sq(3,1)[84]} \item[94] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{3}:$ [82] \\ $h_{4}:$ [74] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[6/107] \mb{6/107} \begin{gl} \item[88] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{4}:$ [63] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[5/107] \mb{5/107} \begin{gl} \item[74] {\rm Sq(1,1)[52]} \\ $h_{4}:$ [48] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \dm{108} \begin{bdl} \item[50/108] \mb{50/108} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[49/108] \mb{49/108} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[48/108] \mb{48/108} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[42/108] \mb{42/108} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[39/108] \mb{39/108} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[38/108] \mb{38/108} \begin{gl} \item[19] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[37/108] \mb{37/108} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[36/108] \mb{36/108} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[35/108] \mb{35/108} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[34/108] \mb{34/108} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[33/108] \mb{33/108} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \item[32] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[32/108] \mb{32/108} \begin{gl} \item[32] {\rm Sq(3,1)[30] + Sq(3,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[31/108] \mb{31/108} \begin{gl} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[30/108] \mb{30/108} \begin{gl} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(0,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[27/108] \mb{27/108} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[26/108] \mb{26/108} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[24/108] \mb{24/108} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(3)[54] + Sq(0,1)[54] + Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[23/108] \mb{23/108} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[22/108] \mb{22/108} \begin{gl} \item[61] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[62] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[21/108] \mb{21/108} \begin{gl} \item[63] {\rm Sq(0,1)[60] + Sq(3)[58]} \item[64] {\rm Sq(1)[64] + Sq(1)[63]} \\ $h_{0}:$ [64], [63] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[20/108] \mb{20/108} \begin{gl} \item[63] {\rm Sq(1,1)[63]} \item[64] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[19/108] \mb{19/108} \begin{gl} \item[67] {\rm Sq(2)[72]} \\ $h_{1}:$ [72] \\ $h_{3}:$ [63] \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{3}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/108] \mb{18/108} \begin{gl} \item[74] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[17/108] \mb{17/108} \begin{gl} \item[76] {\rm Sq(1,1)[68] + Sq(1,1)[67]} \item[77] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{1}:$ [71] \\ $h_{2}:$ [69], [68] \\ $h_{5}:$ [33] \\ $h_{6}:$ [8] \item[78] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [68] \\ $h_{6}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[16/108] \mb{16/108} \begin{gl} \item[73] {\rm Sq(0,1)[70]} \item[74] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [69], [68] \\ $h_{6}:$ [7] \item[75] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{2}:$ [68] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[15/108] \mb{15/108} \begin{gl} \item[73] {\rm Sq(0,1)[79]} \item[74] {\rm Sq(3)[79]} \end{gl} \end{bdl} \begin{bdl} \item[14/108] \mb{14/108} \begin{gl} \item[82] {\rm Sq(1,1)[83] + Sq(1,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[13/108] \mb{13/108} \begin{gl} \item[86] {\rm Sq(2)[85]} \\ $h_{1}:$ [85] \\ $h_{4}:$ [60] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[11/108] \mb{11/108} \begin{gl} \item[91] {\rm Sq(3)[96]} \item[92] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [93] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[10/108] \mb{10/108} \begin{gl} \item[98] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \\ $h_{2}:$ [99] \\ $h_{3}:$ [91] \\ $h_{6}:$ [20] \item[99] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[9/108] \mb{9/108} \begin{gl} \item[103] {\rm Sq(1,1)[99]} \\ $h_{3}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[7/108] \mb{7/108} \begin{gl} \item[95] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[6/108] \mb{6/108} \begin{gl} \item[89] {\rm Sq(3,1)[72]} \item[90] {\rm Sq(2)[74]} \\ $h_{1}:$ [74] \\ $h_{3}:$ [71] \\ $h_{4}:$ [64] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \dm{109} \begin{bdl} \item[49/109] \mb{49/109} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[48/109] \mb{48/109} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[47/109] \mb{47/109} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[44/109] \mb{44/109} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[41/109] \mb{41/109} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[38/109] \mb{38/109} \begin{gl} \item[20] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[37/109] \mb{37/109} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[36/109] \mb{36/109} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[35/109] \mb{35/109} \begin{gl} \item[27] {\rm Sq(0,1)[27] + Sq(3)[26]} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[34/109] \mb{34/109} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[33/109] \mb{33/109} \begin{gl} \item[33] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[34] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[32/109] \mb{32/109} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[31/109] \mb{31/109} \begin{gl} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[30/109] \mb{30/109} \begin{gl} \item[40] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [39] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[29/109] \mb{29/109} \begin{gl} \item[41] {\rm Sq(3)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [38] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[28/109] \mb{28/109} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[48] + Sq(2)[47]} \\ $h_{1}:$ [48], [47] \item[43] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[27/109] \mb{27/109} \begin{gl} \item[49] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[26/109] \mb{26/109} \begin{gl} \item[56] {\rm Sq(0,1)[56] + Sq(0,1)[55]} \item[57] {\rm Sq(3)[57] + Sq(0,1)[57] + Sq(0,1)[55]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[25/109] \mb{25/109} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[24/109] \mb{24/109} \begin{gl} \item[57] {\rm Sq(1)[60] + Sq(1)[59] + Sq(1)[58]} \\ $h_{0}:$ [60], [59], [58] \\ $h_{4}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[23/109] \mb{23/109} \begin{gl} \item[57] {\rm Sq(0,1)[58]} \item[58] {\rm Sq(3)[60] + Sq(0,1)[60] + Sq(0,1)[59]} \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \\ $h_{4}:$ [39] \item[60] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[22/109] \mb{22/109} \begin{gl} \item[63] {\rm Sq(0,1)[60]} \item[64] {\rm Sq(1)[66] + Sq(1)[65]} \\ $h_{0}:$ [66], [65] \\ $h_{2}:$ [59] \\ $h_{3}:$ [54] \item[65] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{2}:$ [59] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[21/109] \mb{21/109} \begin{gl} \item[65] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{2}:$ [58] \item[66] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \item[67] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [58] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[20/109] \mb{20/109} \begin{gl} \item[65] {\rm Sq(0,1)[64]} \item[66] {\rm Sq(0,1)[65]} \item[67] {\rm Sq(1)[70] + Sq(1)[69]} \\ $h_{0}:$ [70], [69] \\ $h_{3}:$ [58] \item[68] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[19/109] \mb{19/109} \begin{gl} \item[69] {\rm Sq(3,1)[68] + Sq(0,2)[67]} \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[18/109] \mb{18/109} \begin{gl} \item[75] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \item[76] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[17/109] \mb{17/109} \begin{gl} \item[79] {\rm Sq(5)[67]} \item[80] {\rm Sq(3)[72]} \end{gl} \end{bdl} \begin{bdl} \item[16/109] \mb{16/109} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{1}:$ [74] \\ $h_{2}:$ [72] \\ $h_{4}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[15/109] \mb{15/109} \begin{gl} \item[75] {\rm Sq(2)[82]} \\ $h_{1}:$ [82] \\ $h_{2}:$ [79] \\ $h_{6}:$ [10] \item[76] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [79] \item[77] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[14/109] \mb{14/109} \begin{gl} \item[83] {\rm Sq(7)[79] + Sq(4,1)[79] + Sq(1,2)[79] + Sq(0,0,1)[79]} \item[84] {\rm Sq(3,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[13/109] \mb{13/109} \begin{gl} \item[87] {\rm Sq(0,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[12/109] \mb{12/109} \begin{gl} \item[86] {\rm Sq(3,1)[85] + Sq(3,1)[84]} \item[87] {\rm Sq(3)[90] + Sq(0,1)[90] + Sq(3)[89]} \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[10/109] \mb{10/109} \begin{gl} \item[100] {\rm Sq(3)[102]} \item[101] {\rm Sq(1)[105] + Sq(1)[104]} \\ $h_{0}:$ [105], [104] \\ $h_{1}:$ [103] \\ $h_{2}:$ [100] \\ $h_{3}:$ [95] \\ $h_{4}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[9/109] \mb{9/109} \begin{gl} \item[104] {\rm Sq(5)[99] + Sq(2,1)[99]} \\ $h_{3}:$ [95] \\ $h_{6}:$ [20] \item[105] {\rm Sq(1,1)[100]} \\ $h_{4}:$ [80] \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[8/109] \mb{8/109} \begin{gl} \item[102] {\rm Sq(3)[94] + Sq(0,1)[94]} \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[5/109] \mb{5/109} \begin{gl} \item[75] {\rm Sq(10)[51] + Sq(7,1)[51] + Sq(4,2)[51] + Sq(3,0,1)[51]} \end{gl} \end{bdl} \dm{110} \begin{bdl} \item[54/110] \mb{54/110} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[53/110] \mb{53/110} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[52/110] \mb{52/110} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[51/110] \mb{51/110} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[50/110] \mb{50/110} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[49/110] \mb{49/110} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[48/110] \mb{48/110} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[47/110] \mb{47/110} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[46/110] \mb{46/110} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[43/110] \mb{43/110} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[40/110] \mb{40/110} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[39/110] \mb{39/110} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[37/110] \mb{37/110} \begin{gl} \item[26] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[36/110] \mb{36/110} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[35/110] \mb{35/110} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[34/110] \mb{34/110} \begin{gl} \item[31] {\rm Sq(0,1)[31] + Sq(3)[30] + Sq(0,1)[30]} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32] + Sq(3)[30]} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[31/110] \mb{31/110} \begin{gl} \item[37] {\rm Sq(0,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[29/110] \mb{29/110} \begin{gl} \item[44] {\rm Sq(1)[45] + Sq(1)[44]} \\ $h_{0}:$ [45], [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[28/110] \mb{28/110} \begin{gl} \item[44] {\rm Sq(0,1)[48]} \item[45] {\rm Sq(3)[48] + Sq(3)[47] + Sq(0,1)[47]} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{4}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[27/110] \mb{27/110} \begin{gl} \item[50] {\rm Sq(0,1)[55]} \item[51] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[26/110] \mb{26/110} \begin{gl} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{4}:$ [37], [36] \end{gl} \end{bdl} \begin{bdl} \item[25/110] \mb{25/110} \begin{gl} \item[60] {\rm Sq(0,1)[55]} \item[61] {\rm Sq(0,1)[56]} \item[62] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[24/110] \mb{24/110} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{4}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[23/110] \mb{23/110} \begin{gl} \item[61] {\rm Sq(3)[62] + Sq(0,1)[62]} \item[62] {\rm Sq(1)[68] + Sq(1)[66]} \\ $h_{0}:$ [68], [66] \\ $h_{4}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[22/110] \mb{22/110} \begin{gl} \item[66] {\rm Sq(1,1)[62] + Sq(1,1)[60]} \item[67] {\rm Sq(0,1)[63]} \item[68] {\rm Sq(1)[70] + Sq(1)[69]} \\ $h_{0}:$ [70], [69] \\ $h_{4}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[21/110] \mb{21/110} \begin{gl} \item[68] {\rm Sq(0,1)[63]} \item[69] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{1}:$ [65] \\ $h_{2}:$ [61] \item[70] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{1}:$ [65] \\ $h_{2}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[20/110] \mb{20/110} \begin{gl} \item[69] {\rm Sq(1)[73] + Sq(1)[72]} \\ $h_{0}:$ [73], [72] \\ $h_{2}:$ [64] \item[70] {\rm Sq(1)[74] + Sq(1)[72]} \\ $h_{0}:$ [74], [72] \\ $h_{2}:$ [64] \item[71] {\rm Sq(1)[75] + Sq(1)[72]} \\ $h_{0}:$ [75], [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[19/110] \mb{19/110} \begin{gl} \item[72] {\rm Sq(1,1)[73]} \item[73] {\rm Sq(3)[74] + Sq(0,1)[74]} \item[74] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \item[75] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[18/110] \mb{18/110} \begin{gl} \item[77] {\rm Sq(3,1)[72]} \item[78] {\rm Sq(3)[76]} \item[79] {\rm Sq(2)[79]} \\ $h_{1}:$ [79] \item[80] {\rm Sq(1)[82] + Sq(1)[81]} \\ $h_{0}:$ [82], [81] \\ $h_{2}:$ [75] \\ $h_{5}:$ [37], [35] \\ $h_{6}:$ [12], [11] \end{gl} \end{bdl} \begin{bdl} \item[17/110] \mb{17/110} \begin{gl} \item[81] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [71] \\ $h_{5}:$ [35] \\ $h_{6}:$ [10] \item[82] {\rm Sq(1)[80] + Sq(1)[79] + Sq(1)[77]} \\ $h_{0}:$ [80], [79], [77] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[16/110] \mb{16/110} \begin{gl} \item[77] {\rm Sq(2,1)[71]} \item[78] {\rm Sq(0,1)[73]} \item[79] {\rm Sq(3)[74] + Sq(0,1)[74]} \item[80] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[15/110] \mb{15/110} \begin{gl} \item[78] {\rm Sq(0,1)[82]} \item[79] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[14/110] \mb{14/110} \begin{gl} \item[85] {\rm Sq(4)[85]} \\ $h_{2}:$ [85] \\ $h_{5}:$ [42] \item[86] {\rm Sq(3)[86]} \\ $h_{6}:$ [15] \item[87] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[13/110] \mb{13/110} \begin{gl} \item[88] {\rm Sq(1,1)[85]} \item[89] {\rm Sq(2)[86]} \\ $h_{1}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[11/110] \mb{11/110} \begin{gl} \item[93] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [100] \\ $h_{2}:$ [97] \\ $h_{4}:$ [73] \\ $h_{6}:$ [16] \item[94] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{1}:$ [100] \\ $h_{3}:$ [90] \\ $h_{4}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[10/110] \mb{10/110} \begin{gl} \item[102] {\rm Sq(1,1)[102]} \item[103] {\rm Sq(4)[102]} \\ $h_{2}:$ [102] \item[104] {\rm Sq(3)[103] + Sq(0,1)[103]} \\ $h_{3}:$ [96] \end{gl} \end{bdl} \begin{bdl} \item[9/110] \mb{9/110} \begin{gl} \item[106] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[8/110] \mb{8/110} \begin{gl} \item[103] {\rm Sq(1,1)[93]} \\ $h_{3}:$ [90] \\ $h_{4}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[7/110] \mb{7/110} \begin{gl} \item[96] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [88] \\ $h_{3}:$ [85] \\ $h_{4}:$ [78] \\ $h_{6}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[6/110] \mb{6/110} \begin{gl} \item[91] {\rm Sq(4)[74]} \\ $h_{2}:$ [74] \\ $h_{3}:$ [72] \\ $h_{4}:$ [67] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \dm{111} \begin{bdl} \item[56/111] \mb{56/111} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[55/111] \mb{55/111} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[54/111] \mb{54/111} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[53/111] \mb{53/111} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[52/111] \mb{52/111} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[51/111] \mb{51/111} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[50/111] \mb{50/111} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[49/111] \mb{49/111} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[48/111] \mb{48/111} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[47/111] \mb{47/111} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[46/111] \mb{46/111} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[45/111] \mb{45/111} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[42/111] \mb{42/111} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[40/111] \mb{40/111} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[39/111] \mb{39/111} \begin{gl} \item[19] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[36/111] \mb{36/111} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[35/111] \mb{35/111} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [32] \\ $h_{2}:$ [28] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [33] \\ $h_{2}:$ [29], [28] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[34/111] \mb{34/111} \begin{gl} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[33/111] \mb{33/111} \begin{gl} \item[35] {\rm Sq(3)[33]} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[32/111] \mb{32/111} \begin{gl} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[31/111] \mb{31/111} \begin{gl} \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[30/111] \mb{30/111} \begin{gl} \item[42] {\rm Sq(0,1)[41]} \item[43] {\rm Sq(0,1)[42] + Sq(3)[41]} \end{gl} \end{bdl} \begin{bdl} \item[29/111] \mb{29/111} \begin{gl} \item[46] {\rm Sq(3)[43] + Sq(0,1)[43] + Sq(3)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[27/111] \mb{27/111} \begin{gl} \item[52] {\rm Sq(0,1)[56]} \item[53] {\rm Sq(3)[58] + Sq(0,1)[58] + Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[26/111] \mb{26/111} \begin{gl} \item[60] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[24/111] \mb{24/111} \begin{gl} \item[60] {\rm Sq(0,1)[58] + Sq(0,1)[57]} \item[61] {\rm Sq(3)[60] + Sq(0,1)[60] + Sq(3)[59] + Sq(0,1)[59] + Sq(3)[58]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[23/111] \mb{23/111} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[21/111] \mb{21/111} \begin{gl} \item[71] {\rm Sq(3)[65]} \item[72] {\rm Sq(3)[68] + Sq(0,1)[68] + Sq(3)[67] + Sq(0,1)[67] + Sq(0,1)[66] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[19/111] \mb{19/111} \begin{gl} \item[76] {\rm Sq(2)[79]} \\ $h_{1}:$ [79] \\ $h_{3}:$ [68] \item[77] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [78], [77] \\ $h_{2}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[18/111] \mb{18/111} \begin{gl} \item[81] {\rm Sq(1,1)[78] + Sq(1,1)[77] + Sq(4)[76] + Sq(1,1)[76]} \\ $h_{2}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[17/111] \mb{17/111} \begin{gl} \item[83] {\rm Sq(2)[79] + Sq(2)[77]} \\ $h_{1}:$ [79], [77] \item[84] {\rm Sq(1)[83] + Sq(1)[81]} \\ $h_{0}:$ [83], [81] \\ $h_{1}:$ [78] \\ $h_{2}:$ [74] \\ $h_{5}:$ [37] \\ $h_{6}:$ [12] \item[85] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [78] \\ $h_{2}:$ [75], [74] \\ $h_{4}:$ [58] \\ $h_{5}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[16/111] \mb{16/111} \begin{gl} \item[81] {\rm Sq(1,1)[74] + Sq(1,1)[73]} \item[82] {\rm Sq(2)[78]} \\ $h_{1}:$ [78] \item[83] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{2}:$ [73] \\ $h_{6}:$ [10] \item[84] {\rm Sq(1)[82] + Sq(1)[81]} \\ $h_{0}:$ [82], [81] \\ $h_{2}:$ [74], [73] \\ $h_{4}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[15/111] \mb{15/111} \begin{gl} \item[80] {\rm Sq(3,1)[79] + Sq(0,2)[79]} \item[81] {\rm Sq(0,1)[84] + Sq(3)[83]} \item[82] {\rm Sq(3)[84]} \item[83] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [87], [86] \\ $h_{2}:$ [82] \\ $h_{5}:$ [42] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[14/111] \mb{14/111} \begin{gl} \item[88] {\rm Sq(0,1)[87]} \item[89] {\rm Sq(2)[88]} \\ $h_{1}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[13/111] \mb{13/111} \begin{gl} \item[90] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{3}:$ [82], [80] \\ $h_{4}:$ [64] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[12/111] \mb{12/111} \begin{gl} \item[88] {\rm Sq(4)[91]} \\ $h_{2}:$ [91] \item[89] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[11/111] \mb{11/111} \begin{gl} \item[95] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \item[96] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{3}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[10/111] \mb{10/111} \begin{gl} \item[105] {\rm Sq(1)[109] + Sq(1)[107]} \\ $h_{0}:$ [109], [107] \\ $h_{3}:$ [97] \item[106] {\rm Sq(1)[110] + Sq(1)[108] + Sq(1)[107]} \\ $h_{0}:$ [110], [108], [107] \\ $h_{1}:$ [106] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[9/111] \mb{9/111} \begin{gl} \item[107] {\rm Sq(3,1)[100]} \\ $h_{3}:$ [98] \\ $h_{4}:$ [83] \item[108] {\rm Sq(5)[101] + Sq(2,1)[101]} \item[109] {\rm Sq(3)[102]} \\ $h_{3}:$ [98] \\ $h_{4}:$ [83] \item[110] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{3}:$ [98] \\ $h_{4}:$ [83] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[8/111] \mb{8/111} \begin{gl} \item[104] {\rm Sq(5)[94] + Sq(2,1)[94]} \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[5/111] \mb{5/111} \begin{gl} \item[76] {\rm Sq(8)[52] + Sq(2,2)[52] + Sq(1,0,1)[52]} \\ $h_{3}:$ [52] \\ $h_{5}:$ [40] \\ $h_{6}:$ [24] \end{gl} \end{bdl} \dm{112} \begin{bdl} \item[55/112] \mb{55/112} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[54/112] \mb{54/112} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[49/112] \mb{49/112} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[48/112] \mb{48/112} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[47/112] \mb{47/112} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[46/112] \mb{46/112} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[44/112] \mb{44/112} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[41/112] \mb{41/112} \begin{gl} \item[21] {\rm Sq(0,1)[20]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[40/112] \mb{40/112} \begin{gl} \item[22] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[39/112] \mb{39/112} \begin{gl} \item[20] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[38/112] \mb{38/112} \begin{gl} \item[21] {\rm Sq(1,1)[25]} \item[22] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[35/112] \mb{35/112} \begin{gl} \item[32] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[33/112] \mb{33/112} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[32/112] \mb{32/112} \begin{gl} \item[36] {\rm Sq(1,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[31/112] \mb{31/112} \begin{gl} \item[39] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [42] \\ $h_{2}:$ [40] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[30/112] \mb{30/112} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \item[45] {\rm Sq(1)[48] + Sq(1)[47]} \\ $h_{0}:$ [48], [47] \\ $h_{2}:$ [41] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[29/112] \mb{29/112} \begin{gl} \item[47] {\rm Sq(0,1)[44]} \item[48] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[28/112] \mb{28/112} \begin{gl} \item[47] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[26/112] \mb{26/112} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[25/112] \mb{25/112} \begin{gl} \item[63] {\rm Sq(0,1)[58]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [62], [61], [60] \end{gl} \end{bdl} \begin{bdl} \item[24/112] \mb{24/112} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[23/112] \mb{23/112} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(0,1)[67]} \item[66] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[22/112] \mb{22/112} \begin{gl} \item[69] {\rm Sq(1,1)[67] + Sq(1,1)[66]} \item[70] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[21/112] \mb{21/112} \begin{gl} \item[73] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[20/112] \mb{20/112} \begin{gl} \item[72] {\rm Sq(0,1)[73] + Sq(0,1)[72]} \item[73] {\rm Sq(3)[74] + Sq(0,1)[74] + Sq(3)[73]} \end{gl} \end{bdl} \begin{bdl} \item[18/112] \mb{18/112} \begin{gl} \item[82] {\rm Sq(1,1)[79]} \item[83] {\rm Sq(3)[82] + Sq(0,1)[82]} \item[84] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [83] \\ $h_{3}:$ [72], [71] \end{gl} \end{bdl} \begin{bdl} \item[17/112] \mb{17/112} \begin{gl} \item[86] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{3}:$ [68], [67] \item[87] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[16/112] \mb{16/112} \begin{gl} \item[85] {\rm Sq(1,1)[77]} \\ $h_{3}:$ [68] \item[86] {\rm Sq(0,1)[78]} \item[87] {\rm Sq(1)[85] + Sq(1)[84]} \\ $h_{0}:$ [85], [84] \\ $h_{1}:$ [81], [80] \\ $h_{2}:$ [77], [76] \item[88] {\rm Sq(1)[87] + Sq(1)[84]} \\ $h_{0}:$ [87], [84] \\ $h_{1}:$ [82] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[15/112] \mb{15/112} \begin{gl} \item[84] {\rm Sq(4)[84] + Sq(4)[83] + Sq(1,1)[83]} \\ $h_{2}:$ [84], [83] \item[85] {\rm Sq(3)[87] + Sq(3)[86]} \item[86] {\rm Sq(2)[88]} \\ $h_{1}:$ [88] \\ $h_{6}:$ [13] \item[87] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[14/112] \mb{14/112} \begin{gl} \item[90] {\rm Sq(2,1)[86]} \item[91] {\rm Sq(3)[89] + Sq(3)[88]} \end{gl} \end{bdl} \begin{bdl} \item[13/112] \mb{13/112} \begin{gl} \item[91] {\rm Sq(0,2)[85]} \item[92] {\rm Sq(1,1)[87] + Sq(4)[86]} \\ $h_{2}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[12/112] \mb{12/112} \begin{gl} \item[90] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{1}:$ [95] \\ $h_{4}:$ [71] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[11/112] \mb{11/112} \begin{gl} \item[97] {\rm Sq(0,1)[102]} \\ $h_{4}:$ [76] \item[98] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{2}:$ [100] \end{gl} \end{bdl} \begin{bdl} \item[10/112] \mb{10/112} \begin{gl} \item[107] {\rm Sq(6)[102] + Sq(0,2)[102]} \item[108] {\rm Sq(2)[109] + Sq(2)[107]} \\ $h_{1}:$ [109], [107] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[8/112] \mb{8/112} \begin{gl} \item[105] {\rm Sq(3,1)[93]} \\ $h_{3}:$ [92] \\ $h_{4}:$ [81] \item[106] {\rm Sq(3,1)[94] + Sq(6)[93] + Sq(0,2)[93]} \item[107] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[7/112] \mb{7/112} \begin{gl} \item[97] {\rm Sq(5)[89] + Sq(2,1)[89]} \end{gl} \end{bdl} \dm{113} \begin{bdl} \item[57/113] \mb{57/113} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[56/113] \mb{56/113} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[55/113] \mb{55/113} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[54/113] \mb{54/113} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[53/113] \mb{53/113} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[52/113] \mb{52/113} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[47/113] \mb{47/113} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[46/113] \mb{46/113} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[43/113] \mb{43/113} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[40/113] \mb{40/113} \begin{gl} \item[23] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[39/113] \mb{39/113} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[38/113] \mb{38/113} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[37/113] \mb{37/113} \begin{gl} \item[27] {\rm Sq(1,1)[28]} \item[28] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[36/113] \mb{36/113} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[35/113] \mb{35/113} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[34/113] \mb{34/113} \begin{gl} \item[36] {\rm Sq(0,1)[35]} \item[37] {\rm Sq(0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[31/113] \mb{31/113} \begin{gl} \item[40] {\rm Sq(0,1)[43] + Sq(0,1)[42]} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[30/113] \mb{30/113} \begin{gl} \item[46] {\rm Sq(3)[46] + Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[28/113] \mb{28/113} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \item[49] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[27/113] \mb{27/113} \begin{gl} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[25/113] \mb{25/113} \begin{gl} \item[65] {\rm Sq(0,1)[60]} \item[66] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[24/113] \mb{24/113} \begin{gl} \item[64] {\rm Sq(0,1)[63]} \item[65] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[23/113] \mb{23/113} \begin{gl} \item[67] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \item[68] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[22/113] \mb{22/113} \begin{gl} \item[71] {\rm Sq(1,1)[69]} \item[72] {\rm Sq(0,1)[72] + Sq(0,1)[71]} \item[73] {\rm Sq(1)[76] + Sq(1)[74]} \\ $h_{0}:$ [76], [74] \\ $h_{3}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[21/113] \mb{21/113} \begin{gl} \item[74] {\rm Sq(1,1)[71] + Sq(1,1)[70] + Sq(1,1)[69]} \item[75] {\rm Sq(1)[75] + Sq(1)[74]} \\ $h_{0}:$ [75], [74] \\ $h_{1}:$ [72] \\ $h_{2}:$ [69] \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[20/113] \mb{20/113} \begin{gl} \item[74] {\rm Sq(3)[76]} \\ $h_{6}:$ [7] \item[75] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [73], [72] \\ $h_{6}:$ [7] \item[76] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \item[77] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [75], [74] \\ $h_{6}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[19/113] \mb{19/113} \begin{gl} \item[78] {\rm Sq(1,1)[80] + Sq(1,1)[78]} \item[79] {\rm Sq(2)[83]} \\ $h_{1}:$ [83] \item[80] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \item[81] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [78], [77] \end{gl} \end{bdl} \begin{bdl} \item[18/113] \mb{18/113} \begin{gl} \item[85] {\rm Sq(2,1)[80] + Sq(5)[79] + Sq(2,1)[79]} \item[86] {\rm Sq(1,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[17/113] \mb{17/113} \begin{gl} \item[88] {\rm Sq(3)[82] + Sq(0,1)[81]} \item[89] {\rm Sq(3)[84] + Sq(0,1)[84] + Sq(3)[83] + Sq(0,1)[83] + Sq(3)[81]} \\ $h_{2}:$ [79] \item[90] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{1}:$ [86] \\ $h_{2}:$ [78] \\ $h_{5}:$ [38] \\ $h_{6}:$ [13] \item[91] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{1}:$ [86], [85] \\ $h_{2}:$ [78], [77] \\ $h_{3}:$ [70] \\ $h_{5}:$ [38] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[16/113] \mb{16/113} \begin{gl} \item[89] {\rm Sq(0,1)[80]} \item[90] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{3}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[15/113] \mb{15/113} \begin{gl} \item[88] {\rm Sq(3)[89] + Sq(3)[88] + Sq(0,1)[88]} \\ $h_{3}:$ [79] \item[89] {\rm Sq(2)[90]} \\ $h_{1}:$ [90] \\ $h_{2}:$ [85] \\ $h_{3}:$ [79] \\ $h_{4}:$ [67] \\ $h_{5}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[14/113] \mb{14/113} \begin{gl} \item[92] {\rm Sq(4)[88]} \\ $h_{2}:$ [88] \item[93] {\rm Sq(1)[94] + Sq(1)[93]} \\ $h_{0}:$ [94], [93] \\ $h_{1}:$ [91] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[13/113] \mb{13/113} \begin{gl} \item[93] {\rm Sq(4,1)[85] + Sq(1,2)[85] + Sq(0,0,1)[85]} \item[94] {\rm Sq(2,1)[87] + Sq(2,1)[86]} \end{gl} \end{bdl} \begin{bdl} \item[12/113] \mb{12/113} \begin{gl} \item[91] {\rm Sq(3)[95]} \end{gl} \end{bdl} \begin{bdl} \item[11/113] \mb{11/113} \begin{gl} \item[99] {\rm Sq(2)[107]} \\ $h_{1}:$ [107] \\ $h_{2}:$ [103] \\ $h_{6}:$ [17] \item[100] {\rm Sq(2)[108]} \\ $h_{1}:$ [108] \\ $h_{3}:$ [96], [95] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[10/113] \mb{10/113} \begin{gl} \item[109] {\rm Sq(0,1)[109] + Sq(0,1)[107]} \end{gl} \end{bdl} \begin{bdl} \item[9/113] \mb{9/113} \begin{gl} \item[111] {\rm Sq(2,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[7/113] \mb{7/113} \begin{gl} \item[98] {\rm Sq(6)[89] + Sq(3,1)[89] + Sq(0,2)[89]} \\ $h_{3}:$ [87] \item[99] {\rm Sq(6)[90] + Sq(3,1)[90] + Sq(0,2)[90]} \\ $h_{3}:$ [87] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \dm{114} \begin{bdl} \item[58/114] \mb{58/114} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[53/114] \mb{53/114} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[52/114] \mb{52/114} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[51/114] \mb{51/114} \begin{gl} \item[7] {\rm Sq(1,1)[10] + Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[50/114] \mb{50/114} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[49/114] \mb{49/114} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[48/114] \mb{48/114} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[45/114] \mb{45/114} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[42/114] \mb{42/114} \begin{gl} \item[17] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[39/114] \mb{39/114} \begin{gl} \item[22] {\rm Sq(0,1)[22] + Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[36/114] \mb{36/114} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[35/114] \mb{35/114} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[34/114] \mb{34/114} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[33/114] \mb{33/114} \begin{gl} \item[39] {\rm Sq(3)[36]} \item[40] {\rm Sq(0,1)[37] + Sq(0,1)[36]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[32/114] \mb{32/114} \begin{gl} \item[38] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[30/114] \mb{30/114} \begin{gl} \item[47] {\rm Sq(0,1)[47]} \item[48] {\rm Sq(3)[48] + Sq(3)[47]} \end{gl} \end{bdl} \begin{bdl} \item[29/114] \mb{29/114} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[27/114] \mb{27/114} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[26/114] \mb{26/114} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[24/114] \mb{24/114} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[23/114] \mb{23/114} \begin{gl} \item[69] {\rm Sq(0,1)[70] + Sq(0,1)[69]} \item[70] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{1}:$ [71] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[22/114] \mb{22/114} \begin{gl} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{3}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[21/114] \mb{21/114} \begin{gl} \item[77] {\rm Sq(0,1)[73] + Sq(0,1)[72]} \item[78] {\rm Sq(1)[80] + Sq(1)[78]} \\ $h_{0}:$ [80], [78] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[20/114] \mb{20/114} \begin{gl} \item[78] {\rm Sq(3,1)[71] + Sq(0,2)[69]} \item[79] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [79] \\ $h_{3}:$ [64] \item[80] {\rm Sq(1)[85] + Sq(1)[83]} \\ $h_{0}:$ [85], [83] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[19/114] \mb{19/114} \begin{gl} \item[82] {\rm Sq(2)[85]} \\ $h_{1}:$ [85] \item[83] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [86] \\ $h_{2}:$ [81] \item[84] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \item[85] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{1}:$ [86] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[18/114] \mb{18/114} \begin{gl} \item[87] {\rm Sq(5)[81] + Sq(2,1)[81]} \item[88] {\rm Sq(1,1)[84]} \item[89] {\rm Sq(1,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[17/114] \mb{17/114} \begin{gl} \item[92] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{1}:$ [89] \\ $h_{2}:$ [83], [81] \\ $h_{5}:$ [40] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[16/114] \mb{16/114} \begin{gl} \item[91] {\rm Sq(3)[86]} \\ $h_{2}:$ [80] \\ $h_{5}:$ [41] \\ $h_{6}:$ [12] \item[92] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [81] \\ $h_{5}:$ [41] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[15/114] \mb{15/114} \begin{gl} \item[90] {\rm Sq(2,1)[86]} \item[91] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[14/114] \mb{14/114} \begin{gl} \item[94] {\rm Sq(0,1)[91]} \item[95] {\rm Sq(3)[91]} \item[96] {\rm Sq(2)[94] + Sq(2)[93]} \\ $h_{1}:$ [94], [93] \end{gl} \end{bdl} \begin{bdl} \item[12/114] \mb{12/114} \begin{gl} \item[92] {\rm Sq(0,1)[97]} \item[93] {\rm Sq(3)[97]} \end{gl} \end{bdl} \begin{bdl} \item[10/114] \mb{10/114} \begin{gl} \item[110] {\rm Sq(4)[109] + Sq(4)[107]} \\ $h_{2}:$ [109], [107] \\ $h_{3}:$ [102] \\ $h_{4}:$ [86] \\ $h_{6}:$ [23] \item[111] {\rm Sq(2)[111]} \\ $h_{1}:$ [111] \\ $h_{2}:$ [108] \\ $h_{4}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[9/114] \mb{9/114} \begin{gl} \item[112] {\rm Sq(3)[105] + Sq(0,1)[105]} \\ $h_{2}:$ [104] \\ $h_{6}:$ [24] \item[113] {\rm Sq(3)[107] + Sq(0,1)[107] + Sq(3)[106] + Sq(0,1)[106]} \\ $h_{2}:$ [104] \\ $h_{6}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[6/114] \mb{6/114} \begin{gl} \item[92] {\rm Sq(6)[75] + Sq(3,1)[75] + Sq(0,2)[75]} \end{gl} \end{bdl} \dm{115} \begin{bdl} \item[59/115] \mb{59/115} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[58/115] \mb{58/115} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[57/115] \mb{57/115} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[49/115] \mb{49/115} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[48/115] \mb{48/115} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[47/115] \mb{47/115} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[44/115] \mb{44/115} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[41/115] \mb{41/115} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[40/115] \mb{40/115} \begin{gl} \item[24] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[39/115] \mb{39/115} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[38/115] \mb{38/115} \begin{gl} \item[24] {\rm Sq(3)[27]} \item[25] {\rm Sq(0,1)[28] + Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[36/115] \mb{36/115} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[35/115] \mb{35/115} \begin{gl} \item[35] {\rm Sq(0,1)[37] + Sq(0,1)[36]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[34/115] \mb{34/115} \begin{gl} \item[40] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[33/115] \mb{33/115} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [32] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[32/115] \mb{32/115} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[31/115] \mb{31/115} \begin{gl} \item[42] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[29/115] \mb{29/115} \begin{gl} \item[50] {\rm Sq(0,1)[48]} \item[51] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[28/115] \mb{28/115} \begin{gl} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[26/115] \mb{26/115} \begin{gl} \item[64] {\rm Sq(0,1)[65]} \item[65] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[25/115] \mb{25/115} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(3)[65] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[24/115] \mb{24/115} \begin{gl} \item[68] {\rm Sq(1)[73] + Sq(1)[71]} \\ $h_{0}:$ [73], [71] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[23/115] \mb{23/115} \begin{gl} \item[71] {\rm Sq(0,1)[71]} \item[72] {\rm Sq(0,1)[72]} \item[73] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[22/115] \mb{22/115} \begin{gl} \item[75] {\rm Sq(1,1)[73]} \item[76] {\rm Sq(0,1)[74]} \end{gl} \end{bdl} \begin{bdl} \item[21/115] \mb{21/115} \begin{gl} \item[79] {\rm Sq(1)[84] + Sq(1)[82]} \\ $h_{0}:$ [84], [82] \\ $h_{2}:$ [72] \\ $h_{3}:$ [64], [63] \end{gl} \end{bdl} \begin{bdl} \item[20/115] \mb{20/115} \begin{gl} \item[81] {\rm Sq(3)[79] + Sq(0,1)[78]} \item[82] {\rm Sq(3)[80] + Sq(0,1)[80] + Sq(0,1)[78]} \item[83] {\rm Sq(2)[82]} \\ $h_{1}:$ [82] \item[84] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{3}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[19/115] \mb{19/115} \begin{gl} \item[86] {\rm Sq(3)[85]} \item[87] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{3}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[18/115] \mb{18/115} \begin{gl} \item[90] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{3}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[17/115] \mb{17/115} \begin{gl} \item[93] {\rm Sq(0,1)[89]} \item[94] {\rm Sq(3)[89]} \end{gl} \end{bdl} \begin{bdl} \item[16/115] \mb{16/115} \begin{gl} \item[93] {\rm Sq(1,1)[87] + Sq(1,1)[86] + Sq(1,1)[85]} \item[94] {\rm Sq(2)[90]} \\ $h_{1}:$ [90] \\ $h_{2}:$ [85], [84] \end{gl} \end{bdl} \begin{bdl} \item[15/115] \mb{15/115} \begin{gl} \item[92] {\rm Sq(2)[96] + Sq(2)[94]} \\ $h_{1}:$ [96], [94] \\ $h_{3}:$ [82] \\ $h_{6}:$ [14] \item[93] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[14/115] \mb{14/115} \begin{gl} \item[97] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \item[98] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [92] \\ $h_{4}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[13/115] \mb{13/115} \begin{gl} \item[95] {\rm Sq(0,0,1)[86]} \item[96] {\rm Sq(3)[91]} \end{gl} \end{bdl} \begin{bdl} \item[11/115] \mb{11/115} \begin{gl} \item[101] {\rm Sq(0,1)[109]} \end{gl} \end{bdl} \begin{bdl} \item[10/115] \mb{10/115} \begin{gl} \item[112] {\rm Sq(2)[113] + Sq(2)[112]} \\ $h_{1}:$ [113], [112] \\ $h_{3}:$ [103] \end{gl} \end{bdl} \begin{bdl} \item[9/115] \mb{9/115} \begin{gl} \item[114] {\rm Sq(1,1)[107] + Sq(4)[106]} \\ $h_{2}:$ [106] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[8/115] \mb{8/115} \begin{gl} \item[108] {\rm Sq(4)[97] + Sq(1,1)[97]} \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[6/115] \mb{6/115} \begin{gl} \item[93] {\rm Sq(5)[76] + Sq(2,1)[76]} \\ $h_{6}:$ [30] \end{gl} \end{bdl} \dm{116} \begin{bdl} \item[54/116] \mb{54/116} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[53/116] \mb{53/116} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[52/116] \mb{52/116} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[46/116] \mb{46/116} \begin{gl} \item[14] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[43/116] \mb{43/116} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[40/116] \mb{40/116} \begin{gl} \item[25] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[39/116] \mb{39/116} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[38/116] \mb{38/116} \begin{gl} \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[37/116] \mb{37/116} \begin{gl} \item[29] {\rm Sq(1,1)[30]} \item[30] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[36/116] \mb{36/116} \begin{gl} \item[33] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [33] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[35/116] \mb{35/116} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [20] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [36] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[34/116] \mb{34/116} \begin{gl} \item[41] {\rm Sq(3)[39]} \item[42] {\rm Sq(0,1)[40] + Sq(0,1)[39]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[33/116] \mb{33/116} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[32/116] \mb{32/116} \begin{gl} \item[42] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[31/116] \mb{31/116} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(0,1)[48]} \item[45] {\rm Sq(3)[48]} \end{gl} \end{bdl} \begin{bdl} \item[30/116] \mb{30/116} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[28/116] \mb{28/116} \begin{gl} \item[51] {\rm Sq(0,1)[55]} \item[52] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[27/116] \mb{27/116} \begin{gl} \item[57] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[26/116] \mb{26/116} \begin{gl} \item[66] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[25/116] \mb{25/116} \begin{gl} \item[69] {\rm Sq(0,1)[66]} \item[70] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[24/116] \mb{24/116} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[23/116] \mb{23/116} \begin{gl} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [75] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[22/116] \mb{22/116} \begin{gl} \item[77] {\rm Sq(0,2)[71]} \item[78] {\rm Sq(1,1)[75] + Sq(1,1)[74]} \item[79] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[21/116] \mb{21/116} \begin{gl} \item[80] {\rm Sq(1)[86] + Sq(1)[85]} \\ $h_{0}:$ [86], [85] \\ $h_{1}:$ [82] \\ $h_{2}:$ [75] \\ $h_{6}:$ [8] \item[81] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [74] \\ $h_{3}:$ [67] \\ $h_{4}:$ [51] \\ $h_{6}:$ [8] \item[82] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [83], [82], [81] \\ $h_{2}:$ [76], [75], [74] \\ $h_{3}:$ [68], [67] \\ $h_{4}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[20/116] \mb{20/116} \begin{gl} \item[85] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [81] \\ $h_{4}:$ [57] \item[86] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81], [78] \\ $h_{4}:$ [57] \\ $h_{6}:$ [8] \item[87] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{3}:$ [70], [69] \\ $h_{4}:$ [57] \\ $h_{6}:$ [8] \item[88] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [80], [78] \\ $h_{3}:$ [71], [70], [69] \\ $h_{4}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[19/116] \mb{19/116} \begin{gl} \item[88] {\rm Sq(0,1)[89] + Sq(3)[88] + Sq(0,1)[88]} \\ $h_{2}:$ [86] \\ $h_{4}:$ [63] \item[89] {\rm Sq(3)[89] + Sq(0,1)[88] + Sq(3)[87] + Sq(0,1)[87]} \\ $h_{2}:$ [86] \\ $h_{4}:$ [63] \item[90] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [75] \\ $h_{4}:$ [63] \item[91] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [85] \\ $h_{3}:$ [76], [75] \\ $h_{4}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/116] \mb{18/116} \begin{gl} \item[91] {\rm Sq(1,1)[90]} \item[92] {\rm Sq(2)[93]} \\ $h_{1}:$ [93] \\ $h_{2}:$ [89], [88] \\ $h_{3}:$ [79] \item[93] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{3}:$ [79] \item[94] {\rm Sq(1)[98] + Sq(1)[95]} \\ $h_{0}:$ [98], [95] \\ $h_{3}:$ [80], [79] \end{gl} \end{bdl} \begin{bdl} \item[17/116] \mb{17/116} \begin{gl} \item[95] {\rm Sq(1,1)[89]} \item[96] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [93] \\ $h_{2}:$ [89] \\ $h_{4}:$ [62] \\ $h_{5}:$ [42] \\ $h_{6}:$ [15] \item[97] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \item[98] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \end{gl} \end{bdl} \begin{bdl} \item[16/116] \mb{16/116} \begin{gl} \item[95] {\rm Sq(0,2)[80]} \item[96] {\rm Sq(3,1)[83] + Sq(3,1)[82] + Sq(3,1)[81]} \item[97] {\rm Sq(1)[96] + Sq(1)[95]} \\ $h_{0}:$ [96], [95] \\ $h_{3}:$ [77] \item[98] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[15/116] \mb{15/116} \begin{gl} \item[94] {\rm Sq(0,1)[94]} \item[95] {\rm Sq(3)[94]} \\ $h_{2}:$ [92] \\ $h_{3}:$ [84], [83] \item[96] {\rm Sq(3)[95]} \\ $h_{2}:$ [92] \\ $h_{3}:$ [83] \item[97] {\rm Sq(3)[96]} \end{gl} \end{bdl} \begin{bdl} \item[14/116] \mb{14/116} \begin{gl} \item[99] {\rm Sq(2)[95]} \\ $h_{1}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[13/116] \mb{13/116} \begin{gl} \item[97] {\rm Sq(0,1)[92]} \item[98] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{3}:$ [86] \item[99] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[12/116] \mb{12/116} \begin{gl} \item[94] {\rm Sq(1,1)[99]} \item[95] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[11/116] \mb{11/116} \begin{gl} \item[102] {\rm Sq(1,1)[109]} \\ $h_{6}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[8/116] \mb{8/116} \begin{gl} \item[109] {\rm Sq(4)[99] + Sq(1,1)[99] + Sq(4)[98] + Sq(1,1)[98]} \\ $h_{2}:$ [99], [98] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \dm{117} \begin{bdl} \item[53/117] \mb{53/117} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[52/117] \mb{52/117} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[51/117] \mb{51/117} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[50/117] \mb{50/117} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[49/117] \mb{49/117} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[48/117] \mb{48/117} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[47/117] \mb{47/117} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[46/117] \mb{46/117} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[45/117] \mb{45/117} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \item[18] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[44/117] \mb{44/117} \begin{gl} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[43/117] \mb{43/117} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[42/117] \mb{42/117} \begin{gl} \item[18] {\rm Sq(3,1)[22]} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[39/117] \mb{39/117} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[37/117] \mb{37/117} \begin{gl} \item[31] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[36/117] \mb{36/117} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[35/117] \mb{35/117} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[34/117] \mb{34/117} \begin{gl} \item[44] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [39] \\ $h_{4}:$ [26] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41], [39] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[33/117] \mb{33/117} \begin{gl} \item[45] {\rm Sq(0,1)[40] + Sq(3)[39] + Sq(0,1)[39]} \item[46] {\rm Sq(3)[41] + Sq(0,1)[41] + Sq(0,1)[39]} \item[47] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[32/117] \mb{32/117} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[45] + Sq(2)[44]} \\ $h_{1}:$ [45], [44] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[31/117] \mb{31/117} \begin{gl} \item[46] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[30/117] \mb{30/117} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[29/117] \mb{29/117} \begin{gl} \item[52] {\rm Sq(0,1)[50]} \item[53] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[28/117] \mb{28/117} \begin{gl} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[27/117] \mb{27/117} \begin{gl} \item[58] {\rm Sq(0,1)[64]} \item[59] {\rm Sq(0,1)[65]} \item[60] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[26/117] \mb{26/117} \begin{gl} \item[67] {\rm Sq(3,1)[64] + Sq(3,1)[63]} \item[68] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[25/117] \mb{25/117} \begin{gl} \item[71] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[24/117] \mb{24/117} \begin{gl} \item[70] {\rm Sq(1,1)[70]} \item[71] {\rm Sq(0,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[23/117] \mb{23/117} \begin{gl} \item[75] {\rm Sq(0,1)[76] + Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[21/117] \mb{21/117} \begin{gl} \item[83] {\rm Sq(0,1)[82]} \item[84] {\rm Sq(3)[84] + Sq(0,1)[84] + Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[19/117] \mb{19/117} \begin{gl} \item[92] {\rm Sq(2,1)[86]} \item[93] {\rm Sq(4)[87]} \\ $h_{2}:$ [87] \\ $h_{3}:$ [77] \item[94] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [91] \\ $h_{2}:$ [88] \item[95] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{1}:$ [91] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[18/117] \mb{18/117} \begin{gl} \item[95] {\rm Sq(1,1)[92]} \item[96] {\rm Sq(3)[94]} \end{gl} \end{bdl} \begin{bdl} \item[17/117] \mb{17/117} \begin{gl} \item[99] {\rm Sq(0,1)[93]} \item[100] {\rm Sq(2)[96]} \\ $h_{1}:$ [96] \\ $h_{3}:$ [79], [77] \item[101] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{2}:$ [92], [91] \\ $h_{3}:$ [79] \item[102] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [95] \\ $h_{2}:$ [91] \\ $h_{3}:$ [80], [79], [77] \\ $h_{4}:$ [65], [64] \\ $h_{5}:$ [47], [46] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[16/117] \mb{16/117} \begin{gl} \item[99] {\rm Sq(3,1)[87] + Sq(3,1)[86] + Sq(3,1)[85] + Sq(0,2)[85]} \item[100] {\rm Sq(4)[90]} \\ $h_{2}:$ [90] \item[101] {\rm Sq(3)[93] + Sq(0,1)[93]} \item[102] {\rm Sq(2)[97] + Sq(2)[94]} \\ $h_{1}:$ [97], [94] \\ $h_{3}:$ [78] \\ $h_{4}:$ [65] \\ $h_{6}:$ [14] \item[103] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [79] \\ $h_{4}:$ [65] \\ $h_{5}:$ [46] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[15/117] \mb{15/117} \begin{gl} \item[98] {\rm Sq(1,1)[96] + Sq(1,1)[95]} \item[99] {\rm Sq(1)[102] + Sq(1)[100]} \\ $h_{0}:$ [102], [100] \\ $h_{1}:$ [99] \\ $h_{4}:$ [74] \item[100] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [86] \\ $h_{5}:$ [49] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[14/117] \mb{14/117} \begin{gl} \item[100] {\rm Sq(3,1)[91] + Sq(0,2)[91]} \item[101] {\rm Sq(3)[96] + Sq(0,1)[96] + Sq(0,1)[95]} \\ $h_{3}:$ [88] \item[102] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \item[103] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[13/117] \mb{13/117} \begin{gl} \item[100] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \item[101] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{6}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[12/117] \mb{12/117} \begin{gl} \item[96] {\rm Sq(0,1)[101]} \item[97] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \\ $h_{6}:$ [16] \item[98] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \item[99] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[11/117] \mb{11/117} \begin{gl} \item[103] {\rm Sq(2,1)[109]} \item[104] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \item[105] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[10/117] \mb{10/117} \begin{gl} \item[113] {\rm Sq(5)[111] + Sq(2,1)[111]} \item[114] {\rm Sq(1,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[7/117] \mb{7/117} \begin{gl} \item[100] {\rm Sq(3)[93] + Sq(0,1)[93]} \\ $h_{2}:$ [92] \\ $h_{6}:$ [30] \end{gl} \end{bdl} \dm{118} \begin{bdl} \item[58/118] \mb{58/118} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[57/118] \mb{57/118} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[56/118] \mb{56/118} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[49/118] \mb{49/118} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[48/118] \mb{48/118} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \\ $h_{3}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[47/118] \mb{47/118} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[46/118] \mb{46/118} \begin{gl} \item[16] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[45/118] \mb{45/118} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[44/118] \mb{44/118} \begin{gl} \item[17] {\rm Sq(0,1)[14]} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[43/118] \mb{43/118} \begin{gl} \item[16] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[42/118] \mb{42/118} \begin{gl} \item[20] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[41/118] \mb{41/118} \begin{gl} \item[24] {\rm Sq(1,1)[24]} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[40/118] \mb{40/118} \begin{gl} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[39/118] \mb{39/118} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[38/118] \mb{38/118} \begin{gl} \item[27] {\rm Sq(0,1)[29]} \item[28] {\rm Sq(0,1)[30]} \item[29] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[35/118] \mb{35/118} \begin{gl} \item[40] {\rm Sq(0,1)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[33/118] \mb{33/118} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44], [43] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[32/118] \mb{32/118} \begin{gl} \item[46] {\rm Sq(0,1)[44]} \item[47] {\rm Sq(3)[45] + Sq(0,1)[45] + Sq(0,1)[43]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[31/118] \mb{31/118} \begin{gl} \item[47] {\rm Sq(0,1)[49]} \item[48] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[30/118] \mb{30/118} \begin{gl} \item[53] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[29/118] \mb{29/118} \begin{gl} \item[54] {\rm Sq(0,1)[51]} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[28/118] \mb{28/118} \begin{gl} \item[54] {\rm Sq(0,1)[57]} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[27/118] \mb{27/118} \begin{gl} \item[61] {\rm Sq(3)[66]} \item[62] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[26/118] \mb{26/118} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[25/118] \mb{25/118} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[24/118] \mb{24/118} \begin{gl} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [73], [71] \end{gl} \end{bdl} \begin{bdl} \item[23/118] \mb{23/118} \begin{gl} \item[76] {\rm Sq(0,1)[78]} \item[77] {\rm Sq(0,1)[79] + Sq(0,1)[77]} \item[78] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[22/118] \mb{22/118} \begin{gl} \item[80] {\rm Sq(2,1)[77]} \item[81] {\rm Sq(1,1)[79]} \item[82] {\rm Sq(2)[83]} \\ $h_{1}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[21/118] \mb{21/118} \begin{gl} \item[85] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [82] \\ $h_{5}:$ [35] \\ $h_{6}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[20/118] \mb{20/118} \begin{gl} \item[89] {\rm Sq(0,1)[89] + Sq(0,1)[88]} \item[90] {\rm Sq(3)[90] + Sq(0,1)[90]} \\ $h_{2}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[19/118] \mb{19/118} \begin{gl} \item[96] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[18/118] \mb{18/118} \begin{gl} \item[97] {\rm Sq(0,1)[95]} \item[98] {\rm Sq(2)[99]} \\ $h_{1}:$ [99] \\ $h_{5}:$ [50] \\ $h_{6}:$ [18] \item[99] {\rm Sq(2)[100]} \\ $h_{1}:$ [100] \\ $h_{2}:$ [93] \\ $h_{3}:$ [83] \\ $h_{5}:$ [50] \\ $h_{6}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[17/118] \mb{17/118} \begin{gl} \item[103] {\rm Sq(2)[101]} \\ $h_{1}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[16/118] \mb{16/118} \begin{gl} \item[104] {\rm Sq(0,1)[94]} \item[105] {\rm Sq(2)[98]} \\ $h_{1}:$ [98] \\ $h_{3}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[15/118] \mb{15/118} \begin{gl} \item[101] {\rm Sq(2)[101] + Sq(2)[100]} \\ $h_{1}:$ [101], [100] \\ $h_{3}:$ [89], [88] \item[102] {\rm Sq(1)[107] + Sq(1)[106]} \\ $h_{0}:$ [107], [106] \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[14/118] \mb{14/118} \begin{gl} \item[104] {\rm Sq(0,1)[97]} \item[105] {\rm Sq(3)[99] + Sq(0,1)[99]} \item[106] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \item[107] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[13/118] \mb{13/118} \begin{gl} \item[102] {\rm Sq(3)[95] + Sq(0,1)[95]} \item[103] {\rm Sq(2)[97] + Sq(2)[96]} \\ $h_{1}:$ [97], [96] \\ $h_{6}:$ [19] \item[104] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \item[105] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[12/118] \mb{12/118} \begin{gl} \item[100] {\rm Sq(3)[102]} \item[101] {\rm Sq(2)[103]} \\ $h_{1}:$ [103] \item[102] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[11/118] \mb{11/118} \begin{gl} \item[106] {\rm Sq(0,2)[109]} \item[107] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{3}:$ [105] \item[108] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[10/118] \mb{10/118} \begin{gl} \item[115] {\rm Sq(6)[111] + Sq(0,2)[111]} \\ $h_{3}:$ [109], [107] \item[116] {\rm Sq(2,1)[113] + Sq(2,1)[112]} \item[117] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[9/118] \mb{9/118} \begin{gl} \item[115] {\rm Sq(7)[105] + Sq(4,1)[105]} \item[116] {\rm Sq(1,1)[108]} \end{gl} \end{bdl} \dm{119} \begin{bdl} \item[60/119] \mb{60/119} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[59/119] \mb{59/119} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[58/119] \mb{58/119} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[57/119] \mb{57/119} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[56/119] \mb{56/119} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[55/119] \mb{55/119} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[54/119] \mb{54/119} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[53/119] \mb{53/119} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[52/119] \mb{52/119} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[49/119] \mb{49/119} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[46/119] \mb{46/119} \begin{gl} \item[17] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[44/119] \mb{44/119} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[43/119] \mb{43/119} \begin{gl} \item[18] {\rm Sq(0,1)[19] + Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[40/119] \mb{40/119} \begin{gl} \item[27] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[39/119] \mb{39/119} \begin{gl} \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [27] \\ $h_{2}:$ [26] \item[28] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{1}:$ [29] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[38/119] \mb{38/119} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [29] \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[37/119] \mb{37/119} \begin{gl} \item[32] {\rm Sq(1,1)[33]} \item[33] {\rm Sq(0,1)[34]} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[36/119] \mb{36/119} \begin{gl} \item[35] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[35/119] \mb{35/119} \begin{gl} \item[41] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[34/119] \mb{34/119} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[33/119] \mb{33/119} \begin{gl} \item[50] {\rm Sq(3)[45] + Sq(0,1)[45] + Sq(3)[43] + Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[31/119] \mb{31/119} \begin{gl} \item[49] {\rm Sq(0,1)[50]} \item[50] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[30/119] \mb{30/119} \begin{gl} \item[54] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[28/119] \mb{28/119} \begin{gl} \item[56] {\rm Sq(0,1)[58]} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[27/119] \mb{27/119} \begin{gl} \item[63] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[25/119] \mb{25/119} \begin{gl} \item[74] {\rm Sq(0,1)[71] + Sq(3)[70]} \item[75] {\rm Sq(0,1)[72] + Sq(3)[70] + Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[24/119] \mb{24/119} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[23/119] \mb{23/119} \begin{gl} \item[79] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{1}:$ [82], [80] \\ $h_{2}:$ [78] \\ $h_{3}:$ [69] \item[80] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [81] \\ $h_{2}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[22/119] \mb{22/119} \begin{gl} \item[83] {\rm Sq(0,1)[83]} \item[84] {\rm Sq(0,1)[84]} \item[85] {\rm Sq(1)[87] + Sq(1)[86]} \\ $h_{0}:$ [87], [86] \end{gl} \end{bdl} \begin{bdl} \item[21/119] \mb{21/119} \begin{gl} \item[86] {\rm Sq(3,1)[80] + Sq(3,1)[78] + Sq(0,2)[78]} \item[87] {\rm Sq(1,1)[87] + Sq(1,1)[85]} \item[88] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{1}:$ [89] \\ $h_{2}:$ [86], [85] \\ $h_{5}:$ [36] \\ $h_{6}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[20/119] \mb{20/119} \begin{gl} \item[91] {\rm Sq(3)[95] + Sq(0,1)[95] + Sq(3)[94] + Sq(0,1)[94] + Sq(3)[93] + Sq(0,1)[93]} \item[92] {\rm Sq(2)[96]} \\ $h_{1}:$ [96] \item[93] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [89], [88] \\ $h_{6}:$ [9] \item[94] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [88] \\ $h_{4}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[19/119] \mb{19/119} \begin{gl} \item[97] {\rm Sq(0,1)[95]} \item[98] {\rm Sq(0,1)[96]} \\ $h_{4}:$ [68] \item[99] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{1}:$ [98], [97] \\ $h_{2}:$ [91] \\ $h_{3}:$ [83] \\ $h_{4}:$ [68] \\ $h_{5}:$ [48] \\ $h_{6}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[18/119] \mb{18/119} \begin{gl} \item[100] {\rm Sq(0,1)[99]} \item[101] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [97] \\ $h_{3}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[17/119] \mb{17/119} \begin{gl} \item[104] {\rm Sq(3)[100] + Sq(0,1)[100]} \\ $h_{2}:$ [96] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[15/119] \mb{15/119} \begin{gl} \item[103] {\rm Sq(0,1)[100]} \item[104] {\rm Sq(2)[105]} \\ $h_{1}:$ [105] \item[105] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{3}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[14/119] \mb{14/119} \begin{gl} \item[108] {\rm Sq(1,1)[98]} \item[109] {\rm Sq(1)[110] + Sq(1)[106]} \\ $h_{0}:$ [110], [106] \\ $h_{1}:$ [103], [102] \\ $h_{2}:$ [99] \\ $h_{3}:$ [91] \\ $h_{6}:$ [21], [20] \end{gl} \end{bdl} \begin{bdl} \item[13/119] \mb{13/119} \begin{gl} \item[106] {\rm Sq(0,2)[93] + Sq(0,2)[92]} \item[107] {\rm Sq(3)[98] + Sq(0,1)[98] + Sq(0,1)[96]} \\ $h_{4}:$ [80] \item[108] {\rm Sq(2)[100]} \\ $h_{1}:$ [100] \\ $h_{4}:$ [80] \item[109] {\rm Sq(1)[104] + Sq(1)[103]} \\ $h_{0}:$ [104], [103] \\ $h_{1}:$ [101] \\ $h_{2}:$ [95], [94] \\ $h_{4}:$ [80] \\ $h_{6}:$ [20] \item[110] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [95] \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[12/119] \mb{12/119} \begin{gl} \item[103] {\rm Sq(3)[105] + Sq(0,1)[105] + Sq(3)[104] + Sq(0,1)[104] + Sq(0,1)[103]} \item[104] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [102] \\ $h_{6}:$ [19] \item[105] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{2}:$ [102] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[11/119] \mb{11/119} \begin{gl} \item[109] {\rm Sq(0,1)[114] + Sq(3)[113] + Sq(0,1)[113]} \\ $h_{6}:$ [22] \item[110] {\rm Sq(3)[114] + Sq(3)[113] + Sq(0,1)[113]} \\ $h_{6}:$ [22] \item[111] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \\ $h_{3}:$ [108] \\ $h_{6}:$ [21] \item[112] {\rm Sq(2)[116]} \\ $h_{1}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[10/119] \mb{10/119} \begin{gl} \item[118] {\rm Sq(3,1)[113]} \item[119] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{1}:$ [115] \\ $h_{4}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[9/119] \mb{9/119} \begin{gl} \item[117] {\rm Sq(1,1,1)[102]} \end{gl} \end{bdl} \dm{120} \begin{bdl} \item[59/120] \mb{59/120} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[58/120] \mb{58/120} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[53/120] \mb{53/120} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[52/120] \mb{52/120} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[51/120] \mb{51/120} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[50/120] \mb{50/120} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[48/120] \mb{48/120} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[45/120] \mb{45/120} \begin{gl} \item[20] {\rm Sq(3)[18] + Sq(0,1)[18] + Sq(0,1)[17]} \item[21] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[44/120] \mb{44/120} \begin{gl} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{2}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[43/120] \mb{43/120} \begin{gl} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[42/120] \mb{42/120} \begin{gl} \item[21] {\rm Sq(3)[24]} \item[22] {\rm Sq(0,1)[25] + Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[39/120] \mb{39/120} \begin{gl} \item[29] {\rm Sq(0,1)[28] + Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[37/120] \mb{37/120} \begin{gl} \item[35] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[36/120] \mb{36/120} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[35/120] \mb{35/120} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [47] \\ $h_{2}:$ [44] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[34/120] \mb{34/120} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [46] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[33/120] \mb{33/120} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[32/120] \mb{32/120} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[30/120] \mb{30/120} \begin{gl} \item[55] {\rm Sq(0,1)[54]} \item[56] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[29/120] \mb{29/120} \begin{gl} \item[57] {\rm Sq(0,1)[54]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{1}:$ [58], [57] \\ $h_{2}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[28/120] \mb{28/120} \begin{gl} \item[59] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[27/120] \mb{27/120} \begin{gl} \item[64] {\rm Sq(0,1)[69]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[26/120] \mb{26/120} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[25/120] \mb{25/120} \begin{gl} \item[76] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[24/120] \mb{24/120} \begin{gl} \item[76] {\rm Sq(3,1)[71] + Sq(0,2)[71]} \item[77] {\rm Sq(0,1)[76]} \item[78] {\rm Sq(3)[78] + Sq(0,1)[78] + Sq(0,1)[77] + Sq(3)[76]} \end{gl} \end{bdl} \begin{bdl} \item[23/120] \mb{23/120} \begin{gl} \item[81] {\rm Sq(0,1)[81] + Sq(0,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[22/120] \mb{22/120} \begin{gl} \item[86] {\rm Sq(1)[92] + Sq(1)[89]} \\ $h_{0}:$ [92], [89] \\ $h_{3}:$ [76], [74] \end{gl} \end{bdl} \begin{bdl} \item[21/120] \mb{21/120} \begin{gl} \item[89] {\rm Sq(0,1)[89]} \item[90] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \item[91] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [92] \item[92] {\rm Sq(1)[97] + Sq(1)[96]} \\ $h_{0}:$ [97], [96] \\ $h_{3}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[20/120] \mb{20/120} \begin{gl} \item[95] {\rm Sq(0,1)[96]} \item[96] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{1}:$ [98], [97] \\ $h_{2}:$ [95], [94] \\ $h_{4}:$ [63] \item[97] {\rm Sq(1)[102] + Sq(1)[100]} \\ $h_{0}:$ [102], [100] \\ $h_{1}:$ [98], [97] \\ $h_{2}:$ [95], [94] \\ $h_{3}:$ [80] \\ $h_{4}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[19/120] \mb{19/120} \begin{gl} \item[100] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [100] \\ $h_{2}:$ [95] \\ $h_{3}:$ [85] \\ $h_{5}:$ [50] \\ $h_{6}:$ [14] \item[101] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [96], [95] \item[102] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{1}:$ [100] \\ $h_{2}:$ [96] \\ $h_{5}:$ [50] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[18/120] \mb{18/120} \begin{gl} \item[102] {\rm Sq(1,1)[102] + Sq(1,1)[100]} \item[103] {\rm Sq(3)[103]} \item[104] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \end{gl} \end{bdl} \begin{bdl} \item[17/120] \mb{17/120} \begin{gl} \item[105] {\rm Sq(0,1)[104]} \item[106] {\rm Sq(3)[104]} \item[107] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{2}:$ [100] \\ $h_{3}:$ [90], [89] \\ $h_{4}:$ [68], [67] \end{gl} \end{bdl} \begin{bdl} \item[16/120] \mb{16/120} \begin{gl} \item[106] {\rm Sq(3)[101]} \\ $h_{3}:$ [88] \\ $h_{4}:$ [68] \item[107] {\rm Sq(3)[102] + Sq(0,1)[102]} \\ $h_{4}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[14/120] \mb{14/120} \begin{gl} \item[110] {\rm Sq(6)[95]} \item[111] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [108], [107] \\ $h_{3}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[13/120] \mb{13/120} \begin{gl} \item[111] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[12/120] \mb{12/120} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(3)[108] + Sq(0,1)[108]} \item[108] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \item[109] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{1}:$ [110] \\ $h_{2}:$ [105] \\ $h_{6}:$ [20] \item[110] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [112], [110], [109] \\ $h_{2}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[11/120] \mb{11/120} \begin{gl} \item[113] {\rm Sq(3)[116]} \item[114] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{2}:$ [114] \item[115] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{2}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[10/120] \mb{10/120} \begin{gl} \item[120] {\rm Sq(0,1)[116]} \item[121] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \\ $h_{4}:$ [99] \item[122] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[9/120] \mb{9/120} \begin{gl} \item[118] {\rm Sq(3,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[8/120] \mb{8/120} \begin{gl} \item[110] {\rm Sq(5,1)[99] + Sq(2,2)[99] + Sq(1,0,1)[99] + Sq(5,1)[98] + Sq(2,2)[98] + Sq(1,0,1)[98]} \\ $h_{6}:$ [27] \end{gl} \end{bdl} \dm{121} \begin{bdl} \item[61/121] \mb{61/121} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[60/121] \mb{60/121} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[59/121] \mb{59/121} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[58/121] \mb{58/121} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[57/121] \mb{57/121} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[56/121] \mb{56/121} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[51/121] \mb{51/121} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[50/121] \mb{50/121} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[47/121] \mb{47/121} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[44/121] \mb{44/121} \begin{gl} \item[21] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[43/121] \mb{43/121} \begin{gl} \item[20] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[42/121] \mb{42/121} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[41/121] \mb{41/121} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[40/121] \mb{40/121} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[39/121] \mb{39/121} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[38/121] \mb{38/121} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \item[33] {\rm Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[35/121] \mb{35/121} \begin{gl} \item[43] {\rm Sq(0,1)[47] + Sq(0,1)[46]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[34/121] \mb{34/121} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[32/121] \mb{32/121} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[31/121] \mb{31/121} \begin{gl} \item[51] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[29/121] \mb{29/121} \begin{gl} \item[59] {\rm Sq(0,1)[56]} \item[60] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[28/121] \mb{28/121} \begin{gl} \item[60] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[27/121] \mb{27/121} \begin{gl} \item[67] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[26/121] \mb{26/121} \begin{gl} \item[73] {\rm Sq(1,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[25/121] \mb{25/121} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [77] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[24/121] \mb{24/121} \begin{gl} \item[79] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [76] \item[80] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{2}:$ [78], [76] \end{gl} \end{bdl} \begin{bdl} \item[23/121] \mb{23/121} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(3)[85] + Sq(0,1)[85] + Sq(3)[83]} \item[85] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[22/121] \mb{22/121} \begin{gl} \item[87] {\rm Sq(0,1)[87] + Sq(0,1)[86]} \item[88] {\rm Sq(1)[94] + Sq(1)[93]} \\ $h_{0}:$ [94], [93] \\ $h_{1}:$ [90], [89] \\ $h_{2}:$ [85] \\ $h_{3}:$ [78] \\ $h_{5}:$ [38], [36] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[21/121] \mb{21/121} \begin{gl} \item[93] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [95] \\ $h_{2}:$ [89] \\ $h_{4}:$ [58] \\ $h_{5}:$ [38] \\ $h_{6}:$ [11] \item[94] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [95] \\ $h_{3}:$ [80], [78] \\ $h_{4}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[20/121] \mb{20/121} \begin{gl} \item[98] {\rm Sq(0,1)[97]} \item[99] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [85], [83] \end{gl} \end{bdl} \begin{bdl} \item[19/121] \mb{19/121} \begin{gl} \item[103] {\rm Sq(1)[107] + Sq(1)[106] + Sq(1)[105]} \\ $h_{0}:$ [107], [106], [105] \\ $h_{3}:$ [89], [87] \end{gl} \end{bdl} \begin{bdl} \item[18/121] \mb{18/121} \begin{gl} \item[105] {\rm Sq(3,1)[98] + Sq(3,1)[95] + Sq(0,2)[95]} \item[106] {\rm Sq(1)[109] + Sq(1)[108]} \\ $h_{0}:$ [109], [108] \\ $h_{1}:$ [106], [105] \\ $h_{5}:$ [52] \\ $h_{6}:$ [19] \item[107] {\rm Sq(1)[110] + Sq(1)[108]} \\ $h_{0}:$ [110], [108] \\ $h_{1}:$ [106], [105] \\ $h_{5}:$ [52] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[17/121] \mb{17/121} \begin{gl} \item[108] {\rm Sq(3,1)[98] + Sq(3,1)[95] + Sq(0,2)[95]} \item[109] {\rm Sq(1,1)[104]} \item[110] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \item[111] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{1}:$ [107] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[16/121] \mb{16/121} \begin{gl} \item[108] {\rm Sq(0,1)[103]} \item[109] {\rm Sq(3)[104] + Sq(3)[103]} \item[110] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[15/121] \mb{15/121} \begin{gl} \item[106] {\rm Sq(3)[108]} \\ $h_{4}:$ [79] \item[107] {\rm Sq(2)[110]} \\ $h_{1}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[14/121] \mb{14/121} \begin{gl} \item[112] {\rm Sq(3)[108] + Sq(3)[107] + Sq(0,1)[107]} \end{gl} \end{bdl} \begin{bdl} \item[13/121] \mb{13/121} \begin{gl} \item[112] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{1}:$ [107] \\ $h_{2}:$ [100] \\ $h_{3}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[12/121] \mb{12/121} \begin{gl} \item[111] {\rm Sq(2)[113]} \\ $h_{1}:$ [113] \item[112] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[11/121] \mb{11/121} \begin{gl} \item[116] {\rm Sq(3)[118]} \end{gl} \end{bdl} \begin{bdl} \item[10/121] \mb{10/121} \begin{gl} \item[123] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{1}:$ [118] \\ $h_{2}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[9/121] \mb{9/121} \begin{gl} \item[119] {\rm Sq(4,1)[108] + Sq(1,2)[108] + Sq(0,0,1)[108]} \item[120] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [110] \\ $h_{6}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[8/121] \mb{8/121} \begin{gl} \item[111] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{6}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[7/121] \mb{7/121} \begin{gl} \item[101] {\rm Sq(4,1)[93] + Sq(1,2)[93] + Sq(0,0,1)[93]} \\ $h_{6}:$ [31] \item[102] {\rm Sq(7)[93]} \\ $h_{6}:$ [31] \end{gl} \end{bdl} \dm{122} \begin{bdl} \item[62/122] \mb{62/122} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[57/122] \mb{57/122} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[56/122] \mb{56/122} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[55/122] \mb{55/122} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[54/122] \mb{54/122} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[53/122] \mb{53/122} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[52/122] \mb{52/122} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[49/122] \mb{49/122} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[46/122] \mb{46/122} \begin{gl} \item[18] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[43/122] \mb{43/122} \begin{gl} \item[21] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[40/122] \mb{40/122} \begin{gl} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[39/122] \mb{39/122} \begin{gl} \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [32] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[38/122] \mb{38/122} \begin{gl} \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34], [32] \end{gl} \end{bdl} \begin{bdl} \item[37/122] \mb{37/122} \begin{gl} \item[36] {\rm Sq(3)[36]} \item[37] {\rm Sq(0,1)[37]} \item[38] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[36/122] \mb{36/122} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[35/122] \mb{35/122} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[51]} \\ $h_{0}:$ [53], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [47] \\ $h_{3}:$ [40] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[34/122] \mb{34/122} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[33/122] \mb{33/122} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[32/122] \mb{32/122} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[31/122] \mb{31/122} \begin{gl} \item[52] {\rm Sq(0,1)[55]} \item[53] {\rm Sq(0,1)[56]} \item[54] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[30/122] \mb{30/122} \begin{gl} \item[57] {\rm Sq(0,1)[57]} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[29/122] \mb{29/122} \begin{gl} \item[61] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[28/122] \mb{28/122} \begin{gl} \item[61] {\rm Sq(1,1)[63]} \item[62] {\rm Sq(0,1)[65]} \item[63] {\rm Sq(3)[66] + Sq(0,1)[66] + Sq(0,1)[64]} \end{gl} \end{bdl} \begin{bdl} \item[27/122] \mb{27/122} \begin{gl} \item[68] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[25/122] \mb{25/122} \begin{gl} \item[79] {\rm Sq(0,1)[77] + Sq(0,1)[76]} \item[80] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[24/122] \mb{24/122} \begin{gl} \item[81] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[23/122] \mb{23/122} \begin{gl} \item[86] {\rm Sq(3)[86] + Sq(0,1)[86]} \item[87] {\rm Sq(1)[91] + Sq(1)[89]} \\ $h_{0}:$ [91], [89] \\ $h_{1}:$ [87] \\ $h_{2}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[22/122] \mb{22/122} \begin{gl} \item[89] {\rm Sq(1,1)[88]} \item[90] {\rm Sq(0,1)[89]} \item[91] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{2}:$ [87], [86] \end{gl} \end{bdl} \begin{bdl} \item[21/122] \mb{21/122} \begin{gl} \item[95] {\rm Sq(1,1)[94]} \item[96] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{1}:$ [98] \\ $h_{2}:$ [93] \\ $h_{4}:$ [61] \\ $h_{5}:$ [39] \\ $h_{6}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[20/122] \mb{20/122} \begin{gl} \item[100] {\rm Sq(1,1)[97]} \item[101] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [97] \\ $h_{4}:$ [64] \\ $h_{6}:$ [11] \item[102] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [98], [97] \\ $h_{3}:$ [87] \\ $h_{4}:$ [66], [64] \\ $h_{6}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[19/122] \mb{19/122} \begin{gl} \item[104] {\rm Sq(0,1)[102]} \item[105] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{3}:$ [90] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[18/122] \mb{18/122} \begin{gl} \item[108] {\rm Sq(0,1)[105]} \item[109] {\rm Sq(2)[109]} \\ $h_{1}:$ [109] \item[110] {\rm Sq(1)[113] + Sq(1)[112]} \\ $h_{0}:$ [113], [112] \\ $h_{3}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[17/122] \mb{17/122} \begin{gl} \item[112] {\rm Sq(6)[101] + Sq(0,2)[101] + Sq(3,1)[100] + Sq(0,2)[99]} \item[113] {\rm Sq(1)[112] + Sq(1)[111]} \\ $h_{0}:$ [112], [111] \end{gl} \end{bdl} \begin{bdl} \item[16/122] \mb{16/122} \begin{gl} \item[111] {\rm Sq(1,1)[103]} \item[112] {\rm Sq(1,1)[105]} \item[113] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[15/122] \mb{15/122} \begin{gl} \item[108] {\rm Sq(3,1)[100] + Sq(0,2)[100]} \item[109] {\rm Sq(0,1)[110]} \end{gl} \end{bdl} \begin{bdl} \item[14/122] \mb{14/122} \begin{gl} \item[113] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{3}:$ [96] \end{gl} \end{bdl} \begin{bdl} \item[13/122] \mb{13/122} \begin{gl} \item[113] {\rm Sq(1,1)[105] + Sq(1,1)[104]} \item[114] {\rm Sq(2)[111]} \\ $h_{1}:$ [111] \\ $h_{4}:$ [85] \item[115] {\rm Sq(1)[114] + Sq(1)[113]} \\ $h_{0}:$ [114], [113] \\ $h_{2}:$ [105] \\ $h_{5}:$ [57] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[12/122] \mb{12/122} \begin{gl} \item[113] {\rm Sq(0,1)[113]} \\ $h_{5}:$ [61] \item[114] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{2}:$ [110] \\ $h_{6}:$ [21] \item[115] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{2}:$ [110], [109] \end{gl} \end{bdl} \begin{bdl} \item[11/122] \mb{11/122} \begin{gl} \item[117] {\rm Sq(3)[120]} \\ $h_{6}:$ [24] \item[118] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(3)[121]} \end{gl} \end{bdl} \begin{bdl} \item[8/122] \mb{8/122} \begin{gl} \item[112] {\rm Sq(2)[102] + Sq(2)[101]} \\ $h_{1}:$ [102], [101] \end{gl} \end{bdl} \dm{123} \begin{bdl} \item[63/123] \mb{63/123} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[62/123] \mb{62/123} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[61/123] \mb{61/123} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[53/123] \mb{53/123} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[52/123] \mb{52/123} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[51/123] \mb{51/123} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[48/123] \mb{48/123} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[45/123] \mb{45/123} \begin{gl} \item[22] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[44/123] \mb{44/123} \begin{gl} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[43/123] \mb{43/123} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[42/123] \mb{42/123} \begin{gl} \item[24] {\rm Sq(3)[26]} \item[25] {\rm Sq(0,1)[27] + Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[39/123] \mb{39/123} \begin{gl} \item[32] {\rm Sq(0,1)[33] + Sq(3)[32]} \end{gl} \end{bdl} \begin{bdl} \item[37/123] \mb{37/123} \begin{gl} \item[39] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[36/123] \mb{36/123} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[35/123] \mb{35/123} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43], [41] \\ $h_{4}:$ [29], [28] \end{gl} \end{bdl} \begin{bdl} \item[34/123] \mb{34/123} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[33/123] \mb{33/123} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[32/123] \mb{32/123} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[31/123] \mb{31/123} \begin{gl} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[30/123] \mb{30/123} \begin{gl} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(0,1)[60]} \item[61] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[29/123] \mb{29/123} \begin{gl} \item[62] {\rm Sq(0,1)[60]} \item[63] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[64] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[28/123] \mb{28/123} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \item[65] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[27/123] \mb{27/123} \begin{gl} \item[69] {\rm Sq(0,1)[73]} \item[70] {\rm Sq(0,1)[74]} \item[71] {\rm Sq(0,1)[75]} \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[26/123] \mb{26/123} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[24/123] \mb{24/123} \begin{gl} \item[82] {\rm Sq(3)[82]} \item[83] {\rm Sq(3)[85] + Sq(0,1)[85] + Sq(0,1)[84] + Sq(0,1)[83] + Sq(0,1)[82]} \item[84] {\rm Sq(2)[86]} \\ $h_{1}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[23/123] \mb{23/123} \begin{gl} \item[88] {\rm Sq(0,1)[87]} \end{gl} \end{bdl} \begin{bdl} \item[20/123] \mb{20/123} \begin{gl} \item[103] {\rm Sq(1,1)[100]} \end{gl} \end{bdl} \begin{bdl} \item[19/123] \mb{19/123} \begin{gl} \item[106] {\rm Sq(0,1)[105]} \item[107] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [109], [108] \\ $h_{2}:$ [102] \\ $h_{3}:$ [91] \\ $h_{5}:$ [55] \\ $h_{6}:$ [15] \item[108] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{1}:$ [109], [108] \\ $h_{2}:$ [103], [102] \\ $h_{3}:$ [93], [91] \\ $h_{5}:$ [55] \\ $h_{6}:$ [15] \item[109] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{1}:$ [109] \\ $h_{2}:$ [104], [102] \\ $h_{3}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[18/123] \mb{18/123} \begin{gl} \item[111] {\rm Sq(0,1)[108]} \item[112] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{3}:$ [97] \item[113] {\rm Sq(1)[117] + Sq(1)[116]} \\ $h_{0}:$ [117], [116] \\ $h_{2}:$ [106] \\ $h_{3}:$ [98], [95] \end{gl} \end{bdl} \begin{bdl} \item[17/123] \mb{17/123} \begin{gl} \item[114] {\rm Sq(0,1)[108]} \item[115] {\rm Sq(3)[109] + Sq(0,1)[109]} \\ $h_{3}:$ [96] \item[116] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [112], [111] \\ $h_{3}:$ [98], [97], [96] \item[117] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{1}:$ [112], [111] \\ $h_{3}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[16/123] \mb{16/123} \begin{gl} \item[114] {\rm Sq(2)[109]} \\ $h_{1}:$ [109] \\ $h_{4}:$ [74] \item[115] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{3}:$ [97], [96], [95] \item[116] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{3}:$ [96], [95] \end{gl} \end{bdl} \begin{bdl} \item[15/123] \mb{15/123} \begin{gl} \item[110] {\rm Sq(1,1)[110]} \item[111] {\rm Sq(0,1)[112]} \\ $h_{4}:$ [82] \item[112] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[14/123] \mb{14/123} \begin{gl} \item[114] {\rm Sq(1,1)[111]} \item[115] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \item[116] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{1}:$ [113] \\ $h_{2}:$ [111] \\ $h_{3}:$ [98], [97] \\ $h_{5}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[13/123] \mb{13/123} \begin{gl} \item[116] {\rm Sq(1,1)[107]} \item[117] {\rm Sq(3)[111]} \item[118] {\rm Sq(1)[117] + Sq(1)[116]} \\ $h_{0}:$ [117], [116] \\ $h_{2}:$ [107] \\ $h_{3}:$ [94] \\ $h_{5}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[12/123] \mb{12/123} \begin{gl} \item[116] {\rm Sq(1,1)[114]} \item[117] {\rm Sq(1)[121] + Sq(1)[119]} \\ $h_{0}:$ [121], [119] \item[118] {\rm Sq(1)[122] + Sq(1)[120] + Sq(1)[119]} \\ $h_{0}:$ [122], [120], [119] \\ $h_{1}:$ [117] \\ $h_{2}:$ [114] \\ $h_{6}:$ [23], [22] \end{gl} \end{bdl} \begin{bdl} \item[11/123] \mb{11/123} \begin{gl} \item[119] {\rm Sq(1,1)[120]} \\ $h_{5}:$ [65] \item[120] {\rm Sq(1,1)[121]} \\ $h_{5}:$ [65] \item[121] {\rm Sq(1,1)[122]} \\ $h_{5}:$ [65] \item[122] {\rm Sq(1)[125] + Sq(1)[124]} \\ $h_{0}:$ [125], [124] \\ $h_{2}:$ [120] \\ $h_{6}:$ [25] \item[123] {\rm Sq(1)[126] + Sq(1)[124]} \\ $h_{0}:$ [126], [124] \\ $h_{2}:$ [122] \\ $h_{5}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[10/123] \mb{10/123} \begin{gl} \item[124] {\rm Sq(6)[115]} \\ $h_{6}:$ [29] \item[125] {\rm Sq(3)[119]} \item[126] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{2}:$ [118] \\ $h_{6}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[9/123] \mb{9/123} \begin{gl} \item[121] {\rm Sq(1,1)[110]} \item[122] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[8/123] \mb{8/123} \begin{gl} \item[113] {\rm Sq(3)[102] + Sq(0,1)[101]} \end{gl} \end{bdl} \dm{124} \begin{bdl} \item[58/124] \mb{58/124} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[57/124] \mb{57/124} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[56/124] \mb{56/124} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[50/124] \mb{50/124} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[47/124] \mb{47/124} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[46/124] \mb{46/124} \begin{gl} \item[19] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[45/124] \mb{45/124} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[44/124] \mb{44/124} \begin{gl} \item[23] {\rm Sq(0,1)[21]} \item[24] {\rm Sq(1)[24] + Sq(1)[23]} \\ $h_{0}:$ [24], [23] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[43/124] \mb{43/124} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \item[24] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[42/124] \mb{42/124} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[41/124] \mb{41/124} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \item[30] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[40/124] \mb{40/124} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[39/124] \mb{39/124} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[38/124] \mb{38/124} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[35/124] \mb{35/124} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52] + Sq(3)[51]} \end{gl} \end{bdl} \begin{bdl} \item[34/124] \mb{34/124} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[32/124] \mb{32/124} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[31/124] \mb{31/124} \begin{gl} \item[56] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[30/124] \mb{30/124} \begin{gl} \item[62] {\rm Sq(2)[63] + Sq(2)[62]} \\ $h_{1}:$ [63], [62] \item[63] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[29/124] \mb{29/124} \begin{gl} \item[65] {\rm Sq(0,1)[62] + Sq(0,1)[61]} \item[66] {\rm Sq(0,1)[63] + Sq(0,1)[61]} \item[67] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[28/124] \mb{28/124} \begin{gl} \item[66] {\rm Sq(0,1)[68]} \item[67] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[27/124] \mb{27/124} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \\ $h_{3}:$ [67] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[26/124] \mb{26/124} \begin{gl} \item[78] {\rm Sq(1,1)[78] + Sq(1,1)[77]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[25/124] \mb{25/124} \begin{gl} \item[81] {\rm Sq(1,1)[80]} \item[82] {\rm Sq(0,1)[81]} \item[83] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [84] \\ $h_{2}:$ [79] \\ $h_{3}:$ [70] \\ $h_{4}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[24/124] \mb{24/124} \begin{gl} \item[85] {\rm Sq(1)[91] + Sq(1)[89]} \\ $h_{0}:$ [91], [89] \\ $h_{2}:$ [85], [82] \item[86] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{2}:$ [82] \\ $h_{4}:$ [60], [59], [58] \end{gl} \end{bdl} \begin{bdl} \item[23/124] \mb{23/124} \begin{gl} \item[89] {\rm Sq(0,1)[89]} \item[90] {\rm Sq(0,1)[90]} \item[91] {\rm Sq(1)[94] + Sq(1)[92]} \\ $h_{0}:$ [94], [92] \\ $h_{2}:$ [87] \item[92] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{4}:$ [65], [64] \end{gl} \end{bdl} \begin{bdl} \item[22/124] \mb{22/124} \begin{gl} \item[92] {\rm Sq(0,2)[86]} \item[93] {\rm Sq(1,1)[94]} \item[94] {\rm Sq(0,1)[95]} \item[95] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{4}:$ [67], [66], [65] \end{gl} \end{bdl} \begin{bdl} \item[21/124] \mb{21/124} \begin{gl} \item[97] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{1}:$ [103] \\ $h_{2}:$ [98] \\ $h_{4}:$ [65] \\ $h_{5}:$ [41] \\ $h_{6}:$ [13] \item[98] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{4}:$ [68], [67], [65] \end{gl} \end{bdl} \begin{bdl} \item[20/124] \mb{20/124} \begin{gl} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{4}:$ [71], [70], [69] \end{gl} \end{bdl} \begin{bdl} \item[19/124] \mb{19/124} \begin{gl} \item[110] {\rm Sq(3)[110] + Sq(0,1)[110] + Sq(3)[109] + Sq(0,1)[108]} \item[111] {\rm Sq(1)[115] + Sq(1)[114]} \\ $h_{0}:$ [115], [114] \\ $h_{4}:$ [76], [75] \end{gl} \end{bdl} \begin{bdl} \item[18/124] \mb{18/124} \begin{gl} \item[114] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{1}:$ [115] \\ $h_{3}:$ [100], [99] \item[115] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{1}:$ [115] \\ $h_{3}:$ [100], [99] \\ $h_{4}:$ [80], [79] \end{gl} \end{bdl} \begin{bdl} \item[17/124] \mb{17/124} \begin{gl} \item[118] {\rm Sq(1,1)[109]} \item[119] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{2}:$ [109] \item[120] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{1}:$ [114] \\ $h_{2}:$ [110], [109] \\ $h_{3}:$ [101] \\ $h_{4}:$ [76] \item[121] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[16/124] \mb{16/124} \begin{gl} \item[117] {\rm Sq(0,1)[108]} \item[118] {\rm Sq(2)[110]} \\ $h_{1}:$ [110] \\ $h_{3}:$ [98] \item[119] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \item[120] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{2}:$ [106] \\ $h_{4}:$ [76] \item[121] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[15/124] \mb{15/124} \begin{gl} \item[113] {\rm Sq(3,1)[109]} \item[114] {\rm Sq(3)[113] + Sq(0,1)[113]} \\ $h_{3}:$ [101], [100] \\ $h_{4}:$ [84], [83] \item[115] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{4}:$ [83] \item[116] {\rm Sq(1)[119] + Sq(1)[117]} \\ $h_{0}:$ [119], [117] \end{gl} \end{bdl} \begin{bdl} \item[14/124] \mb{14/124} \begin{gl} \item[117] {\rm Sq(3,1)[107] + Sq(0,2)[106]} \item[118] {\rm Sq(3,1)[109] + Sq(3,1)[108] + Sq(3,1)[106]} \item[119] {\rm Sq(1,1)[112]} \item[120] {\rm Sq(2)[116]} \\ $h_{1}:$ [116] \item[121] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \\ $h_{4}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[13/124] \mb{13/124} \begin{gl} \item[119] {\rm Sq(3)[113] + Sq(0,1)[113]} \\ $h_{4}:$ [86] \item[120] {\rm Sq(3)[114] + Sq(0,1)[114] + Sq(0,1)[113]} \\ $h_{4}:$ [86] \\ $h_{5}:$ [60] \item[121] {\rm Sq(3)[115] + Sq(0,1)[115]} \\ $h_{4}:$ [86] \item[122] {\rm Sq(1)[123] + Sq(1)[122] + Sq(1)[120]} \\ $h_{0}:$ [123], [122], [120] \\ $h_{3}:$ [99], [98] \\ $h_{5}:$ [60] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[12/124] \mb{12/124} \begin{gl} \item[119] {\rm Sq(2)[120] + Sq(2)[119]} \\ $h_{1}:$ [120], [119] \item[120] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [116] \item[121] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{2}:$ [116] \item[122] {\rm Sq(1)[127] + Sq(1)[124]} \\ $h_{0}:$ [127], [124] \\ $h_{1}:$ [121], [119] \\ $h_{2}:$ [116] \\ $h_{3}:$ [104], [103] \item[123] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{1}:$ [121], [119] \\ $h_{3}:$ [105], [103] \\ $h_{6}:$ [25], [24] \end{gl} \end{bdl} \begin{bdl} \item[11/124] \mb{11/124} \begin{gl} \item[124] {\rm Sq(2,1)[120]} \item[125] {\rm Sq(5)[122] + Sq(2,1)[122] + Sq(2,1)[121] + Sq(5)[120]} \item[126] {\rm Sq(1,1)[123]} \item[127] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{3}:$ [113] \item[128] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{3}:$ [114] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[10/124] \mb{10/124} \begin{gl} \item[127] {\rm Sq(6)[117] + Sq(0,2)[117]} \item[128] {\rm Sq(1,1)[119]} \item[129] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \\ $h_{6}:$ [31] \item[130] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{2}:$ [119] \item[131] {\rm Sq(1)[125] + Sq(1)[124]} \\ $h_{0}:$ [125], [124] \\ $h_{6}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[9/124] \mb{9/124} \begin{gl} \item[123] {\rm Sq(1,1)[111]} \item[124] {\rm Sq(3)[112]} \item[125] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[8/124] \mb{8/124} \begin{gl} \item[114] {\rm Sq(6,2)[99] + Sq(3,3)[99] + Sq(6,2)[98] + Sq(3,3)[98]} \end{gl} \end{bdl} \begin{bdl} \item[7/124] \mb{7/124} \begin{gl} \item[103] {\rm Sq(1,3)[93] + Sq(0,1,1)[93]} \item[104] {\rm Sq(7,1)[93] + Sq(4,2)[93] + Sq(0,1,1)[93]} \\ $h_{6}:$ [33] \item[105] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[6/124] \mb{6/124} \begin{gl} \item[94] {\rm Sq(11,1)[76] + Sq(5,3)[76] + Sq(7,0,1)[76] + Sq(1,2,1)[76]} \end{gl} \end{bdl} \dm{125} \begin{bdl} \item[57/125] \mb{57/125} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[56/125] \mb{56/125} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[55/125] \mb{55/125} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[52/125] \mb{52/125} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[49/125] \mb{49/125} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[46/125] \mb{46/125} \begin{gl} \item[20] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[45/125] \mb{45/125} \begin{gl} \item[24] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[44/125] \mb{44/125} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[43/125] \mb{43/125} \begin{gl} \item[25] {\rm Sq(0,1)[25] + Sq(0,1)[24]} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[42/125] \mb{42/125} \begin{gl} \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[41/125] \mb{41/125} \begin{gl} \item[31] {\rm Sq(2)[30]} \\ $h_{1}:$ [30] \item[32] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[40/125] \mb{40/125} \begin{gl} \item[31] {\rm Sq(1,1)[31]} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[39/125] \mb{39/125} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[38/125] \mb{38/125} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[37/125] \mb{37/125} \begin{gl} \item[40] {\rm Sq(0,1)[39]} \item[41] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[36/125] \mb{36/125} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[34/125] \mb{34/125} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[33/125] \mb{33/125} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[31/125] \mb{31/125} \begin{gl} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(0,1)[60]} \item[59] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [62] \\ $h_{2}:$ [58] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[30/125] \mb{30/125} \begin{gl} \item[64] {\rm Sq(3)[64] + Sq(0,1)[64] + Sq(0,1)[62]} \item[65] {\rm Sq(1)[69] + Sq(1)[68]} \\ $h_{0}:$ [69], [68] \\ $h_{2}:$ [61] \\ $h_{3}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[29/125] \mb{29/125} \begin{gl} \item[68] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [61] \item[69] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[28/125] \mb{28/125} \begin{gl} \item[68] {\rm Sq(3)[69]} \item[69] {\rm Sq(0,1)[70] + Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[71]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[27/125] \mb{27/125} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[26/125] \mb{26/125} \begin{gl} \item[82] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[25/125] \mb{25/125} \begin{gl} \item[84] {\rm Sq(3,1)[76] + Sq(0,2)[76]} \item[85] {\rm Sq(0,1)[82]} \item[86] {\rm Sq(0,1)[83]} \item[87] {\rm Sq(3)[84] + Sq(3)[82]} \end{gl} \end{bdl} \begin{bdl} \item[24/125] \mb{24/125} \begin{gl} \item[87] {\rm Sq(0,1)[88]} \end{gl} \end{bdl} \begin{bdl} \item[23/125] \mb{23/125} \begin{gl} \item[93] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [94], [92] \\ $h_{2}:$ [91], [89] \item[94] {\rm Sq(1)[99] + Sq(1)[97] + Sq(1)[96]} \\ $h_{0}:$ [99], [97], [96] \\ $h_{1}:$ [93] \\ $h_{4}:$ [68], [66] \\ $h_{5}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[22/125] \mb{22/125} \begin{gl} \item[96] {\rm Sq(1,1)[95]} \item[97] {\rm Sq(1,1)[96]} \item[98] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [95] \item[99] {\rm Sq(1)[101] + Sq(1)[100]} \\ $h_{0}:$ [101], [100] \\ $h_{4}:$ [70], [69] \end{gl} \end{bdl} \begin{bdl} \item[21/125] \mb{21/125} \begin{gl} \item[99] {\rm Sq(1,1)[102] + Sq(1,1)[101]} \item[100] {\rm Sq(3)[103] + Sq(0,1)[103]} \item[101] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{4}:$ [70], [69] \end{gl} \end{bdl} \begin{bdl} \item[20/125] \mb{20/125} \begin{gl} \item[106] {\rm Sq(3)[108] + Sq(0,1)[108] + Sq(3)[107] + Sq(0,1)[107]} \item[107] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{1}:$ [110] \\ $h_{2}:$ [104] \\ $h_{3}:$ [96] \\ $h_{4}:$ [73], [72] \\ $h_{5}:$ [49] \\ $h_{6}:$ [12] \item[108] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{4}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[19/125] \mb{19/125} \begin{gl} \item[112] {\rm Sq(1,1)[108]} \item[113] {\rm Sq(0,1)[111]} \item[114] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{4}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[18/125] \mb{18/125} \begin{gl} \item[116] {\rm Sq(0,1)[114]} \item[117] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[17/125] \mb{17/125} \begin{gl} \item[122] {\rm Sq(1)[124] + Sq(1)[122]} \\ $h_{0}:$ [124], [122] \\ $h_{1}:$ [118], [117] \\ $h_{2}:$ [112] \\ $h_{3}:$ [105], [104] \\ $h_{4}:$ [77] \\ $h_{5}:$ [54] \item[123] {\rm Sq(1)[125] + Sq(1)[122]} \\ $h_{0}:$ [125], [122] \end{gl} \end{bdl} \begin{bdl} \item[16/125] \mb{16/125} \begin{gl} \item[122] {\rm Sq(1,1)[109]} \item[123] {\rm Sq(2)[113]} \\ $h_{1}:$ [113] \\ $h_{5}:$ [56] \\ $h_{6}:$ [18] \item[124] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \item[125] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[15/125] \mb{15/125} \begin{gl} \item[117] {\rm Sq(3,1)[111] + Sq(3,1)[110] + Sq(0,2)[110]} \item[118] {\rm Sq(2,1)[112]} \item[119] {\rm Sq(2)[118]} \\ $h_{1}:$ [118] \item[120] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \item[121] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{1}:$ [120], [117] \\ $h_{3}:$ [106] \end{gl} \end{bdl} \begin{bdl} \item[14/125] \mb{14/125} \begin{gl} \item[122] {\rm Sq(1,1)[115] + Sq(1,1)[113]} \item[123] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \\ $h_{4}:$ [89], [88] \item[124] {\rm Sq(1)[125] + Sq(1)[123]} \\ $h_{0}:$ [125], [123] \\ $h_{3}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[13/125] \mb{13/125} \begin{gl} \item[123] {\rm Sq(1,1)[115] + Sq(1,1)[114]} \\ $h_{3}:$ [100] \item[124] {\rm Sq(0,1)[116]} \item[125] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \item[126] {\rm Sq(1)[127] + Sq(1)[125]} \\ $h_{0}:$ [127], [125] \\ $h_{1}:$ [119] \\ $h_{2}:$ [115], [113] \\ $h_{3}:$ [102], [100] \\ $h_{5}:$ [62] \item[127] {\rm Sq(1)[128] + Sq(1)[126]} \\ $h_{0}:$ [128], [126] \\ $h_{2}:$ [114], [113] \\ $h_{3}:$ [102] \\ $h_{5}:$ [62] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[12/125] \mb{12/125} \begin{gl} \item[124] {\rm Sq(1,1)[118]} \item[125] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(3)[121] + Sq(3)[120]} \item[126] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{2}:$ [117] \\ $h_{6}:$ [27] \item[127] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{2}:$ [118] \\ $h_{3}:$ [108] \item[128] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{3}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[11/125] \mb{11/125} \begin{gl} \item[129] {\rm Sq(3)[126] + Sq(0,1)[126] + Sq(3)[125] + Sq(0,1)[124]} \\ $h_{6}:$ [28] \item[130] {\rm Sq(2)[127]} \\ $h_{1}:$ [127] \\ $h_{3}:$ [116] \\ $h_{6}:$ [28] \item[131] {\rm Sq(2)[128]} \\ $h_{1}:$ [128] \\ $h_{3}:$ [116] \\ $h_{4}:$ [102] \\ $h_{6}:$ [28] \item[132] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{3}:$ [117] \item[133] {\rm Sq(1)[136] + Sq(1)[134] + Sq(1)[133]} \\ $h_{0}:$ [136], [134], [133] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[10/125] \mb{10/125} \begin{gl} \item[132] {\rm Sq(3)[121] + Sq(0,1)[121]} \item[133] {\rm Sq(3)[122] + Sq(0,1)[122]} \item[134] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{3}:$ [116] \item[135] {\rm Sq(1)[129] + Sq(1)[127] + Sq(1)[126]} \\ $h_{0}:$ [129], [127], [126] \\ $h_{3}:$ [116] \item[136] {\rm Sq(1)[130] + Sq(1)[127]} \\ $h_{0}:$ [130], [127] \end{gl} \end{bdl} \begin{bdl} \item[9/125] \mb{9/125} \begin{gl} \item[126] {\rm Sq(6)[110] + Sq(3,1)[110]} \\ $h_{5}:$ [80] \\ $h_{6}:$ [33] \item[127] {\rm Sq(5)[111] + Sq(2,1)[111]} \\ $h_{6}:$ [33], [32] \item[128] {\rm Sq(0,1)[113]} \item[129] {\rm Sq(3)[113]} \\ $h_{5}:$ [80] \\ $h_{6}:$ [32] \item[130] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{6}:$ [33], [32] \end{gl} \end{bdl} \begin{bdl} \item[8/125] \mb{8/125} \begin{gl} \item[115] {\rm Sq(2,1)[101]} \item[116] {\rm Sq(2,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[7/125] \mb{7/125} \begin{gl} \item[106] {\rm Sq(1)[96] + Sq(1)[95]} \\ $h_{0}:$ [96], [95] \\ $h_{1}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[6/125] \mb{6/125} \begin{gl} \item[95] {\rm Sq(15)[76] + Sq(12,1)[76] + Sq(9,2)[76] + Sq(8,0,1)[76] + Sq(2,2,1)[76] + Sq(1,0,2)[76] + Sq(0,0,0,1)[76]} \\ $h_{6}:$ [32] \item[96] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[5/125] \mb{5/125} \begin{gl} \item[77] {\rm Sq(19,1)[52] + Sq(4,6)[52] + Sq(1,7)[52] + Sq(6,3,1)[52] + Sq(3,4,1)[52] + Sq(0,5,1)[52] + Sq(5,1,2)[52] + Sq(1,0,3)[52] + Sq(4,1,0,1)[52] + Sq(1,2,0,1)[52]} \end{gl} \end{bdl} \dm{126} \begin{bdl} \item[62/126] \mb{62/126} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[61/126] \mb{61/126} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[60/126] \mb{60/126} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[59/126] \mb{59/126} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[58/126] \mb{58/126} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[57/126] \mb{57/126} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[56/126] \mb{56/126} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[55/126] \mb{55/126} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[54/126] \mb{54/126} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[53/126] \mb{53/126} \begin{gl} \item[14] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[52/126] \mb{52/126} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[51/126] \mb{51/126} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \item[13] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{4}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[50/126] \mb{50/126} \begin{gl} \item[16] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[49/126] \mb{49/126} \begin{gl} \item[21] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[48/126] \mb{48/126} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{4}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[47/126] \mb{47/126} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[46/126] \mb{46/126} \begin{gl} \item[21] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[45/126] \mb{45/126} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[27] + Sq(1)[26]} \\ $h_{0}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[44/126] \mb{44/126} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [22] \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[43/126] \mb{43/126} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[42/126] \mb{42/126} \begin{gl} \item[29] {\rm Sq(3)[28]} \item[30] {\rm Sq(0,1)[29] + Sq(0,1)[28]} \item[31] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[41/126] \mb{41/126} \begin{gl} \item[33] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[40/126] \mb{40/126} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[39/126] \mb{39/126} \begin{gl} \item[35] {\rm Sq(0,1)[37] + Sq(0,1)[36]} \item[36] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[38/126] \mb{38/126} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[37/126] \mb{37/126} \begin{gl} \item[42] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[43] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [42], [41] \\ $h_{3}:$ [35] \\ $h_{5}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[36/126] \mb{36/126} \begin{gl} \item[43] {\rm Sq(3)[47] + Sq(0,1)[47]} \item[44] {\rm Sq(0,1)[48] + Sq(0,1)[47]} \item[45] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{5}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[35/126] \mb{35/126} \begin{gl} \item[49] {\rm Sq(0,1)[55]} \item[50] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{5}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[34/126] \mb{34/126} \begin{gl} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{5}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[33/126] \mb{33/126} \begin{gl} \item[59] {\rm Sq(0,1)[55]} \item[60] {\rm Sq(0,1)[56]} \item[61] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{5}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[32/126] \mb{32/126} \begin{gl} \item[57] {\rm Sq(0,1)[56]} \item[58] {\rm Sq(1)[61] + Sq(1)[60]} \\ $h_{0}:$ [61], [60] \\ $h_{5}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[31/126] \mb{31/126} \begin{gl} \item[60] {\rm Sq(3)[63] + Sq(0,1)[63]} \item[61] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{5}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[30/126] \mb{30/126} \begin{gl} \item[66] {\rm Sq(0,1)[65]} \item[67] {\rm Sq(0,1)[66]} \item[68] {\rm Sq(1)[72] + Sq(1)[71]} \\ $h_{0}:$ [72], [71] \\ $h_{5}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[29/126] \mb{29/126} \begin{gl} \item[70] {\rm Sq(0,1)[66]} \item[71] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \item[72] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \\ $h_{5}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[28/126] \mb{28/126} \begin{gl} \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [69] \item[73] {\rm Sq(1)[80] + Sq(1)[79]} \\ $h_{0}:$ [80], [79] \\ $h_{2}:$ [72] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [72], [69] \\ $h_{5}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[27/126] \mb{27/126} \begin{gl} \item[77] {\rm Sq(0,1)[78]} \item[78] {\rm Sq(0,1)[80] + Sq(0,1)[79]} \item[79] {\rm Sq(3)[81] + Sq(0,1)[81] + Sq(0,1)[79] + Sq(3)[78]} \item[80] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[81] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [76] \\ $h_{5}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[26/126] \mb{26/126} \begin{gl} \item[83] {\rm Sq(0,1)[81]} \item[84] {\rm Sq(0,1)[82] + Sq(3)[81]} \item[85] {\rm Sq(2)[87] + Sq(2)[85] + Sq(2)[84]} \\ $h_{1}:$ [87], [85], [84] \item[86] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{5}:$ [37], [36] \end{gl} \end{bdl} \begin{bdl} \item[25/126] \mb{25/126} \begin{gl} \item[88] {\rm Sq(1)[91] + Sq(1)[90]} \\ $h_{0}:$ [91], [90] \\ $h_{5}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[24/126] \mb{24/126} \begin{gl} \item[88] {\rm Sq(0,1)[89]} \item[89] {\rm Sq(0,1)[90]} \item[90] {\rm Sq(3)[92] + Sq(0,1)[92] + Sq(3)[91] + Sq(0,1)[91] + Sq(3)[89]} \item[91] {\rm Sq(1)[96] + Sq(1)[95]} \\ $h_{0}:$ [96], [95] \\ $h_{5}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[23/126] \mb{23/126} \begin{gl} \item[95] {\rm Sq(0,1)[94] + Sq(0,1)[93] + Sq(0,1)[92]} \item[96] {\rm Sq(1)[101] + Sq(1)[100]} \\ $h_{0}:$ [101], [100] \\ $h_{5}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[22/126] \mb{22/126} \begin{gl} \item[100] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [100] \\ $h_{5}:$ [43] \\ $h_{6}:$ [15] \item[101] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{1}:$ [100] \\ $h_{5}:$ [44], [43] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[21/126] \mb{21/126} \begin{gl} \item[102] {\rm Sq(0,1)[104]} \item[103] {\rm Sq(2)[106]} \\ $h_{1}:$ [106] \item[104] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[20/126] \mb{20/126} \begin{gl} \item[109] {\rm Sq(0,1)[110]} \item[110] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[19/126] \mb{19/126} \begin{gl} \item[115] {\rm Sq(1,1)[111]} \item[116] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[18/126] \mb{18/126} \begin{gl} \item[118] {\rm Sq(3,1)[108] + Sq(0,2)[108]} \item[119] {\rm Sq(3,1)[111] + Sq(3,1)[109]} \item[120] {\rm Sq(3)[118]} \item[121] {\rm Sq(3)[119] + Sq(0,1)[119] + Sq(0,1)[118]} \end{gl} \end{bdl} \begin{bdl} \item[17/126] \mb{17/126} \begin{gl} \item[124] {\rm Sq(0,1)[117]} \item[125] {\rm Sq(3)[121] + Sq(0,1)[121] + Sq(3)[120] + Sq(0,1)[120]} \item[126] {\rm Sq(2)[123]} \\ $h_{1}:$ [123] \\ $h_{5}:$ [57], [56] \\ $h_{6}:$ [22] \item[127] {\rm Sq(1)[128] + Sq(1)[127]} \\ $h_{0}:$ [128], [127] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[16/126] \mb{16/126} \begin{gl} \item[126] {\rm Sq(2)[119] + Sq(2)[117]} \\ $h_{1}:$ [119], [117] \\ $h_{4}:$ [82], [81], [80] \item[127] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{1}:$ [118], [117] \\ $h_{3}:$ [105] \\ $h_{4}:$ [82], [81], [80] \item[128] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{1}:$ [118], [117] \\ $h_{3}:$ [105] \\ $h_{4}:$ [82], [81], [80] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[15/126] \mb{15/126} \begin{gl} \item[122] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{3}:$ [108] \item[123] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{3}:$ [108] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[14/126] \mb{14/126} \begin{gl} \item[125] {\rm Sq(3)[121] + Sq(3)[119]} \item[126] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(0,1)[121] + Sq(3)[120] + Sq(0,1)[120] + Sq(3)[119]} \item[127] {\rm Sq(2)[123]} \\ $h_{1}:$ [123] \\ $h_{2}:$ [116] \\ $h_{3}:$ [108], [107] \item[128] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[13/126] \mb{13/126} \begin{gl} \item[128] {\rm Sq(2)[125]} \\ $h_{1}:$ [125] \item[129] {\rm Sq(1)[130] + Sq(1)[129]} \\ $h_{0}:$ [130], [129] \\ $h_{1}:$ [124] \\ $h_{3}:$ [105], [104] \item[130] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{6}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[12/126] \mb{12/126} \begin{gl} \item[129] {\rm Sq(0,1)[126] + Sq(3)[125]} \item[130] {\rm Sq(3)[128] + Sq(0,1)[128] + Sq(3)[126] + Sq(3)[125] + Sq(0,1)[125] + Sq(3)[124]} \\ $h_{3}:$ [110], [109] \item[131] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{1}:$ [131], [129] \\ $h_{2}:$ [120] \\ $h_{3}:$ [112] \\ $h_{4}:$ [95] \\ $h_{5}:$ [69] \item[132] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{1}:$ [129] \\ $h_{2}:$ [122], [120], [119] \\ $h_{6}:$ [29] \item[133] {\rm Sq(1)[139] + Sq(1)[138]} \\ $h_{0}:$ [139], [138] \\ $h_{6}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[11/126] \mb{11/126} \begin{gl} \item[134] {\rm Sq(0,1)[128] + Sq(0,1)[127]} \item[135] {\rm Sq(2)[132]} \\ $h_{1}:$ [132] \\ $h_{3}:$ [118] \item[136] {\rm Sq(2)[133]} \\ $h_{1}:$ [133] \item[137] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{2}:$ [125], [124] \\ $h_{6}:$ [30] \item[138] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{2}:$ [126], [124] \item[139] {\rm Sq(1)[141] + Sq(1)[139]} \\ $h_{0}:$ [141], [139] \\ $h_{2}:$ [126], [124] \\ $h_{6}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[10/126] \mb{10/126} \begin{gl} \item[137] {\rm Sq(0,1)[123]} \item[138] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{2}:$ [121] \item[139] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{1}:$ [126] \\ $h_{3}:$ [117] \\ $h_{5}:$ [78] \\ $h_{6}:$ [33] \item[140] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{1}:$ [128], [126] \\ $h_{2}:$ [122] \\ $h_{3}:$ [117] \\ $h_{5}:$ [78] \\ $h_{6}:$ [33] \item[141] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{1}:$ [126] \\ $h_{2}:$ [121] \\ $h_{3}:$ [117] \\ $h_{5}:$ [78] \\ $h_{6}:$ [35], [33] \end{gl} \end{bdl} \begin{bdl} \item[9/126] \mb{9/126} \begin{gl} \item[131] {\rm Sq(3)[114]} \item[132] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \item[133] {\rm Sq(2)[116]} \\ $h_{1}:$ [116] \\ $h_{2}:$ [113] \item[134] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \item[135] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{2}:$ [113] \item[136] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{6}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[8/126] \mb{8/126} \begin{gl} \item[117] {\rm Sq(3,1)[102]} \item[118] {\rm Sq(3)[103]} \item[119] {\rm Sq(0,1)[104]} \\ $h_{6}:$ [34] \item[120] {\rm Sq(3)[104]} \\ $h_{6}:$ [34] \item[121] {\rm Sq(3)[105] + Sq(0,1)[105]} \item[122] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{6}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[7/126] \mb{7/126} \begin{gl} \item[107] {\rm Sq(2)[95]} \\ $h_{1}:$ [95] \\ $h_{6}:$ [36] \item[108] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{6}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[6/126] \mb{6/126} \begin{gl} \item[97] {\rm Sq(13,1)[76] + Sq(7,3)[76] + Sq(9,0,1)[76] + Sq(6,1,1)[76] + Sq(0,3,1)[76] + Sq(1,0,0,1)[76]} \item[98] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{6}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[5/126] \mb{5/126} \begin{gl} \item[78] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{6}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[4/126] \mb{4/126} \begin{gl} \item[53] {\rm Sq(31,1)[35] + Sq(28,2)[35] + Sq(25,3)[35] + Sq(13,7)[35] + Sq(24,1,1)[35] + Sq(21,2,1)[35] + Sq(15,4,1)[35] + Sq(6,7,1)[35] + Sq(5,5,2)[35] + Sq(13,0,3)[35] + Sq(7,2,3)[35] + Sq(4,3,3)[35] + Sq(1,4,3)[35] + Sq(16,1,0,1)[35] + Sq(13,2,0,1)[35] + Sq(7,4,0,1)[35] + Sq(4,5,0,1)[35] + Sq(1,6,0,1)[35] + Sq(6,2,1,1)[35] + Sq(3,3,1,1)[35]} \item[54] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[3/126] \mb{3/126} \begin{gl} \item[36] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{6}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[2/126] \mb{2/126} \begin{gl} \item[21] {\rm Sq(64)[6] + Sq(61,1)[6] + Sq(52,4)[6] + Sq(46,6)[6] + Sq(43,7)[6] + Sq(16,16)[6] + Sq(57,0,1)[6] + Sq(51,2,1)[6] + Sq(42,5,1)[6] + Sq(50,0,2)[6] + Sq(47,1,2)[6] + Sq(40,1,3)[6] + Sq(37,2,3)[6] + Sq(34,3,3)[6] + Sq(46,1,0,1)[6] + Sq(40,3,0,1)[6] + Sq(37,4,0,1)[6] + Sq(34,5,0,1)[6] + Sq(42,0,1,1)[6] + Sq(35,0,2,1)[6] + Sq(32,1,2,1)[6] + Sq(14,7,2,1)[6]} \\ $h_{6}:$ [6] \end{gl} \end{bdl} \dm{127} \begin{bdl} \item[64/127] \mb{64/127} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[63/127] \mb{63/127} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[62/127] \mb{62/127} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[61/127] \mb{61/127} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[60/127] \mb{60/127} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[59/127] \mb{59/127} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[58/127] \mb{58/127} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[57/127] \mb{57/127} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[56/127] \mb{56/127} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[55/127] \mb{55/127} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[54/127] \mb{54/127} \begin{gl} \item[11] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[53/127] \mb{53/127} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[52/127] \mb{52/127} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[51/127] \mb{51/127} \begin{gl} \item[14] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[50/127] \mb{50/127} \begin{gl} \item[17] {\rm Sq(0,1)[20]} \item[18] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[49/127] \mb{49/127} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[48/127] \mb{48/127} \begin{gl} \item[22] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[23] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[47/127] \mb{47/127} \begin{gl} \item[20] {\rm Sq(0,1)[20]} \item[21] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[46/127] \mb{46/127} \begin{gl} \item[22] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[45/127] \mb{45/127} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[44/127] \mb{44/127} \begin{gl} \item[28] {\rm Sq(0,1)[25]} \item[29] {\rm Sq(1)[31] + Sq(1)[30] + Sq(1)[29]} \\ $h_{0}:$ [31], [30], [29] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[43/127] \mb{43/127} \begin{gl} \item[29] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [29] \\ $h_{2}:$ [26] \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31], [30], [29] \\ $h_{2}:$ [27], [26] \\ $h_{3}:$ [21] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [31], [30] \\ $h_{2}:$ [27] \\ $h_{3}:$ [21] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[42/127] \mb{42/127} \begin{gl} \item[33] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [28] \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [30], [28] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [30] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[41/127] \mb{41/127} \begin{gl} \item[34] {\rm Sq(0,1)[31]} \item[35] {\rm Sq(0,1)[32]} \item[36] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [30] \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[40/127] \mb{40/127} \begin{gl} \item[34] {\rm Sq(1,1)[33]} \item[35] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[39/127] \mb{39/127} \begin{gl} \item[37] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [39] \\ $h_{2}:$ [36] \\ $h_{4}:$ [21] \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{1}:$ [39] \\ $h_{2}:$ [36] \\ $h_{4}:$ [21] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[38/127] \mb{38/127} \begin{gl} \item[40] {\rm Sq(3)[40]} \item[41] {\rm Sq(0,1)[41]} \item[42] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[37/127] \mb{37/127} \begin{gl} \item[44] {\rm Sq(0,1)[41]} \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[36/127] \mb{36/127} \begin{gl} \item[46] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[35/127] \mb{35/127} \begin{gl} \item[51] {\rm Sq(0,1)[56]} \item[52] {\rm Sq(0,1)[57]} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[34/127] \mb{34/127} \begin{gl} \item[59] {\rm Sq(0,1)[58]} \item[60] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[33/127] \mb{33/127} \begin{gl} \item[62] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[32/127] \mb{32/127} \begin{gl} \item[59] {\rm Sq(0,1)[57]} \item[60] {\rm Sq(0,1)[58]} \item[61] {\rm Sq(2)[60]} \\ $h_{1}:$ [60] \item[62] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[31/127] \mb{31/127} \begin{gl} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[30/127] \mb{30/127} \begin{gl} \item[69] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[29/127] \mb{29/127} \begin{gl} \item[73] {\rm Sq(0,1)[69]} \item[74] {\rm Sq(0,1)[70] + Sq(0,1)[68]} \item[75] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[28/127] \mb{28/127} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \item[76] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[27/127] \mb{27/127} \begin{gl} \item[82] {\rm Sq(1)[88] + Sq(1)[87]} \\ $h_{0}:$ [88], [87] \\ $h_{1}:$ [85], [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71] \item[83] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{1}:$ [83] \\ $h_{2}:$ [81] \item[84] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[26/127] \mb{26/127} \begin{gl} \item[87] {\rm Sq(0,1)[85]} \item[88] {\rm Sq(0,1)[87] + Sq(3)[85] + Sq(3)[84] + Sq(0,1)[84]} \item[89] {\rm Sq(3)[87] + Sq(0,1)[86] + Sq(3)[85] + Sq(3)[84]} \item[90] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \item[91] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[25/127] \mb{25/127} \begin{gl} \item[89] {\rm Sq(1,1)[86] + Sq(1,1)[85]} \item[90] {\rm Sq(0,1)[87]} \item[91] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[24/127] \mb{24/127} \begin{gl} \item[92] {\rm Sq(2)[95]} \\ $h_{1}:$ [95] \item[93] {\rm Sq(1)[99] + Sq(1)[98]} \\ $h_{0}:$ [99], [98] \\ $h_{2}:$ [91], [89] \\ $h_{4}:$ [66] \item[94] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[23/127] \mb{23/127} \begin{gl} \item[97] {\rm Sq(0,1)[97] + Sq(0,1)[96]} \item[98] {\rm Sq(3)[99] + Sq(0,1)[99] + Sq(3)[97] + Sq(3)[96] + Sq(0,1)[96]} \item[99] {\rm Sq(1)[103] + Sq(1)[102]} \\ $h_{0}:$ [103], [102] \\ $h_{2}:$ [94], [92] \\ $h_{4}:$ [69] \item[100] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[22/127] \mb{22/127} \begin{gl} \item[102] {\rm Sq(3)[100] + Sq(0,1)[100] + Sq(0,1)[99]} \item[103] {\rm Sq(3)[101] + Sq(0,1)[101]} \item[104] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[21/127] \mb{21/127} \begin{gl} \item[105] {\rm Sq(1,1)[104]} \item[106] {\rm Sq(3)[106]} \item[107] {\rm Sq(1)[112] + Sq(1)[111]} \\ $h_{0}:$ [112], [111] \\ $h_{1}:$ [109] \\ $h_{2}:$ [104] \\ $h_{3}:$ [97], [96], [95] \\ $h_{4}:$ [72] \\ $h_{5}:$ [45] \\ $h_{6}:$ [16] \item[108] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[20/127] \mb{20/127} \begin{gl} \item[111] {\rm Sq(0,1)[113]} \item[112] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{3}:$ [102], [101], [100] \item[113] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[19/127] \mb{19/127} \begin{gl} \item[117] {\rm Sq(0,1)[116]} \item[118] {\rm Sq(2)[119]} \\ $h_{1}:$ [119] \\ $h_{4}:$ [83] \item[119] {\rm Sq(2)[121] + Sq(2)[120] + Sq(2)[118]} \\ $h_{1}:$ [121], [120], [118] \\ $h_{4}:$ [83] \item[120] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{3}:$ [104], [103], [102] \item[121] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[18/127] \mb{18/127} \begin{gl} \item[122] {\rm Sq(1,1)[119] + Sq(1,1)[118]} \item[123] {\rm Sq(2)[125]} \\ $h_{1}:$ [125] \\ $h_{2}:$ [118] \item[124] {\rm Sq(1)[129] + Sq(1)[128]} \\ $h_{0}:$ [129], [128] \\ $h_{3}:$ [106] \item[125] {\rm Sq(1)[130] + Sq(1)[128]} \\ $h_{0}:$ [130], [128] \\ $h_{1}:$ [126], [124] \\ $h_{2}:$ [119], [118] \\ $h_{3}:$ [106], [105] \\ $h_{5}:$ [60], [59] \\ $h_{6}:$ [24], [23] \item[126] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[17/127] \mb{17/127} \begin{gl} \item[128] {\rm Sq(3)[123]} \item[129] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \item[130] {\rm Sq(1)[132] + Sq(1)[130]} \\ $h_{0}:$ [132], [130] \\ $h_{2}:$ [119] \\ $h_{5}:$ [58] \\ $h_{6}:$ [24] \item[131] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{1}:$ [126] \\ $h_{2}:$ [120] \\ $h_{3}:$ [107], [106] \\ $h_{4}:$ [88], [87] \\ $h_{5}:$ [58] \\ $h_{6}:$ [24] \item[132] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[16/127] \mb{16/127} \begin{gl} \item[129] {\rm Sq(3)[117] + Sq(0,1)[117]} \item[130] {\rm Sq(3)[120] + Sq(0,1)[120]} \item[131] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \item[132] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [113] \\ $h_{5}:$ [58] \\ $h_{6}:$ [22] \item[133] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{2}:$ [115] \\ $h_{4}:$ [87], [85] \\ $h_{5}:$ [58] \\ $h_{6}:$ [22] \item[134] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[15/127] \mb{15/127} \begin{gl} \item[124] {\rm Sq(1,1)[121] + Sq(1,1)[119] + Sq(1,1)[118] + Sq(1,1)[117]} \item[125] {\rm Sq(0,1)[122]} \\ $h_{6}:$ [23] \item[126] {\rm Sq(3)[123] + Sq(3)[122]} \\ $h_{2}:$ [118] \\ $h_{4}:$ [91] \\ $h_{6}:$ [23] \item[127] {\rm Sq(2)[126] + Sq(2)[125]} \\ $h_{1}:$ [126], [125] \\ $h_{3}:$ [110] \item[128] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[14/127] \mb{14/127} \begin{gl} \item[129] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{3}:$ [111] \item[130] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{1}:$ [128] \\ $h_{2}:$ [120] \\ $h_{3}:$ [111] \\ $h_{4}:$ [92], [91] \\ $h_{5}:$ [65], [64], [63] \item[131] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[13/127] \mb{13/127} \begin{gl} \item[131] {\rm Sq(3)[125] + Sq(0,1)[125] + Sq(0,1)[124]} \\ $h_{5}:$ [64] \item[132] {\rm Sq(3)[127] + Sq(0,1)[127] + Sq(0,1)[125] + Sq(0,1)[124]} \\ $h_{3}:$ [107] \item[133] {\rm Sq(3)[128] + Sq(0,1)[128] + Sq(3)[126] + Sq(0,1)[126] + Sq(0,1)[125] + Sq(3)[124] + Sq(0,1)[124]} \\ $h_{3}:$ [107] \\ $h_{5}:$ [64] \item[134] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{1}:$ [129] \\ $h_{2}:$ [121], [120] \\ $h_{3}:$ [108] \item[135] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[12/127] \mb{12/127} \begin{gl} \item[134] {\rm Sq(2)[134]} \\ $h_{1}:$ [134] \\ $h_{3}:$ [113] \\ $h_{4}:$ [97] \item[135] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{2}:$ [126], [125] \\ $h_{3}:$ [113] \item[136] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[11/127] \mb{11/127} \begin{gl} \item[140] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{1}:$ [137] \\ $h_{2}:$ [130] \\ $h_{4}:$ [107] \item[141] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \item[142] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [122] \item[143] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[10/127] \mb{10/127} \begin{gl} \item[142] {\rm Sq(1,1)[125] + Sq(4)[123]} \\ $h_{2}:$ [123] \item[143] {\rm Sq(3)[129] + Sq(0,1)[129] + Sq(0,1)[128] + Sq(3)[127] + Sq(0,1)[127] + Sq(3)[126] + Sq(0,1)[126]} \item[144] {\rm Sq(3)[130] + Sq(0,1)[130] + Sq(0,1)[129] + Sq(3)[128] + Sq(3)[127] + Sq(3)[126] + Sq(0,1)[126]} \\ $h_{3}:$ [118] \item[145] {\rm Sq(2)[132]} \\ $h_{1}:$ [132] \\ $h_{2}:$ [123] \item[146] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{1}:$ [131] \\ $h_{2}:$ [125], [124] \\ $h_{3}:$ [118] \item[147] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[9/127] \mb{9/127} \begin{gl} \item[137] {\rm Sq(2)[120] + Sq(2)[119]} \\ $h_{1}:$ [120], [119] \\ $h_{3}:$ [110] \\ $h_{5}:$ [83] \\ $h_{6}:$ [37] \item[138] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \\ $h_{2}:$ [114] \\ $h_{3}:$ [110] \\ $h_{5}:$ [83] \\ $h_{6}:$ [37] \item[139] {\rm Sq(1)[125] + Sq(1)[123]} \\ $h_{0}:$ [125], [123] \\ $h_{2}:$ [114] \item[140] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{1}:$ [117] \\ $h_{2}:$ [114] \\ $h_{3}:$ [110] \\ $h_{5}:$ [83] \\ $h_{6}:$ [37] \item[141] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[8/127] \mb{8/127} \begin{gl} \item[123] {\rm Sq(1,1)[104] + Sq(4)[103] + Sq(1,1)[103]} \\ $h_{2}:$ [103] \\ $h_{4}:$ [97] \item[124] {\rm Sq(4)[104] + Sq(1,1)[103]} \\ $h_{2}:$ [104] \\ $h_{6}:$ [36] \item[125] {\rm Sq(1,1)[105] + Sq(4)[103]} \\ $h_{2}:$ [103] \\ $h_{4}:$ [97] \item[126] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \item[127] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{2}:$ [103] \\ $h_{4}:$ [97] \item[128] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{2}:$ [105], [103] \\ $h_{4}:$ [97] \\ $h_{6}:$ [37] \item[129] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[7/127] \mb{7/127} \begin{gl} \item[109] {\rm Sq(1,1)[94]} \item[110] {\rm Sq(3)[96] + Sq(0,1)[96] + Sq(3)[95] + Sq(0,1)[95]} \item[111] {\rm Sq(2)[97]} \\ $h_{1}:$ [97] \\ $h_{2}:$ [94] \item[112] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [94] \\ $h_{6}:$ [38] \item[113] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[6/127] \mb{6/127} \begin{gl} \item[99] {\rm Sq(3)[77]} \item[100] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[5/127] \mb{5/127} \begin{gl} \item[79] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[4/127] \mb{4/127} \begin{gl} \item[55] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[3/127] \mb{3/127} \begin{gl} \item[37] {\rm Sq(2)[21]} \\ $h_{1}:$ [21] \\ $h_{6}:$ [17] \item[38] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[2/127] \mb{2/127} \begin{gl} \item[22] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{7}:$ [0] \end{gl} \end{bdl} \begin{bdl} \item[1/127] \mb{1/127} \begin{gl} \item[7] {\rm Sq(128)[0]} \\ $h_{7}:$ [0] \end{gl} \end{bdl} \dm{128} \begin{bdl} \item[63/128] \mb{63/128} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[62/128] \mb{62/128} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[57/128] \mb{57/128} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[56/128] \mb{56/128} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[55/128] \mb{55/128} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[54/128] \mb{54/128} \begin{gl} \item[12] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[52/128] \mb{52/128} \begin{gl} \item[16] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[49/128] \mb{49/128} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[48/128] \mb{48/128} \begin{gl} \item[24] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[47/128] \mb{47/128} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[46/128] \mb{46/128} \begin{gl} \item[23] {\rm Sq(1,1)[24]} \item[24] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[43/128] \mb{43/128} \begin{gl} \item[32] {\rm Sq(0,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[41/128] \mb{41/128} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[40/128] \mb{40/128} \begin{gl} \item[36] {\rm Sq(1,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[39/128] \mb{39/128} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [40] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[38/128] \mb{38/128} \begin{gl} \item[43] {\rm Sq(2)[44]} \\ $h_{1}:$ [44] \item[44] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [40] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[37/128] \mb{37/128} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[44] + Sq(3)[43]} \end{gl} \end{bdl} \begin{bdl} \item[36/128] \mb{36/128} \begin{gl} \item[47] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[34/128] \mb{34/128} \begin{gl} \item[61] {\rm Sq(0,1)[59]} \item[62] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[33/128] \mb{33/128} \begin{gl} \item[63] {\rm Sq(3)[58] + Sq(0,1)[58] + Sq(0,1)[57]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [61], [60] \end{gl} \end{bdl} \begin{bdl} \item[32/128] \mb{32/128} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[31/128] \mb{31/128} \begin{gl} \item[64] {\rm Sq(0,1)[67] + Sq(0,1)[66]} \item[65] {\rm Sq(3)[68] + Sq(0,1)[68] + Sq(0,1)[66]} \item[66] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[30/128] \mb{30/128} \begin{gl} \item[70] {\rm Sq(1,1)[68]} \item[71] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[29/128] \mb{29/128} \begin{gl} \item[76] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[28/128] \mb{28/128} \begin{gl} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[27/128] \mb{27/128} \begin{gl} \item[85] {\rm Sq(3)[86] + Sq(0,1)[86] + Sq(0,1)[84] + Sq(3)[83]} \end{gl} \end{bdl} \begin{bdl} \item[25/128] \mb{25/128} \begin{gl} \item[92] {\rm Sq(0,1)[89]} \item[93] {\rm Sq(0,1)[90]} \item[94] {\rm Sq(1)[96] + Sq(1)[95]} \\ $h_{0}:$ [96], [95] \\ $h_{1}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[24/128] \mb{24/128} \begin{gl} \item[95] {\rm Sq(0,1)[95]} \item[96] {\rm Sq(3)[95]} \end{gl} \end{bdl} \begin{bdl} \item[23/128] \mb{23/128} \begin{gl} \item[101] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{1}:$ [103] \\ $h_{2}:$ [97], [96] \\ $h_{4}:$ [71] \\ $h_{5}:$ [45] \\ $h_{6}:$ [13] \item[102] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{1}:$ [103], [102] \\ $h_{2}:$ [98] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[22/128] \mb{22/128} \begin{gl} \item[105] {\rm Sq(0,1)[102]} \item[106] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[21/128] \mb{21/128} \begin{gl} \item[109] {\rm Sq(1,1)[108]} \item[110] {\rm Sq(0,1)[109]} \end{gl} \end{bdl} \begin{bdl} \item[20/128] \mb{20/128} \begin{gl} \item[114] {\rm Sq(1,1)[113]} \item[115] {\rm Sq(0,1)[115]} \item[116] {\rm Sq(1)[123] + Sq(1)[122]} \\ $h_{0}:$ [123], [122] \\ $h_{1}:$ [119], [118] \\ $h_{2}:$ [113] \\ $h_{3}:$ [103] \\ $h_{4}:$ [80], [78] \\ $h_{5}:$ [52] \\ $h_{6}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[19/128] \mb{19/128} \begin{gl} \item[122] {\rm Sq(0,1)[118]} \item[123] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{3}:$ [107], [106], [105] \\ $h_{4}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[18/128] \mb{18/128} \begin{gl} \item[127] {\rm Sq(0,1)[124]} \item[128] {\rm Sq(3)[127] + Sq(0,1)[127] + Sq(3)[125] + Sq(0,1)[125]} \item[129] {\rm Sq(1)[135] + Sq(1)[133]} \\ $h_{0}:$ [135], [133] \\ $h_{3}:$ [110], [109] \end{gl} \end{bdl} \begin{bdl} \item[17/128] \mb{17/128} \begin{gl} \item[133] {\rm Sq(1,1)[125] + Sq(1,1)[123] + Sq(4)[122] + Sq(1,1)[122]} \\ $h_{2}:$ [122] \item[134] {\rm Sq(2)[129]} \\ $h_{1}:$ [129] \item[135] {\rm Sq(1)[137] + Sq(1)[135]} \\ $h_{0}:$ [137], [135] \\ $h_{2}:$ [122] \\ $h_{3}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[16/128] \mb{16/128} \begin{gl} \item[135] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{1}:$ [124] \item[136] {\rm Sq(1)[131] + Sq(1)[129]} \\ $h_{0}:$ [131], [129] \\ $h_{1}:$ [125] \\ $h_{2}:$ [120] \\ $h_{6}:$ [23] \item[137] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{1}:$ [124] \item[138] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{1}:$ [127], [125], [124] \\ $h_{2}:$ [117] \\ $h_{3}:$ [107] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[15/128] \mb{15/128} \begin{gl} \item[129] {\rm Sq(5)[118]} \item[130] {\rm Sq(1,1)[122]} \item[131] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{2}:$ [122] \\ $h_{6}:$ [25] \item[132] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \item[133] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[14/128] \mb{14/128} \begin{gl} \item[132] {\rm Sq(1,1)[127]} \\ $h_{6}:$ [29] \item[133] {\rm Sq(3)[128]} \item[134] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{6}:$ [29] \item[135] {\rm Sq(1)[139] + Sq(1)[138]} \\ $h_{0}:$ [139], [138] \\ $h_{1}:$ [133], [132], [131] \\ $h_{4}:$ [93] \\ $h_{6}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[13/128] \mb{13/128} \begin{gl} \item[136] {\rm Sq(1,1)[125]} \item[137] {\rm Sq(1,1)[128] + Sq(1,1)[127]} \item[138] {\rm Sq(1)[139] + Sq(1)[138] + Sq(1)[137]} \\ $h_{0}:$ [139], [138], [137] \\ $h_{2}:$ [124] \\ $h_{3}:$ [112] \item[139] {\rm Sq(1)[140] + Sq(1)[138]} \\ $h_{0}:$ [140], [138] \\ $h_{2}:$ [124] \\ $h_{3}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[12/128] \mb{12/128} \begin{gl} \item[137] {\rm Sq(0,1)[134]} \item[138] {\rm Sq(3)[134]} \item[139] {\rm Sq(3)[136] + Sq(3)[135]} \\ $h_{3}:$ [116] \item[140] {\rm Sq(3)[137] + Sq(0,1)[137] + Sq(3)[135]} \\ $h_{3}:$ [116] \item[141] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{2}:$ [129] \\ $h_{3}:$ [116] \\ $h_{5}:$ [71] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[11/128] \mb{11/128} \begin{gl} \item[144] {\rm Sq(0,1)[137]} \\ $h_{5}:$ [76] \\ $h_{6}:$ [34] \item[145] {\rm Sq(1)[149] + Sq(1)[148]} \\ $h_{0}:$ [149], [148] \\ $h_{2}:$ [132] \\ $h_{4}:$ [109] \item[146] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{1}:$ [143] \\ $h_{4}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[10/128] \mb{10/128} \begin{gl} \item[148] {\rm Sq(0,1)[131]} \\ $h_{2}:$ [129], [128], [126] \\ $h_{4}:$ [111] \\ $h_{6}:$ [37] \item[149] {\rm Sq(3)[132]} \\ $h_{2}:$ [129], [128], [126] \\ $h_{4}:$ [111] \\ $h_{6}:$ [37] \item[150] {\rm Sq(3)[135] + Sq(0,1)[135] + Sq(3)[134] + Sq(0,1)[134] + Sq(3)[131]} \item[151] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{1}:$ [137] \\ $h_{2}:$ [126] \\ $h_{3}:$ [120] \\ $h_{4}:$ [111] \\ $h_{5}:$ [83], [82] \\ $h_{6}:$ [38], [37] \end{gl} \end{bdl} \begin{bdl} \item[9/128] \mb{9/128} \begin{gl} \item[142] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(3)[121] + Sq(3)[120] + Sq(3)[119]} \\ $h_{2}:$ [116], [115] \item[143] {\rm Sq(2)[125] + Sq(2)[123]} \\ $h_{1}:$ [125], [123] \item[144] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{3}:$ [111] \\ $h_{5}:$ [85] \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[8/128] \mb{8/128} \begin{gl} \item[130] {\rm Sq(3)[107]} \\ $h_{3}:$ [101] \\ $h_{5}:$ [81] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[7/128] \mb{7/128} \begin{gl} \item[114] {\rm Sq(3)[97]} \\ $h_{2}:$ [95] \\ $h_{6}:$ [39] \item[115] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [95] \\ $h_{6}:$ [39] \item[116] {\rm Sq(1)[104] + Sq(1)[103] + Sq(1)[101]} \\ $h_{0}:$ [104], [103], [101] \\ $h_{1}:$ [99] \\ $h_{2}:$ [96], [95] \end{gl} \end{bdl} \begin{bdl} \item[6/128] \mb{6/128} \begin{gl} \item[101] {\rm Sq(15,1)[76] + Sq(9,3)[76] + Sq(11,0,1)[76]} \item[102] {\rm Sq(1,1)[77]} \item[103] {\rm Sq(4)[77]} \\ $h_{2}:$ [77] \item[104] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[5/128] \mb{5/128} \begin{gl} \item[80] {\rm Sq(3)[53]} \end{gl} \end{bdl} \begin{bdl} \item[4/128] \mb{4/128} \begin{gl} \item[56] {\rm Sq(2)[37]} \\ $h_{1}:$ [37] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[2/128] \mb{2/128} \begin{gl} \item[23] {\rm Sq(2)[7]} \\ $h_{1}:$ [7] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \dm{129} \begin{bdl} \item[65/129] \mb{65/129} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[64/129] \mb{64/129} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[63/129] \mb{63/129} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[62/129] \mb{62/129} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[61/129] \mb{61/129} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[60/129] \mb{60/129} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[55/129] \mb{55/129} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[54/129] \mb{54/129} \begin{gl} \item[13] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[51/129] \mb{51/129} \begin{gl} \item[15] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[48/129] \mb{48/129} \begin{gl} \item[25] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[47/129] \mb{47/129} \begin{gl} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[46/129] \mb{46/129} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[45/129] \mb{45/129} \begin{gl} \item[28] {\rm Sq(1,1)[26]} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[44/129] \mb{44/129} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[43/129] \mb{43/129} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[42/129] \mb{42/129} \begin{gl} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[39/129] \mb{39/129} \begin{gl} \item[40] {\rm Sq(0,1)[41]} \item[41] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [43] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[38/129] \mb{38/129} \begin{gl} \item[45] {\rm Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[36/129] \mb{36/129} \begin{gl} \item[48] {\rm Sq(0,1)[51]} \item[49] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[35/129] \mb{35/129} \begin{gl} \item[54] {\rm Sq(0,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[33/129] \mb{33/129} \begin{gl} \item[65] {\rm Sq(0,1)[59]} \item[66] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[32/129] \mb{32/129} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(1)[68] + Sq(1)[67]} \\ $h_{0}:$ [68], [67] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[31/129] \mb{31/129} \begin{gl} \item[67] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [70] \item[68] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{1}:$ [70] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[30/129] \mb{30/129} \begin{gl} \item[72] {\rm Sq(1,1)[72] + Sq(1,1)[70]} \item[73] {\rm Sq(0,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[29/129] \mb{29/129} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{1}:$ [77] \\ $h_{2}:$ [72] \item[79] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[28/129] \mb{28/129} \begin{gl} \item[80] {\rm Sq(1)[87] + Sq(1)[86]} \\ $h_{0}:$ [87], [86] \\ $h_{2}:$ [77] \item[81] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \item[82] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [80], [79] \end{gl} \end{bdl} \begin{bdl} \item[27/129] \mb{27/129} \begin{gl} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(0,1)[88]} \item[88] {\rm Sq(0,1)[89]} \item[89] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \item[90] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[26/129] \mb{26/129} \begin{gl} \item[92] {\rm Sq(2,1)[87]} \item[93] {\rm Sq(0,1)[89]} \item[94] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[24/129] \mb{24/129} \begin{gl} \item[97] {\rm Sq(0,1)[97]} \item[98] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[23/129] \mb{23/129} \begin{gl} \item[103] {\rm Sq(3,1)[95] + Sq(3,1)[93] + Sq(0,2)[92]} \item[104] {\rm Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[22/129] \mb{22/129} \begin{gl} \item[107] {\rm Sq(1)[112] + Sq(1)[111]} \\ $h_{0}:$ [112], [111] \\ $h_{1}:$ [110], [109] \\ $h_{2}:$ [102] \\ $h_{5}:$ [47] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[21/129] \mb{21/129} \begin{gl} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(3)[112] + Sq(0,1)[112]} \item[113] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{1}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[20/129] \mb{20/129} \begin{gl} \item[117] {\rm Sq(0,1)[117]} \item[118] {\rm Sq(3)[118]} \end{gl} \end{bdl} \begin{bdl} \item[19/129] \mb{19/129} \begin{gl} \item[124] {\rm Sq(2)[128]} \\ $h_{1}:$ [128] \item[125] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{2}:$ [120], [119], [118] \\ $h_{4}:$ [89], [88] \end{gl} \end{bdl} \begin{bdl} \item[18/129] \mb{18/129} \begin{gl} \item[130] {\rm Sq(1,1)[124]} \item[131] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{1}:$ [134] \\ $h_{2}:$ [125] \\ $h_{3}:$ [113], [112] \end{gl} \end{bdl} \begin{bdl} \item[17/129] \mb{17/129} \begin{gl} \item[136] {\rm Sq(0,1)[130]} \item[137] {\rm Sq(3)[131] + Sq(0,1)[131] + Sq(0,1)[129]} \\ $h_{3}:$ [112], [111] \end{gl} \end{bdl} \begin{bdl} \item[16/129] \mb{16/129} \begin{gl} \item[139] {\rm Sq(3)[125] + Sq(0,1)[125]} \\ $h_{4}:$ [90] \item[140] {\rm Sq(2)[130]} \\ $h_{1}:$ [130] \end{gl} \end{bdl} \begin{bdl} \item[15/129] \mb{15/129} \begin{gl} \item[134] {\rm Sq(3,1)[119] + Sq(3,1)[117] + Sq(0,2)[117]} \item[135] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{2}:$ [125] \\ $h_{3}:$ [113] \\ $h_{4}:$ [95] \item[136] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \end{gl} \end{bdl} \begin{bdl} \item[14/129] \mb{14/129} \begin{gl} \item[136] {\rm Sq(0,1)[131]} \item[137] {\rm Sq(3)[132]} \\ $h_{3}:$ [113] \item[138] {\rm Sq(3)[133] + Sq(3)[131]} \item[139] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{1}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[13/129] \mb{13/129} \begin{gl} \item[140] {\rm Sq(1,1)[132]} \item[141] {\rm Sq(2)[138] + Sq(2)[137]} \\ $h_{1}:$ [138], [137] \\ $h_{4}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[12/129] \mb{12/129} \begin{gl} \item[142] {\rm Sq(1,1)[137] + Sq(1,1)[134]} \item[143] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{3}:$ [118] \item[144] {\rm Sq(1)[151] + Sq(1)[149]} \\ $h_{0}:$ [151], [149] \\ $h_{1}:$ [144] \\ $h_{2}:$ [137] \\ $h_{5}:$ [74] \\ $h_{6}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[11/129] \mb{11/129} \begin{gl} \item[147] {\rm Sq(3)[143] + Sq(0,1)[143]} \item[148] {\rm Sq(3)[144] + Sq(0,1)[143] + Sq(3)[142] + Sq(0,1)[142]} \item[149] {\rm Sq(3)[145] + Sq(0,1)[143] + Sq(0,1)[142]} \\ $h_{6}:$ [36] \item[150] {\rm Sq(2)[150]} \\ $h_{1}:$ [150] \item[151] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{2}:$ [137] \item[152] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{2}:$ [138], [137] \end{gl} \end{bdl} \begin{bdl} \item[10/129] \mb{10/129} \begin{gl} \item[152] {\rm Sq(3)[139] + Sq(0,1)[139]} \item[153] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{2}:$ [131] \item[154] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{1}:$ [143] \\ $h_{2}:$ [135], [134] \\ $h_{4}:$ [113], [112] \end{gl} \end{bdl} \begin{bdl} \item[9/129] \mb{9/129} \begin{gl} \item[145] {\rm Sq(0,1)[125] + Sq(0,1)[123]} \item[146] {\rm Sq(3)[125] + Sq(3)[123]} \item[147] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{2}:$ [118], [117] \item[148] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{2}:$ [120], [118], [117] \\ $h_{6}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[8/129] \mb{8/129} \begin{gl} \item[131] {\rm Sq(3)[110] + Sq(3)[109] + Sq(0,1)[109]} \item[132] {\rm Sq(3)[112] + Sq(0,1)[112] + Sq(0,1)[110] + Sq(3)[109] + Sq(0,1)[109]} \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[7/129] \mb{7/129} \begin{gl} \item[117] {\rm Sq(4)[97]} \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[5/129] \mb{5/129} \begin{gl} \item[81] {\rm Sq(17,3)[52] + Sq(11,5)[52] + Sq(19,0,1)[52] + Sq(13,2,1)[52] + Sq(10,3,1)[52] + Sq(7,4,1)[52] + Sq(4,5,1)[52] + Sq(6,2,2)[52] + Sq(5,0,3)[52] + Sq(8,1,0,1)[52] + Sq(2,3,0,1)[52] + Sq(1,1,1,1)[52]} \item[82] {\rm Sq(4)[53]} \\ $h_{2}:$ [53] \item[83] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{1}:$ [56] \\ $h_{2}:$ [54] \\ $h_{6}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[4/129] \mb{4/129} \begin{gl} \item[57] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [36] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[3/129] \mb{3/129} \begin{gl} \item[39] {\rm Sq(4)[21]} \\ $h_{2}:$ [21] \\ $h_{6}:$ [18] \item[40] {\rm Sq(2)[23]} \\ $h_{1}:$ [23] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \dm{130} \begin{bdl} \item[66/130] \mb{66/130} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[61/130] \mb{61/130} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[60/130] \mb{60/130} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[59/130] \mb{59/130} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[58/130] \mb{58/130} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[57/130] \mb{57/130} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[56/130] \mb{56/130} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[53/130] \mb{53/130} \begin{gl} \item[17] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[50/130] \mb{50/130} \begin{gl} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[47/130] \mb{47/130} \begin{gl} \item[24] {\rm Sq(0,1)[24] + Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[44/130] \mb{44/130} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[43/130] \mb{43/130} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[42/130] \mb{42/130} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [34] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36], [34] \end{gl} \end{bdl} \begin{bdl} \item[41/130] \mb{41/130} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[40/130] \mb{40/130} \begin{gl} \item[38] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[38/130] \mb{38/130} \begin{gl} \item[46] {\rm Sq(0,1)[46]} \item[47] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[37/130] \mb{37/130} \begin{gl} \item[48] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[35/130] \mb{35/130} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[34/130] \mb{34/130} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[32/130] \mb{32/130} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[31/130] \mb{31/130} \begin{gl} \item[69] {\rm Sq(0,1)[71]} \item[70] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{1}:$ [72] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[30/130] \mb{30/130} \begin{gl} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[29/130] \mb{29/130} \begin{gl} \item[80] {\rm Sq(0,1)[78] + Sq(0,1)[77]} \item[81] {\rm Sq(0,1)[79] + Sq(0,1)[77]} \item[82] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[28/130] \mb{28/130} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(1)[93] + Sq(1)[92]} \\ $h_{0}:$ [93], [92] \\ $h_{3}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[27/130] \mb{27/130} \begin{gl} \item[91] {\rm Sq(2)[92]} \\ $h_{1}:$ [92] \item[92] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [93] \\ $h_{2}:$ [90] \item[93] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [93] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[26/130] \mb{26/130} \begin{gl} \item[95] {\rm Sq(1,1)[90] + Sq(1,1)[89]} \item[96] {\rm Sq(0,1)[92]} \item[97] {\rm Sq(0,1)[93]} \item[98] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{2}:$ [89] \item[99] {\rm Sq(1)[97] + Sq(1)[96]} \\ $h_{0}:$ [97], [96] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[25/130] \mb{25/130} \begin{gl} \item[95] {\rm Sq(1,1)[93]} \item[96] {\rm Sq(0,1)[95]} \item[97] {\rm Sq(0,1)[96]} \end{gl} \end{bdl} \begin{bdl} \item[23/130] \mb{23/130} \begin{gl} \item[105] {\rm Sq(1,1)[103] + Sq(1,1)[102]} \item[106] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[22/130] \mb{22/130} \begin{gl} \item[108] {\rm Sq(0,1)[109]} \item[109] {\rm Sq(0,1)[110]} \item[110] {\rm Sq(3)[110] + Sq(3)[109]} \\ $h_{2}:$ [106] \item[111] {\rm Sq(2)[112]} \\ $h_{1}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[20/130] \mb{20/130} \begin{gl} \item[119] {\rm Sq(3,1)[113] + Sq(0,2)[112]} \item[120] {\rm Sq(0,1)[122]} \item[121] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{1}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[19/130] \mb{19/130} \begin{gl} \item[126] {\rm Sq(0,1)[127]} \item[127] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[18/130] \mb{18/130} \begin{gl} \item[132] {\rm Sq(3)[134]} \end{gl} \end{bdl} \begin{bdl} \item[17/130] \mb{17/130} \begin{gl} \item[138] {\rm Sq(1,1)[133] + Sq(1,1)[132] + Sq(1,1)[131]} \item[139] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{2}:$ [132], [130] \\ $h_{5}:$ [60] \\ $h_{6}:$ [26] \item[140] {\rm Sq(1)[144] + Sq(1)[143]} \\ $h_{0}:$ [144], [143] \\ $h_{1}:$ [140] \\ $h_{2}:$ [132], [131], [130] \\ $h_{3}:$ [116], [115] \\ $h_{5}:$ [60] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[16/130] \mb{16/130} \begin{gl} \item[141] {\rm Sq(3)[131] + Sq(0,1)[131] + Sq(0,1)[130] + Sq(3)[129] + Sq(0,1)[129]} \\ $h_{3}:$ [110] \item[142] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{2}:$ [125] \\ $h_{6}:$ [25] \item[143] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{2}:$ [126], [125], [124] \\ $h_{4}:$ [93] \item[144] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{2}:$ [126] \\ $h_{3}:$ [112], [110] \\ $h_{4}:$ [93] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[15/130] \mb{15/130} \begin{gl} \item[137] {\rm Sq(3)[133] + Sq(0,1)[133] + Sq(0,1)[132]} \\ $h_{6}:$ [27] \item[138] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{4}:$ [97] \item[139] {\rm Sq(1)[143] + Sq(1)[140]} \\ $h_{0}:$ [143], [140] \\ $h_{3}:$ [115] \\ $h_{4}:$ [97] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[14/130] \mb{14/130} \begin{gl} \item[140] {\rm Sq(0,1)[137] + Sq(0,1)[136]} \\ $h_{4}:$ [95] \item[141] {\rm Sq(3)[137]} \\ $h_{4}:$ [95] \item[142] {\rm Sq(3)[139] + Sq(0,1)[139]} \\ $h_{3}:$ [116] \item[143] {\rm Sq(1)[145] + Sq(1)[144] + Sq(1)[142]} \\ $h_{0}:$ [145], [144], [142] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[13/130] \mb{13/130} \begin{gl} \item[142] {\rm Sq(2,1)[130]} \item[143] {\rm Sq(0,1)[138] + Sq(0,1)[137]} \item[144] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{3}:$ [117], [116] \item[145] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{3}:$ [117], [116] \end{gl} \end{bdl} \begin{bdl} \item[12/130] \mb{12/130} \begin{gl} \item[145] {\rm Sq(0,1)[144]} \\ $h_{3}:$ [121], [119] \item[146] {\rm Sq(3)[144]} \\ $h_{3}:$ [121], [119] \item[147] {\rm Sq(2)[150] + Sq(2)[148]} \\ $h_{1}:$ [150], [148] \\ $h_{3}:$ [121], [120] \\ $h_{4}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[11/130] \mb{11/130} \begin{gl} \item[153] {\rm Sq(3)[150] + Sq(0,1)[150]} \item[154] {\rm Sq(2)[152]} \\ $h_{1}:$ [152] \\ $h_{2}:$ [143], [142] \end{gl} \end{bdl} \begin{bdl} \item[10/130] \mb{10/130} \begin{gl} \item[155] {\rm Sq(5)[134] + Sq(2,1)[134] + Sq(2,1)[132] + Sq(5)[131]} \item[156] {\rm Sq(1,1)[139]} \\ $h_{5}:$ [86] \\ $h_{6}:$ [39] \item[157] {\rm Sq(1,1)[140]} \\ $h_{3}:$ [121] \item[158] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{3}:$ [122], [121] \\ $h_{5}:$ [86] \\ $h_{6}:$ [39] \item[159] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146] \\ $h_{2}:$ [139] \\ $h_{3}:$ [122], [121] \\ $h_{5}:$ [86] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[9/130] \mb{9/130} \begin{gl} \item[149] {\rm Sq(3)[130] + Sq(0,1)[130]} \\ $h_{3}:$ [113] \item[150] {\rm Sq(2)[132] + Sq(2)[131]} \\ $h_{1}:$ [132], [131] \\ $h_{2}:$ [125], [124], [123] \\ $h_{6}:$ [42] \item[151] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{2}:$ [125], [123] \\ $h_{3}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[8/130] \mb{8/130} \begin{gl} \item[133] {\rm Sq(5)[108] + Sq(2,1)[108] + Sq(2,1)[107]} \item[134] {\rm Sq(3)[115] + Sq(0,1)[115] + Sq(3)[114] + Sq(0,1)[114]} \\ $h_{2}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[7/130] \mb{7/130} \begin{gl} \item[118] {\rm Sq(3)[104] + Sq(0,1)[104] + Sq(0,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[6/130] \mb{6/130} \begin{gl} \item[105] {\rm Sq(3)[80] + Sq(0,1)[80]} \\ $h_{6}:$ [39], [38] \end{gl} \end{bdl} \begin{bdl} \item[4/130] \mb{4/130} \begin{gl} \item[58] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{1}:$ [40] \\ $h_{2}:$ [38] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[3/130] \mb{3/130} \begin{gl} \item[41] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [22] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[2/130] \mb{2/130} \begin{gl} \item[24] {\rm Sq(4)[7]} \\ $h_{2}:$ [7] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \dm{131} \begin{bdl} \item[67/131] \mb{67/131} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[66/131] \mb{66/131} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[65/131] \mb{65/131} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[57/131] \mb{57/131} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[56/131] \mb{56/131} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[55/131] \mb{55/131} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[52/131] \mb{52/131} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[49/131] \mb{49/131} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[48/131] \mb{48/131} \begin{gl} \item[26] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[47/131] \mb{47/131} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[46/131] \mb{46/131} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29] + Sq(3)[28]} \end{gl} \end{bdl} \begin{bdl} \item[44/131] \mb{44/131} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [24], [23] \end{gl} \end{bdl} \begin{bdl} \item[43/131] \mb{43/131} \begin{gl} \item[35] {\rm Sq(0,1)[37] + Sq(0,1)[36]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[42/131] \mb{42/131} \begin{gl} \item[40] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[41/131] \mb{41/131} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [30] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[40/131] \mb{40/131} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[39/131] \mb{39/131} \begin{gl} \item[42] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[37/131] \mb{37/131} \begin{gl} \item[49] {\rm Sq(0,1)[48]} \item[50] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[36/131] \mb{36/131} \begin{gl} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[34/131] \mb{34/131} \begin{gl} \item[64] {\rm Sq(0,1)[65]} \item[65] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[33/131] \mb{33/131} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(3)[65] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[32/131] \mb{32/131} \begin{gl} \item[68] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[31/131] \mb{31/131} \begin{gl} \item[71] {\rm Sq(0,1)[73] + Sq(0,1)[72]} \item[72] {\rm Sq(0,1)[74]} \item[73] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[30/131] \mb{30/131} \begin{gl} \item[77] {\rm Sq(1,1)[76]} \item[78] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[29/131] \mb{29/131} \begin{gl} \item[83] {\rm Sq(1)[89] + Sq(1)[86] + Sq(1)[85]} \\ $h_{0}:$ [89], [86], [85] \\ $h_{2}:$ [77] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[28/131] \mb{28/131} \begin{gl} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(0,1)[88]} \item[88] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \item[89] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{3}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[27/131] \mb{27/131} \begin{gl} \item[94] {\rm Sq(0,1)[94] + Sq(3)[92] + Sq(0,1)[92]} \item[95] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[26/131] \mb{26/131} \begin{gl} \item[100] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[25/131] \mb{25/131} \begin{gl} \item[98] {\rm Sq(1,1)[96] + Sq(1,1)[95]} \item[99] {\rm Sq(0,1)[97]} \item[100] {\rm Sq(0,1)[98]} \item[101] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[24/131] \mb{24/131} \begin{gl} \item[99] {\rm Sq(1,1)[102]} \item[100] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[23/131] \mb{23/131} \begin{gl} \item[107] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{1}:$ [111], [109], [108] \\ $h_{2}:$ [105] \\ $h_{3}:$ [93] \\ $h_{4}:$ [78] \\ $h_{5}:$ [48] \\ $h_{6}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[22/131] \mb{22/131} \begin{gl} \item[112] {\rm Sq(0,1)[111]} \end{gl} \end{bdl} \begin{bdl} \item[21/131] \mb{21/131} \begin{gl} \item[114] {\rm Sq(0,1)[117]} \item[115] {\rm Sq(3)[118] + Sq(0,1)[118]} \\ $h_{2}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[20/131] \mb{20/131} \begin{gl} \item[122] {\rm Sq(1,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[19/131] \mb{19/131} \begin{gl} \item[128] {\rm Sq(0,2)[118]} \item[129] {\rm Sq(3)[130]} \end{gl} \end{bdl} \begin{bdl} \item[18/131] \mb{18/131} \begin{gl} \item[133] {\rm Sq(0,1)[136]} \item[134] {\rm Sq(2)[138]} \\ $h_{1}:$ [138] \\ $h_{2}:$ [133] \\ $h_{3}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[16/131] \mb{16/131} \begin{gl} \item[145] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{1}:$ [137] \\ $h_{2}:$ [131], [129] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[15/131] \mb{15/131} \begin{gl} \item[140] {\rm Sq(3)[138] + Sq(3)[137] + Sq(3)[136]} \\ $h_{2}:$ [133] \\ $h_{3}:$ [119], [117] \item[141] {\rm Sq(2)[141]} \\ $h_{1}:$ [141] \\ $h_{3}:$ [118] \\ $h_{4}:$ [99] \item[142] {\rm Sq(2)[142]} \\ $h_{1}:$ [142] \\ $h_{2}:$ [133] \\ $h_{3}:$ [120], [119] \item[143] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{2}:$ [132] \\ $h_{6}:$ [28] \item[144] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{2}:$ [134], [133], [132] \end{gl} \end{bdl} \begin{bdl} \item[14/131] \mb{14/131} \begin{gl} \item[144] {\rm Sq(0,1)[140]} \\ $h_{6}:$ [30] \item[145] {\rm Sq(2)[143] + Sq(2)[142]} \\ $h_{1}:$ [143], [142] \\ $h_{3}:$ [121], [119] \\ $h_{4}:$ [97] \item[146] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{2}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[13/131] \mb{13/131} \begin{gl} \item[146] {\rm Sq(1,1)[141] + Sq(1,1)[140] + Sq(1,1)[137]} \item[147] {\rm Sq(1)[150] + Sq(1)[148]} \\ $h_{0}:$ [150], [148] \\ $h_{1}:$ [146], [145] \\ $h_{2}:$ [140], [139], [137] \\ $h_{3}:$ [121], [120] \\ $h_{4}:$ [94] \item[148] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146], [145] \\ $h_{3}:$ [121], [120] \item[149] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{1}:$ [146] \\ $h_{2}:$ [137] \\ $h_{3}:$ [122], [120] \end{gl} \end{bdl} \begin{bdl} \item[12/131] \mb{12/131} \begin{gl} \item[148] {\rm Sq(3)[151] + Sq(0,1)[151] + Sq(3)[149] + Sq(0,1)[149] + Sq(3)[147] + Sq(0,1)[147]} \item[149] {\rm Sq(2)[153]} \\ $h_{1}:$ [153] \\ $h_{3}:$ [125], [124] \item[150] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{3}:$ [126], [125] \item[151] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{3}:$ [126], [125] \item[152] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{3}:$ [127], [125], [124] \item[153] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{2}:$ [144] \\ $h_{3}:$ [128], [126], [125] \\ $h_{5}:$ [77] \\ $h_{6}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[11/131] \mb{11/131} \begin{gl} \item[155] {\rm Sq(0,1)[152]} \item[156] {\rm Sq(3)[152]} \item[157] {\rm Sq(3)[153] + Sq(0,1)[153]} \\ $h_{3}:$ [127] \item[158] {\rm Sq(1)[163] + Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [163], [161], [160] \\ $h_{3}:$ [131] \\ $h_{5}:$ [82] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[10/131] \mb{10/131} \begin{gl} \item[160] {\rm Sq(3)[146]} \\ $h_{2}:$ [142] \\ $h_{3}:$ [123] \item[161] {\rm Sq(3)[147] + Sq(0,1)[147] + Sq(0,1)[146]} \item[162] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{2}:$ [142] \\ $h_{3}:$ [124] \item[163] {\rm Sq(1)[156] + Sq(1)[153] + Sq(1)[152]} \\ $h_{0}:$ [156], [153], [152] \\ $h_{2}:$ [142] \\ $h_{3}:$ [125], [124], [123] \\ $h_{6}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[9/131] \mb{9/131} \begin{gl} \item[152] {\rm Sq(5)[126] + Sq(2,1)[126] + Sq(5)[124] + Sq(2,1)[124]} \\ $h_{3}:$ [114] \\ $h_{6}:$ [43] \item[153] {\rm Sq(3)[131]} \\ $h_{3}:$ [114] \item[154] {\rm Sq(3)[132] + Sq(0,1)[132] + Sq(0,1)[131]} \item[155] {\rm Sq(2)[133]} \\ $h_{1}:$ [133] \item[156] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{3}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[8/131] \mb{8/131} \begin{gl} \item[135] {\rm Sq(1,1)[115] + Sq(4)[114]} \\ $h_{2}:$ [114] \\ $h_{3}:$ [104] \\ $h_{6}:$ [43] \item[136] {\rm Sq(1,1)[116]} \item[137] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{2}:$ [114] \\ $h_{3}:$ [105], [104] \\ $h_{6}:$ [44], [43] \item[138] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{1}:$ [118] \\ $h_{2}:$ [115], [114] \\ $h_{3}:$ [105], [103] \\ $h_{6}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[7/131] \mb{7/131} \begin{gl} \item[119] {\rm Sq(1,1)[103] + Sq(1,1)[102]} \\ $h_{3}:$ [94] \item[120] {\rm Sq(1,1)[104] + Sq(4)[102] + Sq(1,1)[102] + Sq(1,1)[101]} \\ $h_{2}:$ [102] \\ $h_{3}:$ [94] \end{gl} \end{bdl} \dm{132} \begin{bdl} \item[62/132] \mb{62/132} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[61/132] \mb{61/132} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[60/132] \mb{60/132} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[54/132] \mb{54/132} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[51/132] \mb{51/132} \begin{gl} \item[16] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[48/132] \mb{48/132} \begin{gl} \item[27] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[47/132] \mb{47/132} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[46/132] \mb{46/132} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[45/132] \mb{45/132} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[44/132] \mb{44/132} \begin{gl} \item[33] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [33] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[43/132] \mb{43/132} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [18] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [28] \\ $h_{4}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[42/132] \mb{42/132} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[41/132] \mb{41/132} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[40/132] \mb{40/132} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[39/132] \mb{39/132} \begin{gl} \item[43] {\rm Sq(0,1)[46]} \item[44] {\rm Sq(3)[46]} \item[45] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[38/132] \mb{38/132} \begin{gl} \item[48] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[36/132] \mb{36/132} \begin{gl} \item[51] {\rm Sq(0,1)[55]} \item[52] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[35/132] \mb{35/132} \begin{gl} \item[57] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[34/132] \mb{34/132} \begin{gl} \item[66] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[33/132] \mb{33/132} \begin{gl} \item[69] {\rm Sq(0,1)[66]} \item[70] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[32/132] \mb{32/132} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[31/132] \mb{31/132} \begin{gl} \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [77] \\ $h_{2}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[30/132] \mb{30/132} \begin{gl} \item[79] {\rm Sq(1,1)[78]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[29/132] \mb{29/132} \begin{gl} \item[84] {\rm Sq(0,1)[83]} \item[85] {\rm Sq(1)[91] + Sq(1)[90]} \\ $h_{0}:$ [91], [90] \\ $h_{1}:$ [88] \\ $h_{2}:$ [81], [80] \\ $h_{3}:$ [68] \\ $h_{4}:$ [53] \item[86] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{1}:$ [88], [86], [85] \\ $h_{2}:$ [81] \\ $h_{3}:$ [71], [68] \end{gl} \end{bdl} \begin{bdl} \item[28/132] \mb{28/132} \begin{gl} \item[90] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [90], [87], [86] \\ $h_{4}:$ [60] \item[91] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{2}:$ [90], [89] \item[92] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [89] \\ $h_{3}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[27/132] \mb{27/132} \begin{gl} \item[96] {\rm Sq(0,1)[96] + Sq(0,1)[95]} \item[97] {\rm Sq(0,1)[97] + Sq(0,1)[95]} \item[98] {\rm Sq(3)[99] + Sq(0,1)[99] + Sq(0,1)[95]} \item[99] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [93] \\ $h_{4}:$ [67] \item[100] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [93], [92] \item[101] {\rm Sq(1)[105] + Sq(1)[103] + Sq(1)[102]} \\ $h_{0}:$ [105], [103], [102] \\ $h_{2}:$ [92] \\ $h_{3}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[26/132] \mb{26/132} \begin{gl} \item[101] {\rm Sq(0,1)[95]} \item[102] {\rm Sq(0,1)[96]} \item[103] {\rm Sq(0,1)[97]} \item[104] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \item[105] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[25/132] \mb{25/132} \begin{gl} \item[102] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \item[103] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[24/132] \mb{24/132} \begin{gl} \item[101] {\rm Sq(0,1)[105]} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \item[104] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[23/132] \mb{23/132} \begin{gl} \item[108] {\rm Sq(3)[108] + Sq(0,1)[108]} \item[109] {\rm Sq(0,1)[109] + Sq(0,1)[108]} \item[110] {\rm Sq(3)[109]} \item[111] {\rm Sq(3)[111]} \end{gl} \end{bdl} \begin{bdl} \item[22/132] \mb{22/132} \begin{gl} \item[113] {\rm Sq(5)[109] + Sq(2,1)[109]} \item[114] {\rm Sq(2,1)[110]} \end{gl} \end{bdl} \begin{bdl} \item[21/132] \mb{21/132} \begin{gl} \item[116] {\rm Sq(0,1)[120] + Sq(0,1)[119]} \item[117] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [118] \\ $h_{5}:$ [51] \\ $h_{6}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[20/132] \mb{20/132} \begin{gl} \item[123] {\rm Sq(0,1)[126]} \item[124] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{5}:$ [57] \\ $h_{6}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[19/132] \mb{19/132} \begin{gl} \item[130] {\rm Sq(3,1)[124] + Sq(0,2)[122]} \item[131] {\rm Sq(3)[132] + Sq(0,1)[132]} \\ $h_{5}:$ [63] \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[18/132] \mb{18/132} \begin{gl} \item[135] {\rm Sq(1,1)[136]} \item[136] {\rm Sq(3)[138]} \end{gl} \end{bdl} \begin{bdl} \item[17/132] \mb{17/132} \begin{gl} \item[141] {\rm Sq(0,2)[130] + Sq(3,1)[129]} \item[142] {\rm Sq(3)[143] + Sq(0,1)[143] + Sq(3)[142] + Sq(0,1)[142] + Sq(0,1)[141]} \\ $h_{2}:$ [139] \\ $h_{3}:$ [122] \\ $h_{4}:$ [101], [100] \end{gl} \end{bdl} \begin{bdl} \item[16/132] \mb{16/132} \begin{gl} \item[146] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{1}:$ [141] \\ $h_{3}:$ [119], [118] \\ $h_{4}:$ [99], [98] \end{gl} \end{bdl} \begin{bdl} \item[15/132] \mb{15/132} \begin{gl} \item[145] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{2}:$ [138] \\ $h_{3}:$ [124], [122] \item[146] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{4}:$ [102], [100] \end{gl} \end{bdl} \begin{bdl} \item[14/132] \mb{14/132} \begin{gl} \item[147] {\rm Sq(3)[144] + Sq(0,1)[144] + Sq(3)[143] + Sq(0,1)[142]} \\ $h_{3}:$ [123] \item[148] {\rm Sq(3)[145] + Sq(0,1)[145] + Sq(3)[143] + Sq(0,1)[143] + Sq(3)[142]} \\ $h_{3}:$ [123] \item[149] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{3}:$ [125], [123] \item[150] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146] \\ $h_{2}:$ [140] \item[151] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{4}:$ [100] \end{gl} \end{bdl} \begin{bdl} \item[13/132] \mb{13/132} \begin{gl} \item[150] {\rm Sq(0,1)[146] + Sq(0,1)[145]} \\ $h_{3}:$ [124] \item[151] {\rm Sq(3)[146]} \item[152] {\rm Sq(2)[148]} \\ $h_{1}:$ [148] \\ $h_{3}:$ [125] \\ $h_{4}:$ [96] \item[153] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{4}:$ [98] \end{gl} \end{bdl} \begin{bdl} \item[12/132] \mb{12/132} \begin{gl} \item[154] {\rm Sq(2)[155]} \\ $h_{1}:$ [155] \\ $h_{4}:$ [103] \item[155] {\rm Sq(2)[156]} \\ $h_{1}:$ [156] \item[156] {\rm Sq(1)[160] + Sq(1)[159]} \\ $h_{0}:$ [160], [159] \\ $h_{4}:$ [104] \item[157] {\rm Sq(1)[164] + Sq(1)[163] + Sq(1)[161] + Sq(1)[159]} \\ $h_{0}:$ [164], [163], [161], [159] \\ $h_{1}:$ [157] \\ $h_{2}:$ [151], [147] \\ $h_{3}:$ [132], [130], [129] \\ $h_{4}:$ [104], [103] \item[158] {\rm Sq(1)[166] + Sq(1)[163] + Sq(1)[161]} \\ $h_{0}:$ [166], [163], [161] \\ $h_{2}:$ [151], [149] \\ $h_{3}:$ [133] \\ $h_{4}:$ [105], [103] \\ $h_{5}:$ [80] \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[11/132] \mb{11/132} \begin{gl} \item[159] {\rm Sq(3)[155] + Sq(0,1)[155]} \\ $h_{3}:$ [132] \item[160] {\rm Sq(3)[157] + Sq(3)[156] + Sq(0,1)[155]} \\ $h_{3}:$ [132] \\ $h_{4}:$ [113] \item[161] {\rm Sq(3)[158] + Sq(0,1)[158] + Sq(0,1)[157] + Sq(0,1)[156] + Sq(0,1)[155]} \\ $h_{2}:$ [152] \\ $h_{3}:$ [133], [132] \\ $h_{4}:$ [113] \item[162] {\rm Sq(2)[161]} \\ $h_{1}:$ [161] \\ $h_{3}:$ [133], [132] \\ $h_{4}:$ [113] \item[163] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{3}:$ [134], [132] \item[164] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{3}:$ [135], [134], [133], [132] \item[165] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{2}:$ [153] \\ $h_{3}:$ [135], [133], [132] \\ $h_{4}:$ [114], [113] \\ $h_{6}:$ [40] \item[166] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{3}:$ [136] \\ $h_{4}:$ [114], [113] \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[10/132] \mb{10/132} \begin{gl} \item[164] {\rm Sq(0,1)[149]} \\ $h_{3}:$ [128] \item[165] {\rm Sq(3)[151] + Sq(0,1)[151]} \\ $h_{3}:$ [129], [128], [127], [126] \item[166] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{1}:$ [154], [153], [152] \\ $h_{2}:$ [148], [147] \\ $h_{3}:$ [130], [126] \\ $h_{5}:$ [93] \\ $h_{6}:$ [43], [42] \item[167] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{2}:$ [146] \\ $h_{3}:$ [129], [127], [126] \item[168] {\rm Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [161], [160] \\ $h_{3}:$ [130], [127] \end{gl} \end{bdl} \begin{bdl} \item[9/132] \mb{9/132} \begin{gl} \item[157] {\rm Sq(4)[132] + Sq(1,1)[132] + Sq(4)[131] + Sq(1,1)[131]} \\ $h_{2}:$ [132], [131] \\ $h_{3}:$ [115] \\ $h_{5}:$ [93] \\ $h_{6}:$ [45] \item[158] {\rm Sq(0,1)[133]} \\ $h_{3}:$ [116], [115] \item[159] {\rm Sq(3)[133]} \item[160] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{2}:$ [131] \\ $h_{3}:$ [115] \item[161] {\rm Sq(1)[143] + Sq(1)[141]} \\ $h_{0}:$ [143], [141] \\ $h_{2}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[8/132] \mb{8/132} \begin{gl} \item[139] {\rm Sq(5)[115] + Sq(2,1)[115] + Sq(2,1)[114]} \item[140] {\rm Sq(4)[117] + Sq(1,1)[117]} \\ $h_{2}:$ [117] \item[141] {\rm Sq(3)[118]} \item[142] {\rm Sq(1)[122] + Sq(1)[121]} \\ $h_{0}:$ [122], [121] \\ $h_{1}:$ [119] \\ $h_{3}:$ [106] \\ $h_{5}:$ [88], [87] \item[143] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[7/132] \mb{7/132} \begin{gl} \item[121] {\rm Sq(3)[105] + Sq(0,1)[105]} \\ $h_{3}:$ [95] \\ $h_{6}:$ [44] \item[122] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{3}:$ [96] \\ $h_{6}:$ [44] \item[123] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[6/132] \mb{6/132} \begin{gl} \item[106] {\rm Sq(2,1)[80]} \\ $h_{3}:$ [77] \item[107] {\rm Sq(5)[80]} \item[108] {\rm Sq(4)[81] + Sq(1,1)[81]} \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[4/132] \mb{4/132} \begin{gl} \item[59] {\rm Sq(4)[39] + Sq(1,1)[39]} \\ $h_{2}:$ [39] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \dm{133} \begin{bdl} \item[61/133] \mb{61/133} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[60/133] \mb{60/133} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[59/133] \mb{59/133} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[58/133] \mb{58/133} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[57/133] \mb{57/133} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[56/133] \mb{56/133} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[55/133] \mb{55/133} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[54/133] \mb{54/133} \begin{gl} \item[15] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[53/133] \mb{53/133} \begin{gl} \item[18] {\rm Sq(0,1)[17]} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[52/133] \mb{52/133} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[51/133] \mb{51/133} \begin{gl} \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[50/133] \mb{50/133} \begin{gl} \item[20] {\rm Sq(3,1)[24]} \item[21] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[47/133] \mb{47/133} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[45/133] \mb{45/133} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[44/133] \mb{44/133} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[43/133] \mb{43/133} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[42/133] \mb{42/133} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [39] \\ $h_{4}:$ [24] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41], [39] \\ $h_{3}:$ [33] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[41/133] \mb{41/133} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45] + Sq(1)[43]} \\ $h_{0}:$ [45], [43] \\ $h_{2}:$ [38] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[40/133] \mb{40/133} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[39/133] \mb{39/133} \begin{gl} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{3}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[38/133] \mb{38/133} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \item[51] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[37/133] \mb{37/133} \begin{gl} \item[51] {\rm Sq(0,1)[50]} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[36/133] \mb{36/133} \begin{gl} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[35/133] \mb{35/133} \begin{gl} \item[58] {\rm Sq(0,1)[64]} \item[59] {\rm Sq(0,1)[65]} \item[60] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[34/133] \mb{34/133} \begin{gl} \item[67] {\rm Sq(3,1)[64] + Sq(3,1)[63]} \item[68] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[33/133] \mb{33/133} \begin{gl} \item[71] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[32/133] \mb{32/133} \begin{gl} \item[70] {\rm Sq(0,1)[71]} \item[71] {\rm Sq(0,1)[72]} \item[72] {\rm Sq(3)[73] + Sq(0,1)[73]} \end{gl} \end{bdl} \begin{bdl} \item[31/133] \mb{31/133} \begin{gl} \item[75] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[29/133] \mb{29/133} \begin{gl} \item[87] {\rm Sq(0,1)[85]} \item[88] {\rm Sq(0,1)[86]} \item[89] {\rm Sq(3)[89] + Sq(0,1)[89] + Sq(3)[88] + Sq(0,1)[87] + Sq(3)[86] + Sq(3)[85]} \end{gl} \end{bdl} \begin{bdl} \item[28/133] \mb{28/133} \begin{gl} \item[93] {\rm Sq(0,1)[94]} \end{gl} \end{bdl} \begin{bdl} \item[27/133] \mb{27/133} \begin{gl} \item[102] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{1}:$ [101] \\ $h_{2}:$ [98] \item[103] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [103], [102] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[26/133] \mb{26/133} \begin{gl} \item[106] {\rm Sq(0,1)[99] + Sq(0,1)[98]} \item[107] {\rm Sq(0,1)[100] + Sq(0,1)[98]} \item[108] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [95] \item[109] {\rm Sq(1)[107] + Sq(1)[104]} \\ $h_{0}:$ [107], [104] \\ $h_{2}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[25/133] \mb{25/133} \begin{gl} \item[104] {\rm Sq(2,1)[98]} \item[105] {\rm Sq(0,1)[99]} \item[106] {\rm Sq(0,1)[100]} \item[107] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[24/133] \mb{24/133} \begin{gl} \item[105] {\rm Sq(2)[108]} \\ $h_{1}:$ [108] \item[106] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{1}:$ [111], [109] \\ $h_{2}:$ [106], [105] \\ $h_{3}:$ [95] \\ $h_{4}:$ [76] \\ $h_{5}:$ [47] \\ $h_{6}:$ [14] \item[107] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[23/133] \mb{23/133} \begin{gl} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(2)[114] + Sq(2)[113]} \\ $h_{1}:$ [114], [113] \\ $h_{2}:$ [110] \item[114] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[22/133] \mb{22/133} \begin{gl} \item[115] {\rm Sq(2,1)[112]} \item[116] {\rm Sq(0,1)[114]} \item[117] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \item[118] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{3}:$ [102] \\ $h_{5}:$ [54] \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[21/133] \mb{21/133} \begin{gl} \item[118] {\rm Sq(2,1)[117]} \item[119] {\rm Sq(0,1)[122]} \item[120] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{5}:$ [53] \\ $h_{6}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[20/133] \mb{20/133} \begin{gl} \item[125] {\rm Sq(0,1)[128]} \item[126] {\rm Sq(2)[131]} \\ $h_{1}:$ [131] \\ $h_{5}:$ [59], [58] \\ $h_{6}:$ [18] \item[127] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{5}:$ [58] \\ $h_{6}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[19/133] \mb{19/133} \begin{gl} \item[132] {\rm Sq(0,1)[133]} \item[133] {\rm Sq(2)[136]} \\ $h_{1}:$ [136] \\ $h_{2}:$ [132] \item[134] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{6}:$ [22] \item[135] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{2}:$ [132] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[18/133] \mb{18/133} \begin{gl} \item[137] {\rm Sq(1,1)[139] + Sq(1,1)[138]} \\ $h_{6}:$ [26] \item[138] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[17/133] \mb{17/133} \begin{gl} \item[143] {\rm Sq(2,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[16/133] \mb{16/133} \begin{gl} \item[147] {\rm Sq(3)[140] + Sq(0,1)[140]} \item[148] {\rm Sq(3)[143] + Sq(0,1)[143]} \item[149] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{2}:$ [137] \\ $h_{5}:$ [65] \\ $h_{6}:$ [28] \item[150] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{2}:$ [138] \\ $h_{3}:$ [122] \\ $h_{4}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[15/133] \mb{15/133} \begin{gl} \item[147] {\rm Sq(3)[146] + Sq(0,1)[146] + Sq(3)[144]} \\ $h_{6}:$ [30] \item[148] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{2}:$ [141] \\ $h_{3}:$ [125] \\ $h_{4}:$ [107], [106] \end{gl} \end{bdl} \begin{bdl} \item[14/133] \mb{14/133} \begin{gl} \item[152] {\rm Sq(2,1)[140]} \item[153] {\rm Sq(3)[148] + Sq(0,1)[148] + Sq(3)[147] + Sq(0,1)[147] + Sq(3)[146] + Sq(0,1)[146]} \item[154] {\rm Sq(1)[155] + Sq(1)[154]} \\ $h_{0}:$ [155], [154] \\ $h_{1}:$ [150] \\ $h_{2}:$ [145], [144] \\ $h_{3}:$ [129] \\ $h_{4}:$ [104] \item[155] {\rm Sq(1)[158] + Sq(1)[154]} \\ $h_{0}:$ [158], [154] \\ $h_{4}:$ [105], [104] \end{gl} \end{bdl} \begin{bdl} \item[13/133] \mb{13/133} \begin{gl} \item[154] {\rm Sq(3)[148]} \\ $h_{4}:$ [100] \item[155] {\rm Sq(3)[151] + Sq(0,1)[151] + Sq(3)[149]} \\ $h_{2}:$ [146], [145] \\ $h_{3}:$ [130], [129] \item[156] {\rm Sq(2)[154]} \\ $h_{1}:$ [154] \\ $h_{3}:$ [130] \\ $h_{4}:$ [101] \item[157] {\rm Sq(2)[155]} \\ $h_{1}:$ [155] \\ $h_{2}:$ [146], [145] \\ $h_{3}:$ [129] \item[158] {\rm Sq(1)[161] + Sq(1)[159]} \\ $h_{0}:$ [161], [159] \\ $h_{4}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[12/133] \mb{12/133} \begin{gl} \item[159] {\rm Sq(3)[157] + Sq(3)[156] + Sq(0,1)[156] + Sq(3)[155] + Sq(0,1)[155]} \item[160] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \\ $h_{2}:$ [153] \\ $h_{3}:$ [135] \\ $h_{4}:$ [106] \item[161] {\rm Sq(1)[169] + Sq(1)[167]} \\ $h_{0}:$ [169], [167] \\ $h_{4}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[11/133] \mb{11/133} \begin{gl} \item[167] {\rm Sq(1,1)[159] + Sq(1,1)[158] + Sq(1,1)[157] + Sq(1,1)[156] + Sq(1,1)[155]} \\ $h_{4}:$ [116] \item[168] {\rm Sq(0,1)[161]} \\ $h_{4}:$ [116] \item[169] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{4}:$ [117], [116] \end{gl} \end{bdl} \begin{bdl} \item[10/133] \mb{10/133} \begin{gl} \item[169] {\rm Sq(3)[155] + Sq(3)[154]} \\ $h_{4}:$ [116] \item[170] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \\ $h_{4}:$ [116], [115] \item[171] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{3}:$ [134] \item[172] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{2}:$ [151], [149] \\ $h_{4}:$ [116], [115] \item[173] {\rm Sq(1)[165] + Sq(1)[164]} \\ $h_{0}:$ [165], [164] \\ $h_{1}:$ [158] \\ $h_{2}:$ [151], [149] \\ $h_{3}:$ [135], [134], [133], [132] \\ $h_{4}:$ [116], [115] \end{gl} \end{bdl} \begin{bdl} \item[9/133] \mb{9/133} \begin{gl} \item[162] {\rm Sq(1,1)[134]} \\ $h_{3}:$ [117] \item[163] {\rm Sq(0,1)[136]} \\ $h_{2}:$ [133] \item[164] {\rm Sq(3)[137] + Sq(0,1)[137] + Sq(3)[135] + Sq(0,1)[135]} \\ $h_{2}:$ [133] \\ $h_{3}:$ [121], [117] \item[165] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [121], [118] \end{gl} \end{bdl} \begin{bdl} \item[8/133] \mb{8/133} \begin{gl} \item[144] {\rm Sq(3)[120] + Sq(0,1)[120] + Sq(3)[119] + Sq(0,1)[119]} \item[145] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \\ $h_{3}:$ [107] \\ $h_{6}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[7/133] \mb{7/133} \begin{gl} \item[124] {\rm Sq(6)[103] + Sq(3,1)[103] + Sq(3,1)[102] + Sq(6)[101] + Sq(3,1)[101]} \item[125] {\rm Sq(1,1)[105]} \\ $h_{3}:$ [97] \item[126] {\rm Sq(2)[107]} \\ $h_{1}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[6/133] \mb{6/133} \begin{gl} \item[109] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{3}:$ [78] \\ $h_{6}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[5/133] \mb{5/133} \begin{gl} \item[84] {\rm Sq(5)[57] + Sq(2,1)[57]} \\ $h_{3}:$ [53] \item[85] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{3}:$ [54] \\ $h_{6}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[4/133] \mb{4/133} \begin{gl} \item[60] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [36] \\ $h_{6}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[3/133] \mb{3/133} \begin{gl} \item[42] {\rm Sq(8)[21] + Sq(5,1)[21] + Sq(2,2)[21]} \\ $h_{3}:$ [21] \\ $h_{6}:$ [19] \item[43] {\rm Sq(4)[24]} \\ $h_{2}:$ [24] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \dm{134} \begin{bdl} \item[66/134] \mb{66/134} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[65/134] \mb{65/134} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[64/134] \mb{64/134} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[57/134] \mb{57/134} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[56/134] \mb{56/134} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[55/134] \mb{55/134} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[54/134] \mb{54/134} \begin{gl} \item[16] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[53/134] \mb{53/134} \begin{gl} \item[20] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[52/134] \mb{52/134} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[51/134] \mb{51/134} \begin{gl} \item[18] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[50/134] \mb{50/134} \begin{gl} \item[22] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[49/134] \mb{49/134} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[48/134] \mb{48/134} \begin{gl} \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[47/134] \mb{47/134} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[46/134] \mb{46/134} \begin{gl} \item[29] {\rm Sq(3)[30]} \item[30] {\rm Sq(0,1)[31] + Sq(0,1)[30]} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[43/134] \mb{43/134} \begin{gl} \item[40] {\rm Sq(0,1)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[41/134] \mb{41/134} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \\ $h_{2}:$ [39] \\ $h_{3}:$ [34] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[40/134] \mb{40/134} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[39/134] \mb{39/134} \begin{gl} \item[47] {\rm Sq(0,1)[48]} \item[48] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[38/134] \mb{38/134} \begin{gl} \item[52] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[37/134] \mb{37/134} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(0,1)[52]} \item[55] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[36/134] \mb{36/134} \begin{gl} \item[54] {\rm Sq(0,1)[57]} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[35/134] \mb{35/134} \begin{gl} \item[61] {\rm Sq(3)[66]} \item[62] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[34/134] \mb{34/134} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[33/134] \mb{33/134} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[32/134] \mb{32/134} \begin{gl} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[31/134] \mb{31/134} \begin{gl} \item[76] {\rm Sq(3)[79]} \item[77] {\rm Sq(0,1)[80]} \item[78] {\rm Sq(0,1)[81]} \item[79] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[30/134] \mb{30/134} \begin{gl} \item[82] {\rm Sq(1,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(2)[88] + Sq(2)[87]} \\ $h_{1}:$ [88], [87] \end{gl} \end{bdl} \begin{bdl} \item[28/134] \mb{28/134} \begin{gl} \item[94] {\rm Sq(0,1)[97]} \item[95] {\rm Sq(0,1)[98]} \item[96] {\rm Sq(3)[99] + Sq(0,1)[99] + Sq(0,1)[96]} \end{gl} \end{bdl} \begin{bdl} \item[27/134] \mb{27/134} \begin{gl} \item[104] {\rm Sq(3)[103] + Sq(3)[102] + Sq(0,1)[102]} \item[105] {\rm Sq(3)[104] + Sq(0,1)[104] + Sq(0,1)[103] + Sq(0,1)[102] + Sq(0,1)[101]} \end{gl} \end{bdl} \begin{bdl} \item[25/134] \mb{25/134} \begin{gl} \item[108] {\rm Sq(0,1)[102]} \item[109] {\rm Sq(3)[104] + Sq(0,1)[104] + Sq(0,1)[101]} \item[110] {\rm Sq(1)[110] + Sq(1)[109]} \\ $h_{0}:$ [110], [109] \\ $h_{1}:$ [105] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[24/134] \mb{24/134} \begin{gl} \item[108] {\rm Sq(0,1)[110] + Sq(3)[109] + Sq(0,1)[109] + Sq(0,1)[108]} \item[109] {\rm Sq(3)[110] + Sq(3)[109] + Sq(3)[108] + Sq(0,1)[108]} \item[110] {\rm Sq(0,1)[111] + Sq(3)[109]} \end{gl} \end{bdl} \begin{bdl} \item[22/134] \mb{22/134} \begin{gl} \item[119] {\rm Sq(0,1)[116]} \item[120] {\rm Sq(3)[117] + Sq(0,1)[117]} \\ $h_{2}:$ [115] \\ $h_{3}:$ [106] \item[121] {\rm Sq(2)[118]} \\ $h_{1}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[21/134] \mb{21/134} \begin{gl} \item[121] {\rm Sq(0,1)[123]} \item[122] {\rm Sq(2)[126]} \\ $h_{1}:$ [126] \\ $h_{4}:$ [91] \\ $h_{5}:$ [55] \\ $h_{6}:$ [21] \item[123] {\rm Sq(1)[129] + Sq(1)[128]} \\ $h_{0}:$ [129], [128] \end{gl} \end{bdl} \begin{bdl} \item[20/134] \mb{20/134} \begin{gl} \item[128] {\rm Sq(3)[131]} \item[129] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[19/134] \mb{19/134} \begin{gl} \item[136] {\rm Sq(3)[136]} \item[137] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \end{gl} \end{bdl} \begin{bdl} \item[18/134] \mb{18/134} \begin{gl} \item[139] {\rm Sq(0,1)[141]} \item[140] {\rm Sq(2)[143]} \\ $h_{1}:$ [143] \item[141] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \item[142] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{3}:$ [129], [128] \end{gl} \end{bdl} \begin{bdl} \item[17/134] \mb{17/134} \begin{gl} \item[144] {\rm Sq(1,1)[145]} \item[145] {\rm Sq(2)[147]} \\ $h_{1}:$ [147] \item[146] {\rm Sq(1)[153] + Sq(1)[151]} \\ $h_{0}:$ [153], [151] \\ $h_{3}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[16/134] \mb{16/134} \begin{gl} \item[151] {\rm Sq(1,1)[144] + Sq(1,1)[143] + Sq(1,1)[140]} \item[152] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{1}:$ [147] \\ $h_{2}:$ [143] \\ $h_{6}:$ [30] \item[153] {\rm Sq(1)[153] + Sq(1)[151]} \\ $h_{0}:$ [153], [151] \\ $h_{3}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[15/134] \mb{15/134} \begin{gl} \item[149] {\rm Sq(0,1)[148] + Sq(0,1)[147]} \item[150] {\rm Sq(2)[153]} \\ $h_{1}:$ [153] \\ $h_{4}:$ [108] \item[151] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [144] \\ $h_{3}:$ [129] \\ $h_{6}:$ [33] \item[152] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{2}:$ [144] \\ $h_{6}:$ [33] \item[153] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{2}:$ [144] \\ $h_{3}:$ [129] \\ $h_{6}:$ [33] \item[154] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{2}:$ [146], [144] \\ $h_{6}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[14/134] \mb{14/134} \begin{gl} \item[156] {\rm Sq(0,1)[151] + Sq(0,1)[150]} \\ $h_{3}:$ [132] \\ $h_{6}:$ [35] \item[157] {\rm Sq(3)[151]} \\ $h_{6}:$ [35] \item[158] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{3}:$ [132] \\ $h_{6}:$ [35] \item[159] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{2}:$ [146] \\ $h_{6}:$ [35] \item[160] {\rm Sq(1)[163] + Sq(1)[160]} \\ $h_{0}:$ [163], [160] \\ $h_{1}:$ [157], [156], [155], [154] \\ $h_{2}:$ [148], [147] \\ $h_{4}:$ [110], [109], [108] \\ $h_{6}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[13/134] \mb{13/134} \begin{gl} \item[159] {\rm Sq(2,1)[147] + Sq(2,1)[146] + Sq(2,1)[145]} \item[160] {\rm Sq(1,1)[153] + Sq(1,1)[150] + Sq(1,1)[148]} \item[161] {\rm Sq(3)[155] + Sq(3)[154]} \item[162] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \\ $h_{5}:$ [79], [78] \item[163] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [151], [150], [148] \\ $h_{4}:$ [105], [104], [103] \end{gl} \end{bdl} \begin{bdl} \item[12/134] \mb{12/134} \begin{gl} \item[162] {\rm Sq(3)[162] + Sq(3)[160]} \\ $h_{2}:$ [156], [155] \\ $h_{4}:$ [110], [109] \item[163] {\rm Sq(2)[167]} \\ $h_{1}:$ [167] \\ $h_{4}:$ [112], [110], [109] \item[164] {\rm Sq(2)[168]} \\ $h_{1}:$ [168] \\ $h_{2}:$ [156], [155] \\ $h_{4}:$ [112] \item[165] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [141] \item[166] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [156] \\ $h_{3}:$ [142], [141] \\ $h_{4}:$ [110], [109] \end{gl} \end{bdl} \begin{bdl} \item[11/134] \mb{11/134} \begin{gl} \item[170] {\rm Sq(3)[165] + Sq(0,1)[165]} \\ $h_{3}:$ [143] \item[171] {\rm Sq(3)[168] + Sq(0,1)[168] + Sq(3)[167] + Sq(0,1)[167] + Sq(0,1)[165]} \\ $h_{3}:$ [144], [143] \item[172] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{1}:$ [170], [169] \\ $h_{2}:$ [161] \\ $h_{3}:$ [143] \\ $h_{4}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[10/134] \mb{10/134} \begin{gl} \item[174] {\rm Sq(3)[159]} \\ $h_{4}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[9/134] \mb{9/134} \begin{gl} \item[166] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{1}:$ [144] \\ $h_{3}:$ [126], [125], [123] \item[167] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{3}:$ [127], [125] \end{gl} \end{bdl} \begin{bdl} \item[8/134] \mb{8/134} \begin{gl} \item[146] {\rm Sq(1,1)[120]} \\ $h_{3}:$ [109] \item[147] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(3)[121] + Sq(0,1)[121]} \\ $h_{3}:$ [110] \item[148] {\rm Sq(2)[126]} \\ $h_{1}:$ [126] \item[149] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{1}:$ [125], [124] \\ $h_{3}:$ [112], [111], [109] \\ $h_{5}:$ [90] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[7/134] \mb{7/134} \begin{gl} \item[127] {\rm Sq(3)[107] + Sq(3)[106]} \\ $h_{3}:$ [99] \\ $h_{6}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[6/134] \mb{6/134} \begin{gl} \item[110] {\rm Sq(3,1)[83] + Sq(6)[82] + Sq(3,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[5/134] \mb{5/134} \begin{gl} \item[86] {\rm Sq(3)[59] + Sq(0,1)[59]} \\ $h_{6}:$ [36] \item[87] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{3}:$ [55] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[4/134] \mb{4/134} \begin{gl} \item[61] {\rm Sq(2)[42]} \\ $h_{1}:$ [42] \\ $h_{3}:$ [37] \\ $h_{6}:$ [29] \item[62] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [38] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[3/134] \mb{3/134} \begin{gl} \item[44] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [22] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[2/134] \mb{2/134} \begin{gl} \item[25] {\rm Sq(8)[7]} \\ $h_{3}:$ [7] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \dm{135} \begin{bdl} \item[68/135] \mb{68/135} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[67/135] \mb{67/135} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[66/135] \mb{66/135} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[65/135] \mb{65/135} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[64/135] \mb{64/135} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[63/135] \mb{63/135} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[62/135] \mb{62/135} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[61/135] \mb{61/135} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[60/135] \mb{60/135} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[57/135] \mb{57/135} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[54/135] \mb{54/135} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[52/135] \mb{52/135} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[51/135] \mb{51/135} \begin{gl} \item[20] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[48/135] \mb{48/135} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[47/135] \mb{47/135} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [31], [29] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[46/135] \mb{46/135} \begin{gl} \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [30] \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[45/135] \mb{45/135} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \item[35] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[44/135] \mb{44/135} \begin{gl} \item[35] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[43/135] \mb{43/135} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \\ $h_{4}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[42/135] \mb{42/135} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[41/135] \mb{41/135} \begin{gl} \item[50] {\rm Sq(3)[44] + Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[39/135] \mb{39/135} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[38/135] \mb{38/135} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[36/135] \mb{36/135} \begin{gl} \item[56] {\rm Sq(0,1)[58]} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[35/135] \mb{35/135} \begin{gl} \item[63] {\rm Sq(0,1)[68] + Sq(3)[67]} \end{gl} \end{bdl} \begin{bdl} \item[33/135] \mb{33/135} \begin{gl} \item[74] {\rm Sq(0,1)[70]} \item[75] {\rm Sq(0,1)[71]} \end{gl} \end{bdl} \begin{bdl} \item[32/135] \mb{32/135} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[31/135] \mb{31/135} \begin{gl} \item[80] {\rm Sq(1)[86] + Sq(1)[85]} \\ $h_{0}:$ [86], [85] \\ $h_{1}:$ [84] \\ $h_{2}:$ [79] \\ $h_{3}:$ [70] \item[81] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [82] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[30/135] \mb{30/135} \begin{gl} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(3)[88] + Sq(0,1)[88] + Sq(3)[87]} \item[87] {\rm Sq(0,1)[89] + Sq(0,1)[88]} \item[88] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[29/135] \mb{29/135} \begin{gl} \item[90] {\rm Sq(1,1)[92] + Sq(1,1)[91]} \item[91] {\rm Sq(0,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[28/135] \mb{28/135} \begin{gl} \item[97] {\rm Sq(2)[105]} \\ $h_{1}:$ [105] \item[98] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[27/135] \mb{27/135} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(3)[108] + Sq(0,1)[108]} \item[109] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{2}:$ [101] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[26/135] \mb{26/135} \begin{gl} \item[110] {\rm Sq(0,1)[104]} \item[111] {\rm Sq(0,1)[105]} \item[112] {\rm Sq(0,1)[106]} \end{gl} \end{bdl} \begin{bdl} \item[24/135] \mb{24/135} \begin{gl} \item[111] {\rm Sq(1,1)[111] + Sq(1,1)[109]} \item[112] {\rm Sq(3)[114] + Sq(0,1)[114] + Sq(0,1)[112]} \end{gl} \end{bdl} \begin{bdl} \item[23/135] \mb{23/135} \begin{gl} \item[115] {\rm Sq(0,1)[115]} \item[116] {\rm Sq(0,1)[116]} \item[117] {\rm Sq(3)[118] + Sq(0,1)[118] + Sq(3)[117] + Sq(0,1)[117]} \\ $h_{2}:$ [114], [113] \item[118] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \\ $h_{2}:$ [114], [113] \end{gl} \end{bdl} \begin{bdl} \item[22/135] \mb{22/135} \begin{gl} \item[122] {\rm Sq(1)[127] + Sq(1)[125]} \\ $h_{0}:$ [127], [125] \\ $h_{1}:$ [122], [121] \\ $h_{2}:$ [117] \\ $h_{3}:$ [110], [109] \\ $h_{4}:$ [90], [89] \\ $h_{5}:$ [56], [55] \\ $h_{6}:$ [22], [21] \end{gl} \end{bdl} \begin{bdl} \item[21/135] \mb{21/135} \begin{gl} \item[124] {\rm Sq(0,1)[125]} \item[125] {\rm Sq(3)[126]} \item[126] {\rm Sq(2)[128]} \\ $h_{1}:$ [128] \\ $h_{3}:$ [114] \item[127] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{2}:$ [124] \\ $h_{5}:$ [56] \\ $h_{6}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[20/135] \mb{20/135} \begin{gl} \item[130] {\rm Sq(0,1)[132]} \item[131] {\rm Sq(3)[135] + Sq(0,1)[135]} \item[132] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{2}:$ [131] \\ $h_{5}:$ [62] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[19/135] \mb{19/135} \begin{gl} \item[138] {\rm Sq(0,1)[137]} \\ $h_{5}:$ [68] \\ $h_{6}:$ [23] \item[139] {\rm Sq(2)[140]} \\ $h_{1}:$ [140] \\ $h_{3}:$ [128] \\ $h_{5}:$ [68] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[18/135] \mb{18/135} \begin{gl} \item[143] {\rm Sq(3)[143] + Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[17/135] \mb{17/135} \begin{gl} \item[147] {\rm Sq(3)[150] + Sq(0,1)[150] + Sq(3)[147]} \\ $h_{4}:$ [107] \item[148] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{3}:$ [137], [135] \end{gl} \end{bdl} \begin{bdl} \item[16/135] \mb{16/135} \begin{gl} \item[154] {\rm Sq(1)[157] + Sq(1)[156]} \\ $h_{0}:$ [157], [156] \\ $h_{3}:$ [132], [130] \end{gl} \end{bdl} \begin{bdl} \item[15/135] \mb{15/135} \begin{gl} \item[155] {\rm Sq(3)[153] + Sq(0,1)[152]} \item[156] {\rm Sq(3)[155] + Sq(0,1)[155] + Sq(0,1)[152]} \\ $h_{4}:$ [110] \item[157] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{3}:$ [133] \\ $h_{4}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[14/135] \mb{14/135} \begin{gl} \item[161] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \item[162] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \item[163] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{1}:$ [162] \\ $h_{2}:$ [151] \\ $h_{3}:$ [137] \\ $h_{5}:$ [80] \item[164] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{1}:$ [161] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[13/135] \mb{13/135} \begin{gl} \item[164] {\rm Sq(2,1)[148]} \item[165] {\rm Sq(3)[159] + Sq(0,1)[159]} \\ $h_{5}:$ [80] \item[166] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \item[167] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{3}:$ [140], [138] \\ $h_{4}:$ [107] \item[168] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{1}:$ [164], [163], [162] \\ $h_{3}:$ [140], [137] \\ $h_{4}:$ [108], [106] \\ $h_{5}:$ [80] \item[169] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{1}:$ [163] \\ $h_{2}:$ [156] \\ $h_{3}:$ [139] \\ $h_{4}:$ [110], [106] \end{gl} \end{bdl} \begin{bdl} \item[12/135] \mb{12/135} \begin{gl} \item[167] {\rm Sq(1,1)[165] + Sq(1,1)[164] + Sq(1,1)[163] + Sq(1,1)[160]} \item[168] {\rm Sq(3)[167]} \item[169] {\rm Sq(0,1)[168] + Sq(0,1)[167]} \\ $h_{4}:$ [113] \item[170] {\rm Sq(1)[175] + Sq(1)[173]} \\ $h_{0}:$ [175], [173] \\ $h_{2}:$ [160], [159] \\ $h_{4}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[11/135] \mb{11/135} \begin{gl} \item[173] {\rm Sq(1,1)[167] + Sq(1,1)[165] + Sq(1,1)[164]} \item[174] {\rm Sq(2)[174]} \\ $h_{1}:$ [174] \\ $h_{3}:$ [150] \\ $h_{4}:$ [121] \item[175] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{4}:$ [122] \item[176] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \item[177] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [167], [165], [164] \\ $h_{3}:$ [149], [148] \\ $h_{4}:$ [120] \\ $h_{6}:$ [43] \item[178] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [167], [165], [164] \\ $h_{4}:$ [122], [120] \\ $h_{5}:$ [91] \\ $h_{6}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[10/135] \mb{10/135} \begin{gl} \item[175] {\rm Sq(1,1)[160] + Sq(1,1)[159] + Sq(1,1)[157]} \\ $h_{4}:$ [118] \item[176] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[162]} \item[177] {\rm Sq(3)[164] + Sq(0,1)[163] + Sq(3)[162]} \\ $h_{2}:$ [159] \item[178] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{2}:$ [159] \\ $h_{4}:$ [118] \\ $h_{5}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[9/135] \mb{9/135} \begin{gl} \item[168] {\rm Sq(3)[144]} \item[169] {\rm Sq(3)[145]} \\ $h_{2}:$ [139] \\ $h_{3}:$ [130] \\ $h_{4}:$ [110] \\ $h_{5}:$ [98] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[8/135] \mb{8/135} \begin{gl} \item[150] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{3}:$ [115], [114] \end{gl} \end{bdl} \begin{bdl} \item[7/135] \mb{7/135} \begin{gl} \item[128] {\rm Sq(5,1)[104] + Sq(5,1)[103] + Sq(5,1)[102] + Sq(1,0,1)[102] + Sq(8)[101] + Sq(5,1)[101]} \\ $h_{3}:$ [101] \item[129] {\rm Sq(1,1)[107] + Sq(1,1)[106]} \\ $h_{3}:$ [102] \item[130] {\rm Sq(3)[109] + Sq(0,1)[109]} \\ $h_{6}:$ [49] \item[131] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [110] \\ $h_{3}:$ [104], [102] \\ $h_{6}:$ [49] \end{gl} \end{bdl} \begin{bdl} \item[6/135] \mb{6/135} \begin{gl} \item[111] {\rm Sq(3)[84]} \\ $h_{3}:$ [80] \item[112] {\rm Sq(2)[86]} \\ $h_{1}:$ [86] \\ $h_{6}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[5/135] \mb{5/135} \begin{gl} \item[88] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \\ $h_{2}:$ [59] \\ $h_{3}:$ [56] \\ $h_{6}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[4/135] \mb{4/135} \begin{gl} \item[63] {\rm Sq(3)[43] + Sq(0,1)[43]} \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[3/135] \mb{3/135} \begin{gl} \item[45] {\rm Sq(2)[25]} \\ $h_{1}:$ [25] \\ $h_{3}:$ [23] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \dm{136} \begin{bdl} \item[67/136] \mb{67/136} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[66/136] \mb{66/136} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[61/136] \mb{61/136} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[60/136] \mb{60/136} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[59/136] \mb{59/136} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[58/136] \mb{58/136} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[56/136] \mb{56/136} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[53/136] \mb{53/136} \begin{gl} \item[21] {\rm Sq(0,1)[19]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[52/136] \mb{52/136} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[51/136] \mb{51/136} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[50/136] \mb{50/136} \begin{gl} \item[23] {\rm Sq(0,1)[26]} \item[24] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[47/136] \mb{47/136} \begin{gl} \item[31] {\rm Sq(0,1)[30] + Sq(3)[29] + Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[45/136] \mb{45/136} \begin{gl} \item[36] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[44/136] \mb{44/136} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[43/136] \mb{43/136} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[42/136] \mb{42/136} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[41/136] \mb{41/136} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[40/136] \mb{40/136} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[38/136] \mb{38/136} \begin{gl} \item[54] {\rm Sq(0,1)[53]} \item[55] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[37/136] \mb{37/136} \begin{gl} \item[56] {\rm Sq(3)[55] + Sq(0,1)[55] + Sq(0,1)[54]} \item[57] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{1}:$ [58], [56] \\ $h_{2}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[36/136] \mb{36/136} \begin{gl} \item[59] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[35/136] \mb{35/136} \begin{gl} \item[64] {\rm Sq(0,1)[69]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[34/136] \mb{34/136} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[33/136] \mb{33/136} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[32/136] \mb{32/136} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[31/136] \mb{31/136} \begin{gl} \item[82] {\rm Sq(0,1)[83] + Sq(3)[82]} \end{gl} \end{bdl} \begin{bdl} \item[30/136] \mb{30/136} \begin{gl} \item[89] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{3}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[29/136] \mb{29/136} \begin{gl} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(0,1)[95]} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{1}:$ [97] \item[96] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[28/136] \mb{28/136} \begin{gl} \item[99] {\rm Sq(0,1)[104]} \item[100] {\rm Sq(0,1)[105]} \item[101] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{3}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[27/136] \mb{27/136} \begin{gl} \item[110] {\rm Sq(1)[116] + Sq(1)[113]} \\ $h_{0}:$ [116], [113] \\ $h_{1}:$ [111] \\ $h_{2}:$ [108] \\ $h_{4}:$ [73] \item[111] {\rm Sq(1)[117] + Sq(1)[113]} \\ $h_{0}:$ [117], [113] \\ $h_{3}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[26/136] \mb{26/136} \begin{gl} \item[113] {\rm Sq(1,1)[105]} \item[114] {\rm Sq(0,1)[108]} \item[115] {\rm Sq(0,1)[109]} \item[116] {\rm Sq(1)[112] + Sq(1)[111]} \\ $h_{0}:$ [112], [111] \\ $h_{2}:$ [105] \item[117] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[25/136] \mb{25/136} \begin{gl} \item[111] {\rm Sq(0,1)[109] + Sq(0,1)[108]} \item[112] {\rm Sq(0,1)[110] + Sq(0,1)[108]} \item[113] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[24/136] \mb{24/136} \begin{gl} \item[113] {\rm Sq(1,1)[114]} \end{gl} \end{bdl} \begin{bdl} \item[23/136] \mb{23/136} \begin{gl} \item[119] {\rm Sq(0,1)[119]} \end{gl} \end{bdl} \begin{bdl} \item[22/136] \mb{22/136} \begin{gl} \item[123] {\rm Sq(0,1)[121]} \item[124] {\rm Sq(3)[123] + Sq(0,1)[123]} \item[125] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{1}:$ [126] \\ $h_{3}:$ [113], [111] \end{gl} \end{bdl} \begin{bdl} \item[21/136] \mb{21/136} \begin{gl} \item[128] {\rm Sq(1,1)[126] + Sq(1,1)[125]} \item[129] {\rm Sq(2)[131]} \\ $h_{1}:$ [131] \item[130] {\rm Sq(1)[134] + Sq(1)[133]} \\ $h_{0}:$ [134], [133] \\ $h_{3}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[20/136] \mb{20/136} \begin{gl} \item[133] {\rm Sq(3,1)[129] + Sq(3,1)[128] + Sq(0,2)[128]} \item[134] {\rm Sq(1,1)[132]} \item[135] {\rm Sq(0,1)[136]} \item[136] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{1}:$ [138] \\ $h_{2}:$ [134] \\ $h_{5}:$ [63] \\ $h_{6}:$ [22] \item[137] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{1}:$ [139], [138] \\ $h_{2}:$ [135], [134] \\ $h_{3}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[19/136] \mb{19/136} \begin{gl} \item[140] {\rm Sq(0,1)[139]} \item[141] {\rm Sq(3)[142] + Sq(0,1)[142] + Sq(3)[141] + Sq(0,1)[141]} \item[142] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{2}:$ [137] \\ $h_{6}:$ [25] \item[143] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{2}:$ [138], [137] \end{gl} \end{bdl} \begin{bdl} \item[18/136] \mb{18/136} \begin{gl} \item[144] {\rm Sq(0,1)[144]} \\ $h_{6}:$ [28] \item[145] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{2}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[17/136] \mb{17/136} \begin{gl} \item[149] {\rm Sq(1,1)[149] + Sq(1,1)[148] + Sq(1,1)[147]} \item[150] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{4}:$ [110] \\ $h_{5}:$ [68], [67] \end{gl} \end{bdl} \begin{bdl} \item[16/136] \mb{16/136} \begin{gl} \item[155] {\rm Sq(3)[152] + Sq(0,1)[152] + Sq(3)[150]} \\ $h_{4}:$ [106] \\ $h_{5}:$ [68] \item[156] {\rm Sq(2)[156] + Sq(2)[155]} \\ $h_{1}:$ [156], [155] \\ $h_{4}:$ [107], [106] \\ $h_{5}:$ [68] \item[157] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{2}:$ [147] \\ $h_{4}:$ [106] \\ $h_{5}:$ [69], [68] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[15/136] \mb{15/136} \begin{gl} \item[158] {\rm Sq(3)[159] + Sq(0,1)[159] + Sq(3)[158] + Sq(0,1)[158] + Sq(3)[157] + Sq(3)[156] + Sq(0,1)[156]} \\ $h_{6}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[14/136] \mb{14/136} \begin{gl} \item[165] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[162] + Sq(0,1)[161] + Sq(3)[160] + Sq(0,1)[160]} \item[166] {\rm Sq(2)[164]} \\ $h_{1}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[13/136] \mb{13/136} \begin{gl} \item[170] {\rm Sq(1)[173] + Sq(1)[172]} \\ $h_{0}:$ [173], [172] \\ $h_{1}:$ [169], [168], [167] \\ $h_{3}:$ [143] \\ $h_{4}:$ [112], [111] \end{gl} \end{bdl} \begin{bdl} \item[12/136] \mb{12/136} \begin{gl} \item[171] {\rm Sq(2,1)[161] + Sq(5)[160] + Sq(5)[159] + Sq(2,1)[159]} \item[172] {\rm Sq(1,1)[167]} \item[173] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{3}:$ [148] \\ $h_{4}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[11/136] \mb{11/136} \begin{gl} \item[179] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \item[180] {\rm Sq(1)[182] + Sq(1)[180]} \\ $h_{0}:$ [182], [180] \\ $h_{1}:$ [175] \\ $h_{2}:$ [169] \\ $h_{4}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[10/136] \mb{10/136} \begin{gl} \item[179] {\rm Sq(5)[159] + Sq(2,1)[158]} \item[180] {\rm Sq(1,1)[163]} \item[181] {\rm Sq(2)[168]} \\ $h_{1}:$ [168] \\ $h_{3}:$ [146], [145] \\ $h_{5}:$ [99] \item[182] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{4}:$ [119] \item[183] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [163] \\ $h_{3}:$ [146], [145] \\ $h_{4}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[9/136] \mb{9/136} \begin{gl} \item[170] {\rm Sq(5)[143] + Sq(2,1)[143] + Sq(5)[141] + Sq(2,1)[141]} \item[171] {\rm Sq(3)[148]} \end{gl} \end{bdl} \begin{bdl} \item[8/136] \mb{8/136} \begin{gl} \item[151] {\rm Sq(1,1)[126] + Sq(1,1)[124]} \\ $h_{4}:$ [102], [101] \item[152] {\rm Sq(2)[130]} \\ $h_{1}:$ [130] \\ $h_{6}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[6/136] \mb{6/136} \begin{gl} \item[113] {\rm Sq(8)[81] + Sq(5,1)[81] + Sq(2,2)[81] + Sq(1,0,1)[81]} \\ $h_{3}:$ [81] \item[114] {\rm Sq(3)[87] + Sq(0,1)[87]} \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[5/136] \mb{5/136} \begin{gl} \item[89] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[4/136] \mb{4/136} \begin{gl} \item[64] {\rm Sq(2)[45]} \\ $h_{1}:$ [45] \\ $h_{2}:$ [43] \\ $h_{3}:$ [40] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \dm{137} \begin{bdl} \item[69/137] \mb{69/137} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[68/137] \mb{68/137} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[67/137] \mb{67/137} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[66/137] \mb{66/137} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[65/137] \mb{65/137} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[64/137] \mb{64/137} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[59/137] \mb{59/137} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[58/137] \mb{58/137} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[55/137] \mb{55/137} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[52/137] \mb{52/137} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[51/137] \mb{51/137} \begin{gl} \item[22] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[50/137] \mb{50/137} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[49/137] \mb{49/137} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[48/137] \mb{48/137} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[47/137] \mb{47/137} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[46/137] \mb{46/137} \begin{gl} \item[34] {\rm Sq(3)[33]} \item[35] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[43/137] \mb{43/137} \begin{gl} \item[43] {\rm Sq(0,1)[47] + Sq(0,1)[46]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[42/137] \mb{42/137} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[40/137] \mb{40/137} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[39/137] \mb{39/137} \begin{gl} \item[51] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[37/137] \mb{37/137} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[36/137] \mb{36/137} \begin{gl} \item[60] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[35/137] \mb{35/137} \begin{gl} \item[67] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[34/137] \mb{34/137} \begin{gl} \item[73] {\rm Sq(1,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[33/137] \mb{33/137} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[32/137] \mb{32/137} \begin{gl} \item[79] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[31/137] \mb{31/137} \begin{gl} \item[83] {\rm Sq(0,1)[86] + Sq(0,1)[85]} \item[84] {\rm Sq(0,1)[87] + Sq(0,1)[85]} \item[85] {\rm Sq(3)[88] + Sq(0,1)[88] + Sq(3)[86] + Sq(3)[85] + Sq(0,1)[85]} \item[86] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[30/137] \mb{30/137} \begin{gl} \item[90] {\rm Sq(0,1)[90]} \item[91] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[29/137] \mb{29/137} \begin{gl} \item[97] {\rm Sq(1)[105] + Sq(1)[104]} \\ $h_{0}:$ [105], [104] \\ $h_{1}:$ [100] \\ $h_{3}:$ [84] \\ $h_{4}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[28/137] \mb{28/137} \begin{gl} \item[102] {\rm Sq(0,1)[107] + Sq(0,1)[106]} \item[103] {\rm Sq(0,1)[108] + Sq(0,1)[106]} \item[104] {\rm Sq(3)[109] + Sq(0,1)[109] + Sq(0,1)[106]} \item[105] {\rm Sq(1)[114] + Sq(1)[112]} \\ $h_{0}:$ [114], [112] \\ $h_{3}:$ [93], [92] \end{gl} \end{bdl} \begin{bdl} \item[27/137] \mb{27/137} \begin{gl} \item[112] {\rm Sq(0,1)[111] + Sq(0,1)[110]} \item[113] {\rm Sq(0,1)[112] + Sq(0,1)[110]} \item[114] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{3}:$ [99], [98] \end{gl} \end{bdl} \begin{bdl} \item[26/137] \mb{26/137} \begin{gl} \item[118] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{3}:$ [97], [96], [95] \end{gl} \end{bdl} \begin{bdl} \item[25/137] \mb{25/137} \begin{gl} \item[114] {\rm Sq(0,1)[111]} \item[115] {\rm Sq(0,1)[112]} \item[116] {\rm Sq(2)[113]} \\ $h_{1}:$ [113] \item[117] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[24/137] \mb{24/137} \begin{gl} \item[114] {\rm Sq(0,1)[115]} \item[115] {\rm Sq(0,1)[116]} \item[116] {\rm Sq(3)[118] + Sq(3)[117] + Sq(3)[116] + Sq(3)[115]} \end{gl} \end{bdl} \begin{bdl} \item[23/137] \mb{23/137} \begin{gl} \item[120] {\rm Sq(1,1)[119]} \item[121] {\rm Sq(2)[124]} \\ $h_{1}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[22/137] \mb{22/137} \begin{gl} \item[126] {\rm Sq(0,1)[125] + Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[21/137] \mb{21/137} \begin{gl} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(1)[140] + Sq(1)[138]} \\ $h_{0}:$ [140], [138] \\ $h_{1}:$ [134], [133] \\ $h_{2}:$ [128] \end{gl} \end{bdl} \begin{bdl} \item[20/137] \mb{20/137} \begin{gl} \item[138] {\rm Sq(3)[138]} \item[139] {\rm Sq(2)[141]} \\ $h_{1}:$ [141] \item[140] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[19/137] \mb{19/137} \begin{gl} \item[144] {\rm Sq(1,1)[142] + Sq(1,1)[140] + Sq(1,1)[139]} \item[145] {\rm Sq(3)[143]} \end{gl} \end{bdl} \begin{bdl} \item[18/137] \mb{18/137} \begin{gl} \item[146] {\rm Sq(1,1)[144]} \item[147] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [149] \\ $h_{2}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[17/137] \mb{17/137} \begin{gl} \item[151] {\rm Sq(1,1)[152] + Sq(1,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[16/137] \mb{16/137} \begin{gl} \item[158] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{1}:$ [158] \\ $h_{2}:$ [152] \\ $h_{4}:$ [109] \\ $h_{5}:$ [72], [71] \\ $h_{6}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[15/137] \mb{15/137} \begin{gl} \item[159] {\rm Sq(2)[165]} \\ $h_{1}:$ [165] \\ $h_{3}:$ [142] \item[160] {\rm Sq(2)[166]} \\ $h_{1}:$ [166] \\ $h_{5}:$ [79] \item[161] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{2}:$ [157] \\ $h_{5}:$ [79] \\ $h_{6}:$ [36] \item[162] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{2}:$ [159], [158], [156] \\ $h_{6}:$ [36] \item[163] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{2}:$ [159] \\ $h_{3}:$ [143], [141], [140] \\ $h_{5}:$ [79] \\ $h_{6}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[14/137] \mb{14/137} \begin{gl} \item[167] {\rm Sq(3)[166] + Sq(0,1)[166] + Sq(3)[165] + Sq(3)[164]} \\ $h_{6}:$ [37] \item[168] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [161], [159] \\ $h_{6}:$ [37] \item[169] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{2}:$ [161] \\ $h_{3}:$ [145], [144], [142] \\ $h_{6}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[13/137] \mb{13/137} \begin{gl} \item[171] {\rm Sq(0,1)[167]} \item[172] {\rm Sq(3)[170] + Sq(0,1)[170] + Sq(0,1)[169] + Sq(0,1)[168]} \\ $h_{3}:$ [146], [145] \item[173] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{1}:$ [172] \\ $h_{2}:$ [162] \\ $h_{3}:$ [146] \\ $h_{4}:$ [115] \item[174] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{1}:$ [172] \end{gl} \end{bdl} \begin{bdl} \item[12/137] \mb{12/137} \begin{gl} \item[174] {\rm Sq(3)[174] + Sq(3)[173]} \\ $h_{4}:$ [118] \item[175] {\rm Sq(3)[178] + Sq(0,1)[178] + Sq(3)[177] + Sq(0,1)[177] + Sq(3)[176] + Sq(0,1)[176] + Sq(3)[175] + Sq(0,1)[175]} \\ $h_{3}:$ [153] \item[176] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \end{gl} \end{bdl} \begin{bdl} \item[11/137] \mb{11/137} \begin{gl} \item[181] {\rm Sq(3)[176] + Sq(0,1)[176] + Sq(3)[175]} \item[182] {\rm Sq(3)[178] + Sq(0,1)[178] + Sq(3)[177] + Sq(0,1)[177] + Sq(0,1)[175]} \\ $h_{3}:$ [155] \item[183] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{1}:$ [179] \\ $h_{3}:$ [158], [156], [155] \item[184] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{1}:$ [179] \\ $h_{3}:$ [157], [155] \end{gl} \end{bdl} \begin{bdl} \item[10/137] \mb{10/137} \begin{gl} \item[184] {\rm Sq(1,1)[167]} \\ $h_{3}:$ [149] \item[185] {\rm Sq(2)[170]} \\ $h_{1}:$ [170] \item[186] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \end{gl} \end{bdl} \begin{bdl} \item[9/137] \mb{9/137} \begin{gl} \item[172] {\rm Sq(2,1)[144]} \item[173] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{1}:$ [152] \\ $h_{6}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[8/137] \mb{8/137} \begin{gl} \item[153] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{6}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[7/137] \mb{7/137} \begin{gl} \item[132] {\rm Sq(3)[111] + Sq(0,1)[111]} \\ $h_{3}:$ [105] \\ $h_{5}:$ [87] \\ $h_{6}:$ [50] \item[133] {\rm Sq(3)[112]} \\ $h_{6}:$ [51] \item[134] {\rm Sq(2)[114]} \\ $h_{1}:$ [114] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \dm{138} \begin{bdl} \item[70/138] \mb{70/138} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[65/138] \mb{65/138} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[64/138] \mb{64/138} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[63/138] \mb{63/138} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[62/138] \mb{62/138} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[61/138] \mb{61/138} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[60/138] \mb{60/138} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[57/138] \mb{57/138} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[54/138] \mb{54/138} \begin{gl} \item[18] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[51/138] \mb{51/138} \begin{gl} \item[23] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[48/138] \mb{48/138} \begin{gl} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[47/138] \mb{47/138} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[46/138] \mb{46/138} \begin{gl} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [33] \item[37] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35], [33] \end{gl} \end{bdl} \begin{bdl} \item[45/138] \mb{45/138} \begin{gl} \item[37] {\rm Sq(3)[36]} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[44/138] \mb{44/138} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[43/138] \mb{43/138} \begin{gl} \item[45] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[42/138] \mb{42/138} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[41/138] \mb{41/138} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[40/138] \mb{40/138} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[39/138] \mb{39/138} \begin{gl} \item[52] {\rm Sq(0,1)[54]} \item[53] {\rm Sq(0,1)[55]} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[38/138] \mb{38/138} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \item[57] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[37/138] \mb{37/138} \begin{gl} \item[60] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[36/138] \mb{36/138} \begin{gl} \item[61] {\rm Sq(1,1)[63]} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[35/138] \mb{35/138} \begin{gl} \item[68] {\rm Sq(0,1)[72] + Sq(0,1)[71]} \end{gl} \end{bdl} \begin{bdl} \item[33/138] \mb{33/138} \begin{gl} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(0,1)[78] + Sq(0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[32/138] \mb{32/138} \begin{gl} \item[81] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[31/138] \mb{31/138} \begin{gl} \item[87] {\rm Sq(3)[89] + Sq(0,1)[89]} \item[88] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [90] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[30/138] \mb{30/138} \begin{gl} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(0,1)[93]} \item[94] {\rm Sq(0,1)[94]} \item[95] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[29/138] \mb{29/138} \begin{gl} \item[98] {\rm Sq(0,1)[99]} \item[99] {\rm Sq(0,1)[100]} \end{gl} \end{bdl} \begin{bdl} \item[28/138] \mb{28/138} \begin{gl} \item[106] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{2}:$ [109] \\ $h_{3}:$ [95] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[27/138] \mb{27/138} \begin{gl} \item[115] {\rm Sq(0,1)[115] + Sq(0,1)[114]} \item[116] {\rm Sq(3)[116] + Sq(0,1)[116] + Sq(0,1)[114] + Sq(3)[113]} \item[117] {\rm Sq(1)[123] + Sq(1)[121] + Sq(1)[120] + Sq(1)[119]} \\ $h_{0}:$ [123], [121], [120], [119] \\ $h_{2}:$ [111] \\ $h_{3}:$ [100] \\ $h_{4}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[26/138] \mb{26/138} \begin{gl} \item[119] {\rm Sq(2,1)[108]} \item[120] {\rm Sq(0,1)[111]} \item[121] {\rm Sq(0,1)[112]} \item[122] {\rm Sq(2)[116] + Sq(2)[114]} \\ $h_{1}:$ [116], [114] \item[123] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{3}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[25/138] \mb{25/138} \begin{gl} \item[118] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[24/138] \mb{24/138} \begin{gl} \item[117] {\rm Sq(0,1)[119]} \item[118] {\rm Sq(1)[124] + Sq(1)[122]} \\ $h_{0}:$ [124], [122] \\ $h_{1}:$ [121] \item[119] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[23/138] \mb{23/138} \begin{gl} \item[122] {\rm Sq(3,1)[117] + Sq(3,1)[116] + Sq(0,2)[115]} \item[123] {\rm Sq(0,1)[123]} \item[124] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \item[125] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[22/138] \mb{22/138} \begin{gl} \item[127] {\rm Sq(3)[129]} \item[128] {\rm Sq(3)[130] + Sq(0,1)[130] + Sq(0,1)[128]} \item[129] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[21/138] \mb{21/138} \begin{gl} \item[133] {\rm Sq(0,1)[134]} \item[134] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[20/138] \mb{20/138} \begin{gl} \item[141] {\rm Sq(0,1)[140]} \item[142] {\rm Sq(3)[142] + Sq(0,1)[142]} \end{gl} \end{bdl} \begin{bdl} \item[19/138] \mb{19/138} \begin{gl} \item[146] {\rm Sq(0,1)[144]} \\ $h_{5}:$ [72] \\ $h_{6}:$ [26] \item[147] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{5}:$ [72] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[18/138] \mb{18/138} \begin{gl} \item[148] {\rm Sq(1,1)[148]} \item[149] {\rm Sq(3)[149]} \end{gl} \end{bdl} \begin{bdl} \item[17/138] \mb{17/138} \begin{gl} \item[152] {\rm Sq(1,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[16/138] \mb{16/138} \begin{gl} \item[159] {\rm Sq(5)[153] + Sq(2,1)[153] + Sq(5)[151] + Sq(2,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[15/138] \mb{15/138} \begin{gl} \item[164] {\rm Sq(1,1)[164] + Sq(1,1)[162] + Sq(1,1)[161]} \end{gl} \end{bdl} \begin{bdl} \item[14/138] \mb{14/138} \begin{gl} \item[170] {\rm Sq(1,1)[166] + Sq(4)[164] + Sq(1,1)[164]} \\ $h_{2}:$ [164] \\ $h_{4}:$ [116] \\ $h_{5}:$ [85] \item[171] {\rm Sq(1)[177] + Sq(1)[175]} \\ $h_{0}:$ [177], [175] \\ $h_{1}:$ [172], [171] \\ $h_{3}:$ [148], [146] \\ $h_{4}:$ [116] \\ $h_{5}:$ [85] \item[172] {\rm Sq(1)[178] + Sq(1)[175]} \\ $h_{0}:$ [178], [175] \\ $h_{1}:$ [172] \\ $h_{2}:$ [166], [164] \\ $h_{3}:$ [148], [146] \\ $h_{4}:$ [116] \\ $h_{5}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[13/138] \mb{13/138} \begin{gl} \item[175] {\rm Sq(3)[172] + Sq(0,1)[171]} \\ $h_{5}:$ [85] \item[176] {\rm Sq(2)[175]} \\ $h_{1}:$ [175] \\ $h_{2}:$ [168], [167] \\ $h_{3}:$ [149], [148] \\ $h_{4}:$ [116] \\ $h_{5}:$ [85] \item[177] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{3}:$ [151] \\ $h_{5}:$ [85] \item[178] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [167] \\ $h_{3}:$ [151] \\ $h_{5}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[12/138] \mb{12/138} \begin{gl} \item[177] {\rm Sq(1,1)[175] + Sq(1,1)[173]} \\ $h_{3}:$ [156] \item[178] {\rm Sq(1,1)[178] + Sq(1,1)[176]} \\ $h_{3}:$ [156] \item[179] {\rm Sq(2)[181]} \\ $h_{1}:$ [181] \\ $h_{4}:$ [120], [119] \item[180] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{2}:$ [175], [173] \\ $h_{3}:$ [157] \\ $h_{4}:$ [123], [121] \item[181] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \\ $h_{2}:$ [175], [173] \\ $h_{3}:$ [157] \\ $h_{4}:$ [123], [121], [120], [119] \end{gl} \end{bdl} \begin{bdl} \item[11/138] \mb{11/138} \begin{gl} \item[185] {\rm Sq(2)[185]} \\ $h_{1}:$ [185] \\ $h_{3}:$ [161] \\ $h_{4}:$ [125] \item[186] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \\ $h_{2}:$ [175] \\ $h_{4}:$ [126], [124] \item[187] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{2}:$ [175] \\ $h_{4}:$ [126], [124] \item[188] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [178], [177], [176], [175] \\ $h_{3}:$ [162], [161], [160] \\ $h_{4}:$ [125] \\ $h_{5}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[10/138] \mb{10/138} \begin{gl} \item[187] {\rm Sq(1,1)[169] + Sq(1,1)[168]} \\ $h_{4}:$ [121] \item[188] {\rm Sq(3)[170]} \\ $h_{4}:$ [121] \item[189] {\rm Sq(2)[172]} \\ $h_{1}:$ [172] \\ $h_{2}:$ [168] \\ $h_{3}:$ [154], [153] \\ $h_{5}:$ [102] \item[190] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{4}:$ [122], [121] \item[191] {\rm Sq(1)[176] + Sq(1)[174]} \\ $h_{0}:$ [176], [174] \\ $h_{2}:$ [168] \\ $h_{3}:$ [154] \\ $h_{5}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[9/138] \mb{9/138} \begin{gl} \item[174] {\rm Sq(2,1)[147]} \item[175] {\rm Sq(3)[152] + Sq(3)[151]} \\ $h_{4}:$ [113] \item[176] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \item[177] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{3}:$ [137], [136], [135] \\ $h_{4}:$ [113] \\ $h_{5}:$ [101] \\ $h_{6}:$ [54], [53] \end{gl} \end{bdl} \begin{bdl} \item[8/138] \mb{8/138} \begin{gl} \item[154] {\rm Sq(1,1)[130]} \item[155] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{3}:$ [119] \\ $h_{5}:$ [93] \\ $h_{6}:$ [53] \item[156] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{1}:$ [134] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[7/138] \mb{7/138} \begin{gl} \item[135] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \item[136] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[6/138] \mb{6/138} \begin{gl} \item[115] {\rm Sq(2,1)[86]} \item[116] {\rm Sq(3)[89]} \\ $h_{7}:$ [2] \end{gl} \end{bdl} \dm{139} \begin{bdl} \item[71/139] \mb{71/139} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[70/139] \mb{70/139} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[69/139] \mb{69/139} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[61/139] \mb{61/139} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[60/139] \mb{60/139} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[59/139] \mb{59/139} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[56/139] \mb{56/139} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[53/139] \mb{53/139} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[52/139] \mb{52/139} \begin{gl} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[51/139] \mb{51/139} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[50/139] \mb{50/139} \begin{gl} \item[26] {\rm Sq(3)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[47/139] \mb{47/139} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[45/139] \mb{45/139} \begin{gl} \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[44/139] \mb{44/139} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[43/139] \mb{43/139} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[42/139] \mb{42/139} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[41/139] \mb{41/139} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[40/139] \mb{40/139} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[39/139] \mb{39/139} \begin{gl} \item[55] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[38/139] \mb{38/139} \begin{gl} \item[58] {\rm Sq(0,1)[58]} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[37/139] \mb{37/139} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[63] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[36/139] \mb{36/139} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \item[65] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[35/139] \mb{35/139} \begin{gl} \item[69] {\rm Sq(3)[73]} \item[70] {\rm Sq(0,1)[74] + Sq(0,1)[73]} \item[71] {\rm Sq(0,1)[75]} \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[34/139] \mb{34/139} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[32/139] \mb{32/139} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[31/139] \mb{31/139} \begin{gl} \item[89] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[29/139] \mb{29/139} \begin{gl} \item[100] {\rm Sq(0,1)[102]} \item[101] {\rm Sq(0,1)[103]} \item[102] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[28/139] \mb{28/139} \begin{gl} \item[107] {\rm Sq(0,1)[112]} \item[108] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[27/139] \mb{27/139} \begin{gl} \item[118] {\rm Sq(1)[126] + Sq(1)[124]} \\ $h_{0}:$ [126], [124] \\ $h_{1}:$ [122], [121], [119] \\ $h_{2}:$ [117], [113] \\ $h_{3}:$ [105], [103], [102] \item[119] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{1}:$ [121], [120], [119] \\ $h_{2}:$ [116], [113] \\ $h_{3}:$ [105], [104], [103], [102], [101] \\ $h_{4}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[26/139] \mb{26/139} \begin{gl} \item[124] {\rm Sq(0,1)[114]} \item[125] {\rm Sq(0,1)[115]} \item[126] {\rm Sq(1)[122] + Sq(1)[119]} \\ $h_{0}:$ [122], [119] \\ $h_{2}:$ [113] \\ $h_{3}:$ [103] \item[127] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{2}:$ [112], [111] \\ $h_{3}:$ [103], [102] \end{gl} \end{bdl} \begin{bdl} \item[25/139] \mb{25/139} \begin{gl} \item[119] {\rm Sq(2,1)[112] + Sq(2,1)[111]} \item[120] {\rm Sq(0,1)[114]} \item[121] {\rm Sq(0,1)[115]} \item[122] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{2}:$ [113] \\ $h_{3}:$ [104] \item[123] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{3}:$ [104], [103] \end{gl} \end{bdl} \begin{bdl} \item[24/139] \mb{24/139} \begin{gl} \item[120] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{3}:$ [111] \item[121] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{3}:$ [111], [110] \end{gl} \end{bdl} \begin{bdl} \item[23/139] \mb{23/139} \begin{gl} \item[126] {\rm Sq(0,1)[126]} \item[127] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \item[128] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[22/139] \mb{22/139} \begin{gl} \item[130] {\rm Sq(0,1)[131]} \item[131] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \item[132] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[21/139] \mb{21/139} \begin{gl} \item[135] {\rm Sq(3)[139] + Sq(3)[138]} \item[136] {\rm Sq(3)[140] + Sq(0,1)[140] + Sq(3)[138] + Sq(0,1)[138]} \item[137] {\rm Sq(2)[142]} \\ $h_{1}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[20/139] \mb{20/139} \begin{gl} \item[143] {\rm Sq(1,1)[140]} \item[144] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{1}:$ [146] \\ $h_{2}:$ [142] \\ $h_{5}:$ [68], [67] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[19/139] \mb{19/139} \begin{gl} \item[148] {\rm Sq(0,1)[146]} \item[149] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{2}:$ [144] \\ $h_{5}:$ [74] \\ $h_{6}:$ [28] \item[150] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{2}:$ [145] \item[151] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{1}:$ [148] \\ $h_{2}:$ [144] \\ $h_{4}:$ [115], [114] \\ $h_{6}:$ [29], [28] \end{gl} \end{bdl} \begin{bdl} \item[18/139] \mb{18/139} \begin{gl} \item[150] {\rm Sq(3)[151]} \\ $h_{5}:$ [76] \\ $h_{6}:$ [30] \item[151] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{2}:$ [149] \item[152] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{4}:$ [121], [118] \\ $h_{6}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[17/139] \mb{17/139} \begin{gl} \item[153] {\rm Sq(3,1)[152] + Sq(3,1)[151] + Sq(0,2)[151]} \item[154] {\rm Sq(1,1)[157]} \item[155] {\rm Sq(1)[160]} \\ $h_{0}:$ [160] \item[156] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{4}:$ [121] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[16/139] \mb{16/139} \begin{gl} \item[160] {\rm Sq(1,1)[158]} \item[161] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[162] + Sq(0,1)[162] + Sq(3)[160]} \\ $h_{5}:$ [73] \item[162] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{4}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[15/139] \mb{15/139} \begin{gl} \item[165] {\rm Sq(0,1)[167]} \\ $h_{5}:$ [82] \\ $h_{6}:$ [38], [37] \item[166] {\rm Sq(1)[176] + Sq(1)[175] + Sq(1)[173]} \\ $h_{0}:$ [176], [175], [173] \\ $h_{4}:$ [119], [117] \end{gl} \end{bdl} \begin{bdl} \item[14/139] \mb{14/139} \begin{gl} \item[173] {\rm Sq(5)[166] + Sq(2,1)[166] + Sq(5)[164] + Sq(2,1)[164]} \item[174] {\rm Sq(0,1)[172] + Sq(3)[171]} \\ $h_{3}:$ [150] \item[175] {\rm Sq(3)[174] + Sq(0,1)[174] + Sq(3)[173] + Sq(0,1)[173] + Sq(0,1)[171]} \\ $h_{3}:$ [150] \\ $h_{4}:$ [121] \item[176] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{3}:$ [150] \\ $h_{4}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[13/139] \mb{13/139} \begin{gl} \item[179] {\rm Sq(2)[177]} \\ $h_{1}:$ [177] \\ $h_{2}:$ [172] \\ $h_{3}:$ [155] \item[180] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{1}:$ [179] \\ $h_{2}:$ [171] \\ $h_{4}:$ [119] \item[181] {\rm Sq(1)[184] + Sq(1)[183]} \\ $h_{0}:$ [184], [183] \end{gl} \end{bdl} \begin{bdl} \item[12/139] \mb{12/139} \begin{gl} \item[182] {\rm Sq(3)[181]} \item[183] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{3}:$ [159] \\ $h_{4}:$ [126], [125] \item[184] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{3}:$ [159] \\ $h_{4}:$ [126], [125] \item[185] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [179] \\ $h_{3}:$ [164], [159] \\ $h_{4}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[11/139] \mb{11/139} \begin{gl} \item[189] {\rm Sq(1,1)[182]} \item[190] {\rm Sq(1,1)[183] + Sq(1,1)[181] + Sq(1,1)[179]} \item[191] {\rm Sq(3)[186] + Sq(0,1)[186] + Sq(3)[185]} \\ $h_{2}:$ [179] \\ $h_{3}:$ [165] \item[192] {\rm Sq(2)[188] + Sq(2)[187]} \\ $h_{1}:$ [188], [187] \\ $h_{2}:$ [179] \\ $h_{3}:$ [165] \\ $h_{4}:$ [128], [127] \item[193] {\rm Sq(1)[194] + Sq(1)[192]} \\ $h_{0}:$ [194], [192] \\ $h_{1}:$ [187] \\ $h_{2}:$ [182], [180], [179] \\ $h_{3}:$ [165], [164] \\ $h_{4}:$ [131], [130], [129], [128] \end{gl} \end{bdl} \begin{bdl} \item[10/139] \mb{10/139} \begin{gl} \item[192] {\rm Sq(2,1)[168]} \\ $h_{6}:$ [51] \item[193] {\rm Sq(2)[174]} \\ $h_{1}:$ [174] \\ $h_{3}:$ [158] \\ $h_{4}:$ [123] \item[194] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{2}:$ [170] \\ $h_{4}:$ [125], [124], [123] \\ $h_{6}:$ [51] \item[195] {\rm Sq(1)[181] + Sq(1)[178]} \\ $h_{0}:$ [181], [178] \\ $h_{2}:$ [171], [170] \\ $h_{3}:$ [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[9/139] \mb{9/139} \begin{gl} \item[178] {\rm Sq(3,1)[148] + Sq(3,1)[146]} \\ $h_{4}:$ [114] \item[179] {\rm Sq(1,1)[151]} \\ $h_{4}:$ [114] \item[180] {\rm Sq(2)[154]} \\ $h_{1}:$ [154] \\ $h_{3}:$ [141], [139] \item[181] {\rm Sq(1)[158] + Sq(1)[157]} \\ $h_{0}:$ [158], [157] \\ $h_{3}:$ [143], [141], [139] \\ $h_{4}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[8/139] \mb{8/139} \begin{gl} \item[157] {\rm Sq(3)[133] + Sq(0,1)[133]} \\ $h_{4}:$ [103] \item[158] {\rm Sq(1)[139] + Sq(1)[137]} \\ $h_{0}:$ [139], [137] \\ $h_{3}:$ [123] \\ $h_{4}:$ [103] \item[159] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [122] \\ $h_{4}:$ [105], [103] \\ $h_{5}:$ [95] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[7/139] \mb{7/139} \begin{gl} \item[137] {\rm Sq(1,1)[114]} \item[138] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \\ $h_{3}:$ [107], [106] \\ $h_{5}:$ [89] \\ $h_{6}:$ [53] \item[139] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{3}:$ [107] \item[140] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{3}:$ [106] \\ $h_{4}:$ [94] \\ $h_{5}:$ [89] \\ $h_{6}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[6/139] \mb{6/139} \begin{gl} \item[117] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \item[118] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[5/139] \mb{5/139} \begin{gl} \item[90] {\rm Sq(6)[61] + Sq(0,2)[61]} \item[91] {\rm Sq(3,1)[62] + Sq(3,1)[61]} \end{gl} \end{bdl} \dm{140} \begin{bdl} \item[66/140] \mb{66/140} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[65/140] \mb{65/140} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[64/140] \mb{64/140} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[58/140] \mb{58/140} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[55/140] \mb{55/140} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[54/140] \mb{54/140} \begin{gl} \item[19] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[53/140] \mb{53/140} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[52/140] \mb{52/140} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26] + Sq(1)[25]} \\ $h_{0}:$ [26], [25] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[51/140] \mb{51/140} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[50/140] \mb{50/140} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[49/140] \mb{49/140} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \item[32] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[48/140] \mb{48/140} \begin{gl} \item[32] {\rm Sq(1,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[47/140] \mb{47/140} \begin{gl} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[46/140] \mb{46/140} \begin{gl} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(0,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[43/140] \mb{43/140} \begin{gl} \item[47] {\rm Sq(3)[51] + Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52] + Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[42/140] \mb{42/140} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[40/140] \mb{40/140} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[39/140] \mb{39/140} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[38/140] \mb{38/140} \begin{gl} \item[61] {\rm Sq(2)[62] + Sq(2)[61]} \\ $h_{1}:$ [62], [61] \item[62] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{3}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[37/140] \mb{37/140} \begin{gl} \item[64] {\rm Sq(0,1)[62] + Sq(3)[61]} \item[65] {\rm Sq(0,1)[63] + Sq(3)[61] + Sq(0,1)[61]} \item[66] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[36/140] \mb{36/140} \begin{gl} \item[66] {\rm Sq(0,1)[68]} \item[67] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[35/140] \mb{35/140} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \\ $h_{3}:$ [67] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[34/140] \mb{34/140} \begin{gl} \item[78] {\rm Sq(1,1)[78] + Sq(1,1)[77]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[33/140] \mb{33/140} \begin{gl} \item[81] {\rm Sq(1,1)[80]} \item[82] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[32/140] \mb{32/140} \begin{gl} \item[86] {\rm Sq(1)[93] + Sq(1)[92]} \\ $h_{0}:$ [93], [92] \\ $h_{2}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[31/140] \mb{31/140} \begin{gl} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(0,1)[93]} \item[92] {\rm Sq(3)[95] + Sq(0,1)[95] + Sq(0,1)[94]} \item[93] {\rm Sq(1)[98] + Sq(1)[96]} \\ $h_{0}:$ [98], [96] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[30/140] \mb{30/140} \begin{gl} \item[96] {\rm Sq(1,1)[97]} \item[97] {\rm Sq(0,1)[98]} \item[98] {\rm Sq(0,1)[99]} \end{gl} \end{bdl} \begin{bdl} \item[28/140] \mb{28/140} \begin{gl} \item[109] {\rm Sq(0,1)[115]} \item[110] {\rm Sq(0,1)[116]} \item[111] {\rm Sq(3)[117] + Sq(0,1)[117]} \end{gl} \end{bdl} \begin{bdl} \item[27/140] \mb{27/140} \begin{gl} \item[120] {\rm Sq(0,1)[119]} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[25/140] \mb{25/140} \begin{gl} \item[124] {\rm Sq(1,1)[116]} \item[125] {\rm Sq(0,1)[117]} \item[126] {\rm Sq(1)[124] + Sq(1)[123]} \\ $h_{0}:$ [124], [123] \\ $h_{2}:$ [116] \\ $h_{3}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[24/140] \mb{24/140} \begin{gl} \item[122] {\rm Sq(0,1)[123]} \item[123] {\rm Sq(3)[124] + Sq(0,1)[124] + Sq(3)[122]} \item[124] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{3}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[23/140] \mb{23/140} \begin{gl} \item[129] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[22/140] \mb{22/140} \begin{gl} \item[133] {\rm Sq(3,1)[127] + Sq(3,1)[126] + Sq(0,2)[125] + Sq(3,1)[124]} \item[134] {\rm Sq(0,1)[133]} \item[135] {\rm Sq(2)[137]} \\ $h_{1}:$ [137] \item[136] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [118] \item[137] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{1}:$ [136] \\ $h_{3}:$ [120] \\ $h_{4}:$ [101], [100] \\ $h_{5}:$ [67], [65] \\ $h_{6}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[21/140] \mb{21/140} \begin{gl} \item[138] {\rm Sq(0,1)[141]} \item[139] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \item[140] {\rm Sq(1)[147] + Sq(1)[146]} \\ $h_{0}:$ [147], [146] \\ $h_{3}:$ [127] \\ $h_{4}:$ [108] \\ $h_{5}:$ [68], [65] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[20/140] \mb{20/140} \begin{gl} \item[145] {\rm Sq(1,1)[145]} \item[146] {\rm Sq(1)[154] + Sq(1)[153]} \\ $h_{0}:$ [154], [153] \item[147] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{3}:$ [134] \\ $h_{4}:$ [114] \\ $h_{5}:$ [71] \\ $h_{6}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[19/140] \mb{19/140} \begin{gl} \item[152] {\rm Sq(0,1)[148]} \item[153] {\rm Sq(3)[149] + Sq(0,1)[149]} \item[154] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \item[155] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{3}:$ [137] \\ $h_{4}:$ [117] \\ $h_{5}:$ [76] \\ $h_{6}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[18/140] \mb{18/140} \begin{gl} \item[153] {\rm Sq(1,1)[151]} \item[154] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{1}:$ [154] \\ $h_{2}:$ [151] \item[155] {\rm Sq(1)[160] + Sq(1)[157]} \\ $h_{0}:$ [160], [157] \\ $h_{4}:$ [123] \\ $h_{5}:$ [80] \\ $h_{6}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[17/140] \mb{17/140} \begin{gl} \item[157] {\rm Sq(1,1)[158]} \\ $h_{6}:$ [33] \item[158] {\rm Sq(2)[160]} \\ $h_{1}:$ [160] \item[159] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \item[160] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{4}:$ [125], [122] \end{gl} \end{bdl} \begin{bdl} \item[16/140] \mb{16/140} \begin{gl} \item[163] {\rm Sq(1,1)[162]} \item[164] {\rm Sq(0,1)[164]} \item[165] {\rm Sq(1)[169] + Sq(1)[168]} \\ $h_{0}:$ [169], [168] \\ $h_{4}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[15/140] \mb{15/140} \begin{gl} \item[167] {\rm Sq(2)[175] + Sq(2)[174]} \\ $h_{1}:$ [175], [174] \\ $h_{3}:$ [153] \\ $h_{4}:$ [123] \\ $h_{5}:$ [84] \item[168] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [168] \\ $h_{5}:$ [83] \\ $h_{6}:$ [39] \item[169] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{2}:$ [168] \\ $h_{4}:$ [122] \\ $h_{5}:$ [83] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[14/140] \mb{14/140} \begin{gl} \item[177] {\rm Sq(0,1)[175]} \\ $h_{5}:$ [87] \\ $h_{6}:$ [38] \item[178] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{2}:$ [171] \\ $h_{6}:$ [38] \item[179] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{2}:$ [171] \\ $h_{6}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[13/140] \mb{13/140} \begin{gl} \item[182] {\rm Sq(3)[179] + Sq(3)[178] + Sq(3)[177]} \item[183] {\rm Sq(3)[181] + Sq(0,1)[181] + Sq(3)[180] + Sq(0,1)[180] + Sq(3)[178] + Sq(3)[177]} \\ $h_{4}:$ [125], [124] \item[184] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \item[185] {\rm Sq(1)[189] + Sq(1)[187]} \\ $h_{0}:$ [189], [187] \\ $h_{2}:$ [176], [174] \\ $h_{4}:$ [128], [127] \end{gl} \end{bdl} \begin{bdl} \item[12/140] \mb{12/140} \begin{gl} \item[186] {\rm Sq(1,1)[181]} \item[187] {\rm Sq(4)[181]} \\ $h_{2}:$ [181] \\ $h_{6}:$ [45] \item[188] {\rm Sq(2)[192] + Sq(2)[191] + Sq(2)[190]} \\ $h_{1}:$ [192], [191], [190] \\ $h_{3}:$ [168], [167] \\ $h_{4}:$ [131], [130] \\ $h_{6}:$ [45] \item[189] {\rm Sq(1)[197] + Sq(1)[195]} \\ $h_{0}:$ [197], [195] \\ $h_{4}:$ [133], [132] \\ $h_{6}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[11/140] \mb{11/140} \begin{gl} \item[194] {\rm Sq(3)[188] + Sq(3)[187]} \item[195] {\rm Sq(3)[190] + Sq(0,1)[190] + Sq(3)[187] + Sq(0,1)[187]} \\ $h_{4}:$ [133] \item[196] {\rm Sq(1)[198]} \\ $h_{0}:$ [198] \\ $h_{2}:$ [186] \\ $h_{3}:$ [171] \item[197] {\rm Sq(1)[201] + Sq(1)[196]} \\ $h_{0}:$ [201], [196] \\ $h_{4}:$ [136], [135], [134] \end{gl} \end{bdl} \begin{bdl} \item[10/140] \mb{10/140} \begin{gl} \item[196] {\rm Sq(2,1)[170]} \item[197] {\rm Sq(1,1)[172]} \item[198] {\rm Sq(4)[172]} \\ $h_{2}:$ [172] \\ $h_{3}:$ [162] \item[199] {\rm Sq(2)[179] + Sq(2)[178]} \\ $h_{1}:$ [179], [178] \\ $h_{4}:$ [128] \item[200] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{3}:$ [165], [164], [163] \\ $h_{4}:$ [129], [128], [127], [126] \item[201] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{4}:$ [130], [129], [128], [126] \end{gl} \end{bdl} \begin{bdl} \item[9/140] \mb{9/140} \begin{gl} \item[182] {\rm Sq(3)[154] + Sq(0,1)[154]} \\ $h_{6}:$ [57] \item[183] {\rm Sq(3)[155] + Sq(0,1)[155]} \\ $h_{3}:$ [144] \item[184] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{4}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[8/140] \mb{8/140} \begin{gl} \item[160] {\rm Sq(3)[135] + Sq(0,1)[135]} \item[161] {\rm Sq(3)[136] + Sq(0,1)[136]} \item[162] {\rm Sq(2)[137]} \\ $h_{1}:$ [137] \\ $h_{3}:$ [125] \item[163] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{2}:$ [133] \\ $h_{6}:$ [59], [56] \end{gl} \end{bdl} \begin{bdl} \item[7/140] \mb{7/140} \begin{gl} \item[141] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{6}:$ [55] \item[142] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{4}:$ [96], [95] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[6/140] \mb{6/140} \begin{gl} \item[119] {\rm Sq(3,1)[88]} \\ $h_{6}:$ [48] \item[120] {\rm Sq(2)[90]} \\ $h_{1}:$ [90] \item[121] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \\ $h_{3}:$ [84] \\ $h_{4}:$ [77] \\ $h_{5}:$ [75] \\ $h_{6}:$ [48] \item[122] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{4}:$ [77] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[5/140] \mb{5/140} \begin{gl} \item[92] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[4/140] \mb{4/140} \begin{gl} \item[65] {\rm Sq(6)[45] + Sq(3,1)[45] + Sq(0,2)[45]} \end{gl} \end{bdl} \dm{141} \begin{bdl} \item[65/141] \mb{65/141} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[64/141] \mb{64/141} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[63/141] \mb{63/141} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[60/141] \mb{60/141} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[57/141] \mb{57/141} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[54/141] \mb{54/141} \begin{gl} \item[20] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[53/141] \mb{53/141} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[52/141] \mb{52/141} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[51/141] \mb{51/141} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[50/141] \mb{50/141} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[49/141] \mb{49/141} \begin{gl} \item[33] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[34] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[48/141] \mb{48/141} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[47/141] \mb{47/141} \begin{gl} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[46/141] \mb{46/141} \begin{gl} \item[40] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [39], [37] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[45/141] \mb{45/141} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40] + Sq(3)[39]} \item[43] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [38] \\ $h_{4}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[44/141] \mb{44/141} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \item[43] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[43/141] \mb{43/141} \begin{gl} \item[49] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{4}:$ [32], [29] \end{gl} \end{bdl} \begin{bdl} \item[42/141] \mb{42/141} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[41/141] \mb{41/141} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[40/141] \mb{40/141} \begin{gl} \item[57] {\rm Sq(1)[60] + Sq(1)[59]} \\ $h_{0}:$ [60], [59] \\ $h_{4}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[39/141] \mb{39/141} \begin{gl} \item[57] {\rm Sq(0,1)[58]} \item[58] {\rm Sq(0,1)[59]} \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \\ $h_{4}:$ [39] \item[60] {\rm Sq(1)[65] + Sq(1)[63]} \\ $h_{0}:$ [65], [63] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[38/141] \mb{38/141} \begin{gl} \item[63] {\rm Sq(3)[63] + Sq(0,1)[63] + Sq(0,1)[61]} \item[64] {\rm Sq(1)[68] + Sq(1)[67]} \\ $h_{0}:$ [68], [67] \\ $h_{2}:$ [60] \\ $h_{3}:$ [55] \item[65] {\rm Sq(1)[69] + Sq(1)[67]} \\ $h_{0}:$ [69], [67] \\ $h_{2}:$ [60] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[37/141] \mb{37/141} \begin{gl} \item[67] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [61] \item[68] {\rm Sq(1)[71] + Sq(1)[70]} \\ $h_{0}:$ [71], [70] \\ $h_{3}:$ [55] \item[69] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[36/141] \mb{36/141} \begin{gl} \item[68] {\rm Sq(0,1)[69]} \item[69] {\rm Sq(0,1)[71]} \item[70] {\rm Sq(3)[72] + Sq(0,1)[72] + Sq(0,1)[70] + Sq(3)[69]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [61] \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[35/141] \mb{35/141} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \item[77] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[34/141] \mb{34/141} \begin{gl} \item[82] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \item[83] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[33/141] \mb{33/141} \begin{gl} \item[83] {\rm Sq(0,1)[82]} \item[84] {\rm Sq(3)[82]} \item[85] {\rm Sq(0,1)[83]} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(3)[85] + Sq(3)[84]} \end{gl} \end{bdl} \begin{bdl} \item[32/141] \mb{32/141} \begin{gl} \item[87] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[31/141] \mb{31/141} \begin{gl} \item[94] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [98], [96] \\ $h_{2}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[30/141] \mb{30/141} \begin{gl} \item[99] {\rm Sq(0,1)[100]} \item[100] {\rm Sq(0,1)[101]} \item[101] {\rm Sq(0,1)[102]} \item[102] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[29/141] \mb{29/141} \begin{gl} \item[103] {\rm Sq(1,1)[106]} \item[104] {\rm Sq(0,1)[107]} \item[105] {\rm Sq(0,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[28/141] \mb{28/141} \begin{gl} \item[112] {\rm Sq(2)[122] + Sq(2)[121] + Sq(2)[120]} \\ $h_{1}:$ [122], [121], [120] \end{gl} \end{bdl} \begin{bdl} \item[27/141] \mb{27/141} \begin{gl} \item[123] {\rm Sq(0,1)[124]} \item[124] {\rm Sq(0,1)[125]} \item[125] {\rm Sq(3)[127] + Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[26/141] \mb{26/141} \begin{gl} \item[128] {\rm Sq(0,1)[120] + Sq(0,1)[119]} \item[129] {\rm Sq(3)[122] + Sq(0,1)[122] + Sq(0,1)[121] + Sq(3)[119]} \end{gl} \end{bdl} \begin{bdl} \item[25/141] \mb{25/141} \begin{gl} \item[127] {\rm Sq(3)[121] + Sq(0,1)[121] + Sq(3)[120] + Sq(0,1)[120]} \end{gl} \end{bdl} \begin{bdl} \item[24/141] \mb{24/141} \begin{gl} \item[125] {\rm Sq(3)[127] + Sq(0,1)[127] + Sq(0,1)[126]} \end{gl} \end{bdl} \begin{bdl} \item[23/141] \mb{23/141} \begin{gl} \item[130] {\rm Sq(3)[131] + Sq(0,1)[131] + Sq(0,1)[130]} \item[131] {\rm Sq(1)[139] + Sq(1)[138]} \\ $h_{0}:$ [139], [138] \\ $h_{2}:$ [127] \item[132] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{1}:$ [135] \\ $h_{2}:$ [129], [127] \end{gl} \end{bdl} \begin{bdl} \item[22/141] \mb{22/141} \begin{gl} \item[138] {\rm Sq(1,1)[133]} \item[139] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \item[140] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{2}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[21/141] \mb{21/141} \begin{gl} \item[141] {\rm Sq(2,1)[139] + Sq(2,1)[138]} \item[142] {\rm Sq(1,1)[142] + Sq(1,1)[141]} \item[143] {\rm Sq(0,1)[143]} \item[144] {\rm Sq(2)[145]} \\ $h_{1}:$ [145] \\ $h_{3}:$ [128] \item[145] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{2}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[20/141] \mb{20/141} \begin{gl} \item[148] {\rm Sq(1,1)[146]} \item[149] {\rm Sq(0,1)[148]} \item[150] {\rm Sq(2)[152]} \\ $h_{1}:$ [152] \item[151] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [146] \\ $h_{5}:$ [75], [74] \\ $h_{6}:$ [29] \item[152] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{3}:$ [137] \\ $h_{4}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[19/141] \mb{19/141} \begin{gl} \item[156] {\rm Sq(3)[151] + Sq(0,1)[151] + Sq(3)[150]} \\ $h_{5}:$ [78], [77] \\ $h_{6}:$ [32] \item[157] {\rm Sq(2)[153]} \\ $h_{1}:$ [153] \\ $h_{5}:$ [78], [77] \\ $h_{6}:$ [32] \item[158] {\rm Sq(1)[159] + Sq(1)[157]} \\ $h_{0}:$ [159], [157] \\ $h_{3}:$ [141] \\ $h_{4}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[18/141] \mb{18/141} \begin{gl} \item[156] {\rm Sq(3,1)[149]} \item[157] {\rm Sq(3)[155] + Sq(0,1)[155]} \item[158] {\rm Sq(2)[158]} \\ $h_{1}:$ [158] \\ $h_{4}:$ [125] \item[159] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[17/141] \mb{17/141} \begin{gl} \item[161] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[16/141] \mb{16/141} \begin{gl} \item[166] {\rm Sq(2,1)[160]} \item[167] {\rm Sq(0,1)[165]} \\ $h_{5}:$ [78] \item[168] {\rm Sq(3)[165]} \item[169] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{3}:$ [153], [151] \end{gl} \end{bdl} \begin{bdl} \item[15/141] \mb{15/141} \begin{gl} \item[170] {\rm Sq(3)[176] + Sq(0,1)[176] + Sq(3)[175] + Sq(0,1)[175] + Sq(3)[174] + Sq(0,1)[174]} \item[171] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{3}:$ [158], [156] \end{gl} \end{bdl} \begin{bdl} \item[14/141] \mb{14/141} \begin{gl} \item[180] {\rm Sq(1)[187] + Sq(1)[186]} \\ $h_{0}:$ [187], [186] \\ $h_{3}:$ [159] \item[181] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [182] \\ $h_{2}:$ [178], [177] \\ $h_{3}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[13/141] \mb{13/141} \begin{gl} \item[186] {\rm Sq(0,1)[182]} \item[187] {\rm Sq(3)[184] + Sq(0,1)[184] + Sq(3)[183] + Sq(0,1)[183] + Sq(3)[182]} \item[188] {\rm Sq(2)[186]} \\ $h_{1}:$ [186] \item[189] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [178], [177] \end{gl} \end{bdl} \begin{bdl} \item[12/141] \mb{12/141} \begin{gl} \item[190] {\rm Sq(3)[190] + Sq(3)[189]} \item[191] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \\ $h_{4}:$ [136] \item[192] {\rm Sq(1)[198]} \\ $h_{0}:$ [198] \\ $h_{2}:$ [187], [186] \\ $h_{3}:$ [170] \\ $h_{4}:$ [134] \item[193] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{2}:$ [186] \\ $h_{3}:$ [171], [170] \\ $h_{4}:$ [138], [134] \end{gl} \end{bdl} \begin{bdl} \item[11/141] \mb{11/141} \begin{gl} \item[198] {\rm Sq(4)[188] + Sq(4)[187] + Sq(1,1)[187]} \\ $h_{2}:$ [188], [187] \item[199] {\rm Sq(0,1)[192]} \\ $h_{5}:$ [102] \\ $h_{6}:$ [49] \item[200] {\rm Sq(2)[196]} \\ $h_{1}:$ [196] \\ $h_{6}:$ [49] \item[201] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{2}:$ [187] \\ $h_{4}:$ [138] \item[202] {\rm Sq(1)[205] + Sq(1)[202]} \\ $h_{0}:$ [205], [202] \\ $h_{1}:$ [199], [197] \\ $h_{2}:$ [190], [187] \\ $h_{4}:$ [140], [139] \\ $h_{6}:$ [49] \end{gl} \end{bdl} \begin{bdl} \item[10/141] \mb{10/141} \begin{gl} \item[202] {\rm Sq(0,1)[178]} \\ $h_{4}:$ [131] \item[203] {\rm Sq(3)[179] + Sq(0,1)[179] + Sq(3)[178]} \\ $h_{4}:$ [131] \item[204] {\rm Sq(1)[187] + Sq(1)[186]} \\ $h_{0}:$ [187], [186] \\ $h_{2}:$ [176] \\ $h_{3}:$ [167] \\ $h_{4}:$ [131] \item[205] {\rm Sq(1)[188] + Sq(1)[185]} \\ $h_{0}:$ [188], [185] \\ $h_{2}:$ [175] \\ $h_{4}:$ [135], [134], [131] \item[206] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [176] \\ $h_{3}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[9/141] \mb{9/141} \begin{gl} \item[185] {\rm Sq(3,1)[151]} \\ $h_{3}:$ [146] \\ $h_{4}:$ [117] \item[186] {\rm Sq(1,1)[154]} \\ $h_{3}:$ [146] \\ $h_{4}:$ [117] \item[187] {\rm Sq(1,1)[155] + Sq(4)[154]} \\ $h_{2}:$ [154] \\ $h_{3}:$ [147], [146] \\ $h_{4}:$ [117] \item[188] {\rm Sq(3)[157]} \\ $h_{3}:$ [146] \\ $h_{4}:$ [118] \item[189] {\rm Sq(2)[160]} \\ $h_{1}:$ [160] \\ $h_{3}:$ [146] \\ $h_{4}:$ [120], [119] \item[190] {\rm Sq(2)[161]} \\ $h_{1}:$ [161] \\ $h_{3}:$ [146] \\ $h_{4}:$ [121], [120], [119], [117] \item[191] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{2}:$ [154] \\ $h_{3}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[8/141] \mb{8/141} \begin{gl} \item[164] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \end{gl} \end{bdl} \begin{bdl} \item[7/141] \mb{7/141} \begin{gl} \item[143] {\rm Sq(3)[118] + Sq(0,1)[118]} \\ $h_{4}:$ [97] \item[144] {\rm Sq(2)[119]} \\ $h_{1}:$ [119] \\ $h_{6}:$ [57] \item[145] {\rm Sq(2)[120]} \\ $h_{1}:$ [120] \\ $h_{3}:$ [110] \\ $h_{4}:$ [97] \item[146] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \item[147] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [116] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[6/141] \mb{6/141} \begin{gl} \item[123] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \item[124] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[5/141] \mb{5/141} \begin{gl} \item[93] {\rm Sq(5,1)[62] + Sq(1,0,1)[62] + Sq(5,1)[61] + Sq(1,0,1)[61]} \item[94] {\rm Sq(3,1)[64]} \\ $h_{7}:$ [3] \item[95] {\rm Sq(2)[65]} \\ $h_{1}:$ [65] \\ $h_{4}:$ [53] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[4/141] \mb{4/141} \begin{gl} \item[66] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [44] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[3/141] \mb{3/141} \begin{gl} \item[46] {\rm Sq(8)[25] + Sq(5,1)[25] + Sq(2,2)[25] + Sq(1,0,1)[25]} \\ $h_{3}:$ [25] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \dm{142} \begin{bdl} \item[70/142] \mb{70/142} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[69/142] \mb{69/142} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[68/142] \mb{68/142} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[67/142] \mb{67/142} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[66/142] \mb{66/142} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[65/142] \mb{65/142} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[64/142] \mb{64/142} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[63/142] \mb{63/142} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[62/142] \mb{62/142} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[59/142] \mb{59/142} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[56/142] \mb{56/142} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[55/142] \mb{55/142} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[53/142] \mb{53/142} \begin{gl} \item[26] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[52/142] \mb{52/142} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[51/142] \mb{51/142} \begin{gl} \item[29] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[50/142] \mb{50/142} \begin{gl} \item[31] {\rm Sq(0,1)[30]} \item[32] {\rm Sq(0,1)[31]} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[47/142] \mb{47/142} \begin{gl} \item[37] {\rm Sq(0,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[45/142] \mb{45/142} \begin{gl} \item[44] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[44/142] \mb{44/142} \begin{gl} \item[44] {\rm Sq(0,1)[47]} \item[45] {\rm Sq(0,1)[48]} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[43/142] \mb{43/142} \begin{gl} \item[50] {\rm Sq(0,1)[55]} \item[51] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[42/142] \mb{42/142} \begin{gl} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[41/142] \mb{41/142} \begin{gl} \item[60] {\rm Sq(0,1)[55]} \item[61] {\rm Sq(0,1)[56]} \item[62] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[40/142] \mb{40/142} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(1)[62] + Sq(1)[61]} \\ $h_{0}:$ [62], [61] \end{gl} \end{bdl} \begin{bdl} \item[39/142] \mb{39/142} \begin{gl} \item[61] {\rm Sq(3)[62] + Sq(0,1)[62] + Sq(3)[61]} \item[62] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[38/142] \mb{38/142} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \item[68] {\rm Sq(1)[72] + Sq(1)[71]} \\ $h_{0}:$ [72], [71] \end{gl} \end{bdl} \begin{bdl} \item[37/142] \mb{37/142} \begin{gl} \item[70] {\rm Sq(0,1)[66]} \item[71] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \item[72] {\rm Sq(1)[75] + Sq(1)[74]} \\ $h_{0}:$ [75], [74] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[36/142] \mb{36/142} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [69] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [72] \item[75] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [72], [69] \end{gl} \end{bdl} \begin{bdl} \item[35/142] \mb{35/142} \begin{gl} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [76] \item[82] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[34/142] \mb{34/142} \begin{gl} \item[84] {\rm Sq(0,1)[81]} \item[85] {\rm Sq(0,1)[82]} \item[86] {\rm Sq(2)[84] + Sq(2)[83]} \\ $h_{1}:$ [84], [83] \item[87] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[33/142] \mb{33/142} \begin{gl} \item[88] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[32/142] \mb{32/142} \begin{gl} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(0,1)[91]} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(1)[97] + Sq(1)[95]} \\ $h_{0}:$ [97], [95] \end{gl} \end{bdl} \begin{bdl} \item[31/142] \mb{31/142} \begin{gl} \item[95] {\rm Sq(3)[96] + Sq(0,1)[96]} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[29/142] \mb{29/142} \begin{gl} \item[106] {\rm Sq(0,1)[109]} \item[107] {\rm Sq(0,1)[110]} \item[108] {\rm Sq(0,1)[111]} \item[109] {\rm Sq(1)[115] + Sq(1)[114] + Sq(1)[113]} \\ $h_{0}:$ [115], [114], [113] \\ $h_{1}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[28/142] \mb{28/142} \begin{gl} \item[113] {\rm Sq(0,1)[120]} \item[114] {\rm Sq(0,1)[121]} \item[115] {\rm Sq(0,1)[122]} \end{gl} \end{bdl} \begin{bdl} \item[26/142] \mb{26/142} \begin{gl} \item[130] {\rm Sq(0,1)[124]} \item[131] {\rm Sq(0,1)[125]} \item[132] {\rm Sq(2)[127]} \\ $h_{1}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[25/142] \mb{25/142} \begin{gl} \item[128] {\rm Sq(0,1)[122]} \item[129] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[24/142] \mb{24/142} \begin{gl} \item[126] {\rm Sq(1,1)[127] + Sq(1,1)[126]} \item[127] {\rm Sq(1,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[23/142] \mb{23/142} \begin{gl} \item[133] {\rm Sq(0,1)[134] + Sq(0,1)[133]} \end{gl} \end{bdl} \begin{bdl} \item[22/142] \mb{22/142} \begin{gl} \item[141] {\rm Sq(0,1)[138]} \item[142] {\rm Sq(2)[141]} \\ $h_{1}:$ [141] \end{gl} \end{bdl} \begin{bdl} \item[21/142] \mb{21/142} \begin{gl} \item[146] {\rm Sq(1,1)[143]} \item[147] {\rm Sq(2)[148]} \\ $h_{1}:$ [148] \item[148] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{1}:$ [150], [149] \end{gl} \end{bdl} \begin{bdl} \item[20/142] \mb{20/142} \begin{gl} \item[153] {\rm Sq(0,1)[152]} \item[154] {\rm Sq(3)[152]} \item[155] {\rm Sq(2)[157] + Sq(2)[156]} \\ $h_{1}:$ [157], [156] \item[156] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{1}:$ [156] \\ $h_{2}:$ [149] \\ $h_{5}:$ [77] \\ $h_{6}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[19/142] \mb{19/142} \begin{gl} \item[159] {\rm Sq(1,1)[151] + Sq(1,1)[150]} \item[160] {\rm Sq(2)[157] + Sq(2)[156]} \\ $h_{1}:$ [157], [156] \\ $h_{3}:$ [143] \item[161] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{2}:$ [150] \\ $h_{5}:$ [81] \\ $h_{6}:$ [34] \item[162] {\rm Sq(1)[162] + Sq(1)[160]} \\ $h_{0}:$ [162], [160] \\ $h_{2}:$ [151], [150] \\ $h_{5}:$ [81] \\ $h_{6}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[18/142] \mb{18/142} \begin{gl} \item[160] {\rm Sq(3)[159] + Sq(0,1)[159] + Sq(0,1)[157]} \\ $h_{6}:$ [35] \item[161] {\rm Sq(3)[160] + Sq(0,1)[160] + Sq(0,1)[157]} \\ $h_{6}:$ [35] \item[162] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [154] \item[163] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{2}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[17/142] \mb{17/142} \begin{gl} \item[162] {\rm Sq(0,1)[163]} \item[163] {\rm Sq(2)[166]} \\ $h_{1}:$ [166] \\ $h_{2}:$ [160] \item[164] {\rm Sq(2)[168] + Sq(2)[167]} \\ $h_{1}:$ [168], [167] \\ $h_{2}:$ [160] \\ $h_{4}:$ [129] \\ $h_{5}:$ [82] \\ $h_{6}:$ [35] \item[165] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[16/142] \mb{16/142} \begin{gl} \item[170] {\rm Sq(3,1)[163] + Sq(3,1)[162] + Sq(3,1)[161] + Sq(3,1)[160]} \item[171] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{1}:$ [170] \\ $h_{3}:$ [157], [156] \\ $h_{4}:$ [124] \\ $h_{5}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[15/142] \mb{15/142} \begin{gl} \item[172] {\rm Sq(1,1)[176] + Sq(1,1)[175] + Sq(1,1)[174]} \item[173] {\rm Sq(0,1)[177]} \\ $h_{5}:$ [88] \\ $h_{6}:$ [41] \item[174] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{3}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[14/142] \mb{14/142} \begin{gl} \item[182] {\rm Sq(3)[182] + Sq(0,1)[182]} \\ $h_{3}:$ [164] \item[183] {\rm Sq(2)[188]} \\ $h_{1}:$ [188] \\ $h_{3}:$ [164] \\ $h_{4}:$ [133], [132], [131] \end{gl} \end{bdl} \begin{bdl} \item[12/142] \mb{12/142} \begin{gl} \item[194] {\rm Sq(3)[197] + Sq(0,1)[197] + Sq(3)[195] + Sq(0,1)[195]} \item[195] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [200], [199] \\ $h_{2}:$ [190], [189] \\ $h_{5}:$ [95] \item[196] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{2}:$ [190] \\ $h_{3}:$ [178], [177], [176], [175] \\ $h_{4}:$ [141] \\ $h_{5}:$ [96] \end{gl} \end{bdl} \begin{bdl} \item[11/142] \mb{11/142} \begin{gl} \item[203] {\rm Sq(0,1)[196]} \item[204] {\rm Sq(2)[203] + Sq(2)[202]} \\ $h_{1}:$ [203], [202] \\ $h_{4}:$ [143] \item[205] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{3}:$ [178], [177], [176], [175] \\ $h_{4}:$ [143] \\ $h_{5}:$ [105] \item[206] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{1}:$ [202] \\ $h_{2}:$ [194], [192] \\ $h_{3}:$ [176] \\ $h_{4}:$ [146], [144], [142] \end{gl} \end{bdl} \begin{bdl} \item[10/142] \mb{10/142} \begin{gl} \item[207] {\rm Sq(1,1)[181] + Sq(1,1)[179] + Sq(1,1)[178]} \\ $h_{3}:$ [168] \\ $h_{5}:$ [109], [107] \item[208] {\rm Sq(2)[190] + Sq(2)[186]} \\ $h_{1}:$ [190], [186] \\ $h_{2}:$ [178] \\ $h_{4}:$ [138], [137] \item[209] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{2}:$ [179] \\ $h_{4}:$ [139] \item[210] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{1}:$ [189], [185] \\ $h_{4}:$ [140], [139], [137] \end{gl} \end{bdl} \begin{bdl} \item[9/142] \mb{9/142} \begin{gl} \item[192] {\rm Sq(0,1)[161] + Sq(3)[160]} \\ $h_{4}:$ [125], [123] \item[193] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[161] + Sq(0,1)[160]} \\ $h_{4}:$ [125], [123] \\ $h_{6}:$ [63] \item[194] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{4}:$ [126], [125], [123] \item[195] {\rm Sq(1)[168] + Sq(1)[167]} \\ $h_{0}:$ [168], [167] \\ $h_{2}:$ [157] \\ $h_{3}:$ [150] \\ $h_{4}:$ [127] \\ $h_{6}:$ [63] \item[196] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{4}:$ [129] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[8/142] \mb{8/142} \begin{gl} \item[165] {\rm Sq(4)[137]} \\ $h_{2}:$ [137] \\ $h_{3}:$ [128] \item[166] {\rm Sq(1,1)[139] + Sq(1,1)[137]} \\ $h_{4}:$ [109] \item[167] {\rm Sq(1,1)[140]} \\ $h_{3}:$ [129] \\ $h_{4}:$ [110] \item[168] {\rm Sq(3)[141] + Sq(0,1)[141]} \item[169] {\rm Sq(3)[142] + Sq(0,1)[142]} \\ $h_{4}:$ [109] \item[170] {\rm Sq(2)[144]} \\ $h_{1}:$ [144] \\ $h_{3}:$ [130] \\ $h_{6}:$ [63] \item[171] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{4}:$ [113] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[7/142] \mb{7/142} \begin{gl} \item[148] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [117] \\ $h_{3}:$ [111] \item[149] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{4}:$ [100] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[6/142] \mb{6/142} \begin{gl} \item[125] {\rm Sq(4)[90]} \\ $h_{2}:$ [90] \item[126] {\rm Sq(2)[94] + Sq(2)[93]} \\ $h_{1}:$ [94], [93] \\ $h_{7}:$ [4] \item[127] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{4}:$ [79] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[5/142] \mb{5/142} \begin{gl} \item[96] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{4}:$ [55] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[4/142] \mb{4/142} \begin{gl} \item[67] {\rm Sq(5,1)[45] + Sq(2,2)[45]} \item[68] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{4}:$ [38] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[3/142] \mb{3/142} \begin{gl} \item[47] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [22] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[2/142] \mb{2/142} \begin{gl} \item[26] {\rm Sq(16)[7] + Sq(7,3)[7] + Sq(4,4)[7]} \\ $h_{4}:$ [7] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \dm{143} \begin{bdl} \item[72/143] \mb{72/143} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[71/143] \mb{71/143} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[70/143] \mb{70/143} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[69/143] \mb{69/143} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[68/143] \mb{68/143} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[67/143] \mb{67/143} \begin{gl} \item[6] {\rm Sq(1)[10] + Sq(1)[9]} \\ $h_{0}:$ [10], [9] \end{gl} \end{bdl} \begin{bdl} \item[66/143] \mb{66/143} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[65/143] \mb{65/143} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[64/143] \mb{64/143} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[63/143] \mb{63/143} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[62/143] \mb{62/143} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[61/143] \mb{61/143} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[58/143] \mb{58/143} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[56/143] \mb{56/143} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[55/143] \mb{55/143} \begin{gl} \item[19] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[52/143] \mb{52/143} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[51/143] \mb{51/143} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [28] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [33], [32], [31] \\ $h_{2}:$ [29], [28] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[50/143] \mb{50/143} \begin{gl} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[49/143] \mb{49/143} \begin{gl} \item[35] {\rm Sq(0,1)[33]} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[48/143] \mb{48/143} \begin{gl} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[47/143] \mb{47/143} \begin{gl} \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[46/143] \mb{46/143} \begin{gl} \item[42] {\rm Sq(0,1)[41]} \item[43] {\rm Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[45/143] \mb{45/143} \begin{gl} \item[46] {\rm Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[43/143] \mb{43/143} \begin{gl} \item[52] {\rm Sq(0,1)[56]} \item[53] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[42/143] \mb{42/143} \begin{gl} \item[60] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[40/143] \mb{40/143} \begin{gl} \item[60] {\rm Sq(0,1)[57]} \item[61] {\rm Sq(0,1)[58]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[39/143] \mb{39/143} \begin{gl} \item[63] {\rm Sq(3)[65] + Sq(0,1)[65] + Sq(3)[63]} \end{gl} \end{bdl} \begin{bdl} \item[37/143] \mb{37/143} \begin{gl} \item[73] {\rm Sq(0,1)[69]} \item[74] {\rm Sq(0,1)[70] + Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[36/143] \mb{36/143} \begin{gl} \item[76] {\rm Sq(3)[77] + Sq(0,1)[77] + Sq(3)[76] + Sq(0,1)[76] + Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[35/143] \mb{35/143} \begin{gl} \item[83] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [86], [85] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71] \item[84] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{1}:$ [84] \\ $h_{2}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[34/143] \mb{34/143} \begin{gl} \item[88] {\rm Sq(0,1)[83]} \item[89] {\rm Sq(0,1)[85] + Sq(3)[84] + Sq(3)[83]} \item[90] {\rm Sq(0,1)[86]} \item[91] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[33/143] \mb{33/143} \begin{gl} \item[89] {\rm Sq(1,1)[86]} \item[90] {\rm Sq(0,1)[87]} \end{gl} \end{bdl} \begin{bdl} \item[32/143] \mb{32/143} \begin{gl} \item[92] {\rm Sq(2)[95]} \\ $h_{1}:$ [95] \item[93] {\rm Sq(1)[101] + Sq(1)[100]} \\ $h_{0}:$ [101], [100] \\ $h_{2}:$ [93], [92] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[31/143] \mb{31/143} \begin{gl} \item[98] {\rm Sq(0,1)[100]} \item[99] {\rm Sq(0,1)[101]} \item[100] {\rm Sq(3)[102] + Sq(0,1)[102] + Sq(0,1)[99]} \item[101] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [98], [96] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[30/143] \mb{30/143} \begin{gl} \item[103] {\rm Sq(0,1)[103]} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[28/143] \mb{28/143} \begin{gl} \item[116] {\rm Sq(0,1)[123]} \item[117] {\rm Sq(0,1)[124]} \item[118] {\rm Sq(1)[130] + Sq(1)[126]} \\ $h_{0}:$ [130], [126] \\ $h_{3}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[27/143] \mb{27/143} \begin{gl} \item[126] {\rm Sq(2,1)[125] + Sq(2,1)[124]} \item[127] {\rm Sq(0,1)[128]} \item[128] {\rm Sq(0,1)[129]} \item[129] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{1}:$ [132], [130] \item[130] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{3}:$ [117], [113] \end{gl} \end{bdl} \begin{bdl} \item[26/143] \mb{26/143} \begin{gl} \item[133] {\rm Sq(0,1)[127]} \item[134] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{3}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[25/143] \mb{25/143} \begin{gl} \item[130] {\rm Sq(0,1)[125]} \item[131] {\rm Sq(1)[131] + Sq(1)[128]} \\ $h_{0}:$ [131], [128] \\ $h_{3}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[24/143] \mb{24/143} \begin{gl} \item[128] {\rm Sq(1,1)[129]} \item[129] {\rm Sq(0,1)[130]} \item[130] {\rm Sq(3)[131] + Sq(0,1)[131] + Sq(3)[130]} \item[131] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[23/143] \mb{23/143} \begin{gl} \item[134] {\rm Sq(1,1)[137] + Sq(1,1)[136] + Sq(1,1)[134]} \\ $h_{5}:$ [69] \\ $h_{6}:$ [21] \item[135] {\rm Sq(0,1)[138]} \item[136] {\rm Sq(2)[142]} \\ $h_{1}:$ [142] \\ $h_{3}:$ [124] \item[137] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[22/143] \mb{22/143} \begin{gl} \item[143] {\rm Sq(1,1)[139]} \item[144] {\rm Sq(0,1)[142] + Sq(0,1)[141]} \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{2}:$ [139] \\ $h_{3}:$ [130] \end{gl} \end{bdl} \begin{bdl} \item[21/143] \mb{21/143} \begin{gl} \item[149] {\rm Sq(0,1)[149] + Sq(0,1)[148]} \\ $h_{2}:$ [145] \\ $h_{3}:$ [134], [133] \item[150] {\rm Sq(3)[150] + Sq(3)[149] + Sq(0,1)[148]} \\ $h_{2}:$ [145] \\ $h_{3}:$ [134], [133] \end{gl} \end{bdl} \begin{bdl} \item[19/143] \mb{19/143} \begin{gl} \item[163] {\rm Sq(4)[153]} \\ $h_{2}:$ [153] \item[164] {\rm Sq(0,1)[156]} \item[165] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[18/143] \mb{18/143} \begin{gl} \item[164] {\rm Sq(1,1)[158]} \item[165] {\rm Sq(1,1)[160] + Sq(1,1)[159] + Sq(1,1)[157]} \item[166] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{1}:$ [164], [163], [162] \\ $h_{2}:$ [157] \\ $h_{3}:$ [149] \\ $h_{4}:$ [134] \\ $h_{5}:$ [87] \\ $h_{6}:$ [38] \item[167] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{1}:$ [162] \\ $h_{2}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[17/143] \mb{17/143} \begin{gl} \item[166] {\rm Sq(3)[166]} \item[167] {\rm Sq(0,1)[167] + Sq(0,1)[166]} \\ $h_{5}:$ [86] \\ $h_{6}:$ [37] \item[168] {\rm Sq(3)[169] + Sq(0,1)[169] + Sq(3)[168] + Sq(0,1)[168] + Sq(0,1)[166]} \item[169] {\rm Sq(2)[170]} \\ $h_{1}:$ [170] \item[170] {\rm Sq(1)[173] + Sq(1)[172]} \\ $h_{0}:$ [173], [172] \\ $h_{2}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[16/143] \mb{16/143} \begin{gl} \item[172] {\rm Sq(1,1)[169]} \item[173] {\rm Sq(3)[170]} \item[174] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[15/143] \mb{15/143} \begin{gl} \item[175] {\rm Sq(1,1)[177]} \item[176] {\rm Sq(2)[182]} \\ $h_{1}:$ [182] \\ $h_{3}:$ [166], [165] \\ $h_{5}:$ [90] \\ $h_{6}:$ [42] \item[177] {\rm Sq(1)[186] + Sq(1)[185]} \\ $h_{0}:$ [186], [185] \\ $h_{2}:$ [178] \\ $h_{4}:$ [134] \\ $h_{5}:$ [91] \\ $h_{6}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[14/143] \mb{14/143} \begin{gl} \item[184] {\rm Sq(3,1)[178] + Sq(3,1)[177]} \item[185] {\rm Sq(3)[187] + Sq(3)[186] + Sq(0,1)[186]} \\ $h_{5}:$ [91] \\ $h_{6}:$ [43] \item[186] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [182] \\ $h_{4}:$ [137] \\ $h_{5}:$ [91] \item[187] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [184], [182] \\ $h_{4}:$ [139], [138] \end{gl} \end{bdl} \begin{bdl} \item[13/143] \mb{13/143} \begin{gl} \item[190] {\rm Sq(0,1)[190]} \item[191] {\rm Sq(3)[191] + Sq(3)[190]} \\ $h_{2}:$ [186] \\ $h_{4}:$ [140], [139], [137] \item[192] {\rm Sq(3)[192] + Sq(0,1)[192] + Sq(3)[190]} \\ $h_{4}:$ [138], [137] \item[193] {\rm Sq(2)[194]} \\ $h_{1}:$ [194] \\ $h_{3}:$ [172] \\ $h_{6}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[12/143] \mb{12/143} \begin{gl} \item[197] {\rm Sq(3)[200] + Sq(3)[199]} \\ $h_{2}:$ [194] \item[198] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{1}:$ [204], [203] \\ $h_{3}:$ [179] \\ $h_{4}:$ [146] \end{gl} \end{bdl} \begin{bdl} \item[11/143] \mb{11/143} \begin{gl} \item[207] {\rm Sq(3)[205] + Sq(0,1)[205]} \\ $h_{3}:$ [179] \\ $h_{4}:$ [150] \item[208] {\rm Sq(3)[206] + Sq(0,1)[206] + Sq(3)[204] + Sq(0,1)[204] + Sq(0,1)[203] + Sq(3)[202]} \item[209] {\rm Sq(2)[207]} \\ $h_{1}:$ [207] \\ $h_{2}:$ [197], [196] \\ $h_{3}:$ [181] \\ $h_{4}:$ [149], [148] \\ $h_{5}:$ [108] \\ $h_{6}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[10/143] \mb{10/143} \begin{gl} \item[211] {\rm Sq(3)[190] + Sq(3)[186]} \\ $h_{2}:$ [182] \\ $h_{6}:$ [58] \item[212] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \\ $h_{3}:$ [170] \\ $h_{4}:$ [143] \item[213] {\rm Sq(2)[193]} \\ $h_{1}:$ [193] \\ $h_{2}:$ [182] \\ $h_{3}:$ [170] \\ $h_{4}:$ [143] \\ $h_{6}:$ [59], [58] \end{gl} \end{bdl} \begin{bdl} \item[9/143] \mb{9/143} \begin{gl} \item[197] {\rm Sq(3)[164] + Sq(0,1)[164]} \item[198] {\rm Sq(2)[169] + Sq(2)[168] + Sq(2)[166]} \\ $h_{1}:$ [169], [168], [166] \\ $h_{2}:$ [161] \item[199] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{1}:$ [168] \\ $h_{2}:$ [161], [160] \\ $h_{5}:$ [107] \item[200] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{1}:$ [170] \\ $h_{2}:$ [163], [161], [160] \\ $h_{3}:$ [152] \\ $h_{5}:$ [107], [106] \\ $h_{6}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[8/143] \mb{8/143} \begin{gl} \item[172] {\rm Sq(1,1)[141]} \\ $h_{5}:$ [97] \item[173] {\rm Sq(3)[147] + Sq(0,1)[147] + Sq(3)[146] + Sq(0,1)[146]} \\ $h_{7}:$ [3] \item[174] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{4}:$ [115], [114] \\ $h_{7}:$ [3] \item[175] {\rm Sq(1)[153] + Sq(1)[150]} \\ $h_{0}:$ [153], [150] \\ $h_{2}:$ [141] \\ $h_{5}:$ [97] \\ $h_{6}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[7/143] \mb{7/143} \begin{gl} \item[150] {\rm Sq(3)[123] + Sq(0,1)[123]} \\ $h_{3}:$ [113] \\ $h_{4}:$ [101] \item[151] {\rm Sq(3)[124] + Sq(0,1)[124]} \\ $h_{4}:$ [102] \item[152] {\rm Sq(2)[126]} \\ $h_{1}:$ [126] \\ $h_{3}:$ [114] \\ $h_{7}:$ [5] \item[153] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{2}:$ [119] \\ $h_{3}:$ [113] \\ $h_{4}:$ [101] \\ $h_{6}:$ [60] \item[154] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{2}:$ [119] \\ $h_{4}:$ [104] \\ $h_{6}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[6/143] \mb{6/143} \begin{gl} \item[128] {\rm Sq(0,1)[93]} \\ $h_{6}:$ [51] \item[129] {\rm Sq(3)[95] + Sq(3)[94]} \\ $h_{4}:$ [80] \\ $h_{6}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[5/143] \mb{5/143} \begin{gl} \item[97] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[3/143] \mb{3/143} \begin{gl} \item[48] {\rm Sq(2)[26]} \\ $h_{1}:$ [26] \\ $h_{4}:$ [23] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \dm{144} \begin{bdl} \item[71/144] \mb{71/144} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[70/144] \mb{70/144} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[65/144] \mb{65/144} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[64/144] \mb{64/144} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[63/144] \mb{63/144} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[62/144] \mb{62/144} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[60/144] \mb{60/144} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[57/144] \mb{57/144} \begin{gl} \item[21] {\rm Sq(0,1)[20]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[56/144] \mb{56/144} \begin{gl} \item[22] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[55/144] \mb{55/144} \begin{gl} \item[20] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[54/144] \mb{54/144} \begin{gl} \item[21] {\rm Sq(1,1)[25]} \item[22] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[51/144] \mb{51/144} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[49/144] \mb{49/144} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[48/144] \mb{48/144} \begin{gl} \item[36] {\rm Sq(1,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[47/144] \mb{47/144} \begin{gl} \item[39] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [42] \\ $h_{2}:$ [40] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[46/144] \mb{46/144} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[45/144] \mb{45/144} \begin{gl} \item[47] {\rm Sq(0,1)[44]} \item[48] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[44/144] \mb{44/144} \begin{gl} \item[47] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[42/144] \mb{42/144} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[41/144] \mb{41/144} \begin{gl} \item[63] {\rm Sq(0,1)[58]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [62], [61], [60] \end{gl} \end{bdl} \begin{bdl} \item[40/144] \mb{40/144} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[39/144] \mb{39/144} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(0,1)[67]} \item[66] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[38/144] \mb{38/144} \begin{gl} \item[69] {\rm Sq(1,1)[68]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[37/144] \mb{37/144} \begin{gl} \item[75] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[36/144] \mb{36/144} \begin{gl} \item[77] {\rm Sq(0,1)[78]} \item[78] {\rm Sq(0,1)[79]} \item[79] {\rm Sq(0,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[35/144] \mb{35/144} \begin{gl} \item[85] {\rm Sq(3)[86] + Sq(3)[85] + Sq(0,1)[85] + Sq(3)[84]} \end{gl} \end{bdl} \begin{bdl} \item[33/144] \mb{33/144} \begin{gl} \item[91] {\rm Sq(0,1)[88]} \item[92] {\rm Sq(0,1)[89]} \item[93] {\rm Sq(0,1)[90]} \item[94] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[32/144] \mb{32/144} \begin{gl} \item[94] {\rm Sq(0,1)[97] + Sq(0,1)[96]} \item[95] {\rm Sq(3)[97] + Sq(0,1)[95]} \end{gl} \end{bdl} \begin{bdl} \item[31/144] \mb{31/144} \begin{gl} \item[102] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [103] \\ $h_{2}:$ [102] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[30/144] \mb{30/144} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{2}:$ [103] \end{gl} \end{bdl} \begin{bdl} \item[29/144] \mb{29/144} \begin{gl} \item[110] {\rm Sq(0,1)[113]} \item[111] {\rm Sq(0,1)[115]} \item[112] {\rm Sq(3)[115] + Sq(3)[114] + Sq(3)[113]} \end{gl} \end{bdl} \begin{bdl} \item[27/144] \mb{27/144} \begin{gl} \item[131] {\rm Sq(0,1)[131] + Sq(0,1)[130]} \item[132] {\rm Sq(3)[132] + Sq(3)[130] + Sq(0,1)[130]} \item[133] {\rm Sq(1)[138] + Sq(1)[135]} \\ $h_{0}:$ [138], [135] \\ $h_{1}:$ [133] \\ $h_{3}:$ [118] \\ $h_{4}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[26/144] \mb{26/144} \begin{gl} \item[135] {\rm Sq(2,1)[125]} \item[136] {\rm Sq(0,1)[128]} \item[137] {\rm Sq(0,1)[129]} \item[138] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[25/144] \mb{25/144} \begin{gl} \item[132] {\rm Sq(2)[130] + Sq(2)[129] + Sq(2)[128]} \\ $h_{1}:$ [130], [129], [128] \item[133] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{3}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[24/144] \mb{24/144} \begin{gl} \item[132] {\rm Sq(0,1)[133]} \item[133] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \item[134] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{1}:$ [136], [134] \\ $h_{2}:$ [131], [130] \\ $h_{3}:$ [121] \\ $h_{4}:$ [104] \\ $h_{5}:$ [67] \\ $h_{6}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[23/144] \mb{23/144} \begin{gl} \item[138] {\rm Sq(3)[142] + Sq(0,1)[141]} \item[139] {\rm Sq(2)[143]} \\ $h_{1}:$ [143] \item[140] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{5}:$ [71] \\ $h_{6}:$ [23] \item[141] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \item[142] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{2}:$ [139], [138] \\ $h_{5}:$ [71] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[22/144] \mb{22/144} \begin{gl} \item[146] {\rm Sq(3)[147]} \\ $h_{6}:$ [27] \item[147] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \item[148] {\rm Sq(1)[153] + Sq(1)[151]} \\ $h_{0}:$ [153], [151] \\ $h_{2}:$ [141] \\ $h_{6}:$ [27] \item[149] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{2}:$ [145], [141] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[21/144] \mb{21/144} \begin{gl} \item[151] {\rm Sq(1,1)[149]} \item[152] {\rm Sq(0,1)[153]} \item[153] {\rm Sq(3)[153]} \item[154] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{2}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[20/144] \mb{20/144} \begin{gl} \item[157] {\rm Sq(3,1)[149]} \item[158] {\rm Sq(0,1)[159]} \item[159] {\rm Sq(3)[161] + Sq(0,1)[161] + Sq(3)[160]} \\ $h_{3}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[18/144] \mb{18/144} \begin{gl} \item[168] {\rm Sq(3)[162]} \item[169] {\rm Sq(2)[168]} \\ $h_{1}:$ [168] \item[170] {\rm Sq(1)[172] + Sq(1)[171]} \\ $h_{0}:$ [172], [171] \\ $h_{1}:$ [169], [166] \end{gl} \end{bdl} \begin{bdl} \item[17/144] \mb{17/144} \begin{gl} \item[171] {\rm Sq(3)[170]} \\ $h_{2}:$ [166] \item[172] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{2}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[16/144] \mb{16/144} \begin{gl} \item[175] {\rm Sq(5,1)[163] + Sq(1,0,1)[163] + Sq(5,1)[162] + Sq(1,0,1)[162] + Sq(1,0,1)[161]} \item[176] {\rm Sq(0,1)[172]} \item[177] {\rm Sq(0,1)[173]} \end{gl} \end{bdl} \begin{bdl} \item[15/144] \mb{15/144} \begin{gl} \item[178] {\rm Sq(2,1)[177]} \end{gl} \end{bdl} \begin{bdl} \item[14/144] \mb{14/144} \begin{gl} \item[188] {\rm Sq(1)[195] + Sq(1)[194]} \\ $h_{0}:$ [195], [194] \\ $h_{1}:$ [192], [190] \\ $h_{2}:$ [186] \\ $h_{4}:$ [141] \\ $h_{5}:$ [93] \item[189] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \\ $h_{1}:$ [193] \\ $h_{2}:$ [186] \\ $h_{3}:$ [174], [172], [171] \\ $h_{4}:$ [140] \\ $h_{5}:$ [93] \\ $h_{6}:$ [44] \item[190] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{1}:$ [192] \\ $h_{2}:$ [189], [187] \\ $h_{4}:$ [141], [140] \\ $h_{5}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[13/144] \mb{13/144} \begin{gl} \item[194] {\rm Sq(3,1)[182] + Sq(0,2)[182]} \item[195] {\rm Sq(3)[194]} \item[196] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \\ $h_{3}:$ [176] \\ $h_{6}:$ [45] \item[197] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{2}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[12/144] \mb{12/144} \begin{gl} \item[199] {\rm Sq(1,1)[201]} \\ $h_{3}:$ [181] \item[200] {\rm Sq(0,1)[203]} \item[201] {\rm Sq(3)[205] + Sq(0,1)[205] + Sq(3)[204] + Sq(3)[203]} \\ $h_{2}:$ [198] \\ $h_{3}:$ [182], [181] \\ $h_{4}:$ [147] \item[202] {\rm Sq(2)[208]} \\ $h_{1}:$ [208] \item[203] {\rm Sq(1)[212] + Sq(1)[211] + Sq(1)[210]} \\ $h_{0}:$ [212], [211], [210] \\ $h_{1}:$ [207] \\ $h_{2}:$ [201] \\ $h_{3}:$ [184] \\ $h_{4}:$ [152], [151], [150], [148], [147] \end{gl} \end{bdl} \begin{bdl} \item[11/144] \mb{11/144} \begin{gl} \item[210] {\rm Sq(1,1)[205] + Sq(1,1)[203]} \\ $h_{5}:$ [109] \\ $h_{6}:$ [52] \item[211] {\rm Sq(1,1)[206] + Sq(1,1)[204]} \\ $h_{4}:$ [152] \\ $h_{5}:$ [109] \\ $h_{6}:$ [52] \item[212] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{2}:$ [203] \\ $h_{3}:$ [186] \\ $h_{4}:$ [153] \item[213] {\rm Sq(1)[217] + Sq(1)[215]} \\ $h_{0}:$ [217], [215] \\ $h_{1}:$ [212] \\ $h_{2}:$ [205], [203] \\ $h_{3}:$ [186], [185], [184] \\ $h_{4}:$ [154] \\ $h_{5}:$ [109] \\ $h_{6}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[10/144] \mb{10/144} \begin{gl} \item[214] {\rm Sq(1,1)[188] + Sq(1,1)[185]} \\ $h_{3}:$ [172] \\ $h_{4}:$ [146] \item[215] {\rm Sq(3)[194] + Sq(0,1)[194] + Sq(3)[192]} \\ $h_{2}:$ [186], [185] \\ $h_{3}:$ [172] \\ $h_{5}:$ [111] \item[216] {\rm Sq(3)[196] + Sq(0,1)[196]} \\ $h_{7}:$ [1] \item[217] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{2}:$ [188], [186] \\ $h_{4}:$ [147] \\ $h_{5}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[9/144] \mb{9/144} \begin{gl} \item[201] {\rm Sq(2)[173]} \\ $h_{1}:$ [173] \\ $h_{7}:$ [2] \item[202] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{4}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[8/144] \mb{8/144} \begin{gl} \item[176] {\rm Sq(1,1)[144]} \item[177] {\rm Sq(1,1)[146] + Sq(4)[143]} \\ $h_{2}:$ [143] \\ $h_{4}:$ [117] \item[178] {\rm Sq(1)[156] + Sq(1)[155]} \\ $h_{0}:$ [156], [155] \\ $h_{1}:$ [152] \\ $h_{2}:$ [147], [146] \\ $h_{3}:$ [134] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[7/144] \mb{7/144} \begin{gl} \item[155] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{1}:$ [128] \\ $h_{2}:$ [123] \\ $h_{6}:$ [62] \item[156] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{1}:$ [128] \\ $h_{2}:$ [124] \\ $h_{6}:$ [62] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[6/144] \mb{6/144} \begin{gl} \item[130] {\rm Sq(1,1)[93]} \\ $h_{4}:$ [81] \item[131] {\rm Sq(4)[93]} \\ $h_{2}:$ [93] \\ $h_{6}:$ [53] \item[132] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [94] \\ $h_{6}:$ [53] \\ $h_{7}:$ [6] \item[133] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [97] \\ $h_{2}:$ [94] \\ $h_{4}:$ [81] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[5/144] \mb{5/144} \begin{gl} \item[98] {\rm Sq(1,1)[66]} \\ $h_{7}:$ [5] \item[99] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[4/144] \mb{4/144} \begin{gl} \item[69] {\rm Sq(10)[45] + Sq(7,1)[45] + Sq(4,2)[45] + Sq(1,3)[45] + Sq(3,0,1)[45] + Sq(0,1,1)[45]} \item[70] {\rm Sq(2)[48]} \\ $h_{1}:$ [48] \\ $h_{4}:$ [40] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \dm{145} \begin{bdl} \item[73/145] \mb{73/145} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[72/145] \mb{72/145} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[71/145] \mb{71/145} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[70/145] \mb{70/145} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[69/145] \mb{69/145} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[68/145] \mb{68/145} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[63/145] \mb{63/145} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[62/145] \mb{62/145} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[59/145] \mb{59/145} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[56/145] \mb{56/145} \begin{gl} \item[23] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[55/145] \mb{55/145} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[54/145] \mb{54/145} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[53/145] \mb{53/145} \begin{gl} \item[27] {\rm Sq(1,1)[28]} \item[28] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[52/145] \mb{52/145} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[51/145] \mb{51/145} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[50/145] \mb{50/145} \begin{gl} \item[36] {\rm Sq(3)[35]} \item[37] {\rm Sq(0,1)[36] + Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[47/145] \mb{47/145} \begin{gl} \item[40] {\rm Sq(0,1)[43]} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[46/145] \mb{46/145} \begin{gl} \item[46] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[44/145] \mb{44/145} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \item[49] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[43/145] \mb{43/145} \begin{gl} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[41/145] \mb{41/145} \begin{gl} \item[65] {\rm Sq(0,1)[60]} \item[66] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[40/145] \mb{40/145} \begin{gl} \item[64] {\rm Sq(0,1)[63]} \item[65] {\rm Sq(1)[68] + Sq(1)[67]} \\ $h_{0}:$ [68], [67] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[39/145] \mb{39/145} \begin{gl} \item[67] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{1}:$ [69] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[38/145] \mb{38/145} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[73]} \item[73] {\rm Sq(0,1)[74]} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[37/145] \mb{37/145} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{1}:$ [77] \\ $h_{2}:$ [73] \item[78] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[36/145] \mb{36/145} \begin{gl} \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [78] \item[81] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \item[82] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[35/145] \mb{35/145} \begin{gl} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(0,1)[89]} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \item[90] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[34/145] \mb{34/145} \begin{gl} \item[92] {\rm Sq(2,1)[87] + Sq(2,1)[86] + Sq(2,1)[85] + Sq(2,1)[84] + Sq(2,1)[83]} \item[93] {\rm Sq(3)[89]} \item[94] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[32/145] \mb{32/145} \begin{gl} \item[96] {\rm Sq(0,1)[98]} \item[97] {\rm Sq(0,1)[99]} \item[98] {\rm Sq(0,1)[100]} \end{gl} \end{bdl} \begin{bdl} \item[31/145] \mb{31/145} \begin{gl} \item[103] {\rm Sq(0,1)[104] + Sq(0,1)[103]} \item[104] {\rm Sq(0,1)[105] + Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[29/145] \mb{29/145} \begin{gl} \item[113] {\rm Sq(3,1)[111] + Sq(0,2)[111] + Sq(3,1)[110] + Sq(3,1)[109]} \item[114] {\rm Sq(0,1)[116]} \item[115] {\rm Sq(0,1)[117]} \item[116] {\rm Sq(3)[118] + Sq(0,1)[118]} \end{gl} \end{bdl} \begin{bdl} \item[28/145] \mb{28/145} \begin{gl} \item[119] {\rm Sq(0,1)[126]} \item[120] {\rm Sq(0,1)[127]} \item[121] {\rm Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[26/145] \mb{26/145} \begin{gl} \item[139] {\rm Sq(1,1)[129] + Sq(1,1)[128]} \item[140] {\rm Sq(0,1)[130]} \end{gl} \end{bdl} \begin{bdl} \item[25/145] \mb{25/145} \begin{gl} \item[134] {\rm Sq(3)[130] + Sq(3)[129] + Sq(0,1)[129] + Sq(3)[128] + Sq(0,1)[128]} \item[135] {\rm Sq(3)[131] + Sq(0,1)[131] + Sq(0,1)[129] + Sq(3)[128] + Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[24/145] \mb{24/145} \begin{gl} \item[135] {\rm Sq(2)[139]} \\ $h_{1}:$ [139] \item[136] {\rm Sq(1)[145] + Sq(1)[143]} \\ $h_{0}:$ [145], [143] \\ $h_{3}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[23/145] \mb{23/145} \begin{gl} \item[143] {\rm Sq(3)[143] + Sq(0,1)[143]} \item[144] {\rm Sq(0,1)[144] + Sq(0,1)[143]} \item[145] {\rm Sq(1)[152] + Sq(1)[151]} \\ $h_{0}:$ [152], [151] \\ $h_{3}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[22/145] \mb{22/145} \begin{gl} \item[150] {\rm Sq(0,1)[150] + Sq(0,1)[149]} \item[151] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{1}:$ [153], [152], [151] \\ $h_{3}:$ [134] \item[152] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{1}:$ [153], [152], [151] \end{gl} \end{bdl} \begin{bdl} \item[21/145] \mb{21/145} \begin{gl} \item[155] {\rm Sq(1,1)[156] + Sq(1,1)[153]} \\ $h_{3}:$ [142] \item[156] {\rm Sq(2)[157]} \\ $h_{1}:$ [157] \item[157] {\rm Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[20/145] \mb{20/145} \begin{gl} \item[160] {\rm Sq(3,1)[154] + Sq(3,1)[153] + Sq(0,2)[153] + Sq(6)[152] + Sq(0,2)[152]} \item[161] {\rm Sq(1,1)[162] + Sq(1,1)[161]} \item[162] {\rm Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[19/145] \mb{19/145} \begin{gl} \item[166] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [161] \\ $h_{3}:$ [149] \\ $h_{5}:$ [88], [87] \\ $h_{6}:$ [38] \item[167] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{2}:$ [162], [160] \\ $h_{5}:$ [89] \\ $h_{6}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[18/145] \mb{18/145} \begin{gl} \item[171] {\rm Sq(3)[170] + Sq(0,1)[170] + Sq(3)[168] + Sq(0,1)[167]} \\ $h_{6}:$ [40] \item[172] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{2}:$ [162] \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[17/145] \mb{17/145} \begin{gl} \item[173] {\rm Sq(0,1)[173]} \item[174] {\rm Sq(3)[173] + Sq(3)[172]} \item[175] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{1}:$ [175] \\ $h_{2}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[16/145] \mb{16/145} \begin{gl} \item[178] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[15/145] \mb{15/145} \begin{gl} \item[179] {\rm Sq(3)[184]} \item[180] {\rm Sq(0,1)[185]} \\ $h_{5}:$ [94] \\ $h_{6}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[14/145] \mb{14/145} \begin{gl} \item[191] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \\ $h_{4}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[13/145] \mb{13/145} \begin{gl} \item[198] {\rm Sq(4)[194]} \\ $h_{2}:$ [194] \\ $h_{3}:$ [177] \\ $h_{5}:$ [93], [92] \\ $h_{6}:$ [46] \item[199] {\rm Sq(1)[205] + Sq(1)[204]} \\ $h_{0}:$ [205], [204] \\ $h_{1}:$ [202], [200] \\ $h_{5}:$ [92] \item[200] {\rm Sq(1)[206] + Sq(1)[204]} \\ $h_{0}:$ [206], [204] \\ $h_{1}:$ [199] \\ $h_{3}:$ [181], [180], [179], [178], [177] \\ $h_{4}:$ [146], [145] \\ $h_{5}:$ [93] \\ $h_{6}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[12/145] \mb{12/145} \begin{gl} \item[204] {\rm Sq(3)[208]} \item[205] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \item[206] {\rm Sq(1)[216] + Sq(1)[214]} \\ $h_{0}:$ [216], [214] \\ $h_{3}:$ [187], [186] \end{gl} \end{bdl} \begin{bdl} \item[11/145] \mb{11/145} \begin{gl} \item[214] {\rm Sq(3,1)[201] + Sq(3,1)[200] + Sq(3,1)[199] + Sq(3,1)[197] + Sq(0,2)[196]} \item[215] {\rm Sq(5)[206] + Sq(2,1)[206] + Sq(5)[204] + Sq(2,1)[204] + Sq(5)[203] + Sq(2,1)[202]} \item[216] {\rm Sq(3)[212]} \\ $h_{3}:$ [188], [187] \item[217] {\rm Sq(2)[216]} \\ $h_{1}:$ [216] \\ $h_{7}:$ [1] \item[218] {\rm Sq(1)[220] + Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [220], [219], [218] \\ $h_{1}:$ [214] \\ $h_{2}:$ [209] \\ $h_{3}:$ [191], [189], [188], [187] \\ $h_{4}:$ [159], [158] \end{gl} \end{bdl} \begin{bdl} \item[10/145] \mb{10/145} \begin{gl} \item[218] {\rm Sq(5)[191] + Sq(2,1)[191] + Sq(2,1)[190] + Sq(5)[188] + Sq(2,1)[188] + Sq(5)[187] + Sq(2,1)[187] + Sq(2,1)[185]} \\ $h_{6}:$ [61] \item[219] {\rm Sq(3)[197] + Sq(0,1)[197]} \\ $h_{3}:$ [174] \item[220] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{2}:$ [192] \\ $h_{3}:$ [176] \\ $h_{4}:$ [151], [149] \\ $h_{6}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[9/145] \mb{9/145} \begin{gl} \item[203] {\rm Sq(3)[173] + Sq(3)[172] + Sq(0,1)[172]} \\ $h_{2}:$ [168] \\ $h_{4}:$ [133] \item[204] {\rm Sq(3)[174] + Sq(0,1)[174] + Sq(0,1)[173]} \\ $h_{2}:$ [166] \\ $h_{4}:$ [134], [133] \item[205] {\rm Sq(3)[175] + Sq(0,1)[175] + Sq(3)[172] + Sq(0,1)[172]} \\ $h_{3}:$ [154] \\ $h_{4}:$ [133] \item[206] {\rm Sq(2)[176]} \\ $h_{1}:$ [176] \\ $h_{2}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[8/145] \mb{8/145} \begin{gl} \item[179] {\rm Sq(3)[154] + Sq(0,1)[154] + Sq(3)[153] + Sq(0,1)[153] + Sq(0,1)[151] + Sq(3)[150] + Sq(0,1)[150]} \\ $h_{4}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[6/145] \mb{6/145} \begin{gl} \item[134] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{1}:$ [98] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[5/145] \mb{5/145} \begin{gl} \item[100] {\rm Sq(5)[66] + Sq(2,1)[66]} \\ $h_{7}:$ [6] \item[101] {\rm Sq(4)[67] + Sq(1,1)[67]} \\ $h_{2}:$ [67] \\ $h_{6}:$ [43] \\ $h_{7}:$ [6] \item[102] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [70] \\ $h_{2}:$ [68] \\ $h_{4}:$ [58] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[4/145] \mb{4/145} \begin{gl} \item[71] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{2}:$ [47] \\ $h_{4}:$ [41] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[3/145] \mb{3/145} \begin{gl} \item[49] {\rm Sq(4)[26]} \\ $h_{2}:$ [26] \\ $h_{4}:$ [24] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \dm{146} \begin{bdl} \item[74/146] \mb{74/146} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[69/146] \mb{69/146} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[68/146] \mb{68/146} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[67/146] \mb{67/146} \begin{gl} \item[7] {\rm Sq(1,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[66/146] \mb{66/146} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[65/146] \mb{65/146} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[64/146] \mb{64/146} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[61/146] \mb{61/146} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[58/146] \mb{58/146} \begin{gl} \item[17] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[55/146] \mb{55/146} \begin{gl} \item[22] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[52/146] \mb{52/146} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[51/146] \mb{51/146} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[50/146] \mb{50/146} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[49/146] \mb{49/146} \begin{gl} \item[39] {\rm Sq(3)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[48/146] \mb{48/146} \begin{gl} \item[38] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[46/146] \mb{46/146} \begin{gl} \item[47] {\rm Sq(0,1)[47]} \item[48] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[45/146] \mb{45/146} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[43/146] \mb{43/146} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[42/146] \mb{42/146} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[40/146] \mb{40/146} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(3)[66] + Sq(0,1)[66] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[39/146] \mb{39/146} \begin{gl} \item[69] {\rm Sq(0,1)[70] + Sq(3)[69] + Sq(0,1)[69]} \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{1}:$ [71] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[38/146] \mb{38/146} \begin{gl} \item[75] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[37/146] \mb{37/146} \begin{gl} \item[79] {\rm Sq(0,1)[78] + Sq(0,1)[77]} \item[80] {\rm Sq(0,1)[79]} \item[81] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[36/146] \mb{36/146} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[35/146] \mb{35/146} \begin{gl} \item[91] {\rm Sq(2)[92]} \\ $h_{1}:$ [92] \item[92] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [93] \\ $h_{2}:$ [91] \item[93] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[34/146] \mb{34/146} \begin{gl} \item[95] {\rm Sq(0,1)[91]} \item[96] {\rm Sq(0,1)[92]} \item[97] {\rm Sq(0,1)[93]} \item[98] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{2}:$ [89] \item[99] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[33/146] \mb{33/146} \begin{gl} \item[95] {\rm Sq(1,1)[93]} \item[96] {\rm Sq(0,1)[94]} \item[97] {\rm Sq(3)[95]} \end{gl} \end{bdl} \begin{bdl} \item[31/146] \mb{31/146} \begin{gl} \item[105] {\rm Sq(0,1)[106]} \item[106] {\rm Sq(0,1)[107]} \item[107] {\rm Sq(0,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[30/146] \mb{30/146} \begin{gl} \item[110] {\rm Sq(0,1)[111]} \item[111] {\rm Sq(0,1)[112] + Sq(0,1)[110]} \item[112] {\rm Sq(3)[112]} \item[113] {\rm Sq(2)[116] + Sq(2)[113]} \\ $h_{1}:$ [116], [113] \end{gl} \end{bdl} \begin{bdl} \item[28/146] \mb{28/146} \begin{gl} \item[122] {\rm Sq(1,1)[130] + Sq(1,1)[128] + Sq(1,1)[126]} \item[123] {\rm Sq(0,1)[131]} \item[124] {\rm Sq(0,1)[132]} \end{gl} \end{bdl} \begin{bdl} \item[27/146] \mb{27/146} \begin{gl} \item[134] {\rm Sq(0,1)[136]} \item[135] {\rm Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[26/146] \mb{26/146} \begin{gl} \item[141] {\rm Sq(3)[133] + Sq(0,1)[133]} \end{gl} \end{bdl} \begin{bdl} \item[25/146] \mb{25/146} \begin{gl} \item[136] {\rm Sq(0,1)[132]} \item[137] {\rm Sq(1)[139] + Sq(1)[137]} \\ $h_{0}:$ [139], [137] \\ $h_{1}:$ [135] \\ $h_{2}:$ [131], [128] \\ $h_{3}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[24/146] \mb{24/146} \begin{gl} \item[137] {\rm Sq(3)[139] + Sq(0,1)[138]} \item[138] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{2}:$ [134] \\ $h_{3}:$ [128] \\ $h_{5}:$ [73], [71] \\ $h_{6}:$ [23] \item[139] {\rm Sq(1)[149] + Sq(1)[146]} \\ $h_{0}:$ [149], [146] \\ $h_{2}:$ [137] \\ $h_{3}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[23/146] \mb{23/146} \begin{gl} \item[146] {\rm Sq(1,1)[144] + Sq(1,1)[143]} \item[147] {\rm Sq(3)[149] + Sq(0,1)[149] + Sq(3)[148] + Sq(0,1)[148] + Sq(3)[146]} \\ $h_{5}:$ [75] \\ $h_{6}:$ [24] \item[148] {\rm Sq(1)[157] + Sq(1)[155] + Sq(1)[154]} \\ $h_{0}:$ [157], [155], [154] \\ $h_{3}:$ [132] \\ $h_{5}:$ [75] \\ $h_{6}:$ [24] \item[149] {\rm Sq(1)[158] + Sq(1)[156]} \\ $h_{0}:$ [158], [156] \\ $h_{2}:$ [143] \\ $h_{3}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[22/146] \mb{22/146} \begin{gl} \item[153] {\rm Sq(1,1)[150] + Sq(1,1)[149]} \item[154] {\rm Sq(0,1)[152]} \item[155] {\rm Sq(3)[152] + Sq(0,1)[151]} \item[156] {\rm Sq(3)[153] + Sq(0,1)[153] + Sq(3)[151] + Sq(0,1)[151]} \item[157] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{3}:$ [136] \item[158] {\rm Sq(1)[160]} \\ $h_{0}:$ [160] \\ $h_{3}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[21/146] \mb{21/146} \begin{gl} \item[158] {\rm Sq(0,1)[158] + Sq(3)[157]} \item[159] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \item[160] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[20/146] \mb{20/146} \begin{gl} \item[163] {\rm Sq(4)[163] + Sq(1,1)[163]} \\ $h_{2}:$ [163] \\ $h_{5}:$ [86] \item[164] {\rm Sq(1,1)[165] + Sq(1,1)[164]} \item[165] {\rm Sq(1)[170] + Sq(1)[169]} \\ $h_{0}:$ [170], [169] \end{gl} \end{bdl} \begin{bdl} \item[19/146] \mb{19/146} \begin{gl} \item[168] {\rm Sq(5)[162] + Sq(2,1)[162] + Sq(5)[160] + Sq(2,1)[160]} \item[169] {\rm Sq(1,1)[167] + Sq(4)[165] + Sq(1,1)[165]} \\ $h_{2}:$ [165] \item[170] {\rm Sq(3)[169] + Sq(3)[168]} \\ $h_{2}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[18/146] \mb{18/146} \begin{gl} \item[173] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{3}:$ [155] \item[174] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{1}:$ [174] \\ $h_{2}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[17/146] \mb{17/146} \begin{gl} \item[176] {\rm Sq(3)[175]} \\ $h_{3}:$ [160] \item[177] {\rm Sq(0,1)[177] + Sq(0,1)[176]} \\ $h_{5}:$ [93] \\ $h_{6}:$ [39] \item[178] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{2}:$ [173], [172] \end{gl} \end{bdl} \begin{bdl} \item[16/146] \mb{16/146} \begin{gl} \item[179] {\rm Sq(4)[175] + Sq(1,1)[175]} \\ $h_{2}:$ [175] \item[180] {\rm Sq(1,1)[177]} \end{gl} \end{bdl} \begin{bdl} \item[14/146] \mb{14/146} \begin{gl} \item[192] {\rm Sq(0,1)[194]} \item[193] {\rm Sq(3)[195]} \end{gl} \end{bdl} \begin{bdl} \item[13/146] \mb{13/146} \begin{gl} \item[201] {\rm Sq(3)[200]} \item[202] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{1}:$ [204] \\ $h_{2}:$ [197] \\ $h_{3}:$ [182] \\ $h_{4}:$ [151], [150], [148] \end{gl} \end{bdl} \begin{bdl} \item[12/146] \mb{12/146} \begin{gl} \item[207] {\rm Sq(1,1)[208]} \\ $h_{4}:$ [156], [155] \item[208] {\rm Sq(0,1)[210]} \\ $h_{4}:$ [155] \\ $h_{5}:$ [101] \\ $h_{6}:$ [52] \item[209] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{1}:$ [217] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[11/146] \mb{11/146} \begin{gl} \item[219] {\rm Sq(3)[217] + Sq(0,1)[217] + Sq(3)[215] + Sq(0,1)[215] + Sq(3)[214] + Sq(0,1)[214]} \\ $h_{4}:$ [161] \item[220] {\rm Sq(2)[218]} \\ $h_{1}:$ [218] \\ $h_{2}:$ [211] \\ $h_{3}:$ [192] \\ $h_{4}:$ [161] \\ $h_{6}:$ [55] \item[221] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[10/146] \mb{10/146} \begin{gl} \item[221] {\rm Sq(5)[194] + Sq(2,1)[194] + Sq(2,1)[193] + Sq(2,1)[192]} \item[222] {\rm Sq(3)[201]} \\ $h_{7}:$ [2] \item[223] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \\ $h_{2}:$ [197] \\ $h_{3}:$ [180] \\ $h_{4}:$ [155] \item[224] {\rm Sq(2)[206] + Sq(2)[203]} \\ $h_{1}:$ [206], [203] \\ $h_{3}:$ [179], [178] \\ $h_{4}:$ [155], [154] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[9/146] \mb{9/146} \begin{gl} \item[207] {\rm Sq(0,1)[176]} \\ $h_{2}:$ [172] \\ $h_{5}:$ [108] \item[208] {\rm Sq(1)[183] + Sq(1)[180]} \\ $h_{0}:$ [183], [180] \\ $h_{4}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[8/146] \mb{8/146} \begin{gl} \item[180] {\rm Sq(3,1)[144] + Sq(0,2)[143]} \\ $h_{3}:$ [137] \item[181] {\rm Sq(5)[148] + Sq(2,1)[148]} \item[182] {\rm Sq(4)[151]} \\ $h_{2}:$ [151] \\ $h_{4}:$ [120], [119] \item[183] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{3}:$ [137] \item[184] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{2}:$ [153], [150] \\ $h_{3}:$ [139], [137] \\ $h_{6}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[7/146] \mb{7/146} \begin{gl} \item[157] {\rm Sq(1,1)[128]} \item[158] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{2}:$ [128] \\ $h_{3}:$ [117] \\ $h_{6}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[6/146] \mb{6/146} \begin{gl} \item[135] {\rm Sq(3)[99] + Sq(0,1)[99] + Sq(3)[98] + Sq(0,1)[98]} \\ $h_{3}:$ [90] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[4/146] \mb{4/146} \begin{gl} \item[72] {\rm Sq(6)[46] + Sq(3,1)[46] + Sq(0,2)[46]} \\ $h_{7}:$ [9] \end{gl} \end{bdl} \dm{147} \begin{bdl} \item[75/147] \mb{75/147} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[74/147] \mb{74/147} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[73/147] \mb{73/147} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[65/147] \mb{65/147} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[64/147] \mb{64/147} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[63/147] \mb{63/147} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[60/147] \mb{60/147} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[57/147] \mb{57/147} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[56/147] \mb{56/147} \begin{gl} \item[24] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[55/147] \mb{55/147} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[54/147] \mb{54/147} \begin{gl} \item[24] {\rm Sq(0,1)[27]} \item[25] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[52/147] \mb{52/147} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [26], [25] \end{gl} \end{bdl} \begin{bdl} \item[51/147] \mb{51/147} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [29], [28] \end{gl} \end{bdl} \begin{bdl} \item[50/147] \mb{50/147} \begin{gl} \item[40] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{3}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[49/147] \mb{49/147} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [32] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[48/147] \mb{48/147} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[47/147] \mb{47/147} \begin{gl} \item[42] {\rm Sq(3)[46]} \end{gl} \end{bdl} \begin{bdl} \item[45/147] \mb{45/147} \begin{gl} \item[50] {\rm Sq(0,1)[48]} \item[51] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[44/147] \mb{44/147} \begin{gl} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[42/147] \mb{42/147} \begin{gl} \item[64] {\rm Sq(0,1)[65]} \item[65] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[41/147] \mb{41/147} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(3)[65] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[40/147] \mb{40/147} \begin{gl} \item[68] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[39/147] \mb{39/147} \begin{gl} \item[71] {\rm Sq(0,1)[72]} \item[72] {\rm Sq(0,1)[73]} \item[73] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[38/147] \mb{38/147} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(3)[78] + Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[37/147] \mb{37/147} \begin{gl} \item[82] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [77] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[36/147] \mb{36/147} \begin{gl} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(0,1)[88]} \item[88] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \item[89] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{3}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[35/147] \mb{35/147} \begin{gl} \item[94] {\rm Sq(0,1)[94] + Sq(3)[93] + Sq(0,1)[93] + Sq(3)[92] + Sq(0,1)[92]} \item[95] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[34/147] \mb{34/147} \begin{gl} \item[100] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[33/147] \mb{33/147} \begin{gl} \item[98] {\rm Sq(0,1)[96]} \item[99] {\rm Sq(0,1)[97]} \item[100] {\rm Sq(0,1)[98]} \item[101] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[32/147] \mb{32/147} \begin{gl} \item[99] {\rm Sq(1,1)[102]} \item[100] {\rm Sq(0,1)[103]} \item[101] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[30/147] \mb{30/147} \begin{gl} \item[114] {\rm Sq(0,1)[113]} \item[115] {\rm Sq(0,1)[115]} \item[116] {\rm Sq(3)[116] + Sq(0,1)[114] + Sq(3)[113]} \end{gl} \end{bdl} \begin{bdl} \item[29/147] \mb{29/147} \begin{gl} \item[117] {\rm Sq(0,1)[119]} \item[118] {\rm Sq(0,1)[120]} \item[119] {\rm Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[28/147] \mb{28/147} \begin{gl} \item[125] {\rm Sq(1,1)[133]} \end{gl} \end{bdl} \begin{bdl} \item[27/147] \mb{27/147} \begin{gl} \item[136] {\rm Sq(0,1)[139]} \item[137] {\rm Sq(0,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[26/147] \mb{26/147} \begin{gl} \item[142] {\rm Sq(0,1)[134]} \item[143] {\rm Sq(0,1)[135]} \end{gl} \end{bdl} \begin{bdl} \item[25/147] \mb{25/147} \begin{gl} \item[138] {\rm Sq(0,2)[127]} \item[139] {\rm Sq(1,1)[132]} \item[140] {\rm Sq(3)[136] + Sq(0,1)[136]} \end{gl} \end{bdl} \begin{bdl} \item[24/147] \mb{24/147} \begin{gl} \item[140] {\rm Sq(0,1)[144]} \item[141] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [147] \\ $h_{2}:$ [140], [138] \\ $h_{4}:$ [111], [110], [108] \\ $h_{5}:$ [74] \\ $h_{6}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[23/147] \mb{23/147} \begin{gl} \item[150] {\rm Sq(0,1)[150]} \item[151] {\rm Sq(1)[160] + Sq(1)[159]} \\ $h_{0}:$ [160], [159] \\ $h_{2}:$ [146] \\ $h_{5}:$ [78] \\ $h_{6}:$ [26] \item[152] {\rm Sq(1)[162] + Sq(1)[159]} \\ $h_{0}:$ [162], [159] \\ $h_{2}:$ [148], [147], [146] \\ $h_{3}:$ [136] \item[153] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{1}:$ [154] \\ $h_{2}:$ [147] \\ $h_{3}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[22/147] \mb{22/147} \begin{gl} \item[159] {\rm Sq(1,1)[153] + Sq(1,1)[152] + Sq(1,1)[151]} \item[160] {\rm Sq(3)[156] + Sq(3)[155]} \\ $h_{6}:$ [29] \item[161] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{2}:$ [154], [153], [152], [151] \\ $h_{3}:$ [139] \item[162] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [153], [152], [151] \\ $h_{3}:$ [139] \item[163] {\rm Sq(1)[166] + Sq(1)[165]} \\ $h_{0}:$ [166], [165] \\ $h_{2}:$ [152] \\ $h_{3}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[21/147] \mb{21/147} \begin{gl} \item[161] {\rm Sq(4)[157]} \\ $h_{2}:$ [157] \\ $h_{3}:$ [145] \item[162] {\rm Sq(0,1)[161] + Sq(0,1)[160]} \\ $h_{3}:$ [145] \item[163] {\rm Sq(3)[161] + Sq(3)[160]} \\ $h_{3}:$ [145] \item[164] {\rm Sq(0,1)[162]} \item[165] {\rm Sq(1)[168] + Sq(1)[166]} \\ $h_{0}:$ [168], [166] \\ $h_{1}:$ [164] \\ $h_{3}:$ [146], [145] \item[166] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{1}:$ [164] \\ $h_{3}:$ [146] \end{gl} \end{bdl} \begin{bdl} \item[20/147] \mb{20/147} \begin{gl} \item[166] {\rm Sq(2,1)[164]} \item[167] {\rm Sq(3)[166] + Sq(0,1)[166]} \item[168] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{3}:$ [154], [153] \item[169] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{3}:$ [154], [153] \end{gl} \end{bdl} \begin{bdl} \item[19/147] \mb{19/147} \begin{gl} \item[171] {\rm Sq(0,1)[171]} \\ $h_{3}:$ [153] \\ $h_{5}:$ [91] \\ $h_{6}:$ [42] \item[172] {\rm Sq(3)[172] + Sq(0,1)[172]} \\ $h_{3}:$ [153] \item[173] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{3}:$ [153] \end{gl} \end{bdl} \begin{bdl} \item[18/147] \mb{18/147} \begin{gl} \item[175] {\rm Sq(3)[174] + Sq(0,1)[174]} \\ $h_{2}:$ [171] \item[176] {\rm Sq(1)[181] + Sq(1)[179]} \\ $h_{0}:$ [181], [179] \item[177] {\rm Sq(1)[182] + Sq(1)[179]} \\ $h_{0}:$ [182], [179] \\ $h_{1}:$ [176] \\ $h_{2}:$ [172], [171] \\ $h_{3}:$ [158] \\ $h_{5}:$ [97] \item[178] {\rm Sq(1)[183] + Sq(1)[180] + Sq(1)[179]} \\ $h_{0}:$ [183], [180], [179] \\ $h_{2}:$ [172] \\ $h_{3}:$ [159], [157] \\ $h_{5}:$ [98], [95] \\ $h_{6}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[17/147] \mb{17/147} \begin{gl} \item[179] {\rm Sq(3,1)[170] + Sq(0,2)[170]} \item[180] {\rm Sq(5)[173] + Sq(5)[172]} \item[181] {\rm Sq(1,1)[177] + Sq(1,1)[176] + Sq(1,1)[175]} \item[182] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{2}:$ [175] \\ $h_{5}:$ [96] \item[183] {\rm Sq(1)[184] + Sq(1)[181]} \\ $h_{0}:$ [184], [181] \\ $h_{2}:$ [175] \\ $h_{3}:$ [163] \\ $h_{5}:$ [98] \\ $h_{6}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[16/147] \mb{16/147} \begin{gl} \item[181] {\rm Sq(3)[179] + Sq(0,1)[179]} \item[182] {\rm Sq(0,1)[180]} \\ $h_{5}:$ [94] \\ $h_{6}:$ [42] \item[183] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \item[184] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{5}:$ [97] \\ $h_{6}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[15/147] \mb{15/147} \begin{gl} \item[181] {\rm Sq(5)[186] + Sq(2,1)[186] + Sq(5)[185] + Sq(2,1)[185] + Sq(2,1)[184]} \item[182] {\rm Sq(5)[187] + Sq(2,1)[187] + Sq(2,1)[185]} \item[183] {\rm Sq(1,1)[190] + Sq(1,1)[188]} \end{gl} \end{bdl} \begin{bdl} \item[14/147] \mb{14/147} \begin{gl} \item[194] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{3}:$ [184], [182] \\ $h_{4}:$ [153] \end{gl} \end{bdl} \begin{bdl} \item[13/147] \mb{13/147} \begin{gl} \item[203] {\rm Sq(2)[207]} \\ $h_{1}:$ [207] \\ $h_{3}:$ [186] \\ $h_{4}:$ [155], [154] \item[204] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{3}:$ [186] \\ $h_{4}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[12/147] \mb{12/147} \begin{gl} \item[210] {\rm Sq(3)[217] + Sq(3)[215] + Sq(0,1)[215] + Sq(0,1)[214]} \item[211] {\rm Sq(2)[219]} \\ $h_{1}:$ [219] \\ $h_{2}:$ [211], [210] \\ $h_{3}:$ [194] \\ $h_{4}:$ [162], [161] \item[212] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{4}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[11/147] \mb{11/147} \begin{gl} \item[222] {\rm Sq(1,1)[217] + Sq(1,1)[215] + Sq(1,1)[214]} \end{gl} \end{bdl} \begin{bdl} \item[10/147] \mb{10/147} \begin{gl} \item[225] {\rm Sq(3)[206] + Sq(3)[203]} \\ $h_{4}:$ [159] \item[226] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{2}:$ [202] \\ $h_{3}:$ [183] \\ $h_{4}:$ [161], [159] \end{gl} \end{bdl} \begin{bdl} \item[9/147] \mb{9/147} \begin{gl} \item[209] {\rm Sq(2)[180]} \\ $h_{1}:$ [180] \\ $h_{2}:$ [177], [176] \\ $h_{3}:$ [162] \\ $h_{4}:$ [140], [139] \item[210] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{2}:$ [176] \\ $h_{4}:$ [143], [141] \end{gl} \end{bdl} \begin{bdl} \item[8/147] \mb{8/147} \begin{gl} \item[185] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{4}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[7/147] \mb{7/147} \begin{gl} \item[159] {\rm Sq(5)[129] + Sq(5)[128]} \\ $h_{4}:$ [107] \item[160] {\rm Sq(4)[130] + Sq(1,1)[130]} \\ $h_{2}:$ [130] \\ $h_{4}:$ [108] \item[161] {\rm Sq(1,1)[132]} \item[162] {\rm Sq(2)[135]} \\ $h_{1}:$ [135] \\ $h_{2}:$ [131] \\ $h_{3}:$ [120] \\ $h_{6}:$ [66] \item[163] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{2}:$ [132], [131] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[6/147] \mb{6/147} \begin{gl} \item[136] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [98] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[5/147] \mb{5/147} \begin{gl} \item[103] {\rm Sq(7)[66] + Sq(4,1)[66] + Sq(1,2)[66] + Sq(0,0,1)[66]} \\ $h_{7}:$ [8] \item[104] {\rm Sq(4)[69]} \\ $h_{2}:$ [69] \\ $h_{3}:$ [65] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \dm{148} \begin{bdl} \item[70/148] \mb{70/148} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[69/148] \mb{69/148} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[68/148] \mb{68/148} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[62/148] \mb{62/148} \begin{gl} \item[14] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[59/148] \mb{59/148} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[56/148] \mb{56/148} \begin{gl} \item[25] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[55/148] \mb{55/148} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[54/148] \mb{54/148} \begin{gl} \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[53/148] \mb{53/148} \begin{gl} \item[29] {\rm Sq(1,1)[30]} \item[30] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[52/148] \mb{52/148} \begin{gl} \item[33] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [33] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[51/148] \mb{51/148} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [20] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[50/148] \mb{50/148} \begin{gl} \item[41] {\rm Sq(3)[39]} \item[42] {\rm Sq(0,1)[40] + Sq(0,1)[39]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[49/148] \mb{49/148} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[48/148] \mb{48/148} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[47/148] \mb{47/148} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(3)[47]} \item[45] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[46/148] \mb{46/148} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[44/148] \mb{44/148} \begin{gl} \item[51] {\rm Sq(0,1)[55]} \item[52] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[43/148] \mb{43/148} \begin{gl} \item[57] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[42/148] \mb{42/148} \begin{gl} \item[66] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[41/148] \mb{41/148} \begin{gl} \item[69] {\rm Sq(0,1)[66]} \item[70] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[40/148] \mb{40/148} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[39/148] \mb{39/148} \begin{gl} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [77] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[38/148] \mb{38/148} \begin{gl} \item[78] {\rm Sq(1,1)[77] + Sq(1,1)[76]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[37/148] \mb{37/148} \begin{gl} \item[83] {\rm Sq(0,1)[83]} \item[84] {\rm Sq(1)[91] + Sq(1)[90]} \\ $h_{0}:$ [91], [90] \\ $h_{1}:$ [85] \\ $h_{2}:$ [80] \\ $h_{3}:$ [71], [70] \\ $h_{4}:$ [53] \item[85] {\rm Sq(1)[92] + Sq(1)[90]} \\ $h_{0}:$ [92], [90] \\ $h_{1}:$ [88], [87], [86] \\ $h_{2}:$ [81] \\ $h_{3}:$ [72], [68] \end{gl} \end{bdl} \begin{bdl} \item[36/148] \mb{36/148} \begin{gl} \item[90] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [90] \\ $h_{4}:$ [60] \item[91] {\rm Sq(1)[100] + Sq(1)[98]} \\ $h_{0}:$ [100], [98] \\ $h_{2}:$ [90], [86] \\ $h_{3}:$ [76] \item[92] {\rm Sq(1)[101] + Sq(1)[98]} \\ $h_{0}:$ [101], [98] \\ $h_{2}:$ [90], [89] \\ $h_{3}:$ [77] \\ $h_{4}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[35/148] \mb{35/148} \begin{gl} \item[96] {\rm Sq(0,1)[96]} \item[97] {\rm Sq(0,1)[97]} \item[98] {\rm Sq(3)[98] + Sq(0,1)[98] + Sq(0,1)[95]} \item[99] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [93] \\ $h_{4}:$ [67] \item[100] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [93] \\ $h_{3}:$ [82] \item[101] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [93], [92] \\ $h_{3}:$ [83] \\ $h_{4}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[34/148] \mb{34/148} \begin{gl} \item[101] {\rm Sq(0,1)[95]} \item[102] {\rm Sq(0,1)[96]} \item[103] {\rm Sq(0,1)[97]} \item[104] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{3}:$ [84] \item[105] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[33/148] \mb{33/148} \begin{gl} \item[102] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \item[103] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \end{gl} \end{bdl} \begin{bdl} \item[32/148] \mb{32/148} \begin{gl} \item[102] {\rm Sq(0,1)[105]} \item[103] {\rm Sq(0,1)[106]} \item[104] {\rm Sq(0,1)[107]} \item[105] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \item[106] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[31/148] \mb{31/148} \begin{gl} \item[108] {\rm Sq(0,1)[110]} \item[109] {\rm Sq(0,1)[111]} \item[110] {\rm Sq(0,1)[112]} \item[111] {\rm Sq(3)[112]} \item[112] {\rm Sq(3)[113]} \end{gl} \end{bdl} \begin{bdl} \item[29/148] \mb{29/148} \begin{gl} \item[120] {\rm Sq(0,1)[123]} \item[121] {\rm Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[28/148] \mb{28/148} \begin{gl} \item[126] {\rm Sq(2,1)[131]} \item[127] {\rm Sq(0,1)[134]} \item[128] {\rm Sq(0,1)[135]} \end{gl} \end{bdl} \begin{bdl} \item[27/148] \mb{27/148} \begin{gl} \item[138] {\rm Sq(0,1)[141]} \end{gl} \end{bdl} \begin{bdl} \item[26/148] \mb{26/148} \begin{gl} \item[144] {\rm Sq(0,1)[136]} \item[145] {\rm Sq(2)[140]} \\ $h_{1}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[25/148] \mb{25/148} \begin{gl} \item[141] {\rm Sq(3,1)[131] + Sq(3,1)[130] + Sq(3,1)[128] + Sq(0,2)[128]} \item[142] {\rm Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[24/148] \mb{24/148} \begin{gl} \item[142] {\rm Sq(0,1)[146]} \item[143] {\rm Sq(3)[147]} \end{gl} \end{bdl} \begin{bdl} \item[23/148] \mb{23/148} \begin{gl} \item[154] {\rm Sq(0,1)[154] + Sq(0,1)[153]} \item[155] {\rm Sq(3)[158] + Sq(0,1)[158] + Sq(3)[156] + Sq(0,1)[156] + Sq(0,1)[153]} \end{gl} \end{bdl} \begin{bdl} \item[22/148] \mb{22/148} \begin{gl} \item[164] {\rm Sq(0,1)[158]} \item[165] {\rm Sq(1)[169] + Sq(1)[167]} \\ $h_{0}:$ [169], [167] \\ $h_{1}:$ [162] \\ $h_{2}:$ [157] \\ $h_{3}:$ [144], [143], [141] \end{gl} \end{bdl} \begin{bdl} \item[21/148] \mb{21/148} \begin{gl} \item[167] {\rm Sq(5)[159] + Sq(2,1)[159] + Sq(2,1)[158] + Sq(2,1)[157]} \item[168] {\rm Sq(2)[167]} \\ $h_{1}:$ [167] \\ $h_{3}:$ [148] \item[169] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{2}:$ [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[20/148] \mb{20/148} \begin{gl} \item[170] {\rm Sq(1,1)[167] + Sq(1,1)[166]} \item[171] {\rm Sq(0,1)[168]} \item[172] {\rm Sq(2)[172]} \\ $h_{1}:$ [172] \\ $h_{3}:$ [157], [156] \end{gl} \end{bdl} \begin{bdl} \item[19/148] \mb{19/148} \begin{gl} \item[174] {\rm Sq(3,1)[167] + Sq(0,2)[165] + Sq(0,2)[164]} \item[175] {\rm Sq(3)[173] + Sq(0,1)[173]} \\ $h_{3}:$ [157], [156] \item[176] {\rm Sq(1)[183] + Sq(1)[179]} \\ $h_{0}:$ [183], [179] \\ $h_{2}:$ [172] \\ $h_{4}:$ [138] \\ $h_{5}:$ [96] \\ $h_{6}:$ [44] \item[177] {\rm Sq(1)[184] + Sq(1)[179]} \\ $h_{0}:$ [184], [179] \\ $h_{2}:$ [172], [171] \\ $h_{3}:$ [159], [156] \\ $h_{5}:$ [96], [95] \end{gl} \end{bdl} \begin{bdl} \item[18/148] \mb{18/148} \begin{gl} \item[179] {\rm Sq(3)[178] + Sq(0,1)[178]} \item[180] {\rm Sq(2)[179]} \\ $h_{1}:$ [179] \item[181] {\rm Sq(2)[180]} \\ $h_{1}:$ [180] \\ $h_{5}:$ [99] \\ $h_{6}:$ [46] \item[182] {\rm Sq(2)[181]} \\ $h_{1}:$ [181] \\ $h_{5}:$ [99] \\ $h_{6}:$ [46] \item[183] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{2}:$ [174] \\ $h_{4}:$ [143] \\ $h_{6}:$ [46] \item[184] {\rm Sq(1)[187] + Sq(1)[184]} \\ $h_{0}:$ [187], [184] \\ $h_{2}:$ [174] \\ $h_{3}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[17/148] \mb{17/148} \begin{gl} \item[184] {\rm Sq(3)[179] + Sq(0,1)[179]} \\ $h_{3}:$ [166] \item[185] {\rm Sq(0,1)[180]} \item[186] {\rm Sq(3)[180]} \item[187] {\rm Sq(1)[188] + Sq(1)[187] + Sq(1)[186]} \\ $h_{0}:$ [188], [187], [186] \\ $h_{3}:$ [168], [166] \end{gl} \end{bdl} \begin{bdl} \item[16/148] \mb{16/148} \begin{gl} \item[185] {\rm Sq(2)[181]} \\ $h_{1}:$ [181] \item[186] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \item[187] {\rm Sq(1)[186] + Sq(1)[184]} \\ $h_{0}:$ [186], [184] \\ $h_{2}:$ [179] \item[188] {\rm Sq(1)[187] + Sq(1)[184]} \\ $h_{0}:$ [187], [184] \\ $h_{2}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[15/148] \mb{15/148} \begin{gl} \item[184] {\rm Sq(0,2)[184]} \item[185] {\rm Sq(3,1)[186] + Sq(3,1)[185]} \item[186] {\rm Sq(3,1)[187] + Sq(3,1)[185] + Sq(6)[184]} \item[187] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \item[188] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{3}:$ [180] \\ $h_{5}:$ [100] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[14/148] \mb{14/148} \begin{gl} \item[195] {\rm Sq(0,1)[201]} \item[196] {\rm Sq(3)[201]} \item[197] {\rm Sq(1)[206] + Sq(1)[205]} \\ $h_{0}:$ [206], [205] \\ $h_{3}:$ [187], [186] \\ $h_{6}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[13/148] \mb{13/148} \begin{gl} \item[205] {\rm Sq(3,1)[198]} \item[206] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \item[207] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{4}:$ [161], [159] \\ $h_{5}:$ [98] \end{gl} \end{bdl} \begin{bdl} \item[12/148] \mb{12/148} \begin{gl} \item[213] {\rm Sq(1,1)[215]} \item[214] {\rm Sq(2)[222]} \\ $h_{1}:$ [222] \\ $h_{2}:$ [215] \\ $h_{4}:$ [167] \item[215] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{2}:$ [215] \\ $h_{5}:$ [104] \item[216] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{4}:$ [169], [167] \\ $h_{5}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[11/148] \mb{11/148} \begin{gl} \item[223] {\rm Sq(3)[221]} \\ $h_{5}:$ [113] \item[224] {\rm Sq(3)[224] + Sq(0,1)[222]} \\ $h_{4}:$ [169] \\ $h_{5}:$ [113] \item[225] {\rm Sq(2)[225]} \\ $h_{1}:$ [225] \\ $h_{3}:$ [203], [202] \\ $h_{4}:$ [170] \item[226] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{5}:$ [114] \\ $h_{6}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[10/148] \mb{10/148} \begin{gl} \item[227] {\rm Sq(3,1)[200] + Sq(3,1)[197]} \\ $h_{6}:$ [63] \item[228] {\rm Sq(3)[208] + Sq(0,1)[208]} \end{gl} \end{bdl} \begin{bdl} \item[9/148] \mb{9/148} \begin{gl} \item[211] {\rm Sq(3)[183] + Sq(0,1)[183] + Sq(3)[182] + Sq(0,1)[182] + Sq(3)[181] + Sq(0,1)[181] + Sq(3)[180] + Sq(0,1)[180]} \\ $h_{4}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[8/148] \mb{8/148} \begin{gl} \item[186] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \\ $h_{4}:$ [126], [124] \item[187] {\rm Sq(2)[161]} \\ $h_{1}:$ [161] \\ $h_{4}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[6/148] \mb{6/148} \begin{gl} \item[137] {\rm Sq(5,1)[95] + Sq(2,2)[95] + Sq(5,1)[94] + Sq(2,2)[94]} \item[138] {\rm Sq(4)[101] + Sq(1,1)[101] + Sq(4)[100] + Sq(1,1)[100]} \\ $h_{2}:$ [101], [100] \\ $h_{3}:$ [93] \\ $h_{6}:$ [58] \item[139] {\rm Sq(2)[103]} \\ $h_{1}:$ [103] \\ $h_{2}:$ [100] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[4/148] \mb{4/148} \begin{gl} \item[73] {\rm Sq(4)[49]} \\ $h_{2}:$ [49] \\ $h_{3}:$ [46] \\ $h_{4}:$ [43] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \dm{149} \begin{bdl} \item[69/149] \mb{69/149} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[68/149] \mb{68/149} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[67/149] \mb{67/149} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[66/149] \mb{66/149} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[65/149] \mb{65/149} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[64/149] \mb{64/149} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[63/149] \mb{63/149} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[62/149] \mb{62/149} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[61/149] \mb{61/149} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \item[18] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[60/149] \mb{60/149} \begin{gl} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[59/149] \mb{59/149} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[58/149] \mb{58/149} \begin{gl} \item[18] {\rm Sq(3,1)[22]} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[55/149] \mb{55/149} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[53/149] \mb{53/149} \begin{gl} \item[31] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[52/149] \mb{52/149} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[51/149] \mb{51/149} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[50/149] \mb{50/149} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [39] \\ $h_{4}:$ [26] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[49/149] \mb{49/149} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[48/149] \mb{48/149} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[47/149] \mb{47/149} \begin{gl} \item[46] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[46/149] \mb{46/149} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[45/149] \mb{45/149} \begin{gl} \item[52] {\rm Sq(0,1)[50]} \item[53] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[44/149] \mb{44/149} \begin{gl} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[43/149] \mb{43/149} \begin{gl} \item[58] {\rm Sq(0,1)[64]} \item[59] {\rm Sq(0,1)[65]} \item[60] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[42/149] \mb{42/149} \begin{gl} \item[67] {\rm Sq(3,1)[64]} \item[68] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[41/149] \mb{41/149} \begin{gl} \item[71] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[40/149] \mb{40/149} \begin{gl} \item[70] {\rm Sq(1,1)[70] + Sq(1,1)[69]} \item[71] {\rm Sq(0,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[39/149] \mb{39/149} \begin{gl} \item[75] {\rm Sq(0,1)[77] + Sq(0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[37/149] \mb{37/149} \begin{gl} \item[86] {\rm Sq(0,1)[85]} \item[87] {\rm Sq(0,1)[87]} \item[88] {\rm Sq(3)[89] + Sq(0,1)[89] + Sq(3)[88] + Sq(3)[87] + Sq(3)[86] + Sq(0,1)[86]} \end{gl} \end{bdl} \begin{bdl} \item[36/149] \mb{36/149} \begin{gl} \item[93] {\rm Sq(0,1)[94]} \end{gl} \end{bdl} \begin{bdl} \item[35/149] \mb{35/149} \begin{gl} \item[102] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [101] \\ $h_{2}:$ [98] \item[103] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{1}:$ [103], [101] \\ $h_{2}:$ [99], [98] \\ $h_{3}:$ [87], [84] \end{gl} \end{bdl} \begin{bdl} \item[34/149] \mb{34/149} \begin{gl} \item[106] {\rm Sq(0,1)[98]} \item[107] {\rm Sq(0,1)[99]} \item[108] {\rm Sq(0,1)[100]} \item[109] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [95] \item[110] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{2}:$ [97], [95] \\ $h_{3}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[33/149] \mb{33/149} \begin{gl} \item[104] {\rm Sq(0,1)[99]} \item[105] {\rm Sq(0,1)[100]} \item[106] {\rm Sq(0,1)[101]} \item[107] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{3}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[32/149] \mb{32/149} \begin{gl} \item[107] {\rm Sq(2)[111] + Sq(2)[110]} \\ $h_{1}:$ [111], [110] \item[108] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{3}:$ [97], [95] \end{gl} \end{bdl} \begin{bdl} \item[31/149] \mb{31/149} \begin{gl} \item[113] {\rm Sq(0,1)[114]} \item[114] {\rm Sq(0,1)[115]} \item[115] {\rm Sq(0,1)[116]} \item[116] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[30/149] \mb{30/149} \begin{gl} \item[117] {\rm Sq(0,1)[117]} \item[118] {\rm Sq(0,1)[118]} \item[119] {\rm Sq(0,1)[119]} \item[120] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[29/149] \mb{29/149} \begin{gl} \item[122] {\rm Sq(0,1)[125]} \item[123] {\rm Sq(3)[125]} \end{gl} \end{bdl} \begin{bdl} \item[28/149] \mb{28/149} \begin{gl} \item[129] {\rm Sq(0,1)[136]} \item[130] {\rm Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[27/149] \mb{27/149} \begin{gl} \item[139] {\rm Sq(3,1)[138] + Sq(3,1)[137] + Sq(3,1)[136] + Sq(3,1)[135] + Sq(0,2)[135]} \item[140] {\rm Sq(0,1)[142]} \item[141] {\rm Sq(0,1)[143]} \item[142] {\rm Sq(1)[147] + Sq(1)[146]} \\ $h_{0}:$ [147], [146] \\ $h_{1}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[26/149] \mb{26/149} \begin{gl} \item[146] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{6}:$ [24] \item[147] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{6}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[25/149] \mb{25/149} \begin{gl} \item[143] {\rm Sq(3,1)[134]} \item[144] {\rm Sq(0,1)[140]} \item[145] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[24/149] \mb{24/149} \begin{gl} \item[144] {\rm Sq(1,1)[148] + Sq(1,1)[147]} \item[145] {\rm Sq(0,1)[150]} \item[146] {\rm Sq(2)[155] + Sq(2)[154]} \\ $h_{1}:$ [155], [154] \end{gl} \end{bdl} \begin{bdl} \item[23/149] \mb{23/149} \begin{gl} \item[156] {\rm Sq(3)[162] + Sq(0,1)[162] + Sq(3)[161] + Sq(0,1)[161] + Sq(3)[160] + Sq(3)[159]} \\ $h_{5}:$ [81] \\ $h_{6}:$ [27] \item[157] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[161] + Sq(0,1)[161] + Sq(0,1)[160] + Sq(3)[159]} \\ $h_{2}:$ [156] \\ $h_{5}:$ [81] \\ $h_{6}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[22/149] \mb{22/149} \begin{gl} \item[166] {\rm Sq(1,1)[160] + Sq(1,1)[159] + Sq(1,1)[158]} \item[167] {\rm Sq(0,1)[164] + Sq(0,1)[163] + Sq(0,1)[162]} \end{gl} \end{bdl} \begin{bdl} \item[21/149] \mb{21/149} \begin{gl} \item[170] {\rm Sq(0,1)[166]} \item[171] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{1}:$ [172], [171], [170] \\ $h_{2}:$ [164], [163] \\ $h_{3}:$ [155], [153] \\ $h_{4}:$ [128] \\ $h_{5}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[20/149] \mb{20/149} \begin{gl} \item[173] {\rm Sq(2)[175] + Sq(2)[174]} \\ $h_{1}:$ [175], [174] \\ $h_{2}:$ [169] \\ $h_{3}:$ [160] \\ $h_{4}:$ [136] \\ $h_{5}:$ [96] \item[174] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[19/149] \mb{19/149} \begin{gl} \item[178] {\rm Sq(0,2)[168]} \item[179] {\rm Sq(3)[176] + Sq(0,1)[176]} \item[180] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{1}:$ [182], [181], [180], [179] \item[181] {\rm Sq(1)[187] + Sq(1)[186]} \\ $h_{0}:$ [187], [186] \\ $h_{1}:$ [182], [181] \\ $h_{3}:$ [163], [162], [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[18/149] \mb{18/149} \begin{gl} \item[185] {\rm Sq(0,1)[180]} \item[186] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{1}:$ [186] \\ $h_{2}:$ [178] \\ $h_{3}:$ [165], [162] \\ $h_{4}:$ [144] \item[187] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{1}:$ [186] \\ $h_{2}:$ [178] \\ $h_{4}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[17/149] \mb{17/149} \begin{gl} \item[188] {\rm Sq(0,1)[181]} \item[189] {\rm Sq(0,1)[182]} \\ $h_{5}:$ [104] \\ $h_{6}:$ [46], [45] \item[190] {\rm Sq(3)[183] + Sq(0,1)[183]} \\ $h_{3}:$ [170] \item[191] {\rm Sq(2)[185]} \\ $h_{1}:$ [185] \\ $h_{2}:$ [179] \item[192] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [180] \\ $h_{3}:$ [170] \item[193] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[16/149] \mb{16/149} \begin{gl} \item[189] {\rm Sq(3)[181] + Sq(0,1)[181]} \item[190] {\rm Sq(0,1)[183]} \item[191] {\rm Sq(3)[183]} \end{gl} \end{bdl} \begin{bdl} \item[15/149] \mb{15/149} \begin{gl} \item[189] {\rm Sq(3)[194] + Sq(0,1)[194]} \item[190] {\rm Sq(2)[196] + Sq(2)[195]} \\ $h_{1}:$ [196], [195] \\ $h_{5}:$ [105] \end{gl} \end{bdl} \begin{bdl} \item[14/149] \mb{14/149} \begin{gl} \item[198] {\rm Sq(3,1)[197] + Sq(3,1)[196] + Sq(3,1)[195] + Sq(3,1)[194]} \item[199] {\rm Sq(1,1)[201]} \item[200] {\rm Sq(3)[203]} \item[201] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \\ $h_{4}:$ [159] \item[202] {\rm Sq(1)[210] + Sq(1)[208]} \\ $h_{0}:$ [210], [208] \\ $h_{5}:$ [105], [104] \end{gl} \end{bdl} \begin{bdl} \item[13/149] \mb{13/149} \begin{gl} \item[208] {\rm Sq(3)[212] + Sq(0,1)[212] + Sq(0,1)[210]} \item[209] {\rm Sq(2)[213]} \\ $h_{1}:$ [213] \\ $h_{3}:$ [194] \\ $h_{5}:$ [100] \\ $h_{6}:$ [48] \item[210] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{5}:$ [102], [100] \end{gl} \end{bdl} \begin{bdl} \item[12/149] \mb{12/149} \begin{gl} \item[217] {\rm Sq(1,1)[221]} \\ $h_{5}:$ [106] \\ $h_{6}:$ [55] \item[218] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{5}:$ [108] \item[219] {\rm Sq(1)[232] + Sq(1)[227]} \\ $h_{0}:$ [232], [227] \\ $h_{1}:$ [225], [224], [223] \\ $h_{2}:$ [219] \\ $h_{3}:$ [205], [204] \\ $h_{4}:$ [172], [170] \\ $h_{5}:$ [108], [107] \\ $h_{6}:$ [56], [55] \end{gl} \end{bdl} \begin{bdl} \item[11/149] \mb{11/149} \begin{gl} \item[227] {\rm Sq(0,1)[225]} \\ $h_{5}:$ [116] \item[228] {\rm Sq(2)[227]} \\ $h_{1}:$ [227] \\ $h_{3}:$ [207] \\ $h_{4}:$ [174] \\ $h_{5}:$ [115] \\ $h_{6}:$ [58] \item[229] {\rm Sq(2)[228]} \\ $h_{1}:$ [228] \\ $h_{5}:$ [116] \item[230] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{5}:$ [117] \item[231] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{2}:$ [222] \\ $h_{7}:$ [3] \item[232] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \\ $h_{3}:$ [207] \\ $h_{4}:$ [174] \\ $h_{5}:$ [117], [116], [115] \\ $h_{6}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[10/149] \mb{10/149} \begin{gl} \item[229] {\rm Sq(1,1)[208] + Sq(1,1)[207]} \\ $h_{5}:$ [116] \item[230] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{7}:$ [3] \item[231] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \\ $h_{5}:$ [116] \\ $h_{6}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[9/149] \mb{9/149} \begin{gl} \item[212] {\rm Sq(3,1)[178]} \\ $h_{7}:$ [3] \item[213] {\rm Sq(1,1)[184]} \\ $h_{6}:$ [71] \item[214] {\rm Sq(3)[185] + Sq(0,1)[185]} \item[215] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{1}:$ [187], [186] \\ $h_{2}:$ [183], [181], [180] \\ $h_{3}:$ [169], [166] \\ $h_{4}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[8/149] \mb{8/149} \begin{gl} \item[188] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{2}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[7/149] \mb{7/149} \begin{gl} \item[164] {\rm Sq(3,1)[133] + Sq(3,1)[132] + Sq(3,1)[131] + Sq(3,1)[130]} \item[165] {\rm Sq(2)[137]} \\ $h_{1}:$ [137] \\ $h_{4}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[6/149] \mb{6/149} \begin{gl} \item[140] {\rm Sq(3)[104] + Sq(0,1)[104] + Sq(3)[103] + Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[5/149] \mb{5/149} \begin{gl} \item[105] {\rm Sq(4)[72] + Sq(1,1)[72]} \\ $h_{2}:$ [72] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \dm{150} \begin{bdl} \item[74/150] \mb{74/150} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[73/150] \mb{73/150} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[72/150] \mb{72/150} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[65/150] \mb{65/150} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \\ $h_{3}:$ [11], [10] \end{gl} \end{bdl} \begin{bdl} \item[64/150] \mb{64/150} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \\ $h_{3}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[63/150] \mb{63/150} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[62/150] \mb{62/150} \begin{gl} \item[16] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[61/150] \mb{61/150} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[60/150] \mb{60/150} \begin{gl} \item[17] {\rm Sq(0,1)[14]} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[59/150] \mb{59/150} \begin{gl} \item[16] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[58/150] \mb{58/150} \begin{gl} \item[20] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[57/150] \mb{57/150} \begin{gl} \item[24] {\rm Sq(1,1)[24]} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[56/150] \mb{56/150} \begin{gl} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[55/150] \mb{55/150} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[54/150] \mb{54/150} \begin{gl} \item[27] {\rm Sq(0,1)[29]} \item[28] {\rm Sq(0,1)[30]} \item[29] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[51/150] \mb{51/150} \begin{gl} \item[40] {\rm Sq(0,1)[42] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[49/150] \mb{49/150} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44], [43] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[48/150] \mb{48/150} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[47/150] \mb{47/150} \begin{gl} \item[47] {\rm Sq(0,1)[49]} \item[48] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[46/150] \mb{46/150} \begin{gl} \item[53] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[45/150] \mb{45/150} \begin{gl} \item[54] {\rm Sq(0,1)[51]} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[44/150] \mb{44/150} \begin{gl} \item[54] {\rm Sq(0,1)[57]} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[43/150] \mb{43/150} \begin{gl} \item[61] {\rm Sq(3)[66]} \item[62] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[42/150] \mb{42/150} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[41/150] \mb{41/150} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[40/150] \mb{40/150} \begin{gl} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[39/150] \mb{39/150} \begin{gl} \item[76] {\rm Sq(0,1)[78]} \item[77] {\rm Sq(0,1)[79]} \item[78] {\rm Sq(0,1)[80]} \item[79] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[38/150] \mb{38/150} \begin{gl} \item[81] {\rm Sq(1,1)[82]} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(2)[86]} \\ $h_{1}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[36/150] \mb{36/150} \begin{gl} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(0,1)[97]} \item[96] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[35/150] \mb{35/150} \begin{gl} \item[104] {\rm Sq(0,1)[102] + Sq(0,1)[101]} \item[105] {\rm Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[33/150] \mb{33/150} \begin{gl} \item[108] {\rm Sq(0,1)[102]} \item[109] {\rm Sq(0,1)[103]} \item[110] {\rm Sq(0,1)[104]} \item[111] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [107] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[32/150] \mb{32/150} \begin{gl} \item[109] {\rm Sq(0,1)[108]} \item[110] {\rm Sq(0,1)[109]} \item[111] {\rm Sq(0,1)[110]} \end{gl} \end{bdl} \begin{bdl} \item[30/150] \mb{30/150} \begin{gl} \item[121] {\rm Sq(1,1)[118] + Sq(1,1)[117]} \item[122] {\rm Sq(0,1)[120]} \item[123] {\rm Sq(0,1)[121]} \item[124] {\rm Sq(2)[123] + Sq(2)[122]} \\ $h_{1}:$ [123], [122] \end{gl} \end{bdl} \begin{bdl} \item[29/150] \mb{29/150} \begin{gl} \item[124] {\rm Sq(0,1)[126]} \item[125] {\rm Sq(0,1)[127]} \item[126] {\rm Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[28/150] \mb{28/150} \begin{gl} \item[131] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[27/150] \mb{27/150} \begin{gl} \item[143] {\rm Sq(0,1)[144]} \item[144] {\rm Sq(3)[145]} \end{gl} \end{bdl} \begin{bdl} \item[26/150] \mb{26/150} \begin{gl} \item[148] {\rm Sq(0,1)[141]} \item[149] {\rm Sq(0,1)[142]} \item[150] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{1}:$ [143] \item[151] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{3}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[25/150] \mb{25/150} \begin{gl} \item[146] {\rm Sq(2)[144]} \\ $h_{1}:$ [144] \item[147] {\rm Sq(1)[149] + Sq(1)[148] + Sq(1)[147]} \\ $h_{0}:$ [149], [148], [147] \\ $h_{1}:$ [146], [145] \item[148] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \item[149] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{3}:$ [131], [128] \end{gl} \end{bdl} \begin{bdl} \item[24/150] \mb{24/150} \begin{gl} \item[147] {\rm Sq(1,1)[150]} \item[148] {\rm Sq(0,1)[154]} \item[149] {\rm Sq(0,1)[155]} \item[150] {\rm Sq(3)[155] + Sq(3)[154]} \item[151] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{1}:$ [156] \\ $h_{2}:$ [151] \\ $h_{4}:$ [115] \\ $h_{5}:$ [80] \\ $h_{6}:$ [27] \item[152] {\rm Sq(1)[160]} \\ $h_{0}:$ [160] \\ $h_{3}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[23/150] \mb{23/150} \begin{gl} \item[158] {\rm Sq(0,1)[164]} \item[159] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{2}:$ [160], [159] \\ $h_{5}:$ [85] \\ $h_{6}:$ [30] \item[160] {\rm Sq(1)[171] + Sq(1)[170]} \\ $h_{0}:$ [171], [170] \\ $h_{3}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[22/150] \mb{22/150} \begin{gl} \item[168] {\rm Sq(3)[168]} \\ $h_{5}:$ [87], [86] \\ $h_{6}:$ [32] \item[169] {\rm Sq(3)[169] + Sq(0,1)[169]} \item[170] {\rm Sq(1)[173] + Sq(1)[172]} \\ $h_{0}:$ [173], [172] \\ $h_{2}:$ [162], [161] \\ $h_{5}:$ [87], [86] \\ $h_{6}:$ [32] \item[171] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{2}:$ [162], [161] \\ $h_{5}:$ [87], [86] \\ $h_{6}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[21/150] \mb{21/150} \begin{gl} \item[172] {\rm Sq(1,1)[167] + Sq(1,1)[166]} \item[173] {\rm Sq(3)[170]} \item[174] {\rm Sq(0,1)[171]} \item[175] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[20/150] \mb{20/150} \begin{gl} \item[175] {\rm Sq(2,1)[170] + Sq(2,1)[169]} \item[176] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{1}:$ [179] \\ $h_{3}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[19/150] \mb{19/150} \begin{gl} \item[182] {\rm Sq(2)[185]} \\ $h_{1}:$ [185] \\ $h_{5}:$ [100] \\ $h_{6}:$ [47] \item[183] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{3}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[18/150] \mb{18/150} \begin{gl} \item[188] {\rm Sq(0,1)[185]} \item[189] {\rm Sq(3)[186] + Sq(0,1)[186] + Sq(3)[185] + Sq(3)[184]} \item[190] {\rm Sq(2)[190]} \\ $h_{1}:$ [190] \\ $h_{2}:$ [179] \\ $h_{3}:$ [169], [168], [166] \end{gl} \end{bdl} \begin{bdl} \item[17/150] \mb{17/150} \begin{gl} \item[194] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{1}:$ [191], [190] \\ $h_{3}:$ [174], [173], [172] \end{gl} \end{bdl} \begin{bdl} \item[16/150] \mb{16/150} \begin{gl} \item[192] {\rm Sq(0,1)[185]} \item[193] {\rm Sq(3)[187] + Sq(0,1)[187] + Sq(0,1)[186]} \\ $h_{3}:$ [175] \item[194] {\rm Sq(2)[189]} \\ $h_{1}:$ [189] \\ $h_{2}:$ [182] \\ $h_{4}:$ [156], [155] \item[195] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{1}:$ [190] \\ $h_{2}:$ [183], [182] \\ $h_{5}:$ [104], [103] \item[196] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{5}:$ [103] \\ $h_{6}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[15/150] \mb{15/150} \begin{gl} \item[191] {\rm Sq(0,1)[195]} \item[192] {\rm Sq(3)[196] + Sq(3)[195]} \item[193] {\rm Sq(2)[198]} \\ $h_{1}:$ [198] \\ $h_{3}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[14/150] \mb{14/150} \begin{gl} \item[203] {\rm Sq(1)[214] + Sq(1)[213]} \\ $h_{0}:$ [214], [213] \\ $h_{1}:$ [209] \\ $h_{3}:$ [193] \\ $h_{5}:$ [108], [107], [106] \\ $h_{6}:$ [49], [48] \end{gl} \end{bdl} \begin{bdl} \item[13/150] \mb{13/150} \begin{gl} \item[211] {\rm Sq(3)[213] + Sq(0,1)[213]} \item[212] {\rm Sq(3)[215] + Sq(0,1)[215]} \item[213] {\rm Sq(3)[216] + Sq(0,1)[216]} \item[214] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \item[215] {\rm Sq(1)[224] + Sq(1)[221]} \\ $h_{0}:$ [224], [221] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[12/150] \mb{12/150} \begin{gl} \item[220] {\rm Sq(1,1)[222]} \item[221] {\rm Sq(3)[223] + Sq(0,1)[223]} \item[222] {\rm Sq(2)[227]} \\ $h_{1}:$ [227] \\ $h_{3}:$ [208] \\ $h_{5}:$ [112], [110], [109] \item[223] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{1}:$ [229] \\ $h_{3}:$ [208] \\ $h_{4}:$ [176], [175], [173] \\ $h_{5}:$ [112], [110], [109] \item[224] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[11/150] \mb{11/150} \begin{gl} \item[233] {\rm Sq(0,1)[227]} \\ $h_{5}:$ [118] \\ $h_{6}:$ [60] \item[234] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{4}:$ [176], [175] \item[235] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[10/150] \mb{10/150} \begin{gl} \item[232] {\rm Sq(3)[211]} \item[233] {\rm Sq(2)[212]} \\ $h_{1}:$ [212] \\ $h_{7}:$ [4] \item[234] {\rm Sq(2)[214]} \\ $h_{1}:$ [214] \item[235] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[9/150] \mb{9/150} \begin{gl} \item[216] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[8/150] \mb{8/150} \begin{gl} \item[189] {\rm Sq(1,1)[163] + Sq(1,1)[161]} \\ $h_{7}:$ [5] \item[190] {\rm Sq(2)[164]} \\ $h_{1}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[7/150] \mb{7/150} \begin{gl} \item[166] {\rm Sq(2)[140]} \\ $h_{1}:$ [140] \item[167] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{2}:$ [136] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[6/150] \mb{6/150} \begin{gl} \item[141] {\rm Sq(4)[103]} \\ $h_{2}:$ [103] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[5/150] \mb{5/150} \begin{gl} \item[106] {\rm Sq(3)[73] + Sq(0,1)[73]} \\ $h_{4}:$ [63] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \dm{151} \begin{bdl} \item[76/151] \mb{76/151} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[75/151] \mb{75/151} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[74/151] \mb{74/151} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[73/151] \mb{73/151} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[72/151] \mb{72/151} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[71/151] \mb{71/151} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[70/151] \mb{70/151} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[69/151] \mb{69/151} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[68/151] \mb{68/151} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[65/151] \mb{65/151} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[62/151] \mb{62/151} \begin{gl} \item[17] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[60/151] \mb{60/151} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[59/151] \mb{59/151} \begin{gl} \item[18] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[56/151] \mb{56/151} \begin{gl} \item[27] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[55/151] \mb{55/151} \begin{gl} \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [27] \\ $h_{2}:$ [26] \item[28] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{1}:$ [29] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[54/151] \mb{54/151} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [29] \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[53/151] \mb{53/151} \begin{gl} \item[32] {\rm Sq(1,1)[33]} \item[33] {\rm Sq(0,1)[34]} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[52/151] \mb{52/151} \begin{gl} \item[35] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[51/151] \mb{51/151} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[50/151] \mb{50/151} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[49/151] \mb{49/151} \begin{gl} \item[50] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[47/151] \mb{47/151} \begin{gl} \item[49] {\rm Sq(0,1)[50]} \item[50] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[46/151] \mb{46/151} \begin{gl} \item[54] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[44/151] \mb{44/151} \begin{gl} \item[56] {\rm Sq(0,1)[58]} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[43/151] \mb{43/151} \begin{gl} \item[63] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[41/151] \mb{41/151} \begin{gl} \item[74] {\rm Sq(0,1)[71]} \item[75] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[40/151] \mb{40/151} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[39/151] \mb{39/151} \begin{gl} \item[80] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [69] \item[81] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [81] \\ $h_{2}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[38/151] \mb{38/151} \begin{gl} \item[84] {\rm Sq(0,1)[86]} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[37/151] \mb{37/151} \begin{gl} \item[89] {\rm Sq(1,1)[92] + Sq(1,1)[91] + Sq(1,1)[90]} \item[90] {\rm Sq(0,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[36/151] \mb{36/151} \begin{gl} \item[97] {\rm Sq(2)[105]} \\ $h_{1}:$ [105] \item[98] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[35/151] \mb{35/151} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{2}:$ [101] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[34/151] \mb{34/151} \begin{gl} \item[111] {\rm Sq(0,1)[104]} \item[112] {\rm Sq(0,1)[105]} \item[113] {\rm Sq(0,1)[106]} \end{gl} \end{bdl} \begin{bdl} \item[32/151] \mb{32/151} \begin{gl} \item[112] {\rm Sq(0,1)[113]} \item[113] {\rm Sq(0,1)[114]} \item[114] {\rm Sq(0,1)[115]} \end{gl} \end{bdl} \begin{bdl} \item[31/151] \mb{31/151} \begin{gl} \item[117] {\rm Sq(0,1)[117]} \item[118] {\rm Sq(0,1)[118]} \item[119] {\rm Sq(0,1)[119]} \item[120] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{1}:$ [124], [123], [122] \end{gl} \end{bdl} \begin{bdl} \item[30/151] \mb{30/151} \begin{gl} \item[125] {\rm Sq(3)[123] + Sq(3)[122] + Sq(0,1)[122]} \end{gl} \end{bdl} \begin{bdl} \item[29/151] \mb{29/151} \begin{gl} \item[127] {\rm Sq(1,1)[126]} \item[128] {\rm Sq(0,1)[129]} \item[129] {\rm Sq(0,1)[130]} \end{gl} \end{bdl} \begin{bdl} \item[28/151] \mb{28/151} \begin{gl} \item[132] {\rm Sq(0,1)[140] + Sq(0,1)[139]} \item[133] {\rm Sq(0,1)[141] + Sq(0,1)[139]} \end{gl} \end{bdl} \begin{bdl} \item[27/151] \mb{27/151} \begin{gl} \item[145] {\rm Sq(2,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[26/151] \mb{26/151} \begin{gl} \item[152] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[25/151] \mb{25/151} \begin{gl} \item[150] {\rm Sq(0,1)[145] + Sq(0,1)[144]} \item[151] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{1}:$ [150], [149], [148], [147] \\ $h_{3}:$ [133] \\ $h_{4}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[24/151] \mb{24/151} \begin{gl} \item[153] {\rm Sq(2,1)[150]} \item[154] {\rm Sq(1)[165] + Sq(1)[161]} \\ $h_{0}:$ [165], [161] \\ $h_{3}:$ [141] \end{gl} \end{bdl} \begin{bdl} \item[23/151] \mb{23/151} \begin{gl} \item[161] {\rm Sq(3,1)[158] + Sq(3,1)[156] + Sq(3,1)[154] + Sq(0,2)[153]} \item[162] {\rm Sq(0,1)[166]} \item[163] {\rm Sq(0,1)[167]} \item[164] {\rm Sq(2)[169]} \\ $h_{1}:$ [169] \item[165] {\rm Sq(1)[174] + Sq(1)[173]} \\ $h_{0}:$ [174], [173] \\ $h_{3}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[22/151] \mb{22/151} \begin{gl} \item[172] {\rm Sq(0,1)[170]} \item[173] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{1}:$ [173], [172] \\ $h_{2}:$ [169], [167] \item[174] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{1}:$ [173], [172] \\ $h_{2}:$ [169], [167] \\ $h_{3}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[21/151] \mb{21/151} \begin{gl} \item[176] {\rm Sq(2)[175]} \\ $h_{1}:$ [175] \item[177] {\rm Sq(1)[178] + Sq(1)[177]} \\ $h_{0}:$ [178], [177] \\ $h_{2}:$ [170] \item[178] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{2}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[20/151] \mb{20/151} \begin{gl} \item[177] {\rm Sq(3,1)[170] + Sq(3,1)[169] + Sq(3,1)[168] + Sq(0,2)[168]} \item[178] {\rm Sq(1,1)[176]} \item[179] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[19/151] \mb{19/151} \begin{gl} \item[184] {\rm Sq(0,1)[185]} \end{gl} \end{bdl} \begin{bdl} \item[18/151] \mb{18/151} \begin{gl} \item[191] {\rm Sq(0,1)[189] + Sq(0,1)[188]} \\ $h_{5}:$ [105] \\ $h_{6}:$ [51] \item[192] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{3}:$ [172], [171] \end{gl} \end{bdl} \begin{bdl} \item[17/151] \mb{17/151} \begin{gl} \item[195] {\rm Sq(3)[191] + Sq(0,1)[191]} \\ $h_{3}:$ [175] \item[196] {\rm Sq(1)[198]} \\ $h_{0}:$ [198] \\ $h_{1}:$ [192] \\ $h_{2}:$ [186] \\ $h_{3}:$ [176], [175] \end{gl} \end{bdl} \begin{bdl} \item[16/151] \mb{16/151} \begin{gl} \item[197] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \item[198] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{2}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[15/151] \mb{15/151} \begin{gl} \item[194] {\rm Sq(0,1)[199]} \item[195] {\rm Sq(3)[201] + Sq(3)[199] + Sq(3)[198]} \item[196] {\rm Sq(3)[202] + Sq(0,1)[202] + Sq(3)[200] + Sq(0,1)[200] + Sq(3)[199]} \\ $h_{5}:$ [110] \item[197] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \end{gl} \end{bdl} \begin{bdl} \item[14/151] \mb{14/151} \begin{gl} \item[204] {\rm Sq(1,1)[207]} \item[205] {\rm Sq(0,1)[208]} \item[206] {\rm Sq(2)[213] + Sq(2)[212]} \\ $h_{1}:$ [213], [212] \end{gl} \end{bdl} \begin{bdl} \item[13/151] \mb{13/151} \begin{gl} \item[216] {\rm Sq(0,1)[217]} \\ $h_{2}:$ [213] \\ $h_{4}:$ [172] \\ $h_{5}:$ [106] \\ $h_{6}:$ [52], [51] \item[217] {\rm Sq(2)[220]} \\ $h_{1}:$ [220] \\ $h_{2}:$ [213] \\ $h_{3}:$ [199] \\ $h_{5}:$ [107] \\ $h_{6}:$ [51] \item[218] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{1}:$ [222], [221] \\ $h_{2}:$ [215], [213] \\ $h_{3}:$ [202], [200] \\ $h_{5}:$ [110], [108] \end{gl} \end{bdl} \begin{bdl} \item[12/151] \mb{12/151} \begin{gl} \item[225] {\rm Sq(3)[231] + Sq(0,1)[231]} \\ $h_{7}:$ [3] \item[226] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \item[227] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{2}:$ [223] \\ $h_{5}:$ [115], [113] \item[228] {\rm Sq(1)[240] + Sq(1)[236]} \\ $h_{0}:$ [240], [236] \\ $h_{2}:$ [226] \\ $h_{5}:$ [114], [113] \\ $h_{6}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[11/151] \mb{11/151} \begin{gl} \item[236] {\rm Sq(3)[230] + Sq(0,1)[230]} \item[237] {\rm Sq(3)[231] + Sq(0,1)[231] + Sq(3)[229] + Sq(0,1)[229]} \item[238] {\rm Sq(2)[233]} \\ $h_{1}:$ [233] \\ $h_{3}:$ [216] \\ $h_{7}:$ [5] \item[239] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{5}:$ [122] \item[240] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{2}:$ [227] \\ $h_{5}:$ [120] \\ $h_{6}:$ [61] \item[241] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{1}:$ [234] \\ $h_{4}:$ [180], [179] \\ $h_{5}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[10/151] \mb{10/151} \begin{gl} \item[236] {\rm Sq(3)[212]} \\ $h_{5}:$ [118] \item[237] {\rm Sq(3)[213] + Sq(0,1)[212]} \\ $h_{6}:$ [66] \item[238] {\rm Sq(3)[214] + Sq(0,1)[214]} \\ $h_{5}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[9/151] \mb{9/151} \begin{gl} \item[217] {\rm Sq(3)[188] + Sq(0,1)[188]} \\ $h_{3}:$ [176] \\ $h_{4}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[6/151] \mb{6/151} \begin{gl} \item[142] {\rm Sq(2)[106]} \\ $h_{1}:$ [106] \\ $h_{3}:$ [98] \\ $h_{4}:$ [89] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \dm{152} \begin{bdl} \item[75/152] \mb{75/152} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[74/152] \mb{74/152} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[69/152] \mb{69/152} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[68/152] \mb{68/152} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[67/152] \mb{67/152} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[66/152] \mb{66/152} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[64/152] \mb{64/152} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[61/152] \mb{61/152} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[60/152] \mb{60/152} \begin{gl} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{2}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[59/152] \mb{59/152} \begin{gl} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[58/152] \mb{58/152} \begin{gl} \item[21] {\rm Sq(0,1)[24]} \item[22] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[55/152] \mb{55/152} \begin{gl} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[53/152] \mb{53/152} \begin{gl} \item[35] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[52/152] \mb{52/152} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[51/152] \mb{51/152} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[50/152] \mb{50/152} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[49/152] \mb{49/152} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[48/152] \mb{48/152} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[46/152] \mb{46/152} \begin{gl} \item[55] {\rm Sq(0,1)[54]} \item[56] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[45/152] \mb{45/152} \begin{gl} \item[57] {\rm Sq(0,1)[54]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{1}:$ [58], [57] \\ $h_{2}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[44/152] \mb{44/152} \begin{gl} \item[59] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[43/152] \mb{43/152} \begin{gl} \item[64] {\rm Sq(0,1)[69]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[42/152] \mb{42/152} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[41/152] \mb{41/152} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[40/152] \mb{40/152} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[39/152] \mb{39/152} \begin{gl} \item[82] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[38/152] \mb{38/152} \begin{gl} \item[88] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{3}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[37/152] \mb{37/152} \begin{gl} \item[91] {\rm Sq(0,1)[94]} \item[92] {\rm Sq(0,1)[95]} \item[93] {\rm Sq(0,1)[96]} \item[94] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{1}:$ [97] \item[95] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[36/152] \mb{36/152} \begin{gl} \item[99] {\rm Sq(0,1)[104]} \item[100] {\rm Sq(0,1)[105]} \item[101] {\rm Sq(1)[111] + Sq(1)[110]} \\ $h_{0}:$ [111], [110] \\ $h_{3}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[35/152] \mb{35/152} \begin{gl} \item[110] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{1}:$ [111] \\ $h_{2}:$ [109] \\ $h_{4}:$ [73] \item[111] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{1}:$ [111] \\ $h_{2}:$ [109] \\ $h_{3}:$ [92] \\ $h_{4}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[34/152] \mb{34/152} \begin{gl} \item[114] {\rm Sq(0,1)[108]} \item[115] {\rm Sq(0,1)[109]} \item[116] {\rm Sq(0,1)[110]} \item[117] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{2}:$ [104] \item[118] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{2}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[33/152] \mb{33/152} \begin{gl} \item[112] {\rm Sq(0,1)[109]} \item[113] {\rm Sq(0,1)[110]} \item[114] {\rm Sq(0,1)[111]} \item[115] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[32/152] \mb{32/152} \begin{gl} \item[115] {\rm Sq(1,1)[116]} \end{gl} \end{bdl} \begin{bdl} \item[31/152] \mb{31/152} \begin{gl} \item[121] {\rm Sq(0,1)[121]} \item[122] {\rm Sq(0,1)[122]} \item[123] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[30/152] \mb{30/152} \begin{gl} \item[126] {\rm Sq(0,1)[124]} \item[127] {\rm Sq(0,1)[125]} \item[128] {\rm Sq(0,1)[126]} \end{gl} \end{bdl} \begin{bdl} \item[29/152] \mb{29/152} \begin{gl} \item[130] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[28/152] \mb{28/152} \begin{gl} \item[134] {\rm Sq(0,1)[143]} \item[135] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[27/152] \mb{27/152} \begin{gl} \item[146] {\rm Sq(0,1)[148]} \item[147] {\rm Sq(0,1)[149]} \item[148] {\rm Sq(3)[151] + Sq(0,1)[151]} \item[149] {\rm Sq(1)[155] + Sq(1)[153]} \\ $h_{0}:$ [155], [153] \\ $h_{2}:$ [146] \\ $h_{5}:$ [73] \\ $h_{6}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[26/152] \mb{26/152} \begin{gl} \item[153] {\rm Sq(1,1)[145] + Sq(1,1)[143]} \item[154] {\rm Sq(3)[149] + Sq(0,1)[149]} \item[155] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{2}:$ [143] \\ $h_{6}:$ [26] \item[156] {\rm Sq(1)[154] + Sq(1)[152]} \\ $h_{0}:$ [154], [152] \\ $h_{2}:$ [145] \\ $h_{6}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[25/152] \mb{25/152} \begin{gl} \item[152] {\rm Sq(0,1)[148]} \item[153] {\rm Sq(0,1)[150]} \item[154] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{2}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[24/152] \mb{24/152} \begin{gl} \item[155] {\rm Sq(1,1)[156]} \item[156] {\rm Sq(0,1)[158]} \end{gl} \end{bdl} \begin{bdl} \item[23/152] \mb{23/152} \begin{gl} \item[166] {\rm Sq(3)[169]} \item[167] {\rm Sq(1)[178] + Sq(1)[175]} \\ $h_{0}:$ [178], [175] \\ $h_{3}:$ [152], [151] \\ $h_{5}:$ [87] \\ $h_{6}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[22/152] \mb{22/152} \begin{gl} \item[175] {\rm Sq(3)[173] + Sq(0,1)[173] + Sq(3)[172] + Sq(0,1)[172]} \item[176] {\rm Sq(0,1)[174] + Sq(0,1)[173] + Sq(0,1)[172]} \item[177] {\rm Sq(2)[176]} \\ $h_{1}:$ [176] \item[178] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{3}:$ [157], [155] \end{gl} \end{bdl} \begin{bdl} \item[21/152] \mb{21/152} \begin{gl} \item[179] {\rm Sq(0,2)[166]} \item[180] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{3}:$ [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[20/152] \mb{20/152} \begin{gl} \item[180] {\rm Sq(2)[184]} \\ $h_{1}:$ [184] \item[181] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[19/152] \mb{19/152} \begin{gl} \item[185] {\rm Sq(1,1)[187]} \end{gl} \end{bdl} \begin{bdl} \item[18/152] \mb{18/152} \begin{gl} \item[193] {\rm Sq(2,1)[186]} \end{gl} \end{bdl} \begin{bdl} \item[17/152] \mb{17/152} \begin{gl} \item[197] {\rm Sq(1,1)[190]} \item[198] {\rm Sq(2)[197]} \\ $h_{1}:$ [197] \\ $h_{5}:$ [108] \\ $h_{6}:$ [49] \item[199] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \\ $h_{2}:$ [191] \\ $h_{5}:$ [109] \item[200] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{2}:$ [190] \\ $h_{3}:$ [178] \\ $h_{5}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[16/152] \mb{16/152} \begin{gl} \item[199] {\rm Sq(0,1)[192] + Sq(0,1)[191]} \item[200] {\rm Sq(3)[193] + Sq(3)[192] + Sq(0,1)[191]} \\ $h_{3}:$ [179] \item[201] {\rm Sq(2)[196] + Sq(2)[194]} \\ $h_{1}:$ [196], [194] \\ $h_{5}:$ [107] \end{gl} \end{bdl} \begin{bdl} \item[15/152] \mb{15/152} \begin{gl} \item[198] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{2}:$ [198] \end{gl} \end{bdl} \begin{bdl} \item[14/152] \mb{14/152} \begin{gl} \item[207] {\rm Sq(3)[213] + Sq(3)[212]} \item[208] {\rm Sq(3)[214] + Sq(0,1)[214] + Sq(0,1)[213] + Sq(3)[211]} \item[209] {\rm Sq(3)[215] + Sq(0,1)[215] + Sq(0,1)[212] + Sq(3)[211]} \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[13/152] \mb{13/152} \begin{gl} \item[219] {\rm Sq(0,1)[221]} \item[220] {\rm Sq(2)[225]} \\ $h_{1}:$ [225] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[12/152] \mb{12/152} \begin{gl} \item[229] {\rm Sq(3)[234] + Sq(0,1)[234] + Sq(3)[233]} \\ $h_{3}:$ [216], [214] \\ $h_{4}:$ [181] \\ $h_{5}:$ [116] \\ $h_{6}:$ [59] \item[230] {\rm Sq(2)[237]} \\ $h_{1}:$ [237] \\ $h_{3}:$ [216], [214] \\ $h_{5}:$ [116] \\ $h_{6}:$ [59] \item[231] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{1}:$ [238], [236] \\ $h_{2}:$ [231] \\ $h_{3}:$ [217], [216], [214] \\ $h_{5}:$ [116] \\ $h_{6}:$ [59] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[11/152] \mb{11/152} \begin{gl} \item[242] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{1}:$ [236] \\ $h_{2}:$ [229] \\ $h_{5}:$ [123] \item[243] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{2}:$ [230] \\ $h_{7}:$ [6] \item[244] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{1}:$ [237], [236] \\ $h_{2}:$ [231] \\ $h_{5}:$ [123] \\ $h_{6}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[10/152] \mb{10/152} \begin{gl} \item[239] {\rm Sq(1,1)[213] + Sq(1,1)[212]} \\ $h_{5}:$ [119] \item[240] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{5}:$ [119] \item[241] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \\ $h_{2}:$ [212] \\ $h_{7}:$ [6] \item[242] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{2}:$ [213] \\ $h_{5}:$ [119] \\ $h_{6}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[9/152] \mb{9/152} \begin{gl} \item[218] {\rm Sq(1,1)[188]} \item[219] {\rm Sq(3)[189]} \\ $h_{7}:$ [5] \item[220] {\rm Sq(3)[190]} \\ $h_{6}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[8/152] \mb{8/152} \begin{gl} \item[191] {\rm Sq(3)[166]} \\ $h_{2}:$ [164] \\ $h_{5}:$ [102], [101] \end{gl} \end{bdl} \dm{153} \begin{bdl} \item[77/153] \mb{77/153} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[76/153] \mb{76/153} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[75/153] \mb{75/153} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[74/153] \mb{74/153} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[73/153] \mb{73/153} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[72/153] \mb{72/153} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[67/153] \mb{67/153} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[66/153] \mb{66/153} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[63/153] \mb{63/153} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[60/153] \mb{60/153} \begin{gl} \item[21] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[59/153] \mb{59/153} \begin{gl} \item[20] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[58/153] \mb{58/153} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[57/153] \mb{57/153} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[56/153] \mb{56/153} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[55/153] \mb{55/153} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[54/153] \mb{54/153} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \item[33] {\rm Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[51/153] \mb{51/153} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[50/153] \mb{50/153} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[48/153] \mb{48/153} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[47/153] \mb{47/153} \begin{gl} \item[51] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[45/153] \mb{45/153} \begin{gl} \item[59] {\rm Sq(0,1)[56]} \item[60] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[44/153] \mb{44/153} \begin{gl} \item[60] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[43/153] \mb{43/153} \begin{gl} \item[67] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[42/153] \mb{42/153} \begin{gl} \item[73] {\rm Sq(1,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[41/153] \mb{41/153} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[40/153] \mb{40/153} \begin{gl} \item[79] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [79], [76] \end{gl} \end{bdl} \begin{bdl} \item[39/153] \mb{39/153} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[38/153] \mb{38/153} \begin{gl} \item[89] {\rm Sq(0,1)[89]} \item[90] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[37/153] \mb{37/153} \begin{gl} \item[96] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{1}:$ [100] \\ $h_{3}:$ [84] \\ $h_{4}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[36/153] \mb{36/153} \begin{gl} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(0,1)[107]} \item[104] {\rm Sq(0,1)[108]} \item[105] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{3}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[35/153] \mb{35/153} \begin{gl} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(0,1)[113]} \item[114] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[34/153] \mb{34/153} \begin{gl} \item[119] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{3}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[33/153] \mb{33/153} \begin{gl} \item[116] {\rm Sq(0,1)[112]} \item[117] {\rm Sq(0,1)[113]} \item[118] {\rm Sq(0,1)[114]} \item[119] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \item[120] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[32/153] \mb{32/153} \begin{gl} \item[116] {\rm Sq(0,1)[117]} \item[117] {\rm Sq(0,1)[118]} \item[118] {\rm Sq(0,1)[119]} \item[119] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[31/153] \mb{31/153} \begin{gl} \item[124] {\rm Sq(0,1)[125]} \end{gl} \end{bdl} \begin{bdl} \item[30/153] \mb{30/153} \begin{gl} \item[129] {\rm Sq(0,1)[128]} \item[130] {\rm Sq(0,1)[129]} \end{gl} \end{bdl} \begin{bdl} \item[29/153] \mb{29/153} \begin{gl} \item[131] {\rm Sq(3,1)[127] + Sq(0,2)[126]} \item[132] {\rm Sq(0,1)[132]} \item[133] {\rm Sq(0,1)[133]} \end{gl} \end{bdl} \begin{bdl} \item[28/153] \mb{28/153} \begin{gl} \item[136] {\rm Sq(0,1)[145]} \item[137] {\rm Sq(2)[148]} \\ $h_{1}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[27/153] \mb{27/153} \begin{gl} \item[150] {\rm Sq(0,1)[152]} \end{gl} \end{bdl} \begin{bdl} \item[26/153] \mb{26/153} \begin{gl} \item[157] {\rm Sq(1,1)[146]} \item[158] {\rm Sq(0,1)[150]} \item[159] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{1}:$ [153] \\ $h_{2}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[25/153] \mb{25/153} \begin{gl} \item[155] {\rm Sq(0,1)[153]} \item[156] {\rm Sq(2)[155]} \\ $h_{1}:$ [155] \item[157] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{2}:$ [150] \item[158] {\rm Sq(1)[160]} \\ $h_{0}:$ [160] \\ $h_{2}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[24/153] \mb{24/153} \begin{gl} \item[157] {\rm Sq(0,1)[161]} \item[158] {\rm Sq(0,1)[163]} \item[159] {\rm Sq(3)[164] + Sq(3)[163]} \item[160] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[23/153] \mb{23/153} \begin{gl} \item[168] {\rm Sq(1,1)[169]} \item[169] {\rm Sq(0,1)[172]} \item[170] {\rm Sq(1)[181] + Sq(1)[180] + Sq(1)[179]} \\ $h_{0}:$ [181], [180], [179] \\ $h_{1}:$ [177] \\ $h_{2}:$ [171], [170] \\ $h_{3}:$ [158], [156] \end{gl} \end{bdl} \begin{bdl} \item[22/153] \mb{22/153} \begin{gl} \item[179] {\rm Sq(1)[182] + Sq(1)[181]} \\ $h_{0}:$ [182], [181] \\ $h_{2}:$ [173], [172] \\ $h_{3}:$ [159] \item[180] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{2}:$ [173], [172] \\ $h_{4}:$ [134] \\ $h_{5}:$ [95] \\ $h_{6}:$ [36] \item[181] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{2}:$ [175], [173], [172] \\ $h_{3}:$ [160], [159] \\ $h_{4}:$ [134] \\ $h_{5}:$ [95] \\ $h_{6}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[21/153] \mb{21/153} \begin{gl} \item[181] {\rm Sq(0,1)[177]} \item[182] {\rm Sq(0,1)[178]} \\ $h_{3}:$ [164] \item[183] {\rm Sq(3)[178] + Sq(3)[177]} \\ $h_{4}:$ [142] \item[184] {\rm Sq(1)[184] + Sq(1)[183]} \\ $h_{0}:$ [184], [183] \\ $h_{2}:$ [175] \\ $h_{3}:$ [165], [164] \\ $h_{4}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[20/153] \mb{20/153} \begin{gl} \item[182] {\rm Sq(0,2)[174]} \item[183] {\rm Sq(0,1)[184]} \item[184] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{3}:$ [170], [169] \end{gl} \end{bdl} \begin{bdl} \item[19/153] \mb{19/153} \begin{gl} \item[186] {\rm Sq(2,1)[185]} \item[187] {\rm Sq(2)[193]} \\ $h_{1}:$ [193] \\ $h_{4}:$ [148] \\ $h_{5}:$ [108] \\ $h_{6}:$ [52] \item[188] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{2}:$ [189] \\ $h_{3}:$ [173] \\ $h_{4}:$ [149] \item[189] {\rm Sq(1)[196] + Sq(1)[194]} \\ $h_{0}:$ [196], [194] \item[190] {\rm Sq(1)[197] + Sq(1)[194]} \\ $h_{0}:$ [197], [194] \end{gl} \end{bdl} \begin{bdl} \item[18/153] \mb{18/153} \begin{gl} \item[194] {\rm Sq(0,2)[186] + Sq(0,2)[185]} \item[195] {\rm Sq(1,1)[194]} \\ $h_{3}:$ [176] \item[196] {\rm Sq(3)[195]} \item[197] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \end{gl} \end{bdl} \begin{bdl} \item[17/153] \mb{17/153} \begin{gl} \item[201] {\rm Sq(1,1)[196] + Sq(1,1)[192]} \item[202] {\rm Sq(1)[204] + Sq(1)[203] + Sq(1)[202]} \\ $h_{0}:$ [204], [203], [202] \\ $h_{1}:$ [201], [199] \\ $h_{5}:$ [113], [111] \end{gl} \end{bdl} \begin{bdl} \item[16/153] \mb{16/153} \begin{gl} \item[202] {\rm Sq(1,1)[192] + Sq(1,1)[191]} \item[203] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \item[204] {\rm Sq(1)[202] + Sq(1)[199]} \\ $h_{0}:$ [202], [199] \\ $h_{5}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[15/153] \mb{15/153} \begin{gl} \item[199] {\rm Sq(3,1)[197] + Sq(6)[196] + Sq(3,1)[196] + Sq(0,2)[196] + Sq(6)[195] + Sq(0,2)[195]} \item[200] {\rm Sq(3)[204]} \item[201] {\rm Sq(0,1)[205]} \item[202] {\rm Sq(3)[206]} \item[203] {\rm Sq(2)[209] + Sq(2)[208] + Sq(2)[207]} \\ $h_{1}:$ [209], [208], [207] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[13/153] \mb{13/153} \begin{gl} \item[221] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \end{gl} \end{bdl} \begin{bdl} \item[12/153] \mb{12/153} \begin{gl} \item[232] {\rm Sq(3)[237] + Sq(0,1)[237]} \end{gl} \end{bdl} \begin{bdl} \item[11/153] \mb{11/153} \begin{gl} \item[245] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{2}:$ [232] \\ $h_{4}:$ [190], [187] \\ $h_{6}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[10/153] \mb{10/153} \begin{gl} \item[243] {\rm Sq(3)[217]} \\ $h_{4}:$ [175] \item[244] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{1}:$ [219] \\ $h_{2}:$ [216] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[9/153] \mb{9/153} \begin{gl} \item[221] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{2}:$ [189] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[8/153] \mb{8/153} \begin{gl} \item[192] {\rm Sq(2,1)[165]} \item[193] {\rm Sq(1,1)[167]} \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[7/153] \mb{7/153} \begin{gl} \item[168] {\rm Sq(3)[142]} \\ $h_{2}:$ [141] \\ $h_{4}:$ [116] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \dm{154} \begin{bdl} \item[78/154] \mb{78/154} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[73/154] \mb{73/154} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[72/154] \mb{72/154} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[71/154] \mb{71/154} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[70/154] \mb{70/154} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[69/154] \mb{69/154} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[68/154] \mb{68/154} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[65/154] \mb{65/154} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[62/154] \mb{62/154} \begin{gl} \item[18] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[59/154] \mb{59/154} \begin{gl} \item[21] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[56/154] \mb{56/154} \begin{gl} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[55/154] \mb{55/154} \begin{gl} \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [32] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[54/154] \mb{54/154} \begin{gl} \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34], [32] \end{gl} \end{bdl} \begin{bdl} \item[53/154] \mb{53/154} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \item[38] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[52/154] \mb{52/154} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[51/154] \mb{51/154} \begin{gl} \item[45] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[50/154] \mb{50/154} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[49/154] \mb{49/154} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[48/154] \mb{48/154} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[47/154] \mb{47/154} \begin{gl} \item[52] {\rm Sq(0,1)[55]} \item[53] {\rm Sq(0,1)[56]} \item[54] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[46/154] \mb{46/154} \begin{gl} \item[57] {\rm Sq(0,1)[57]} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[45/154] \mb{45/154} \begin{gl} \item[61] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[44/154] \mb{44/154} \begin{gl} \item[61] {\rm Sq(2,1)[61]} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[43/154] \mb{43/154} \begin{gl} \item[68] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[41/154] \mb{41/154} \begin{gl} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[40/154] \mb{40/154} \begin{gl} \item[81] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[39/154] \mb{39/154} \begin{gl} \item[87] {\rm Sq(3)[88] + Sq(0,1)[88]} \item[88] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{1}:$ [89] \\ $h_{2}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[38/154] \mb{38/154} \begin{gl} \item[91] {\rm Sq(0,1)[91]} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(0,1)[93]} \item[94] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[37/154] \mb{37/154} \begin{gl} \item[97] {\rm Sq(1,1)[98]} \item[98] {\rm Sq(0,1)[99]} \end{gl} \end{bdl} \begin{bdl} \item[36/154] \mb{36/154} \begin{gl} \item[106] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{2}:$ [109] \\ $h_{3}:$ [95] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[35/154] \mb{35/154} \begin{gl} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(0,1)[115]} \item[117] {\rm Sq(0,1)[116]} \item[118] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [111] \\ $h_{3}:$ [100] \\ $h_{4}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[34/154] \mb{34/154} \begin{gl} \item[120] {\rm Sq(0,1)[112]} \item[121] {\rm Sq(0,1)[113]} \item[122] {\rm Sq(0,1)[114]} \item[123] {\rm Sq(2)[119]} \\ $h_{1}:$ [119] \item[124] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{3}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[33/154] \mb{33/154} \begin{gl} \item[121] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[32/154] \mb{32/154} \begin{gl} \item[120] {\rm Sq(0,1)[121]} \item[121] {\rm Sq(0,1)[122]} \item[122] {\rm Sq(0,1)[123]} \item[123] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \end{gl} \end{bdl} \begin{bdl} \item[31/154] \mb{31/154} \begin{gl} \item[125] {\rm Sq(0,1)[126]} \item[126] {\rm Sq(0,1)[127]} \item[127] {\rm Sq(0,1)[128]} \item[128] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[30/154] \mb{30/154} \begin{gl} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[29/154] \mb{29/154} \begin{gl} \item[134] {\rm Sq(0,1)[134]} \item[135] {\rm Sq(0,1)[135]} \item[136] {\rm Sq(1)[139] + Sq(1)[138]} \\ $h_{0}:$ [139], [138] \end{gl} \end{bdl} \begin{bdl} \item[28/154] \mb{28/154} \begin{gl} \item[138] {\rm Sq(3,1)[140] + Sq(3,1)[139] + Sq(0,2)[139]} \item[139] {\rm Sq(1,1)[145]} \item[140] {\rm Sq(0,1)[147]} \item[141] {\rm Sq(3)[148] + Sq(0,1)[146]} \end{gl} \end{bdl} \begin{bdl} \item[26/154] \mb{26/154} \begin{gl} \item[160] {\rm Sq(0,1)[152]} \item[161] {\rm Sq(3)[154] + Sq(0,1)[154] + Sq(3)[153] + Sq(0,1)[153] + Sq(3)[152]} \end{gl} \end{bdl} \begin{bdl} \item[25/154] \mb{25/154} \begin{gl} \item[159] {\rm Sq(0,1)[156] + Sq(3)[155]} \end{gl} \end{bdl} \begin{bdl} \item[24/154] \mb{24/154} \begin{gl} \item[161] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{1}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[23/154] \mb{23/154} \begin{gl} \item[171] {\rm Sq(0,2)[166]} \item[172] {\rm Sq(1,1)[174] + Sq(1,1)[173] + Sq(1,1)[172]} \item[173] {\rm Sq(0,1)[176]} \end{gl} \end{bdl} \begin{bdl} \item[22/154] \mb{22/154} \begin{gl} \item[182] {\rm Sq(0,1)[179]} \item[183] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{1}:$ [183] \\ $h_{2}:$ [177] \\ $h_{4}:$ [137], [136] \end{gl} \end{bdl} \begin{bdl} \item[21/154] \mb{21/154} \begin{gl} \item[185] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \\ $h_{2}:$ [178], [177] \item[186] {\rm Sq(1)[188] + Sq(1)[185]} \\ $h_{0}:$ [188], [185] \\ $h_{1}:$ [183] \\ $h_{2}:$ [179], [178], [177] \\ $h_{3}:$ [169], [168], [166] \end{gl} \end{bdl} \begin{bdl} \item[20/154] \mb{20/154} \begin{gl} \item[185] {\rm Sq(5)[183] + Sq(2,1)[183] + Sq(2,1)[182]} \\ $h_{3}:$ [172] \item[186] {\rm Sq(0,1)[185]} \item[187] {\rm Sq(3)[185]} \item[188] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{2}:$ [184] \\ $h_{3}:$ [173] \end{gl} \end{bdl} \begin{bdl} \item[19/154] \mb{19/154} \begin{gl} \item[191] {\rm Sq(0,1)[193]} \item[192] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{3}:$ [176] \end{gl} \end{bdl} \begin{bdl} \item[18/154] \mb{18/154} \begin{gl} \item[198] {\rm Sq(0,1)[197]} \item[199] {\rm Sq(3)[199] + Sq(0,1)[199]} \item[200] {\rm Sq(3)[200] + Sq(0,1)[200] + Sq(3)[197]} \\ $h_{3}:$ [179] \item[201] {\rm Sq(2)[201]} \\ $h_{1}:$ [201] \\ $h_{3}:$ [180] \\ $h_{5}:$ [114] \\ $h_{6}:$ [55] \item[202] {\rm Sq(1)[206] + Sq(1)[205]} \\ $h_{0}:$ [206], [205] \\ $h_{3}:$ [181], [179] \end{gl} \end{bdl} \begin{bdl} \item[17/154] \mb{17/154} \begin{gl} \item[203] {\rm Sq(1,1)[198] + Sq(1,1)[197]} \item[204] {\rm Sq(0,1)[199]} \item[205] {\rm Sq(3)[199]} \item[206] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \item[207] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{3}:$ [183] \\ $h_{4}:$ [160] \item[208] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{3}:$ [184], [183], [181] \\ $h_{4}:$ [162], [160] \\ $h_{5}:$ [116], [115] \\ $h_{6}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[16/154] \mb{16/154} \begin{gl} \item[205] {\rm Sq(1,1)[195]} \item[206] {\rm Sq(1,1)[197] + Sq(1,1)[194]} \\ $h_{3}:$ [181] \item[207] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{1}:$ [203] \\ $h_{7}:$ [1] \item[208] {\rm Sq(1)[207] + Sq(1)[205]} \\ $h_{0}:$ [207], [205] \\ $h_{3}:$ [183], [181] \\ $h_{4}:$ [166] \\ $h_{5}:$ [112], [110] \\ $h_{6}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[15/154] \mb{15/154} \begin{gl} \item[204] {\rm Sq(0,2)[199] + Sq(3,1)[198] + Sq(0,2)[198]} \item[205] {\rm Sq(3,1)[200] + Sq(3,1)[199] + Sq(0,2)[198]} \item[206] {\rm Sq(1)[212] + Sq(1)[210]} \\ $h_{0}:$ [212], [210] \\ $h_{7}:$ [2] \item[207] {\rm Sq(1)[215] + Sq(1)[210]} \\ $h_{0}:$ [215], [210] \\ $h_{4}:$ [176], [175], [173] \\ $h_{5}:$ [115] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[14/154] \mb{14/154} \begin{gl} \item[210] {\rm Sq(1,1)[217]} \item[211] {\rm Sq(0,1)[219]} \item[212] {\rm Sq(3)[220]} \\ $h_{7}:$ [2] \item[213] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{7}:$ [2] \item[214] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \item[215] {\rm Sq(1)[225] + Sq(1)[224]} \\ $h_{0}:$ [225], [224] \\ $h_{4}:$ [181] \\ $h_{5}:$ [117] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[13/154] \mb{13/154} \begin{gl} \item[222] {\rm Sq(1,1)[226] + Sq(1,1)[225]} \item[223] {\rm Sq(1,1)[227]} \item[224] {\rm Sq(3)[230] + Sq(0,1)[229]} \\ $h_{5}:$ [116] \\ $h_{6}:$ [56] \item[225] {\rm Sq(1)[235] + Sq(1)[234]} \\ $h_{0}:$ [235], [234] \\ $h_{4}:$ [184], [183] \\ $h_{5}:$ [116] \\ $h_{6}:$ [57], [56] \end{gl} \end{bdl} \begin{bdl} \item[12/154] \mb{12/154} \begin{gl} \item[233] {\rm Sq(1)[247] + Sq(1)[246]} \\ $h_{0}:$ [247], [246] \item[234] {\rm Sq(1)[248] + Sq(1)[246]} \\ $h_{0}:$ [248], [246] \\ $h_{2}:$ [239] \\ $h_{5}:$ [123], [121] \item[235] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{2}:$ [239] \\ $h_{4}:$ [190], [189] \\ $h_{5}:$ [123], [121] \\ $h_{6}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[11/154] \mb{11/154} \begin{gl} \item[246] {\rm Sq(3)[241] + Sq(0,1)[241]} \item[247] {\rm Sq(3)[242] + Sq(0,1)[242]} \item[248] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{2}:$ [236] \\ $h_{5}:$ [126], [124] \item[249] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{2}:$ [236] \\ $h_{5}:$ [126], [124] \end{gl} \end{bdl} \begin{bdl} \item[10/154] \mb{10/154} \begin{gl} \item[245] {\rm Sq(0,1)[219] + Sq(0,1)[218]} \\ $h_{5}:$ [121] \item[246] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{4}:$ [178] \\ $h_{5}:$ [122] \\ $h_{6}:$ [70], [69] \item[247] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{5}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[9/154] \mb{9/154} \begin{gl} \item[222] {\rm Sq(5)[189] + Sq(2,1)[189]} \\ $h_{5}:$ [113] \\ $h_{6}:$ [75] \item[223] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \\ $h_{4}:$ [157] \\ $h_{5}:$ [113] \\ $h_{6}:$ [75] \item[224] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[8/154] \mb{8/154} \begin{gl} \item[194] {\rm Sq(3,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[7/154] \mb{7/154} \begin{gl} \item[169] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{4}:$ [118], [117] \end{gl} \end{bdl} \begin{bdl} \item[6/154] \mb{6/154} \begin{gl} \item[143] {\rm Sq(1,3)[101] + Sq(3,0,1)[101] + Sq(0,1,1)[101] + Sq(1,3)[100] + Sq(3,0,1)[100] + Sq(0,1,1)[100]} \\ $h_{4}:$ [91], [90] \end{gl} \end{bdl} \dm{155} \begin{bdl} \item[79/155] \mb{79/155} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[78/155] \mb{78/155} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[77/155] \mb{77/155} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[69/155] \mb{69/155} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[68/155] \mb{68/155} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[67/155] \mb{67/155} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[64/155] \mb{64/155} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[61/155] \mb{61/155} \begin{gl} \item[22] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[60/155] \mb{60/155} \begin{gl} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[59/155] \mb{59/155} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[58/155] \mb{58/155} \begin{gl} \item[24] {\rm Sq(0,1)[26]} \item[25] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[55/155] \mb{55/155} \begin{gl} \item[32] {\rm Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[53/155] \mb{53/155} \begin{gl} \item[39] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[52/155] \mb{52/155} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[51/155] \mb{51/155} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[50/155] \mb{50/155} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[49/155] \mb{49/155} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[48/155] \mb{48/155} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[47/155] \mb{47/155} \begin{gl} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[46/155] \mb{46/155} \begin{gl} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(0,1)[60]} \item[61] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[45/155] \mb{45/155} \begin{gl} \item[62] {\rm Sq(0,1)[60]} \item[63] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[64] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[44/155] \mb{44/155} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \item[65] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[43/155] \mb{43/155} \begin{gl} \item[69] {\rm Sq(0,1)[73]} \item[70] {\rm Sq(0,1)[74]} \item[71] {\rm Sq(0,1)[75]} \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[42/155] \mb{42/155} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[40/155] \mb{40/155} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[39/155] \mb{39/155} \begin{gl} \item[89] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[37/155] \mb{37/155} \begin{gl} \item[99] {\rm Sq(0,1)[102]} \item[100] {\rm Sq(0,1)[103]} \item[101] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[36/155] \mb{36/155} \begin{gl} \item[107] {\rm Sq(0,1)[112]} \item[108] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[35/155] \mb{35/155} \begin{gl} \item[119] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{1}:$ [123] \\ $h_{2}:$ [118], [117] \\ $h_{3}:$ [105], [101] \item[120] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{1}:$ [122] \\ $h_{2}:$ [117] \\ $h_{3}:$ [104], [101] \\ $h_{4}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[34/155] \mb{34/155} \begin{gl} \item[125] {\rm Sq(0,1)[116]} \item[126] {\rm Sq(0,1)[117]} \item[127] {\rm Sq(0,1)[118]} \item[128] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [115], [114] \\ $h_{3}:$ [103] \item[129] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{2}:$ [114] \\ $h_{3}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[33/155] \mb{33/155} \begin{gl} \item[122] {\rm Sq(0,1)[116]} \item[123] {\rm Sq(0,1)[117]} \item[124] {\rm Sq(0,1)[118]} \item[125] {\rm Sq(1)[125] + Sq(1)[124]} \\ $h_{0}:$ [125], [124] \\ $h_{2}:$ [115] \\ $h_{3}:$ [106] \item[126] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{3}:$ [105] \end{gl} \end{bdl} \begin{bdl} \item[32/155] \mb{32/155} \begin{gl} \item[124] {\rm Sq(3)[124]} \item[125] {\rm Sq(1)[132] + Sq(1)[129]} \\ $h_{0}:$ [132], [129] \\ $h_{3}:$ [112] \item[126] {\rm Sq(1)[133] + Sq(1)[129]} \\ $h_{0}:$ [133], [129] \\ $h_{3}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[31/155] \mb{31/155} \begin{gl} \item[129] {\rm Sq(1,1)[128] + Sq(1,1)[127] + Sq(1,1)[126]} \item[130] {\rm Sq(0,1)[129]} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \item[133] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[30/155] \mb{30/155} \begin{gl} \item[133] {\rm Sq(0,1)[131]} \item[134] {\rm Sq(0,1)[132]} \item[135] {\rm Sq(0,1)[133]} \item[136] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \item[137] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[29/155] \mb{29/155} \begin{gl} \item[137] {\rm Sq(0,1)[136]} \item[138] {\rm Sq(3)[137]} \item[139] {\rm Sq(2)[139] + Sq(2)[138]} \\ $h_{1}:$ [139], [138] \item[140] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[28/155] \mb{28/155} \begin{gl} \item[142] {\rm Sq(1,1)[146]} \item[143] {\rm Sq(0,1)[150]} \item[144] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[27/155] \mb{27/155} \begin{gl} \item[151] {\rm Sq(1,1)[156] + Sq(1,1)[154]} \item[152] {\rm Sq(0,1)[157]} \item[153] {\rm Sq(0,1)[158]} \end{gl} \end{bdl} \begin{bdl} \item[26/155] \mb{26/155} \begin{gl} \item[162] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{2}:$ [154], [153], [152] \end{gl} \end{bdl} \begin{bdl} \item[25/155] \mb{25/155} \begin{gl} \item[160] {\rm Sq(3,1)[151] + Sq(3,1)[150] + Sq(3,1)[149] + Sq(0,2)[147]} \item[161] {\rm Sq(3)[159] + Sq(0,1)[159] + Sq(0,1)[158]} \item[162] {\rm Sq(3)[160] + Sq(0,1)[160] + Sq(0,1)[158] + Sq(0,1)[157]} \item[163] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[24/155] \mb{24/155} \begin{gl} \item[162] {\rm Sq(3)[168]} \item[163] {\rm Sq(0,1)[169] + Sq(0,1)[168]} \item[164] {\rm Sq(2)[172]} \\ $h_{1}:$ [172] \end{gl} \end{bdl} \begin{bdl} \item[22/155] \mb{22/155} \begin{gl} \item[184] {\rm Sq(1,1)[180]} \item[185] {\rm Sq(0,1)[181]} \end{gl} \end{bdl} \begin{bdl} \item[21/155] \mb{21/155} \begin{gl} \item[187] {\rm Sq(0,1)[183]} \item[188] {\rm Sq(3)[183]} \end{gl} \end{bdl} \begin{bdl} \item[20/155] \mb{20/155} \begin{gl} \item[189] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \\ $h_{4}:$ [152] \\ $h_{5}:$ [110] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[19/155] \mb{19/155} \begin{gl} \item[193] {\rm Sq(3)[197] + Sq(0,1)[197] + Sq(3)[194]} \item[194] {\rm Sq(2)[199]} \\ $h_{1}:$ [199] \item[195] {\rm Sq(2)[200] + Sq(2)[198]} \\ $h_{1}:$ [200], [198] \\ $h_{3}:$ [180], [179] \end{gl} \end{bdl} \begin{bdl} \item[18/155] \mb{18/155} \begin{gl} \item[203] {\rm Sq(1)[210] + Sq(1)[209]} \\ $h_{0}:$ [210], [209] \\ $h_{1}:$ [204], [203] \\ $h_{2}:$ [199] \\ $h_{3}:$ [187], [185] \\ $h_{4}:$ [160] \\ $h_{5}:$ [119], [118] \end{gl} \end{bdl} \begin{bdl} \item[17/155] \mb{17/155} \begin{gl} \item[209] {\rm Sq(1)[212] + Sq(1)[210]} \\ $h_{0}:$ [212], [210] \\ $h_{1}:$ [205] \\ $h_{3}:$ [186] \item[210] {\rm Sq(1)[214] + Sq(1)[213] + Sq(1)[210] + Sq(1)[209]} \\ $h_{0}:$ [214], [213], [210], [209] \\ $h_{1}:$ [205] \\ $h_{2}:$ [199] \\ $h_{3}:$ [188], [187] \\ $h_{4}:$ [165] \\ $h_{5}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[16/155] \mb{16/155} \begin{gl} \item[209] {\rm Sq(3)[202] + Sq(0,1)[202] + Sq(3)[200] + Sq(0,1)[200]} \item[210] {\rm Sq(3)[203] + Sq(0,1)[201] + Sq(3)[199]} \item[211] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \\ $h_{3}:$ [186] \item[212] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{3}:$ [185] \item[213] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{3}:$ [185] \item[214] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{3}:$ [187], [186], [185] \\ $h_{4}:$ [169], [168] \\ $h_{5}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[15/155] \mb{15/155} \begin{gl} \item[208] {\rm Sq(1,1)[208]} \item[209] {\rm Sq(1,1)[209]} \item[210] {\rm Sq(1)[218] + Sq(1)[216]} \\ $h_{0}:$ [218], [216] \\ $h_{3}:$ [196] \\ $h_{4}:$ [179], [178] \end{gl} \end{bdl} \begin{bdl} \item[14/155] \mb{14/155} \begin{gl} \item[216] {\rm Sq(3,1)[215] + Sq(3,1)[214] + Sq(6)[213] + Sq(0,2)[213] + Sq(6)[212] + Sq(3,1)[212] + Sq(0,2)[212] + Sq(3,1)[211] + Sq(0,2)[211]} \item[217] {\rm Sq(1,1)[219]} \item[218] {\rm Sq(1)[228] + Sq(1)[226]} \\ $h_{0}:$ [228], [226] \\ $h_{4}:$ [184], [182] \item[219] {\rm Sq(1)[229] + Sq(1)[227]} \\ $h_{0}:$ [229], [227] \\ $h_{1}:$ [223] \\ $h_{3}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[13/155] \mb{13/155} \begin{gl} \item[226] {\rm Sq(1,1)[229]} \\ $h_{3}:$ [213] \\ $h_{4}:$ [186] \\ $h_{6}:$ [58] \item[227] {\rm Sq(1)[237] + Sq(1)[236]} \\ $h_{0}:$ [237], [236] \\ $h_{3}:$ [213] \\ $h_{4}:$ [186] \\ $h_{6}:$ [58] \item[228] {\rm Sq(1)[238] + Sq(1)[236]} \\ $h_{0}:$ [238], [236] \\ $h_{3}:$ [213] \\ $h_{6}:$ [58] \item[229] {\rm Sq(1)[240] + Sq(1)[236]} \\ $h_{0}:$ [240], [236] \\ $h_{3}:$ [213] \\ $h_{4}:$ [186] \\ $h_{6}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[12/155] \mb{12/155} \begin{gl} \item[236] {\rm Sq(5)[239] + Sq(2,1)[239] + Sq(5)[237] + Sq(2,1)[237]} \\ $h_{5}:$ [126], [125], [124] \\ $h_{6}:$ [63] \item[237] {\rm Sq(1,1)[242]} \\ $h_{5}:$ [126], [125], [124] \\ $h_{6}:$ [63] \item[238] {\rm Sq(1,1)[244]} \\ $h_{5}:$ [126], [125], [124] \\ $h_{6}:$ [63] \item[239] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \\ $h_{4}:$ [195] \\ $h_{5}:$ [126], [125], [124] \\ $h_{6}:$ [63] \item[240] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{5}:$ [126], [125], [124] \\ $h_{6}:$ [63] \item[241] {\rm Sq(1)[253] + Sq(1)[252]} \\ $h_{0}:$ [253], [252] \\ $h_{3}:$ [223] \\ $h_{4}:$ [197], [195] \\ $h_{5}:$ [127], [125] \\ $h_{6}:$ [64], [63] \end{gl} \end{bdl} \begin{bdl} \item[11/155] \mb{11/155} \begin{gl} \item[250] {\rm Sq(1,1)[242]} \item[251] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{1}:$ [245] \\ $h_{2}:$ [240] \\ $h_{4}:$ [201], [196] \\ $h_{5}:$ [131], [130], [129], [128], [127] \\ $h_{6}:$ [65] \item[252] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{2}:$ [241] \\ $h_{4}:$ [201], [196] \\ $h_{5}:$ [127] \\ $h_{6}:$ [65] \\ $h_{7}:$ [7] \item[253] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \\ $h_{2}:$ [241] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[10/155] \mb{10/155} \begin{gl} \item[248] {\rm Sq(1,1)[218]} \item[249] {\rm Sq(3)[221] + Sq(0,1)[221]} \\ $h_{5}:$ [123] \item[250] {\rm Sq(1)[225]} \\ $h_{0}:$ [225] \\ $h_{2}:$ [218] \\ $h_{4}:$ [184] \\ $h_{5}:$ [125], [124], [123] \item[251] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \\ $h_{2}:$ [219] \\ $h_{4}:$ [184] \\ $h_{7}:$ [8] \item[252] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{2}:$ [219] \\ $h_{7}:$ [8] \item[253] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{2}:$ [220] \\ $h_{5}:$ [123] \\ $h_{6}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[9/155] \mb{9/155} \begin{gl} \item[225] {\rm Sq(1,1)[191]} \\ $h_{4}:$ [161] \\ $h_{5}:$ [114] \item[226] {\rm Sq(0,1)[193] + Sq(3)[192]} \\ $h_{4}:$ [161] \\ $h_{7}:$ [7] \item[227] {\rm Sq(3)[193]} \\ $h_{7}:$ [7] \item[228] {\rm Sq(2)[194]} \\ $h_{1}:$ [194] \\ $h_{4}:$ [161], [160] \item[229] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{6}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[8/155] \mb{8/155} \begin{gl} \item[195] {\rm Sq(3,1)[166]} \item[196] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{4}:$ [142], [141] \\ $h_{5}:$ [103] \\ $h_{6}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[7/155] \mb{7/155} \begin{gl} \item[170] {\rm Sq(7)[140] + Sq(1,2)[140]} \\ $h_{5}:$ [94] \item[171] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{4}:$ [122], [119] \\ $h_{6}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[6/155] \mb{6/155} \begin{gl} \item[144] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{4}:$ [92] \\ $h_{6}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[5/155] \mb{5/155} \begin{gl} \item[107] {\rm Sq(7,1)[72] + Sq(4,2)[72]} \\ $h_{4}:$ [65] \\ $h_{6}:$ [48] \end{gl} \end{bdl} \dm{156} \begin{bdl} \item[74/156] \mb{74/156} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[73/156] \mb{73/156} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[72/156] \mb{72/156} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[66/156] \mb{66/156} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[63/156] \mb{63/156} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[62/156] \mb{62/156} \begin{gl} \item[19] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[61/156] \mb{61/156} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[60/156] \mb{60/156} \begin{gl} \item[23] {\rm Sq(0,1)[21]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[59/156] \mb{59/156} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \item[24] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[58/156] \mb{58/156} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[57/156] \mb{57/156} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \item[30] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[56/156] \mb{56/156} \begin{gl} \item[30] {\rm Sq(3,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[55/156] \mb{55/156} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[54/156] \mb{54/156} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[51/156] \mb{51/156} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[50/156] \mb{50/156} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[48/156] \mb{48/156} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[47/156] \mb{47/156} \begin{gl} \item[56] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[46/156] \mb{46/156} \begin{gl} \item[62] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \item[63] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[45/156] \mb{45/156} \begin{gl} \item[65] {\rm Sq(0,1)[62]} \item[66] {\rm Sq(0,1)[63]} \item[67] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[44/156] \mb{44/156} \begin{gl} \item[66] {\rm Sq(0,1)[68]} \item[67] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[43/156] \mb{43/156} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \\ $h_{3}:$ [67] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[42/156] \mb{42/156} \begin{gl} \item[78] {\rm Sq(1,1)[78]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[41/156] \mb{41/156} \begin{gl} \item[81] {\rm Sq(1,1)[80]} \item[82] {\rm Sq(0,1)[81]} \item[83] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [85] \\ $h_{2}:$ [79] \\ $h_{3}:$ [70] \\ $h_{4}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[40/156] \mb{40/156} \begin{gl} \item[86] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [86], [83] \item[87] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [83] \\ $h_{4}:$ [60], [59] \end{gl} \end{bdl} \begin{bdl} \item[39/156] \mb{39/156} \begin{gl} \item[90] {\rm Sq(0,1)[91]} \item[91] {\rm Sq(0,1)[92]} \item[92] {\rm Sq(0,1)[93]} \item[93] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [89] \item[94] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{4}:$ [65], [64], [63] \end{gl} \end{bdl} \begin{bdl} \item[38/156] \mb{38/156} \begin{gl} \item[95] {\rm Sq(1,1)[96]} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \item[98] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{4}:$ [69], [68] \end{gl} \end{bdl} \begin{bdl} \item[37/156] \mb{37/156} \begin{gl} \item[102] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{4}:$ [72], [71], [70] \end{gl} \end{bdl} \begin{bdl} \item[36/156] \mb{36/156} \begin{gl} \item[109] {\rm Sq(0,1)[115]} \item[110] {\rm Sq(0,1)[116]} \item[111] {\rm Sq(0,1)[117]} \item[112] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{4}:$ [77], [76] \end{gl} \end{bdl} \begin{bdl} \item[35/156] \mb{35/156} \begin{gl} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(0,1)[121]} \item[123] {\rm Sq(0,1)[122]} \item[124] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{4}:$ [83], [82] \end{gl} \end{bdl} \begin{bdl} \item[34/156] \mb{34/156} \begin{gl} \item[130] {\rm Sq(1)[131] + Sq(1)[130]} \\ $h_{0}:$ [131], [130] \\ $h_{4}:$ [87], [84] \end{gl} \end{bdl} \begin{bdl} \item[33/156] \mb{33/156} \begin{gl} \item[127] {\rm Sq(0,1)[120]} \item[128] {\rm Sq(0,1)[121]} \item[129] {\rm Sq(0,1)[122]} \item[130] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{1}:$ [124] \\ $h_{2}:$ [119] \\ $h_{3}:$ [108] \item[131] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{1}:$ [124] \\ $h_{2}:$ [119] \\ $h_{3}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[32/156] \mb{32/156} \begin{gl} \item[127] {\rm Sq(0,1)[126] + Sq(0,1)[125]} \item[128] {\rm Sq(0,1)[127] + Sq(0,1)[125]} \item[129] {\rm Sq(3)[128] + Sq(0,1)[128] + Sq(0,1)[125]} \item[130] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{2}:$ [124] \\ $h_{3}:$ [116] \item[131] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{2}:$ [124] \\ $h_{3}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[31/156] \mb{31/156} \begin{gl} \item[134] {\rm Sq(0,1)[131]} \item[135] {\rm Sq(1)[142] + Sq(1)[138]} \\ $h_{0}:$ [142], [138] \\ $h_{3}:$ [120] \item[136] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{3}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[30/156] \mb{30/156} \begin{gl} \item[138] {\rm Sq(1,1)[132]} \item[139] {\rm Sq(0,1)[134]} \item[140] {\rm Sq(0,1)[135]} \item[141] {\rm Sq(2)[139] + Sq(2)[137]} \\ $h_{1}:$ [139], [137] \item[142] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{3}:$ [123] \item[143] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[29/156] \mb{29/156} \begin{gl} \item[141] {\rm Sq(0,1)[140]} \item[142] {\rm Sq(0,1)[141] + Sq(3)[139] + Sq(3)[138] + Sq(0,1)[138]} \item[143] {\rm Sq(1)[146] + Sq(1)[145]} \\ $h_{0}:$ [146], [145] \item[144] {\rm Sq(1)[147] + Sq(1)[145]} \\ $h_{0}:$ [147], [145] \end{gl} \end{bdl} \begin{bdl} \item[28/156] \mb{28/156} \begin{gl} \item[145] {\rm Sq(1,1)[150]} \item[146] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \item[147] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[27/156] \mb{27/156} \begin{gl} \item[154] {\rm Sq(1,1)[159] + Sq(1,1)[158]} \item[155] {\rm Sq(0,1)[160]} \item[156] {\rm Sq(0,1)[161]} \item[157] {\rm Sq(3)[161] + Sq(3)[160]} \end{gl} \end{bdl} \begin{bdl} \item[26/156] \mb{26/156} \begin{gl} \item[163] {\rm Sq(0,1)[159]} \end{gl} \end{bdl} \begin{bdl} \item[25/156] \mb{25/156} \begin{gl} \item[164] {\rm Sq(3,1)[153] + Sq(0,2)[153]} \item[165] {\rm Sq(2)[164] + Sq(2)[163] + Sq(2)[162]} \\ $h_{1}:$ [164], [163], [162] \\ $h_{3}:$ [144] \\ $h_{6}:$ [31] \item[166] {\rm Sq(1)[168] + Sq(1)[165]} \\ $h_{0}:$ [168], [165] \\ $h_{1}:$ [162] \\ $h_{2}:$ [160], [159] \item[167] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{1}:$ [162] \\ $h_{2}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[24/156] \mb{24/156} \begin{gl} \item[165] {\rm Sq(3,1)[164] + Sq(0,2)[161]} \item[166] {\rm Sq(0,1)[171]} \item[167] {\rm Sq(0,1)[173]} \item[168] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{2}:$ [168] \item[169] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[23/156] \mb{23/156} \begin{gl} \item[174] {\rm Sq(1,1)[179]} \item[175] {\rm Sq(1,1)[180]} \item[176] {\rm Sq(0,1)[182]} \end{gl} \end{bdl} \begin{bdl} \item[22/156] \mb{22/156} \begin{gl} \item[186] {\rm Sq(2)[187]} \\ $h_{1}:$ [187] \item[187] {\rm Sq(1)[190] + Sq(1)[189]} \\ $h_{0}:$ [190], [189] \\ $h_{2}:$ [183] \\ $h_{4}:$ [145], [141] \\ $h_{5}:$ [99] \\ $h_{6}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[21/156] \mb{21/156} \begin{gl} \item[189] {\rm Sq(1,1)[183]} \item[190] {\rm Sq(0,1)[187]} \\ $h_{4}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[20/156] \mb{20/156} \begin{gl} \item[190] {\rm Sq(0,1)[191]} \end{gl} \end{bdl} \begin{bdl} \item[19/156] \mb{19/156} \begin{gl} \item[196] {\rm Sq(1,1)[197] + Sq(1,1)[195]} \item[197] {\rm Sq(1)[205] + Sq(1)[204]} \\ $h_{0}:$ [205], [204] \\ $h_{2}:$ [196], [194] \\ $h_{3}:$ [187], [186], [185] \end{gl} \end{bdl} \begin{bdl} \item[18/156] \mb{18/156} \begin{gl} \item[204] {\rm Sq(3)[208] + Sq(0,1)[208] + Sq(3)[207] + Sq(0,1)[207] + Sq(3)[206] + Sq(0,1)[206] + Sq(3)[204]} \\ $h_{3}:$ [190] \item[205] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{3}:$ [193], [192], [190] \end{gl} \end{bdl} \begin{bdl} \item[17/156] \mb{17/156} \begin{gl} \item[211] {\rm Sq(3)[208] + Sq(0,1)[208] + Sq(3)[206] + Sq(0,1)[206] + Sq(3)[205]} \\ $h_{3}:$ [191], [190] \item[212] {\rm Sq(2)[209]} \\ $h_{1}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[16/156] \mb{16/156} \begin{gl} \item[215] {\rm Sq(3)[206] + Sq(0,1)[206] + Sq(0,1)[205] + Sq(0,1)[204]} \item[216] {\rm Sq(2)[208]} \\ $h_{1}:$ [208] \item[217] {\rm Sq(1)[215] + Sq(1)[213] + Sq(1)[212] + Sq(1)[211]} \\ $h_{0}:$ [215], [213], [212], [211] \\ $h_{2}:$ [202], [200], [199] \\ $h_{5}:$ [120], [117] \end{gl} \end{bdl} \begin{bdl} \item[15/156] \mb{15/156} \begin{gl} \item[211] {\rm Sq(3)[212] + Sq(0,1)[212] + Sq(0,1)[211] + Sq(3)[210]} \item[212] {\rm Sq(3)[215] + Sq(0,1)[215] + Sq(3)[214] + Sq(0,1)[214] + Sq(3)[210] + Sq(0,1)[210]} \\ $h_{3}:$ [198] \item[213] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{3}:$ [200], [199] \\ $h_{5}:$ [122] \item[214] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \item[215] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{3}:$ [200], [199], [198] \end{gl} \end{bdl} \begin{bdl} \item[14/156] \mb{14/156} \begin{gl} \item[220] {\rm Sq(0,1)[223] + Sq(0,1)[222]} \item[221] {\rm Sq(3)[223] + Sq(3)[222]} \item[222] {\rm Sq(3)[225] + Sq(0,1)[225] + Sq(3)[224] + Sq(0,1)[224] + Sq(0,1)[222]} \end{gl} \end{bdl} \begin{bdl} \item[13/156] \mb{13/156} \begin{gl} \item[230] {\rm Sq(1,1)[232]} \item[231] {\rm Sq(2)[237] + Sq(2)[236]} \\ $h_{1}:$ [237], [236] \item[232] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{3}:$ [218] \\ $h_{5}:$ [128] \end{gl} \end{bdl} \begin{bdl} \item[12/156] \mb{12/156} \begin{gl} \item[242] {\rm Sq(3)[246]} \item[243] {\rm Sq(2)[250]} \\ $h_{1}:$ [250] \item[244] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \item[245] {\rm Sq(1)[257] + Sq(1)[254]} \\ $h_{0}:$ [257], [254] \\ $h_{3}:$ [230] \\ $h_{5}:$ [133] \end{gl} \end{bdl} \begin{bdl} \item[11/156] \mb{11/156} \begin{gl} \item[254] {\rm Sq(1,1)[243]} \item[255] {\rm Sq(3)[245]} \item[256] {\rm Sq(3)[246] + Sq(0,1)[246]} \\ $h_{4}:$ [203], [202] \\ $h_{5}:$ [133], [132] \\ $h_{6}:$ [67] \item[257] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{3}:$ [229] \\ $h_{5}:$ [136], [134], [133] \end{gl} \end{bdl} \begin{bdl} \item[10/156] \mb{10/156} \begin{gl} \item[254] {\rm Sq(2)[227] + Sq(2)[226]} \\ $h_{1}:$ [227], [226] \\ $h_{3}:$ [214] \\ $h_{4}:$ [190], [186] \\ $h_{5}:$ [129], [127], [126] \item[255] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{5}:$ [130], [128], [127] \item[256] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \\ $h_{1}:$ [226] \\ $h_{2}:$ [221] \\ $h_{3}:$ [214] \\ $h_{4}:$ [190], [186] \\ $h_{5}:$ [129], [127], [126] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[9/156] \mb{9/156} \begin{gl} \item[230] {\rm Sq(3)[194] + Sq(0,1)[194]} \\ $h_{5}:$ [116], [115] \\ $h_{6}:$ [78] \item[231] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \\ $h_{5}:$ [115] \item[232] {\rm Sq(1)[198] + Sq(1)[197]} \\ $h_{0}:$ [198], [197] \\ $h_{5}:$ [115] \item[233] {\rm Sq(1)[199] + Sq(1)[197]} \\ $h_{0}:$ [199], [197] \\ $h_{2}:$ [193] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[8/156] \mb{8/156} \begin{gl} \item[197] {\rm Sq(5,1)[164] + Sq(2,2)[164] + Sq(1,0,1)[164]} \item[198] {\rm Sq(7)[166] + Sq(1,2)[166]} \item[199] {\rm Sq(1,1)[168]} \\ $h_{7}:$ [7] \item[200] {\rm Sq(3)[169] + Sq(0,1)[169]} \item[201] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{1}:$ [170] \\ $h_{3}:$ [164] \\ $h_{5}:$ [106] \end{gl} \end{bdl} \begin{bdl} \item[7/156] \mb{7/156} \begin{gl} \item[172] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{5}:$ [96], [95] \end{gl} \end{bdl} \begin{bdl} \item[6/156] \mb{6/156} \begin{gl} \item[145] {\rm Sq(2)[107]} \\ $h_{1}:$ [107] \\ $h_{4}:$ [95], [94], [93] \\ $h_{6}:$ [64] \item[146] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{5}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[5/156] \mb{5/156} \begin{gl} \item[108] {\rm Sq(4,0,1)[72] + Sq(1,1,1)[72]} \end{gl} \end{bdl} \dm{157} \begin{bdl} \item[73/157] \mb{73/157} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[72/157] \mb{72/157} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[71/157] \mb{71/157} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[68/157] \mb{68/157} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[65/157] \mb{65/157} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[62/157] \mb{62/157} \begin{gl} \item[20] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[61/157] \mb{61/157} \begin{gl} \item[24] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[60/157] \mb{60/157} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[59/157] \mb{59/157} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[58/157] \mb{58/157} \begin{gl} \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[57/157] \mb{57/157} \begin{gl} \item[31] {\rm Sq(2)[30]} \\ $h_{1}:$ [30] \item[32] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[56/157] \mb{56/157} \begin{gl} \item[31] {\rm Sq(1,1)[31]} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[55/157] \mb{55/157} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[54/157] \mb{54/157} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[53/157] \mb{53/157} \begin{gl} \item[40] {\rm Sq(0,1)[39]} \item[41] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[52/157] \mb{52/157} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[50/157] \mb{50/157} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[49/157] \mb{49/157} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[47/157] \mb{47/157} \begin{gl} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(0,1)[60]} \item[59] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [62] \\ $h_{2}:$ [58] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[46/157] \mb{46/157} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [61] \\ $h_{3}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[45/157] \mb{45/157} \begin{gl} \item[68] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [61] \item[69] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [61] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[44/157] \mb{44/157} \begin{gl} \item[68] {\rm Sq(0,1)[69]} \item[69] {\rm Sq(0,1)[70]} \item[70] {\rm Sq(0,1)[71]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[43/157] \mb{43/157} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[42/157] \mb{42/157} \begin{gl} \item[82] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[41/157] \mb{41/157} \begin{gl} \item[84] {\rm Sq(0,1)[82]} \item[85] {\rm Sq(3)[82]} \item[86] {\rm Sq(0,1)[83]} \item[87] {\rm Sq(0,1)[84]} \end{gl} \end{bdl} \begin{bdl} \item[40/157] \mb{40/157} \begin{gl} \item[88] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[39/157] \mb{39/157} \begin{gl} \item[95] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [96] \\ $h_{2}:$ [94] \item[96] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [95] \\ $h_{4}:$ [68] \\ $h_{5}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[38/157] \mb{38/157} \begin{gl} \item[99] {\rm Sq(0,1)[99]} \item[100] {\rm Sq(0,1)[100]} \item[101] {\rm Sq(0,1)[101]} \item[102] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [97] \item[103] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{4}:$ [72], [71] \end{gl} \end{bdl} \begin{bdl} \item[37/157] \mb{37/157} \begin{gl} \item[103] {\rm Sq(1,1)[106]} \item[104] {\rm Sq(0,1)[107]} \item[105] {\rm Sq(0,1)[108]} \item[106] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{4}:$ [75], [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[36/157] \mb{36/157} \begin{gl} \item[113] {\rm Sq(2)[123]} \\ $h_{1}:$ [123] \item[114] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{4}:$ [82], [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[35/157] \mb{35/157} \begin{gl} \item[125] {\rm Sq(0,1)[125]} \item[126] {\rm Sq(0,1)[126]} \item[127] {\rm Sq(0,1)[127]} \item[128] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{4}:$ [87], [84] \end{gl} \end{bdl} \begin{bdl} \item[34/157] \mb{34/157} \begin{gl} \item[131] {\rm Sq(0,1)[122]} \item[132] {\rm Sq(0,1)[123]} \item[133] {\rm Sq(0,1)[124]} \item[134] {\rm Sq(1)[133] + Sq(1)[132]} \\ $h_{0}:$ [133], [132] \\ $h_{4}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[33/157] \mb{33/157} \begin{gl} \item[132] {\rm Sq(0,1)[124]} \item[133] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{4}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[32/157] \mb{32/157} \begin{gl} \item[132] {\rm Sq(0,1)[129]} \item[133] {\rm Sq(0,1)[130]} \item[134] {\rm Sq(0,1)[131]} \item[135] {\rm Sq(1)[141] + Sq(1)[139]} \\ $h_{0}:$ [141], [139] \\ $h_{4}:$ [97], [95] \end{gl} \end{bdl} \begin{bdl} \item[31/157] \mb{31/157} \begin{gl} \item[137] {\rm Sq(0,1)[133]} \item[138] {\rm Sq(0,1)[135]} \item[139] {\rm Sq(3)[137] + Sq(0,1)[137] + Sq(0,1)[134]} \item[140] {\rm Sq(1)[145] + Sq(1)[144]} \\ $h_{0}:$ [145], [144] \\ $h_{1}:$ [141] \\ $h_{2}:$ [132] \item[141] {\rm Sq(1)[146] + Sq(1)[144]} \\ $h_{0}:$ [146], [144] \end{gl} \end{bdl} \begin{bdl} \item[30/157] \mb{30/157} \begin{gl} \item[144] {\rm Sq(3)[139] + Sq(3)[137] + Sq(0,1)[137]} \item[145] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{2}:$ [136] \item[146] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[29/157] \mb{29/157} \begin{gl} \item[145] {\rm Sq(0,1)[142]} \item[146] {\rm Sq(0,1)[143]} \item[147] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{2}:$ [139], [138] \item[148] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[28/157] \mb{28/157} \begin{gl} \item[148] {\rm Sq(3)[151]} \item[149] {\rm Sq(0,1)[152] + Sq(0,1)[151]} \item[150] {\rm Sq(0,1)[153] + Sq(0,1)[151]} \item[151] {\rm Sq(2)[157] + Sq(2)[156] + Sq(2)[155]} \\ $h_{1}:$ [157], [156], [155] \item[152] {\rm Sq(1)[160] + Sq(1)[159]} \\ $h_{0}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[27/157] \mb{27/157} \begin{gl} \item[158] {\rm Sq(0,2)[154] + Sq(0,2)[153]} \item[159] {\rm Sq(1,1)[160]} \item[160] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[26/157] \mb{26/157} \begin{gl} \item[164] {\rm Sq(0,1)[162] + Sq(0,1)[160]} \item[165] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(0,1)[161] + Sq(0,1)[160]} \item[166] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \item[167] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [148] \\ $h_{5}:$ [88] \\ $h_{6}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[25/157] \mb{25/157} \begin{gl} \item[168] {\rm Sq(3)[162] + Sq(0,1)[162]} \item[169] {\rm Sq(0,1)[163] + Sq(0,1)[162]} \item[170] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{3}:$ [150] \\ $h_{5}:$ [91], [90] \\ $h_{6}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[24/157] \mb{24/157} \begin{gl} \item[170] {\rm Sq(5)[168]} \item[171] {\rm Sq(1)[178] + Sq(1)[177]} \\ $h_{0}:$ [178], [177] \\ $h_{1}:$ [175], [174] \\ $h_{2}:$ [172] \item[172] {\rm Sq(1)[182] + Sq(1)[181] + Sq(1)[177]} \\ $h_{0}:$ [182], [181], [177] \\ $h_{3}:$ [160] \\ $h_{6}:$ [36] \item[173] {\rm Sq(1)[183] + Sq(1)[181]} \\ $h_{0}:$ [183], [181] \\ $h_{5}:$ [96], [95] \\ $h_{6}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[23/157] \mb{23/157} \begin{gl} \item[177] {\rm Sq(1,1)[182]} \item[178] {\rm Sq(1,1)[183]} \item[179] {\rm Sq(0,1)[185]} \item[180] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [186] \item[181] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \item[182] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{3}:$ [171], [170] \\ $h_{6}:$ [39] \item[183] {\rm Sq(1)[193] + Sq(1)[191]} \\ $h_{0}:$ [193], [191] \\ $h_{5}:$ [101], [100] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[22/157] \mb{22/157} \begin{gl} \item[188] {\rm Sq(0,2)[179]} \item[189] {\rm Sq(0,1)[187]} \item[190] {\rm Sq(3)[187]} \item[191] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{1}:$ [190], [189] \\ $h_{2}:$ [185] \\ $h_{4}:$ [147] \\ $h_{5}:$ [102] \item[192] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{3}:$ [175], [173], [172] \item[193] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{1}:$ [190], [189] \\ $h_{2}:$ [185] \\ $h_{4}:$ [147] \\ $h_{5}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[21/157] \mb{21/157} \begin{gl} \item[191] {\rm Sq(2)[190]} \\ $h_{1}:$ [190] \\ $h_{3}:$ [175] \\ $h_{4}:$ [153] \\ $h_{5}:$ [109] \\ $h_{6}:$ [44] \item[192] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{2}:$ [187] \item[193] {\rm Sq(1)[193] + Sq(1)[191]} \\ $h_{0}:$ [193], [191] \\ $h_{3}:$ [175] \item[194] {\rm Sq(1)[194] + Sq(1)[191]} \\ $h_{0}:$ [194], [191] \\ $h_{2}:$ [187] \\ $h_{5}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[20/157] \mb{20/157} \begin{gl} \item[191] {\rm Sq(1,1)[191]} \item[192] {\rm Sq(3)[194]} \item[193] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \item[194] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{5}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[19/157] \mb{19/157} \begin{gl} \item[198] {\rm Sq(3,1)[193] + Sq(0,2)[193]} \item[199] {\rm Sq(1,1)[202] + Sq(1,1)[201] + Sq(1,1)[200]} \item[200] {\rm Sq(1)[209] + Sq(1)[206]} \\ $h_{0}:$ [209], [206] \\ $h_{5}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[18/157] \mb{18/157} \begin{gl} \item[206] {\rm Sq(1,1)[206] + Sq(1,1)[205]} \item[207] {\rm Sq(1,1)[208] + Sq(1,1)[205] + Sq(1,1)[204]} \item[208] {\rm Sq(1)[214] + Sq(1)[213]} \\ $h_{0}:$ [214], [213] \\ $h_{1}:$ [211] \\ $h_{2}:$ [206], [205], [203] \\ $h_{3}:$ [194] \\ $h_{4}:$ [165], [162] \item[209] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[17/157] \mb{17/157} \begin{gl} \item[213] {\rm Sq(0,1)[210] + Sq(0,1)[209]} \item[214] {\rm Sq(3)[214] + Sq(0,1)[214] + Sq(3)[213] + Sq(0,1)[213] + Sq(3)[211] + Sq(3)[210]} \\ $h_{2}:$ [205] \\ $h_{3}:$ [193] \\ $h_{4}:$ [170] \item[215] {\rm Sq(2)[216]} \\ $h_{1}:$ [216] \\ $h_{2}:$ [205] \\ $h_{3}:$ [192] \item[216] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \end{gl} \end{bdl} \begin{bdl} \item[16/157] \mb{16/157} \begin{gl} \item[218] {\rm Sq(2)[212]} \\ $h_{1}:$ [212] \\ $h_{2}:$ [205] \\ $h_{3}:$ [193], [192] \\ $h_{4}:$ [172] \item[219] {\rm Sq(1)[219] + Sq(1)[218] + Sq(1)[217]} \\ $h_{0}:$ [219], [218], [217] \end{gl} \end{bdl} \begin{bdl} \item[15/157] \mb{15/157} \begin{gl} \item[216] {\rm Sq(2)[222] + Sq(2)[220]} \\ $h_{1}:$ [222], [220] \\ $h_{5}:$ [126], [125] \item[217] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \item[218] {\rm Sq(1)[226] + Sq(1)[223]} \\ $h_{0}:$ [226], [223] \\ $h_{2}:$ [212], [210] \\ $h_{7}:$ [3] \item[219] {\rm Sq(1)[229] + Sq(1)[228] + Sq(1)[223]} \\ $h_{0}:$ [229], [228], [223] \\ $h_{2}:$ [212], [210] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[14/157] \mb{14/157} \begin{gl} \item[223] {\rm Sq(3)[228] + Sq(0,1)[228] + Sq(3)[227] + Sq(0,1)[227] + Sq(0,1)[226]} \item[224] {\rm Sq(3)[229] + Sq(0,1)[229] + Sq(3)[227] + Sq(0,1)[227]} \item[225] {\rm Sq(2)[230]} \\ $h_{1}:$ [230] \\ $h_{2}:$ [223] \\ $h_{3}:$ [213], [211] \item[226] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \\ $h_{7}:$ [3] \item[227] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{1}:$ [231] \\ $h_{2}:$ [223] \\ $h_{3}:$ [214], [213], [211] \\ $h_{7}:$ [3] \item[228] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{3}:$ [214], [213] \\ $h_{7}:$ [3] \item[229] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{3}:$ [214], [213] \end{gl} \end{bdl} \begin{bdl} \item[13/157] \mb{13/157} \begin{gl} \item[233] {\rm Sq(3)[238] + Sq(0,1)[238] + Sq(0,1)[237] + Sq(3)[236]} \\ $h_{7}:$ [3] \item[234] {\rm Sq(3)[239] + Sq(3)[237]} \\ $h_{3}:$ [220] \\ $h_{7}:$ [3] \item[235] {\rm Sq(3)[240] + Sq(0,1)[240] + Sq(3)[237] + Sq(0,1)[237]} \\ $h_{3}:$ [220] \\ $h_{7}:$ [3] \item[236] {\rm Sq(3)[241] + Sq(0,1)[241] + Sq(3)[237] + Sq(0,1)[236]} \\ $h_{3}:$ [220] \\ $h_{7}:$ [3] \item[237] {\rm Sq(2)[243]} \\ $h_{1}:$ [243] \\ $h_{3}:$ [220] \item[238] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \\ $h_{3}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[12/157] \mb{12/157} \begin{gl} \item[246] {\rm Sq(2)[254]} \\ $h_{1}:$ [254] \\ $h_{2}:$ [247] \item[247] {\rm Sq(2)[256]} \\ $h_{1}:$ [256] \\ $h_{2}:$ [247] \\ $h_{3}:$ [233] \\ $h_{4}:$ [204], [203] \\ $h_{5}:$ [136], [135] \\ $h_{6}:$ [67] \item[248] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \item[249] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{2}:$ [248], [246] \\ $h_{5}:$ [138], [134] \item[250] {\rm Sq(1)[263] + Sq(1)[261]} \\ $h_{0}:$ [263], [261] \\ $h_{2}:$ [248], [246] \\ $h_{3}:$ [235] \\ $h_{5}:$ [138], [134] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[11/157] \mb{11/157} \begin{gl} \item[258] {\rm Sq(1,1)[246]} \item[259] {\rm Sq(3)[250] + Sq(0,1)[250] + Sq(3)[249] + Sq(0,1)[249]} \item[260] {\rm Sq(3)[251] + Sq(0,1)[251] + Sq(0,1)[249]} \\ $h_{5}:$ [137] \item[261] {\rm Sq(3)[253] + Sq(0,1)[253] + Sq(3)[252] + Sq(0,1)[252] + Sq(3)[249] + Sq(3)[248] + Sq(0,1)[248]} \\ $h_{5}:$ [137] \item[262] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \\ $h_{2}:$ [245] \\ $h_{5}:$ [138] \item[263] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{2}:$ [245] \\ $h_{3}:$ [235] \\ $h_{5}:$ [138], [137] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[10/157] \mb{10/157} \begin{gl} \item[257] {\rm Sq(3)[226] + Sq(3)[225]} \\ $h_{5}:$ [131] \item[258] {\rm Sq(2)[230]} \\ $h_{1}:$ [230] \\ $h_{2}:$ [222] \\ $h_{5}:$ [133], [132], [131] \\ $h_{6}:$ [76], [75] \item[259] {\rm Sq(2)[231]} \\ $h_{1}:$ [231] \\ $h_{5}:$ [132] \\ $h_{6}:$ [75] \item[260] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{2}:$ [224] \\ $h_{4}:$ [194] \\ $h_{5}:$ [134], [131] \\ $h_{6}:$ [77] \item[261] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{3}:$ [216] \\ $h_{5}:$ [131] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[9/157] \mb{9/157} \begin{gl} \item[234] {\rm Sq(4)[194]} \\ $h_{2}:$ [194] \\ $h_{4}:$ [166] \\ $h_{5}:$ [117] \\ $h_{6}:$ [80] \item[235] {\rm Sq(2)[198]} \\ $h_{1}:$ [198] \\ $h_{4}:$ [169], [168], [166] \\ $h_{5}:$ [120], [119] \\ $h_{6}:$ [80] \item[236] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{1}:$ [200] \\ $h_{4}:$ [168], [166] \\ $h_{5}:$ [117] \item[237] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{3}:$ [189] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[8/157] \mb{8/157} \begin{gl} \item[202] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \item[203] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[7/157] \mb{7/157} \begin{gl} \item[173] {\rm Sq(7,1)[137] + Sq(4,2)[137] + Sq(1,3)[137]} \\ $h_{5}:$ [97] \item[174] {\rm Sq(7,1)[138] + Sq(4,2)[138] + Sq(1,3)[138] + Sq(3,0,1)[138] + Sq(0,1,1)[138] + Sq(4,2)[137] + Sq(1,3)[137] + Sq(3,0,1)[137] + Sq(0,1,1)[137]} \\ $h_{6}:$ [76] \item[175] {\rm Sq(3,2)[140] + Sq(2,0,1)[140]} \item[176] {\rm Sq(5,1)[141] + Sq(2,2)[141]} \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[6/157] \mb{6/157} \begin{gl} \item[147] {\rm Sq(2)[108]} \\ $h_{1}:$ [108] \item[148] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{4}:$ [96] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[5/157] \mb{5/157} \begin{gl} \item[109] {\rm Sq(12)[72] + Sq(9,1)[72] + Sq(0,4)[72] + Sq(5,0,1)[72] + Sq(2,1,1)[72]} \\ $h_{5}:$ [53] \item[110] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{4}:$ [68] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[4/157] \mb{4/157} \begin{gl} \item[74] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{4}:$ [47] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[3/157] \mb{3/157} \begin{gl} \item[50] {\rm Sq(16)[26] + Sq(10,2)[26] + Sq(7,3)[26] + Sq(6,1,1)[26]} \\ $h_{4}:$ [26] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \dm{158} \begin{bdl} \item[78/158] \mb{78/158} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[77/158] \mb{77/158} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[76/158] \mb{76/158} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[75/158] \mb{75/158} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[74/158] \mb{74/158} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[73/158] \mb{73/158} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[72/158] \mb{72/158} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[71/158] \mb{71/158} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[70/158] \mb{70/158} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[69/158] \mb{69/158} \begin{gl} \item[14] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[68/158] \mb{68/158} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[67/158] \mb{67/158} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \item[13] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{4}:$ [10], [9] \end{gl} \end{bdl} \begin{bdl} \item[66/158] \mb{66/158} \begin{gl} \item[16] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [12], [11] \end{gl} \end{bdl} \begin{bdl} \item[65/158] \mb{65/158} \begin{gl} \item[21] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11], [10] \end{gl} \end{bdl} \begin{bdl} \item[64/158] \mb{64/158} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{4}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[63/158] \mb{63/158} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[62/158] \mb{62/158} \begin{gl} \item[21] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[61/158] \mb{61/158} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[60/158] \mb{60/158} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [22] \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[59/158] \mb{59/158} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[58/158] \mb{58/158} \begin{gl} \item[29] {\rm Sq(0,1)[28]} \item[30] {\rm Sq(0,1)[29]} \item[31] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[57/158] \mb{57/158} \begin{gl} \item[33] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[56/158] \mb{56/158} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[55/158] \mb{55/158} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[54/158] \mb{54/158} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[53/158] \mb{53/158} \begin{gl} \item[42] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[52/158] \mb{52/158} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[51/158] \mb{51/158} \begin{gl} \item[49] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[49/158] \mb{49/158} \begin{gl} \item[59] {\rm Sq(0,1)[55]} \item[60] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[48/158] \mb{48/158} \begin{gl} \item[57] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[47/158] \mb{47/158} \begin{gl} \item[60] {\rm Sq(3)[63] + Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[46/158] \mb{46/158} \begin{gl} \item[66] {\rm Sq(0,1)[65]} \item[67] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[45/158] \mb{45/158} \begin{gl} \item[70] {\rm Sq(0,1)[66]} \item[71] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[44/158] \mb{44/158} \begin{gl} \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [69] \item[73] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{2}:$ [72], [69] \end{gl} \end{bdl} \begin{bdl} \item[43/158] \mb{43/158} \begin{gl} \item[77] {\rm Sq(0,1)[78]} \item[78] {\rm Sq(0,1)[79]} \item[79] {\rm Sq(0,1)[80]} \item[80] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[42/158] \mb{42/158} \begin{gl} \item[83] {\rm Sq(0,1)[81]} \item[84] {\rm Sq(0,1)[82]} \item[85] {\rm Sq(2)[85] + Sq(2)[84]} \\ $h_{1}:$ [85], [84] \end{gl} \end{bdl} \begin{bdl} \item[40/158] \mb{40/158} \begin{gl} \item[89] {\rm Sq(0,1)[90]} \item[90] {\rm Sq(0,1)[91]} \item[91] {\rm Sq(0,1)[92]} \end{gl} \end{bdl} \begin{bdl} \item[39/158] \mb{39/158} \begin{gl} \item[97] {\rm Sq(0,1)[96] + Sq(0,1)[95]} \item[98] {\rm Sq(0,1)[97]} \end{gl} \end{bdl} \begin{bdl} \item[37/158] \mb{37/158} \begin{gl} \item[107] {\rm Sq(0,1)[109]} \item[108] {\rm Sq(0,1)[110]} \item[109] {\rm Sq(0,1)[111]} \item[110] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{1}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[36/158] \mb{36/158} \begin{gl} \item[115] {\rm Sq(0,1)[121]} \item[116] {\rm Sq(0,1)[122]} \item[117] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[34/158] \mb{34/158} \begin{gl} \item[135] {\rm Sq(0,1)[127]} \item[136] {\rm Sq(0,1)[128]} \item[137] {\rm Sq(0,1)[129]} \item[138] {\rm Sq(2)[132]} \\ $h_{1}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[33/158] \mb{33/158} \begin{gl} \item[134] {\rm Sq(0,1)[127]} \item[135] {\rm Sq(0,1)[128]} \item[136] {\rm Sq(0,1)[129]} \end{gl} \end{bdl} \begin{bdl} \item[32/158] \mb{32/158} \begin{gl} \item[136] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[31/158] \mb{31/158} \begin{gl} \item[142] {\rm Sq(0,1)[139]} \item[143] {\rm Sq(0,1)[140] + Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[30/158] \mb{30/158} \begin{gl} \item[147] {\rm Sq(1,1)[140] + Sq(1,1)[138]} \item[148] {\rm Sq(0,1)[141]} \item[149] {\rm Sq(3)[143] + Sq(0,1)[143] + Sq(0,1)[142]} \end{gl} \end{bdl} \begin{bdl} \item[29/158] \mb{29/158} \begin{gl} \item[149] {\rm Sq(0,1)[145]} \item[150] {\rm Sq(1)[154] + Sq(1)[153]} \\ $h_{0}:$ [154], [153] \\ $h_{1}:$ [151], [148] \item[151] {\rm Sq(1)[155] + Sq(1)[153]} \\ $h_{0}:$ [155], [153] \\ $h_{1}:$ [151] \\ $h_{2}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[28/158] \mb{28/158} \begin{gl} \item[153] {\rm Sq(0,1)[156]} \item[154] {\rm Sq(3)[157] + Sq(3)[156] + Sq(3)[155] + Sq(0,1)[155]} \item[155] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[27/158] \mb{27/158} \begin{gl} \item[161] {\rm Sq(3,1)[158] + Sq(0,2)[157]} \item[162] {\rm Sq(1,1)[162]} \item[163] {\rm Sq(0,1)[163]} \end{gl} \end{bdl} \begin{bdl} \item[26/158] \mb{26/158} \begin{gl} \item[168] {\rm Sq(0,1)[164]} \item[169] {\rm Sq(3)[167] + Sq(0,1)[167] + Sq(3)[166] + Sq(0,1)[166] + Sq(3)[165]} \\ $h_{5}:$ [89] \\ $h_{6}:$ [34] \item[170] {\rm Sq(2)[168]} \\ $h_{1}:$ [168] \\ $h_{5}:$ [89] \\ $h_{6}:$ [34] \item[171] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{2}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[25/158] \mb{25/158} \begin{gl} \item[171] {\rm Sq(0,1)[167] + Sq(0,1)[165]} \item[172] {\rm Sq(3)[169] + Sq(0,1)[169] + Sq(0,1)[165]} \item[173] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{2}:$ [162] \item[174] {\rm Sq(1)[178] + Sq(1)[175]} \\ $h_{0}:$ [178], [175] \end{gl} \end{bdl} \begin{bdl} \item[24/158] \mb{24/158} \begin{gl} \item[174] {\rm Sq(0,1)[174]} \item[175] {\rm Sq(3)[174]} \item[176] {\rm Sq(3)[175]} \item[177] {\rm Sq(0,1)[176]} \item[178] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[23/158] \mb{23/158} \begin{gl} \item[184] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \item[185] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{1}:$ [189] \\ $h_{3}:$ [174], [173] \\ $h_{4}:$ [143] \\ $h_{6}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[22/158] \mb{22/158} \begin{gl} \item[194] {\rm Sq(0,1)[189]} \item[195] {\rm Sq(3)[190] + Sq(0,1)[190] + Sq(3)[189]} \\ $h_{2}:$ [188] \\ $h_{5}:$ [106] \item[196] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \item[197] {\rm Sq(1)[200] + Sq(1)[197]} \\ $h_{0}:$ [200], [197] \\ $h_{3}:$ [178], [177] \\ $h_{6}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[21/158] \mb{21/158} \begin{gl} \item[195] {\rm Sq(2,1)[187]} \item[196] {\rm Sq(0,1)[190]} \item[197] {\rm Sq(3)[190]} \item[198] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \item[199] {\rm Sq(1)[197] + Sq(1)[195]} \\ $h_{0}:$ [197], [195] \item[200] {\rm Sq(1)[198] + Sq(1)[195]} \\ $h_{0}:$ [198], [195] \\ $h_{3}:$ [179], [178], [177] \end{gl} \end{bdl} \begin{bdl} \item[20/158] \mb{20/158} \begin{gl} \item[195] {\rm Sq(3,1)[187] + Sq(3,1)[186] + Sq(0,2)[186]} \item[196] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{1}:$ [199], [198] \\ $h_{3}:$ [184] \\ $h_{4}:$ [164] \\ $h_{5}:$ [117] \\ $h_{6}:$ [51] \item[197] {\rm Sq(1)[203] + Sq(1)[201]} \\ $h_{0}:$ [203], [201] \item[198] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{3}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[19/158] \mb{19/158} \begin{gl} \item[201] {\rm Sq(3,1)[197] + Sq(3,1)[194] + Sq(0,2)[194]} \item[202] {\rm Sq(2,1)[201] + Sq(2,1)[199] + Sq(2,1)[198]} \item[203] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \item[204] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{1}:$ [207], [206] \\ $h_{4}:$ [165] \item[205] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{1}:$ [207], [206] \\ $h_{3}:$ [192] \\ $h_{4}:$ [165] \item[206] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \end{gl} \end{bdl} \begin{bdl} \item[18/158] \mb{18/158} \begin{gl} \item[210] {\rm Sq(3,1)[202] + Sq(3,1)[201]} \item[211] {\rm Sq(5)[208] + Sq(2,1)[208] + Sq(5)[206] + Sq(2,1)[206] + Sq(2,1)[204] + Sq(2,1)[203]} \item[212] {\rm Sq(3)[211] + Sq(0,1)[211]} \\ $h_{3}:$ [195] \item[213] {\rm Sq(3)[212]} \end{gl} \end{bdl} \begin{bdl} \item[17/158] \mb{17/158} \begin{gl} \item[217] {\rm Sq(1,1)[210] + Sq(1,1)[209]} \item[218] {\rm Sq(3)[217] + Sq(0,1)[217]} \\ $h_{5}:$ [129] \item[219] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{5}:$ [134] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[16/158] \mb{16/158} \begin{gl} \item[220] {\rm Sq(0,1)[211]} \item[221] {\rm Sq(2)[216]} \\ $h_{1}:$ [216] \\ $h_{3}:$ [196], [194] \\ $h_{5}:$ [127] \item[222] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{2}:$ [208] \\ $h_{3}:$ [197], [194] \\ $h_{4}:$ [175] \item[223] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{3}:$ [195] \item[224] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{5}:$ [128] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[15/158] \mb{15/158} \begin{gl} \item[220] {\rm Sq(0,1)[222] + Sq(3)[221]} \\ $h_{3}:$ [204] \item[221] {\rm Sq(3)[222] + Sq(3)[220]} \item[222] {\rm Sq(1)[232] + Sq(1)[230]} \\ $h_{0}:$ [232], [230] \\ $h_{5}:$ [131] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[14/158] \mb{14/158} \begin{gl} \item[230] {\rm Sq(1,1)[228] + Sq(1,1)[227] + Sq(1,1)[226]} \item[231] {\rm Sq(2)[233]} \\ $h_{1}:$ [233] \\ $h_{7}:$ [4] \item[232] {\rm Sq(1)[244] + Sq(1)[243] + Sq(1)[240] + Sq(1)[239]} \\ $h_{0}:$ [244], [243], [240], [239] \\ $h_{5}:$ [135] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[13/158] \mb{13/158} \begin{gl} \item[239] {\rm Sq(1,1)[241] + Sq(4)[237] + Sq(4)[236] + Sq(1,1)[236]} \\ $h_{2}:$ [237], [236] \item[240] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{2}:$ [240], [237] \item[241] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \item[242] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{3}:$ [226] \item[243] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{2}:$ [240], [237] \item[244] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{2}:$ [237], [236] \\ $h_{5}:$ [136] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[12/158] \mb{12/158} \begin{gl} \item[251] {\rm Sq(3)[254]} \\ $h_{2}:$ [250] \item[252] {\rm Sq(3)[255] + Sq(0,1)[255]} \item[253] {\rm Sq(3)[257] + Sq(0,1)[257] + Sq(0,1)[255] + Sq(0,1)[254]} \\ $h_{3}:$ [237] \item[254] {\rm Sq(2)[261] + Sq(2)[260] + Sq(2)[259]} \\ $h_{1}:$ [261], [260], [259] \\ $h_{4}:$ [208] \item[255] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{2}:$ [250] \item[256] {\rm Sq(1)[271] + Sq(1)[270] + Sq(1)[269] + Sq(1)[268] + Sq(1)[266] + Sq(1)[265]} \\ $h_{0}:$ [271], [270], [269], [268], [266], [265] \\ $h_{5}:$ [143] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[11/158] \mb{11/158} \begin{gl} \item[264] {\rm Sq(1,1)[252] + Sq(1,1)[251] + Sq(1,1)[248]} \item[265] {\rm Sq(1,1)[253] + Sq(4)[249] + Sq(4)[248] + Sq(1,1)[248]} \\ $h_{2}:$ [249], [248] \\ $h_{5}:$ [143], [142] \\ $h_{6}:$ [73] \item[266] {\rm Sq(3)[255] + Sq(0,1)[255] + Sq(3)[254]} \\ $h_{3}:$ [236] \\ $h_{5}:$ [144] \\ $h_{6}:$ [73] \item[267] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{2}:$ [248] \item[268] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{1}:$ [257] \\ $h_{2}:$ [251], [250], [249], [248] \\ $h_{3}:$ [236] \\ $h_{5}:$ [146] \\ $h_{7}:$ [9] \item[269] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{2}:$ [252], [249] \\ $h_{3}:$ [236] \\ $h_{5}:$ [144], [143], [142] \\ $h_{7}:$ [9] \item[270] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{1}:$ [259], [257] \\ $h_{2}:$ [253], [252], [251], [250], [249] \\ $h_{5}:$ [146], [145], [144], [143] \\ $h_{6}:$ [74] \item[271] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{1}:$ [259] \\ $h_{2}:$ [253] \\ $h_{3}:$ [236] \\ $h_{5}:$ [147], [145], [144], [143] \\ $h_{6}:$ [74] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[10/158] \mb{10/158} \begin{gl} \item[262] {\rm Sq(1,1)[227]} \item[263] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{2}:$ [226], [225] \\ $h_{5}:$ [139] \\ $h_{7}:$ [11] \item[264] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{2}:$ [227] \\ $h_{7}:$ [11] \item[265] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{2}:$ [229], [227], [226], [225] \\ $h_{5}:$ [139] \\ $h_{6}:$ [79] \item[266] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{2}:$ [229] \\ $h_{5}:$ [141] \\ $h_{6}:$ [79] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[9/158] \mb{9/158} \begin{gl} \item[238] {\rm Sq(0,1)[199] + Sq(3)[198] + Sq(0,1)[198]} \\ $h_{5}:$ [125], [123] \\ $h_{7}:$ [10] \item[239] {\rm Sq(3)[199] + Sq(3)[198] + Sq(0,1)[198] + Sq(0,1)[197]} \\ $h_{7}:$ [10] \item[240] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{2}:$ [195] \\ $h_{5}:$ [125], [123] \\ $h_{6}:$ [81] \item[241] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{4}:$ [174], [173] \\ $h_{5}:$ [127], [125] \\ $h_{6}:$ [82] \item[242] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{2}:$ [195] \\ $h_{5}:$ [129] \\ $h_{6}:$ [81] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[8/158] \mb{8/158} \begin{gl} \item[204] {\rm Sq(1,1)[170]} \item[205] {\rm Sq(1,1)[171]} \\ $h_{4}:$ [151] \\ $h_{5}:$ [110] \\ $h_{6}:$ [79] \item[206] {\rm Sq(2)[173]} \\ $h_{1}:$ [173] \\ $h_{2}:$ [170] \\ $h_{5}:$ [111], [110], [109] \\ $h_{6}:$ [79] \item[207] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{1}:$ [175] \\ $h_{4}:$ [154], [153], [150] \\ $h_{5}:$ [110], [109] \\ $h_{6}:$ [79] \item[208] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{5}:$ [113] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[7/158] \mb{7/158} \begin{gl} \item[177] {\rm Sq(2)[147]} \\ $h_{1}:$ [147] \\ $h_{5}:$ [99] \item[178] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{4}:$ [129], [128] \item[179] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{5}:$ [100] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[6/158] \mb{6/158} \begin{gl} \item[149] {\rm Sq(7,1)[105] + Sq(4,2)[105] + Sq(1,3)[105] + Sq(3,0,1)[105] + Sq(0,1,1)[105]} \\ $h_{7}:$ [13] \item[150] {\rm Sq(3)[108]} \item[151] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{5}:$ [79] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[5/158] \mb{5/158} \begin{gl} \item[111] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{5}:$ [55] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[4/158] \mb{4/158} \begin{gl} \item[75] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \\ $h_{4}:$ [48] \\ $h_{7}:$ [12] \item[76] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{5}:$ [38] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[3/158] \mb{3/158} \begin{gl} \item[51] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{5}:$ [22] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[2/158] \mb{2/158} \begin{gl} \item[27] {\rm Sq(32)[7] + Sq(13,4,1)[7] + Sq(10,5,1)[7] + Sq(7,6,1)[7] + Sq(15,1,2)[7] + Sq(3,5,2)[7] + Sq(0,6,2)[7] + Sq(2,3,3)[7] + Sq(8,3,0,1)[7] + Sq(2,5,0,1)[7] + Sq(4,2,1,1)[7]} \\ $h_{5}:$ [7] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \dm{159} \begin{bdl} \item[80/159] \mb{80/159} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[79/159] \mb{79/159} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[78/159] \mb{78/159} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[77/159] \mb{77/159} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[76/159] \mb{76/159} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[75/159] \mb{75/159} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[74/159] \mb{74/159} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[73/159] \mb{73/159} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[72/159] \mb{72/159} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[71/159] \mb{71/159} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[70/159] \mb{70/159} \begin{gl} \item[11] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[69/159] \mb{69/159} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[68/159] \mb{68/159} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[67/159] \mb{67/159} \begin{gl} \item[14] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[66/159] \mb{66/159} \begin{gl} \item[17] {\rm Sq(0,1)[20]} \item[18] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[65/159] \mb{65/159} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[64/159] \mb{64/159} \begin{gl} \item[22] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[23] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[63/159] \mb{63/159} \begin{gl} \item[20] {\rm Sq(0,1)[20]} \item[21] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[62/159] \mb{62/159} \begin{gl} \item[22] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[61/159] \mb{61/159} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[60/159] \mb{60/159} \begin{gl} \item[28] {\rm Sq(0,1)[25]} \item[29] {\rm Sq(1)[31] + Sq(1)[30] + Sq(1)[29]} \\ $h_{0}:$ [31], [30], [29] \end{gl} \end{bdl} \begin{bdl} \item[59/159] \mb{59/159} \begin{gl} \item[29] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [29] \\ $h_{2}:$ [26] \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [27] \\ $h_{3}:$ [21] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [31], [29] \\ $h_{2}:$ [27], [26] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[58/159] \mb{58/159} \begin{gl} \item[33] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [28] \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[57/159] \mb{57/159} \begin{gl} \item[34] {\rm Sq(0,1)[31]} \item[35] {\rm Sq(0,1)[32]} \item[36] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [30] \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[56/159] \mb{56/159} \begin{gl} \item[34] {\rm Sq(1,1)[33]} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[55/159] \mb{55/159} \begin{gl} \item[37] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [39] \\ $h_{2}:$ [36] \\ $h_{4}:$ [21] \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[54/159] \mb{54/159} \begin{gl} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(0,1)[41]} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[53/159] \mb{53/159} \begin{gl} \item[43] {\rm Sq(0,1)[41]} \item[44] {\rm Sq(3)[41]} \end{gl} \end{bdl} \begin{bdl} \item[51/159] \mb{51/159} \begin{gl} \item[50] {\rm Sq(0,1)[56]} \item[51] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[50/159] \mb{50/159} \begin{gl} \item[58] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[48/159] \mb{48/159} \begin{gl} \item[58] {\rm Sq(0,1)[57]} \item[59] {\rm Sq(0,1)[58]} \item[60] {\rm Sq(2)[60]} \\ $h_{1}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[47/159] \mb{47/159} \begin{gl} \item[61] {\rm Sq(0,1)[64]} \end{gl} \end{bdl} \begin{bdl} \item[45/159] \mb{45/159} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[44/159] \mb{44/159} \begin{gl} \item[74] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[43/159] \mb{43/159} \begin{gl} \item[81] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [85], [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71] \item[82] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{1}:$ [83] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[42/159] \mb{42/159} \begin{gl} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(0,1)[86]} \item[88] {\rm Sq(0,1)[87]} \item[89] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[41/159] \mb{41/159} \begin{gl} \item[88] {\rm Sq(1,1)[86]} \item[89] {\rm Sq(0,1)[88]} \end{gl} \end{bdl} \begin{bdl} \item[40/159] \mb{40/159} \begin{gl} \item[92] {\rm Sq(2)[97]} \\ $h_{1}:$ [97] \item[93] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [93] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[39/159] \mb{39/159} \begin{gl} \item[99] {\rm Sq(0,1)[99]} \item[100] {\rm Sq(0,1)[100]} \item[101] {\rm Sq(0,1)[101]} \item[102] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{2}:$ [96] \\ $h_{4}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[38/159] \mb{38/159} \begin{gl} \item[104] {\rm Sq(0,1)[103]} \item[105] {\rm Sq(0,1)[104]} \item[106] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[36/159] \mb{36/159} \begin{gl} \item[118] {\rm Sq(0,1)[125]} \item[119] {\rm Sq(0,1)[126]} \item[120] {\rm Sq(0,1)[127]} \item[121] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{3}:$ [111], [110] \end{gl} \end{bdl} \begin{bdl} \item[35/159] \mb{35/159} \begin{gl} \item[129] {\rm Sq(0,1)[131]} \item[130] {\rm Sq(0,1)[132]} \item[131] {\rm Sq(0,1)[133]} \item[132] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{1}:$ [138] \item[133] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [118], [117] \end{gl} \end{bdl} \begin{bdl} \item[34/159] \mb{34/159} \begin{gl} \item[139] {\rm Sq(0,1)[132]} \item[140] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [115], [114] \end{gl} \end{bdl} \begin{bdl} \item[33/159] \mb{33/159} \begin{gl} \item[137] {\rm Sq(0,1)[132]} \item[138] {\rm Sq(0,1)[133]} \item[139] {\rm Sq(0,1)[134]} \item[140] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[32/159] \mb{32/159} \begin{gl} \item[137] {\rm Sq(0,1)[137]} \item[138] {\rm Sq(0,1)[138]} \item[139] {\rm Sq(0,1)[139]} \item[140] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[31/159] \mb{31/159} \begin{gl} \item[144] {\rm Sq(0,1)[144]} \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[30/159] \mb{30/159} \begin{gl} \item[150] {\rm Sq(2,1)[138]} \item[151] {\rm Sq(0,1)[145]} \item[152] {\rm Sq(0,1)[146]} \end{gl} \end{bdl} \begin{bdl} \item[29/159] \mb{29/159} \begin{gl} \item[152] {\rm Sq(3)[148] + Sq(0,1)[148]} \item[153] {\rm Sq(0,1)[150] + Sq(0,1)[148]} \item[154] {\rm Sq(3)[151] + Sq(0,1)[149] + Sq(0,1)[148]} \end{gl} \end{bdl} \begin{bdl} \item[27/159] \mb{27/159} \begin{gl} \item[164] {\rm Sq(0,1)[165] + Sq(0,1)[164]} \item[165] {\rm Sq(3)[166] + Sq(0,1)[166] + Sq(0,1)[164]} \item[166] {\rm Sq(2)[170] + Sq(2)[169] + Sq(2)[168]} \\ $h_{1}:$ [170], [169], [168] \end{gl} \end{bdl} \begin{bdl} \item[26/159] \mb{26/159} \begin{gl} \item[172] {\rm Sq(0,1)[169]} \end{gl} \end{bdl} \begin{bdl} \item[25/159] \mb{25/159} \begin{gl} \item[175] {\rm Sq(3)[173] + Sq(0,1)[173] + Sq(3)[172] + Sq(0,1)[172] + Sq(3)[170] + Sq(0,1)[170]} \item[176] {\rm Sq(2)[175] + Sq(2)[174]} \\ $h_{1}:$ [175], [174] \item[177] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{1}:$ [176] \\ $h_{2}:$ [168], [165] \item[178] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{2}:$ [169], [168], [165] \end{gl} \end{bdl} \begin{bdl} \item[24/159] \mb{24/159} \begin{gl} \item[179] {\rm Sq(0,1)[179] + Sq(0,1)[177]} \item[180] {\rm Sq(3)[183] + Sq(0,1)[183] + Sq(3)[181] + Sq(0,1)[181]} \item[181] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{2}:$ [174] \item[182] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{2}:$ [175], [174] \end{gl} \end{bdl} \begin{bdl} \item[23/159] \mb{23/159} \begin{gl} \item[186] {\rm Sq(3,1)[182]} \item[187] {\rm Sq(0,1)[189] + Sq(0,1)[188]} \item[188] {\rm Sq(3)[189]} \item[189] {\rm Sq(0,1)[190]} \end{gl} \end{bdl} \begin{bdl} \item[22/159] \mb{22/159} \begin{gl} \item[198] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \item[199] {\rm Sq(1)[202] + Sq(1)[201]} \\ $h_{0}:$ [202], [201] \\ $h_{1}:$ [198], [197], [196] \\ $h_{2}:$ [190], [189] \\ $h_{3}:$ [180] \\ $h_{4}:$ [154], [152] \\ $h_{5}:$ [109] \\ $h_{6}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[21/159] \mb{21/159} \begin{gl} \item[201] {\rm Sq(3)[191]} \item[202] {\rm Sq(1)[202] + Sq(1)[200]} \\ $h_{0}:$ [202], [200] \\ $h_{3}:$ [181] \\ $h_{4}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[20/159] \mb{20/159} \begin{gl} \item[199] {\rm Sq(0,1)[198]} \item[200] {\rm Sq(3)[199] + Sq(3)[198]} \\ $h_{2}:$ [196] \item[201] {\rm Sq(2)[202]} \\ $h_{1}:$ [202] \\ $h_{2}:$ [196] \item[202] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{2}:$ [196] \\ $h_{3}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[19/159] \mb{19/159} \begin{gl} \item[207] {\rm Sq(0,1)[206]} \item[208] {\rm Sq(2)[210]} \\ $h_{1}:$ [210] \\ $h_{5}:$ [128] \item[209] {\rm Sq(1)[217] + Sq(1)[215] + Sq(1)[214]} \\ $h_{0}:$ [217], [215], [214] \end{gl} \end{bdl} \begin{bdl} \item[18/159] \mb{18/159} \begin{gl} \item[214] {\rm Sq(3,1)[208] + Sq(3,1)[206] + Sq(0,2)[205] + Sq(0,2)[204] + Sq(3,1)[203]} \item[215] {\rm Sq(3)[216] + Sq(0,1)[216] + Sq(0,1)[213]} \item[216] {\rm Sq(2)[218]} \\ $h_{1}:$ [218] \\ $h_{5}:$ [134] \item[217] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \end{gl} \end{bdl} \begin{bdl} \item[17/159] \mb{17/159} \begin{gl} \item[220] {\rm Sq(1,1)[217]} \item[221] {\rm Sq(3)[219] + Sq(0,1)[219]} \item[222] {\rm Sq(1)[226] + Sq(1)[225]} \\ $h_{0}:$ [226], [225] \\ $h_{3}:$ [200], [199] \\ $h_{4}:$ [175] \item[223] {\rm Sq(1)[228] + Sq(1)[225]} \\ $h_{0}:$ [228], [225] \\ $h_{1}:$ [221] \\ $h_{2}:$ [217] \\ $h_{3}:$ [201], [199] \\ $h_{5}:$ [138], [137], [136] \end{gl} \end{bdl} \begin{bdl} \item[16/159] \mb{16/159} \begin{gl} \item[225] {\rm Sq(1,1)[211]} \item[226] {\rm Sq(1,1)[215] + Sq(1,1)[213] + Sq(1,1)[212]} \item[227] {\rm Sq(3)[218] + Sq(0,1)[218]} \\ $h_{7}:$ [3] \item[228] {\rm Sq(1)[226] + Sq(1)[225]} \\ $h_{0}:$ [226], [225] \\ $h_{2}:$ [215], [213], [212], [211] \\ $h_{5}:$ [133], [132], [131], [129] \end{gl} \end{bdl} \begin{bdl} \item[15/159] \mb{15/159} \begin{gl} \item[223] {\rm Sq(2)[230]} \\ $h_{1}:$ [230] \item[224] {\rm Sq(2)[231]} \\ $h_{1}:$ [231] \\ $h_{3}:$ [209], [208], [207] \\ $h_{7}:$ [5] \item[225] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \\ $h_{2}:$ [222], [220] \\ $h_{3}:$ [207] \\ $h_{5}:$ [134], [133], [132] \item[226] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{3}:$ [207] \item[227] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{2}:$ [222], [220] \\ $h_{3}:$ [208] \\ $h_{5}:$ [134], [132] \end{gl} \end{bdl} \begin{bdl} \item[14/159] \mb{14/159} \begin{gl} \item[233] {\rm Sq(0,1)[235] + Sq(3)[234] + Sq(0,1)[234] + Sq(0,1)[233]} \\ $h_{5}:$ [137] \item[234] {\rm Sq(3)[235] + Sq(3)[233] + Sq(0,1)[233]} \item[235] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{5}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[13/159] \mb{13/159} \begin{gl} \item[245] {\rm Sq(1,1)[243]} \end{gl} \end{bdl} \begin{bdl} \item[12/159] \mb{12/159} \begin{gl} \item[257] {\rm Sq(3)[258] + Sq(0,1)[258]} \\ $h_{2}:$ [254] \item[258] {\rm Sq(1)[272]} \\ $h_{0}:$ [272] \\ $h_{2}:$ [254] \item[259] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \\ $h_{1}:$ [264] \\ $h_{2}:$ [254] \end{gl} \end{bdl} \begin{bdl} \item[11/159] \mb{11/159} \begin{gl} \item[272] {\rm Sq(0,1)[257]} \item[273] {\rm Sq(1)[268]} \\ $h_{0}:$ [268] \item[274] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \item[275] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \\ $h_{3}:$ [240], [239] \end{gl} \end{bdl} \begin{bdl} \item[10/159] \mb{10/159} \begin{gl} \item[267] {\rm Sq(4)[230] + Sq(1,1)[230]} \\ $h_{2}:$ [230] \\ $h_{5}:$ [142] \\ $h_{6}:$ [80] \item[268] {\rm Sq(1,1)[232]} \item[269] {\rm Sq(1,1)[233]} \item[270] {\rm Sq(3)[235]} \\ $h_{3}:$ [218] \item[271] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{1}:$ [239] \\ $h_{2}:$ [233] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[9/159] \mb{9/159} \begin{gl} \item[243] {\rm Sq(3)[202] + Sq(0,1)[202]} \\ $h_{2}:$ [198] \\ $h_{4}:$ [176] \item[244] {\rm Sq(2)[204]} \\ $h_{1}:$ [204] \\ $h_{2}:$ [198], [197] \item[245] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{2}:$ [199], [197] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[8/159] \mb{8/159} \begin{gl} \item[209] {\rm Sq(0,1)[176]} \\ $h_{7}:$ [10] \item[210] {\rm Sq(1)[183] + Sq(1)[182]} \\ $h_{0}:$ [183], [182] \\ $h_{1}:$ [177] \\ $h_{2}:$ [172] \\ $h_{5}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[7/159] \mb{7/159} \begin{gl} \item[180] {\rm Sq(5)[144] + Sq(2,1)[144]} \\ $h_{4}:$ [130] \\ $h_{5}:$ [101] \item[181] {\rm Sq(3)[148] + Sq(0,1)[148]} \\ $h_{7}:$ [12] \item[182] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{1}:$ [150] \\ $h_{2}:$ [146] \\ $h_{5}:$ [103], [102] \item[183] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{1}:$ [150] \\ $h_{5}:$ [104], [102], [101] \end{gl} \end{bdl} \begin{bdl} \item[6/159] \mb{6/159} \begin{gl} \item[152] {\rm Sq(4)[108]} \\ $h_{2}:$ [108] \item[153] {\rm Sq(3)[109]} \\ $h_{5}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[5/159] \mb{5/159} \begin{gl} \item[112] {\rm Sq(6,2)[73]} \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[3/159] \mb{3/159} \begin{gl} \item[52] {\rm Sq(2)[27]} \\ $h_{1}:$ [27] \\ $h_{5}:$ [23] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \dm{160} \begin{bdl} \item[79/160] \mb{79/160} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[78/160] \mb{78/160} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[73/160] \mb{73/160} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[72/160] \mb{72/160} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[71/160] \mb{71/160} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[70/160] \mb{70/160} \begin{gl} \item[12] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[68/160] \mb{68/160} \begin{gl} \item[16] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[65/160] \mb{65/160} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[64/160] \mb{64/160} \begin{gl} \item[24] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[63/160] \mb{63/160} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[62/160] \mb{62/160} \begin{gl} \item[23] {\rm Sq(0,1)[25]} \item[24] {\rm Sq(3)[26] + Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[59/160] \mb{59/160} \begin{gl} \item[32] {\rm Sq(0,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[57/160] \mb{57/160} \begin{gl} \item[38] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{1}:$ [34] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[56/160] \mb{56/160} \begin{gl} \item[36] {\rm Sq(0,1)[35]} \item[37] {\rm Sq(3)[36] + Sq(0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[55/160] \mb{55/160} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [40] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[54/160] \mb{54/160} \begin{gl} \item[43] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [40] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[53/160] \mb{53/160} \begin{gl} \item[45] {\rm Sq(0,1)[43]} \item[46] {\rm Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[52/160] \mb{52/160} \begin{gl} \item[45] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[50/160] \mb{50/160} \begin{gl} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[49/160] \mb{49/160} \begin{gl} \item[61] {\rm Sq(0,1)[57]} \item[62] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{1}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[48/160] \mb{48/160} \begin{gl} \item[61] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[47/160] \mb{47/160} \begin{gl} \item[62] {\rm Sq(0,1)[66]} \item[63] {\rm Sq(0,1)[67]} \item[64] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[46/160] \mb{46/160} \begin{gl} \item[68] {\rm Sq(1,1)[68]} \item[69] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[45/160] \mb{45/160} \begin{gl} \item[74] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[44/160] \mb{44/160} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(0,1)[78]} \item[77] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[43/160] \mb{43/160} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \end{gl} \end{bdl} \begin{bdl} \item[41/160] \mb{41/160} \begin{gl} \item[90] {\rm Sq(0,1)[89]} \item[91] {\rm Sq(0,1)[90]} \item[92] {\rm Sq(0,1)[91]} \item[93] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{1}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[40/160] \mb{40/160} \begin{gl} \item[94] {\rm Sq(0,1)[97]} \item[95] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[39/160] \mb{39/160} \begin{gl} \item[103] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{1}:$ [104] \\ $h_{2}:$ [102] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[38/160] \mb{38/160} \begin{gl} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(0,1)[109]} \item[110] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{2}:$ [103] \end{gl} \end{bdl} \begin{bdl} \item[37/160] \mb{37/160} \begin{gl} \item[111] {\rm Sq(0,1)[115]} \item[112] {\rm Sq(0,1)[116]} \item[113] {\rm Sq(0,1)[117]} \end{gl} \end{bdl} \begin{bdl} \item[35/160] \mb{35/160} \begin{gl} \item[134] {\rm Sq(0,1)[135]} \item[135] {\rm Sq(0,1)[136]} \item[136] {\rm Sq(0,1)[137]} \item[137] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{1}:$ [139] \\ $h_{3}:$ [119] \\ $h_{4}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[34/160] \mb{34/160} \begin{gl} \item[141] {\rm Sq(0,1)[134]} \item[142] {\rm Sq(0,1)[135]} \item[143] {\rm Sq(0,1)[136]} \item[144] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{3}:$ [120] \end{gl} \end{bdl} \begin{bdl} \item[33/160] \mb{33/160} \begin{gl} \item[141] {\rm Sq(0,1)[136]} \item[142] {\rm Sq(1)[144] + Sq(1)[141]} \\ $h_{0}:$ [144], [141] \\ $h_{3}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[32/160] \mb{32/160} \begin{gl} \item[141] {\rm Sq(1,1)[137]} \item[142] {\rm Sq(0,1)[142]} \item[143] {\rm Sq(0,1)[143]} \item[144] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{3}:$ [124] \end{gl} \end{bdl} \begin{bdl} \item[31/160] \mb{31/160} \begin{gl} \item[146] {\rm Sq(0,1)[147]} \item[147] {\rm Sq(0,1)[148]} \item[148] {\rm Sq(0,1)[149]} \item[149] {\rm Sq(2)[150]} \\ $h_{1}:$ [150] \item[150] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[30/160] \mb{30/160} \begin{gl} \item[153] {\rm Sq(0,1)[149]} \item[154] {\rm Sq(1)[157] + Sq(1)[155]} \\ $h_{0}:$ [157], [155] \item[155] {\rm Sq(1)[158] + Sq(1)[156] + Sq(1)[155]} \\ $h_{0}:$ [158], [156], [155] \\ $h_{2}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[29/160] \mb{29/160} \begin{gl} \item[155] {\rm Sq(1,1)[149] + Sq(1,1)[148]} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(3)[154] + Sq(3)[153]} \item[158] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[28/160] \mb{28/160} \begin{gl} \item[156] {\rm Sq(0,1)[162]} \item[157] {\rm Sq(3)[162] + Sq(0,1)[161]} \item[158] {\rm Sq(0,1)[163] + Sq(0,1)[161]} \end{gl} \end{bdl} \begin{bdl} \item[26/160] \mb{26/160} \begin{gl} \item[173] {\rm Sq(0,1)[171]} \item[174] {\rm Sq(0,1)[172]} \item[175] {\rm Sq(3)[173] + Sq(0,1)[173]} \item[176] {\rm Sq(3)[174] + Sq(0,1)[174]} \item[177] {\rm Sq(2)[175]} \\ $h_{1}:$ [175] \item[178] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{1}:$ [176] \\ $h_{3}:$ [158], [157] \end{gl} \end{bdl} \begin{bdl} \item[25/160] \mb{25/160} \begin{gl} \item[179] {\rm Sq(0,1)[177]} \item[180] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{3}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[24/160] \mb{24/160} \begin{gl} \item[183] {\rm Sq(1,1)[181] + Sq(1,1)[178]} \\ $h_{3}:$ [168] \item[184] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{1}:$ [188] \\ $h_{2}:$ [178], [177] \item[185] {\rm Sq(1)[192] + Sq(1)[190]} \\ $h_{0}:$ [192], [190] \\ $h_{1}:$ [189], [186] \\ $h_{2}:$ [181], [177] \\ $h_{3}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[23/160] \mb{23/160} \begin{gl} \item[190] {\rm Sq(1,1)[190] + Sq(1,1)[189] + Sq(1,1)[188]} \item[191] {\rm Sq(1,1)[191] + Sq(1,1)[189]} \item[192] {\rm Sq(1,1)[192] + Sq(4)[190] + Sq(1,1)[189] + Sq(1,1)[188]} \\ $h_{2}:$ [190] \item[193] {\rm Sq(0,1)[194]} \end{gl} \end{bdl} \begin{bdl} \item[22/160] \mb{22/160} \begin{gl} \item[200] {\rm Sq(0,1)[196] + Sq(0,1)[195]} \item[201] {\rm Sq(3)[198] + Sq(3)[197] + Sq(3)[196] + Sq(3)[195]} \end{gl} \end{bdl} \begin{bdl} \item[21/160] \mb{21/160} \begin{gl} \item[203] {\rm Sq(4)[191]} \\ $h_{2}:$ [191] \item[204] {\rm Sq(2)[201] + Sq(2)[200] + Sq(2)[199]} \\ $h_{1}:$ [201], [200], [199] \\ $h_{3}:$ [183] \\ $h_{4}:$ [162] \\ $h_{5}:$ [117] \\ $h_{6}:$ [47] \item[205] {\rm Sq(1)[205] + Sq(1)[203]} \\ $h_{0}:$ [205], [203] \\ $h_{2}:$ [192] \item[206] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{1}:$ [199] \\ $h_{2}:$ [193], [192] \\ $h_{3}:$ [184] \\ $h_{4}:$ [162] \\ $h_{5}:$ [117] \\ $h_{6}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[20/160] \mb{20/160} \begin{gl} \item[203] {\rm Sq(3)[202] + Sq(0,1)[202] + Sq(0,1)[201]} \item[204] {\rm Sq(2)[208]} \\ $h_{1}:$ [208] \\ $h_{5}:$ [124] \item[205] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \item[206] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{2}:$ [199] \\ $h_{3}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[19/160] \mb{19/160} \begin{gl} \item[210] {\rm Sq(1,1)[207]} \item[211] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{2}:$ [207], [206] \item[212] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{3}:$ [197], [194] \end{gl} \end{bdl} \begin{bdl} \item[18/160] \mb{18/160} \begin{gl} \item[218] {\rm Sq(2,1)[212]} \item[219] {\rm Sq(3)[219] + Sq(0,1)[219]} \\ $h_{7}:$ [1] \item[220] {\rm Sq(2)[221]} \\ $h_{1}:$ [221] \item[221] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \\ $h_{3}:$ [201] \end{gl} \end{bdl} \begin{bdl} \item[17/160] \mb{17/160} \begin{gl} \item[224] {\rm Sq(0,1)[220]} \item[225] {\rm Sq(2)[227] + Sq(2)[226] + Sq(2)[225]} \\ $h_{1}:$ [227], [226], [225] \\ $h_{7}:$ [2] \item[226] {\rm Sq(1)[231] + Sq(1)[230]} \\ $h_{0}:$ [231], [230] \end{gl} \end{bdl} \begin{bdl} \item[16/160] \mb{16/160} \begin{gl} \item[229] {\rm Sq(1,1)[218]} \item[230] {\rm Sq(1)[230] + Sq(1)[229]} \\ $h_{0}:$ [230], [229] \item[231] {\rm Sq(1)[231] + Sq(1)[229]} \\ $h_{0}:$ [231], [229] \item[232] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{3}:$ [200] \\ $h_{4}:$ [179] \item[233] {\rm Sq(1)[234] + Sq(1)[233] + Sq(1)[229] + Sq(1)[228]} \\ $h_{0}:$ [234], [233], [229], [228] \\ $h_{1}:$ [224] \\ $h_{2}:$ [218] \\ $h_{3}:$ [203] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[15/160] \mb{15/160} \begin{gl} \item[228] {\rm Sq(1,1)[223]} \item[229] {\rm Sq(1,1)[226]} \item[230] {\rm Sq(1,1)[229] + Sq(1,1)[228] + Sq(1,1)[224]} \item[231] {\rm Sq(3)[230]} \item[232] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \item[233] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{1}:$ [234], [233] \\ $h_{5}:$ [139] \item[234] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{1}:$ [234], [233] \\ $h_{2}:$ [226], [223] \\ $h_{5}:$ [139] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[14/160] \mb{14/160} \begin{gl} \item[236] {\rm Sq(1,1)[235] + Sq(1,1)[234] + Sq(1,1)[233]} \item[237] {\rm Sq(1)[246]} \\ $h_{0}:$ [246] \\ $h_{5}:$ [140] \item[238] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{2}:$ [233] \\ $h_{5}:$ [140] \\ $h_{7}:$ [6] \item[239] {\rm Sq(1)[250] + Sq(1)[248]} \\ $h_{0}:$ [250], [248] \\ $h_{1}:$ [245] \\ $h_{2}:$ [233] \\ $h_{3}:$ [221] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[13/160] \mb{13/160} \begin{gl} \item[246] {\rm Sq(1,1)[249]} \item[247] {\rm Sq(1,1)[250]} \\ $h_{7}:$ [5] \item[248] {\rm Sq(0,1)[252] + Sq(3)[251] + Sq(0,1)[251]} \\ $h_{5}:$ [142] \\ $h_{6}:$ [66] \item[249] {\rm Sq(3)[254] + Sq(3)[252]} \\ $h_{6}:$ [67] \item[250] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{3}:$ [232] \\ $h_{5}:$ [142] \\ $h_{6}:$ [66] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[12/160] \mb{12/160} \begin{gl} \item[260] {\rm Sq(1,1)[258]} \item[261] {\rm Sq(1)[278] + Sq(1)[277]} \\ $h_{0}:$ [278], [277] \\ $h_{2}:$ [262] \\ $h_{4}:$ [215] \\ $h_{5}:$ [152], [151], [148], [147] \end{gl} \end{bdl} \begin{bdl} \item[11/160] \mb{11/160} \begin{gl} \item[276] {\rm Sq(2)[269]} \\ $h_{1}:$ [269] \\ $h_{5}:$ [152] \item[277] {\rm Sq(1)[273] + Sq(1)[272]} \\ $h_{0}:$ [273], [272] \\ $h_{2}:$ [257] \\ $h_{5}:$ [153], [152] \item[278] {\rm Sq(1)[275] + Sq(1)[272]} \\ $h_{0}:$ [275], [272] \end{gl} \end{bdl} \begin{bdl} \item[10/160] \mb{10/160} \begin{gl} \item[272] {\rm Sq(5)[232] + Sq(2,1)[232]} \item[273] {\rm Sq(3)[238]} \\ $h_{5}:$ [146] \item[274] {\rm Sq(0,1)[239] + Sq(0,1)[238]} \\ $h_{5}:$ [146] \item[275] {\rm Sq(3)[239]} \end{gl} \end{bdl} \begin{bdl} \item[9/160] \mb{9/160} \begin{gl} \item[246] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{2}:$ [202] \\ $h_{3}:$ [192] \\ $h_{4}:$ [179] \\ $h_{6}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[8/160] \mb{8/160} \begin{gl} \item[211] {\rm Sq(4)[173]} \\ $h_{2}:$ [173] \\ $h_{5}:$ [117] \item[212] {\rm Sq(4)[175] + Sq(1,1)[173]} \\ $h_{2}:$ [175] \\ $h_{6}:$ [81] \item[213] {\rm Sq(3)[177]} \\ $h_{2}:$ [174] \\ $h_{6}:$ [82] \item[214] {\rm Sq(2)[181]} \\ $h_{1}:$ [181] \\ $h_{2}:$ [176], [174] \\ $h_{6}:$ [82] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[6/160] \mb{6/160} \begin{gl} \item[154] {\rm Sq(4)[109]} \\ $h_{2}:$ [109] \\ $h_{5}:$ [82] \item[155] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{1}:$ [112] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[5/160] \mb{5/160} \begin{gl} \item[113] {\rm Sq(3)[75]} \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[4/160] \mb{4/160} \begin{gl} \item[77] {\rm Sq(2)[52]} \\ $h_{1}:$ [52] \\ $h_{5}:$ [40] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \dm{161} \begin{bdl} \item[81/161] \mb{81/161} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[80/161] \mb{80/161} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[79/161] \mb{79/161} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[78/161] \mb{78/161} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[77/161] \mb{77/161} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[76/161] \mb{76/161} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[71/161] \mb{71/161} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[70/161] \mb{70/161} \begin{gl} \item[13] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[67/161] \mb{67/161} \begin{gl} \item[15] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[64/161] \mb{64/161} \begin{gl} \item[25] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[63/161] \mb{63/161} \begin{gl} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[62/161] \mb{62/161} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[61/161] \mb{61/161} \begin{gl} \item[28] {\rm Sq(1,1)[26]} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[60/161] \mb{60/161} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[59/161] \mb{59/161} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[58/161] \mb{58/161} \begin{gl} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[55/161] \mb{55/161} \begin{gl} \item[40] {\rm Sq(0,1)[41]} \item[41] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [43] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[54/161] \mb{54/161} \begin{gl} \item[45] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[52/161] \mb{52/161} \begin{gl} \item[46] {\rm Sq(0,1)[50]} \item[47] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[51/161] \mb{51/161} \begin{gl} \item[52] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[49/161] \mb{49/161} \begin{gl} \item[63] {\rm Sq(0,1)[58]} \item[64] {\rm Sq(0,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[48/161] \mb{48/161} \begin{gl} \item[62] {\rm Sq(0,1)[61]} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[47/161] \mb{47/161} \begin{gl} \item[65] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{1}:$ [68] \item[66] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[46/161] \mb{46/161} \begin{gl} \item[70] {\rm Sq(1,1)[71]} \item[71] {\rm Sq(0,1)[72]} \item[72] {\rm Sq(0,1)[73]} \item[73] {\rm Sq(1)[77] + Sq(1)[76]} \\ $h_{0}:$ [77], [76] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[45/161] \mb{45/161} \begin{gl} \item[75] {\rm Sq(0,1)[74]} \item[76] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [75] \\ $h_{2}:$ [72] \item[77] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [75] \\ $h_{2}:$ [72] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[44/161] \mb{44/161} \begin{gl} \item[78] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [77] \item[79] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [77] \item[80] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [80], [77] \end{gl} \end{bdl} \begin{bdl} \item[43/161] \mb{43/161} \begin{gl} \item[84] {\rm Sq(0,1)[86]} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \item[88] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[42/161] \mb{42/161} \begin{gl} \item[90] {\rm Sq(2,1)[85]} \item[91] {\rm Sq(0,1)[88]} \item[92] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[40/161] \mb{40/161} \begin{gl} \item[96] {\rm Sq(0,1)[99]} \item[97] {\rm Sq(0,1)[100]} \item[98] {\rm Sq(0,1)[101]} \end{gl} \end{bdl} \begin{bdl} \item[39/161] \mb{39/161} \begin{gl} \item[104] {\rm Sq(0,1)[105]} \item[105] {\rm Sq(0,1)[106]} \end{gl} \end{bdl} \begin{bdl} \item[37/161] \mb{37/161} \begin{gl} \item[114] {\rm Sq(0,1)[118]} \item[115] {\rm Sq(0,1)[119]} \item[116] {\rm Sq(0,1)[120]} \item[117] {\rm Sq(3)[121] + Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[36/161] \mb{36/161} \begin{gl} \item[122] {\rm Sq(0,1)[129]} \item[123] {\rm Sq(0,1)[130]} \item[124] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[34/161] \mb{34/161} \begin{gl} \item[145] {\rm Sq(0,1)[138] + Sq(0,1)[137]} \item[146] {\rm Sq(0,1)[139] + Sq(0,1)[137]} \item[147] {\rm Sq(3)[140] + Sq(0,1)[140] + Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[33/161] \mb{33/161} \begin{gl} \item[143] {\rm Sq(0,1)[138] + Sq(0,1)[137]} \item[144] {\rm Sq(0,1)[139] + Sq(0,1)[137]} \item[145] {\rm Sq(3)[140] + Sq(0,1)[140] + Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[32/161] \mb{32/161} \begin{gl} \item[145] {\rm Sq(3)[145] + Sq(0,1)[145] + Sq(0,1)[144]} \item[146] {\rm Sq(2)[149]} \\ $h_{1}:$ [149] \item[147] {\rm Sq(1)[154] + Sq(1)[151]} \\ $h_{0}:$ [154], [151] \\ $h_{3}:$ [128] \end{gl} \end{bdl} \begin{bdl} \item[31/161] \mb{31/161} \begin{gl} \item[151] {\rm Sq(0,1)[150]} \item[152] {\rm Sq(0,1)[151]} \item[153] {\rm Sq(0,1)[152] + Sq(3)[150]} \item[154] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{3}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[30/161] \mb{30/161} \begin{gl} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(0,1)[154]} \item[158] {\rm Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [161], [160] \\ $h_{3}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[29/161] \mb{29/161} \begin{gl} \item[159] {\rm Sq(2,1)[150] + Sq(2,1)[148]} \item[160] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{1}:$ [156] \\ $h_{2}:$ [155], [154] \item[161] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{1}:$ [156] \\ $h_{2}:$ [155], [154] \\ $h_{3}:$ [139], [138] \end{gl} \end{bdl} \begin{bdl} \item[28/161] \mb{28/161} \begin{gl} \item[159] {\rm Sq(0,1)[164]} \item[160] {\rm Sq(0,1)[165]} \item[161] {\rm Sq(3)[166] + Sq(3)[165] + Sq(3)[164]} \item[162] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{2}:$ [162] \item[163] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{2}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[27/161] \mb{27/161} \begin{gl} \item[167] {\rm Sq(1,1)[171] + Sq(1,1)[168]} \item[168] {\rm Sq(0,1)[172]} \item[169] {\rm Sq(2)[176]} \\ $h_{1}:$ [176] \item[170] {\rm Sq(1)[180] + Sq(1)[179]} \\ $h_{0}:$ [180], [179] \end{gl} \end{bdl} \begin{bdl} \item[26/161] \mb{26/161} \begin{gl} \item[179] {\rm Sq(1,1)[173] + Sq(1,1)[171]} \item[180] {\rm Sq(3)[175]} \item[181] {\rm Sq(1)[185] + Sq(1)[184] + Sq(1)[183]} \\ $h_{0}:$ [185], [184], [183] \\ $h_{2}:$ [173] \\ $h_{5}:$ [95] \\ $h_{6}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[25/161] \mb{25/161} \begin{gl} \item[181] {\rm Sq(1,1)[177] + Sq(1,1)[176] + Sq(1,1)[175] + Sq(1,1)[174]} \item[182] {\rm Sq(0,1)[179]} \item[183] {\rm Sq(3)[181] + Sq(0,1)[181] + Sq(0,1)[180]} \item[184] {\rm Sq(3)[182] + Sq(0,1)[182] + Sq(0,1)[180]} \\ $h_{2}:$ [176], [174] \item[185] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{2}:$ [174] \item[186] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [183] \\ $h_{2}:$ [176], [175] \\ $h_{3}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[24/161] \mb{24/161} \begin{gl} \item[186] {\rm Sq(0,1)[187] + Sq(0,1)[186]} \item[187] {\rm Sq(3)[188]} \item[188] {\rm Sq(3)[189]} \item[189] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [172] \end{gl} \end{bdl} \begin{bdl} \item[23/161] \mb{23/161} \begin{gl} \item[194] {\rm Sq(3)[198]} \item[195] {\rm Sq(2)[201]} \\ $h_{1}:$ [201] \\ $h_{2}:$ [195], [194] \\ $h_{4}:$ [156] \\ $h_{5}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[22/161] \mb{22/161} \begin{gl} \item[202] {\rm Sq(1,1)[200] + Sq(1,1)[197] + Sq(4)[195]} \\ $h_{2}:$ [195] \item[203] {\rm Sq(3)[202] + Sq(0,1)[202] + Sq(3)[201] + Sq(0,1)[201]} \\ $h_{2}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[21/161] \mb{21/161} \begin{gl} \item[207] {\rm Sq(0,1)[199]} \item[208] {\rm Sq(3)[201] + Sq(3)[200]} \end{gl} \end{bdl} \begin{bdl} \item[20/161] \mb{20/161} \begin{gl} \item[207] {\rm Sq(3)[208]} \item[208] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{1}:$ [210] \\ $h_{2}:$ [203], [201] \\ $h_{5}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[19/161] \mb{19/161} \begin{gl} \item[213] {\rm Sq(2)[218]} \\ $h_{1}:$ [218] \\ $h_{2}:$ [211] \\ $h_{5}:$ [132] \item[214] {\rm Sq(2)[219]} \\ $h_{1}:$ [219] \\ $h_{7}:$ [1] \item[215] {\rm Sq(2)[220]} \\ $h_{1}:$ [220] \\ $h_{3}:$ [200], [198] \item[216] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{2}:$ [210] \\ $h_{5}:$ [132] \item[217] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{2}:$ [213], [210] \\ $h_{3}:$ [202] \\ $h_{5}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[18/161] \mb{18/161} \begin{gl} \item[222] {\rm Sq(1,1)[218]} \item[223] {\rm Sq(1)[229] + Sq(1)[228] + Sq(1)[227]} \\ $h_{0}:$ [229], [228], [227] \\ $h_{3}:$ [206], [205] \end{gl} \end{bdl} \begin{bdl} \item[17/161] \mb{17/161} \begin{gl} \item[227] {\rm Sq(0,1)[226]} \\ $h_{3}:$ [205] \item[228] {\rm Sq(3)[226] + Sq(3)[225] + Sq(0,1)[225]} \item[229] {\rm Sq(3)[228] + Sq(0,1)[228] + Sq(3)[225] + Sq(0,1)[225]} \item[230] {\rm Sq(1)[236] + Sq(1)[234]} \\ $h_{0}:$ [236], [234] \\ $h_{1}:$ [229] \end{gl} \end{bdl} \begin{bdl} \item[16/161] \mb{16/161} \begin{gl} \item[234] {\rm Sq(3)[227] + Sq(0,1)[227] + Sq(3)[226] + Sq(0,1)[226] + Sq(3)[225] + Sq(0,1)[225] + Sq(3)[223]} \\ $h_{3}:$ [205] \item[235] {\rm Sq(2)[231] + Sq(2)[230]} \\ $h_{1}:$ [231], [230] \item[236] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{3}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[15/161] \mb{15/161} \begin{gl} \item[235] {\rm Sq(3)[235] + Sq(0,1)[235]} \item[236] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{3}:$ [214] \item[237] {\rm Sq(1)[243] + Sq(1)[241]} \\ $h_{0}:$ [243], [241] \\ $h_{1}:$ [236] \\ $h_{3}:$ [214], [213], [212], [210] \item[238] {\rm Sq(1)[244] + Sq(1)[242]} \\ $h_{0}:$ [244], [242] \\ $h_{1}:$ [236] \\ $h_{3}:$ [214], [210] \end{gl} \end{bdl} \begin{bdl} \item[14/161] \mb{14/161} \begin{gl} \item[240] {\rm Sq(1,1)[241]} \\ $h_{3}:$ [223] \item[241] {\rm Sq(1,1)[242] + Sq(1,1)[240]} \\ $h_{3}:$ [222] \item[242] {\rm Sq(0,1)[245]} \\ $h_{2}:$ [239] \item[243] {\rm Sq(3)[245]} \\ $h_{3}:$ [223] \item[244] {\rm Sq(1)[252] + Sq(1)[251]} \\ $h_{0}:$ [252], [251] \\ $h_{2}:$ [239] \\ $h_{3}:$ [223] \item[245] {\rm Sq(1)[253] + Sq(1)[251]} \\ $h_{0}:$ [253], [251] \\ $h_{1}:$ [247], [246] \\ $h_{2}:$ [239] \\ $h_{3}:$ [223] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[13/161] \mb{13/161} \begin{gl} \item[251] {\rm Sq(1,1)[251]} \item[252] {\rm Sq(1,1)[253]} \item[253] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{7}:$ [6] \item[254] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{1}:$ [260] \\ $h_{3}:$ [233] \\ $h_{7}:$ [6] \item[255] {\rm Sq(1)[265] + Sq(1)[264]} \\ $h_{0}:$ [265], [264] \\ $h_{1}:$ [260] \\ $h_{2}:$ [252] \\ $h_{3}:$ [233] \\ $h_{5}:$ [146], [145] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[12/161] \mb{12/161} \begin{gl} \item[262] {\rm Sq(1,1)[269] + Sq(1,1)[267] + Sq(1,1)[266] + Sq(1,1)[265] + Sq(1,1)[264]} \\ $h_{7}:$ [7] \item[263] {\rm Sq(3)[272]} \\ $h_{3}:$ [247], [246] \\ $h_{7}:$ [7] \item[264] {\rm Sq(1)[279]} \\ $h_{0}:$ [279] \\ $h_{3}:$ [246] \\ $h_{7}:$ [7] \item[265] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{3}:$ [247] \item[266] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \\ $h_{1}:$ [276] \\ $h_{2}:$ [267], [265] \\ $h_{3}:$ [247], [246] \\ $h_{4}:$ [219] \\ $h_{5}:$ [154], [153] \\ $h_{6}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[11/161] \mb{11/161} \begin{gl} \item[279] {\rm Sq(0,1)[268]} \item[280] {\rm Sq(3)[269] + Sq(0,1)[269] + Sq(3)[268]} \item[281] {\rm Sq(3)[270] + Sq(0,1)[270] + Sq(0,1)[269]} \\ $h_{2}:$ [262] \item[282] {\rm Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [277], [276] \\ $h_{1}:$ [275], [273] \\ $h_{2}:$ [264], [263], [262] \\ $h_{5}:$ [159], [158] \item[283] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{2}:$ [264] \\ $h_{4}:$ [222] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[10/161] \mb{10/161} \begin{gl} \item[276] {\rm Sq(1,1)[241]} \\ $h_{3}:$ [222] \\ $h_{5}:$ [149] \\ $h_{6}:$ [84] \item[277] {\rm Sq(1)[249] + Sq(1)[247]} \\ $h_{0}:$ [249], [247] \\ $h_{2}:$ [239], [238] \\ $h_{3}:$ [222] \\ $h_{5}:$ [151] \\ $h_{6}:$ [84] \item[278] {\rm Sq(1)[250] + Sq(1)[247]} \\ $h_{0}:$ [250], [247] \\ $h_{2}:$ [239] \\ $h_{7}:$ [14] \item[279] {\rm Sq(1)[251] + Sq(1)[247]} \\ $h_{0}:$ [251], [247] \\ $h_{3}:$ [224], [222] \\ $h_{4}:$ [208] \\ $h_{5}:$ [149] \\ $h_{6}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[9/161] \mb{9/161} \begin{gl} \item[247] {\rm Sq(3,1)[198] + Sq(6)[197] + Sq(3,1)[197] + Sq(0,2)[197]} \item[248] {\rm Sq(1,1)[207] + Sq(1,1)[205] + Sq(1,1)[204]} \item[249] {\rm Sq(1,1)[208]} \\ $h_{5}:$ [133] \item[250] {\rm Sq(0,1)[209]} \\ $h_{7}:$ [13] \item[251] {\rm Sq(1)[216] + Sq(1)[215]} \\ $h_{0}:$ [216], [215] \\ $h_{3}:$ [194] \\ $h_{4}:$ [183], [180] \end{gl} \end{bdl} \begin{bdl} \item[8/161] \mb{8/161} \begin{gl} \item[215] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{4}:$ [157] \item[216] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[7/161] \mb{7/161} \begin{gl} \item[184] {\rm Sq(5,1)[143] + Sq(1,0,1)[143]} \item[185] {\rm Sq(2,1)[147]} \item[186] {\rm Sq(4)[150] + Sq(4)[149]} \\ $h_{2}:$ [150], [149] \\ $h_{7}:$ [13] \item[187] {\rm Sq(3)[152] + Sq(0,1)[152]} \\ $h_{2}:$ [149] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[5/161] \mb{5/161} \begin{gl} \item[114] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [77] \\ $h_{2}:$ [76] \\ $h_{5}:$ [58] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[4/161] \mb{4/161} \begin{gl} \item[78] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \\ $h_{2}:$ [51] \\ $h_{5}:$ [41] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[3/161] \mb{3/161} \begin{gl} \item[53] {\rm Sq(4)[27]} \\ $h_{2}:$ [27] \\ $h_{5}:$ [24] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \dm{162} \begin{bdl} \item[82/162] \mb{82/162} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[77/162] \mb{77/162} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[76/162] \mb{76/162} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[75/162] \mb{75/162} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[74/162] \mb{74/162} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[73/162] \mb{73/162} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[72/162] \mb{72/162} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[69/162] \mb{69/162} \begin{gl} \item[17] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[66/162] \mb{66/162} \begin{gl} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[63/162] \mb{63/162} \begin{gl} \item[24] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[60/162] \mb{60/162} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[59/162] \mb{59/162} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[58/162] \mb{58/162} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [34] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[57/162] \mb{57/162} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[56/162] \mb{56/162} \begin{gl} \item[38] {\rm Sq(1,1)[38] + Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[54/162] \mb{54/162} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[53/162] \mb{53/162} \begin{gl} \item[47] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[51/162] \mb{51/162} \begin{gl} \item[53] {\rm Sq(0,1)[59]} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[50/162] \mb{50/162} \begin{gl} \item[61] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[48/162] \mb{48/162} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[47/162] \mb{47/162} \begin{gl} \item[67] {\rm Sq(0,1)[69]} \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{1}:$ [70] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[46/162] \mb{46/162} \begin{gl} \item[74] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[45/162] \mb{45/162} \begin{gl} \item[78] {\rm Sq(0,1)[76]} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[44/162] \mb{44/162} \begin{gl} \item[81] {\rm Sq(0,1)[83]} \item[82] {\rm Sq(1)[91] + Sq(1)[90]} \\ $h_{0}:$ [91], [90] \\ $h_{3}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[43/162] \mb{43/162} \begin{gl} \item[89] {\rm Sq(2)[90]} \\ $h_{1}:$ [90] \item[90] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{1}:$ [91] \\ $h_{2}:$ [89] \item[91] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{1}:$ [91] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[42/162] \mb{42/162} \begin{gl} \item[93] {\rm Sq(0,1)[90]} \item[94] {\rm Sq(0,1)[91]} \item[95] {\rm Sq(0,1)[92]} \item[96] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [88] \item[97] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[41/162] \mb{41/162} \begin{gl} \item[94] {\rm Sq(1,1)[93]} \item[95] {\rm Sq(0,1)[94]} \item[96] {\rm Sq(0,1)[95]} \end{gl} \end{bdl} \begin{bdl} \item[39/162] \mb{39/162} \begin{gl} \item[106] {\rm Sq(0,1)[107]} \item[107] {\rm Sq(0,1)[108]} \item[108] {\rm Sq(0,1)[109]} \end{gl} \end{bdl} \begin{bdl} \item[38/162] \mb{38/162} \begin{gl} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(0,1)[113]} \item[114] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[36/162] \mb{36/162} \begin{gl} \item[125] {\rm Sq(0,1)[134]} \item[126] {\rm Sq(0,1)[135]} \item[127] {\rm Sq(0,1)[136]} \end{gl} \end{bdl} \begin{bdl} \item[35/162] \mb{35/162} \begin{gl} \item[138] {\rm Sq(0,1)[141]} \item[139] {\rm Sq(0,1)[142]} \item[140] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[34/162] \mb{34/162} \begin{gl} \item[148] {\rm Sq(0,1)[141]} \end{gl} \end{bdl} \begin{bdl} \item[33/162] \mb{33/162} \begin{gl} \item[146] {\rm Sq(0,1)[141]} \item[147] {\rm Sq(0,1)[142]} \item[148] {\rm Sq(0,1)[143]} \item[149] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146], [145] \\ $h_{2}:$ [140] \\ $h_{3}:$ [125], [124] \end{gl} \end{bdl} \begin{bdl} \item[32/162] \mb{32/162} \begin{gl} \item[148] {\rm Sq(0,1)[146]} \item[149] {\rm Sq(0,1)[148]} \item[150] {\rm Sq(3)[149] + Sq(0,1)[147]} \item[151] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [145] \\ $h_{3}:$ [132], [129] \end{gl} \end{bdl} \begin{bdl} \item[31/162] \mb{31/162} \begin{gl} \item[155] {\rm Sq(3)[154] + Sq(0,1)[154] + Sq(0,1)[153]} \item[156] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [150] \\ $h_{3}:$ [136] \item[157] {\rm Sq(1)[163] + Sq(1)[159]} \\ $h_{0}:$ [163], [159] \\ $h_{2}:$ [150] \\ $h_{3}:$ [137], [136] \end{gl} \end{bdl} \begin{bdl} \item[30/162] \mb{30/162} \begin{gl} \item[159] {\rm Sq(0,1)[155]} \item[160] {\rm Sq(0,1)[156]} \item[161] {\rm Sq(3)[158] + Sq(0,1)[158] + Sq(3)[157] + Sq(3)[156]} \item[162] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{3}:$ [138] \item[163] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{3}:$ [140], [138] \end{gl} \end{bdl} \begin{bdl} \item[29/162] \mb{29/162} \begin{gl} \item[162] {\rm Sq(0,1)[157] + Sq(0,1)[156]} \item[163] {\rm Sq(0,1)[158] + Sq(3)[156]} \item[164] {\rm Sq(1)[166] + Sq(1)[164]} \\ $h_{0}:$ [166], [164] \item[165] {\rm Sq(1)[168] + Sq(1)[165] + Sq(1)[164]} \\ $h_{0}:$ [168], [165], [164] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[28/162] \mb{28/162} \begin{gl} \item[164] {\rm Sq(2,1)[163] + Sq(5)[162]} \item[165] {\rm Sq(1,1)[165] + Sq(1,1)[164]} \item[166] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \item[167] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{1}:$ [169], [168] \\ $h_{3}:$ [151] \item[168] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{3}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[27/162] \mb{27/162} \begin{gl} \item[171] {\rm Sq(0,1)[174] + Sq(0,1)[173]} \item[172] {\rm Sq(0,1)[175] + Sq(0,1)[173]} \item[173] {\rm Sq(3)[177] + Sq(3)[175] + Sq(3)[174]} \item[174] {\rm Sq(2)[180] + Sq(2)[179]} \\ $h_{1}:$ [180], [179] \item[175] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \item[176] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[26/162] \mb{26/162} \begin{gl} \item[182] {\rm Sq(5)[174] + Sq(2,1)[174] + Sq(5)[173] + Sq(2,1)[173]} \item[183] {\rm Sq(0,1)[179]} \item[184] {\rm Sq(3)[180] + Sq(0,1)[180]} \end{gl} \end{bdl} \begin{bdl} \item[25/162] \mb{25/162} \begin{gl} \item[187] {\rm Sq(3)[183] + Sq(0,1)[183]} \item[188] {\rm Sq(1)[191] + Sq(1)[190]} \\ $h_{0}:$ [191], [190] \\ $h_{1}:$ [188] \\ $h_{2}:$ [181] \end{gl} \end{bdl} \begin{bdl} \item[24/162] \mb{24/162} \begin{gl} \item[190] {\rm Sq(0,1)[191]} \\ $h_{2}:$ [186] \item[191] {\rm Sq(3)[192] + Sq(0,1)[192] + Sq(3)[190] + Sq(0,1)[190]} \item[192] {\rm Sq(0,1)[193]} \item[193] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{2}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[23/162] \mb{23/162} \begin{gl} \item[196] {\rm Sq(2,1)[194]} \item[197] {\rm Sq(5)[197] + Sq(2,1)[197] + Sq(5)[196] + Sq(2,1)[196]} \item[198] {\rm Sq(0,1)[200]} \item[199] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \end{gl} \end{bdl} \begin{bdl} \item[22/162] \mb{22/162} \begin{gl} \item[204] {\rm Sq(1,1)[202] + Sq(1,1)[201]} \item[205] {\rm Sq(3)[205] + Sq(0,1)[205]} \item[206] {\rm Sq(2)[207]} \\ $h_{1}:$ [207] \\ $h_{3}:$ [187] \\ $h_{4}:$ [164], [163], [162] \\ $h_{5}:$ [114] \\ $h_{6}:$ [49] \end{gl} \end{bdl} \begin{bdl} \item[20/162] \mb{20/162} \begin{gl} \item[209] {\rm Sq(1,1)[209]} \item[210] {\rm Sq(3)[212] + Sq(0,1)[212] + Sq(0,1)[210]} \item[211] {\rm Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [219], [218] \\ $h_{1}:$ [214] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[19/162] \mb{19/162} \begin{gl} \item[218] {\rm Sq(3)[218]} \item[219] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[18/162] \mb{18/162} \begin{gl} \item[224] {\rm Sq(3)[225]} \\ $h_{7}:$ [2] \item[225] {\rm Sq(3)[226] + Sq(0,1)[226] + Sq(0,1)[224]} \\ $h_{4}:$ [180] \item[226] {\rm Sq(2)[229]} \\ $h_{1}:$ [229] \\ $h_{2}:$ [221], [220] \\ $h_{4}:$ [179] \item[227] {\rm Sq(1)[233] + Sq(1)[231]} \\ $h_{0}:$ [233], [231] \\ $h_{1}:$ [228], [227] \\ $h_{2}:$ [221], [220] \\ $h_{3}:$ [209] \\ $h_{4}:$ [180], [179] \end{gl} \end{bdl} \begin{bdl} \item[17/162] \mb{17/162} \begin{gl} \item[231] {\rm Sq(3)[232] + Sq(0,1)[232] + Sq(3)[230] + Sq(0,1)[230]} \item[232] {\rm Sq(2)[235] + Sq(2)[234]} \\ $h_{1}:$ [235], [234] \\ $h_{2}:$ [226], [225] \\ $h_{3}:$ [211] \\ $h_{4}:$ [181] \item[233] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{3}:$ [212], [210] \end{gl} \end{bdl} \begin{bdl} \item[16/162] \mb{16/162} \begin{gl} \item[237] {\rm Sq(3)[232] + Sq(0,1)[232] + Sq(3)[231] + Sq(3)[230]} \\ $h_{3}:$ [208] \item[238] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{2}:$ [226], [225] \\ $h_{3}:$ [209] \\ $h_{5}:$ [144] \item[239] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{1}:$ [235] \\ $h_{2}:$ [226], [225] \\ $h_{3}:$ [209], [208] \\ $h_{5}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[15/162] \mb{15/162} \begin{gl} \item[239] {\rm Sq(1)[248] + Sq(1)[247]} \\ $h_{0}:$ [248], [247] \\ $h_{2}:$ [234], [233] \\ $h_{5}:$ [146] \item[240] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{2}:$ [234], [233] \\ $h_{5}:$ [146] \item[241] {\rm Sq(1)[251] + Sq(1)[250] + Sq(1)[247]} \\ $h_{0}:$ [251], [250], [247] \\ $h_{1}:$ [243] \\ $h_{2}:$ [235], [234], [233] \\ $h_{3}:$ [219] \end{gl} \end{bdl} \begin{bdl} \item[14/162] \mb{14/162} \begin{gl} \item[246] {\rm Sq(5)[243] + Sq(2,1)[243] + Sq(5)[241] + Sq(2,1)[241] + Sq(5)[240] + Sq(2,1)[240] + Sq(5)[239]} \item[247] {\rm Sq(1,1)[245]} \item[248] {\rm Sq(0,1)[246]} \\ $h_{5}:$ [146] \item[249] {\rm Sq(3)[246]} \\ $h_{5}:$ [146] \item[250] {\rm Sq(1)[258] + Sq(1)[257] + Sq(1)[256]} \\ $h_{0}:$ [258], [257], [256] \\ $h_{1}:$ [252], [251] \\ $h_{2}:$ [245] \\ $h_{3}:$ [229], [226] \item[251] {\rm Sq(1)[259] + Sq(1)[256]} \\ $h_{0}:$ [259], [256] \\ $h_{1}:$ [252], [251] \\ $h_{3}:$ [227], [226] \end{gl} \end{bdl} \begin{bdl} \item[13/162] \mb{13/162} \begin{gl} \item[256] {\rm Sq(2,1)[253] + Sq(5)[252] + Sq(2,1)[252] + Sq(5)[251] + Sq(2,1)[251]} \\ $h_{3}:$ [237], [236] \item[257] {\rm Sq(0,1)[260]} \\ $h_{2}:$ [257] \item[258] {\rm Sq(1)[269] + Sq(1)[268]} \\ $h_{0}:$ [269], [268] \\ $h_{2}:$ [257] \\ $h_{3}:$ [240], [237] \item[259] {\rm Sq(1)[270] + Sq(1)[268]} \\ $h_{0}:$ [270], [268] \item[260] {\rm Sq(1)[272] + Sq(1)[268]} \\ $h_{0}:$ [272], [268] \\ $h_{2}:$ [257] \\ $h_{3}:$ [238], [236] \end{gl} \end{bdl} \begin{bdl} \item[12/162] \mb{12/162} \begin{gl} \item[267] {\rm Sq(1,1)[272]} \item[268] {\rm Sq(1,1)[273]} \\ $h_{3}:$ [250] \\ $h_{5}:$ [155] \item[269] {\rm Sq(3)[276]} \\ $h_{5}:$ [155] \item[270] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(3)[277] + Sq(0,1)[277]} \\ $h_{3}:$ [250] \\ $h_{5}:$ [155] \item[271] {\rm Sq(2)[280] + Sq(2)[279]} \\ $h_{1}:$ [280], [279] \\ $h_{5}:$ [156] \item[272] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{3}:$ [250] \\ $h_{5}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[11/162] \mb{11/162} \begin{gl} \item[284] {\rm Sq(3)[275] + Sq(3)[274] + Sq(0,1)[274] + Sq(3)[273] + Sq(0,1)[273] + Sq(0,1)[272]} \\ $h_{2}:$ [267] \\ $h_{3}:$ [249] \\ $h_{5}:$ [160] \\ $h_{6}:$ [80] \item[285] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \\ $h_{2}:$ [267] \\ $h_{3}:$ [249], [248] \\ $h_{5}:$ [160] \\ $h_{6}:$ [80] \item[286] {\rm Sq(1)[282] + Sq(1)[280]} \\ $h_{0}:$ [282], [280] \end{gl} \end{bdl} \begin{bdl} \item[10/162] \mb{10/162} \begin{gl} \item[280] {\rm Sq(2,1)[239] + Sq(2,1)[238]} \item[281] {\rm Sq(5)[239] + Sq(5)[238]} \item[282] {\rm Sq(1,1)[244]} \item[283] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{1}:$ [250], [247] \\ $h_{2}:$ [245] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[9/162] \mb{9/162} \begin{gl} \item[252] {\rm Sq(5)[205] + Sq(5)[204] + Sq(2,1)[204]} \item[253] {\rm Sq(1)[218] + Sq(1)[217]} \\ $h_{0}:$ [218], [217] \\ $h_{2}:$ [209] \\ $h_{7}:$ [14] \item[254] {\rm Sq(1)[221] + Sq(1)[217]} \\ $h_{0}:$ [221], [217] \\ $h_{2}:$ [209] \\ $h_{4}:$ [185] \\ $h_{5}:$ [136] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[8/162] \mb{8/162} \begin{gl} \item[217] {\rm Sq(0,2)[176] + Sq(3,1)[175] + Sq(6)[173]} \\ $h_{7}:$ [12] \item[218] {\rm Sq(3,1)[176] + Sq(3,1)[175] + Sq(6)[173]} \item[219] {\rm Sq(2)[184]} \\ $h_{1}:$ [184] \\ $h_{3}:$ [170] \\ $h_{4}:$ [161], [159] \\ $h_{5}:$ [119] \\ $h_{6}:$ [84], [83] \item[220] {\rm Sq(2)[185]} \\ $h_{1}:$ [185] \\ $h_{3}:$ [170] \\ $h_{4}:$ [159] \\ $h_{5}:$ [119] \\ $h_{6}:$ [84], [83] \item[221] {\rm Sq(1)[189] + Sq(1)[188]} \\ $h_{0}:$ [189], [188] \\ $h_{4}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[7/162] \mb{7/162} \begin{gl} \item[188] {\rm Sq(1,1)[153] + Sq(4)[152]} \\ $h_{2}:$ [152] \item[189] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{2}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[6/162] \mb{6/162} \begin{gl} \item[156] {\rm Sq(4)[112]} \\ $h_{2}:$ [112] \\ $h_{4}:$ [103] \\ $h_{7}:$ [16] \item[157] {\rm Sq(3)[113] + Sq(0,1)[113]} \end{gl} \end{bdl} \dm{163} \begin{bdl} \item[83/163] \mb{83/163} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[82/163] \mb{82/163} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[81/163] \mb{81/163} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[73/163] \mb{73/163} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[72/163] \mb{72/163} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[71/163] \mb{71/163} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[68/163] \mb{68/163} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[65/163] \mb{65/163} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[64/163] \mb{64/163} \begin{gl} \item[26] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[63/163] \mb{63/163} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[62/163] \mb{62/163} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[60/163] \mb{60/163} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[59/163] \mb{59/163} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[58/163] \mb{58/163} \begin{gl} \item[40] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[57/163] \mb{57/163} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [37] \\ $h_{3}:$ [30] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[56/163] \mb{56/163} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[55/163] \mb{55/163} \begin{gl} \item[42] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[53/163] \mb{53/163} \begin{gl} \item[48] {\rm Sq(0,1)[46]} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[52/163] \mb{52/163} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[50/163] \mb{50/163} \begin{gl} \item[62] {\rm Sq(0,1)[63]} \item[63] {\rm Sq(0,1)[64]} \end{gl} \end{bdl} \begin{bdl} \item[49/163] \mb{49/163} \begin{gl} \item[65] {\rm Sq(0,1)[62]} \item[66] {\rm Sq(3)[63] + Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[48/163] \mb{48/163} \begin{gl} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[47/163] \mb{47/163} \begin{gl} \item[69] {\rm Sq(0,1)[71]} \item[70] {\rm Sq(0,1)[72]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[46/163] \mb{46/163} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \item[76] {\rm Sq(3)[77] + Sq(0,1)[77] + Sq(3)[76] + Sq(0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[45/163] \mb{45/163} \begin{gl} \item[81] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [75] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[44/163] \mb{44/163} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(2)[89]} \\ $h_{1}:$ [89] \item[87] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[43/163] \mb{43/163} \begin{gl} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{3}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[42/163] \mb{42/163} \begin{gl} \item[98] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[41/163] \mb{41/163} \begin{gl} \item[97] {\rm Sq(0,1)[96]} \item[98] {\rm Sq(0,1)[97]} \item[99] {\rm Sq(0,1)[98]} \item[100] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[40/163] \mb{40/163} \begin{gl} \item[99] {\rm Sq(1,1)[103]} \item[100] {\rm Sq(0,1)[104]} \item[101] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[38/163] \mb{38/163} \begin{gl} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(0,1)[115]} \item[117] {\rm Sq(0,1)[116]} \end{gl} \end{bdl} \begin{bdl} \item[37/163] \mb{37/163} \begin{gl} \item[118] {\rm Sq(0,1)[122]} \item[119] {\rm Sq(0,1)[123]} \item[120] {\rm Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[36/163] \mb{36/163} \begin{gl} \item[128] {\rm Sq(1,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[35/163] \mb{35/163} \begin{gl} \item[141] {\rm Sq(0,1)[145]} \item[142] {\rm Sq(0,1)[146]} \item[143] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[34/163] \mb{34/163} \begin{gl} \item[149] {\rm Sq(0,1)[143]} \item[150] {\rm Sq(0,1)[144]} \item[151] {\rm Sq(0,1)[145]} \end{gl} \end{bdl} \begin{bdl} \item[33/163] \mb{33/163} \begin{gl} \item[150] {\rm Sq(0,1)[145]} \item[151] {\rm Sq(3)[147] + Sq(0,1)[147] + Sq(3)[145]} \end{gl} \end{bdl} \begin{bdl} \item[32/163] \mb{32/163} \begin{gl} \item[152] {\rm Sq(0,1)[152] + Sq(0,1)[151]} \item[153] {\rm Sq(0,1)[153]} \end{gl} \end{bdl} \begin{bdl} \item[31/163] \mb{31/163} \begin{gl} \item[158] {\rm Sq(1,1)[154] + Sq(1,1)[153]} \item[159] {\rm Sq(0,1)[156]} \item[160] {\rm Sq(0,1)[157]} \item[161] {\rm Sq(1)[166] + Sq(1)[165]} \\ $h_{0}:$ [166], [165] \\ $h_{1}:$ [161], [160], [159] \\ $h_{2}:$ [154] \\ $h_{3}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[30/163] \mb{30/163} \begin{gl} \item[164] {\rm Sq(0,1)[159]} \item[165] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{2}:$ [158], [156], [155] \item[166] {\rm Sq(1)[169] + Sq(1)[167]} \\ $h_{0}:$ [169], [167] \\ $h_{2}:$ [158], [157], [156] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[29/163] \mb{29/163} \begin{gl} \item[166] {\rm Sq(0,1)[160] + Sq(0,1)[159]} \item[167] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[162] + Sq(0,1)[162] + Sq(0,1)[159]} \item[168] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [156] \item[169] {\rm Sq(1)[174] + Sq(1)[169]} \\ $h_{0}:$ [174], [169] \\ $h_{2}:$ [156] \\ $h_{3}:$ [147], [145] \end{gl} \end{bdl} \begin{bdl} \item[28/163] \mb{28/163} \begin{gl} \item[169] {\rm Sq(2,1)[164]} \item[170] {\rm Sq(0,1)[168] + Sq(0,1)[167]} \item[171] {\rm Sq(3)[170] + Sq(0,1)[170] + Sq(0,1)[167]} \item[172] {\rm Sq(2)[174] + Sq(2)[173] + Sq(2)[171]} \\ $h_{1}:$ [174], [173], [171] \item[173] {\rm Sq(1)[179] + Sq(1)[178] + Sq(1)[177]} \\ $h_{0}:$ [179], [178], [177] \\ $h_{3}:$ [154] \item[174] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{3}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[27/163] \mb{27/163} \begin{gl} \item[177] {\rm Sq(1,1)[175] + Sq(1,1)[173]} \item[178] {\rm Sq(3)[180] + Sq(3)[179] + Sq(0,1)[179]} \item[179] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \item[180] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \end{gl} \end{bdl} \begin{bdl} \item[26/163] \mb{26/163} \begin{gl} \item[185] {\rm Sq(0,1)[181]} \item[186] {\rm Sq(0,1)[182]} \item[187] {\rm Sq(1)[192] + Sq(1)[191]} \\ $h_{0}:$ [192], [191] \item[188] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[25/163] \mb{25/163} \begin{gl} \item[189] {\rm Sq(0,1)[186]} \item[190] {\rm Sq(0,1)[187]} \item[191] {\rm Sq(0,1)[188] + Sq(3)[187]} \item[192] {\rm Sq(3)[188] + Sq(3)[187]} \item[193] {\rm Sq(3)[189] + Sq(0,1)[189] + Sq(3)[187]} \end{gl} \end{bdl} \begin{bdl} \item[24/163] \mb{24/163} \begin{gl} \item[194] {\rm Sq(2)[197]} \\ $h_{1}:$ [197] \\ $h_{2}:$ [192], [190] \end{gl} \end{bdl} \begin{bdl} \item[23/163] \mb{23/163} \begin{gl} \item[200] {\rm Sq(0,1)[203] + Sq(0,1)[202]} \item[201] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \item[202] {\rm Sq(1)[209] + Sq(1)[208]} \\ $h_{0}:$ [209], [208] \end{gl} \end{bdl} \begin{bdl} \item[22/163] \mb{22/163} \begin{gl} \item[207] {\rm Sq(0,1)[207]} \item[208] {\rm Sq(3)[207]} \item[209] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \item[210] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{2}:$ [203] \\ $h_{4}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[21/163] \mb{21/163} \begin{gl} \item[209] {\rm Sq(1,1)[205] + Sq(1,1)[203]} \item[210] {\rm Sq(1,1)[206]} \item[211] {\rm Sq(3)[207]} \end{gl} \end{bdl} \begin{bdl} \item[20/163] \mb{20/163} \begin{gl} \item[212] {\rm Sq(1,1)[212] + Sq(1,1)[210]} \item[213] {\rm Sq(3)[217] + Sq(0,1)[217] + Sq(3)[216] + Sq(0,1)[216]} \end{gl} \end{bdl} \begin{bdl} \item[19/163] \mb{19/163} \begin{gl} \item[220] {\rm Sq(0,1)[222]} \end{gl} \end{bdl} \begin{bdl} \item[18/163] \mb{18/163} \begin{gl} \item[228] {\rm Sq(3)[229]} \item[229] {\rm Sq(2)[231]} \\ $h_{1}:$ [231] \\ $h_{3}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[17/163] \mb{17/163} \begin{gl} \item[234] {\rm Sq(2)[237]} \\ $h_{1}:$ [237] \\ $h_{2}:$ [229] \\ $h_{3}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[16/163] \mb{16/163} \begin{gl} \item[240] {\rm Sq(3)[235]} \\ $h_{2}:$ [230], [229] \item[241] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{2}:$ [232], [231], [229] \\ $h_{3}:$ [215], [214], [212] \\ $h_{4}:$ [186], [184] \item[242] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{3}:$ [212] \\ $h_{4}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[15/163] \mb{15/163} \begin{gl} \item[242] {\rm Sq(1,1)[239] + Sq(1,1)[238] + Sq(4)[236]} \\ $h_{2}:$ [236] \\ $h_{3}:$ [222], [221] \item[243] {\rm Sq(3)[243] + Sq(0,1)[243] + Sq(3)[241] + Sq(0,1)[241] + Sq(0,1)[240]} \item[244] {\rm Sq(2)[247]} \\ $h_{1}:$ [247] \item[245] {\rm Sq(2)[249] + Sq(2)[248]} \\ $h_{1}:$ [249], [248] \item[246] {\rm Sq(1)[254]} \\ $h_{0}:$ [254] \\ $h_{1}:$ [248] \\ $h_{2}:$ [237] \\ $h_{3}:$ [221] \\ $h_{5}:$ [150], [148], [147] \item[247] {\rm Sq(1)[255] + Sq(1)[252]} \\ $h_{0}:$ [255], [252] \\ $h_{2}:$ [238], [237] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[14/163] \mb{14/163} \begin{gl} \item[252] {\rm Sq(3)[255] + Sq(0,1)[255] + Sq(3)[254] + Sq(0,1)[254] + Sq(0,1)[252] + Sq(3)[251]} \\ $h_{3}:$ [230] \item[253] {\rm Sq(2)[256]} \\ $h_{1}:$ [256] \\ $h_{3}:$ [231], [230] \item[254] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{2}:$ [246] \\ $h_{5}:$ [151] \item[255] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{2}:$ [247], [246] \\ $h_{3}:$ [230] \\ $h_{7}:$ [8] \item[256] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{2}:$ [249], [246] \\ $h_{3}:$ [230] \\ $h_{5}:$ [151] \\ $h_{6}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[13/163] \mb{13/163} \begin{gl} \item[261] {\rm Sq(1,1)[261]} \item[262] {\rm Sq(3)[265] + Sq(0,1)[265] + Sq(3)[264] + Sq(0,1)[264] + Sq(0,1)[262]} \\ $h_{7}:$ [7] \item[263] {\rm Sq(2)[269] + Sq(2)[268]} \\ $h_{1}:$ [269], [268] \\ $h_{2}:$ [260] \\ $h_{3}:$ [243] \\ $h_{7}:$ [7] \item[264] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{6}:$ [73] \item[265] {\rm Sq(1)[275]} \\ $h_{0}:$ [275] \\ $h_{1}:$ [270], [268] \\ $h_{3}:$ [244] \end{gl} \end{bdl} \begin{bdl} \item[12/163] \mb{12/163} \begin{gl} \item[273] {\rm Sq(3)[279]} \\ $h_{3}:$ [254] \item[274] {\rm Sq(0,1)[280] + Sq(0,1)[279]} \item[275] {\rm Sq(3)[281] + Sq(0,1)[281] + Sq(3)[280]} \\ $h_{3}:$ [255] \item[276] {\rm Sq(1)[291] + Sq(1)[288]} \\ $h_{0}:$ [291], [288] \\ $h_{2}:$ [278], [277] \\ $h_{3}:$ [257], [254] \\ $h_{4}:$ [224], [223] \\ $h_{5}:$ [166], [165], [164], [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[11/163] \mb{11/163} \begin{gl} \item[287] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(3)[277] + Sq(0,1)[277] + Sq(3)[276] + Sq(0,1)[276]} \\ $h_{2}:$ [275], [274], [273], [272] \item[288] {\rm Sq(3)[279] + Sq(0,1)[279] + Sq(3)[277] + Sq(0,1)[277]} \\ $h_{2}:$ [275], [274], [273], [272] \\ $h_{4}:$ [228] \item[289] {\rm Sq(2)[280]} \\ $h_{1}:$ [280] \\ $h_{2}:$ [275], [274], [273], [272] \item[290] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{1}:$ [282] \\ $h_{2}:$ [274], [272] \\ $h_{5}:$ [167], [165], [164] \item[291] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{2}:$ [274], [272] \\ $h_{3}:$ [255] \\ $h_{4}:$ [228] \\ $h_{5}:$ [168], [167], [165] \end{gl} \end{bdl} \begin{bdl} \item[10/163] \mb{10/163} \begin{gl} \item[284] {\rm Sq(3)[251] + Sq(0,1)[251] + Sq(3)[249] + Sq(0,1)[247]} \\ $h_{5}:$ [159] \item[285] {\rm Sq(2)[252]} \\ $h_{1}:$ [252] \\ $h_{3}:$ [230] \\ $h_{4}:$ [211] \\ $h_{5}:$ [159], [158] \\ $h_{6}:$ [89] \item[286] {\rm Sq(1)[258] + Sq(1)[256]} \\ $h_{0}:$ [258], [256] \\ $h_{3}:$ [232] \\ $h_{5}:$ [161], [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[9/163] \mb{9/163} \begin{gl} \item[255] {\rm Sq(4)[211] + Sq(1,1)[211]} \\ $h_{2}:$ [211] \\ $h_{3}:$ [198] \\ $h_{5}:$ [141], [140], [139] \item[256] {\rm Sq(3)[215] + Sq(0,1)[215]} \\ $h_{3}:$ [197] \item[257] {\rm Sq(2)[220] + Sq(2)[219]} \\ $h_{1}:$ [220], [219] \\ $h_{2}:$ [212] \\ $h_{3}:$ [200], [198] \\ $h_{4}:$ [187] \\ $h_{5}:$ [141] \\ $h_{6}:$ [89] \item[258] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{3}:$ [198] \\ $h_{5}:$ [143], [141], [139] \item[259] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{1}:$ [219] \\ $h_{2}:$ [213] \\ $h_{3}:$ [201], [198], [197] \\ $h_{4}:$ [187], [186] \\ $h_{5}:$ [142], [141], [139] \\ $h_{6}:$ [92], [91], [90] \end{gl} \end{bdl} \begin{bdl} \item[8/163] \mb{8/163} \begin{gl} \item[222] {\rm Sq(1)[191] + Sq(1)[190]} \\ $h_{0}:$ [191], [190] \\ $h_{5}:$ [123] \item[223] {\rm Sq(1)[193] + Sq(1)[190]} \\ $h_{0}:$ [193], [190] \\ $h_{3}:$ [172] \\ $h_{5}:$ [122], [121] \\ $h_{6}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[7/163] \mb{7/163} \begin{gl} \item[190] {\rm Sq(5)[152] + Sq(2,1)[152]} \\ $h_{7}:$ [14] \item[191] {\rm Sq(5)[153] + Sq(2,1)[152]} \\ $h_{5}:$ [107] \\ $h_{7}:$ [14] \item[192] {\rm Sq(2)[157]} \\ $h_{1}:$ [157] \\ $h_{4}:$ [137] \\ $h_{7}:$ [14] \item[193] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{3}:$ [146] \\ $h_{5}:$ [106] \\ $h_{6}:$ [82] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[6/163] \mb{6/163} \begin{gl} \item[158] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{3}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[5/163] \mb{5/163} \begin{gl} \item[115] {\rm Sq(3,1)[75]} \end{gl} \end{bdl} \dm{164} \begin{bdl} \item[78/164] \mb{78/164} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[77/164] \mb{77/164} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[76/164] \mb{76/164} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[70/164] \mb{70/164} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[67/164] \mb{67/164} \begin{gl} \item[16] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[64/164] \mb{64/164} \begin{gl} \item[27] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[63/164] \mb{63/164} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[62/164] \mb{62/164} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[61/164] \mb{61/164} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[60/164] \mb{60/164} \begin{gl} \item[33] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [33] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[59/164] \mb{59/164} \begin{gl} \item[37] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [36] \\ $h_{4}:$ [18] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [36] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[58/164] \mb{58/164} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[57/164] \mb{57/164} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[56/164] \mb{56/164} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[55/164] \mb{55/164} \begin{gl} \item[43] {\rm Sq(0,1)[46]} \item[44] {\rm Sq(3)[46]} \item[45] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[54/164] \mb{54/164} \begin{gl} \item[48] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[52/164] \mb{52/164} \begin{gl} \item[49] {\rm Sq(0,1)[53]} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[51/164] \mb{51/164} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[50/164] \mb{50/164} \begin{gl} \item[64] {\rm Sq(2)[66]} \\ $h_{1}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[49/164] \mb{49/164} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[48/164] \mb{48/164} \begin{gl} \item[67] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[47/164] \mb{47/164} \begin{gl} \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{1}:$ [76] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[46/164] \mb{46/164} \begin{gl} \item[77] {\rm Sq(1,1)[77]} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[45/164] \mb{45/164} \begin{gl} \item[82] {\rm Sq(0,1)[81]} \item[83] {\rm Sq(1)[89] + Sq(1)[88]} \\ $h_{0}:$ [89], [88] \\ $h_{1}:$ [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71], [68] \\ $h_{4}:$ [53] \item[84] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{1}:$ [86], [83] \\ $h_{2}:$ [79], [78] \\ $h_{3}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[44/164] \mb{44/164} \begin{gl} \item[88] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [88], [87] \\ $h_{4}:$ [60] \item[89] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [88], [87], [84] \\ $h_{3}:$ [76] \item[90] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [87], [84] \\ $h_{3}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[43/164] \mb{43/164} \begin{gl} \item[94] {\rm Sq(0,1)[93]} \item[95] {\rm Sq(0,1)[94]} \item[96] {\rm Sq(0,1)[95]} \item[97] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [91], [90] \\ $h_{4}:$ [67] \item[98] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [91], [90] \\ $h_{3}:$ [82] \item[99] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [90] \\ $h_{3}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[42/164] \mb{42/164} \begin{gl} \item[99] {\rm Sq(0,1)[94]} \item[100] {\rm Sq(0,1)[95]} \item[101] {\rm Sq(0,1)[96]} \item[102] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [85] \item[103] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[41/164] \mb{41/164} \begin{gl} \item[101] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \item[102] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \end{gl} \end{bdl} \begin{bdl} \item[40/164] \mb{40/164} \begin{gl} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(0,1)[107]} \item[104] {\rm Sq(0,1)[108]} \item[105] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \item[106] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[39/164] \mb{39/164} \begin{gl} \item[109] {\rm Sq(0,1)[111]} \item[110] {\rm Sq(0,1)[112]} \item[111] {\rm Sq(0,1)[113]} \item[112] {\rm Sq(3)[113]} \item[113] {\rm Sq(3)[114]} \end{gl} \end{bdl} \begin{bdl} \item[37/164] \mb{37/164} \begin{gl} \item[121] {\rm Sq(0,1)[125]} \item[122] {\rm Sq(0,1)[126]} \item[123] {\rm Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[36/164] \mb{36/164} \begin{gl} \item[129] {\rm Sq(0,1)[138]} \item[130] {\rm Sq(0,1)[139]} \item[131] {\rm Sq(0,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[35/164] \mb{35/164} \begin{gl} \item[144] {\rm Sq(0,1)[148]} \end{gl} \end{bdl} \begin{bdl} \item[34/164] \mb{34/164} \begin{gl} \item[152] {\rm Sq(0,1)[146]} \item[153] {\rm Sq(0,1)[147]} \item[154] {\rm Sq(0,1)[148]} \item[155] {\rm Sq(2)[151] + Sq(2)[150]} \\ $h_{1}:$ [151], [150] \end{gl} \end{bdl} \begin{bdl} \item[33/164] \mb{33/164} \begin{gl} \item[152] {\rm Sq(0,1)[148]} \item[153] {\rm Sq(0,1)[149]} \item[154] {\rm Sq(0,1)[150]} \end{gl} \end{bdl} \begin{bdl} \item[32/164] \mb{32/164} \begin{gl} \item[154] {\rm Sq(0,1)[155]} \end{gl} \end{bdl} \begin{bdl} \item[31/164] \mb{31/164} \begin{gl} \item[162] {\rm Sq(0,1)[160] + Sq(0,1)[159]} \item[163] {\rm Sq(0,1)[161]} \item[164] {\rm Sq(3)[163] + Sq(0,1)[163] + Sq(3)[162] + Sq(0,1)[162] + Sq(3)[159]} \end{gl} \end{bdl} \begin{bdl} \item[30/164] \mb{30/164} \begin{gl} \item[167] {\rm Sq(0,1)[162]} \item[168] {\rm Sq(0,1)[163]} \item[169] {\rm Sq(3)[164] + Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[29/164] \mb{29/164} \begin{gl} \item[170] {\rm Sq(1)[177] + Sq(1)[175]} \\ $h_{0}:$ [177], [175] \\ $h_{1}:$ [172], [171] \\ $h_{2}:$ [163], [161] \\ $h_{3}:$ [148] \item[171] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{1}:$ [171] \\ $h_{2}:$ [162] \item[172] {\rm Sq(1)[179] + Sq(1)[175]} \\ $h_{0}:$ [179], [175] \\ $h_{1}:$ [172] \\ $h_{2}:$ [163], [162] \\ $h_{3}:$ [152], [148] \end{gl} \end{bdl} \begin{bdl} \item[28/164] \mb{28/164} \begin{gl} \item[175] {\rm Sq(0,1)[171]} \item[176] {\rm Sq(0,1)[172]} \item[177] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{2}:$ [170] \item[178] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{2}:$ [167] \item[179] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{2}:$ [170], [167] \\ $h_{3}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[27/164] \mb{27/164} \begin{gl} \item[181] {\rm Sq(0,1)[183] + Sq(3)[182] + Sq(0,1)[182]} \\ $h_{2}:$ [180], [179] \item[182] {\rm Sq(0,1)[184] + Sq(3)[182] + Sq(0,1)[182]} \\ $h_{2}:$ [180], [179] \item[183] {\rm Sq(3)[184]} \item[184] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [180], [179] \\ $h_{3}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[26/164] \mb{26/164} \begin{gl} \item[189] {\rm Sq(2)[191] + Sq(2)[190]} \\ $h_{1}:$ [191], [190] \item[190] {\rm Sq(2)[193] + Sq(2)[190]} \\ $h_{1}:$ [193], [190] \\ $h_{2}:$ [184], [183], [181] \\ $h_{3}:$ [168] \item[191] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \\ $h_{3}:$ [168] \item[192] {\rm Sq(1)[197] + Sq(1)[194]} \\ $h_{0}:$ [197], [194] \\ $h_{1}:$ [192], [190] \\ $h_{2}:$ [185], [184], [183] \\ $h_{3}:$ [168] \\ $h_{4}:$ [145], [143] \\ $h_{5}:$ [105] \\ $h_{6}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[25/164] \mb{25/164} \begin{gl} \item[194] {\rm Sq(1,1)[189] + Sq(1,1)[186]} \item[195] {\rm Sq(0,1)[192] + Sq(0,1)[191]} \item[196] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \item[197] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \\ $h_{2}:$ [188] \\ $h_{4}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[24/164] \mb{24/164} \begin{gl} \item[195] {\rm Sq(5)[192] + Sq(2,1)[192] + Sq(5)[191] + Sq(2,1)[191] + Sq(5)[190] + Sq(2,1)[190]} \item[196] {\rm Sq(1,1)[194]} \item[197] {\rm Sq(3)[197] + Sq(0,1)[196]} \item[198] {\rm Sq(0,1)[198]} \item[199] {\rm Sq(1)[204] + Sq(1)[203]} \\ $h_{0}:$ [204], [203] \\ $h_{3}:$ [181], [178] \end{gl} \end{bdl} \begin{bdl} \item[23/164] \mb{23/164} \begin{gl} \item[203] {\rm Sq(3)[204] + Sq(0,1)[204]} \\ $h_{2}:$ [203] \\ $h_{3}:$ [190] \item[204] {\rm Sq(3)[205] + Sq(0,1)[204]} \\ $h_{2}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[22/164] \mb{22/164} \begin{gl} \item[211] {\rm Sq(3,1)[202] + Sq(3,1)[201] + Sq(0,2)[201]} \item[212] {\rm Sq(2)[209]} \\ $h_{1}:$ [209] \item[213] {\rm Sq(1)[216] + Sq(1)[215]} \\ $h_{0}:$ [216], [215] \\ $h_{3}:$ [193] \\ $h_{5}:$ [118] \\ $h_{6}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[21/164] \mb{21/164} \begin{gl} \item[212] {\rm Sq(1,1)[208] + Sq(1,1)[207]} \item[213] {\rm Sq(0,1)[209]} \item[214] {\rm Sq(2)[213]} \\ $h_{1}:$ [213] \item[215] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{3}:$ [191] \item[216] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{3}:$ [193] \\ $h_{6}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[20/164] \mb{20/164} \begin{gl} \item[214] {\rm Sq(1,1)[213]} \item[215] {\rm Sq(0,1)[218]} \item[216] {\rm Sq(1)[223] + Sq(1)[221]} \\ $h_{0}:$ [223], [221] \\ $h_{3}:$ [199] \\ $h_{6}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[19/164] \mb{19/164} \begin{gl} \item[221] {\rm Sq(1,1)[222]} \item[222] {\rm Sq(0,1)[225]} \\ $h_{4}:$ [185] \\ $h_{6}:$ [63] \item[223] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \\ $h_{6}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[18/164] \mb{18/164} \begin{gl} \item[230] {\rm Sq(4)[229] + Sq(1,1)[228] + Sq(1,1)[227]} \\ $h_{2}:$ [229] \\ $h_{5}:$ [143] \item[231] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \end{gl} \end{bdl} \begin{bdl} \item[17/164] \mb{17/164} \begin{gl} \item[235] {\rm Sq(3,1)[228] + Sq(3,1)[226] + Sq(0,2)[226] + Sq(3,1)[225]} \item[236] {\rm Sq(3)[237] + Sq(0,1)[237]} \end{gl} \end{bdl} \begin{bdl} \item[16/164] \mb{16/164} \begin{gl} \item[243] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \\ $h_{1}:$ [245] \\ $h_{2}:$ [235] \item[244] {\rm Sq(1)[250] + Sq(1)[249]} \\ $h_{0}:$ [250], [249] \\ $h_{1}:$ [245], [244] \\ $h_{2}:$ [235] \\ $h_{3}:$ [217] \end{gl} \end{bdl} \begin{bdl} \item[15/164] \mb{15/164} \begin{gl} \item[248] {\rm Sq(3)[249] + Sq(0,1)[247]} \item[249] {\rm Sq(1)[260] + Sq(1)[258] + Sq(1)[257]} \\ $h_{0}:$ [260], [258], [257] \\ $h_{2}:$ [244], [242], [240] \\ $h_{3}:$ [228], [226], [223] \item[250] {\rm Sq(1)[261] + Sq(1)[258]} \\ $h_{0}:$ [261], [258] \\ $h_{2}:$ [244], [242], [240] \\ $h_{3}:$ [228], [226], [224], [223] \item[251] {\rm Sq(1)[262] + Sq(1)[259]} \\ $h_{0}:$ [262], [259] \\ $h_{1}:$ [253] \\ $h_{2}:$ [244], [243] \\ $h_{3}:$ [227], [226], [225], [224], [223] \\ $h_{4}:$ [200], [198] \end{gl} \end{bdl} \begin{bdl} \item[14/164] \mb{14/164} \begin{gl} \item[257] {\rm Sq(3)[256]} \item[258] {\rm Sq(3)[259] + Sq(0,1)[259] + Sq(0,1)[256]} \\ $h_{2}:$ [252], [251] \\ $h_{3}:$ [235], [233] \item[259] {\rm Sq(3)[260] + Sq(0,1)[260] + Sq(3)[257] + Sq(0,1)[257] + Sq(0,1)[256]} \item[260] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \item[261] {\rm Sq(1)[267]} \\ $h_{0}:$ [267] \item[262] {\rm Sq(1)[268]} \\ $h_{0}:$ [268] \\ $h_{2}:$ [252], [251] \\ $h_{3}:$ [234], [233] \item[263] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \\ $h_{1}:$ [262] \\ $h_{2}:$ [253], [251] \\ $h_{3}:$ [234], [233] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[13/164] \mb{13/164} \begin{gl} \item[266] {\rm Sq(0,1)[270] + Sq(3)[269] + Sq(3)[268] + Sq(0,1)[268]} \item[267] {\rm Sq(3)[270] + Sq(3)[269] + Sq(0,1)[269] + Sq(0,1)[268]} \item[268] {\rm Sq(3)[272] + Sq(0,1)[272] + Sq(3)[269] + Sq(0,1)[268]} \item[269] {\rm Sq(2)[274]} \\ $h_{1}:$ [274] \\ $h_{5}:$ [159] \item[270] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{2}:$ [262] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[12/164] \mb{12/164} \begin{gl} \item[277] {\rm Sq(3)[286] + Sq(0,1)[286]} \\ $h_{7}:$ [8] \item[278] {\rm Sq(2)[288] + Sq(2)[287]} \\ $h_{1}:$ [288], [287] \\ $h_{3}:$ [259] \\ $h_{4}:$ [229], [227] \\ $h_{6}:$ [80], [79] \\ $h_{7}:$ [8] \item[279] {\rm Sq(1)[293] + Sq(1)[292]} \\ $h_{0}:$ [293], [292] \\ $h_{1}:$ [289], [287] \\ $h_{2}:$ [281], [280], [279] \\ $h_{3}:$ [259] \end{gl} \end{bdl} \begin{bdl} \item[11/164] \mb{11/164} \begin{gl} \item[292] {\rm Sq(0,1)[281]} \item[293] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \item[294] {\rm Sq(1)[289] + Sq(1)[288]} \\ $h_{0}:$ [289], [288] \\ $h_{1}:$ [284] \\ $h_{2}:$ [277], [276] \\ $h_{5}:$ [172], [170] \item[295] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{1}:$ [284] \\ $h_{2}:$ [278], [277], [276] \\ $h_{3}:$ [261], [257] \\ $h_{4}:$ [230] \\ $h_{5}:$ [172], [170] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[10/164] \mb{10/164} \begin{gl} \item[287] {\rm Sq(1,1)[251] + Sq(1,1)[249] + Sq(1,1)[248]} \item[288] {\rm Sq(3)[254] + Sq(0,1)[254] + Sq(3)[253] + Sq(0,1)[253] + Sq(3)[252]} \\ $h_{4}:$ [214] \item[289] {\rm Sq(1)[261] + Sq(1)[260]} \\ $h_{0}:$ [261], [260] \\ $h_{2}:$ [249], [247] \\ $h_{4}:$ [214] \\ $h_{5}:$ [163] \item[290] {\rm Sq(1)[262] + Sq(1)[260]} \\ $h_{0}:$ [262], [260] \\ $h_{2}:$ [250], [249] \\ $h_{3}:$ [237] \\ $h_{4}:$ [212] \\ $h_{5}:$ [163] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[9/164] \mb{9/164} \begin{gl} \item[260] {\rm Sq(0,1)[218] + Sq(0,1)[217]} \\ $h_{7}:$ [15] \item[261] {\rm Sq(3)[221] + Sq(0,1)[221] + Sq(3)[220] + Sq(3)[219] + Sq(3)[218] + Sq(0,1)[217]} \\ $h_{7}:$ [15] \item[262] {\rm Sq(1)[228] + Sq(1)[224]} \\ $h_{0}:$ [228], [224] \\ $h_{3}:$ [203] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[8/164] \mb{8/164} \begin{gl} \item[224] {\rm Sq(5,1)[176] + Sq(2,2)[173]} \item[225] {\rm Sq(2)[190]} \\ $h_{1}:$ [190] \\ $h_{2}:$ [186] \\ $h_{3}:$ [176] \\ $h_{7}:$ [13] \item[226] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \\ $h_{2}:$ [186] \\ $h_{3}:$ [176] \\ $h_{5}:$ [126] \\ $h_{7}:$ [13] \item[227] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \\ $h_{2}:$ [186], [185] \\ $h_{3}:$ [176], [173] \\ $h_{4}:$ [165] \\ $h_{5}:$ [125], [124] \\ $h_{7}:$ [13] \item[228] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [176] \\ $h_{7}:$ [14] \item[229] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{2}:$ [187], [186], [185] \\ $h_{3}:$ [173] \\ $h_{4}:$ [164] \\ $h_{5}:$ [125], [124] \end{gl} \end{bdl} \begin{bdl} \item[7/164] \mb{7/164} \begin{gl} \item[194] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \\ $h_{7}:$ [15] \item[195] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[6/164] \mb{6/164} \begin{gl} \item[159] {\rm Sq(5)[113]} \\ $h_{7}:$ [17] \item[160] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \\ $h_{3}:$ [109] \\ $h_{5}:$ [84] \\ $h_{6}:$ [71] \\ $h_{7}:$ [17] \item[161] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[5/164] \mb{5/164} \begin{gl} \item[116] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[4/164] \mb{4/164} \begin{gl} \item[79] {\rm Sq(15,3)[46] + Sq(12,4)[46] + Sq(9,5)[46] + Sq(3,7)[46] + Sq(8,3,1)[46] + Sq(2,5,1)[46] + Sq(1,3,2)[46] + Sq(6,1,0,1)[46] + Sq(3,2,0,1)[46]} \item[80] {\rm Sq(4)[53]} \\ $h_{2}:$ [53] \\ $h_{5}:$ [43] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \dm{165} \begin{bdl} \item[77/165] \mb{77/165} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[76/165] \mb{76/165} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[75/165] \mb{75/165} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[74/165] \mb{74/165} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[73/165] \mb{73/165} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[72/165] \mb{72/165} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[71/165] \mb{71/165} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[70/165] \mb{70/165} \begin{gl} \item[15] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[69/165] \mb{69/165} \begin{gl} \item[18] {\rm Sq(0,1)[17]} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[68/165] \mb{68/165} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[67/165] \mb{67/165} \begin{gl} \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[66/165] \mb{66/165} \begin{gl} \item[20] {\rm Sq(3,1)[24]} \item[21] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[63/165] \mb{63/165} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[61/165] \mb{61/165} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[60/165] \mb{60/165} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[59/165] \mb{59/165} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[58/165] \mb{58/165} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [40] \\ $h_{4}:$ [24] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{3}:$ [33] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[57/165] \mb{57/165} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45] + Sq(1)[43]} \\ $h_{0}:$ [45], [43] \\ $h_{2}:$ [38] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[56/165] \mb{56/165} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[55/165] \mb{55/165} \begin{gl} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{3}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[54/165] \mb{54/165} \begin{gl} \item[49] {\rm Sq(0,1)[48]} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[53/165] \mb{53/165} \begin{gl} \item[50] {\rm Sq(0,1)[48]} \item[51] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[52/165] \mb{52/165} \begin{gl} \item[51] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[51/165] \mb{51/165} \begin{gl} \item[56] {\rm Sq(0,1)[62]} \item[57] {\rm Sq(0,1)[63]} \item[58] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[50/165] \mb{50/165} \begin{gl} \item[65] {\rm Sq(3,1)[62]} \item[66] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[49/165] \mb{49/165} \begin{gl} \item[69] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[48/165] \mb{48/165} \begin{gl} \item[68] {\rm Sq(1,1)[68]} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[47/165] \mb{47/165} \begin{gl} \item[73] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[45/165] \mb{45/165} \begin{gl} \item[85] {\rm Sq(0,1)[83]} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(0,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[44/165] \mb{44/165} \begin{gl} \item[91] {\rm Sq(0,1)[92]} \end{gl} \end{bdl} \begin{bdl} \item[43/165] \mb{43/165} \begin{gl} \item[100] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{1}:$ [99] \\ $h_{2}:$ [96] \item[101] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{1}:$ [100] \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[42/165] \mb{42/165} \begin{gl} \item[104] {\rm Sq(0,1)[97]} \item[105] {\rm Sq(0,1)[98]} \item[106] {\rm Sq(0,1)[99]} \item[107] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [94] \item[108] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{2}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[41/165] \mb{41/165} \begin{gl} \item[103] {\rm Sq(0,1)[99]} \item[104] {\rm Sq(0,1)[100]} \item[105] {\rm Sq(0,1)[101]} \item[106] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[40/165] \mb{40/165} \begin{gl} \item[107] {\rm Sq(2)[112] + Sq(2)[111]} \\ $h_{1}:$ [112], [111] \item[108] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[39/165] \mb{39/165} \begin{gl} \item[114] {\rm Sq(0,1)[115]} \item[115] {\rm Sq(0,1)[116]} \item[116] {\rm Sq(0,1)[117]} \item[117] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[38/165] \mb{38/165} \begin{gl} \item[118] {\rm Sq(0,1)[118]} \item[119] {\rm Sq(0,1)[119]} \item[120] {\rm Sq(0,1)[120]} \item[121] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[37/165] \mb{37/165} \begin{gl} \item[124] {\rm Sq(0,1)[128]} \item[125] {\rm Sq(3)[128]} \end{gl} \end{bdl} \begin{bdl} \item[36/165] \mb{36/165} \begin{gl} \item[132] {\rm Sq(0,1)[141]} \item[133] {\rm Sq(0,1)[142]} \item[134] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[35/165] \mb{35/165} \begin{gl} \item[145] {\rm Sq(0,1)[149]} \item[146] {\rm Sq(0,1)[150]} \item[147] {\rm Sq(0,1)[151]} \item[148] {\rm Sq(1)[157] + Sq(1)[156]} \\ $h_{0}:$ [157], [156] \\ $h_{1}:$ [155], [153] \end{gl} \end{bdl} \begin{bdl} \item[34/165] \mb{34/165} \begin{gl} \item[156] {\rm Sq(3)[151] + Sq(3)[150] + Sq(0,1)[150]} \item[157] {\rm Sq(1)[158] + Sq(1)[155]} \\ $h_{0}:$ [158], [155] \end{gl} \end{bdl} \begin{bdl} \item[33/165] \mb{33/165} \begin{gl} \item[155] {\rm Sq(1,1)[150]} \item[156] {\rm Sq(0,1)[152]} \item[157] {\rm Sq(0,1)[153]} \item[158] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[32/165] \mb{32/165} \begin{gl} \item[155] {\rm Sq(1,1)[157] + Sq(1,1)[156]} \item[156] {\rm Sq(0,1)[158]} \item[157] {\rm Sq(0,1)[159]} \item[158] {\rm Sq(0,1)[160]} \item[159] {\rm Sq(2)[163] + Sq(2)[162]} \\ $h_{1}:$ [163], [162] \end{gl} \end{bdl} \begin{bdl} \item[31/165] \mb{31/165} \begin{gl} \item[165] {\rm Sq(3)[166] + Sq(0,1)[166] + Sq(3)[165] + Sq(0,1)[165] + Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[30/165] \mb{30/165} \begin{gl} \item[170] {\rm Sq(1,1)[165]} \item[171] {\rm Sq(0,1)[167]} \item[172] {\rm Sq(3)[169] + Sq(0,1)[169] + Sq(3)[167] + Sq(0,1)[166]} \end{gl} \end{bdl} \begin{bdl} \item[29/165] \mb{29/165} \begin{gl} \item[173] {\rm Sq(0,1)[171] + Sq(0,1)[170]} \item[174] {\rm Sq(3)[173] + Sq(0,1)[173] + Sq(3)[169] + Sq(0,1)[169]} \item[175] {\rm Sq(3)[174] + Sq(0,1)[174] + Sq(3)[172] + Sq(0,1)[170] + Sq(3)[169]} \end{gl} \end{bdl} \begin{bdl} \item[27/165] \mb{27/165} \begin{gl} \item[185] {\rm Sq(1,1)[183] + Sq(4)[182] + Sq(1,1)[182]} \\ $h_{2}:$ [182] \item[186] {\rm Sq(1,1)[184]} \item[187] {\rm Sq(0,1)[186] + Sq(0,1)[185]} \item[188] {\rm Sq(3)[188] + Sq(0,1)[188] + Sq(0,1)[185]} \item[189] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{2}:$ [184] \item[190] {\rm Sq(1)[195] + Sq(1)[193]} \\ $h_{0}:$ [195], [193] \\ $h_{1}:$ [189] \\ $h_{2}:$ [184], [182] \end{gl} \end{bdl} \begin{bdl} \item[26/165] \mb{26/165} \begin{gl} \item[193] {\rm Sq(0,1)[190] + Sq(0,1)[189]} \item[194] {\rm Sq(3)[191] + Sq(3)[190]} \item[195] {\rm Sq(3)[193] + Sq(0,1)[191] + Sq(0,1)[189]} \end{gl} \end{bdl} \begin{bdl} \item[25/165] \mb{25/165} \begin{gl} \item[198] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \\ $h_{3}:$ [175], [174] \item[199] {\rm Sq(1)[201] + Sq(1)[200]} \\ $h_{0}:$ [201], [200] \\ $h_{2}:$ [193], [191], [190] \\ $h_{3}:$ [176], [174] \item[200] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [196] \\ $h_{2}:$ [191], [190] \\ $h_{3}:$ [175], [174] \end{gl} \end{bdl} \begin{bdl} \item[24/165] \mb{24/165} \begin{gl} \item[200] {\rm Sq(4)[197] + Sq(1,1)[197]} \\ $h_{2}:$ [197] \item[201] {\rm Sq(1,1)[199] + Sq(1,1)[197] + Sq(1,1)[196]} \item[202] {\rm Sq(0,1)[200]} \item[203] {\rm Sq(3)[201]} \item[204] {\rm Sq(3)[202] + Sq(0,1)[202]} \end{gl} \end{bdl} \begin{bdl} \item[23/165] \mb{23/165} \begin{gl} \item[205] {\rm Sq(0,1)[208] + Sq(0,1)[207]} \item[206] {\rm Sq(3)[209] + Sq(0,1)[209] + Sq(3)[208] + Sq(0,1)[207]} \item[207] {\rm Sq(1)[215] + Sq(1)[214]} \\ $h_{0}:$ [215], [214] \\ $h_{1}:$ [212] \\ $h_{4}:$ [169] \end{gl} \end{bdl} \begin{bdl} \item[22/165] \mb{22/165} \begin{gl} \item[214] {\rm Sq(3)[211] + Sq(0,1)[211]} \\ $h_{3}:$ [195] \item[215] {\rm Sq(1)[218] + Sq(1)[217]} \\ $h_{0}:$ [218], [217] \\ $h_{3}:$ [195] \item[216] {\rm Sq(1)[219] + Sq(1)[217]} \\ $h_{0}:$ [219], [217] \\ $h_{1}:$ [214] \\ $h_{3}:$ [200], [197], [196] \\ $h_{4}:$ [175], [174], [173], [172] \\ $h_{5}:$ [121] \\ $h_{6}:$ [54], [53] \end{gl} \end{bdl} \begin{bdl} \item[21/165] \mb{21/165} \begin{gl} \item[217] {\rm Sq(3)[213] + Sq(0,1)[212]} \item[218] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \item[219] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \\ $h_{3}:$ [198], [195] \\ $h_{4}:$ [175] \\ $h_{6}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[20/165] \mb{20/165} \begin{gl} \item[217] {\rm Sq(0,1)[220]} \item[218] {\rm Sq(3)[220]} \item[219] {\rm Sq(1)[226] + Sq(1)[225]} \\ $h_{0}:$ [226], [225] \\ $h_{3}:$ [206] \\ $h_{6}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[19/165] \mb{19/165} \begin{gl} \item[224] {\rm Sq(5)[222] + Sq(2,1)[222]} \item[225] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{2}:$ [224] \\ $h_{7}:$ [3] \item[226] {\rm Sq(1)[234] + Sq(1)[233]} \\ $h_{0}:$ [234], [233] \\ $h_{2}:$ [224] \\ $h_{3}:$ [213] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[18/165] \mb{18/165} \begin{gl} \item[232] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{7}:$ [3] \item[233] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{1}:$ [236] \item[234] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{1}:$ [236] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[17/165] \mb{17/165} \begin{gl} \item[237] {\rm Sq(2,1)[235] + Sq(2,1)[234]} \\ $h_{7}:$ [3] \item[238] {\rm Sq(1,1)[237]} \item[239] {\rm Sq(1,1)[239] + Sq(1,1)[238]} \\ $h_{7}:$ [3] \item[240] {\rm Sq(3)[240] + Sq(0,1)[240]} \end{gl} \end{bdl} \begin{bdl} \item[16/165] \mb{16/165} \begin{gl} \item[245] {\rm Sq(3)[244] + Sq(3)[243] + Sq(0,1)[243]} \item[246] {\rm Sq(3)[245] + Sq(3)[243] + Sq(0,1)[243]} \item[247] {\rm Sq(1)[254] + Sq(1)[252]} \\ $h_{0}:$ [254], [252] \\ $h_{2}:$ [239] \\ $h_{3}:$ [221], [220] \\ $h_{5}:$ [154], [153], [152], [151], [149] \item[248] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{1}:$ [248] \\ $h_{2}:$ [240] \\ $h_{3}:$ [220] \\ $h_{4}:$ [192] \\ $h_{5}:$ [154], [153], [152], [151], [149] \end{gl} \end{bdl} \begin{bdl} \item[15/165] \mb{15/165} \begin{gl} \item[252] {\rm Sq(3)[252]} \\ $h_{2}:$ [249], [248], [247] \item[253] {\rm Sq(2)[259] + Sq(2)[257]} \\ $h_{1}:$ [259], [257] \\ $h_{2}:$ [246] \item[254] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{2}:$ [249] \\ $h_{5}:$ [159], [158], [157], [156] \item[255] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{2}:$ [249] \\ $h_{5}:$ [159], [158], [157], [156] \end{gl} \end{bdl} \begin{bdl} \item[14/165] \mb{14/165} \begin{gl} \item[264] {\rm Sq(0,1)[261]} \\ $h_{5}:$ [161], [159] \item[265] {\rm Sq(3)[261]} \\ $h_{5}:$ [161], [159] \item[266] {\rm Sq(2)[269] + Sq(2)[267] + Sq(2)[266]} \\ $h_{1}:$ [269], [267], [266] \\ $h_{4}:$ [213], [212] \\ $h_{5}:$ [162] \\ $h_{6}:$ [78], [77] \item[267] {\rm Sq(1)[273] + Sq(1)[272]} \\ $h_{0}:$ [273], [272] \\ $h_{1}:$ [267], [266] \\ $h_{3}:$ [241] \\ $h_{5}:$ [161], [159] \item[268] {\rm Sq(1)[274] + Sq(1)[272] + Sq(1)[271]} \\ $h_{0}:$ [274], [272], [271] \\ $h_{1}:$ [267] \\ $h_{2}:$ [259] \\ $h_{3}:$ [242], [241] \end{gl} \end{bdl} \begin{bdl} \item[13/165] \mb{13/165} \begin{gl} \item[271] {\rm Sq(0,1)[274]} \\ $h_{2}:$ [267] \item[272] {\rm Sq(0,1)[275] + Sq(3)[274] + Sq(3)[273]} \\ $h_{2}:$ [270], [268], [267] \\ $h_{3}:$ [253] \item[273] {\rm Sq(3)[275] + Sq(3)[273]} \\ $h_{2}:$ [270], [268], [267] \\ $h_{3}:$ [253], [252] \item[274] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{3}:$ [252] \item[275] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{2}:$ [267] \\ $h_{3}:$ [255], [252], [251] \\ $h_{4}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[12/165] \mb{12/165} \begin{gl} \item[280] {\rm Sq(5)[279]} \item[281] {\rm Sq(3)[289] + Sq(3)[288]} \\ $h_{3}:$ [264] \item[282] {\rm Sq(3)[291] + Sq(0,1)[291] + Sq(3)[288] + Sq(0,1)[288]} \\ $h_{3}:$ [264] \item[283] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \\ $h_{3}:$ [266], [264] \\ $h_{4}:$ [234] \\ $h_{5}:$ [171], [170] \\ $h_{6}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[11/165] \mb{11/165} \begin{gl} \item[296] {\rm Sq(3)[285] + Sq(3)[284]} \\ $h_{4}:$ [232] \\ $h_{6}:$ [88] \item[297] {\rm Sq(2)[288] + Sq(2)[287]} \\ $h_{1}:$ [288], [287] \\ $h_{4}:$ [234], [232] \\ $h_{6}:$ [88] \item[298] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{2}:$ [281] \\ $h_{3}:$ [262] \\ $h_{4}:$ [232] \\ $h_{6}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[10/165] \mb{10/165} \begin{gl} \item[291] {\rm Sq(1,1)[254] + Sq(1,1)[253]} \item[292] {\rm Sq(2)[261] + Sq(2)[260]} \\ $h_{1}:$ [261], [260] \item[293] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{1}:$ [260] \\ $h_{2}:$ [253] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[9/165] \mb{9/165} \begin{gl} \item[263] {\rm Sq(3)[223] + Sq(0,1)[223] + Sq(3)[222] + Sq(0,1)[222]} \\ $h_{3}:$ [204] \item[264] {\rm Sq(2)[226] + Sq(2)[225]} \\ $h_{1}:$ [226], [225] \\ $h_{5}:$ [148] \item[265] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{2}:$ [218], [217] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[8/165] \mb{8/165} \begin{gl} \item[230] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[7/165] \mb{7/165} \begin{gl} \item[196] {\rm Sq(6)[154]} \\ $h_{3}:$ [150] \\ $h_{5}:$ [110] \item[197] {\rm Sq(3,1)[155]} \\ $h_{7}:$ [16] \item[198] {\rm Sq(2)[159]} \\ $h_{1}:$ [159] \\ $h_{2}:$ [156] \\ $h_{3}:$ [150], [149] \\ $h_{4}:$ [141] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[6/165] \mb{6/165} \begin{gl} \item[162] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [111] \\ $h_{5}:$ [87] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[5/165] \mb{5/165} \begin{gl} \item[117] {\rm Sq(5,1)[75] + Sq(2,2)[75]} \\ $h_{7}:$ [16] \item[118] {\rm Sq(2)[79]} \\ $h_{1}:$ [79] \\ $h_{7}:$ [16] \item[119] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [76] \\ $h_{5}:$ [62] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[4/165] \mb{4/165} \begin{gl} \item[81] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [51] \\ $h_{5}:$ [44] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[3/165] \mb{3/165} \begin{gl} \item[54] {\rm Sq(8)[27]} \\ $h_{3}:$ [27] \\ $h_{5}:$ [25] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \dm{166} \begin{bdl} \item[82/166] \mb{82/166} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[81/166] \mb{81/166} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[80/166] \mb{80/166} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[73/166] \mb{73/166} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[72/166] \mb{72/166} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[71/166] \mb{71/166} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[70/166] \mb{70/166} \begin{gl} \item[16] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[69/166] \mb{69/166} \begin{gl} \item[20] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[68/166] \mb{68/166} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[67/166] \mb{67/166} \begin{gl} \item[18] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[66/166] \mb{66/166} \begin{gl} \item[22] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[65/166] \mb{65/166} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[64/166] \mb{64/166} \begin{gl} \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[63/166] \mb{63/166} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[62/166] \mb{62/166} \begin{gl} \item[29] {\rm Sq(0,1)[30]} \item[30] {\rm Sq(0,1)[31]} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[59/166] \mb{59/166} \begin{gl} \item[40] {\rm Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[57/166] \mb{57/166} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \\ $h_{2}:$ [39] \\ $h_{3}:$ [34] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41], [39] \\ $h_{3}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[56/166] \mb{56/166} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \\ $h_{3}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[55/166] \mb{55/166} \begin{gl} \item[47] {\rm Sq(0,1)[48]} \item[48] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[54/166] \mb{54/166} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[53/166] \mb{53/166} \begin{gl} \item[52] {\rm Sq(0,1)[49]} \item[53] {\rm Sq(0,1)[50]} \item[54] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[52/166] \mb{52/166} \begin{gl} \item[52] {\rm Sq(0,1)[55]} \item[53] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[51/166] \mb{51/166} \begin{gl} \item[59] {\rm Sq(3)[64]} \item[60] {\rm Sq(2)[65]} \\ $h_{1}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[50/166] \mb{50/166} \begin{gl} \item[67] {\rm Sq(0,1)[67]} \item[68] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[49/166] \mb{49/166} \begin{gl} \item[70] {\rm Sq(0,1)[67]} \item[71] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[48/166] \mb{48/166} \begin{gl} \item[71] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[47/166] \mb{47/166} \begin{gl} \item[74] {\rm Sq(0,1)[77]} \item[75] {\rm Sq(0,1)[78]} \item[76] {\rm Sq(0,1)[79]} \item[77] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{2}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[46/166] \mb{46/166} \begin{gl} \item[80] {\rm Sq(1,1)[81]} \item[81] {\rm Sq(0,1)[82]} \item[82] {\rm Sq(2)[85]} \\ $h_{1}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[44/166] \mb{44/166} \begin{gl} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(0,1)[95]} \item[94] {\rm Sq(0,1)[96]} \end{gl} \end{bdl} \begin{bdl} \item[43/166] \mb{43/166} \begin{gl} \item[102] {\rm Sq(0,1)[100]} \item[103] {\rm Sq(0,1)[101]} \end{gl} \end{bdl} \begin{bdl} \item[41/166] \mb{41/166} \begin{gl} \item[107] {\rm Sq(0,1)[102]} \item[108] {\rm Sq(0,1)[103]} \item[109] {\rm Sq(0,1)[104]} \item[110] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{1}:$ [107] \\ $h_{2}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[40/166] \mb{40/166} \begin{gl} \item[109] {\rm Sq(0,1)[109]} \item[110] {\rm Sq(0,1)[110]} \item[111] {\rm Sq(0,1)[111]} \end{gl} \end{bdl} \begin{bdl} \item[38/166] \mb{38/166} \begin{gl} \item[122] {\rm Sq(0,1)[121]} \item[123] {\rm Sq(0,1)[122]} \item[124] {\rm Sq(0,1)[123]} \item[125] {\rm Sq(2)[125] + Sq(2)[124]} \\ $h_{1}:$ [125], [124] \end{gl} \end{bdl} \begin{bdl} \item[37/166] \mb{37/166} \begin{gl} \item[126] {\rm Sq(0,1)[129]} \item[127] {\rm Sq(0,1)[130]} \item[128] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[36/166] \mb{36/166} \begin{gl} \item[135] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[35/166] \mb{35/166} \begin{gl} \item[149] {\rm Sq(0,1)[152]} \item[150] {\rm Sq(0,1)[153]} \item[151] {\rm Sq(0,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[34/166] \mb{34/166} \begin{gl} \item[158] {\rm Sq(0,1)[152]} \item[159] {\rm Sq(0,1)[153]} \item[160] {\rm Sq(0,1)[154]} \item[161] {\rm Sq(1)[162] + Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [162], [161], [160] \\ $h_{3}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[33/166] \mb{33/166} \begin{gl} \item[159] {\rm Sq(0,1)[154]} \item[160] {\rm Sq(1)[162] + Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [162], [161], [160] \\ $h_{1}:$ [159], [158], [156] \item[161] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{1}:$ [155] \item[162] {\rm Sq(1)[165] + Sq(1)[161] + Sq(1)[160]} \\ $h_{0}:$ [165], [161], [160] \\ $h_{1}:$ [159], [158], [156], [155] \\ $h_{3}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[32/166] \mb{32/166} \begin{gl} \item[160] {\rm Sq(0,1)[162]} \item[161] {\rm Sq(0,1)[163]} \item[162] {\rm Sq(3)[163] + Sq(3)[162]} \item[163] {\rm Sq(0,1)[164]} \item[164] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \item[165] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{3}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[31/166] \mb{31/166} \begin{gl} \item[166] {\rm Sq(1,1)[165]} \item[167] {\rm Sq(0,1)[168] + Sq(0,1)[167]} \item[168] {\rm Sq(0,1)[169] + Sq(0,1)[167]} \item[169] {\rm Sq(1)[175] + Sq(1)[173]} \\ $h_{0}:$ [175], [173] \\ $h_{3}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[30/166] \mb{30/166} \begin{gl} \item[173] {\rm Sq(1,1)[169] + Sq(1,1)[167] + Sq(1,1)[166]} \item[174] {\rm Sq(2)[174]} \\ $h_{1}:$ [174] \item[175] {\rm Sq(1)[178] + Sq(1)[176]} \\ $h_{0}:$ [178], [176] \item[176] {\rm Sq(1)[179] + Sq(1)[176]} \\ $h_{0}:$ [179], [176] \\ $h_{2}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[29/166] \mb{29/166} \begin{gl} \item[176] {\rm Sq(0,1)[175]} \item[177] {\rm Sq(0,1)[176]} \item[178] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \item[179] {\rm Sq(1)[182] + Sq(1)[181]} \\ $h_{0}:$ [182], [181] \\ $h_{2}:$ [171] \end{gl} \end{bdl} \begin{bdl} \item[28/166] \mb{28/166} \begin{gl} \item[180] {\rm Sq(2,1)[173] + Sq(2,1)[171]} \item[181] {\rm Sq(3)[182] + Sq(0,1)[181]} \item[182] {\rm Sq(0,1)[183] + Sq(0,1)[182] + Sq(0,1)[181]} \item[183] {\rm Sq(3)[184] + Sq(0,1)[184]} \\ $h_{2}:$ [177] \end{gl} \end{bdl} \begin{bdl} \item[27/166] \mb{27/166} \begin{gl} \item[191] {\rm Sq(3)[189]} \end{gl} \end{bdl} \begin{bdl} \item[26/166] \mb{26/166} \begin{gl} \item[196] {\rm Sq(1,1)[191] + Sq(1,1)[190]} \item[197] {\rm Sq(0,1)[194]} \item[198] {\rm Sq(0,1)[195]} \item[199] {\rm Sq(2)[198]} \\ $h_{1}:$ [198] \\ $h_{2}:$ [193], [191] \\ $h_{3}:$ [176] \end{gl} \end{bdl} \begin{bdl} \item[25/166] \mb{25/166} \begin{gl} \item[201] {\rm Sq(0,1)[197]} \item[202] {\rm Sq(0,1)[198] + Sq(3)[196] + Sq(3)[195] + Sq(0,1)[195]} \item[203] {\rm Sq(2)[204] + Sq(2)[201]} \\ $h_{1}:$ [204], [201] \end{gl} \end{bdl} \begin{bdl} \item[24/166] \mb{24/166} \begin{gl} \item[205] {\rm Sq(2)[206] + Sq(2)[205]} \\ $h_{1}:$ [206], [205] \\ $h_{3}:$ [189], [188], [186] \end{gl} \end{bdl} \begin{bdl} \item[23/166] \mb{23/166} \begin{gl} \item[208] {\rm Sq(5)[204] + Sq(2,1)[204]} \item[209] {\rm Sq(3)[213] + Sq(0,1)[213]} \item[210] {\rm Sq(2)[214]} \\ $h_{1}:$ [214] \\ $h_{3}:$ [198] \item[211] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \\ $h_{2}:$ [209], [208] \end{gl} \end{bdl} \begin{bdl} \item[22/166] \mb{22/166} \begin{gl} \item[217] {\rm Sq(0,1)[213]} \item[218] {\rm Sq(3)[214] + Sq(3)[212] + Sq(0,1)[212]} \\ $h_{2}:$ [209] \item[219] {\rm Sq(3)[216] + Sq(0,1)[216] + Sq(3)[215] + Sq(0,1)[215] + Sq(3)[212]} \\ $h_{2}:$ [209] \item[220] {\rm Sq(1)[222] + Sq(1)[220]} \\ $h_{0}:$ [222], [220] \\ $h_{2}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[21/166] \mb{21/166} \begin{gl} \item[220] {\rm Sq(3)[216] + Sq(0,1)[216]} \item[221] {\rm Sq(2)[218] + Sq(2)[217]} \\ $h_{1}:$ [218], [217] \\ $h_{5}:$ [131] \item[222] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \item[223] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[20/166] \mb{20/166} \begin{gl} \item[220] {\rm Sq(1,1)[220]} \item[221] {\rm Sq(2)[224]} \\ $h_{1}:$ [224] \item[222] {\rm Sq(1)[229] + Sq(1)[227]} \\ $h_{0}:$ [229], [227] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[19/166] \mb{19/166} \begin{gl} \item[227] {\rm Sq(3,1)[222] + Sq(0,2)[222]} \item[228] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{3}:$ [217], [215], [214] \item[229] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[18/166] \mb{18/166} \begin{gl} \item[235] {\rm Sq(0,1)[235]} \\ $h_{3}:$ [221] \item[236] {\rm Sq(3)[236] + Sq(0,1)[236]} \\ $h_{3}:$ [221] \item[237] {\rm Sq(2)[237]} \\ $h_{1}:$ [237] \\ $h_{3}:$ [221] \\ $h_{7}:$ [4] \item[238] {\rm Sq(2)[238]} \\ $h_{1}:$ [238] \item[239] {\rm Sq(1)[242] + Sq(1)[241]} \\ $h_{0}:$ [242], [241] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[17/166] \mb{17/166} \begin{gl} \item[241] {\rm Sq(1,1)[240]} \item[242] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[16/166] \mb{16/166} \begin{gl} \item[249] {\rm Sq(1,1)[247]} \\ $h_{7}:$ [5] \item[250] {\rm Sq(3)[250] + Sq(0,1)[250] + Sq(3)[249] + Sq(0,1)[249]} \end{gl} \end{bdl} \begin{bdl} \item[15/166] \mb{15/166} \begin{gl} \item[256] {\rm Sq(3)[262] + Sq(0,1)[262] + Sq(3)[260] + Sq(0,1)[260] + Sq(0,1)[259] + Sq(3)[258] + Sq(0,1)[258]} \item[257] {\rm Sq(1)[270] + Sq(1)[269]} \\ $h_{0}:$ [270], [269] \\ $h_{1}:$ [264] \\ $h_{2}:$ [254] \\ $h_{3}:$ [234] \\ $h_{5}:$ [164], [162], [161] \item[258] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{2}:$ [255], [252] \\ $h_{7}:$ [8] \item[259] {\rm Sq(1)[272] + Sq(1)[269]} \\ $h_{0}:$ [272], [269] \\ $h_{1}:$ [266] \\ $h_{2}:$ [256], [252] \\ $h_{3}:$ [234], [233] \\ $h_{4}:$ [206], [205] \\ $h_{5}:$ [163] \\ $h_{6}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[14/166] \mb{14/166} \begin{gl} \item[269] {\rm Sq(3)[269] + Sq(3)[268] + Sq(0,1)[268] + Sq(3)[267] + Sq(3)[266]} \\ $h_{3}:$ [245] \\ $h_{5}:$ [164] \item[270] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{2}:$ [261] \\ $h_{3}:$ [245] \\ $h_{5}:$ [166] \item[271] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{2}:$ [262] \\ $h_{7}:$ [10] \item[272] {\rm Sq(1)[279]} \\ $h_{0}:$ [279] \\ $h_{2}:$ [264] \\ $h_{3}:$ [245] \\ $h_{5}:$ [165], [164] \\ $h_{6}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[13/166] \mb{13/166} \begin{gl} \item[276] {\rm Sq(1,1)[276] + Sq(1,1)[275]} \\ $h_{5}:$ [167] \item[277] {\rm Sq(0,1)[277]} \\ $h_{7}:$ [9] \item[278] {\rm Sq(2)[282] + Sq(2)[281]} \\ $h_{1}:$ [282], [281] \\ $h_{5}:$ [167] \\ $h_{7}:$ [9] \item[279] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{2}:$ [274] \\ $h_{6}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[12/166] \mb{12/166} \begin{gl} \item[284] {\rm Sq(3)[293] + Sq(0,1)[293] + Sq(3)[292] + Sq(0,1)[292]} \item[285] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{3}:$ [273], [272] \\ $h_{4}:$ [237] \item[286] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{3}:$ [274], [272] \\ $h_{4}:$ [237] \item[287] {\rm Sq(1)[302]} \\ $h_{0}:$ [302] \\ $h_{1}:$ [297], [296] \\ $h_{2}:$ [287] \\ $h_{3}:$ [275], [274], [272] \\ $h_{4}:$ [241], [239], [236] \\ $h_{5}:$ [173] \end{gl} \end{bdl} \begin{bdl} \item[11/166] \mb{11/166} \begin{gl} \item[299] {\rm Sq(0,1)[287]} \\ $h_{3}:$ [268] \item[300] {\rm Sq(3)[288]} \\ $h_{3}:$ [269] \item[301] {\rm Sq(1)[295] + Sq(1)[294]} \\ $h_{0}:$ [295], [294] \\ $h_{1}:$ [292] \\ $h_{2}:$ [284] \\ $h_{3}:$ [270] \\ $h_{4}:$ [238], [236] \\ $h_{5}:$ [178], [176], [175] \item[302] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \\ $h_{3}:$ [270], [269] \\ $h_{4}:$ [238], [236] \end{gl} \end{bdl} \begin{bdl} \item[10/166] \mb{10/166} \begin{gl} \item[294] {\rm Sq(0,1)[260]} \\ $h_{5}:$ [168] \\ $h_{7}:$ [18] \item[295] {\rm Sq(0,1)[261]} \\ $h_{7}:$ [18] \item[296] {\rm Sq(3)[261] + Sq(3)[260]} \end{gl} \end{bdl} \begin{bdl} \item[8/166] \mb{8/166} \begin{gl} \item[231] {\rm Sq(1,1)[192] + Sq(1,1)[190]} \item[232] {\rm Sq(2)[197]} \\ $h_{1}:$ [197] \\ $h_{2}:$ [190] \\ $h_{3}:$ [181] \\ $h_{7}:$ [16] \item[233] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \\ $h_{1}:$ [196] \\ $h_{3}:$ [183] \\ $h_{5}:$ [131], [130], [128] \end{gl} \end{bdl} \begin{bdl} \item[7/166] \mb{7/166} \begin{gl} \item[199] {\rm Sq(3)[160] + Sq(0,1)[159]} \\ $h_{3}:$ [153] \\ $h_{5}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[6/166] \mb{6/166} \begin{gl} \item[163] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \\ $h_{3}:$ [112] \\ $h_{7}:$ [19] \item[164] {\rm Sq(2)[118]} \\ $h_{1}:$ [118] \\ $h_{2}:$ [115] \\ $h_{3}:$ [112] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[5/166] \mb{5/166} \begin{gl} \item[120] {\rm Sq(3)[80] + Sq(0,1)[80] + Sq(3)[79]} \\ $h_{5}:$ [63] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[4/166] \mb{4/166} \begin{gl} \item[82] {\rm Sq(2)[54]} \\ $h_{1}:$ [54] \\ $h_{3}:$ [52] \\ $h_{5}:$ [45] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \dm{167} \begin{bdl} \item[84/167] \mb{84/167} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[83/167] \mb{83/167} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[82/167] \mb{82/167} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[81/167] \mb{81/167} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[80/167] \mb{80/167} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[79/167] \mb{79/167} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[78/167] \mb{78/167} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[77/167] \mb{77/167} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[76/167] \mb{76/167} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[73/167] \mb{73/167} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[70/167] \mb{70/167} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[68/167] \mb{68/167} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[67/167] \mb{67/167} \begin{gl} \item[20] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[64/167] \mb{64/167} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[63/167] \mb{63/167} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [31] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[62/167] \mb{62/167} \begin{gl} \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [30] \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[61/167] \mb{61/167} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \item[35] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[60/167] \mb{60/167} \begin{gl} \item[35] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[59/167] \mb{59/167} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [42] \\ $h_{4}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[58/167] \mb{58/167} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[57/167] \mb{57/167} \begin{gl} \item[50] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[55/167] \mb{55/167} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[54/167] \mb{54/167} \begin{gl} \item[53] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[52/167] \mb{52/167} \begin{gl} \item[54] {\rm Sq(0,1)[56]} \item[55] {\rm Sq(0,1)[57]} \item[56] {\rm Sq(2)[60]} \\ $h_{1}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[51/167] \mb{51/167} \begin{gl} \item[61] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[49/167] \mb{49/167} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[48/167] \mb{48/167} \begin{gl} \item[73] {\rm Sq(0,1)[73]} \end{gl} \end{bdl} \begin{bdl} \item[47/167] \mb{47/167} \begin{gl} \item[78] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{1}:$ [82] \\ $h_{2}:$ [77] \\ $h_{3}:$ [68] \item[79] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [80] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[46/167] \mb{46/167} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(0,1)[86]} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[45/167] \mb{45/167} \begin{gl} \item[88] {\rm Sq(1,1)[89]} \item[89] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[44/167] \mb{44/167} \begin{gl} \item[95] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \item[96] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{2}:$ [97] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[43/167] \mb{43/167} \begin{gl} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(0,1)[105]} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[42/167] \mb{42/167} \begin{gl} \item[109] {\rm Sq(0,1)[103]} \item[110] {\rm Sq(0,1)[104]} \item[111] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[40/167] \mb{40/167} \begin{gl} \item[112] {\rm Sq(0,1)[114]} \item[113] {\rm Sq(0,1)[115]} \item[114] {\rm Sq(0,1)[116]} \end{gl} \end{bdl} \begin{bdl} \item[39/167] \mb{39/167} \begin{gl} \item[118] {\rm Sq(0,1)[118]} \item[119] {\rm Sq(0,1)[119]} \item[120] {\rm Sq(0,1)[120]} \item[121] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{1}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[38/167] \mb{38/167} \begin{gl} \item[126] {\rm Sq(0,1)[125] + Sq(3)[124] + Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[37/167] \mb{37/167} \begin{gl} \item[129] {\rm Sq(0,1)[132]} \item[130] {\rm Sq(0,1)[133]} \item[131] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[36/167] \mb{36/167} \begin{gl} \item[136] {\rm Sq(0,1)[145]} \item[137] {\rm Sq(0,1)[146]} \item[138] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[35/167] \mb{35/167} \begin{gl} \item[152] {\rm Sq(0,1)[156]} \end{gl} \end{bdl} \begin{bdl} \item[34/167] \mb{34/167} \begin{gl} \item[162] {\rm Sq(0,1)[155]} \item[163] {\rm Sq(0,1)[156]} \item[164] {\rm Sq(0,1)[157]} \end{gl} \end{bdl} \begin{bdl} \item[33/167] \mb{33/167} \begin{gl} \item[163] {\rm Sq(0,1)[157] + Sq(0,1)[156] + Sq(3)[155]} \item[164] {\rm Sq(0,1)[158]} \item[165] {\rm Sq(3)[159] + Sq(3)[158] + Sq(3)[156] + Sq(0,1)[156]} \item[166] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{1}:$ [162], [161], [160] \\ $h_{3}:$ [144], [141] \\ $h_{4}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[32/167] \mb{32/167} \begin{gl} \item[166] {\rm Sq(0,1)[165]} \item[167] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{3}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[31/167] \mb{31/167} \begin{gl} \item[170] {\rm Sq(0,1)[170]} \item[171] {\rm Sq(0,1)[171]} \item[172] {\rm Sq(0,1)[172]} \item[173] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{1}:$ [174] \item[174] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{3}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[30/167] \mb{30/167} \begin{gl} \item[177] {\rm Sq(0,1)[173]} \item[178] {\rm Sq(0,1)[175] + Sq(3)[174]} \item[179] {\rm Sq(1)[181] + Sq(1)[180]} \\ $h_{0}:$ [181], [180] \item[180] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{3}:$ [157], [155] \end{gl} \end{bdl} \begin{bdl} \item[29/167] \mb{29/167} \begin{gl} \item[180] {\rm Sq(1,1)[175]} \item[181] {\rm Sq(1,1)[176]} \item[182] {\rm Sq(1,1)[178] + Sq(1,1)[177]} \item[183] {\rm Sq(2)[180]} \\ $h_{1}:$ [180] \item[184] {\rm Sq(1)[187] + Sq(1)[186]} \\ $h_{0}:$ [187], [186] \\ $h_{1}:$ [182], [181] \\ $h_{2}:$ [178] \item[185] {\rm Sq(1)[189] + Sq(1)[188]} \\ $h_{0}:$ [189], [188] \end{gl} \end{bdl} \begin{bdl} \item[28/167] \mb{28/167} \begin{gl} \item[184] {\rm Sq(0,1)[187]} \item[185] {\rm Sq(0,1)[188] + Sq(0,1)[186]} \item[186] {\rm Sq(3)[189] + Sq(0,1)[189] + Sq(3)[188] + Sq(3)[186] + Sq(3)[185] + Sq(0,1)[185]} \item[187] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{2}:$ [183] \item[188] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{2}:$ [182] \item[189] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{2}:$ [182] \end{gl} \end{bdl} \begin{bdl} \item[27/167] \mb{27/167} \begin{gl} \item[192] {\rm Sq(0,1)[193]} \item[193] {\rm Sq(0,1)[194]} \item[194] {\rm Sq(3)[194]} \item[195] {\rm Sq(3)[195] + Sq(3)[193]} \end{gl} \end{bdl} \begin{bdl} \item[26/167] \mb{26/167} \begin{gl} \item[200] {\rm Sq(3)[198]} \item[201] {\rm Sq(1)[205] + Sq(1)[204]} \\ $h_{0}:$ [205], [204] \\ $h_{2}:$ [196] \\ $h_{3}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[25/167] \mb{25/167} \begin{gl} \item[204] {\rm Sq(1,1)[196] + Sq(1,1)[195]} \item[205] {\rm Sq(1,1)[199] + Sq(1,1)[198] + Sq(4)[195]} \\ $h_{2}:$ [195] \\ $h_{3}:$ [183] \item[206] {\rm Sq(0,1)[202]} \end{gl} \end{bdl} \begin{bdl} \item[24/167] \mb{24/167} \begin{gl} \item[206] {\rm Sq(1,1)[204] + Sq(1,1)[203]} \item[207] {\rm Sq(0,1)[205]} \item[208] {\rm Sq(2)[209] + Sq(2)[208]} \\ $h_{1}:$ [209], [208] \end{gl} \end{bdl} \begin{bdl} \item[23/167] \mb{23/167} \begin{gl} \item[212] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \end{gl} \end{bdl} \begin{bdl} \item[22/167] \mb{22/167} \begin{gl} \item[221] {\rm Sq(3)[219] + Sq(0,1)[219] + Sq(3)[218] + Sq(0,1)[218]} \item[222] {\rm Sq(1)[226] + Sq(1)[225] + Sq(1)[224]} \\ $h_{0}:$ [226], [225], [224] \\ $h_{1}:$ [221], [220] \\ $h_{2}:$ [212] \\ $h_{5}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[21/167] \mb{21/167} \begin{gl} \item[224] {\rm Sq(0,1)[217]} \item[225] {\rm Sq(0,1)[218] + Sq(3)[217]} \item[226] {\rm Sq(3)[218] + Sq(3)[217]} \item[227] {\rm Sq(2)[220]} \\ $h_{1}:$ [220] \item[228] {\rm Sq(1)[226] + Sq(1)[224] + Sq(1)[223]} \\ $h_{0}:$ [226], [224], [223] \\ $h_{1}:$ [221] \\ $h_{2}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[20/167] \mb{20/167} \begin{gl} \item[223] {\rm Sq(3,1)[218] + Sq(0,2)[218]} \item[224] {\rm Sq(0,1)[224]} \item[225] {\rm Sq(3)[225] + Sq(0,1)[225]} \\ $h_{7}:$ [3] \item[226] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \end{gl} \end{bdl} \begin{bdl} \item[19/167] \mb{19/167} \begin{gl} \item[230] {\rm Sq(3)[234] + Sq(0,1)[234] + Sq(3)[233] + Sq(0,1)[233] + Sq(3)[232] + Sq(0,1)[232]} \item[231] {\rm Sq(2)[237] + Sq(2)[236]} \\ $h_{1}:$ [237], [236] \\ $h_{3}:$ [219] \\ $h_{7}:$ [5] \item[232] {\rm Sq(2)[238]} \\ $h_{1}:$ [238] \\ $h_{4}:$ [193] \\ $h_{6}:$ [68] \item[233] {\rm Sq(1)[242] + Sq(1)[240]} \\ $h_{0}:$ [242], [240] \\ $h_{2}:$ [231] \\ $h_{3}:$ [221] \\ $h_{4}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[18/167] \mb{18/167} \begin{gl} \item[240] {\rm Sq(3)[239] + Sq(0,1)[239] + Sq(3)[238] + Sq(0,1)[238] + Sq(3)[237] + Sq(0,1)[237]} \item[241] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{1}:$ [241] \item[242] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{2}:$ [236] \\ $h_{3}:$ [226] \end{gl} \end{bdl} \begin{bdl} \item[17/167] \mb{17/167} \begin{gl} \item[243] {\rm Sq(3,1)[239] + Sq(3,1)[238] + Sq(6)[237] + Sq(0,2)[237]} \item[244] {\rm Sq(2)[250]} \\ $h_{1}:$ [250] \\ $h_{3}:$ [229] \item[245] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{3}:$ [231], [230] \end{gl} \end{bdl} \begin{bdl} \item[16/167] \mb{16/167} \begin{gl} \item[251] {\rm Sq(3)[254] + Sq(0,1)[254] + Sq(3)[252] + Sq(0,1)[252]} \\ $h_{3}:$ [231], [230] \end{gl} \end{bdl} \begin{bdl} \item[15/167] \mb{15/167} \begin{gl} \item[260] {\rm Sq(3)[265] + Sq(3)[264]} \end{gl} \end{bdl} \begin{bdl} \item[14/167] \mb{14/167} \begin{gl} \item[273] {\rm Sq(3)[273] + Sq(0,1)[273] + Sq(3)[272] + Sq(0,1)[272]} \item[274] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{2}:$ [266] \\ $h_{3}:$ [250], [248], [247], [246] \item[275] {\rm Sq(1)[283] + Sq(1)[281]} \\ $h_{0}:$ [283], [281] \\ $h_{1}:$ [277] \\ $h_{2}:$ [270], [268], [267], [266] \\ $h_{3}:$ [250], [248], [247], [246] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[13/167] \mb{13/167} \begin{gl} \item[280] {\rm Sq(0,1)[280]} \\ $h_{3}:$ [260] \item[281] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \\ $h_{2}:$ [277] \\ $h_{7}:$ [10] \item[282] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{1}:$ [284] \\ $h_{5}:$ [171] \item[283] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{3}:$ [260] \end{gl} \end{bdl} \begin{bdl} \item[12/167] \mb{12/167} \begin{gl} \item[288] {\rm Sq(1,1)[295] + Sq(1,1)[294] + Sq(1,1)[292]} \\ $h_{7}:$ [9] \item[289] {\rm Sq(3)[296] + Sq(0,1)[296]} \item[290] {\rm Sq(3)[297] + Sq(0,1)[296]} \end{gl} \end{bdl} \begin{bdl} \item[11/167] \mb{11/167} \begin{gl} \item[303] {\rm Sq(3)[292] + Sq(3)[291] + Sq(0,1)[291]} \\ $h_{3}:$ [275], [274], [273] \item[304] {\rm Sq(2)[295]} \\ $h_{1}:$ [295] \\ $h_{3}:$ [275], [274], [273] \\ $h_{7}:$ [13] \item[305] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \\ $h_{1}:$ [296], [294] \\ $h_{2}:$ [289], [288], [287] \\ $h_{3}:$ [275], [272] \\ $h_{5}:$ [183], [182], [181], [179] \\ $h_{6}:$ [91] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[10/167] \mb{10/167} \begin{gl} \item[297] {\rm Sq(3)[264] + Sq(3)[263]} \\ $h_{2}:$ [261], [260] \\ $h_{5}:$ [171], [170] \\ $h_{6}:$ [97] \item[298] {\rm Sq(1)[267]} \\ $h_{0}:$ [267] \\ $h_{6}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[9/167] \mb{9/167} \begin{gl} \item[266] {\rm Sq(0,2)[218] + Sq(0,2)[217]} \\ $h_{7}:$ [18] \item[267] {\rm Sq(6)[220] + Sq(0,2)[220] + Sq(6)[219] + Sq(3,1)[219] + Sq(0,2)[219]} \item[268] {\rm Sq(2)[231]} \\ $h_{1}:$ [231] \end{gl} \end{bdl} \begin{bdl} \item[7/167] \mb{7/167} \begin{gl} \item[200] {\rm Sq(3)[162] + Sq(0,1)[162]} \\ $h_{5}:$ [114] \\ $h_{7}:$ [18] \item[201] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{1}:$ [163] \\ $h_{3}:$ [155] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[6/167] \mb{6/167} \begin{gl} \item[165] {\rm Sq(2)[120]} \\ $h_{1}:$ [120] \\ $h_{5}:$ [89] \\ $h_{7}:$ [20] \item[166] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{3}:$ [113] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[5/167] \mb{5/167} \begin{gl} \item[121] {\rm Sq(1,1)[79]} \\ $h_{7}:$ [19] \item[122] {\rm Sq(2)[82]} \\ $h_{1}:$ [82] \\ $h_{2}:$ [80] \\ $h_{3}:$ [77] \\ $h_{5}:$ [64] \\ $h_{7}:$ [20], [19] \end{gl} \end{bdl} \dm{168} \begin{bdl} \item[83/168] \mb{83/168} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[82/168] \mb{82/168} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[77/168] \mb{77/168} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[76/168] \mb{76/168} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[75/168] \mb{75/168} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[74/168] \mb{74/168} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[72/168] \mb{72/168} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[69/168] \mb{69/168} \begin{gl} \item[21] {\rm Sq(0,1)[19]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[68/168] \mb{68/168} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[67/168] \mb{67/168} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[66/168] \mb{66/168} \begin{gl} \item[23] {\rm Sq(0,1)[26]} \item[24] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[63/168] \mb{63/168} \begin{gl} \item[31] {\rm Sq(0,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[61/168] \mb{61/168} \begin{gl} \item[36] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[60/168] \mb{60/168} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[59/168] \mb{59/168} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[58/168] \mb{58/168} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[57/168] \mb{57/168} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[56/168] \mb{56/168} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[54/168] \mb{54/168} \begin{gl} \item[54] {\rm Sq(0,1)[52]} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[53/168] \mb{53/168} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{1}:$ [56] \\ $h_{2}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[52/168] \mb{52/168} \begin{gl} \item[57] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{2}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[51/168] \mb{51/168} \begin{gl} \item[62] {\rm Sq(0,1)[67]} \item[63] {\rm Sq(0,1)[68]} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[50/168] \mb{50/168} \begin{gl} \item[69] {\rm Sq(1,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[49/168] \mb{49/168} \begin{gl} \item[74] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[48/168] \mb{48/168} \begin{gl} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \item[76] {\rm Sq(0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[47/168] \mb{47/168} \begin{gl} \item[80] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[46/168] \mb{46/168} \begin{gl} \item[87] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{3}:$ [77], [76] \end{gl} \end{bdl} \begin{bdl} \item[45/168] \mb{45/168} \begin{gl} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(0,1)[93]} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{1}:$ [95] \item[94] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{3}:$ [79], [78] \end{gl} \end{bdl} \begin{bdl} \item[44/168] \mb{44/168} \begin{gl} \item[97] {\rm Sq(0,1)[102]} \item[98] {\rm Sq(0,1)[103]} \item[99] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{3}:$ [87], [84] \end{gl} \end{bdl} \begin{bdl} \item[43/168] \mb{43/168} \begin{gl} \item[108] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [109] \\ $h_{2}:$ [107] \\ $h_{4}:$ [73] \item[109] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{3}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[42/168] \mb{42/168} \begin{gl} \item[112] {\rm Sq(0,1)[107]} \item[113] {\rm Sq(0,1)[108]} \item[114] {\rm Sq(0,1)[109]} \item[115] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{2}:$ [103] \item[116] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[41/168] \mb{41/168} \begin{gl} \item[111] {\rm Sq(0,1)[109]} \item[112] {\rm Sq(0,1)[110]} \item[113] {\rm Sq(0,1)[111]} \item[114] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[40/168] \mb{40/168} \begin{gl} \item[115] {\rm Sq(2,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[39/168] \mb{39/168} \begin{gl} \item[122] {\rm Sq(0,1)[122]} \item[123] {\rm Sq(0,1)[123]} \item[124] {\rm Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[38/168] \mb{38/168} \begin{gl} \item[127] {\rm Sq(0,1)[126]} \item[128] {\rm Sq(0,1)[127]} \item[129] {\rm Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[37/168] \mb{37/168} \begin{gl} \item[132] {\rm Sq(0,1)[135]} \end{gl} \end{bdl} \begin{bdl} \item[36/168] \mb{36/168} \begin{gl} \item[139] {\rm Sq(0,1)[149]} \item[140] {\rm Sq(0,1)[150]} \item[141] {\rm Sq(0,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[35/168] \mb{35/168} \begin{gl} \item[153] {\rm Sq(0,1)[158]} \item[154] {\rm Sq(0,1)[159]} \item[155] {\rm Sq(0,1)[160]} \item[156] {\rm Sq(3)[161] + Sq(0,1)[161]} \end{gl} \end{bdl} \begin{bdl} \item[34/168] \mb{34/168} \begin{gl} \item[165] {\rm Sq(3)[162] + Sq(0,1)[162] + Sq(3)[161] + Sq(0,1)[161] + Sq(3)[160] + Sq(0,1)[160] + Sq(0,1)[159]} \item[166] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{2}:$ [158], [155] \end{gl} \end{bdl} \begin{bdl} \item[33/168] \mb{33/168} \begin{gl} \item[167] {\rm Sq(3)[164] + Sq(0,1)[164] + Sq(0,1)[163] + Sq(0,1)[162] + Sq(0,1)[161]} \item[168] {\rm Sq(3)[165] + Sq(0,1)[165] + Sq(3)[162] + Sq(0,1)[161]} \item[169] {\rm Sq(1)[169] + Sq(1)[168]} \\ $h_{0}:$ [169], [168] \\ $h_{2}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[32/168] \mb{32/168} \begin{gl} \item[168] {\rm Sq(2,1)[162]} \item[169] {\rm Sq(0,1)[166]} \item[170] {\rm Sq(0,1)[167]} \item[171] {\rm Sq(3)[169] + Sq(0,1)[169] + Sq(0,1)[168] + Sq(3)[166]} \end{gl} \end{bdl} \begin{bdl} \item[31/168] \mb{31/168} \begin{gl} \item[175] {\rm Sq(0,1)[173]} \end{gl} \end{bdl} \begin{bdl} \item[30/168] \mb{30/168} \begin{gl} \item[181] {\rm Sq(0,1)[176]} \item[182] {\rm Sq(0,1)[177]} \item[183] {\rm Sq(2)[183]} \\ $h_{1}:$ [183] \item[184] {\rm Sq(1)[189] + Sq(1)[187]} \\ $h_{0}:$ [189], [187] \\ $h_{3}:$ [161], [160] \end{gl} \end{bdl} \begin{bdl} \item[29/168] \mb{29/168} \begin{gl} \item[186] {\rm Sq(3)[180] + Sq(0,1)[180]} \item[187] {\rm Sq(3)[182] + Sq(3)[181] + Sq(0,1)[181] + Sq(0,1)[180]} \item[188] {\rm Sq(2)[186] + Sq(2)[185]} \\ $h_{1}:$ [186], [185] \item[189] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{3}:$ [163], [162] \end{gl} \end{bdl} \begin{bdl} \item[28/168] \mb{28/168} \begin{gl} \item[190] {\rm Sq(0,1)[191]} \item[191] {\rm Sq(1)[198]} \\ $h_{0}:$ [198] \\ $h_{1}:$ [194] \\ $h_{2}:$ [189], [188] \\ $h_{3}:$ [170], [167] \item[192] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \\ $h_{3}:$ [170], [167] \end{gl} \end{bdl} \begin{bdl} \item[27/168] \mb{27/168} \begin{gl} \item[196] {\rm Sq(0,1)[196]} \item[197] {\rm Sq(0,1)[198]} \item[198] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{2}:$ [194] \\ $h_{3}:$ [180], [179] \item[199] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{3}:$ [180], [179] \end{gl} \end{bdl} \begin{bdl} \item[26/168] \mb{26/168} \begin{gl} \item[202] {\rm Sq(1,1)[200] + Sq(1,1)[198]} \item[203] {\rm Sq(0,1)[201]} \item[204] {\rm Sq(0,1)[202]} \item[205] {\rm Sq(3)[203] + Sq(3)[202] + Sq(3)[201]} \end{gl} \end{bdl} \begin{bdl} \item[25/168] \mb{25/168} \begin{gl} \item[207] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{2}:$ [201], [200] \\ $h_{3}:$ [189] \\ $h_{4}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[24/168] \mb{24/168} \begin{gl} \item[209] {\rm Sq(3)[209] + Sq(3)[208] + Sq(0,1)[208]} \item[210] {\rm Sq(3)[210]} \\ $h_{3}:$ [194] \\ $h_{4}:$ [168] \item[211] {\rm Sq(3)[211] + Sq(0,1)[211] + Sq(0,1)[209] + Sq(3)[208]} \\ $h_{4}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[23/168] \mb{23/168} \begin{gl} \item[213] {\rm Sq(2,1)[212]} \item[214] {\rm Sq(0,1)[217]} \end{gl} \end{bdl} \begin{bdl} \item[22/168] \mb{22/168} \begin{gl} \item[223] {\rm Sq(3)[221] + Sq(3)[220]} \item[224] {\rm Sq(3)[223] + Sq(0,1)[223] + Sq(3)[222] + Sq(0,1)[222]} \\ $h_{7}:$ [1] \item[225] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \\ $h_{1}:$ [227], [224] \\ $h_{3}:$ [208] \end{gl} \end{bdl} \begin{bdl} \item[21/168] \mb{21/168} \begin{gl} \item[229] {\rm Sq(3)[220] + Sq(0,1)[220]} \item[230] {\rm Sq(2)[225] + Sq(2)[224]} \\ $h_{1}:$ [225], [224] \\ $h_{7}:$ [2] \item[231] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \end{gl} \end{bdl} \begin{bdl} \item[20/168] \mb{20/168} \begin{gl} \item[227] {\rm Sq(1,1)[226] + Sq(1,1)[225] + Sq(1,1)[224]} \item[228] {\rm Sq(0,1)[227]} \item[229] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \item[230] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{1}:$ [231], [230] \\ $h_{2}:$ [225], [224] \\ $h_{3}:$ [214] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[19/168] \mb{19/168} \begin{gl} \item[234] {\rm Sq(3,1)[229] + Sq(3,1)[228] + Sq(0,2)[228]} \item[235] {\rm Sq(1,1)[234] + Sq(1,1)[233] + Sq(1,1)[232]} \item[236] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \\ $h_{2}:$ [232] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[18/168] \mb{18/168} \begin{gl} \item[243] {\rm Sq(2)[243]} \\ $h_{1}:$ [243] \item[244] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{2}:$ [237] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[17/168] \mb{17/168} \begin{gl} \item[246] {\rm Sq(1,1)[248] + Sq(1,1)[247] + Sq(1,1)[246]} \item[247] {\rm Sq(3)[250] + Sq(0,1)[249]} \\ $h_{7}:$ [5] \item[248] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \\ $h_{3}:$ [236], [234] \\ $h_{6}:$ [68], [67] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[16/168] \mb{16/168} \begin{gl} \item[252] {\rm Sq(1,1)[255] + Sq(1,1)[254]} \\ $h_{3}:$ [235] \\ $h_{6}:$ [68] \item[253] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{2}:$ [252] \\ $h_{3}:$ [236] \\ $h_{4}:$ [199] \item[254] {\rm Sq(1)[263] + Sq(1)[262]} \\ $h_{0}:$ [263], [262] \\ $h_{1}:$ [260] \\ $h_{2}:$ [255], [254] \\ $h_{6}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[15/168] \mb{15/168} \begin{gl} \item[261] {\rm Sq(3)[272] + Sq(0,1)[272] + Sq(3)[269] + Sq(0,1)[269]} \\ $h_{3}:$ [240] \item[262] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{2}:$ [264] \\ $h_{3}:$ [244], [242], [240] \\ $h_{5}:$ [168], [167] \item[263] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{2}:$ [265] \\ $h_{3}:$ [244], [242], [240] \\ $h_{5}:$ [168], [167] \end{gl} \end{bdl} \begin{bdl} \item[14/168] \mb{14/168} \begin{gl} \item[276] {\rm Sq(0,1)[276]} \\ $h_{3}:$ [252], [251] \\ $h_{5}:$ [171] \item[277] {\rm Sq(3)[278] + Sq(3)[277]} \\ $h_{3}:$ [252], [251] \\ $h_{5}:$ [171] \item[278] {\rm Sq(1)[286] + Sq(1)[285]} \\ $h_{0}:$ [286], [285] \\ $h_{1}:$ [280] \\ $h_{2}:$ [274], [273], [272] \\ $h_{3}:$ [254], [253], [252] \end{gl} \end{bdl} \begin{bdl} \item[13/168] \mb{13/168} \begin{gl} \item[284] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{2}:$ [282], [281], [280] \\ $h_{3}:$ [265], [264], [262] \item[285] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{2}:$ [280] \\ $h_{3}:$ [264], [262] \\ $h_{4}:$ [232] \item[286] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \\ $h_{3}:$ [264], [263] \\ $h_{4}:$ [232] \end{gl} \end{bdl} \begin{bdl} \item[12/168] \mb{12/168} \begin{gl} \item[291] {\rm Sq(1,1)[296]} \\ $h_{3}:$ [280], [279] \item[292] {\rm Sq(3)[302] + Sq(0,1)[302] + Sq(3)[300] + Sq(0,1)[299]} \\ $h_{3}:$ [279] \item[293] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \\ $h_{1}:$ [304], [303] \\ $h_{3}:$ [280] \\ $h_{7}:$ [10] \item[294] {\rm Sq(1)[307]} \\ $h_{0}:$ [307] \\ $h_{3}:$ [279] \end{gl} \end{bdl} \begin{bdl} \item[11/168] \mb{11/168} \begin{gl} \item[306] {\rm Sq(0,1)[295]} \\ $h_{7}:$ [14] \item[307] {\rm Sq(3)[296] + Sq(3)[295] + Sq(3)[294]} \item[308] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{3}:$ [276] \\ $h_{4}:$ [243] \\ $h_{5}:$ [186], [184] \\ $h_{6}:$ [93], [92] \end{gl} \end{bdl} \begin{bdl} \item[10/168] \mb{10/168} \begin{gl} \item[299] {\rm Sq(2,1)[261] + Sq(2,1)[260]} \\ $h_{3}:$ [248] \item[300] {\rm Sq(5)[261] + Sq(5)[260]} \\ $h_{5}:$ [172] \item[301] {\rm Sq(2)[267]} \\ $h_{1}:$ [267] \\ $h_{3}:$ [248] \\ $h_{6}:$ [99] \item[302] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{1}:$ [268] \\ $h_{3}:$ [248] \\ $h_{6}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[9/168] \mb{9/168} \begin{gl} \item[269] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \end{gl} \end{bdl} \begin{bdl} \item[8/168] \mb{8/168} \begin{gl} \item[234] {\rm Sq(3)[199] + Sq(0,1)[199]} \item[235] {\rm Sq(2)[200]} \\ $h_{1}:$ [200] \\ $h_{5}:$ [134] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[6/168] \mb{6/168} \begin{gl} \item[167] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{1}:$ [121] \\ $h_{2}:$ [117] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[5/168] \mb{5/168} \begin{gl} \item[123] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[4/168] \mb{4/168} \begin{gl} \item[83] {\rm Sq(12)[50] + Sq(0,4)[50] + Sq(2,1,1)[50]} \\ $h_{7}:$ [19] \end{gl} \end{bdl} \dm{169} \begin{bdl} \item[85/169] \mb{85/169} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[84/169] \mb{84/169} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[83/169] \mb{83/169} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[82/169] \mb{82/169} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[81/169] \mb{81/169} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[80/169] \mb{80/169} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[75/169] \mb{75/169} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[74/169] \mb{74/169} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[71/169] \mb{71/169} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[68/169] \mb{68/169} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[67/169] \mb{67/169} \begin{gl} \item[22] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[66/169] \mb{66/169} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[65/169] \mb{65/169} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[64/169] \mb{64/169} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[63/169] \mb{63/169} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[62/169] \mb{62/169} \begin{gl} \item[34] {\rm Sq(0,1)[33]} \item[35] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[59/169] \mb{59/169} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[58/169] \mb{58/169} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[56/169] \mb{56/169} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[55/169] \mb{55/169} \begin{gl} \item[51] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[53/169] \mb{53/169} \begin{gl} \item[57] {\rm Sq(0,1)[54]} \item[58] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[52/169] \mb{52/169} \begin{gl} \item[58] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[51/169] \mb{51/169} \begin{gl} \item[65] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[50/169] \mb{50/169} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \item[73] {\rm Sq(0,1)[73]} \end{gl} \end{bdl} \begin{bdl} \item[49/169] \mb{49/169} \begin{gl} \item[75] {\rm Sq(0,1)[73]} \item[76] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{1}:$ [74] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[48/169] \mb{48/169} \begin{gl} \item[77] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [74] \item[78] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[47/169] \mb{47/169} \begin{gl} \item[81] {\rm Sq(0,1)[83]} \item[82] {\rm Sq(0,1)[84]} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [80] \end{gl} \end{bdl} \begin{bdl} \item[46/169] \mb{46/169} \begin{gl} \item[88] {\rm Sq(0,1)[88]} \item[89] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[45/169] \mb{45/169} \begin{gl} \item[95] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [97] \\ $h_{3}:$ [82] \\ $h_{4}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[44/169] \mb{44/169} \begin{gl} \item[100] {\rm Sq(0,1)[104]} \item[101] {\rm Sq(0,1)[105]} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{3}:$ [91], [90] \end{gl} \end{bdl} \begin{bdl} \item[43/169] \mb{43/169} \begin{gl} \item[110] {\rm Sq(0,1)[110]} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{3}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[42/169] \mb{42/169} \begin{gl} \item[117] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [95], [94] \end{gl} \end{bdl} \begin{bdl} \item[41/169] \mb{41/169} \begin{gl} \item[115] {\rm Sq(0,1)[112]} \item[116] {\rm Sq(0,1)[113]} \item[117] {\rm Sq(0,1)[114]} \item[118] {\rm Sq(2)[115]} \\ $h_{1}:$ [115] \item[119] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[40/169] \mb{40/169} \begin{gl} \item[116] {\rm Sq(0,1)[118]} \item[117] {\rm Sq(0,1)[119]} \item[118] {\rm Sq(0,1)[120]} \item[119] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[39/169] \mb{39/169} \begin{gl} \item[125] {\rm Sq(0,1)[126]} \end{gl} \end{bdl} \begin{bdl} \item[38/169] \mb{38/169} \begin{gl} \item[130] {\rm Sq(0,1)[129]} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[37/169] \mb{37/169} \begin{gl} \item[133] {\rm Sq(0,1)[136]} \item[134] {\rm Sq(0,1)[137]} \item[135] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[36/169] \mb{36/169} \begin{gl} \item[142] {\rm Sq(0,1)[152]} \item[143] {\rm Sq(2)[156]} \\ $h_{1}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[35/169] \mb{35/169} \begin{gl} \item[157] {\rm Sq(0,1)[162]} \item[158] {\rm Sq(0,1)[163]} \item[159] {\rm Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[34/169] \mb{34/169} \begin{gl} \item[167] {\rm Sq(0,1)[163]} \item[168] {\rm Sq(0,1)[164]} \item[169] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[33/169] \mb{33/169} \begin{gl} \item[170] {\rm Sq(3)[167] + Sq(0,1)[167] + Sq(0,1)[166]} \item[171] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{1}:$ [169], [168] \\ $h_{2}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[32/169] \mb{32/169} \begin{gl} \item[172] {\rm Sq(0,1)[170]} \item[173] {\rm Sq(0,1)[171]} \item[174] {\rm Sq(0,1)[172]} \item[175] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[31/169] \mb{31/169} \begin{gl} \item[176] {\rm Sq(1,1)[175]} \item[177] {\rm Sq(1,1)[176]} \item[178] {\rm Sq(0,1)[177]} \item[179] {\rm Sq(0,1)[178]} \item[180] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{1}:$ [183], [181] \\ $h_{2}:$ [175], [173] \\ $h_{3}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[30/169] \mb{30/169} \begin{gl} \item[185] {\rm Sq(1)[193] + Sq(1)[192]} \\ $h_{0}:$ [193], [192] \\ $h_{2}:$ [179], [178] \\ $h_{3}:$ [165], [164] \item[186] {\rm Sq(1)[194] + Sq(1)[192]} \\ $h_{0}:$ [194], [192] \\ $h_{2}:$ [178], [176] \\ $h_{3}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[29/169] \mb{29/169} \begin{gl} \item[190] {\rm Sq(0,1)[185]} \item[191] {\rm Sq(3)[189] + Sq(0,1)[189] + Sq(3)[188] + Sq(0,1)[188] + Sq(0,1)[184]} \item[192] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{2}:$ [182], [181], [180] \\ $h_{4}:$ [139], [138] \item[193] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \\ $h_{3}:$ [168], [166], [165] \\ $h_{4}:$ [139], [138] \item[194] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{2}:$ [182], [181] \\ $h_{3}:$ [166], [164] \\ $h_{4}:$ [139], [138] \end{gl} \end{bdl} \begin{bdl} \item[28/169] \mb{28/169} \begin{gl} \item[193] {\rm Sq(0,1)[192]} \item[194] {\rm Sq(0,1)[193]} \item[195] {\rm Sq(0,1)[195] + Sq(0,1)[194]} \item[196] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{3}:$ [176], [173] \item[197] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{3}:$ [173] \end{gl} \end{bdl} \begin{bdl} \item[27/169] \mb{27/169} \begin{gl} \item[200] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{3}:$ [184] \item[201] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[26/169] \mb{26/169} \begin{gl} \item[206] {\rm Sq(3)[205] + Sq(0,1)[205] + Sq(3)[204] + Sq(0,1)[204]} \item[207] {\rm Sq(0,1)[206] + Sq(0,1)[204]} \item[208] {\rm Sq(1)[209] + Sq(1)[208]} \\ $h_{0}:$ [209], [208] \item[209] {\rm Sq(1)[212] + Sq(1)[208]} \\ $h_{0}:$ [212], [208] \end{gl} \end{bdl} \begin{bdl} \item[25/169] \mb{25/169} \begin{gl} \item[208] {\rm Sq(5)[203] + Sq(2,1)[202] + Sq(5)[201] + Sq(5)[200]} \item[209] {\rm Sq(2,1)[204] + Sq(5)[201] + Sq(5)[200] + Sq(2,1)[200]} \item[210] {\rm Sq(0,1)[206]} \item[211] {\rm Sq(0,1)[207]} \item[212] {\rm Sq(3)[208] + Sq(3)[207]} \item[213] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{1}:$ [211] \\ $h_{4}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[24/169] \mb{24/169} \begin{gl} \item[212] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{4}:$ [172] \end{gl} \end{bdl} \begin{bdl} \item[23/169] \mb{23/169} \begin{gl} \item[215] {\rm Sq(0,1)[221]} \item[216] {\rm Sq(3)[221]} \item[217] {\rm Sq(2)[224]} \\ $h_{1}:$ [224] \\ $h_{7}:$ [1] \item[218] {\rm Sq(1)[227] + Sq(1)[226]} \\ $h_{0}:$ [227], [226] \\ $h_{2}:$ [219] \\ $h_{3}:$ [204] \\ $h_{5}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[22/169] \mb{22/169} \begin{gl} \item[226] {\rm Sq(0,1)[224]} \item[227] {\rm Sq(0,1)[226] + Sq(0,1)[225]} \end{gl} \end{bdl} \begin{bdl} \item[21/169] \mb{21/169} \begin{gl} \item[232] {\rm Sq(0,1)[223]} \item[233] {\rm Sq(1)[234] + Sq(1)[231]} \\ $h_{0}:$ [234], [231] \\ $h_{1}:$ [227] \\ $h_{2}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[20/169] \mb{20/169} \begin{gl} \item[231] {\rm Sq(3)[230] + Sq(0,1)[230]} \item[232] {\rm Sq(3)[233] + Sq(0,1)[233] + Sq(3)[232]} \\ $h_{4}:$ [191] \item[233] {\rm Sq(2)[235]} \\ $h_{1}:$ [235] \item[234] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[19/169] \mb{19/169} \begin{gl} \item[237] {\rm Sq(3)[240]} \end{gl} \end{bdl} \begin{bdl} \item[18/169] \mb{18/169} \begin{gl} \item[245] {\rm Sq(3,1)[236] + Sq(0,2)[235]} \item[246] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{1}:$ [247] \\ $h_{2}:$ [242], [241] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[17/169] \mb{17/169} \begin{gl} \item[249] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{2}:$ [249] \\ $h_{7}:$ [6] \item[250] {\rm Sq(1)[257] + Sq(1)[256]} \\ $h_{0}:$ [257], [256] \\ $h_{1}:$ [252] \\ $h_{2}:$ [250] \\ $h_{3}:$ [239], [238] \\ $h_{4}:$ [205] \\ $h_{6}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[16/169] \mb{16/169} \begin{gl} \item[255] {\rm Sq(1,1)[258]} \\ $h_{7}:$ [6] \item[256] {\rm Sq(3)[260] + Sq(0,1)[260]} \item[257] {\rm Sq(1)[265] + Sq(1)[264]} \\ $h_{0}:$ [265], [264] \\ $h_{3}:$ [240], [239] \\ $h_{6}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[15/169] \mb{15/169} \begin{gl} \item[264] {\rm Sq(2,1)[266] + Sq(5)[265]} \item[265] {\rm Sq(3)[273]} \\ $h_{3}:$ [249], [248], [247] \\ $h_{6}:$ [79] \item[266] {\rm Sq(3)[274] + Sq(0,1)[274] + Sq(0,1)[273]} \\ $h_{3}:$ [249], [248] \\ $h_{6}:$ [79] \item[267] {\rm Sq(1)[282] + Sq(1)[280]} \\ $h_{0}:$ [282], [280] \\ $h_{1}:$ [276] \\ $h_{2}:$ [271], [270], [269] \\ $h_{3}:$ [251], [249], [248], [246] \\ $h_{4}:$ [212], [210] \\ $h_{5}:$ [172], [171] \\ $h_{7}:$ [9] \item[268] {\rm Sq(1)[283] + Sq(1)[280]} \\ $h_{0}:$ [283], [280] \\ $h_{1}:$ [276] \\ $h_{2}:$ [270], [269] \\ $h_{3}:$ [251], [249], [248], [247], [246] \\ $h_{5}:$ [172], [171] \end{gl} \end{bdl} \begin{bdl} \item[14/169] \mb{14/169} \begin{gl} \item[279] {\rm Sq(3)[280]} \item[280] {\rm Sq(3)[283] + Sq(0,1)[283]} \\ $h_{3}:$ [256] \item[281] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{3}:$ [258], [257], [256] \\ $h_{4}:$ [223] \item[282] {\rm Sq(1)[289] + Sq(1)[288]} \\ $h_{0}:$ [289], [288] \\ $h_{2}:$ [277], [276] \\ $h_{3}:$ [259] \\ $h_{5}:$ [178], [177] \\ $h_{7}:$ [12] \item[283] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{2}:$ [276] \\ $h_{3}:$ [259] \\ $h_{5}:$ [178], [177] \item[284] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{2}:$ [279] \\ $h_{3}:$ [260], [259], [257] \\ $h_{4}:$ [225], [224] \\ $h_{5}:$ [175] \\ $h_{6}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[13/169] \mb{13/169} \begin{gl} \item[287] {\rm Sq(1,1)[284]} \\ $h_{3}:$ [269], [268] \item[288] {\rm Sq(0,1)[288]} \\ $h_{3}:$ [270], [269] \\ $h_{7}:$ [11] \item[289] {\rm Sq(0,1)[289]} \\ $h_{3}:$ [269], [268] \\ $h_{5}:$ [178], [177] \item[290] {\rm Sq(0,1)[290] + Sq(3)[289]} \\ $h_{3}:$ [270], [268] \\ $h_{5}:$ [178], [177] \item[291] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \\ $h_{2}:$ [284] \\ $h_{3}:$ [272], [270] \\ $h_{4}:$ [235], [234] \\ $h_{6}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[12/169] \mb{12/169} \begin{gl} \item[295] {\rm Sq(2)[307]} \\ $h_{1}:$ [307] \item[296] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{3}:$ [285], [284] \\ $h_{4}:$ [247], [246] \item[297] {\rm Sq(1)[311]} \\ $h_{0}:$ [311] \\ $h_{3}:$ [286] \\ $h_{4}:$ [249], [248], [246] \end{gl} \end{bdl} \begin{bdl} \item[11/169] \mb{11/169} \begin{gl} \item[309] {\rm Sq(1,1)[296] + Sq(1,1)[295] + Sq(1,1)[294]} \\ $h_{3}:$ [281] \item[310] {\rm Sq(3)[298] + Sq(0,1)[298] + Sq(3)[297] + Sq(0,1)[297]} \\ $h_{3}:$ [280] \item[311] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{3}:$ [282], [280] \\ $h_{4}:$ [247], [245] \end{gl} \end{bdl} \begin{bdl} \item[10/169] \mb{10/169} \begin{gl} \item[303] {\rm Sq(0,1)[266]} \\ $h_{7}:$ [19] \item[304] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{4}:$ [224] \item[305] {\rm Sq(1)[272] + Sq(1)[270]} \\ $h_{0}:$ [272], [270] \\ $h_{3}:$ [252] \\ $h_{5}:$ [176], [174] \end{gl} \end{bdl} \begin{bdl} \item[9/169] \mb{9/169} \begin{gl} \item[270] {\rm Sq(3,1)[226] + Sq(3,1)[225] + Sq(3,1)[224]} \\ $h_{3}:$ [218] \\ $h_{4}:$ [194] \\ $h_{5}:$ [154] \item[271] {\rm Sq(3,1)[227] + Sq(6)[226] + Sq(0,2)[226] + Sq(6)[225] + Sq(3,1)[225] + Sq(0,2)[225] + Sq(3,1)[224]} \\ $h_{4}:$ [194] \item[272] {\rm Sq(1,1)[231]} \\ $h_{3}:$ [218] \\ $h_{4}:$ [194] \item[273] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{1}:$ [235], [234] \\ $h_{5}:$ [156], [154] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[8/169] \mb{8/169} \begin{gl} \item[236] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{5}:$ [136] \\ $h_{7}:$ [18] \item[237] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{3}:$ [189], [188] \\ $h_{4}:$ [169] \\ $h_{5}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[7/169] \mb{7/169} \begin{gl} \item[202] {\rm Sq(3)[165]} \\ $h_{5}:$ [116] \\ $h_{7}:$ [20] \item[203] {\rm Sq(3)[166] + Sq(0,1)[166]} \\ $h_{3}:$ [157] \\ $h_{4}:$ [143] \\ $h_{5}:$ [115] \end{gl} \end{bdl} \dm{170} \begin{bdl} \item[86/170] \mb{86/170} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[81/170] \mb{81/170} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[80/170] \mb{80/170} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[79/170] \mb{79/170} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[78/170] \mb{78/170} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[77/170] \mb{77/170} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[76/170] \mb{76/170} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[73/170] \mb{73/170} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[70/170] \mb{70/170} \begin{gl} \item[18] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[67/170] \mb{67/170} \begin{gl} \item[23] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[64/170] \mb{64/170} \begin{gl} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[63/170] \mb{63/170} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[62/170] \mb{62/170} \begin{gl} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [33] \item[37] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[61/170] \mb{61/170} \begin{gl} \item[37] {\rm Sq(0,1)[36]} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[60/170] \mb{60/170} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[59/170] \mb{59/170} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[51]} \\ $h_{0}:$ [53], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[58/170] \mb{58/170} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[57/170] \mb{57/170} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[56/170] \mb{56/170} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[55/170] \mb{55/170} \begin{gl} \item[52] {\rm Sq(0,1)[54]} \item[53] {\rm Sq(0,1)[55]} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[54/170] \mb{54/170} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[53/170] \mb{53/170} \begin{gl} \item[59] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[52/170] \mb{52/170} \begin{gl} \item[59] {\rm Sq(2,1)[59]} \item[60] {\rm Sq(0,1)[62]} \item[61] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[51/170] \mb{51/170} \begin{gl} \item[66] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[49/170] \mb{49/170} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(0,1)[76]} \end{gl} \end{bdl} \begin{bdl} \item[48/170] \mb{48/170} \begin{gl} \item[79] {\rm Sq(0,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[47/170] \mb{47/170} \begin{gl} \item[85] {\rm Sq(3)[87] + Sq(0,1)[87]} \item[86] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{1}:$ [88] \\ $h_{2}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[46/170] \mb{46/170} \begin{gl} \item[90] {\rm Sq(0,1)[90]} \item[91] {\rm Sq(0,1)[91]} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[45/170] \mb{45/170} \begin{gl} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[44/170] \mb{44/170} \begin{gl} \item[104] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{2}:$ [107] \\ $h_{3}:$ [93] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[43/170] \mb{43/170} \begin{gl} \item[113] {\rm Sq(0,1)[112]} \item[114] {\rm Sq(0,1)[113]} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{2}:$ [109] \\ $h_{3}:$ [98] \\ $h_{4}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[42/170] \mb{42/170} \begin{gl} \item[118] {\rm Sq(0,1)[111]} \item[119] {\rm Sq(0,1)[112]} \item[120] {\rm Sq(0,1)[113]} \item[121] {\rm Sq(2)[118]} \\ $h_{1}:$ [118] \item[122] {\rm Sq(1)[120]} \\ $h_{0}:$ [120] \\ $h_{3}:$ [100] \end{gl} \end{bdl} \begin{bdl} \item[41/170] \mb{41/170} \begin{gl} \item[120] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[40/170] \mb{40/170} \begin{gl} \item[120] {\rm Sq(0,1)[122]} \item[121] {\rm Sq(0,1)[123]} \item[122] {\rm Sq(0,1)[124]} \item[123] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[39/170] \mb{39/170} \begin{gl} \item[126] {\rm Sq(0,1)[127]} \item[127] {\rm Sq(0,1)[128]} \item[128] {\rm Sq(0,1)[129]} \item[129] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[38/170] \mb{38/170} \begin{gl} \item[133] {\rm Sq(0,1)[132]} \item[134] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[37/170] \mb{37/170} \begin{gl} \item[136] {\rm Sq(0,1)[139]} \item[137] {\rm Sq(0,1)[140]} \item[138] {\rm Sq(0,1)[141]} \item[139] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[36/170] \mb{36/170} \begin{gl} \item[144] {\rm Sq(3,1)[148]} \item[145] {\rm Sq(0,1)[153]} \item[146] {\rm Sq(0,1)[154]} \item[147] {\rm Sq(0,1)[155]} \end{gl} \end{bdl} \begin{bdl} \item[35/170] \mb{35/170} \begin{gl} \item[160] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[34/170] \mb{34/170} \begin{gl} \item[170] {\rm Sq(1,1)[164] + Sq(1,1)[163]} \item[171] {\rm Sq(1,1)[166] + Sq(1,1)[165]} \item[172] {\rm Sq(0,1)[167]} \item[173] {\rm Sq(0,1)[168]} \end{gl} \end{bdl} \begin{bdl} \item[33/170] \mb{33/170} \begin{gl} \item[172] {\rm Sq(0,1)[168]} \item[173] {\rm Sq(0,1)[170] + Sq(0,1)[169]} \item[174] {\rm Sq(0,1)[171] + Sq(3)[169] + Sq(3)[168]} \end{gl} \end{bdl} \begin{bdl} \item[32/170] \mb{32/170} \begin{gl} \item[176] {\rm Sq(0,1)[175]} \end{gl} \end{bdl} \begin{bdl} \item[31/170] \mb{31/170} \begin{gl} \item[181] {\rm Sq(1,1)[178]} \item[182] {\rm Sq(0,1)[181]} \item[183] {\rm Sq(0,1)[182]} \item[184] {\rm Sq(3)[184] + Sq(0,1)[184] + Sq(3)[183] + Sq(3)[181]} \end{gl} \end{bdl} \begin{bdl} \item[30/170] \mb{30/170} \begin{gl} \item[187] {\rm Sq(0,1)[186]} \item[188] {\rm Sq(0,1)[187]} \item[189] {\rm Sq(3)[188]} \\ $h_{2}:$ [181], [180] \end{gl} \end{bdl} \begin{bdl} \item[29/170] \mb{29/170} \begin{gl} \item[195] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{1}:$ [194] \\ $h_{2}:$ [187], [186] \\ $h_{4}:$ [144] \item[196] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [195] \\ $h_{2}:$ [189], [188] \\ $h_{3}:$ [174], [171], [169] \end{gl} \end{bdl} \begin{bdl} \item[28/170] \mb{28/170} \begin{gl} \item[198] {\rm Sq(1,1)[195] + Sq(1,1)[194] + Sq(1,1)[193]} \item[199] {\rm Sq(0,1)[196]} \item[200] {\rm Sq(0,1)[197]} \item[201] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{2}:$ [193] \\ $h_{4}:$ [151] \item[202] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{2}:$ [194] \\ $h_{3}:$ [179], [178], [177] \item[203] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{2}:$ [195], [194] \\ $h_{3}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[27/170] \mb{27/170} \begin{gl} \item[202] {\rm Sq(0,1)[202]} \item[203] {\rm Sq(0,1)[203]} \item[204] {\rm Sq(0,1)[204]} \item[205] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{3}:$ [187] \item[206] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{3}:$ [188] \end{gl} \end{bdl} \begin{bdl} \item[26/170] \mb{26/170} \begin{gl} \item[210] {\rm Sq(2)[208]} \\ $h_{1}:$ [208] \item[211] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{3}:$ [192], [191] \item[212] {\rm Sq(1)[217] + Sq(1)[214]} \\ $h_{0}:$ [217], [214] \\ $h_{3}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[25/170] \mb{25/170} \begin{gl} \item[214] {\rm Sq(1,1)[207] + Sq(1,1)[206]} \item[215] {\rm Sq(0,1)[209]} \item[216] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \item[217] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[24/170] \mb{24/170} \begin{gl} \item[213] {\rm Sq(2,1)[209]} \item[214] {\rm Sq(1,1)[212]} \item[215] {\rm Sq(0,1)[214]} \item[216] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \item[217] {\rm Sq(1)[221] + Sq(1)[219]} \\ $h_{0}:$ [221], [219] \\ $h_{1}:$ [217] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[23/170] \mb{23/170} \begin{gl} \item[219] {\rm Sq(3,1)[215]} \item[220] {\rm Sq(2,1)[217]} \item[221] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[22/170] \mb{22/170} \begin{gl} \item[228] {\rm Sq(3)[230]} \\ $h_{7}:$ [2] \item[229] {\rm Sq(3)[231] + Sq(0,1)[231] + Sq(0,1)[229]} \item[230] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{3}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[21/170] \mb{21/170} \begin{gl} \item[234] {\rm Sq(3)[227]} \item[235] {\rm Sq(2)[233] + Sq(2)[231]} \\ $h_{1}:$ [233], [231] \end{gl} \end{bdl} \begin{bdl} \item[20/170] \mb{20/170} \begin{gl} \item[235] {\rm Sq(3)[235]} \item[236] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{2}:$ [230] \end{gl} \end{bdl} \begin{bdl} \item[19/170] \mb{19/170} \begin{gl} \item[238] {\rm Sq(3)[243]} \end{gl} \end{bdl} \begin{bdl} \item[18/170] \mb{18/170} \begin{gl} \item[247] {\rm Sq(0,1)[246]} \item[248] {\rm Sq(3)[246]} \end{gl} \end{bdl} \begin{bdl} \item[17/170] \mb{17/170} \begin{gl} \item[251] {\rm Sq(1,1)[251]} \item[252] {\rm Sq(3)[252] + Sq(0,1)[252]} \end{gl} \end{bdl} \begin{bdl} \item[16/170] \mb{16/170} \begin{gl} \item[258] {\rm Sq(3)[262] + Sq(0,1)[262] + Sq(3)[261] + Sq(0,1)[261]} \end{gl} \end{bdl} \begin{bdl} \item[15/170] \mb{15/170} \begin{gl} \item[269] {\rm Sq(2)[279]} \\ $h_{1}:$ [279] \\ $h_{2}:$ [273] \\ $h_{3}:$ [252] \\ $h_{4}:$ [217], [216] \\ $h_{5}:$ [173] \\ $h_{6}:$ [81] \item[270] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[14/170] \mb{14/170} \begin{gl} \item[285] {\rm Sq(3)[286] + Sq(0,1)[286] + Sq(3)[285] + Sq(0,1)[285]} \item[286] {\rm Sq(1)[296] + Sq(1)[294]} \\ $h_{0}:$ [296], [294] \\ $h_{1}:$ [290], [289], [288] \\ $h_{2}:$ [283], [281], [280] \\ $h_{7}:$ [13] \item[287] {\rm Sq(1)[297] + Sq(1)[294]} \\ $h_{0}:$ [297], [294] \\ $h_{1}:$ [288], [287] \\ $h_{2}:$ [281] \\ $h_{3}:$ [265] \\ $h_{4}:$ [229], [227] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[13/170] \mb{13/170} \begin{gl} \item[292] {\rm Sq(3)[292] + Sq(0,1)[292] + Sq(3)[291] + Sq(0,1)[291]} \item[293] {\rm Sq(2)[295]} \\ $h_{1}:$ [295] \\ $h_{2}:$ [290] \\ $h_{3}:$ [275], [274], [273] \\ $h_{5}:$ [182] \\ $h_{6}:$ [85] \item[294] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{2}:$ [290], [288] \\ $h_{4}:$ [237], [236] \\ $h_{7}:$ [12] \item[295] {\rm Sq(1)[300] + Sq(1)[298]} \\ $h_{0}:$ [300], [298] \\ $h_{4}:$ [237], [236] \item[296] {\rm Sq(1)[301] + Sq(1)[298]} \\ $h_{0}:$ [301], [298] \\ $h_{4}:$ [237], [236] \item[297] {\rm Sq(1)[302]} \\ $h_{0}:$ [302] \\ $h_{2}:$ [290] \\ $h_{3}:$ [275] \\ $h_{4}:$ [240], [236] \end{gl} \end{bdl} \begin{bdl} \item[12/170] \mb{12/170} \begin{gl} \item[298] {\rm Sq(1,1)[305] + Sq(1,1)[304]} \\ $h_{5}:$ [190], [189] \item[299] {\rm Sq(3)[306]} \\ $h_{7}:$ [11] \item[300] {\rm Sq(0,1)[307]} \\ $h_{5}:$ [190], [189] \item[301] {\rm Sq(3)[307]} \\ $h_{5}:$ [190], [189] \item[302] {\rm Sq(1)[312]} \\ $h_{0}:$ [312] \\ $h_{4}:$ [250] \end{gl} \end{bdl} \begin{bdl} \item[11/170] \mb{11/170} \begin{gl} \item[312] {\rm Sq(1,1)[297]} \item[313] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \\ $h_{2}:$ [297] \\ $h_{3}:$ [286], [284] \\ $h_{4}:$ [252], [251] \\ $h_{5}:$ [195] \\ $h_{6}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[10/170] \mb{10/170} \begin{gl} \item[306] {\rm Sq(1,1)[267]} \item[307] {\rm Sq(2)[271]} \\ $h_{1}:$ [271] \\ $h_{2}:$ [267] \\ $h_{3}:$ [256] \\ $h_{4}:$ [228] \item[308] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{3}:$ [258], [256] \\ $h_{4}:$ [227], [226] \\ $h_{5}:$ [181], [178] \\ $h_{6}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[9/170] \mb{9/170} \begin{gl} \item[274] {\rm Sq(1)[239] + Sq(1)[238]} \\ $h_{0}:$ [239], [238] \\ $h_{3}:$ [222] \\ $h_{5}:$ [158], [157] \end{gl} \end{bdl} \begin{bdl} \item[8/170] \mb{8/170} \begin{gl} \item[238] {\rm Sq(1,1)[200]} \\ $h_{5}:$ [137] \item[239] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{3}:$ [191], [190] \\ $h_{5}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[7/170] \mb{7/170} \begin{gl} \item[204] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{5}:$ [117] \item[205] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{3}:$ [158] \\ $h_{4}:$ [144] \\ $h_{5}:$ [118] \\ $h_{6}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[6/170] \mb{6/170} \begin{gl} \item[168] {\rm Sq(1,1)[121]} \\ $h_{5}:$ [90] \item[169] {\rm Sq(3)[123] + Sq(0,1)[123]} \\ $h_{3}:$ [115] \\ $h_{4}:$ [107] \\ $h_{5}:$ [91] \\ $h_{6}:$ [74] \end{gl} \end{bdl} \dm{171} \begin{bdl} \item[87/171] \mb{87/171} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[86/171] \mb{86/171} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[85/171] \mb{85/171} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[77/171] \mb{77/171} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[76/171] \mb{76/171} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[75/171] \mb{75/171} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[72/171] \mb{72/171} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[69/171] \mb{69/171} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[68/171] \mb{68/171} \begin{gl} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[67/171] \mb{67/171} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[66/171] \mb{66/171} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[63/171] \mb{63/171} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[61/171] \mb{61/171} \begin{gl} \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[60/171] \mb{60/171} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[59/171] \mb{59/171} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43], [42] \\ $h_{4}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[58/171] \mb{58/171} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[57/171] \mb{57/171} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[56/171] \mb{56/171} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[55/171] \mb{55/171} \begin{gl} \item[55] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[54/171] \mb{54/171} \begin{gl} \item[58] {\rm Sq(0,1)[57]} \item[59] {\rm Sq(0,1)[58]} \item[60] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[53/171] \mb{53/171} \begin{gl} \item[60] {\rm Sq(0,1)[58]} \item[61] {\rm Sq(2)[59]} \\ $h_{1}:$ [59] \item[62] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[52/171] \mb{52/171} \begin{gl} \item[62] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \item[63] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \\ $h_{2}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[51/171] \mb{51/171} \begin{gl} \item[67] {\rm Sq(0,1)[71]} \item[68] {\rm Sq(0,1)[72]} \item[69] {\rm Sq(0,1)[73]} \item[70] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{2}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[50/171] \mb{50/171} \begin{gl} \item[74] {\rm Sq(1,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[48/171] \mb{48/171} \begin{gl} \item[80] {\rm Sq(0,1)[81]} \item[81] {\rm Sq(0,1)[82]} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(2)[85]} \\ $h_{1}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[47/171] \mb{47/171} \begin{gl} \item[87] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[45/171] \mb{45/171} \begin{gl} \item[98] {\rm Sq(0,1)[100]} \item[99] {\rm Sq(0,1)[101]} \item[100] {\rm Sq(0,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[44/171] \mb{44/171} \begin{gl} \item[105] {\rm Sq(0,1)[110]} \item[106] {\rm Sq(0,1)[111]} \end{gl} \end{bdl} \begin{bdl} \item[43/171] \mb{43/171} \begin{gl} \item[117] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{1}:$ [121] \\ $h_{2}:$ [116] \\ $h_{3}:$ [103] \item[118] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{1}:$ [120] \\ $h_{2}:$ [115] \\ $h_{3}:$ [102], [99] \\ $h_{4}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[42/171] \mb{42/171} \begin{gl} \item[123] {\rm Sq(0,1)[115]} \item[124] {\rm Sq(0,1)[116]} \item[125] {\rm Sq(0,1)[117]} \item[126] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [114] \\ $h_{3}:$ [102] \item[127] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [113] \\ $h_{3}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[41/171] \mb{41/171} \begin{gl} \item[121] {\rm Sq(0,1)[116]} \item[122] {\rm Sq(0,1)[117]} \item[123] {\rm Sq(0,1)[118]} \item[124] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{2}:$ [115] \\ $h_{3}:$ [106] \item[125] {\rm Sq(1)[126] + Sq(1)[124]} \\ $h_{0}:$ [126], [124] \\ $h_{3}:$ [105] \end{gl} \end{bdl} \begin{bdl} \item[40/171] \mb{40/171} \begin{gl} \item[124] {\rm Sq(0,1)[125]} \item[125] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{3}:$ [113] \item[126] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \\ $h_{3}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[39/171] \mb{39/171} \begin{gl} \item[130] {\rm Sq(0,1)[130]} \item[131] {\rm Sq(0,1)[131]} \item[132] {\rm Sq(0,1)[132]} \item[133] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \item[134] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[38/171] \mb{38/171} \begin{gl} \item[135] {\rm Sq(0,1)[133]} \item[136] {\rm Sq(0,1)[134]} \item[137] {\rm Sq(0,1)[135]} \item[138] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \item[139] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[37/171] \mb{37/171} \begin{gl} \item[140] {\rm Sq(0,1)[142]} \item[141] {\rm Sq(3)[143] + Sq(3)[142]} \item[142] {\rm Sq(2)[144]} \\ $h_{1}:$ [144] \item[143] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[36/171] \mb{36/171} \begin{gl} \item[148] {\rm Sq(0,1)[157]} \item[149] {\rm Sq(0,1)[158]} \item[150] {\rm Sq(0,1)[159]} \item[151] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[35/171] \mb{35/171} \begin{gl} \item[161] {\rm Sq(1,1)[166] + Sq(1,1)[165]} \item[162] {\rm Sq(0,1)[167]} \item[163] {\rm Sq(0,1)[168]} \item[164] {\rm Sq(0,1)[169]} \end{gl} \end{bdl} \begin{bdl} \item[34/171] \mb{34/171} \begin{gl} \item[174] {\rm Sq(0,1)[170]} \item[175] {\rm Sq(1)[179] + Sq(1)[178] + Sq(1)[175]} \\ $h_{0}:$ [179], [178], [175] \\ $h_{2}:$ [169] \end{gl} \end{bdl} \begin{bdl} \item[33/171] \mb{33/171} \begin{gl} \item[175] {\rm Sq(1,1)[171] + Sq(1,1)[169]} \item[176] {\rm Sq(0,1)[173] + Sq(0,1)[172]} \item[177] {\rm Sq(0,1)[174]} \item[178] {\rm Sq(3)[175] + Sq(0,1)[175] + Sq(0,1)[172]} \item[179] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [169], [168] \end{gl} \end{bdl} \begin{bdl} \item[32/171] \mb{32/171} \begin{gl} \item[177] {\rm Sq(0,1)[177]} \item[178] {\rm Sq(0,1)[178]} \item[179] {\rm Sq(0,1)[179] + Sq(0,1)[176]} \item[180] {\rm Sq(2)[184]} \\ $h_{1}:$ [184] \item[181] {\rm Sq(1)[186] + Sq(1)[185]} \\ $h_{0}:$ [186], [185] \\ $h_{4}:$ [136], [135] \end{gl} \end{bdl} \begin{bdl} \item[31/171] \mb{31/171} \begin{gl} \item[185] {\rm Sq(1,1)[182]} \item[186] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{4}:$ [143], [142], [138] \end{gl} \end{bdl} \begin{bdl} \item[30/171] \mb{30/171} \begin{gl} \item[190] {\rm Sq(0,1)[190]} \item[191] {\rm Sq(0,1)[191]} \item[192] {\rm Sq(1)[199] + Sq(1)[198]} \\ $h_{0}:$ [199], [198] \\ $h_{4}:$ [144], [143] \end{gl} \end{bdl} \begin{bdl} \item[29/171] \mb{29/171} \begin{gl} \item[197] {\rm Sq(0,1)[193]} \item[198] {\rm Sq(3)[195] + Sq(0,1)[195]} \item[199] {\rm Sq(1)[205] + Sq(1)[204]} \\ $h_{0}:$ [205], [204] \\ $h_{4}:$ [147], [146] \end{gl} \end{bdl} \begin{bdl} \item[28/171] \mb{28/171} \begin{gl} \item[204] {\rm Sq(1,1)[198] + Sq(1,1)[197]} \item[205] {\rm Sq(1)[212] + Sq(1)[211] + Sq(1)[209]} \\ $h_{0}:$ [212], [211], [209] \\ $h_{4}:$ [157], [154] \end{gl} \end{bdl} \begin{bdl} \item[27/171] \mb{27/171} \begin{gl} \item[207] {\rm Sq(0,1)[206]} \item[208] {\rm Sq(0,1)[207]} \item[209] {\rm Sq(3)[209] + Sq(0,1)[209] + Sq(3)[208] + Sq(0,1)[208]} \item[210] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{1}:$ [210] \\ $h_{2}:$ [202] \item[211] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{1}:$ [210] \\ $h_{2}:$ [205] \\ $h_{3}:$ [191] \item[212] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \\ $h_{1}:$ [210] \\ $h_{2}:$ [205] \\ $h_{3}:$ [191] \end{gl} \end{bdl} \begin{bdl} \item[26/171] \mb{26/171} \begin{gl} \item[213] {\rm Sq(0,1)[210] + Sq(0,1)[209]} \item[214] {\rm Sq(0,1)[211] + Sq(0,1)[209]} \item[215] {\rm Sq(3)[212] + Sq(0,1)[212] + Sq(3)[209] + Sq(3)[208]} \item[216] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{3}:$ [196] \item[217] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{3}:$ [196] \end{gl} \end{bdl} \begin{bdl} \item[25/171] \mb{25/171} \begin{gl} \item[218] {\rm Sq(3)[212] + Sq(0,1)[212]} \\ $h_{3}:$ [195] \item[219] {\rm Sq(1)[221] + Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [221], [219], [218] \\ $h_{1}:$ [214] \\ $h_{3}:$ [199], [197], [196] \item[220] {\rm Sq(1)[222] + Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [222], [219], [218] \\ $h_{3}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[24/171] \mb{24/171} \begin{gl} \item[218] {\rm Sq(3,1)[210] + Sq(3,1)[209] + Sq(3,1)[208] + Sq(0,2)[208]} \item[219] {\rm Sq(3)[218] + Sq(0,1)[218] + Sq(3)[216] + Sq(0,1)[216] + Sq(0,1)[215]} \\ $h_{4}:$ [175], [174] \item[220] {\rm Sq(2)[220] + Sq(2)[219]} \\ $h_{1}:$ [220], [219] \item[221] {\rm Sq(1)[224] + Sq(1)[223] + Sq(1)[222]} \\ $h_{0}:$ [224], [223], [222] \\ $h_{3}:$ [204], [203] \\ $h_{4}:$ [175], [174] \item[222] {\rm Sq(1)[225] + Sq(1)[223] + Sq(1)[222]} \\ $h_{0}:$ [225], [223], [222] \\ $h_{4}:$ [175], [174] \end{gl} \end{bdl} \begin{bdl} \item[23/171] \mb{23/171} \begin{gl} \item[222] {\rm Sq(0,1)[226]} \item[223] {\rm Sq(0,1)[227]} \item[224] {\rm Sq(3)[227] + Sq(3)[226]} \item[225] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \end{gl} \end{bdl} \begin{bdl} \item[22/171] \mb{22/171} \begin{gl} \item[231] {\rm Sq(3,1)[221] + Sq(3,1)[220] + Sq(0,2)[220]} \item[232] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \item[233] {\rm Sq(1)[238] + Sq(1)[236]} \\ $h_{0}:$ [238], [236] \\ $h_{1}:$ [234] \\ $h_{2}:$ [231] \\ $h_{3}:$ [215] \\ $h_{5}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[21/171] \mb{21/171} \begin{gl} \item[236] {\rm Sq(2,1)[223]} \item[237] {\rm Sq(1,1)[229] + Sq(1,1)[228] + Sq(1,1)[227]} \item[238] {\rm Sq(1)[238] + Sq(1)[237]} \\ $h_{0}:$ [238], [237] \\ $h_{2}:$ [227] \\ $h_{3}:$ [214] \\ $h_{5}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[20/171] \mb{20/171} \begin{gl} \item[237] {\rm Sq(2,1)[232] + Sq(5)[230]} \item[238] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \item[239] {\rm Sq(1)[245] + Sq(1)[241]} \\ $h_{0}:$ [245], [241] \\ $h_{3}:$ [223], [221] \\ $h_{6}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[19/171] \mb{19/171} \begin{gl} \item[239] {\rm Sq(2,1)[240]} \item[240] {\rm Sq(5)[242] + Sq(2,1)[242] + Sq(5)[240]} \\ $h_{5}:$ [153] \item[241] {\rm Sq(1,1)[243]} \\ $h_{5}:$ [153] \item[242] {\rm Sq(0,1)[245]} \\ $h_{5}:$ [153] \item[243] {\rm Sq(2)[248] + Sq(2)[247]} \\ $h_{1}:$ [248], [247] \item[244] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{2}:$ [244] \\ $h_{5}:$ [153] \\ $h_{7}:$ [7] \item[245] {\rm Sq(1)[251] + Sq(1)[249]} \\ $h_{0}:$ [251], [249] \\ $h_{3}:$ [231] \\ $h_{5}:$ [153] \\ $h_{6}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[18/171] \mb{18/171} \begin{gl} \item[249] {\rm Sq(1,1)[248] + Sq(1,1)[247]} \item[250] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{2}:$ [247] \\ $h_{7}:$ [8] \item[251] {\rm Sq(1)[256] + Sq(1)[255] + Sq(1)[254]} \\ $h_{0}:$ [256], [255], [254] \\ $h_{3}:$ [236] \\ $h_{6}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[17/171] \mb{17/171} \begin{gl} \item[253] {\rm Sq(0,1)[255]} \\ $h_{7}:$ [7] \item[254] {\rm Sq(3)[257] + Sq(0,1)[257] + Sq(3)[256]} \item[255] {\rm Sq(1)[260] + Sq(1)[259]} \\ $h_{0}:$ [260], [259] \item[256] {\rm Sq(1)[261] + Sq(1)[259]} \\ $h_{0}:$ [261], [259] \end{gl} \end{bdl} \begin{bdl} \item[16/171] \mb{16/171} \begin{gl} \item[259] {\rm Sq(0,1)[264]} \item[260] {\rm Sq(3)[265] + Sq(0,1)[265] + Sq(3)[264]} \item[261] {\rm Sq(3)[266] + Sq(0,1)[265]} \end{gl} \end{bdl} \begin{bdl} \item[15/171] \mb{15/171} \begin{gl} \item[271] {\rm Sq(1)[291] + Sq(1)[288]} \\ $h_{0}:$ [291], [288] \\ $h_{2}:$ [277], [276] \\ $h_{3}:$ [261], [260], [257] \end{gl} \end{bdl} \begin{bdl} \item[14/171] \mb{14/171} \begin{gl} \item[288] {\rm Sq(0,1)[290]} \\ $h_{3}:$ [267] \\ $h_{5}:$ [182] \item[289] {\rm Sq(3)[290] + Sq(3)[289] + Sq(3)[287]} \item[290] {\rm Sq(2)[292]} \\ $h_{1}:$ [292] \\ $h_{3}:$ [266] \\ $h_{5}:$ [182] \item[291] {\rm Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [299], [298] \\ $h_{3}:$ [266] \\ $h_{5}:$ [182] \end{gl} \end{bdl} \begin{bdl} \item[13/171] \mb{13/171} \begin{gl} \item[298] {\rm Sq(5)[290] + Sq(2,1)[290] + Sq(2,1)[289]} \item[299] {\rm Sq(1,1)[294]} \end{gl} \end{bdl} \begin{bdl} \item[12/171] \mb{12/171} \begin{gl} \item[303] {\rm Sq(4)[307]} \\ $h_{2}:$ [307] \\ $h_{4}:$ [254] \\ $h_{5}:$ [194] \\ $h_{6}:$ [91] \item[304] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{1}:$ [312] \\ $h_{3}:$ [292] \item[305] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{3}:$ [293], [292] \\ $h_{4}:$ [255], [254] \\ $h_{5}:$ [194] \\ $h_{6}:$ [91] \item[306] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \end{gl} \end{bdl} \begin{bdl} \item[11/171] \mb{11/171} \begin{gl} \item[314] {\rm Sq(3,1)[296]} \item[315] {\rm Sq(1,1)[299]} \\ $h_{3}:$ [287] \item[316] {\rm Sq(1,1)[300]} \\ $h_{5}:$ [196] \item[317] {\rm Sq(0,1)[303]} \\ $h_{7}:$ [15] \item[318] {\rm Sq(3)[304] + Sq(0,1)[304]} \end{gl} \end{bdl} \begin{bdl} \item[9/171] \mb{9/171} \begin{gl} \item[275] {\rm Sq(3)[236] + Sq(0,1)[236]} \\ $h_{3}:$ [224] \item[276] {\rm Sq(3)[237] + Sq(0,1)[237]} \\ $h_{4}:$ [200] \item[277] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{2}:$ [234] \\ $h_{5}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[8/171] \mb{8/171} \begin{gl} \item[240] {\rm Sq(3)[202] + Sq(0,1)[202]} \end{gl} \end{bdl} \begin{bdl} \item[7/171] \mb{7/171} \begin{gl} \item[206] {\rm Sq(2)[168]} \\ $h_{1}:$ [168] \\ $h_{5}:$ [120] \item[207] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [159] \\ $h_{7}:$ [21] \item[208] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{1}:$ [169] \\ $h_{3}:$ [161], [160] \\ $h_{4}:$ [145] \\ $h_{5}:$ [122], [121] \\ $h_{6}:$ [90], [89] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[6/171] \mb{6/171} \begin{gl} \item[170] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{7}:$ [23] \item[171] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{3}:$ [116] \\ $h_{5}:$ [92] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[5/171] \mb{5/171} \begin{gl} \item[124] {\rm Sq(5,1)[79]} \\ $h_{7}:$ [22] \item[125] {\rm Sq(8)[79] + Sq(2,2)[79]} \\ $h_{3}:$ [79] \\ $h_{5}:$ [65] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \dm{172} \begin{bdl} \item[82/172] \mb{82/172} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[81/172] \mb{81/172} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[80/172] \mb{80/172} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[74/172] \mb{74/172} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[71/172] \mb{71/172} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[70/172] \mb{70/172} \begin{gl} \item[19] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[69/172] \mb{69/172} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[68/172] \mb{68/172} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[67/172] \mb{67/172} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[66/172] \mb{66/172} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[65/172] \mb{65/172} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \item[32] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[64/172] \mb{64/172} \begin{gl} \item[32] {\rm Sq(3,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[63/172] \mb{63/172} \begin{gl} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[62/172] \mb{62/172} \begin{gl} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(0,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[59/172] \mb{59/172} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[58/172] \mb{58/172} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[56/172] \mb{56/172} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[55/172] \mb{55/172} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[54/172] \mb{54/172} \begin{gl} \item[61] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[62] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[53/172] \mb{53/172} \begin{gl} \item[63] {\rm Sq(0,1)[60]} \item[64] {\rm Sq(0,1)[61]} \item[65] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{3}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[52/172] \mb{52/172} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(1)[72] + Sq(1)[71]} \\ $h_{0}:$ [72], [71] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[51/172] \mb{51/172} \begin{gl} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{1}:$ [74] \\ $h_{2}:$ [71] \\ $h_{3}:$ [65] \item[72] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [74] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[50/172] \mb{50/172} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[49/172] \mb{49/172} \begin{gl} \item[79] {\rm Sq(1,1)[78] + Sq(1,1)[77]} \item[80] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[48/172] \mb{48/172} \begin{gl} \item[84] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[47/172] \mb{47/172} \begin{gl} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(0,1)[91]} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(1)[95] + Sq(1)[94]} \\ $h_{0}:$ [95], [94] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[46/172] \mb{46/172} \begin{gl} \item[94] {\rm Sq(1,1)[95]} \item[95] {\rm Sq(0,1)[96]} \item[96] {\rm Sq(0,1)[97]} \end{gl} \end{bdl} \begin{bdl} \item[44/172] \mb{44/172} \begin{gl} \item[107] {\rm Sq(0,1)[113]} \item[108] {\rm Sq(0,1)[114]} \item[109] {\rm Sq(0,1)[115]} \end{gl} \end{bdl} \begin{bdl} \item[43/172] \mb{43/172} \begin{gl} \item[119] {\rm Sq(0,1)[118]} \item[120] {\rm Sq(0,1)[119]} \item[121] {\rm Sq(0,1)[120]} \end{gl} \end{bdl} \begin{bdl} \item[41/172] \mb{41/172} \begin{gl} \item[126] {\rm Sq(0,1)[120]} \item[127] {\rm Sq(0,1)[121]} \item[128] {\rm Sq(0,1)[122]} \item[129] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{1}:$ [124] \\ $h_{2}:$ [119] \\ $h_{3}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[40/172] \mb{40/172} \begin{gl} \item[127] {\rm Sq(0,1)[126]} \item[128] {\rm Sq(0,1)[127]} \item[129] {\rm Sq(0,1)[128]} \item[130] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{2}:$ [125] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[39/172] \mb{39/172} \begin{gl} \item[135] {\rm Sq(0,1)[133]} \item[136] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[38/172] \mb{38/172} \begin{gl} \item[140] {\rm Sq(0,1)[136]} \item[141] {\rm Sq(0,1)[137]} \item[142] {\rm Sq(0,1)[138]} \item[143] {\rm Sq(2)[142]} \\ $h_{1}:$ [142] \item[144] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{3}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[37/172] \mb{37/172} \begin{gl} \item[144] {\rm Sq(0,1)[145] + Sq(0,1)[144]} \item[145] {\rm Sq(0,1)[146] + Sq(0,1)[144]} \item[146] {\rm Sq(0,1)[147]} \item[147] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \end{gl} \end{bdl} \begin{bdl} \item[36/172] \mb{36/172} \begin{gl} \item[152] {\rm Sq(0,1)[160]} \item[153] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[35/172] \mb{35/172} \begin{gl} \item[165] {\rm Sq(0,1)[170]} \item[166] {\rm Sq(0,1)[171]} \item[167] {\rm Sq(3)[171] + Sq(3)[170]} \item[168] {\rm Sq(0,1)[172]} \item[169] {\rm Sq(0,1)[173]} \end{gl} \end{bdl} \begin{bdl} \item[34/172] \mb{34/172} \begin{gl} \item[176] {\rm Sq(0,1)[172]} \item[177] {\rm Sq(0,1)[173]} \item[178] {\rm Sq(0,1)[174]} \end{gl} \end{bdl} \begin{bdl} \item[33/172] \mb{33/172} \begin{gl} \item[180] {\rm Sq(0,1)[176]} \item[181] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{1}:$ [177] \\ $h_{2}:$ [175] \item[182] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{1}:$ [180], [178] \\ $h_{2}:$ [175] \\ $h_{3}:$ [155] \\ $h_{4}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[32/172] \mb{32/172} \begin{gl} \item[182] {\rm Sq(0,1)[181]} \item[183] {\rm Sq(0,1)[182]} \item[184] {\rm Sq(0,1)[183]} \item[185] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \\ $h_{2}:$ [177] \item[186] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{2}:$ [177] \\ $h_{4}:$ [141], [139] \end{gl} \end{bdl} \begin{bdl} \item[31/172] \mb{31/172} \begin{gl} \item[187] {\rm Sq(1,1)[186] + Sq(1,1)[185]} \item[188] {\rm Sq(0,1)[187]} \item[189] {\rm Sq(0,1)[188]} \item[190] {\rm Sq(1)[195] + Sq(1)[193]} \\ $h_{0}:$ [195], [193] \item[191] {\rm Sq(1)[197] + Sq(1)[193]} \\ $h_{0}:$ [197], [193] \\ $h_{4}:$ [146], [144] \end{gl} \end{bdl} \begin{bdl} \item[30/172] \mb{30/172} \begin{gl} \item[193] {\rm Sq(2,1)[186]} \item[194] {\rm Sq(1,1)[192] + Sq(1,1)[191] + Sq(1,1)[190]} \item[195] {\rm Sq(1,1)[193]} \item[196] {\rm Sq(2)[198]} \\ $h_{1}:$ [198] \item[197] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{4}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[29/172] \mb{29/172} \begin{gl} \item[200] {\rm Sq(0,1)[199]} \item[201] {\rm Sq(0,1)[200] + Sq(0,1)[198]} \item[202] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{2}:$ [194] \\ $h_{4}:$ [148] \item[203] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{4}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[28/172] \mb{28/172} \begin{gl} \item[206] {\rm Sq(0,1)[202]} \item[207] {\rm Sq(0,1)[203]} \item[208] {\rm Sq(0,1)[204]} \item[209] {\rm Sq(1)[214] + Sq(1)[213]} \\ $h_{0}:$ [214], [213] \\ $h_{4}:$ [160], [159] \end{gl} \end{bdl} \begin{bdl} \item[27/172] \mb{27/172} \begin{gl} \item[213] {\rm Sq(1,1)[209] + Sq(1,1)[207]} \item[214] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{4}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[26/172] \mb{26/172} \begin{gl} \item[218] {\rm Sq(0,1)[215]} \item[219] {\rm Sq(3)[217] + Sq(0,1)[217] + Sq(3)[216] + Sq(0,1)[216] + Sq(3)[214] + Sq(0,1)[214]} \item[220] {\rm Sq(1)[222] + Sq(1)[221]} \\ $h_{0}:$ [222], [221] \\ $h_{1}:$ [218] \\ $h_{3}:$ [198] \item[221] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \\ $h_{4}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[25/172] \mb{25/172} \begin{gl} \item[221] {\rm Sq(1,1)[212]} \item[222] {\rm Sq(3)[214]} \item[223] {\rm Sq(0,1)[215] + Sq(0,1)[214]} \item[224] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{1}:$ [220] \item[225] {\rm Sq(1)[225]} \\ $h_{0}:$ [225] \\ $h_{1}:$ [219] \\ $h_{2}:$ [212] \\ $h_{3}:$ [204], [201] \\ $h_{4}:$ [171] \item[226] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \end{gl} \end{bdl} \begin{bdl} \item[24/172] \mb{24/172} \begin{gl} \item[223] {\rm Sq(3)[220] + Sq(3)[219] + Sq(0,1)[219]} \item[224] {\rm Sq(2)[224] + Sq(2)[223] + Sq(2)[222]} \\ $h_{1}:$ [224], [223], [222] \\ $h_{3}:$ [206], [205] \item[225] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{2}:$ [215] \\ $h_{4}:$ [178], [177] \item[226] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[23/172] \mb{23/172} \begin{gl} \item[226] {\rm Sq(3)[230] + Sq(0,1)[230]} \\ $h_{3}:$ [214] \\ $h_{4}:$ [190] \item[227] {\rm Sq(1)[236] + Sq(1)[235]} \\ $h_{0}:$ [236], [235] \item[228] {\rm Sq(1)[237] + Sq(1)[235]} \\ $h_{0}:$ [237], [235] \end{gl} \end{bdl} \begin{bdl} \item[22/172] \mb{22/172} \begin{gl} \item[234] {\rm Sq(3,1)[226] + Sq(0,2)[226] + Sq(3,1)[225] + Sq(0,2)[225]} \item[235] {\rm Sq(3,1)[228] + Sq(0,2)[225] + Sq(3,1)[224]} \item[236] {\rm Sq(5)[231] + Sq(2,1)[231]} \item[237] {\rm Sq(3)[234]} \item[238] {\rm Sq(2)[236]} \\ $h_{1}:$ [236] \item[239] {\rm Sq(2)[237]} \\ $h_{1}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[21/172] \mb{21/172} \begin{gl} \item[239] {\rm Sq(5)[227]} \item[240] {\rm Sq(0,1)[235]} \\ $h_{5}:$ [148] \item[241] {\rm Sq(3)[235]} \\ $h_{4}:$ [191] \\ $h_{5}:$ [148] \item[242] {\rm Sq(3)[236] + Sq(0,1)[236]} \\ $h_{4}:$ [191] \end{gl} \end{bdl} \begin{bdl} \item[20/172] \mb{20/172} \begin{gl} \item[240] {\rm Sq(2)[241] + Sq(2)[240]} \\ $h_{1}:$ [241], [240] \item[241] {\rm Sq(1)[247] + Sq(1)[246]} \\ $h_{0}:$ [247], [246] \\ $h_{2}:$ [237] \item[242] {\rm Sq(1)[248] + Sq(1)[246]} \\ $h_{0}:$ [248], [246] \\ $h_{2}:$ [237] \item[243] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{1}:$ [239] \\ $h_{3}:$ [224] \item[244] {\rm Sq(1)[250] + Sq(1)[246]} \\ $h_{0}:$ [250], [246] \\ $h_{1}:$ [243] \\ $h_{2}:$ [237] \\ $h_{3}:$ [226], [225] \\ $h_{4}:$ [199], [198] \\ $h_{6}:$ [70], [69] \end{gl} \end{bdl} \begin{bdl} \item[19/172] \mb{19/172} \begin{gl} \item[246] {\rm Sq(3,1)[242] + Sq(6)[240] + Sq(3,1)[240]} \item[247] {\rm Sq(1,1)[245]} \item[248] {\rm Sq(3)[248] + Sq(3)[247]} \item[249] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \item[250] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{3}:$ [234], [233], [232] \\ $h_{6}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[18/172] \mb{18/172} \begin{gl} \item[252] {\rm Sq(6)[243] + Sq(0,2)[243]} \item[253] {\rm Sq(2,1)[246]} \item[254] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \item[255] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{3}:$ [239], [238], [237] \\ $h_{6}:$ [79] \item[256] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{1}:$ [253] \\ $h_{2}:$ [249] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[17/172] \mb{17/172} \begin{gl} \item[257] {\rm Sq(1,1)[257]} \item[258] {\rm Sq(3)[258]} \item[259] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \item[260] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{2}:$ [255] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[16/172] \mb{16/172} \begin{gl} \item[262] {\rm Sq(1,1)[265]} \item[263] {\rm Sq(1,1)[268] + Sq(1,1)[267] + Sq(1,1)[266] + Sq(1,1)[264]} \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[15/172] \mb{15/172} \begin{gl} \item[272] {\rm Sq(0,1)[285]} \\ $h_{3}:$ [265], [264] \\ $h_{6}:$ [84] \item[273] {\rm Sq(3)[285]} \\ $h_{3}:$ [265], [264] \\ $h_{6}:$ [84] \item[274] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{1}:$ [290], [289], [288] \\ $h_{2}:$ [279] \\ $h_{3}:$ [267], [265] \\ $h_{4}:$ [224] \\ $h_{6}:$ [84], [83] \end{gl} \end{bdl} \begin{bdl} \item[14/172] \mb{14/172} \begin{gl} \item[292] {\rm Sq(0,1)[292]} \\ $h_{3}:$ [273], [272] \item[293] {\rm Sq(2)[299] + Sq(2)[298]} \\ $h_{1}:$ [299], [298] \\ $h_{3}:$ [273], [272] \end{gl} \end{bdl} \begin{bdl} \item[13/172] \mb{13/172} \begin{gl} \item[300] {\rm Sq(3)[300] + Sq(0,1)[300] + Sq(0,1)[299] + Sq(3)[298] + Sq(0,1)[298]} \\ $h_{7}:$ [13] \item[301] {\rm Sq(0,1)[301] + Sq(0,1)[299]} \\ $h_{3}:$ [280] \\ $h_{5}:$ [190] \\ $h_{7}:$ [13] \item[302] {\rm Sq(3)[301] + Sq(0,1)[299] + Sq(3)[298]} \\ $h_{7}:$ [13] \item[303] {\rm Sq(1)[307]} \\ $h_{0}:$ [307] \\ $h_{3}:$ [282], [281], [280] \\ $h_{5}:$ [190] \\ $h_{6}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[12/172] \mb{12/172} \begin{gl} \item[307] {\rm Sq(0,1)[312]} \item[308] {\rm Sq(2)[316]} \\ $h_{1}:$ [316] \\ $h_{5}:$ [200], [199] \end{gl} \end{bdl} \begin{bdl} \item[11/172] \mb{11/172} \begin{gl} \item[319] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{3}:$ [291] \item[320] {\rm Sq(1)[314] + Sq(1)[313] + Sq(1)[312] + Sq(1)[310]} \\ $h_{0}:$ [314], [313], [312], [310] \\ $h_{5}:$ [206], [204], [203] \end{gl} \end{bdl} \begin{bdl} \item[10/172] \mb{10/172} \begin{gl} \item[309] {\rm Sq(6)[267] + Sq(3,1)[267] + Sq(0,2)[267]} \item[310] {\rm Sq(1,1)[271]} \\ $h_{5}:$ [186], [185] \item[311] {\rm Sq(1,1)[272] + Sq(1,1)[270]} \item[312] {\rm Sq(3)[274] + Sq(0,1)[274]} \\ $h_{5}:$ [186], [185] \\ $h_{7}:$ [20] \item[313] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{1}:$ [276] \\ $h_{2}:$ [271] \\ $h_{3}:$ [263] \\ $h_{4}:$ [236], [234] \\ $h_{6}:$ [105] \item[314] {\rm Sq(1)[279]} \\ $h_{0}:$ [279] \\ $h_{1}:$ [276] \\ $h_{2}:$ [271] \\ $h_{3}:$ [263] \\ $h_{4}:$ [236], [234] \\ $h_{5}:$ [191], [187], [186] \\ $h_{6}:$ [105] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[9/172] \mb{9/172} \begin{gl} \item[278] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{4}:$ [202] \item[279] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{4}:$ [202] \\ $h_{5}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[8/172] \mb{8/172} \begin{gl} \item[241] {\rm Sq(3)[204] + Sq(0,1)[204]} \\ $h_{4}:$ [175] \item[242] {\rm Sq(3)[205] + Sq(0,1)[205]} \\ $h_{4}:$ [175] \item[243] {\rm Sq(2)[206]} \\ $h_{1}:$ [206] \\ $h_{3}:$ [196] \\ $h_{4}:$ [175] \\ $h_{5}:$ [145], [143] \item[244] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{2}:$ [202] \\ $h_{3}:$ [197] \\ $h_{5}:$ [147], [146] \\ $h_{7}:$ [19] \item[245] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{4}:$ [175] \\ $h_{5}:$ [146] \end{gl} \end{bdl} \begin{bdl} \item[7/172] \mb{7/172} \begin{gl} \item[209] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{5}:$ [124], [123] \\ $h_{7}:$ [22] \item[210] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{5}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[6/172] \mb{6/172} \begin{gl} \item[172] {\rm Sq(3,1)[122] + Sq(3,1)[121]} \\ $h_{5}:$ [94], [93] \\ $h_{7}:$ [24] \item[173] {\rm Sq(2)[124]} \\ $h_{1}:$ [124] \\ $h_{3}:$ [117] \\ $h_{7}:$ [25] \item[174] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{5}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[5/172] \mb{5/172} \begin{gl} \item[126] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \item[127] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{3}:$ [81] \\ $h_{4}:$ [74] \\ $h_{5}:$ [66] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[4/172] \mb{4/172} \begin{gl} \item[84] {\rm Sq(13,4,1)[46] + Sq(7,6,1)[46] + Sq(4,7,1)[46] + Sq(12,2,2)[46] + Sq(9,3,2)[46] + Sq(11,0,3)[46] + Sq(8,1,3)[46] + Sq(5,2,3)[46] + Sq(5,4,0,1)[46] + Sq(2,5,0,1)[46] + Sq(1,3,1,1)[46]} \item[85] {\rm Sq(8)[54] + Sq(5,1)[54]} \\ $h_{3}:$ [54] \\ $h_{4}:$ [50] \\ $h_{5}:$ [46] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \dm{173} \begin{bdl} \item[81/173] \mb{81/173} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[80/173] \mb{80/173} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[79/173] \mb{79/173} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[76/173] \mb{76/173} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[73/173] \mb{73/173} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[70/173] \mb{70/173} \begin{gl} \item[20] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[69/173] \mb{69/173} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[68/173] \mb{68/173} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[67/173] \mb{67/173} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[66/173] \mb{66/173} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[65/173] \mb{65/173} \begin{gl} \item[33] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[34] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[64/173] \mb{64/173} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[63/173] \mb{63/173} \begin{gl} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[62/173] \mb{62/173} \begin{gl} \item[40] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [39], [37] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[61/173] \mb{61/173} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [38] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[60/173] \mb{60/173} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \item[43] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[59/173] \mb{59/173} \begin{gl} \item[49] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[58/173] \mb{58/173} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[57/173] \mb{57/173} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[56/173] \mb{56/173} \begin{gl} \item[57] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \\ $h_{4}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[55/173] \mb{55/173} \begin{gl} \item[57] {\rm Sq(0,1)[58]} \item[58] {\rm Sq(0,1)[59]} \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \\ $h_{4}:$ [39] \item[60] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{4}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[54/173] \mb{54/173} \begin{gl} \item[63] {\rm Sq(0,1)[60]} \item[64] {\rm Sq(1)[67] + Sq(1)[66]} \\ $h_{0}:$ [67], [66] \\ $h_{2}:$ [59] \\ $h_{3}:$ [54] \item[65] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[53/173] \mb{53/173} \begin{gl} \item[66] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [59] \item[67] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{3}:$ [53] \item[68] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[52/173] \mb{52/173} \begin{gl} \item[66] {\rm Sq(0,1)[67]} \item[67] {\rm Sq(0,1)[68]} \item[68] {\rm Sq(0,1)[69]} \item[69] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{3}:$ [59] \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[51/173] \mb{51/173} \begin{gl} \item[73] {\rm Sq(0,1)[75]} \item[74] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \item[75] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[50/173] \mb{50/173} \begin{gl} \item[80] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \item[81] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[49/173] \mb{49/173} \begin{gl} \item[81] {\rm Sq(0,1)[80]} \item[82] {\rm Sq(3)[80]} \item[83] {\rm Sq(0,1)[81]} \item[84] {\rm Sq(0,1)[82]} \item[85] {\rm Sq(3)[83]} \end{gl} \end{bdl} \begin{bdl} \item[48/173] \mb{48/173} \begin{gl} \item[85] {\rm Sq(0,1)[87]} \end{gl} \end{bdl} \begin{bdl} \item[47/173] \mb{47/173} \begin{gl} \item[92] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{1}:$ [95], [94] \\ $h_{2}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[46/173] \mb{46/173} \begin{gl} \item[97] {\rm Sq(0,1)[98]} \item[98] {\rm Sq(0,1)[99]} \item[99] {\rm Sq(0,1)[100]} \item[100] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [96] \end{gl} \end{bdl} \begin{bdl} \item[45/173] \mb{45/173} \begin{gl} \item[101] {\rm Sq(1,1)[104]} \item[102] {\rm Sq(0,1)[105]} \item[103] {\rm Sq(0,1)[106]} \end{gl} \end{bdl} \begin{bdl} \item[44/173] \mb{44/173} \begin{gl} \item[110] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[43/173] \mb{43/173} \begin{gl} \item[122] {\rm Sq(0,1)[123]} \item[123] {\rm Sq(0,1)[124]} \item[124] {\rm Sq(0,1)[125]} \end{gl} \end{bdl} \begin{bdl} \item[42/173] \mb{42/173} \begin{gl} \item[128] {\rm Sq(0,1)[121]} \item[129] {\rm Sq(0,1)[122]} \item[130] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[41/173] \mb{41/173} \begin{gl} \item[130] {\rm Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[40/173] \mb{40/173} \begin{gl} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(0,1)[131]} \item[133] {\rm Sq(0,1)[132]} \end{gl} \end{bdl} \begin{bdl} \item[39/173] \mb{39/173} \begin{gl} \item[137] {\rm Sq(0,1)[135]} \item[138] {\rm Sq(0,1)[136]} \item[139] {\rm Sq(0,1)[137]} \item[140] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{1}:$ [143], [140] \\ $h_{2}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[38/173] \mb{38/173} \begin{gl} \item[145] {\rm Sq(0,1)[140]} \item[146] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{2}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[37/173] \mb{37/173} \begin{gl} \item[148] {\rm Sq(0,1)[148]} \item[149] {\rm Sq(0,1)[149]} \item[150] {\rm Sq(0,1)[150]} \item[151] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{2}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[36/173] \mb{36/173} \begin{gl} \item[154] {\rm Sq(0,1)[161]} \item[155] {\rm Sq(0,1)[162]} \item[156] {\rm Sq(0,1)[163]} \item[157] {\rm Sq(0,1)[164]} \item[158] {\rm Sq(2)[167] + Sq(2)[166] + Sq(2)[165]} \\ $h_{1}:$ [167], [166], [165] \end{gl} \end{bdl} \begin{bdl} \item[35/173] \mb{35/173} \begin{gl} \item[170] {\rm Sq(0,1)[174]} \end{gl} \end{bdl} \begin{bdl} \item[34/173] \mb{34/173} \begin{gl} \item[179] {\rm Sq(0,1)[177] + Sq(0,1)[176]} \item[180] {\rm Sq(0,1)[178] + Sq(0,1)[175]} \item[181] {\rm Sq(3)[179] + Sq(0,1)[179] + Sq(3)[178] + Sq(0,1)[176] + Sq(3)[175]} \end{gl} \end{bdl} \begin{bdl} \item[33/173] \mb{33/173} \begin{gl} \item[183] {\rm Sq(0,1)[177]} \item[184] {\rm Sq(0,1)[178]} \item[185] {\rm Sq(0,1)[179]} \item[186] {\rm Sq(3)[181] + Sq(0,1)[181]} \end{gl} \end{bdl} \begin{bdl} \item[32/173] \mb{32/173} \begin{gl} \item[187] {\rm Sq(0,1)[185]} \item[188] {\rm Sq(1)[196] + Sq(1)[195] + Sq(1)[194]} \\ $h_{0}:$ [196], [195], [194] \\ $h_{3}:$ [169], [166] \\ $h_{5}:$ [97], [95] \end{gl} \end{bdl} \begin{bdl} \item[31/173] \mb{31/173} \begin{gl} \item[192] {\rm Sq(0,1)[190]} \item[193] {\rm Sq(0,1)[191]} \item[194] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{1}:$ [196], [194] \item[195] {\rm Sq(1)[201] + Sq(1)[198]} \\ $h_{0}:$ [201], [198] \\ $h_{1}:$ [195], [193] \item[196] {\rm Sq(1)[203] + Sq(1)[198]} \\ $h_{0}:$ [203], [198] \\ $h_{1}:$ [196], [195], [194], [193] \\ $h_{3}:$ [175], [173] \end{gl} \end{bdl} \begin{bdl} \item[30/173] \mb{30/173} \begin{gl} \item[198] {\rm Sq(2,1)[190]} \item[199] {\rm Sq(0,1)[197]} \item[200] {\rm Sq(0,1)[198]} \item[201] {\rm Sq(3)[198]} \item[202] {\rm Sq(1)[206] + Sq(1)[205]} \\ $h_{0}:$ [206], [205] \\ $h_{3}:$ [178], [176] \item[203] {\rm Sq(1)[207] + Sq(1)[205]} \\ $h_{0}:$ [207], [205] \\ $h_{3}:$ [178], [176] \end{gl} \end{bdl} \begin{bdl} \item[29/173] \mb{29/173} \begin{gl} \item[204] {\rm Sq(0,1)[204]} \item[205] {\rm Sq(1)[213] + Sq(1)[210]} \\ $h_{0}:$ [213], [210] \\ $h_{1}:$ [206] \\ $h_{2}:$ [201] \\ $h_{4}:$ [155], [154] \item[206] {\rm Sq(1)[214] + Sq(1)[212] + Sq(1)[211] + Sq(1)[210]} \\ $h_{0}:$ [214], [212], [211], [210] \\ $h_{1}:$ [206] \\ $h_{2}:$ [201] \\ $h_{3}:$ [180] \\ $h_{4}:$ [155], [154] \item[207] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{1}:$ [206] \\ $h_{2}:$ [201] \\ $h_{3}:$ [180] \\ $h_{4}:$ [155], [154] \end{gl} \end{bdl} \begin{bdl} \item[28/173] \mb{28/173} \begin{gl} \item[210] {\rm Sq(0,1)[209] + Sq(0,1)[208]} \item[211] {\rm Sq(3)[211] + Sq(0,1)[211] + Sq(3)[210] + Sq(0,1)[210]} \item[212] {\rm Sq(3)[212] + Sq(0,1)[212] + Sq(3)[210] + Sq(0,1)[210] + Sq(3)[209]} \item[213] {\rm Sq(1)[218] + Sq(1)[217] + Sq(1)[215]} \\ $h_{0}:$ [218], [217], [215] \\ $h_{2}:$ [202] \\ $h_{4}:$ [162] \item[214] {\rm Sq(1)[219] + Sq(1)[217] + Sq(1)[216]} \\ $h_{0}:$ [219], [217], [216] \\ $h_{2}:$ [202] \\ $h_{4}:$ [162] \item[215] {\rm Sq(1)[220] + Sq(1)[216]} \\ $h_{0}:$ [220], [216] \\ $h_{2}:$ [202] \\ $h_{4}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[27/173] \mb{27/173} \begin{gl} \item[215] {\rm Sq(5)[209] + Sq(2,1)[209] + Sq(2,1)[206]} \item[216] {\rm Sq(0,1)[215] + Sq(0,1)[214]} \item[217] {\rm Sq(3)[215] + Sq(0,1)[213]} \item[218] {\rm Sq(3)[217] + Sq(0,1)[217] + Sq(3)[216] + Sq(0,1)[216] + Sq(0,1)[213]} \item[219] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \item[220] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \end{gl} \end{bdl} \begin{bdl} \item[26/173] \mb{26/173} \begin{gl} \item[222] {\rm Sq(2,1)[212] + Sq(2,1)[211] + Sq(2,1)[208]} \item[223] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[25/173] \mb{25/173} \begin{gl} \item[227] {\rm Sq(3)[222] + Sq(0,1)[222] + Sq(3)[221] + Sq(0,1)[221] + Sq(0,1)[218]} \item[228] {\rm Sq(1)[230] + Sq(1)[229] + Sq(1)[228]} \\ $h_{0}:$ [230], [229], [228] \item[229] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \\ $h_{1}:$ [224], [223] \\ $h_{2}:$ [214], [213] \\ $h_{3}:$ [205] \\ $h_{4}:$ [176], [175] \\ $h_{5}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[24/173] \mb{24/173} \begin{gl} \item[227] {\rm Sq(0,1)[223]} \item[228] {\rm Sq(3)[224] + Sq(3)[223] + Sq(3)[222]} \item[229] {\rm Sq(3)[225] + Sq(0,1)[225] + Sq(3)[223] + Sq(3)[222] + Sq(0,1)[222]} \item[230] {\rm Sq(1)[230] + Sq(1)[229]} \\ $h_{0}:$ [230], [229] \item[231] {\rm Sq(1)[231] + Sq(1)[229]} \\ $h_{0}:$ [231], [229] \end{gl} \end{bdl} \begin{bdl} \item[23/173] \mb{23/173} \begin{gl} \item[229] {\rm Sq(2,1)[227]} \item[230] {\rm Sq(1,1)[230]} \item[231] {\rm Sq(3)[232] + Sq(0,1)[232]} \item[232] {\rm Sq(2)[236] + Sq(2)[235]} \\ $h_{1}:$ [236], [235] \item[233] {\rm Sq(1)[242] + Sq(1)[240]} \\ $h_{0}:$ [242], [240] \\ $h_{2}:$ [228] \\ $h_{7}:$ [3] \item[234] {\rm Sq(1)[243] + Sq(1)[240]} \\ $h_{0}:$ [243], [240] \\ $h_{1}:$ [238], [237], [235] \\ $h_{3}:$ [220], [218] \end{gl} \end{bdl} \begin{bdl} \item[22/173] \mb{22/173} \begin{gl} \item[240] {\rm Sq(3)[237] + Sq(0,1)[237]} \item[241] {\rm Sq(2)[242] + Sq(2)[239]} \\ $h_{1}:$ [242], [239] \\ $h_{4}:$ [198], [197], [196], [195] \item[242] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{7}:$ [3] \item[243] {\rm Sq(1)[247] + Sq(1)[244]} \\ $h_{0}:$ [247], [244] \\ $h_{3}:$ [222], [220] \end{gl} \end{bdl} \begin{bdl} \item[21/173] \mb{21/173} \begin{gl} \item[243] {\rm Sq(2,1)[233] + Sq(2,1)[231]} \\ $h_{7}:$ [3] \item[244] {\rm Sq(0,1)[237]} \\ $h_{3}:$ [220] \item[245] {\rm Sq(3)[238] + Sq(0,1)[238] + Sq(3)[237]} \item[246] {\rm Sq(3)[239] + Sq(0,1)[239] + Sq(3)[237]} \\ $h_{3}:$ [220] \\ $h_{7}:$ [3] \item[247] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \item[248] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \\ $h_{1}:$ [240] \\ $h_{2}:$ [236], [235] \\ $h_{3}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[20/173] \mb{20/173} \begin{gl} \item[245] {\rm Sq(3)[239] + Sq(0,1)[239]} \item[246] {\rm Sq(3)[243] + Sq(3)[241] + Sq(0,1)[241] + Sq(3)[240] + Sq(0,1)[240]} \item[247] {\rm Sq(3)[245] + Sq(0,1)[245] + Sq(3)[241] + Sq(0,1)[240]} \item[248] {\rm Sq(1)[254]} \\ $h_{0}:$ [254] \\ $h_{2}:$ [238] \item[249] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{2}:$ [238] \\ $h_{3}:$ [229], [227] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[19/173] \mb{19/173} \begin{gl} \item[251] {\rm Sq(3)[251] + Sq(0,1)[251] + Sq(3)[249] + Sq(0,1)[249]} \item[252] {\rm Sq(2)[252]} \\ $h_{1}:$ [252] \item[253] {\rm Sq(2)[253]} \\ $h_{1}:$ [253] \item[254] {\rm Sq(1)[261] + Sq(1)[257]} \\ $h_{0}:$ [261], [257] \item[255] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{3}:$ [239] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[18/173] \mb{18/173} \begin{gl} \item[257] {\rm Sq(7)[243] + Sq(4,1)[243] + Sq(1,2)[243]} \item[258] {\rm Sq(3)[255] + Sq(0,1)[255]} \item[259] {\rm Sq(3)[256] + Sq(0,1)[256] + Sq(3)[254]} \item[260] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \item[261] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \item[262] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{3}:$ [242], [241] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[17/173] \mb{17/173} \begin{gl} \item[261] {\rm Sq(0,1)[260] + Sq(0,1)[259]} \item[262] {\rm Sq(3)[260] + Sq(3)[259]} \item[263] {\rm Sq(2)[262]} \\ $h_{1}:$ [262] \\ $h_{3}:$ [250] \\ $h_{5}:$ [170] \\ $h_{6}:$ [79], [77] \item[264] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{3}:$ [249] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[16/173] \mb{16/173} \begin{gl} \item[264] {\rm Sq(2,1)[266] + Sq(2,1)[265] + Sq(2,1)[264]} \item[265] {\rm Sq(3)[271] + Sq(0,1)[271]} \item[266] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[15/173] \mb{15/173} \begin{gl} \item[275] {\rm Sq(3,1)[277] + Sq(3,1)[276]} \item[276] {\rm Sq(1,1)[286] + Sq(1,1)[285]} \\ $h_{7}:$ [10] \item[277] {\rm Sq(3)[291] + Sq(0,1)[291] + Sq(3)[288] + Sq(0,1)[288]} \end{gl} \end{bdl} \begin{bdl} \item[14/173] \mb{14/173} \begin{gl} \item[294] {\rm Sq(3)[298] + Sq(0,1)[298]} \\ $h_{6}:$ [88] \item[295] {\rm Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [305], [304] \\ $h_{1}:$ [302], [300] \\ $h_{2}:$ [296], [292] \\ $h_{4}:$ [239] \end{gl} \end{bdl} \begin{bdl} \item[13/173] \mb{13/173} \begin{gl} \item[304] {\rm Sq(4)[301] + Sq(1,1)[300] + Sq(4)[298]} \\ $h_{2}:$ [301], [298] \\ $h_{4}:$ [252] \item[305] {\rm Sq(1,1)[302] + Sq(1,1)[298]} \\ $h_{4}:$ [252] \item[306] {\rm Sq(1)[311] + Sq(1)[310]} \\ $h_{0}:$ [311], [310] \\ $h_{2}:$ [302] \\ $h_{3}:$ [286], [285], [284] \\ $h_{4}:$ [251] \end{gl} \end{bdl} \begin{bdl} \item[12/173] \mb{12/173} \begin{gl} \item[309] {\rm Sq(0,1)[317] + Sq(0,1)[314]} \\ $h_{7}:$ [12] \item[310] {\rm Sq(3)[318] + Sq(0,1)[316] + Sq(3)[315] + Sq(0,1)[315] + Sq(3)[314] + Sq(0,1)[314]} \\ $h_{2}:$ [312] \\ $h_{3}:$ [300], [299] \\ $h_{5}:$ [203] \item[311] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{5}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[11/173] \mb{11/173} \begin{gl} \item[321] {\rm Sq(3,1)[302] + Sq(6)[301] + Sq(3,1)[301] + Sq(0,2)[301] + Sq(6)[299] + Sq(3,1)[299] + Sq(0,2)[299]} \\ $h_{4}:$ [262] \item[322] {\rm Sq(5)[304] + Sq(2,1)[304]} \end{gl} \end{bdl} \begin{bdl} \item[10/173] \mb{10/173} \begin{gl} \item[315] {\rm Sq(3)[277] + Sq(0,1)[277]} \item[316] {\rm Sq(1)[284] + Sq(1)[282] + Sq(1)[281] + Sq(1)[280]} \\ $h_{0}:$ [284], [282], [281], [280] \end{gl} \end{bdl} \begin{bdl} \item[9/173] \mb{9/173} \begin{gl} \item[280] {\rm Sq(1,1)[239] + Sq(1,1)[238]} \\ $h_{7}:$ [20] \item[281] {\rm Sq(0,1)[240]} \\ $h_{5}:$ [168] \item[282] {\rm Sq(3)[240]} \\ $h_{5}:$ [168] \\ $h_{7}:$ [20] \item[283] {\rm Sq(2)[242] + Sq(2)[241]} \\ $h_{1}:$ [242], [241] \\ $h_{3}:$ [231] \\ $h_{5}:$ [169], [166] \\ $h_{7}:$ [20] \item[284] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \end{gl} \end{bdl} \begin{bdl} \item[8/173] \mb{8/173} \begin{gl} \item[246] {\rm Sq(3)[207] + Sq(0,1)[207] + Sq(3)[206]} \\ $h_{7}:$ [20] \item[247] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{2}:$ [204] \\ $h_{3}:$ [199] \\ $h_{4}:$ [178] \\ $h_{5}:$ [148] \item[248] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \end{gl} \end{bdl} \begin{bdl} \item[7/173] \mb{7/173} \begin{gl} \item[211] {\rm Sq(4)[168]} \\ $h_{2}:$ [168] \\ $h_{4}:$ [150] \\ $h_{5}:$ [125] \item[212] {\rm Sq(2)[172]} \\ $h_{1}:$ [172] \\ $h_{5}:$ [126] \\ $h_{7}:$ [23] \item[213] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[6/173] \mb{6/173} \begin{gl} \item[175] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[5/173] \mb{5/173} \begin{gl} \item[128] {\rm Sq(2)[84]} \\ $h_{1}:$ [84] \\ $h_{5}:$ [67] \item[129] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[4/173] \mb{4/173} \begin{gl} \item[86] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[3/173] \mb{3/173} \begin{gl} \item[55] {\rm Sq(12,7,1)[25] + Sq(11,5,2)[25] + Sq(8,6,2)[25] + Sq(13,2,3)[25] + Sq(7,4,3)[25] + Sq(1,6,3)[25] + Sq(13,4,0,1)[25] + Sq(7,6,0,1)[25] + Sq(4,7,0,1)[25] + Sq(15,1,1,1)[25] + Sq(6,4,1,1)[25] + Sq(0,6,1,1)[25] + Sq(8,1,2,1)[25] + Sq(2,3,2,1)[25] + Sq(4,0,3,1)[25] + Sq(9,0,0,0,1)[25]} \end{gl} \end{bdl} \dm{174} \begin{bdl} \item[86/174] \mb{86/174} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[85/174] \mb{85/174} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[84/174] \mb{84/174} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[83/174] \mb{83/174} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[82/174] \mb{82/174} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[81/174] \mb{81/174} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[80/174] \mb{80/174} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[79/174] \mb{79/174} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[78/174] \mb{78/174} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[75/174] \mb{75/174} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[72/174] \mb{72/174} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[71/174] \mb{71/174} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[69/174] \mb{69/174} \begin{gl} \item[26] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[68/174] \mb{68/174} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[67/174] \mb{67/174} \begin{gl} \item[29] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[66/174] \mb{66/174} \begin{gl} \item[31] {\rm Sq(0,1)[30]} \item[32] {\rm Sq(0,1)[31]} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[63/174] \mb{63/174} \begin{gl} \item[37] {\rm Sq(0,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[61/174] \mb{61/174} \begin{gl} \item[44] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \\ $h_{4}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[60/174] \mb{60/174} \begin{gl} \item[44] {\rm Sq(0,1)[47]} \item[45] {\rm Sq(0,1)[48]} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{4}:$ [31], [30], [29] \end{gl} \end{bdl} \begin{bdl} \item[59/174] \mb{59/174} \begin{gl} \item[50] {\rm Sq(0,1)[55]} \item[51] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [35], [34], [33] \end{gl} \end{bdl} \begin{bdl} \item[58/174] \mb{58/174} \begin{gl} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{4}:$ [37], [36], [34] \end{gl} \end{bdl} \begin{bdl} \item[57/174] \mb{57/174} \begin{gl} \item[60] {\rm Sq(0,1)[55]} \item[61] {\rm Sq(0,1)[56]} \item[62] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[56/174] \mb{56/174} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \\ $h_{4}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[55/174] \mb{55/174} \begin{gl} \item[61] {\rm Sq(3)[62] + Sq(0,1)[62]} \item[62] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{4}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[54/174] \mb{54/174} \begin{gl} \item[66] {\rm Sq(0,1)[63]} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{4}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[53/174] \mb{53/174} \begin{gl} \item[69] {\rm Sq(0,1)[64]} \item[70] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [66] \\ $h_{2}:$ [62] \item[71] {\rm Sq(1)[73] + Sq(1)[72]} \\ $h_{0}:$ [73], [72] \end{gl} \end{bdl} \begin{bdl} \item[52/174] \mb{52/174} \begin{gl} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [67] \item[72] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [70] \item[73] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[51/174] \mb{51/174} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [74] \item[80] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{2}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[50/174] \mb{50/174} \begin{gl} \item[82] {\rm Sq(0,1)[79]} \item[83] {\rm Sq(0,1)[80]} \item[84] {\rm Sq(2)[82] + Sq(2)[81]} \\ $h_{1}:$ [82], [81] \item[85] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[49/174] \mb{49/174} \begin{gl} \item[86] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[48/174] \mb{48/174} \begin{gl} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(0,1)[89]} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[47/174] \mb{47/174} \begin{gl} \item[93] {\rm Sq(3)[94]} \item[94] {\rm Sq(0,1)[95]} \item[95] {\rm Sq(0,1)[96]} \end{gl} \end{bdl} \begin{bdl} \item[45/174] \mb{45/174} \begin{gl} \item[104] {\rm Sq(0,1)[107]} \item[105] {\rm Sq(0,1)[108]} \item[106] {\rm Sq(0,1)[109]} \item[107] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{1}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[44/174] \mb{44/174} \begin{gl} \item[111] {\rm Sq(0,1)[119]} \item[112] {\rm Sq(0,1)[120]} \item[113] {\rm Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[42/174] \mb{42/174} \begin{gl} \item[131] {\rm Sq(0,1)[126]} \item[132] {\rm Sq(0,1)[127]} \item[133] {\rm Sq(0,1)[128]} \item[134] {\rm Sq(2)[130]} \\ $h_{1}:$ [130] \end{gl} \end{bdl} \begin{bdl} \item[41/174] \mb{41/174} \begin{gl} \item[131] {\rm Sq(0,1)[127]} \item[132] {\rm Sq(0,1)[128]} \item[133] {\rm Sq(0,1)[129]} \end{gl} \end{bdl} \begin{bdl} \item[40/174] \mb{40/174} \begin{gl} \item[134] {\rm Sq(0,1)[135]} \end{gl} \end{bdl} \begin{bdl} \item[39/174] \mb{39/174} \begin{gl} \item[141] {\rm Sq(0,1)[140]} \item[142] {\rm Sq(0,1)[141]} \item[143] {\rm Sq(0,1)[142]} \end{gl} \end{bdl} \begin{bdl} \item[38/174] \mb{38/174} \begin{gl} \item[147] {\rm Sq(0,1)[144]} \item[148] {\rm Sq(0,1)[145]} \item[149] {\rm Sq(0,1)[146]} \end{gl} \end{bdl} \begin{bdl} \item[37/174] \mb{37/174} \begin{gl} \item[152] {\rm Sq(0,1)[152]} \item[153] {\rm Sq(1)[160] + Sq(1)[159]} \\ $h_{0}:$ [160], [159] \\ $h_{1}:$ [158], [156] \item[154] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{1}:$ [154] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[36/174] \mb{36/174} \begin{gl} \item[159] {\rm Sq(0,1)[165]} \item[160] {\rm Sq(0,1)[166]} \item[161] {\rm Sq(0,1)[168]} \item[162] {\rm Sq(0,1)[169]} \item[163] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[35/174] \mb{35/174} \begin{gl} \item[171] {\rm Sq(1,1)[175]} \item[172] {\rm Sq(0,1)[176]} \item[173] {\rm Sq(0,1)[177]} \item[174] {\rm Sq(0,1)[178]} \end{gl} \end{bdl} \begin{bdl} \item[34/174] \mb{34/174} \begin{gl} \item[182] {\rm Sq(0,1)[180]} \item[183] {\rm Sq(2)[186] + Sq(2)[183]} \\ $h_{1}:$ [186], [183] \item[184] {\rm Sq(1)[190] + Sq(1)[189]} \\ $h_{0}:$ [190], [189] \\ $h_{2}:$ [179], [178], [175] \end{gl} \end{bdl} \begin{bdl} \item[33/174] \mb{33/174} \begin{gl} \item[187] {\rm Sq(0,1)[182]} \item[188] {\rm Sq(0,1)[184]} \item[189] {\rm Sq(3)[185] + Sq(0,1)[185] + Sq(0,1)[183]} \item[190] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [177] \end{gl} \end{bdl} \begin{bdl} \item[32/174] \mb{32/174} \begin{gl} \item[189] {\rm Sq(0,1)[187]} \item[190] {\rm Sq(3)[187]} \item[191] {\rm Sq(0,1)[188]} \item[192] {\rm Sq(0,1)[189]} \end{gl} \end{bdl} \begin{bdl} \item[31/174] \mb{31/174} \begin{gl} \item[197] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{1}:$ [200] \\ $h_{3}:$ [180] \\ $h_{4}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[30/174] \mb{30/174} \begin{gl} \item[204] {\rm Sq(0,1)[200]} \item[205] {\rm Sq(0,1)[201]} \item[206] {\rm Sq(1)[212] + Sq(1)[211]} \\ $h_{0}:$ [212], [211] \\ $h_{3}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[29/174] \mb{29/174} \begin{gl} \item[208] {\rm Sq(0,1)[207] + Sq(3)[206] + Sq(0,1)[206]} \item[209] {\rm Sq(0,1)[208] + Sq(3)[206] + Sq(0,1)[206]} \item[210] {\rm Sq(2)[211]} \\ $h_{1}:$ [211] \item[211] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \item[212] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \\ $h_{3}:$ [189], [188] \end{gl} \end{bdl} \begin{bdl} \item[28/174] \mb{28/174} \begin{gl} \item[216] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \item[217] {\rm Sq(1)[225] + Sq(1)[221]} \\ $h_{0}:$ [225], [221] \\ $h_{3}:$ [195], [194] \end{gl} \end{bdl} \begin{bdl} \item[27/174] \mb{27/174} \begin{gl} \item[221] {\rm Sq(1,1)[217] + Sq(1,1)[216]} \item[222] {\rm Sq(0,1)[218]} \item[223] {\rm Sq(2)[222]} \\ $h_{1}:$ [222] \item[224] {\rm Sq(1)[226] + Sq(1)[225] + Sq(1)[224]} \\ $h_{0}:$ [226], [225], [224] \item[225] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \end{gl} \end{bdl} \begin{bdl} \item[26/174] \mb{26/174} \begin{gl} \item[224] {\rm Sq(0,1)[221]} \item[225] {\rm Sq(0,1)[222]} \item[226] {\rm Sq(3)[222] + Sq(3)[221]} \item[227] {\rm Sq(0,1)[223]} \item[228] {\rm Sq(3)[226] + Sq(0,1)[226]} \item[229] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \end{gl} \end{bdl} \begin{bdl} \item[25/174] \mb{25/174} \begin{gl} \item[230] {\rm Sq(3)[224] + Sq(3)[223] + Sq(0,1)[223]} \item[231] {\rm Sq(3)[226] + Sq(0,1)[226] + Sq(3)[223]} \item[232] {\rm Sq(1)[235] + Sq(1)[234] + Sq(1)[232]} \\ $h_{0}:$ [235], [234], [232] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[24/174] \mb{24/174} \begin{gl} \item[232] {\rm Sq(3)[228] + Sq(0,1)[228] + Sq(3)[227] + Sq(0,1)[227]} \item[233] {\rm Sq(2)[232] + Sq(2)[230] + Sq(2)[229]} \\ $h_{1}:$ [232], [230], [229] \\ $h_{4}:$ [188] \item[234] {\rm Sq(1)[236] + Sq(1)[235]} \\ $h_{0}:$ [236], [235] \\ $h_{1}:$ [231], [229] \\ $h_{3}:$ [212] \\ $h_{4}:$ [188] \item[235] {\rm Sq(1)[237] + Sq(1)[235]} \\ $h_{0}:$ [237], [235] \\ $h_{1}:$ [231], [229] \\ $h_{3}:$ [212] \\ $h_{4}:$ [188] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[23/174] \mb{23/174} \begin{gl} \item[235] {\rm Sq(3)[237] + Sq(0,1)[237] + Sq(3)[236] + Sq(0,1)[236] + Sq(0,1)[234]} \item[236] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{3}:$ [221] \item[237] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{3}:$ [221] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[22/174] \mb{22/174} \begin{gl} \item[244] {\rm Sq(0,1)[239]} \item[245] {\rm Sq(3)[241] + Sq(3)[240] + Sq(3)[239]} \item[246] {\rm Sq(2)[243]} \\ $h_{1}:$ [243] \\ $h_{7}:$ [4] \item[247] {\rm Sq(2)[245] + Sq(2)[244]} \\ $h_{1}:$ [245], [244] \\ $h_{2}:$ [236] \\ $h_{3}:$ [227], [224] \item[248] {\rm Sq(2)[246] + Sq(2)[244]} \\ $h_{1}:$ [246], [244] \\ $h_{7}:$ [4] \item[249] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[21/174] \mb{21/174} \begin{gl} \item[249] {\rm Sq(1,1)[239] + Sq(1,1)[238] + Sq(1,1)[237]} \item[250] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \item[251] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{1}:$ [245] \\ $h_{3}:$ [226] \item[252] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[20/174] \mb{20/174} \begin{gl} \item[250] {\rm Sq(0,1)[248] + Sq(0,1)[247] + Sq(3)[246]} \\ $h_{3}:$ [230] \item[251] {\rm Sq(2)[251]} \\ $h_{1}:$ [251] \\ $h_{3}:$ [230] \item[252] {\rm Sq(1)[257] + Sq(1)[256]} \\ $h_{0}:$ [257], [256] \\ $h_{1}:$ [253], [252] \\ $h_{2}:$ [241] \\ $h_{3}:$ [230] \\ $h_{5}:$ [163] \item[253] {\rm Sq(1)[261] + Sq(1)[256]} \\ $h_{0}:$ [261], [256] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[19/174] \mb{19/174} \begin{gl} \item[256] {\rm Sq(3)[252] + Sq(0,1)[252]} \item[257] {\rm Sq(0,1)[253]} \item[258] {\rm Sq(2)[257]} \\ $h_{1}:$ [257] \\ $h_{3}:$ [240] \item[259] {\rm Sq(2)[258]} \\ $h_{1}:$ [258] \\ $h_{3}:$ [240] \item[260] {\rm Sq(1)[264] + Sq(1)[263]} \\ $h_{0}:$ [264], [263] \\ $h_{2}:$ [250] \\ $h_{7}:$ [9] \item[261] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[18/174] \mb{18/174} \begin{gl} \item[263] {\rm Sq(0,1)[257]} \item[264] {\rm Sq(1)[266] + Sq(1)[265]} \\ $h_{0}:$ [266], [265] \\ $h_{2}:$ [253] \\ $h_{7}:$ [11] \item[265] {\rm Sq(1)[270] + Sq(1)[269]} \\ $h_{0}:$ [270], [269] \\ $h_{1}:$ [261] \\ $h_{2}:$ [255] \item[266] {\rm Sq(1)[272] + Sq(1)[271]} \\ $h_{0}:$ [272], [271] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[17/174] \mb{17/174} \begin{gl} \item[265] {\rm Sq(3)[262]} \item[266] {\rm Sq(0,1)[263] + Sq(0,1)[262]} \\ $h_{7}:$ [10] \item[267] {\rm Sq(2)[264]} \\ $h_{1}:$ [264] \\ $h_{2}:$ [260], [259] \item[268] {\rm Sq(2)[265]} \\ $h_{1}:$ [265] \\ $h_{2}:$ [260], [259] \item[269] {\rm Sq(1)[268]} \\ $h_{0}:$ [268] \item[270] {\rm Sq(1)[270] + Sq(1)[269]} \\ $h_{0}:$ [270], [269] \\ $h_{2}:$ [260], [259] \item[271] {\rm Sq(1)[273] + Sq(1)[267]} \\ $h_{0}:$ [273], [267] \\ $h_{2}:$ [261], [259] \\ $h_{3}:$ [251] \item[272] {\rm Sq(1)[274] + Sq(1)[267]} \\ $h_{0}:$ [274], [267] \\ $h_{2}:$ [261], [259] \\ $h_{3}:$ [251] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[16/174] \mb{16/174} \begin{gl} \item[267] {\rm Sq(3,1)[265] + Sq(3,1)[264] + Sq(0,2)[264]} \item[268] {\rm Sq(3,1)[266] + Sq(3,1)[264]} \item[269] {\rm Sq(3)[272] + Sq(0,1)[272]} \item[270] {\rm Sq(3)[273] + Sq(0,1)[272]} \item[271] {\rm Sq(2)[275]} \\ $h_{1}:$ [275] \\ $h_{3}:$ [260] \\ $h_{6}:$ [82] \item[272] {\rm Sq(2)[277]} \\ $h_{1}:$ [277] \item[273] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \item[274] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[15/174] \mb{15/174} \begin{gl} \item[278] {\rm Sq(3)[293] + Sq(0,1)[292]} \item[279] {\rm Sq(2)[294]} \\ $h_{1}:$ [294] \\ $h_{3}:$ [273] \\ $h_{5}:$ [184] \\ $h_{6}:$ [89], [88] \item[280] {\rm Sq(1)[297] + Sq(1)[296]} \\ $h_{0}:$ [297], [296] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[14/174] \mb{14/174} \begin{gl} \item[296] {\rm Sq(5)[297] + Sq(2,1)[297] + Sq(5)[296] + Sq(2,1)[296] + Sq(2,1)[292]} \item[297] {\rm Sq(3)[300]} \\ $h_{7}:$ [15] \item[298] {\rm Sq(0,1)[301]} \\ $h_{2}:$ [299], [298] \\ $h_{3}:$ [280] \\ $h_{4}:$ [245] \\ $h_{5}:$ [190] \\ $h_{7}:$ [14] \item[299] {\rm Sq(0,1)[302]} \\ $h_{7}:$ [14] \item[300] {\rm Sq(3)[302]} \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[13/174] \mb{13/174} \begin{gl} \item[307] {\rm Sq(3)[307] + Sq(0,1)[307]} \\ $h_{2}:$ [303] \\ $h_{3}:$ [290] \\ $h_{4}:$ [257] \\ $h_{5}:$ [197] \\ $h_{6}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[12/174] \mb{12/174} \begin{gl} \item[312] {\rm Sq(1,1)[318]} \item[313] {\rm Sq(3)[319] + Sq(0,1)[319]} \\ $h_{2}:$ [314] \\ $h_{3}:$ [303] \\ $h_{4}:$ [272] \item[314] {\rm Sq(3)[320] + Sq(0,1)[320]} \\ $h_{5}:$ [208] \item[315] {\rm Sq(2)[322]} \\ $h_{1}:$ [322] \end{gl} \end{bdl} \begin{bdl} \item[11/174] \mb{11/174} \begin{gl} \item[323] {\rm Sq(3)[314] + Sq(0,1)[314] + Sq(3)[313] + Sq(0,1)[313] + Sq(3)[312] + Sq(3)[310]} \\ $h_{7}:$ [16] \item[324] {\rm Sq(2)[315]} \\ $h_{1}:$ [315] \item[325] {\rm Sq(1)[317]} \\ $h_{0}:$ [317] \\ $h_{3}:$ [298] \\ $h_{4}:$ [269], [268] \\ $h_{6}:$ [105] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[10/174] \mb{10/174} \begin{gl} \item[317] {\rm Sq(1,1)[277]} \\ $h_{3}:$ [267] \\ $h_{6}:$ [109], [107] \item[318] {\rm Sq(1)[288] + Sq(1)[286] + Sq(1)[285]} \\ $h_{0}:$ [288], [286], [285] \\ $h_{1}:$ [283], [282] \\ $h_{2}:$ [277] \\ $h_{3}:$ [268], [267] \\ $h_{5}:$ [198] \end{gl} \end{bdl} \begin{bdl} \item[9/174] \mb{9/174} \begin{gl} \item[285] {\rm Sq(3)[244] + Sq(0,1)[244] + Sq(0,1)[242] + Sq(0,1)[241]} \\ $h_{5}:$ [173] \\ $h_{7}:$ [21] \item[286] {\rm Sq(3)[245] + Sq(0,1)[245] + Sq(3)[242] + Sq(3)[241]} \\ $h_{2}:$ [240] \\ $h_{5}:$ [172] \\ $h_{6}:$ [104] \item[287] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \\ $h_{2}:$ [240] \\ $h_{5}:$ [172] \\ $h_{6}:$ [104] \\ $h_{7}:$ [22] \item[288] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{5}:$ [173], [172] \\ $h_{6}:$ [104] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[8/174] \mb{8/174} \begin{gl} \item[249] {\rm Sq(2)[212]} \\ $h_{1}:$ [212] \\ $h_{3}:$ [200] \\ $h_{4}:$ [181] \\ $h_{5}:$ [152] \\ $h_{7}:$ [21] \item[250] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[7/174] \mb{7/174} \begin{gl} \item[214] {\rm Sq(3)[172]} \item[215] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{2}:$ [170] \\ $h_{3}:$ [166] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[6/174] \mb{6/174} \begin{gl} \item[176] {\rm Sq(4)[124]} \\ $h_{2}:$ [124] \\ $h_{3}:$ [121] \\ $h_{7}:$ [26] \item[177] {\rm Sq(2)[128]} \\ $h_{1}:$ [128] \\ $h_{5}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[4/174] \mb{4/174} \begin{gl} \item[87] {\rm Sq(2)[55]} \\ $h_{1}:$ [55] \end{gl} \end{bdl} \dm{175} \begin{bdl} \item[88/175] \mb{88/175} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[87/175] \mb{87/175} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[86/175] \mb{86/175} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[85/175] \mb{85/175} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[84/175] \mb{84/175} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[83/175] \mb{83/175} \begin{gl} \item[6] {\rm Sq(1)[10] + Sq(1)[9]} \\ $h_{0}:$ [10], [9] \end{gl} \end{bdl} \begin{bdl} \item[82/175] \mb{82/175} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[81/175] \mb{81/175} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[80/175] \mb{80/175} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[79/175] \mb{79/175} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[78/175] \mb{78/175} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[77/175] \mb{77/175} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[74/175] \mb{74/175} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[72/175] \mb{72/175} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[71/175] \mb{71/175} \begin{gl} \item[19] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[68/175] \mb{68/175} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[67/175] \mb{67/175} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [28] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [33], [31] \\ $h_{2}:$ [29], [28] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[66/175] \mb{66/175} \begin{gl} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[65/175] \mb{65/175} \begin{gl} \item[35] {\rm Sq(0,1)[33]} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[64/175] \mb{64/175} \begin{gl} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[63/175] \mb{63/175} \begin{gl} \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[62/175] \mb{62/175} \begin{gl} \item[42] {\rm Sq(0,1)[41]} \item[43] {\rm Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[61/175] \mb{61/175} \begin{gl} \item[46] {\rm Sq(3)[42] + Sq(3)[41] + Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[59/175] \mb{59/175} \begin{gl} \item[52] {\rm Sq(0,1)[56]} \item[53] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[58/175] \mb{58/175} \begin{gl} \item[60] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[56/175] \mb{56/175} \begin{gl} \item[60] {\rm Sq(0,1)[57]} \item[61] {\rm Sq(0,1)[58]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[55/175] \mb{55/175} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[53/175] \mb{53/175} \begin{gl} \item[72] {\rm Sq(0,1)[67]} \item[73] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[52/175] \mb{52/175} \begin{gl} \item[74] {\rm Sq(0,1)[73]} \end{gl} \end{bdl} \begin{bdl} \item[51/175] \mb{51/175} \begin{gl} \item[81] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{1}:$ [84] \\ $h_{2}:$ [76] \\ $h_{3}:$ [69] \item[82] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{1}:$ [82] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[50/175] \mb{50/175} \begin{gl} \item[86] {\rm Sq(0,1)[81]} \item[87] {\rm Sq(0,1)[83]} \item[88] {\rm Sq(0,1)[84]} \item[89] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[49/175] \mb{49/175} \begin{gl} \item[87] {\rm Sq(1,1)[84]} \item[88] {\rm Sq(0,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[48/175] \mb{48/175} \begin{gl} \item[90] {\rm Sq(2)[94] + Sq(2)[93]} \\ $h_{1}:$ [94], [93] \item[91] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [91] \\ $h_{4}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[47/175] \mb{47/175} \begin{gl} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \item[98] {\rm Sq(0,1)[99]} \item[99] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [95], [94] \\ $h_{4}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[46/175] \mb{46/175} \begin{gl} \item[101] {\rm Sq(0,1)[101]} \item[102] {\rm Sq(0,1)[102]} \item[103] {\rm Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[44/175] \mb{44/175} \begin{gl} \item[114] {\rm Sq(0,1)[122]} \item[115] {\rm Sq(0,1)[123]} \item[116] {\rm Sq(0,1)[124]} \item[117] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{3}:$ [109] \end{gl} \end{bdl} \begin{bdl} \item[43/175] \mb{43/175} \begin{gl} \item[125] {\rm Sq(0,1)[128]} \item[126] {\rm Sq(0,1)[129]} \item[127] {\rm Sq(0,1)[130]} \item[128] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{1}:$ [134] \item[129] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{3}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[42/175] \mb{42/175} \begin{gl} \item[135] {\rm Sq(0,1)[130]} \item[136] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{3}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[41/175] \mb{41/175} \begin{gl} \item[134] {\rm Sq(0,1)[131]} \item[135] {\rm Sq(0,1)[132]} \item[136] {\rm Sq(0,1)[133]} \item[137] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{3}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[40/175] \mb{40/175} \begin{gl} \item[135] {\rm Sq(0,1)[137]} \item[136] {\rm Sq(0,1)[138]} \item[137] {\rm Sq(0,1)[139]} \item[138] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[39/175] \mb{39/175} \begin{gl} \item[144] {\rm Sq(0,1)[145]} \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[38/175] \mb{38/175} \begin{gl} \item[150] {\rm Sq(2,1)[141]} \item[151] {\rm Sq(0,1)[148]} \item[152] {\rm Sq(0,1)[149]} \item[153] {\rm Sq(0,1)[150]} \end{gl} \end{bdl} \begin{bdl} \item[37/175] \mb{37/175} \begin{gl} \item[155] {\rm Sq(0,1)[155] + Sq(0,1)[154]} \item[156] {\rm Sq(0,1)[156]} \item[157] {\rm Sq(0,1)[157] + Sq(0,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[36/175] \mb{36/175} \begin{gl} \item[164] {\rm Sq(0,1)[170]} \end{gl} \end{bdl} \begin{bdl} \item[35/175] \mb{35/175} \begin{gl} \item[175] {\rm Sq(1,1)[178] + Sq(1,1)[176]} \item[176] {\rm Sq(0,1)[179]} \item[177] {\rm Sq(0,1)[180]} \item[178] {\rm Sq(0,1)[181]} \item[179] {\rm Sq(1)[188] + Sq(1)[185]} \\ $h_{0}:$ [188], [185] \\ $h_{1}:$ [183] \end{gl} \end{bdl} \begin{bdl} \item[34/175] \mb{34/175} \begin{gl} \item[185] {\rm Sq(0,1)[183]} \item[186] {\rm Sq(0,1)[185] + Sq(0,1)[184]} \item[187] {\rm Sq(3)[186] + Sq(0,1)[184] + Sq(3)[183]} \item[188] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[33/175] \mb{33/175} \begin{gl} \item[191] {\rm Sq(0,1)[187]} \item[192] {\rm Sq(3)[188] + Sq(0,1)[188]} \item[193] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \item[194] {\rm Sq(1)[197] + Sq(1)[193]} \\ $h_{0}:$ [197], [193] \\ $h_{1}:$ [190] \\ $h_{2}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[32/175] \mb{32/175} \begin{gl} \item[193] {\rm Sq(2,1)[185]} \item[194] {\rm Sq(1,1)[191] + Sq(1,1)[190] + Sq(1,1)[189]} \item[195] {\rm Sq(0,1)[192]} \item[196] {\rm Sq(0,1)[193]} \item[197] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \\ $h_{2}:$ [187] \end{gl} \end{bdl} \begin{bdl} \item[31/175] \mb{31/175} \begin{gl} \item[198] {\rm Sq(3)[200] + Sq(0,1)[199]} \item[199] {\rm Sq(0,1)[201] + Sq(0,1)[198]} \item[200] {\rm Sq(3)[203] + Sq(0,1)[203] + Sq(3)[201] + Sq(0,1)[200] + Sq(0,1)[199]} \item[201] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{2}:$ [195], [193] \end{gl} \end{bdl} \begin{bdl} \item[30/175] \mb{30/175} \begin{gl} \item[207] {\rm Sq(1,1)[203] + Sq(1,1)[202] + Sq(1,1)[200]} \end{gl} \end{bdl} \begin{bdl} \item[29/175] \mb{29/175} \begin{gl} \item[213] {\rm Sq(1,1)[206]} \item[214] {\rm Sq(3)[211] + Sq(0,1)[210]} \item[215] {\rm Sq(0,1)[212] + Sq(0,1)[211]} \item[216] {\rm Sq(3)[215] + Sq(0,1)[215] + Sq(3)[214] + Sq(0,1)[214] + Sq(3)[213] + Sq(0,1)[213] + Sq(3)[212] + Sq(0,1)[210]} \item[217] {\rm Sq(1)[222] + Sq(1)[219]} \\ $h_{0}:$ [222], [219] \\ $h_{2}:$ [206] \\ $h_{3}:$ [192] \\ $h_{4}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[28/175] \mb{28/175} \begin{gl} \item[218] {\rm Sq(0,1)[216]} \item[219] {\rm Sq(3)[218] + Sq(0,1)[218] + Sq(3)[217] + Sq(3)[215]} \item[220] {\rm Sq(3)[219] + Sq(0,1)[219] + Sq(0,1)[218] + Sq(3)[217] + Sq(0,1)[217] + Sq(3)[216]} \item[221] {\rm Sq(2)[223]} \\ $h_{1}:$ [223] \item[222] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{3}:$ [199] \end{gl} \end{bdl} \begin{bdl} \item[27/175] \mb{27/175} \begin{gl} \item[226] {\rm Sq(2)[226] + Sq(2)[225] + Sq(2)[224]} \\ $h_{1}:$ [226], [225], [224] \\ $h_{4}:$ [176] \item[227] {\rm Sq(1)[233] + Sq(1)[230]} \\ $h_{0}:$ [233], [230] \\ $h_{3}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[26/175] \mb{26/175} \begin{gl} \item[230] {\rm Sq(1,1)[226] + Sq(1,1)[222]} \item[231] {\rm Sq(0,1)[227]} \item[232] {\rm Sq(2)[231] + Sq(2)[230]} \\ $h_{1}:$ [231], [230] \\ $h_{2}:$ [222], [221] \item[233] {\rm Sq(1)[235] + Sq(1)[234]} \\ $h_{0}:$ [235], [234] \end{gl} \end{bdl} \begin{bdl} \item[25/175] \mb{25/175} \begin{gl} \item[233] {\rm Sq(3)[230] + Sq(0,1)[230] + Sq(3)[229] + Sq(3)[228] + Sq(0,1)[228]} \item[234] {\rm Sq(3)[231] + Sq(0,1)[231]} \item[235] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \item[236] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{1}:$ [233] \\ $h_{2}:$ [225] \\ $h_{3}:$ [211], [210] \\ $h_{4}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[24/175] \mb{24/175} \begin{gl} \item[236] {\rm Sq(3)[231] + Sq(0,1)[231] + Sq(3)[230] + Sq(0,1)[230]} \item[237] {\rm Sq(3)[233] + Sq(0,1)[233] + Sq(3)[229] + Sq(0,1)[229]} \\ $h_{7}:$ [3] \item[238] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \item[239] {\rm Sq(1)[240] + Sq(1)[239]} \\ $h_{0}:$ [240], [239] \\ $h_{2}:$ [227] \\ $h_{4}:$ [191] \end{gl} \end{bdl} \begin{bdl} \item[23/175] \mb{23/175} \begin{gl} \item[238] {\rm Sq(1,1)[239] + Sq(1,1)[237] + Sq(1,1)[236] + Sq(1,1)[235] + Sq(1,1)[234]} \item[239] {\rm Sq(0,1)[240]} \item[240] {\rm Sq(3)[243] + Sq(0,1)[243] + Sq(3)[241] + Sq(3)[240]} \\ $h_{2}:$ [236], [235] \item[241] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \\ $h_{3}:$ [224] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[22/175] \mb{22/175} \begin{gl} \item[250] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{3}:$ [231] \item[251] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{1}:$ [250] \\ $h_{2}:$ [241] \\ $h_{4}:$ [203] \\ $h_{5}:$ [154], [153], [152], [151] \end{gl} \end{bdl} \begin{bdl} \item[21/175] \mb{21/175} \begin{gl} \item[253] {\rm Sq(3)[245]} \\ $h_{3}:$ [227] \item[254] {\rm Sq(3)[246] + Sq(0,1)[246]} \\ $h_{5}:$ [157] \item[255] {\rm Sq(3)[248] + Sq(0,1)[248] + Sq(0,1)[246] + Sq(0,1)[245]} \\ $h_{5}:$ [157] \item[256] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{1}:$ [251], [250] \\ $h_{2}:$ [242], [241] \\ $h_{3}:$ [229] \\ $h_{5}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[20/175] \mb{20/175} \begin{gl} \item[254] {\rm Sq(2)[257] + Sq(2)[256]} \\ $h_{1}:$ [257], [256] \\ $h_{3}:$ [235] \\ $h_{4}:$ [210] \item[255] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{2}:$ [248], [247] \\ $h_{3}:$ [235] \end{gl} \end{bdl} \begin{bdl} \item[19/175] \mb{19/175} \begin{gl} \item[262] {\rm Sq(3)[262] + Sq(0,1)[262] + Sq(3)[261] + Sq(0,1)[261] + Sq(0,1)[259] + Sq(3)[258] + Sq(0,1)[258] + Sq(3)[257]} \item[263] {\rm Sq(1)[269] + Sq(1)[268]} \\ $h_{0}:$ [269], [268] \item[264] {\rm Sq(1)[270] + Sq(1)[268]} \\ $h_{0}:$ [270], [268] \item[265] {\rm Sq(1)[271] + Sq(1)[267]} \\ $h_{0}:$ [271], [267] \\ $h_{1}:$ [263] \\ $h_{2}:$ [254] \\ $h_{4}:$ [218] \end{gl} \end{bdl} \begin{bdl} \item[18/175] \mb{18/175} \begin{gl} \item[267] {\rm Sq(4)[257] + Sq(1,1)[257]} \\ $h_{2}:$ [257] \item[268] {\rm Sq(0,1)[261]} \item[269] {\rm Sq(3)[261]} \item[270] {\rm Sq(0,1)[262]} \item[271] {\rm Sq(3)[262]} \item[272] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{1}:$ [266], [265] \\ $h_{2}:$ [260] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[17/175] \mb{17/175} \begin{gl} \item[273] {\rm Sq(2)[269] + Sq(2)[267]} \\ $h_{1}:$ [269], [267] \\ $h_{2}:$ [262] \\ $h_{3}:$ [252] \\ $h_{5}:$ [175] \\ $h_{6}:$ [85] \item[274] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{2}:$ [263] \\ $h_{7}:$ [12] \item[275] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{1}:$ [272], [268] \item[276] {\rm Sq(1)[279] + Sq(1)[275]} \\ $h_{0}:$ [279], [275] \\ $h_{1}:$ [268] \\ $h_{2}:$ [262] \\ $h_{3}:$ [252] \\ $h_{5}:$ [175] \\ $h_{6}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[16/175] \mb{16/175} \begin{gl} \item[275] {\rm Sq(3)[275]} \\ $h_{2}:$ [273], [272] \\ $h_{4}:$ [230], [229] \item[276] {\rm Sq(3)[276]} \\ $h_{7}:$ [10] \item[277] {\rm Sq(3)[277] + Sq(0,1)[277]} \item[278] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \item[279] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{2}:$ [273], [272] \\ $h_{4}:$ [230], [229] \end{gl} \end{bdl} \begin{bdl} \item[15/175] \mb{15/175} \begin{gl} \item[281] {\rm Sq(5)[291] + Sq(2,1)[291] + Sq(2,1)[290] + Sq(5)[289] + Sq(2,1)[289] + Sq(5)[288]} \item[282] {\rm Sq(1,1)[292]} \item[283] {\rm Sq(1,1)[293]} \item[284] {\rm Sq(3)[294]} \item[285] {\rm Sq(2)[299] + Sq(2)[297] + Sq(2)[296]} \\ $h_{1}:$ [299], [297], [296] \\ $h_{7}:$ [12] \item[286] {\rm Sq(2)[300] + Sq(2)[297]} \\ $h_{1}:$ [300], [297] \item[287] {\rm Sq(1)[302] + Sq(1)[301]} \\ $h_{0}:$ [302], [301] \\ $h_{3}:$ [277], [276] \\ $h_{6}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[14/175] \mb{14/175} \begin{gl} \item[301] {\rm Sq(5)[299] + Sq(2,1)[299]} \item[302] {\rm Sq(3)[305] + Sq(0,1)[305] + Sq(3)[304] + Sq(0,1)[304]} \end{gl} \end{bdl} \begin{bdl} \item[13/175] \mb{13/175} \begin{gl} \item[308] {\rm Sq(1,1)[307]} \item[309] {\rm Sq(0,1)[309]} \\ $h_{7}:$ [14] \item[310] {\rm Sq(2)[314]} \\ $h_{1}:$ [314] \\ $h_{5}:$ [202], [200] \item[311] {\rm Sq(2)[315] + Sq(2)[312]} \\ $h_{1}:$ [315], [312] \\ $h_{2}:$ [307] \\ $h_{3}:$ [291] \\ $h_{5}:$ [200] \item[312] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \\ $h_{3}:$ [294], [292] \\ $h_{5}:$ [200] \end{gl} \end{bdl} \begin{bdl} \item[12/175] \mb{12/175} \begin{gl} \item[316] {\rm Sq(1,1)[320] + Sq(1,1)[319]} \\ $h_{3}:$ [307] \end{gl} \end{bdl} \begin{bdl} \item[11/175] \mb{11/175} \begin{gl} \item[326] {\rm Sq(4)[309]} \\ $h_{2}:$ [309] \\ $h_{3}:$ [299] \\ $h_{4}:$ [275], [272] \item[327] {\rm Sq(3)[316] + Sq(0,1)[316] + Sq(3)[315] + Sq(0,1)[315]} \item[328] {\rm Sq(2)[317]} \\ $h_{1}:$ [317] \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [301], [300], [299] \\ $h_{4}:$ [272] \\ $h_{5}:$ [215] \\ $h_{6}:$ [108], [107] \end{gl} \end{bdl} \begin{bdl} \item[10/175] \mb{10/175} \begin{gl} \item[319] {\rm Sq(2)[285]} \\ $h_{1}:$ [285] \\ $h_{5}:$ [201] \\ $h_{7}:$ [21] \item[320] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{1}:$ [287], [286] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[9/175] \mb{9/175} \begin{gl} \item[289] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[8/175] \mb{8/175} \begin{gl} \item[251] {\rm Sq(1,1)[210]} \\ $h_{7}:$ [22] \item[252] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{1}:$ [214] \\ $h_{7}:$ [22] \item[253] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \\ $h_{2}:$ [209] \\ $h_{5}:$ [156], [155] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[7/175] \mb{7/175} \begin{gl} \item[216] {\rm Sq(1,1)[174]} \item[217] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [172] \\ $h_{5}:$ [132], [131] \\ $h_{7}:$ [25] \item[218] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{1}:$ [177] \\ $h_{2}:$ [174] \\ $h_{5}:$ [133], [132], [131], [130] \end{gl} \end{bdl} \begin{bdl} \item[6/175] \mb{6/175} \begin{gl} \item[178] {\rm Sq(3)[129] + Sq(0,1)[129]} \\ $h_{5}:$ [98] \\ $h_{7}:$ [27] \item[179] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{2}:$ [126] \\ $h_{5}:$ [99], [98] \end{gl} \end{bdl} \begin{bdl} \item[5/175] \mb{5/175} \begin{gl} \item[130] {\rm Sq(4)[84]} \\ $h_{2}:$ [84] \\ $h_{5}:$ [69] \item[131] {\rm Sq(1,1)[85]} \\ $h_{3}:$ [83] \\ $h_{7}:$ [24] \item[132] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \\ $h_{3}:$ [83] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \dm{176} \begin{bdl} \item[87/176] \mb{87/176} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[86/176] \mb{86/176} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[81/176] \mb{81/176} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[80/176] \mb{80/176} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[79/176] \mb{79/176} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[78/176] \mb{78/176} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[76/176] \mb{76/176} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[73/176] \mb{73/176} \begin{gl} \item[21] {\rm Sq(0,1)[20]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[72/176] \mb{72/176} \begin{gl} \item[22] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[71/176] \mb{71/176} \begin{gl} \item[20] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[70/176] \mb{70/176} \begin{gl} \item[21] {\rm Sq(1,1)[25]} \item[22] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[67/176] \mb{67/176} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[65/176] \mb{65/176} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[64/176] \mb{64/176} \begin{gl} \item[36] {\rm Sq(1,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[63/176] \mb{63/176} \begin{gl} \item[39] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [42] \\ $h_{2}:$ [40] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[62/176] \mb{62/176} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[61/176] \mb{61/176} \begin{gl} \item[47] {\rm Sq(0,1)[44]} \item[48] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[60/176] \mb{60/176} \begin{gl} \item[47] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[58/176] \mb{58/176} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[57/176] \mb{57/176} \begin{gl} \item[63] {\rm Sq(0,1)[58]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[56/176] \mb{56/176} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[55/176] \mb{55/176} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(0,1)[67]} \item[66] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[54/176] \mb{54/176} \begin{gl} \item[69] {\rm Sq(1,1)[66]} \item[70] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[53/176] \mb{53/176} \begin{gl} \item[74] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[52/176] \mb{52/176} \begin{gl} \item[75] {\rm Sq(0,1)[76]} \item[76] {\rm Sq(0,1)[77]} \item[77] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[51/176] \mb{51/176} \begin{gl} \item[83] {\rm Sq(0,1)[83]} \end{gl} \end{bdl} \begin{bdl} \item[49/176] \mb{49/176} \begin{gl} \item[89] {\rm Sq(0,1)[86]} \item[90] {\rm Sq(0,1)[87]} \item[91] {\rm Sq(0,1)[88]} \item[92] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{1}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[48/176] \mb{48/176} \begin{gl} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(0,1)[95]} \end{gl} \end{bdl} \begin{bdl} \item[47/176] \mb{47/176} \begin{gl} \item[100] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{1}:$ [101] \\ $h_{2}:$ [100] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[46/176] \mb{46/176} \begin{gl} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(0,1)[105]} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{2}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[45/176] \mb{45/176} \begin{gl} \item[108] {\rm Sq(0,1)[111]} \item[109] {\rm Sq(0,1)[112]} \item[110] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[43/176] \mb{43/176} \begin{gl} \item[130] {\rm Sq(0,1)[131]} \item[131] {\rm Sq(0,1)[132]} \item[132] {\rm Sq(0,1)[133]} \item[133] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{1}:$ [135] \\ $h_{3}:$ [117] \\ $h_{4}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[42/176] \mb{42/176} \begin{gl} \item[137] {\rm Sq(0,1)[131]} \item[138] {\rm Sq(0,1)[132]} \item[139] {\rm Sq(0,1)[133]} \item[140] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[41/176] \mb{41/176} \begin{gl} \item[138] {\rm Sq(0,1)[134]} \item[139] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{3}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[40/176] \mb{40/176} \begin{gl} \item[139] {\rm Sq(0,1)[141]} \item[140] {\rm Sq(0,1)[142]} \item[141] {\rm Sq(0,1)[143]} \item[142] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{3}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[39/176] \mb{39/176} \begin{gl} \item[146] {\rm Sq(0,1)[147]} \item[147] {\rm Sq(0,1)[148]} \item[148] {\rm Sq(0,1)[149]} \item[149] {\rm Sq(2)[150]} \\ $h_{1}:$ [150] \item[150] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[38/176] \mb{38/176} \begin{gl} \item[154] {\rm Sq(0,1)[152]} \item[155] {\rm Sq(1)[159] + Sq(1)[158]} \\ $h_{0}:$ [159], [158] \item[156] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[37/176] \mb{37/176} \begin{gl} \item[158] {\rm Sq(0,1)[159]} \item[159] {\rm Sq(0,1)[160]} \item[160] {\rm Sq(0,1)[161]} \item[161] {\rm Sq(0,1)[162]} \item[162] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{2}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[36/176] \mb{36/176} \begin{gl} \item[165] {\rm Sq(0,1)[171]} \item[166] {\rm Sq(0,1)[172]} \item[167] {\rm Sq(0,1)[173]} \item[168] {\rm Sq(0,1)[174]} \end{gl} \end{bdl} \begin{bdl} \item[35/176] \mb{35/176} \begin{gl} \item[180] {\rm Sq(0,1)[182]} \end{gl} \end{bdl} \begin{bdl} \item[34/176] \mb{34/176} \begin{gl} \item[189] {\rm Sq(1,1)[185] + Sq(1,1)[184]} \item[190] {\rm Sq(0,1)[187]} \item[191] {\rm Sq(0,1)[188]} \item[192] {\rm Sq(0,1)[189]} \item[193] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \end{gl} \end{bdl} \begin{bdl} \item[33/176] \mb{33/176} \begin{gl} \item[195] {\rm Sq(0,1)[191] + Sq(0,1)[189]} \item[196] {\rm Sq(0,1)[192] + Sq(0,1)[190] + Sq(0,1)[189]} \item[197] {\rm Sq(1)[199] + Sq(1)[198]} \\ $h_{0}:$ [199], [198] \\ $h_{1}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[32/176] \mb{32/176} \begin{gl} \item[198] {\rm Sq(2,1)[188] + Sq(2,1)[187]} \item[199] {\rm Sq(1,1)[196] + Sq(1,1)[194]} \end{gl} \end{bdl} \begin{bdl} \item[31/176] \mb{31/176} \begin{gl} \item[202] {\rm Sq(0,1)[204]} \item[203] {\rm Sq(0,1)[205]} \item[204] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{1}:$ [207] \\ $h_{2}:$ [201], [198] \end{gl} \end{bdl} \begin{bdl} \item[30/176] \mb{30/176} \begin{gl} \item[208] {\rm Sq(1,1)[207] + Sq(1,1)[206] + Sq(1,1)[205]} \item[209] {\rm Sq(0,1)[208]} \item[210] {\rm Sq(0,1)[209]} \item[211] {\rm Sq(3)[212] + Sq(0,1)[212]} \end{gl} \end{bdl} \begin{bdl} \item[29/176] \mb{29/176} \begin{gl} \item[218] {\rm Sq(1,1)[214] + Sq(1,1)[213]} \item[219] {\rm Sq(1)[227] + Sq(1)[223]} \\ $h_{0}:$ [227], [223] \\ $h_{1}:$ [221], [219] \\ $h_{2}:$ [214], [213], [212], [211] \\ $h_{3}:$ [197], [194] \item[220] {\rm Sq(1)[228] + Sq(1)[225]} \\ $h_{0}:$ [228], [225] \\ $h_{1}:$ [220], [219], [218] \\ $h_{2}:$ [213], [210] \\ $h_{3}:$ [196] \\ $h_{4}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[28/176] \mb{28/176} \begin{gl} \item[223] {\rm Sq(1,1)[220] + Sq(1,1)[219] + Sq(1,1)[215]} \item[224] {\rm Sq(0,1)[222]} \item[225] {\rm Sq(3)[223] + Sq(0,1)[221]} \item[226] {\rm Sq(3)[225] + Sq(0,1)[225] + Sq(3)[224] + Sq(0,1)[224] + Sq(3)[221]} \item[227] {\rm Sq(1)[231] + Sq(1)[228]} \\ $h_{0}:$ [231], [228] \\ $h_{2}:$ [219], [218], [216], [215] \\ $h_{3}:$ [201] \item[228] {\rm Sq(1)[232] + Sq(1)[228]} \\ $h_{0}:$ [232], [228] \\ $h_{2}:$ [218], [217], [215] \\ $h_{3}:$ [200] \\ $h_{4}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[27/176] \mb{27/176} \begin{gl} \item[228] {\rm Sq(0,1)[224]} \item[229] {\rm Sq(0,1)[227]} \item[230] {\rm Sq(0,1)[228]} \item[231] {\rm Sq(1)[236] + Sq(1)[234]} \\ $h_{0}:$ [236], [234] \\ $h_{2}:$ [222] \\ $h_{3}:$ [209] \item[232] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \\ $h_{3}:$ [208] \\ $h_{4}:$ [180], [179] \end{gl} \end{bdl} \begin{bdl} \item[26/176] \mb{26/176} \begin{gl} \item[234] {\rm Sq(3)[231]} \item[235] {\rm Sq(3)[232] + Sq(0,1)[232]} \\ $h_{7}:$ [1] \item[236] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{3}:$ [212], [208] \item[237] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{3}:$ [209], [208] \end{gl} \end{bdl} \begin{bdl} \item[25/176] \mb{25/176} \begin{gl} \item[237] {\rm Sq(4)[229] + Sq(4)[227]} \\ $h_{2}:$ [229], [227] \item[238] {\rm Sq(1,1)[231] + Sq(1,1)[230] + Sq(1,1)[228]} \item[239] {\rm Sq(2)[237]} \\ $h_{1}:$ [237] \\ $h_{7}:$ [2] \item[240] {\rm Sq(1)[242] + Sq(1)[240]} \\ $h_{0}:$ [242], [240] \item[241] {\rm Sq(1)[243] + Sq(1)[240]} \\ $h_{0}:$ [243], [240] \end{gl} \end{bdl} \begin{bdl} \item[24/176] \mb{24/176} \begin{gl} \item[240] {\rm Sq(0,1)[235]} \item[241] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{1}:$ [238] \item[242] {\rm Sq(1)[244] + Sq(1)[242]} \\ $h_{0}:$ [244], [242] \item[243] {\rm Sq(1)[245] + Sq(1)[242]} \\ $h_{0}:$ [245], [242] \item[244] {\rm Sq(1)[246]} \\ $h_{0}:$ [246] \\ $h_{1}:$ [241] \\ $h_{2}:$ [233], [231], [230], [229] \\ $h_{3}:$ [217] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[23/176] \mb{23/176} \begin{gl} \item[242] {\rm Sq(5)[237] + Sq(2,1)[237] + Sq(2,1)[236] + Sq(5)[235] + Sq(2,1)[234]} \item[243] {\rm Sq(2,1)[239] + Sq(2,1)[238] + Sq(5)[236] + Sq(2,1)[236] + Sq(5)[235] + Sq(2,1)[234]} \item[244] {\rm Sq(3)[248] + Sq(3)[246] + Sq(3)[245]} \item[245] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \item[246] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{2}:$ [242], [240] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[22/176] \mb{22/176} \begin{gl} \item[252] {\rm Sq(1,1)[246] + Sq(1,1)[244] + Sq(1,1)[243]} \item[253] {\rm Sq(1)[258] + Sq(1)[257]} \\ $h_{0}:$ [258], [257] \\ $h_{2}:$ [243] \\ $h_{7}:$ [6] \item[254] {\rm Sq(1)[260] + Sq(1)[259]} \\ $h_{0}:$ [260], [259] \\ $h_{1}:$ [255], [254] \\ $h_{4}:$ [208] \end{gl} \end{bdl} \begin{bdl} \item[21/176] \mb{21/176} \begin{gl} \item[257] {\rm Sq(2,1)[240]} \item[258] {\rm Sq(1,1)[249] + Sq(1,1)[247] + Sq(1,1)[246]} \\ $h_{7}:$ [5] \item[259] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \\ $h_{2}:$ [245] \\ $h_{3}:$ [234], [231] \item[260] {\rm Sq(1)[259] + Sq(1)[257]} \\ $h_{0}:$ [259], [257] \\ $h_{2}:$ [245] \\ $h_{3}:$ [234], [231] \end{gl} \end{bdl} \begin{bdl} \item[20/176] \mb{20/176} \begin{gl} \item[256] {\rm Sq(4)[251]} \\ $h_{2}:$ [251] \item[257] {\rm Sq(0,1)[257]} \item[258] {\rm Sq(3)[258] + Sq(3)[257] + Sq(3)[256]} \\ $h_{3}:$ [237] \item[259] {\rm Sq(3)[259] + Sq(3)[257] + Sq(0,1)[256]} \\ $h_{3}:$ [237] \item[260] {\rm Sq(3)[261] + Sq(0,1)[261] + Sq(3)[257]} \end{gl} \end{bdl} \begin{bdl} \item[19/176] \mb{19/176} \begin{gl} \item[266] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \\ $h_{2}:$ [257] \\ $h_{4}:$ [222] \item[267] {\rm Sq(1)[276] + Sq(1)[275]} \\ $h_{0}:$ [276], [275] \\ $h_{1}:$ [269], [268] \\ $h_{4}:$ [222] \end{gl} \end{bdl} \begin{bdl} \item[18/176] \mb{18/176} \begin{gl} \item[273] {\rm Sq(3)[265]} \item[274] {\rm Sq(3)[270] + Sq(0,1)[270]} \item[275] {\rm Sq(3)[271] + Sq(0,1)[271] + Sq(3)[268] + Sq(3)[267] + Sq(0,1)[265]} \item[276] {\rm Sq(3)[272] + Sq(0,1)[272] + Sq(3)[268] + Sq(3)[267] + Sq(0,1)[265]} \end{gl} \end{bdl} \begin{bdl} \item[17/176] \mb{17/176} \begin{gl} \item[277] {\rm Sq(3)[270] + Sq(0,1)[270] + Sq(0,1)[269] + Sq(3)[267] + Sq(0,1)[267]} \item[278] {\rm Sq(3)[273] + Sq(0,1)[273] + Sq(3)[272] + Sq(3)[269] + Sq(0,1)[267]} \\ $h_{2}:$ [264] \item[279] {\rm Sq(2)[277]} \\ $h_{1}:$ [277] \\ $h_{2}:$ [264] \end{gl} \end{bdl} \begin{bdl} \item[16/176] \mb{16/176} \begin{gl} \item[280] {\rm Sq(3)[279] + Sq(3)[278] + Sq(0,1)[278]} \\ $h_{3}:$ [265], [264] \\ $h_{4}:$ [235] \\ $h_{5}:$ [179] \\ $h_{6}:$ [88] \item[281] {\rm Sq(3)[280] + Sq(0,1)[280] + Sq(3)[278] + Sq(0,1)[278]} \item[282] {\rm Sq(2)[283] + Sq(2)[282]} \\ $h_{1}:$ [283], [282] \\ $h_{2}:$ [275] \\ $h_{3}:$ [266], [265], [264] \item[283] {\rm Sq(2)[284] + Sq(2)[282] + Sq(2)[281]} \\ $h_{1}:$ [284], [282], [281] \\ $h_{2}:$ [275] \\ $h_{3}:$ [266] \\ $h_{5}:$ [179] \\ $h_{6}:$ [88] \item[284] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{1}:$ [285], [281] \\ $h_{2}:$ [276] \\ $h_{4}:$ [235] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[15/176] \mb{15/176} \begin{gl} \item[288] {\rm Sq(3,1)[291] + Sq(3,1)[290] + Sq(3,1)[289] + Sq(0,2)[289] + Sq(3,1)[288]} \item[289] {\rm Sq(0,1)[299]} \\ $h_{7}:$ [13] \item[290] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \end{gl} \end{bdl} \begin{bdl} \item[14/176] \mb{14/176} \begin{gl} \item[303] {\rm Sq(6)[299] + Sq(6)[298]} \item[304] {\rm Sq(5)[302] + Sq(5)[300] + Sq(2,1)[300]} \item[305] {\rm Sq(2)[308]} \\ $h_{1}:$ [308] \\ $h_{2}:$ [305], [304] \item[306] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \item[307] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{1}:$ [310] \\ $h_{2}:$ [305], [304] \\ $h_{5}:$ [199] \\ $h_{6}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[13/176] \mb{13/176} \begin{gl} \item[313] {\rm Sq(3)[314]} \item[314] {\rm Sq(2)[316]} \\ $h_{1}:$ [316] \\ $h_{3}:$ [295] \\ $h_{5}:$ [204] \\ $h_{6}:$ [91] \item[315] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{5}:$ [205], [204] \end{gl} \end{bdl} \begin{bdl} \item[12/176] \mb{12/176} \begin{gl} \item[317] {\rm Sq(4)[322]} \\ $h_{2}:$ [322] \\ $h_{3}:$ [309] \\ $h_{5}:$ [214] \item[318] {\rm Sq(0,1)[323]} \\ $h_{7}:$ [13] \item[319] {\rm Sq(3)[324]} \\ $h_{5}:$ [215] \item[320] {\rm Sq(3)[325] + Sq(0,1)[325] + Sq(3)[323]} \\ $h_{2}:$ [321] \\ $h_{3}:$ [310], [309] \\ $h_{4}:$ [281], [280], [279] \\ $h_{5}:$ [215] \\ $h_{7}:$ [13] \item[321] {\rm Sq(2)[327]} \\ $h_{1}:$ [327] \end{gl} \end{bdl} \begin{bdl} \item[11/176] \mb{11/176} \begin{gl} \item[329] {\rm Sq(3)[317] + Sq(0,1)[317]} \end{gl} \end{bdl} \begin{bdl} \item[10/176] \mb{10/176} \begin{gl} \item[321] {\rm Sq(3)[288] + Sq(0,1)[288] + Sq(3)[287] + Sq(0,1)[286] + Sq(3)[285] + Sq(0,1)[285]} \\ $h_{2}:$ [282], [281], [280] \\ $h_{3}:$ [272], [271] \\ $h_{4}:$ [247] \item[322] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{2}:$ [282], [280] \\ $h_{3}:$ [271], [270] \\ $h_{4}:$ [248], [247] \\ $h_{5}:$ [205], [203] \end{gl} \end{bdl} \begin{bdl} \item[9/176] \mb{9/176} \begin{gl} \item[290] {\rm Sq(1,1)[248]} \end{gl} \end{bdl} \begin{bdl} \item[7/176] \mb{7/176} \begin{gl} \item[219] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{1}:$ [178] \\ $h_{5}:$ [134] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[6/176] \mb{6/176} \begin{gl} \item[180] {\rm Sq(1,1)[128]} \\ $h_{5}:$ [100] \\ $h_{7}:$ [28] \item[181] {\rm Sq(1,1)[129]} \\ $h_{5}:$ [100] \\ $h_{7}:$ [28] \item[182] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{1}:$ [132], [131] \\ $h_{2}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[5/176] \mb{5/176} \begin{gl} \item[133] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[4/176] \mb{4/176} \begin{gl} \item[88] {\rm Sq(4)[55]} \\ $h_{2}:$ [55] \end{gl} \end{bdl} \dm{177} \begin{bdl} \item[89/177] \mb{89/177} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[88/177] \mb{88/177} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[87/177] \mb{87/177} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[86/177] \mb{86/177} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[85/177] \mb{85/177} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[84/177] \mb{84/177} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[79/177] \mb{79/177} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[78/177] \mb{78/177} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[75/177] \mb{75/177} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[72/177] \mb{72/177} \begin{gl} \item[23] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[71/177] \mb{71/177} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[70/177] \mb{70/177} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[69/177] \mb{69/177} \begin{gl} \item[27] {\rm Sq(1,1)[28]} \item[28] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[68/177] \mb{68/177} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[67/177] \mb{67/177} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[66/177] \mb{66/177} \begin{gl} \item[36] {\rm Sq(0,1)[35]} \item[37] {\rm Sq(0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[63/177] \mb{63/177} \begin{gl} \item[40] {\rm Sq(0,1)[43]} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[62/177] \mb{62/177} \begin{gl} \item[46] {\rm Sq(3)[46] + Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[60/177] \mb{60/177} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \item[49] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[59/177] \mb{59/177} \begin{gl} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[57/177] \mb{57/177} \begin{gl} \item[65] {\rm Sq(0,1)[60]} \item[66] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[56/177] \mb{56/177} \begin{gl} \item[64] {\rm Sq(0,1)[63]} \item[65] {\rm Sq(1)[68] + Sq(1)[67]} \\ $h_{0}:$ [68], [67] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[55/177] \mb{55/177} \begin{gl} \item[67] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{1}:$ [69] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[54/177] \mb{54/177} \begin{gl} \item[71] {\rm Sq(1,1)[70]} \item[72] {\rm Sq(0,1)[72]} \item[73] {\rm Sq(0,1)[73]} \item[74] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{3}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[53/177] \mb{53/177} \begin{gl} \item[75] {\rm Sq(0,1)[74]} \item[76] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [75] \\ $h_{2}:$ [71] \item[77] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{3}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[52/177] \mb{52/177} \begin{gl} \item[78] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [76] \item[79] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \item[80] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{2}:$ [79], [76] \end{gl} \end{bdl} \begin{bdl} \item[51/177] \mb{51/177} \begin{gl} \item[84] {\rm Sq(0,1)[86]} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \item[88] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{2}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[50/177] \mb{50/177} \begin{gl} \item[90] {\rm Sq(2,1)[85] + Sq(2,1)[82]} \item[91] {\rm Sq(0,1)[87]} \item[92] {\rm Sq(0,1)[88]} \end{gl} \end{bdl} \begin{bdl} \item[48/177] \mb{48/177} \begin{gl} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(0,1)[97]} \item[96] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[47/177] \mb{47/177} \begin{gl} \item[101] {\rm Sq(0,1)[102]} \item[102] {\rm Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[45/177] \mb{45/177} \begin{gl} \item[111] {\rm Sq(0,1)[114]} \item[112] {\rm Sq(0,1)[115]} \item[113] {\rm Sq(0,1)[116]} \item[114] {\rm Sq(3)[117] + Sq(0,1)[117]} \end{gl} \end{bdl} \begin{bdl} \item[44/177] \mb{44/177} \begin{gl} \item[118] {\rm Sq(0,1)[125]} \item[119] {\rm Sq(0,1)[126]} \item[120] {\rm Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[42/177] \mb{42/177} \begin{gl} \item[141] {\rm Sq(0,1)[134]} \item[142] {\rm Sq(0,1)[135]} \item[143] {\rm Sq(0,1)[136]} \end{gl} \end{bdl} \begin{bdl} \item[41/177] \mb{41/177} \begin{gl} \item[140] {\rm Sq(0,1)[135]} \item[141] {\rm Sq(0,1)[136]} \item[142] {\rm Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[40/177] \mb{40/177} \begin{gl} \item[143] {\rm Sq(0,1)[144]} \item[144] {\rm Sq(2)[149]} \\ $h_{1}:$ [149] \item[145] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{3}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[39/177] \mb{39/177} \begin{gl} \item[151] {\rm Sq(0,1)[151]} \item[152] {\rm Sq(0,1)[152]} \item[153] {\rm Sq(0,1)[153]} \item[154] {\rm Sq(1)[160]} \\ $h_{0}:$ [160] \\ $h_{3}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[38/177] \mb{38/177} \begin{gl} \item[157] {\rm Sq(0,1)[155]} \item[158] {\rm Sq(0,1)[156]} \item[159] {\rm Sq(0,1)[157]} \item[160] {\rm Sq(1)[165] + Sq(1)[164]} \\ $h_{0}:$ [165], [164] \\ $h_{3}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[37/177] \mb{37/177} \begin{gl} \item[163] {\rm Sq(0,1)[164]} \item[164] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{1}:$ [165] \\ $h_{2}:$ [163] \item[165] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{1}:$ [165] \\ $h_{2}:$ [163] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[36/177] \mb{36/177} \begin{gl} \item[169] {\rm Sq(0,1)[175]} \item[170] {\rm Sq(0,1)[176]} \item[171] {\rm Sq(0,1)[177]} \item[172] {\rm Sq(0,1)[178]} \item[173] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{2}:$ [171] \item[174] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{2}:$ [171] \end{gl} \end{bdl} \begin{bdl} \item[35/177] \mb{35/177} \begin{gl} \item[181] {\rm Sq(1,1)[184] + Sq(1,1)[182]} \item[182] {\rm Sq(0,1)[185]} \item[183] {\rm Sq(0,1)[186]} \item[184] {\rm Sq(0,1)[187]} \item[185] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[34/177] \mb{34/177} \begin{gl} \item[194] {\rm Sq(2,1)[186] + Sq(2,1)[184] + Sq(2,1)[183]} \item[195] {\rm Sq(0,1)[191]} \end{gl} \end{bdl} \begin{bdl} \item[33/177] \mb{33/177} \begin{gl} \item[198] {\rm Sq(0,1)[193]} \item[199] {\rm Sq(0,1)[195] + Sq(0,1)[194]} \item[200] {\rm Sq(0,1)[196] + Sq(0,1)[194]} \item[201] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{1}:$ [199], [198] \\ $h_{2}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[32/177] \mb{32/177} \begin{gl} \item[200] {\rm Sq(1,1)[197]} \item[201] {\rm Sq(0,1)[198]} \item[202] {\rm Sq(0,1)[199]} \item[203] {\rm Sq(0,1)[200]} \end{gl} \end{bdl} \begin{bdl} \item[31/177] \mb{31/177} \begin{gl} \item[205] {\rm Sq(1,1)[204]} \item[206] {\rm Sq(3)[207] + Sq(0,1)[207]} \item[207] {\rm Sq(2)[211]} \\ $h_{1}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[30/177] \mb{30/177} \begin{gl} \item[212] {\rm Sq(0,1)[214]} \item[213] {\rm Sq(0,1)[215]} \end{gl} \end{bdl} \begin{bdl} \item[29/177] \mb{29/177} \begin{gl} \item[221] {\rm Sq(0,1)[218]} \item[222] {\rm Sq(0,1)[219]} \item[223] {\rm Sq(0,1)[220]} \item[224] {\rm Sq(1)[230] + Sq(1)[229]} \\ $h_{0}:$ [230], [229] \\ $h_{1}:$ [226], [225], [223] \end{gl} \end{bdl} \begin{bdl} \item[28/177] \mb{28/177} \begin{gl} \item[229] {\rm Sq(1,1)[225] + Sq(1,1)[223] + Sq(1,1)[222] + Sq(1,1)[221]} \item[230] {\rm Sq(3)[226]} \end{gl} \end{bdl} \begin{bdl} \item[27/177] \mb{27/177} \begin{gl} \item[233] {\rm Sq(1,1)[228] + Sq(1,1)[227] + Sq(1,1)[226] + Sq(1,1)[225] + Sq(1,1)[224]} \item[234] {\rm Sq(0,1)[231] + Sq(0,1)[230]} \item[235] {\rm Sq(2)[235]} \\ $h_{1}:$ [235] \\ $h_{7}:$ [1] \item[236] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{2}:$ [226] \\ $h_{4}:$ [184] \item[237] {\rm Sq(1)[242] + Sq(1)[238]} \\ $h_{0}:$ [242], [238] \\ $h_{1}:$ [234] \\ $h_{2}:$ [229], [226] \\ $h_{3}:$ [212] \\ $h_{4}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[26/177] \mb{26/177} \begin{gl} \item[238] {\rm Sq(3,1)[226] + Sq(3,1)[223] + Sq(0,2)[222]} \item[239] {\rm Sq(0,1)[233]} \item[240] {\rm Sq(3)[235] + Sq(0,1)[235] + Sq(3)[234] + Sq(0,1)[234]} \item[241] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{2}:$ [231], [230] \\ $h_{3}:$ [216] \item[242] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \\ $h_{2}:$ [231] \\ $h_{3}:$ [217], [214] \end{gl} \end{bdl} \begin{bdl} \item[25/177] \mb{25/177} \begin{gl} \item[242] {\rm Sq(0,1)[236]} \item[243] {\rm Sq(3)[238] + Sq(0,1)[238]} \\ $h_{3}:$ [214] \item[244] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{3}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[24/177] \mb{24/177} \begin{gl} \item[245] {\rm Sq(3)[240] + Sq(0,1)[240] + Sq(3)[239] + Sq(0,1)[239]} \\ $h_{4}:$ [197] \item[246] {\rm Sq(2)[243]} \\ $h_{1}:$ [243] \item[247] {\rm Sq(1)[251] + Sq(1)[250] + Sq(1)[247]} \\ $h_{0}:$ [251], [250], [247] \\ $h_{3}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[23/177] \mb{23/177} \begin{gl} \item[247] {\rm Sq(2,1)[240]} \item[248] {\rm Sq(1,1)[245]} \item[249] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{2}:$ [245] \\ $h_{3}:$ [230] \\ $h_{4}:$ [204] \item[250] {\rm Sq(1)[257] + Sq(1)[255]} \\ $h_{0}:$ [257], [255] \item[251] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \end{gl} \end{bdl} \begin{bdl} \item[22/177] \mb{22/177} \begin{gl} \item[255] {\rm Sq(5)[247] + Sq(2,1)[247] + Sq(2,1)[246] + Sq(2,1)[245] + Sq(5)[244] + Sq(2,1)[244] + Sq(2,1)[243]} \item[256] {\rm Sq(0,1)[253]} \\ $h_{3}:$ [234] \item[257] {\rm Sq(3)[255] + Sq(3)[254] + Sq(3)[253]} \item[258] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \item[259] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{3}:$ [234] \item[260] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{1}:$ [258], [257] \\ $h_{3}:$ [234] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[21/177] \mb{21/177} \begin{gl} \item[261] {\rm Sq(1,1)[250]} \item[262] {\rm Sq(1,1)[253]} \item[263] {\rm Sq(2)[260] + Sq(2)[257]} \\ $h_{1}:$ [260], [257] \item[264] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[20/177] \mb{20/177} \begin{gl} \item[261] {\rm Sq(1,1)[260] + Sq(1,1)[256]} \\ $h_{7}:$ [7] \item[262] {\rm Sq(3)[263] + Sq(0,1)[263]} \item[263] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{3}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[19/177] \mb{19/177} \begin{gl} \item[268] {\rm Sq(3)[269] + Sq(0,1)[269] + Sq(3)[268] + Sq(0,1)[268]} \item[269] {\rm Sq(3)[270] + Sq(3)[268]} \item[270] {\rm Sq(2)[276] + Sq(2)[275]} \\ $h_{1}:$ [276], [275] \item[271] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{2}:$ [263] \item[272] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{2}:$ [264] \\ $h_{4}:$ [224] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[18/177] \mb{18/177} \begin{gl} \item[277] {\rm Sq(1,1)[272] + Sq(1,1)[271] + Sq(1,1)[270] + Sq(1,1)[269]} \item[278] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{2}:$ [266], [265] \\ $h_{7}:$ [14] \item[279] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{1}:$ [279], [278], [277] \\ $h_{2}:$ [270], [269] \\ $h_{4}:$ [231] \end{gl} \end{bdl} \begin{bdl} \item[17/177] \mb{17/177} \begin{gl} \item[280] {\rm Sq(3)[277] + Sq(0,1)[277] + Sq(0,1)[276]} \\ $h_{7}:$ [13] \item[281] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \item[282] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{2}:$ [270], [269], [268] \end{gl} \end{bdl} \begin{bdl} \item[16/177] \mb{16/177} \begin{gl} \item[285] {\rm Sq(1,1)[280] + Sq(1,1)[278]} \item[286] {\rm Sq(0,1)[284] + Sq(0,1)[283] + Sq(3)[282] + Sq(0,1)[282] + Sq(0,1)[281]} \item[287] {\rm Sq(3)[284] + Sq(3)[283] + Sq(3)[282]} \end{gl} \end{bdl} \begin{bdl} \item[15/177] \mb{15/177} \begin{gl} \item[291] {\rm Sq(4)[296]} \\ $h_{2}:$ [296] \item[292] {\rm Sq(4)[300] + Sq(1,1)[300] + Sq(4)[297] + Sq(1,1)[297]} \\ $h_{2}:$ [300], [297] \item[293] {\rm Sq(2)[303]} \\ $h_{1}:$ [303] \\ $h_{4}:$ [247] \end{gl} \end{bdl} \begin{bdl} \item[14/177] \mb{14/177} \begin{gl} \item[308] {\rm Sq(0,1)[309]} \\ $h_{7}:$ [16] \item[309] {\rm Sq(3)[310] + Sq(0,1)[308]} \end{gl} \end{bdl} \begin{bdl} \item[13/177] \mb{13/177} \begin{gl} \item[316] {\rm Sq(4)[312] + Sq(1,1)[312]} \\ $h_{2}:$ [312] \\ $h_{3}:$ [301], [298] \item[317] {\rm Sq(1,1)[315] + Sq(1,1)[312]} \item[318] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \\ $h_{1}:$ [321] \end{gl} \end{bdl} \begin{bdl} \item[12/177] \mb{12/177} \begin{gl} \item[322] {\rm Sq(2)[329]} \\ $h_{1}:$ [329] \\ $h_{3}:$ [312] \item[323] {\rm Sq(1)[331] + Sq(1)[330]} \\ $h_{0}:$ [331], [330] \end{gl} \end{bdl} \begin{bdl} \item[11/177] \mb{11/177} \begin{gl} \item[330] {\rm Sq(2,1)[315]} \\ $h_{3}:$ [306] \\ $h_{4}:$ [281] \\ $h_{5}:$ [221] \\ $h_{7}:$ [17] \item[331] {\rm Sq(5)[316] + Sq(2,1)[316] + Sq(5)[315]} \\ $h_{3}:$ [306] \\ $h_{4}:$ [281] \\ $h_{5}:$ [221] \\ $h_{7}:$ [17] \item[332] {\rm Sq(1,1)[317]} \\ $h_{3}:$ [306] \\ $h_{4}:$ [281] \\ $h_{5}:$ [221] \end{gl} \end{bdl} \begin{bdl} \item[10/177] \mb{10/177} \begin{gl} \item[323] {\rm Sq(2)[290]} \\ $h_{1}:$ [290] \\ $h_{2}:$ [286] \\ $h_{4}:$ [252] \\ $h_{5}:$ [207] \\ $h_{6}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[9/177] \mb{9/177} \begin{gl} \item[291] {\rm Sq(5)[248] + Sq(2,1)[248] + Sq(5)[247] + Sq(2,1)[247]} \\ $h_{3}:$ [238] \\ $h_{4}:$ [218] \\ $h_{5}:$ [181], [180] \item[292] {\rm Sq(1)[254]} \\ $h_{0}:$ [254] \\ $h_{2}:$ [250] \\ $h_{3}:$ [238] \\ $h_{4}:$ [218] \\ $h_{5}:$ [183], [181] \end{gl} \end{bdl} \begin{bdl} \item[8/177] \mb{8/177} \begin{gl} \item[254] {\rm Sq(3)[216] + Sq(0,1)[216]} \\ $h_{2}:$ [214] \\ $h_{5}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[7/177] \mb{7/177} \begin{gl} \item[220] {\rm Sq(3)[178] + Sq(0,1)[178]} \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[5/177] \mb{5/177} \begin{gl} \item[134] {\rm Sq(1,1)[87]} \\ $h_{5}:$ [72] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \dm{178} \begin{bdl} \item[90/178] \mb{90/178} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[85/178] \mb{85/178} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[84/178] \mb{84/178} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[83/178] \mb{83/178} \begin{gl} \item[7] {\rm Sq(1,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[82/178] \mb{82/178} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[81/178] \mb{81/178} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[80/178] \mb{80/178} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[77/178] \mb{77/178} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[74/178] \mb{74/178} \begin{gl} \item[17] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[71/178] \mb{71/178} \begin{gl} \item[22] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[68/178] \mb{68/178} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[67/178] \mb{67/178} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[66/178] \mb{66/178} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[65/178] \mb{65/178} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[64/178] \mb{64/178} \begin{gl} \item[38] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[62/178] \mb{62/178} \begin{gl} \item[47] {\rm Sq(0,1)[47]} \item[48] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[61/178] \mb{61/178} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[59/178] \mb{59/178} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[58/178] \mb{58/178} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[56/178] \mb{56/178} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[55/178] \mb{55/178} \begin{gl} \item[69] {\rm Sq(0,1)[70]} \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{1}:$ [71] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[54/178] \mb{54/178} \begin{gl} \item[75] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{3}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[53/178] \mb{53/178} \begin{gl} \item[78] {\rm Sq(0,1)[76]} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{3}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[52/178] \mb{52/178} \begin{gl} \item[81] {\rm Sq(0,1)[83]} \item[82] {\rm Sq(1)[91] + Sq(1)[90]} \\ $h_{0}:$ [91], [90] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[51/178] \mb{51/178} \begin{gl} \item[89] {\rm Sq(2)[90]} \\ $h_{1}:$ [90] \item[90] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{1}:$ [91] \\ $h_{2}:$ [89] \item[91] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{1}:$ [91] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[50/178] \mb{50/178} \begin{gl} \item[93] {\rm Sq(0,1)[89]} \item[94] {\rm Sq(0,1)[90]} \item[95] {\rm Sq(0,1)[91]} \item[96] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [87] \item[97] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[49/178] \mb{49/178} \begin{gl} \item[93] {\rm Sq(1,1)[91]} \item[94] {\rm Sq(0,1)[92]} \item[95] {\rm Sq(0,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[47/178] \mb{47/178} \begin{gl} \item[103] {\rm Sq(0,1)[104]} \item[104] {\rm Sq(0,1)[105]} \item[105] {\rm Sq(0,1)[106]} \end{gl} \end{bdl} \begin{bdl} \item[46/178] \mb{46/178} \begin{gl} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(0,1)[109]} \item[110] {\rm Sq(0,1)[110]} \item[111] {\rm Sq(2)[114]} \\ $h_{1}:$ [114] \end{gl} \end{bdl} \begin{bdl} \item[44/178] \mb{44/178} \begin{gl} \item[121] {\rm Sq(0,1)[130]} \item[122] {\rm Sq(0,1)[131]} \item[123] {\rm Sq(0,1)[132]} \end{gl} \end{bdl} \begin{bdl} \item[43/178] \mb{43/178} \begin{gl} \item[134] {\rm Sq(0,1)[137]} \item[135] {\rm Sq(0,1)[138]} \item[136] {\rm Sq(0,1)[139]} \end{gl} \end{bdl} \begin{bdl} \item[42/178] \mb{42/178} \begin{gl} \item[144] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[41/178] \mb{41/178} \begin{gl} \item[143] {\rm Sq(0,1)[139]} \item[144] {\rm Sq(0,1)[140]} \item[145] {\rm Sq(0,1)[141]} \item[146] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{1}:$ [144] \\ $h_{2}:$ [138] \\ $h_{3}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[40/178] \mb{40/178} \begin{gl} \item[146] {\rm Sq(0,1)[146]} \item[147] {\rm Sq(0,1)[147]} \item[148] {\rm Sq(0,1)[148]} \item[149] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [145] \\ $h_{3}:$ [133] \end{gl} \end{bdl} \begin{bdl} \item[39/178] \mb{39/178} \begin{gl} \item[155] {\rm Sq(0,1)[154]} \item[156] {\rm Sq(1)[165] + Sq(1)[162] + Sq(1)[161]} \\ $h_{0}:$ [165], [162], [161] \\ $h_{2}:$ [150] \\ $h_{3}:$ [138] \item[157] {\rm Sq(1)[166] + Sq(1)[162] + Sq(1)[161]} \\ $h_{0}:$ [166], [162], [161] \\ $h_{3}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[38/178] \mb{38/178} \begin{gl} \item[161] {\rm Sq(0,1)[158]} \item[162] {\rm Sq(0,1)[159]} \item[163] {\rm Sq(0,1)[160]} \item[164] {\rm Sq(0,1)[161]} \item[165] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{3}:$ [141] \item[166] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[37/178] \mb{37/178} \begin{gl} \item[166] {\rm Sq(0,1)[166]} \item[167] {\rm Sq(0,1)[167]} \item[168] {\rm Sq(0,1)[168]} \item[169] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \item[170] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{3}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[36/178] \mb{36/178} \begin{gl} \item[175] {\rm Sq(0,1)[180]} \item[176] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \item[177] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{3}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[35/178] \mb{35/178} \begin{gl} \item[186] {\rm Sq(0,1)[190]} \item[187] {\rm Sq(0,1)[191]} \item[188] {\rm Sq(0,1)[192]} \item[189] {\rm Sq(3)[193] + Sq(3)[190] + Sq(3)[189]} \item[190] {\rm Sq(2)[194]} \\ $h_{1}:$ [194] \item[191] {\rm Sq(1)[197] + Sq(1)[196]} \\ $h_{0}:$ [197], [196] \end{gl} \end{bdl} \begin{bdl} \item[34/178] \mb{34/178} \begin{gl} \item[196] {\rm Sq(1,1)[192]} \item[197] {\rm Sq(1,1)[194] + Sq(1,1)[193] + Sq(1,1)[191]} \item[198] {\rm Sq(0,1)[195]} \item[199] {\rm Sq(0,1)[196]} \item[200] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{2}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[33/178] \mb{33/178} \begin{gl} \item[202] {\rm Sq(0,1)[198]} \item[203] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{2}:$ [194] \item[204] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{1}:$ [202] \\ $h_{2}:$ [197], [194], [193] \end{gl} \end{bdl} \begin{bdl} \item[32/178] \mb{32/178} \begin{gl} \item[204] {\rm Sq(1,1)[201] + Sq(1,1)[199] + Sq(1,1)[198]} \item[205] {\rm Sq(0,1)[202]} \item[206] {\rm Sq(0,1)[203]} \item[207] {\rm Sq(1)[211] + Sq(1)[208]} \\ $h_{0}:$ [211], [208] \\ $h_{2}:$ [199] \end{gl} \end{bdl} \begin{bdl} \item[31/178] \mb{31/178} \begin{gl} \item[208] {\rm Sq(3)[208]} \item[209] {\rm Sq(0,1)[209]} \item[210] {\rm Sq(0,1)[210]} \item[211] {\rm Sq(3)[211]} \end{gl} \end{bdl} \begin{bdl} \item[30/178] \mb{30/178} \begin{gl} \item[214] {\rm Sq(4)[216] + Sq(4)[215] + Sq(1,1)[215] + Sq(4)[214] + Sq(1,1)[214]} \\ $h_{2}:$ [216], [215], [214] \item[215] {\rm Sq(1,1)[217] + Sq(1,1)[216] + Sq(1,1)[215] + Sq(1,1)[214] + Sq(1,1)[213]} \item[216] {\rm Sq(0,1)[218]} \item[217] {\rm Sq(2)[223] + Sq(2)[222] + Sq(2)[221]} \\ $h_{1}:$ [223], [222], [221] \end{gl} \end{bdl} \begin{bdl} \item[29/178] \mb{29/178} \begin{gl} \item[225] {\rm Sq(0,1)[223]} \item[226] {\rm Sq(0,1)[225] + Sq(0,1)[224]} \end{gl} \end{bdl} \begin{bdl} \item[28/178] \mb{28/178} \begin{gl} \item[231] {\rm Sq(1,1)[227]} \item[232] {\rm Sq(0,1)[228]} \item[233] {\rm Sq(0,1)[229]} \item[234] {\rm Sq(0,1)[230]} \item[235] {\rm Sq(1)[239] + Sq(1)[238]} \\ $h_{0}:$ [239], [238] \\ $h_{1}:$ [235], [233] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[27/178] \mb{27/178} \begin{gl} \item[238] {\rm Sq(3)[236] + Sq(0,1)[236]} \item[239] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[26/178] \mb{26/178} \begin{gl} \item[243] {\rm Sq(0,1)[238]} \item[244] {\rm Sq(3)[239] + Sq(3)[238]} \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[25/178] \mb{25/178} \begin{gl} \item[245] {\rm Sq(0,1)[240]} \item[246] {\rm Sq(3)[242] + Sq(0,1)[242] + Sq(3)[240]} \item[247] {\rm Sq(3)[243] + Sq(0,1)[243] + Sq(3)[240]} \item[248] {\rm Sq(1)[251] + Sq(1)[249] + Sq(1)[248]} \\ $h_{0}:$ [251], [249], [248] \\ $h_{1}:$ [246] \\ $h_{2}:$ [238] \\ $h_{3}:$ [222], [219], [218] \end{gl} \end{bdl} \begin{bdl} \item[24/178] \mb{24/178} \begin{gl} \item[248] {\rm Sq(3)[244] + Sq(0,1)[244] + Sq(0,1)[243] + Sq(3)[242] + Sq(0,1)[242]} \item[249] {\rm Sq(3)[245] + Sq(0,1)[245] + Sq(3)[243] + Sq(3)[242] + Sq(0,1)[242]} \\ $h_{3}:$ [224], [223], [222] \item[250] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{2}:$ [240], [239], [238] \\ $h_{4}:$ [202] \item[251] {\rm Sq(1)[254]} \\ $h_{0}:$ [254] \\ $h_{2}:$ [238] \\ $h_{3}:$ [225], [224] \end{gl} \end{bdl} \begin{bdl} \item[23/178] \mb{23/178} \begin{gl} \item[252] {\rm Sq(1,1)[250]} \item[253] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{4}:$ [209], [208] \item[254] {\rm Sq(1)[265] + Sq(1)[263]} \\ $h_{0}:$ [265], [263] \\ $h_{3}:$ [232] \end{gl} \end{bdl} \begin{bdl} \item[22/178] \mb{22/178} \begin{gl} \item[261] {\rm Sq(1,1)[255] + Sq(1,1)[253]} \\ $h_{4}:$ [209] \item[262] {\rm Sq(0,1)[257]} \\ $h_{4}:$ [209] \item[263] {\rm Sq(3)[259] + Sq(0,1)[259]} \\ $h_{3}:$ [236] \item[264] {\rm Sq(2)[262]} \\ $h_{1}:$ [262] \\ $h_{3}:$ [236] \\ $h_{4}:$ [209] \item[265] {\rm Sq(1)[268] + Sq(1)[267] + Sq(1)[266]} \\ $h_{0}:$ [268], [267], [266] \\ $h_{3}:$ [237], [236] \end{gl} \end{bdl} \begin{bdl} \item[21/178] \mb{21/178} \begin{gl} \item[265] {\rm Sq(2,1)[251] + Sq(5)[250] + Sq(2,1)[250]} \item[266] {\rm Sq(3)[258] + Sq(0,1)[258]} \item[267] {\rm Sq(3)[260] + Sq(0,1)[260] + Sq(3)[259] + Sq(0,1)[259]} \item[268] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \item[269] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{3}:$ [238], [237] \end{gl} \end{bdl} \begin{bdl} \item[20/178] \mb{20/178} \begin{gl} \item[264] {\rm Sq(2,1)[259] + Sq(2,1)[258] + Sq(2,1)[256]} \item[265] {\rm Sq(1,1)[263]} \item[266] {\rm Sq(1,1)[264] + Sq(1,1)[262]} \\ $h_{3}:$ [239] \item[267] {\rm Sq(2)[270]} \\ $h_{1}:$ [270] \\ $h_{3}:$ [241], [240], [239] \\ $h_{4}:$ [220] \end{gl} \end{bdl} \begin{bdl} \item[19/178] \mb{19/178} \begin{gl} \item[273] {\rm Sq(0,1)[276] + Sq(0,1)[275]} \item[274] {\rm Sq(2)[277]} \\ $h_{1}:$ [277] \\ $h_{2}:$ [271], [270], [269], [267] \item[275] {\rm Sq(1)[284] + Sq(1)[282]} \\ $h_{0}:$ [284], [282] \\ $h_{3}:$ [251], [249] \\ $h_{5}:$ [176] \\ $h_{6}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[18/178] \mb{18/178} \begin{gl} \item[280] {\rm Sq(1,1)[276]} \item[281] {\rm Sq(1)[283]} \\ $h_{0}:$ [283] \item[282] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{3}:$ [255] \item[283] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{1}:$ [280] \\ $h_{2}:$ [274] \\ $h_{3}:$ [255] \\ $h_{7}:$ [15] \item[284] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{3}:$ [256], [254] \\ $h_{5}:$ [181], [179] \\ $h_{6}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[17/178] \mb{17/178} \begin{gl} \item[283] {\rm Sq(5)[270] + Sq(2,1)[270] + Sq(5)[269] + Sq(2,1)[267]} \item[284] {\rm Sq(1,1)[278] + Sq(1,1)[277]} \\ $h_{3}:$ [260], [259] \item[285] {\rm Sq(2)[286]} \\ $h_{1}:$ [286] \item[286] {\rm Sq(1)[289] + Sq(1)[288]} \\ $h_{0}:$ [289], [288] \\ $h_{2}:$ [276] \\ $h_{3}:$ [260], [259] \\ $h_{7}:$ [14] \item[287] {\rm Sq(1)[291] + Sq(1)[288]} \\ $h_{0}:$ [291], [288] \\ $h_{3}:$ [261], [259] \end{gl} \end{bdl} \begin{bdl} \item[16/178] \mb{16/178} \begin{gl} \item[288] {\rm Sq(1,1)[282]} \item[289] {\rm Sq(0,1)[289]} \\ $h_{7}:$ [12] \item[290] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \item[291] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \item[292] {\rm Sq(1)[298] + Sq(1)[295]} \\ $h_{0}:$ [298], [295] \\ $h_{2}:$ [282] \end{gl} \end{bdl} \begin{bdl} \item[15/178] \mb{15/178} \begin{gl} \item[294] {\rm Sq(1,1)[302] + Sq(1,1)[301]} \item[295] {\rm Sq(3)[303] + Sq(0,1)[303]} \item[296] {\rm Sq(2)[309]} \\ $h_{1}:$ [309] \item[297] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \item[298] {\rm Sq(1)[311]} \\ $h_{0}:$ [311] \end{gl} \end{bdl} \begin{bdl} \item[14/178] \mb{14/178} \begin{gl} \item[310] {\rm Sq(7)[302] + Sq(1,2)[302] + Sq(7)[300] + Sq(1,2)[300]} \item[311] {\rm Sq(1,1)[308]} \end{gl} \end{bdl} \begin{bdl} \item[13/178] \mb{13/178} \begin{gl} \item[319] {\rm Sq(0,1)[318]} \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[12/178] \mb{12/178} \begin{gl} \item[324] {\rm Sq(3)[329] + Sq(0,1)[329]} \end{gl} \end{bdl} \begin{bdl} \item[10/178] \mb{10/178} \begin{gl} \item[324] {\rm Sq(2,1)[287] + Sq(2,1)[286]} \\ $h_{7}:$ [23] \item[325] {\rm Sq(3)[290]} \end{gl} \end{bdl} \begin{bdl} \item[9/178] \mb{9/178} \begin{gl} \item[293] {\rm Sq(4)[251]} \\ $h_{2}:$ [251] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[8/178] \mb{8/178} \begin{gl} \item[255] {\rm Sq(4)[216]} \\ $h_{2}:$ [216] \\ $h_{5}:$ [161] \item[256] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{2}:$ [217] \\ $h_{3}:$ [207] \\ $h_{5}:$ [163], [161] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[7/178] \mb{7/178} \begin{gl} \item[221] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{2}:$ [178] \\ $h_{3}:$ [170] \\ $h_{5}:$ [136] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[6/178] \mb{6/178} \begin{gl} \item[183] {\rm Sq(4)[130] + Sq(1,1)[130]} \\ $h_{2}:$ [130] \\ $h_{3}:$ [125] \\ $h_{5}:$ [104] \\ $h_{7}:$ [29] \item[184] {\rm Sq(3)[133] + Sq(0,1)[133]} \\ $h_{3}:$ [124] \\ $h_{5}:$ [103] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \dm{179} \begin{bdl} \item[91/179] \mb{91/179} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[90/179] \mb{90/179} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[89/179] \mb{89/179} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[81/179] \mb{81/179} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[80/179] \mb{80/179} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[79/179] \mb{79/179} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[76/179] \mb{76/179} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[73/179] \mb{73/179} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[72/179] \mb{72/179} \begin{gl} \item[24] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[71/179] \mb{71/179} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[70/179] \mb{70/179} \begin{gl} \item[24] {\rm Sq(0,1)[27]} \item[25] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[68/179] \mb{68/179} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[67/179] \mb{67/179} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[66/179] \mb{66/179} \begin{gl} \item[40] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[65/179] \mb{65/179} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [32] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[64/179] \mb{64/179} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[63/179] \mb{63/179} \begin{gl} \item[42] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[61/179] \mb{61/179} \begin{gl} \item[50] {\rm Sq(0,1)[48]} \item[51] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[60/179] \mb{60/179} \begin{gl} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[58/179] \mb{58/179} \begin{gl} \item[64] {\rm Sq(0,1)[65]} \item[65] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[57/179] \mb{57/179} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(3)[65] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[56/179] \mb{56/179} \begin{gl} \item[68] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[55/179] \mb{55/179} \begin{gl} \item[71] {\rm Sq(0,1)[72]} \item[72] {\rm Sq(0,1)[73]} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[54/179] \mb{54/179} \begin{gl} \item[76] {\rm Sq(1,1)[74]} \item[77] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[53/179] \mb{53/179} \begin{gl} \item[81] {\rm Sq(1)[87] + Sq(1)[83]} \\ $h_{0}:$ [87], [83] \\ $h_{2}:$ [75] \\ $h_{3}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[52/179] \mb{52/179} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(2)[89]} \\ $h_{1}:$ [89] \item[87] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{3}:$ [72], [71] \end{gl} \end{bdl} \begin{bdl} \item[51/179] \mb{51/179} \begin{gl} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{3}:$ [79], [76] \end{gl} \end{bdl} \begin{bdl} \item[50/179] \mb{50/179} \begin{gl} \item[98] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{3}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[49/179] \mb{49/179} \begin{gl} \item[96] {\rm Sq(0,1)[94]} \item[97] {\rm Sq(0,1)[95]} \item[98] {\rm Sq(0,1)[96]} \item[99] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[48/179] \mb{48/179} \begin{gl} \item[97] {\rm Sq(1,1)[100]} \item[98] {\rm Sq(0,1)[101]} \item[99] {\rm Sq(0,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[46/179] \mb{46/179} \begin{gl} \item[112] {\rm Sq(0,1)[111]} \item[113] {\rm Sq(0,1)[112]} \item[114] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[45/179] \mb{45/179} \begin{gl} \item[115] {\rm Sq(0,1)[118]} \item[116] {\rm Sq(0,1)[119]} \item[117] {\rm Sq(0,1)[120]} \end{gl} \end{bdl} \begin{bdl} \item[44/179] \mb{44/179} \begin{gl} \item[124] {\rm Sq(1,1)[133]} \end{gl} \end{bdl} \begin{bdl} \item[43/179] \mb{43/179} \begin{gl} \item[137] {\rm Sq(0,1)[141]} \item[138] {\rm Sq(0,1)[142]} \item[139] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[42/179] \mb{42/179} \begin{gl} \item[145] {\rm Sq(0,1)[140]} \item[146] {\rm Sq(0,1)[141]} \item[147] {\rm Sq(0,1)[142]} \end{gl} \end{bdl} \begin{bdl} \item[41/179] \mb{41/179} \begin{gl} \item[147] {\rm Sq(0,1)[143]} \item[148] {\rm Sq(3)[145] + Sq(0,1)[145]} \end{gl} \end{bdl} \begin{bdl} \item[40/179] \mb{40/179} \begin{gl} \item[150] {\rm Sq(0,1)[151]} \item[151] {\rm Sq(0,1)[152]} \item[152] {\rm Sq(0,1)[153]} \end{gl} \end{bdl} \begin{bdl} \item[39/179] \mb{39/179} \begin{gl} \item[158] {\rm Sq(0,1)[157]} \item[159] {\rm Sq(0,1)[158]} \item[160] {\rm Sq(0,1)[159]} \item[161] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{1}:$ [162], [161] \\ $h_{2}:$ [155] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[38/179] \mb{38/179} \begin{gl} \item[167] {\rm Sq(0,1)[163]} \item[168] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{2}:$ [162] \item[169] {\rm Sq(1)[176] + Sq(1)[174]} \\ $h_{0}:$ [176], [174] \\ $h_{2}:$ [159], [158] \\ $h_{3}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[37/179] \mb{37/179} \begin{gl} \item[171] {\rm Sq(0,1)[169]} \item[172] {\rm Sq(0,1)[171] + Sq(0,1)[170]} \item[173] {\rm Sq(0,1)[172]} \item[174] {\rm Sq(3)[174] + Sq(0,1)[174] + Sq(0,1)[170]} \item[175] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [165] \item[176] {\rm Sq(1)[183] + Sq(1)[181]} \\ $h_{0}:$ [183], [181] \\ $h_{3}:$ [153] \end{gl} \end{bdl} \begin{bdl} \item[36/179] \mb{36/179} \begin{gl} \item[178] {\rm Sq(0,1)[181]} \item[179] {\rm Sq(0,1)[182]} \item[180] {\rm Sq(0,1)[183]} \item[181] {\rm Sq(3)[185] + Sq(0,1)[185] + Sq(0,1)[184] + Sq(3)[181]} \item[182] {\rm Sq(2)[190]} \\ $h_{1}:$ [190] \item[183] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{3}:$ [167] \item[184] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[35/179] \mb{35/179} \begin{gl} \item[192] {\rm Sq(0,1)[195] + Sq(0,1)[194]} \item[193] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \item[194] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[34/179] \mb{34/179} \begin{gl} \item[201] {\rm Sq(0,1)[198]} \item[202] {\rm Sq(0,1)[199]} \item[203] {\rm Sq(0,1)[200]} \item[204] {\rm Sq(1)[208] + Sq(1)[205]} \\ $h_{0}:$ [208], [205] \item[205] {\rm Sq(1)[211] + Sq(1)[210]} \\ $h_{0}:$ [211], [210] \end{gl} \end{bdl} \begin{bdl} \item[33/179] \mb{33/179} \begin{gl} \item[205] {\rm Sq(3)[200] + Sq(0,1)[200]} \item[206] {\rm Sq(0,1)[201]} \item[207] {\rm Sq(0,1)[202]} \item[208] {\rm Sq(3)[202] + Sq(0,1)[200]} \item[209] {\rm Sq(0,1)[203] + Sq(0,1)[200]} \item[210] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{1}:$ [204] \\ $h_{2}:$ [199], [198] \item[211] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{1}:$ [204] \\ $h_{2}:$ [199], [198] \end{gl} \end{bdl} \begin{bdl} \item[32/179] \mb{32/179} \begin{gl} \item[208] {\rm Sq(1,1)[204] + Sq(1,1)[202]} \item[209] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \end{gl} \end{bdl} \begin{bdl} \item[31/179] \mb{31/179} \begin{gl} \item[212] {\rm Sq(1,1)[211] + Sq(1,1)[208]} \item[213] {\rm Sq(0,1)[212]} \item[214] {\rm Sq(0,1)[213]} \item[215] {\rm Sq(1)[220] + Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [220], [219], [218] \\ $h_{1}:$ [217] \\ $h_{2}:$ [208] \\ $h_{3}:$ [195], [193] \end{gl} \end{bdl} \begin{bdl} \item[30/179] \mb{30/179} \begin{gl} \item[218] {\rm Sq(0,1)[221]} \item[219] {\rm Sq(0,1)[222]} \item[220] {\rm Sq(0,1)[223]} \end{gl} \end{bdl} \begin{bdl} \item[29/179] \mb{29/179} \begin{gl} \item[227] {\rm Sq(1,1)[227] + Sq(4)[226] + Sq(4)[225] + Sq(1,1)[225] + Sq(1,1)[224] + Sq(4)[223] + Sq(1,1)[223]} \\ $h_{2}:$ [226], [225], [223] \end{gl} \end{bdl} \begin{bdl} \item[28/179] \mb{28/179} \begin{gl} \item[236] {\rm Sq(1,1)[229]} \item[237] {\rm Sq(0,1)[234] + Sq(0,1)[233]} \item[238] {\rm Sq(2)[238]} \\ $h_{1}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[27/179] \mb{27/179} \begin{gl} \item[240] {\rm Sq(0,1)[238]} \item[241] {\rm Sq(0,1)[239]} \item[242] {\rm Sq(0,1)[240]} \item[243] {\rm Sq(3)[242] + Sq(0,1)[242] + Sq(3)[238]} \end{gl} \end{bdl} \begin{bdl} \item[26/179] \mb{26/179} \begin{gl} \item[245] {\rm Sq(0,1)[242]} \item[246] {\rm Sq(2)[246] + Sq(2)[245]} \\ $h_{1}:$ [246], [245] \\ $h_{2}:$ [237] \\ $h_{3}:$ [222], [221] \end{gl} \end{bdl} \begin{bdl} \item[25/179] \mb{25/179} \begin{gl} \item[249] {\rm Sq(1,1)[243] + Sq(1,1)[242]} \end{gl} \end{bdl} \begin{bdl} \item[24/179] \mb{24/179} \begin{gl} \item[252] {\rm Sq(0,1)[247]} \end{gl} \end{bdl} \begin{bdl} \item[23/179] \mb{23/179} \begin{gl} \item[255] {\rm Sq(3)[256] + Sq(0,1)[256] + Sq(0,1)[255]} \item[256] {\rm Sq(2)[261]} \\ $h_{1}:$ [261] \\ $h_{3}:$ [236], [235] \\ $h_{4}:$ [212] \item[257] {\rm Sq(2)[263]} \\ $h_{1}:$ [263] \\ $h_{3}:$ [238], [237], [236] \item[258] {\rm Sq(2)[264]} \\ $h_{1}:$ [264] \\ $h_{2}:$ [252] \\ $h_{3}:$ [238] \\ $h_{4}:$ [212] \item[259] {\rm Sq(1)[267]} \\ $h_{0}:$ [267] \\ $h_{2}:$ [252] \\ $h_{3}:$ [237], [235] \item[260] {\rm Sq(1)[269] + Sq(1)[266]} \\ $h_{0}:$ [269], [266] \\ $h_{2}:$ [253], [252] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[22/179] \mb{22/179} \begin{gl} \item[266] {\rm Sq(1,1)[259] + Sq(1,1)[257]} \item[267] {\rm Sq(0,1)[262] + Sq(0,1)[261]} \item[268] {\rm Sq(2)[267]} \\ $h_{1}:$ [267] \\ $h_{3}:$ [242], [241], [240] \\ $h_{4}:$ [212] \item[269] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \\ $h_{2}:$ [258], [257] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[21/179] \mb{21/179} \begin{gl} \item[270] {\rm Sq(3)[261]} \\ $h_{7}:$ [7] \item[271] {\rm Sq(1)[271] + Sq(1)[269]} \\ $h_{0}:$ [271], [269] \\ $h_{1}:$ [265] \\ $h_{2}:$ [259], [258], [257] \\ $h_{3}:$ [242], [241] \\ $h_{4}:$ [214] \item[272] {\rm Sq(1)[272] + Sq(1)[268]} \\ $h_{0}:$ [272], [268] \\ $h_{1}:$ [266] \\ $h_{2}:$ [260], [259], [258], [256] \\ $h_{3}:$ [243], [242], [241] \\ $h_{4}:$ [214] \item[273] {\rm Sq(1)[273] + Sq(1)[269] + Sq(1)[268]} \\ $h_{0}:$ [273], [269], [268] \\ $h_{1}:$ [266], [265] \\ $h_{2}:$ [260], [259], [258], [256] \\ $h_{3}:$ [243] \\ $h_{4}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[20/179] \mb{20/179} \begin{gl} \item[268] {\rm Sq(3,1)[261] + Sq(3,1)[257] + Sq(3,1)[256] + Sq(0,2)[256]} \item[269] {\rm Sq(3)[268] + Sq(0,1)[268]} \item[270] {\rm Sq(2)[273]} \\ $h_{1}:$ [273] \\ $h_{3}:$ [248], [247], [246] \item[271] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{3}:$ [248], [247] \item[272] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{3}:$ [249], [248], [247] \item[273] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{3}:$ [249] \end{gl} \end{bdl} \begin{bdl} \item[19/179] \mb{19/179} \begin{gl} \item[276] {\rm Sq(1,1)[276] + Sq(1,1)[274]} \item[277] {\rm Sq(0,1)[277]} \\ $h_{3}:$ [252] \item[278] {\rm Sq(3)[277]} \\ $h_{3}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[18/179] \mb{18/179} \begin{gl} \item[285] {\rm Sq(4)[278] + Sq(1,1)[278]} \\ $h_{2}:$ [278] \\ $h_{3}:$ [257] \item[286] {\rm Sq(1,1)[279] + Sq(1,1)[278] + Sq(1,1)[277]} \item[287] {\rm Sq(3)[282] + Sq(0,1)[282] + Sq(3)[280]} \item[288] {\rm Sq(1)[292] + Sq(1)[289]} \\ $h_{0}:$ [292], [289] \\ $h_{1}:$ [283] \\ $h_{3}:$ [258] \item[289] {\rm Sq(1)[293] + Sq(1)[290] + Sq(1)[288]} \\ $h_{0}:$ [293], [290], [288] \\ $h_{1}:$ [285] \\ $h_{3}:$ [259], [258] \\ $h_{4}:$ [236] \\ $h_{6}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[17/179] \mb{17/179} \begin{gl} \item[288] {\rm Sq(0,1)[286]} \\ $h_{2}:$ [281] \\ $h_{3}:$ [262] \\ $h_{6}:$ [96] \item[289] {\rm Sq(0,1)[287] + Sq(0,1)[285]} \item[290] {\rm Sq(3)[287] + Sq(3)[286] + Sq(0,1)[285]} \item[291] {\rm Sq(2)[288]} \\ $h_{1}:$ [288] \\ $h_{2}:$ [281] \\ $h_{3}:$ [262] \\ $h_{6}:$ [96] \item[292] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \item[293] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{2}:$ [281] \end{gl} \end{bdl} \begin{bdl} \item[16/179] \mb{16/179} \begin{gl} \item[293] {\rm Sq(2)[295] + Sq(2)[294]} \\ $h_{1}:$ [295], [294] \\ $h_{4}:$ [248] \item[294] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \item[295] {\rm Sq(1)[303] + Sq(1)[302]} \\ $h_{0}:$ [303], [302] \end{gl} \end{bdl} \begin{bdl} \item[15/179] \mb{15/179} \begin{gl} \item[299] {\rm Sq(0,1)[309] + Sq(0,1)[308]} \\ $h_{7}:$ [14] \item[300] {\rm Sq(3)[309]} \item[301] {\rm Sq(2)[310]} \\ $h_{1}:$ [310] \item[302] {\rm Sq(1)[312]} \\ $h_{0}:$ [312] \\ $h_{1}:$ [311] \\ $h_{2}:$ [304] \\ $h_{7}:$ [14] \item[303] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{1}:$ [311] \\ $h_{2}:$ [304] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[14/179] \mb{14/179} \begin{gl} \item[312] {\rm Sq(1,1)[313]} \item[313] {\rm Sq(4)[313]} \\ $h_{2}:$ [313] \item[314] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \end{gl} \end{bdl} \begin{bdl} \item[13/179] \mb{13/179} \begin{gl} \item[320] {\rm Sq(1,1)[319]} \item[321] {\rm Sq(2)[324]} \\ $h_{1}:$ [324] \item[322] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{2}:$ [319] \\ $h_{3}:$ [307] \\ $h_{5}:$ [215] \\ $h_{6}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[12/179] \mb{12/179} \begin{gl} \item[325] {\rm Sq(0,1)[332] + Sq(3)[331] + Sq(0,1)[331] + Sq(3)[330]} \\ $h_{7}:$ [14] \item[326] {\rm Sq(1)[333]} \\ $h_{0}:$ [333] \\ $h_{5}:$ [223] \end{gl} \end{bdl} \begin{bdl} \item[11/179] \mb{11/179} \begin{gl} \item[333] {\rm Sq(3,1)[318]} \end{gl} \end{bdl} \begin{bdl} \item[9/179] \mb{9/179} \begin{gl} \item[294] {\rm Sq(5)[253] + Sq(2,1)[253]} \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[7/179] \mb{7/179} \begin{gl} \item[222] {\rm Sq(4)[181] + Sq(1,1)[181] + Sq(4)[180]} \\ $h_{2}:$ [181], [180] \\ $h_{5}:$ [137] \item[223] {\rm Sq(2)[184]} \\ $h_{1}:$ [184] \\ $h_{2}:$ [180] \\ $h_{3}:$ [173] \\ $h_{5}:$ [139] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[6/179] \mb{6/179} \begin{gl} \item[185] {\rm Sq(1,1)[133]} \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[5/179] \mb{5/179} \begin{gl} \item[135] {\rm Sq(4)[88]} \\ $h_{2}:$ [88] \\ $h_{3}:$ [84] \\ $h_{4}:$ [79] \end{gl} \end{bdl} \dm{180} \begin{bdl} \item[86/180] \mb{86/180} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[85/180] \mb{85/180} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[84/180] \mb{84/180} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[78/180] \mb{78/180} \begin{gl} \item[14] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[75/180] \mb{75/180} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[72/180] \mb{72/180} \begin{gl} \item[25] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[71/180] \mb{71/180} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[70/180] \mb{70/180} \begin{gl} \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[69/180] \mb{69/180} \begin{gl} \item[29] {\rm Sq(1,1)[30]} \item[30] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[68/180] \mb{68/180} \begin{gl} \item[33] {\rm Sq(1)[38] + Sq(1)[37]} \\ $h_{0}:$ [38], [37] \\ $h_{2}:$ [33] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[67/180] \mb{67/180} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [20] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{3}:$ [30] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[66/180] \mb{66/180} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[65/180] \mb{65/180} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[64/180] \mb{64/180} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[63/180] \mb{63/180} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(3)[47]} \item[45] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[62/180] \mb{62/180} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[60/180] \mb{60/180} \begin{gl} \item[51] {\rm Sq(0,1)[55]} \item[52] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[59/180] \mb{59/180} \begin{gl} \item[57] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[58/180] \mb{58/180} \begin{gl} \item[66] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[57/180] \mb{57/180} \begin{gl} \item[69] {\rm Sq(0,1)[66]} \item[70] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[56/180] \mb{56/180} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[55/180] \mb{55/180} \begin{gl} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[54/180] \mb{54/180} \begin{gl} \item[78] {\rm Sq(1,1)[76]} \item[79] {\rm Sq(0,1)[78]} \item[80] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[53/180] \mb{53/180} \begin{gl} \item[82] {\rm Sq(0,1)[81]} \item[83] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{1}:$ [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [69] \\ $h_{4}:$ [51] \item[84] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{1}:$ [86], [83] \\ $h_{2}:$ [79], [78] \\ $h_{3}:$ [70], [66] \\ $h_{4}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[52/180] \mb{52/180} \begin{gl} \item[88] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [88] \\ $h_{4}:$ [58] \item[89] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [84] \\ $h_{3}:$ [74] \\ $h_{4}:$ [58] \item[90] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [87], [84] \\ $h_{3}:$ [75] \\ $h_{4}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[51/180] \mb{51/180} \begin{gl} \item[94] {\rm Sq(0,1)[93]} \item[95] {\rm Sq(0,1)[94]} \item[96] {\rm Sq(0,1)[95]} \item[97] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [91] \\ $h_{4}:$ [65] \item[98] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{3}:$ [80] \\ $h_{4}:$ [65] \item[99] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [90] \\ $h_{3}:$ [81] \\ $h_{4}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[50/180] \mb{50/180} \begin{gl} \item[99] {\rm Sq(0,1)[93]} \item[100] {\rm Sq(0,1)[94]} \item[101] {\rm Sq(0,1)[95]} \item[102] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [82] \item[103] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[49/180] \mb{49/180} \begin{gl} \item[100] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \item[101] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[48/180] \mb{48/180} \begin{gl} \item[100] {\rm Sq(0,1)[103]} \item[101] {\rm Sq(0,1)[104]} \item[102] {\rm Sq(0,1)[105]} \item[103] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \item[104] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[47/180] \mb{47/180} \begin{gl} \item[106] {\rm Sq(0,1)[108]} \item[107] {\rm Sq(0,1)[109]} \item[108] {\rm Sq(0,1)[110]} \item[109] {\rm Sq(3)[110]} \item[110] {\rm Sq(3)[111]} \end{gl} \end{bdl} \begin{bdl} \item[45/180] \mb{45/180} \begin{gl} \item[118] {\rm Sq(0,1)[121]} \item[119] {\rm Sq(0,1)[122]} \item[120] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[44/180] \mb{44/180} \begin{gl} \item[125] {\rm Sq(0,1)[134]} \item[126] {\rm Sq(0,1)[135]} \item[127] {\rm Sq(0,1)[136]} \end{gl} \end{bdl} \begin{bdl} \item[43/180] \mb{43/180} \begin{gl} \item[140] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[42/180] \mb{42/180} \begin{gl} \item[148] {\rm Sq(0,1)[143]} \item[149] {\rm Sq(0,1)[144]} \item[150] {\rm Sq(0,1)[145]} \item[151] {\rm Sq(2)[148]} \\ $h_{1}:$ [148] \end{gl} \end{bdl} \begin{bdl} \item[41/180] \mb{41/180} \begin{gl} \item[149] {\rm Sq(0,1)[146]} \item[150] {\rm Sq(0,1)[147]} \item[151] {\rm Sq(0,1)[148]} \end{gl} \end{bdl} \begin{bdl} \item[40/180] \mb{40/180} \begin{gl} \item[153] {\rm Sq(0,1)[155]} \end{gl} \end{bdl} \begin{bdl} \item[39/180] \mb{39/180} \begin{gl} \item[162] {\rm Sq(0,1)[161]} \item[163] {\rm Sq(0,1)[162]} \item[164] {\rm Sq(0,1)[163]} \item[165] {\rm Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[38/180] \mb{38/180} \begin{gl} \item[170] {\rm Sq(0,1)[166]} \item[171] {\rm Sq(0,1)[167]} \item[172] {\rm Sq(0,1)[168]} \end{gl} \end{bdl} \begin{bdl} \item[37/180] \mb{37/180} \begin{gl} \item[177] {\rm Sq(3)[177] + Sq(0,1)[177] + Sq(0,1)[175]} \item[178] {\rm Sq(1)[189] + Sq(1)[188] + Sq(1)[187]} \\ $h_{0}:$ [189], [188], [187] \\ $h_{1}:$ [178] \\ $h_{2}:$ [173] \item[179] {\rm Sq(1)[190] + Sq(1)[188]} \\ $h_{0}:$ [190], [188] \\ $h_{1}:$ [182], [180], [178] \\ $h_{2}:$ [174] \\ $h_{3}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[36/180] \mb{36/180} \begin{gl} \item[185] {\rm Sq(0,1)[186]} \item[186] {\rm Sq(0,1)[187]} \item[187] {\rm Sq(3)[190] + Sq(0,1)[188]} \item[188] {\rm Sq(3)[191] + Sq(0,1)[191]} \item[189] {\rm Sq(1)[196] + Sq(1)[195]} \\ $h_{0}:$ [196], [195] \\ $h_{2}:$ [181] \item[190] {\rm Sq(1)[200] + Sq(1)[199]} \\ $h_{0}:$ [200], [199] \\ $h_{2}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[35/180] \mb{35/180} \begin{gl} \item[195] {\rm Sq(0,1)[196]} \item[196] {\rm Sq(0,1)[197]} \item[197] {\rm Sq(0,1)[198]} \item[198] {\rm Sq(0,1)[199]} \item[199] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{2}:$ [194] \item[200] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[34/180] \mb{34/180} \begin{gl} \item[206] {\rm Sq(0,1)[202]} \item[207] {\rm Sq(3)[203] + Sq(0,1)[203]} \item[208] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \item[209] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[33/180] \mb{33/180} \begin{gl} \item[212] {\rm Sq(1,1)[203] + Sq(1,1)[202] + Sq(1,1)[201]} \item[213] {\rm Sq(0,1)[205]} \item[214] {\rm Sq(0,1)[206]} \item[215] {\rm Sq(1)[213] + Sq(1)[210]} \\ $h_{0}:$ [213], [210] \\ $h_{1}:$ [208] \\ $h_{2}:$ [202] \\ $h_{4}:$ [155] \item[216] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[32/180] \mb{32/180} \begin{gl} \item[210] {\rm Sq(0,1)[208]} \item[211] {\rm Sq(0,1)[209]} \item[212] {\rm Sq(0,1)[210]} \item[213] {\rm Sq(0,1)[211]} \item[214] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \end{gl} \end{bdl} \begin{bdl} \item[31/180] \mb{31/180} \begin{gl} \item[216] {\rm Sq(0,1)[215]} \item[217] {\rm Sq(3)[215]} \end{gl} \end{bdl} \begin{bdl} \item[30/180] \mb{30/180} \begin{gl} \item[221] {\rm Sq(1,1)[222]} \item[222] {\rm Sq(1,1)[223] + Sq(1,1)[221]} \item[223] {\rm Sq(0,1)[225]} \item[224] {\rm Sq(0,1)[226]} \end{gl} \end{bdl} \begin{bdl} \item[29/180] \mb{29/180} \begin{gl} \item[228] {\rm Sq(0,1)[232] + Sq(0,1)[231]} \item[229] {\rm Sq(0,1)[233]} \item[230] {\rm Sq(0,1)[234] + Sq(0,1)[231]} \item[231] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{1}:$ [238], [237], [236] \item[232] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{1}:$ [238], [237], [236] \\ $h_{2}:$ [230], [229] \\ $h_{3}:$ [214], [213], [212], [211] \\ $h_{6}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[28/180] \mb{28/180} \begin{gl} \item[239] {\rm Sq(3)[238] + Sq(0,1)[238]} \item[240] {\rm Sq(1)[246] + Sq(1)[244]} \\ $h_{0}:$ [246], [244] \\ $h_{3}:$ [219], [218], [216], [215] \\ $h_{6}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[27/180] \mb{27/180} \begin{gl} \item[244] {\rm Sq(1,1)[242] + Sq(1,1)[239]} \item[245] {\rm Sq(0,1)[243]} \item[246] {\rm Sq(1)[250] + Sq(1)[247]} \\ $h_{0}:$ [250], [247] \\ $h_{3}:$ [222] \\ $h_{6}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[26/180] \mb{26/180} \begin{gl} \item[247] {\rm Sq(5)[241] + Sq(2,1)[241]} \item[248] {\rm Sq(0,1)[246]} \item[249] {\rm Sq(3)[246] + Sq(3)[245]} \item[250] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[25/180] \mb{25/180} \begin{gl} \item[250] {\rm Sq(5)[243] + Sq(2,1)[243] + Sq(5)[242] + Sq(2,1)[242]} \item[251] {\rm Sq(3)[250] + Sq(0,1)[250] + Sq(0,1)[249] + Sq(3)[248]} \\ $h_{2}:$ [245] \\ $h_{3}:$ [229], [227] \\ $h_{4}:$ [204], [200] \item[252] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \end{gl} \end{bdl} \begin{bdl} \item[24/180] \mb{24/180} \begin{gl} \item[253] {\rm Sq(1,1)[251] + Sq(1,1)[250]} \item[254] {\rm Sq(0,1)[252]} \item[255] {\rm Sq(1)[262] + Sq(1)[261]} \\ $h_{0}:$ [262], [261] \\ $h_{1}:$ [256] \\ $h_{3}:$ [232], [231], [230] \\ $h_{4}:$ [207], [206], [205] \end{gl} \end{bdl} \begin{bdl} \item[23/180] \mb{23/180} \begin{gl} \item[261] {\rm Sq(1)[272] + Sq(1)[271] + Sq(1)[270]} \\ $h_{0}:$ [272], [271], [270] \\ $h_{2}:$ [257], [255] \\ $h_{3}:$ [243], [240] \item[262] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{2}:$ [257], [255] \\ $h_{3}:$ [243], [240] \\ $h_{4}:$ [215], [214] \end{gl} \end{bdl} \begin{bdl} \item[22/180] \mb{22/180} \begin{gl} \item[270] {\rm Sq(0,1)[267] + Sq(0,1)[266] + Sq(0,1)[265]} \\ $h_{2}:$ [262], [261] \item[271] {\rm Sq(3)[269] + Sq(0,1)[269] + Sq(3)[265] + Sq(0,1)[265]} \\ $h_{2}:$ [262], [261] \\ $h_{3}:$ [245], [244] \item[272] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{3}:$ [247], [245] \item[273] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{1}:$ [270] \\ $h_{2}:$ [264], [261] \\ $h_{7}:$ [9] \item[274] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{3}:$ [247], [244] \\ $h_{4}:$ [218], [217] \end{gl} \end{bdl} \begin{bdl} \item[21/180] \mb{21/180} \begin{gl} \item[274] {\rm Sq(3)[266] + Sq(0,1)[266] + Sq(0,1)[265]} \\ $h_{3}:$ [245] \item[275] {\rm Sq(2)[269]} \\ $h_{1}:$ [269] \\ $h_{3}:$ [246], [245] \\ $h_{4}:$ [217] \item[276] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{2}:$ [261] \\ $h_{7}:$ [8] \item[277] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{3}:$ [245] \\ $h_{4}:$ [218] \end{gl} \end{bdl} \begin{bdl} \item[20/180] \mb{20/180} \begin{gl} \item[274] {\rm Sq(3)[273]} \\ $h_{7}:$ [8] \item[275] {\rm Sq(2)[276]} \\ $h_{1}:$ [276] \\ $h_{3}:$ [251] \\ $h_{4}:$ [224] \\ $h_{7}:$ [8] \item[276] {\rm Sq(2)[278] + Sq(2)[277]} \\ $h_{1}:$ [278], [277] \\ $h_{3}:$ [251] \\ $h_{7}:$ [8] \item[277] {\rm Sq(1)[283] + Sq(1)[282] + Sq(1)[279]} \\ $h_{0}:$ [283], [282], [279] \\ $h_{7}:$ [8] \item[278] {\rm Sq(1)[285] + Sq(1)[279]} \\ $h_{0}:$ [285], [279] \item[279] {\rm Sq(1)[287] + Sq(1)[286] + Sq(1)[281]} \\ $h_{0}:$ [287], [286], [281] \\ $h_{1}:$ [277] \\ $h_{2}:$ [271], [268] \\ $h_{3}:$ [254], [252], [251] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[19/180] \mb{19/180} \begin{gl} \item[279] {\rm Sq(1,1)[277]} \item[280] {\rm Sq(1,1)[278]} \item[281] {\rm Sq(3)[281] + Sq(0,1)[281] + Sq(3)[280] + Sq(0,1)[280]} \\ $h_{3}:$ [257] \item[282] {\rm Sq(3)[282] + Sq(0,1)[282] + Sq(3)[280] + Sq(0,1)[280]} \\ $h_{2}:$ [277] \\ $h_{3}:$ [258] \item[283] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(3)[280] + Sq(0,1)[280]} \\ $h_{2}:$ [277] \\ $h_{3}:$ [258] \item[284] {\rm Sq(2)[287]} \\ $h_{1}:$ [287] \\ $h_{3}:$ [258], [257] \item[285] {\rm Sq(1)[291] + Sq(1)[290]} \\ $h_{0}:$ [291], [290] \item[286] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{3}:$ [260], [257] \item[287] {\rm Sq(1)[293] + Sq(1)[290]} \\ $h_{0}:$ [293], [290] \\ $h_{2}:$ [277] \\ $h_{3}:$ [261], [260], [257] \item[288] {\rm Sq(1)[294] + Sq(1)[290]} \\ $h_{0}:$ [294], [290] \\ $h_{2}:$ [278], [277] \\ $h_{3}:$ [262], [258] \\ $h_{4}:$ [232] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[18/180] \mb{18/180} \begin{gl} \item[290] {\rm Sq(3)[283]} \item[291] {\rm Sq(3)[285]} \item[292] {\rm Sq(3)[286] + Sq(0,1)[286] + Sq(0,1)[284]} \\ $h_{3}:$ [261] \item[293] {\rm Sq(3)[287] + Sq(0,1)[287] + Sq(0,1)[283]} \\ $h_{3}:$ [262], [261] \item[294] {\rm Sq(1)[299] + Sq(1)[296] + Sq(1)[295]} \\ $h_{0}:$ [299], [296], [295] \\ $h_{2}:$ [280] \\ $h_{3}:$ [264] \\ $h_{4}:$ [237] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[17/180] \mb{17/180} \begin{gl} \item[294] {\rm Sq(1,1)[285]} \item[295] {\rm Sq(3)[288] + Sq(0,1)[288]} \item[296] {\rm Sq(0,1)[289] + Sq(0,1)[288]} \\ $h_{7}:$ [15] \item[297] {\rm Sq(3)[291] + Sq(0,1)[291]} \\ $h_{3}:$ [264] \item[298] {\rm Sq(1)[298] + Sq(1)[296]} \\ $h_{0}:$ [298], [296] \\ $h_{2}:$ [287] \\ $h_{3}:$ [264] \item[299] {\rm Sq(1)[302] + Sq(1)[301] + Sq(1)[296]} \\ $h_{0}:$ [302], [301], [296] \\ $h_{3}:$ [266] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[16/180] \mb{16/180} \begin{gl} \item[296] {\rm Sq(0,1)[295] + Sq(3)[294] + Sq(0,1)[294]} \\ $h_{2}:$ [292] \item[297] {\rm Sq(3)[297] + Sq(0,1)[297] + Sq(0,1)[294]} \\ $h_{2}:$ [292] \item[298] {\rm Sq(3)[298] + Sq(0,1)[298] + Sq(3)[296] + Sq(3)[295] + Sq(0,1)[294]} \\ $h_{2}:$ [292] \item[299] {\rm Sq(2)[300]} \\ $h_{1}:$ [300] \\ $h_{2}:$ [292] \\ $h_{3}:$ [277] \item[300] {\rm Sq(2)[301]} \\ $h_{1}:$ [301] \\ $h_{2}:$ [292], [291] \\ $h_{3}:$ [277], [275] \item[301] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \item[302] {\rm Sq(1)[306] + Sq(1)[305]} \\ $h_{0}:$ [306], [305] \\ $h_{2}:$ [292] \\ $h_{3}:$ [276] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[15/180] \mb{15/180} \begin{gl} \item[304] {\rm Sq(0,1)[311] + Sq(3)[310]} \item[305] {\rm Sq(1)[316] + Sq(1)[315]} \\ $h_{0}:$ [316], [315] \\ $h_{4}:$ [265], [264] \item[306] {\rm Sq(1)[319] + Sq(1)[315]} \\ $h_{0}:$ [319], [315] \\ $h_{4}:$ [265], [264] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[14/180] \mb{14/180} \begin{gl} \item[315] {\rm Sq(2,1)[313]} \item[316] {\rm Sq(5)[315] + Sq(2,1)[315] + Sq(5)[313]} \item[317] {\rm Sq(0,1)[319]} \\ $h_{7}:$ [17] \item[318] {\rm Sq(2)[320]} \\ $h_{1}:$ [320] \item[319] {\rm Sq(1)[324]} \\ $h_{0}:$ [324] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[13/180] \mb{13/180} \begin{gl} \item[323] {\rm Sq(0,1)[324]} \\ $h_{4}:$ [282], [281] \item[324] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[12/180] \mb{12/180} \begin{gl} \item[327] {\rm Sq(2)[333]} \\ $h_{1}:$ [333] \\ $h_{2}:$ [331], [330] \\ $h_{5}:$ [227] \\ $h_{6}:$ [103] \item[328] {\rm Sq(1)[334]} \\ $h_{0}:$ [334] \\ $h_{7}:$ [15] \item[329] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \\ $h_{2}:$ [331], [330] \\ $h_{5}:$ [230] \\ $h_{6}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[11/180] \mb{11/180} \begin{gl} \item[334] {\rm Sq(3,1)[320]} \\ $h_{7}:$ [18] \item[335] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{5}:$ [229] \\ $h_{6}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[10/180] \mb{10/180} \begin{gl} \item[326] {\rm Sq(1,1)[292] + Sq(1,1)[291]} \item[327] {\rm Sq(3)[293] + Sq(0,1)[293]} \\ $h_{5}:$ [212] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[9/180] \mb{9/180} \begin{gl} \item[295] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \\ $h_{2}:$ [254] \\ $h_{5}:$ [188] \end{gl} \end{bdl} \begin{bdl} \item[8/180] \mb{8/180} \begin{gl} \item[257] {\rm Sq(4)[220] + Sq(1,1)[220]} \\ $h_{2}:$ [220] \\ $h_{5}:$ [164] \\ $h_{7}:$ [25] \item[258] {\rm Sq(3)[221] + Sq(0,1)[221]} \\ $h_{5}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[7/180] \mb{7/180} \begin{gl} \item[224] {\rm Sq(3)[184] + Sq(3)[183] + Sq(0,1)[183]} \\ $h_{5}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[6/180] \mb{6/180} \begin{gl} \item[186] {\rm Sq(4)[134] + Sq(1,1)[134]} \\ $h_{2}:$ [134] \\ $h_{4}:$ [117] \\ $h_{5}:$ [105] \\ $h_{7}:$ [31] \end{gl} \end{bdl} \dm{181} \begin{bdl} \item[85/181] \mb{85/181} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[84/181] \mb{84/181} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[83/181] \mb{83/181} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[82/181] \mb{82/181} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[81/181] \mb{81/181} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[80/181] \mb{80/181} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[79/181] \mb{79/181} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[78/181] \mb{78/181} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[77/181] \mb{77/181} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \item[18] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[76/181] \mb{76/181} \begin{gl} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[75/181] \mb{75/181} \begin{gl} \item[15] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[74/181] \mb{74/181} \begin{gl} \item[18] {\rm Sq(3,1)[22]} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[71/181] \mb{71/181} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[69/181] \mb{69/181} \begin{gl} \item[31] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[68/181] \mb{68/181} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[67/181] \mb{67/181} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[66/181] \mb{66/181} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [39] \\ $h_{4}:$ [26] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[65/181] \mb{65/181} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45] + Sq(1)[43]} \\ $h_{0}:$ [45], [43] \\ $h_{2}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[64/181] \mb{64/181} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[63/181] \mb{63/181} \begin{gl} \item[46] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[62/181] \mb{62/181} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[61/181] \mb{61/181} \begin{gl} \item[52] {\rm Sq(0,1)[50]} \item[53] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[60/181] \mb{60/181} \begin{gl} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[59/181] \mb{59/181} \begin{gl} \item[58] {\rm Sq(0,1)[64]} \item[59] {\rm Sq(0,1)[65]} \item[60] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[58/181] \mb{58/181} \begin{gl} \item[67] {\rm Sq(3,1)[64]} \item[68] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[57/181] \mb{57/181} \begin{gl} \item[71] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[56/181] \mb{56/181} \begin{gl} \item[70] {\rm Sq(1,1)[70]} \item[71] {\rm Sq(0,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[55/181] \mb{55/181} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[53/181] \mb{53/181} \begin{gl} \item[85] {\rm Sq(0,1)[83]} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(0,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[52/181] \mb{52/181} \begin{gl} \item[91] {\rm Sq(0,1)[92]} \end{gl} \end{bdl} \begin{bdl} \item[51/181] \mb{51/181} \begin{gl} \item[100] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{1}:$ [99] \\ $h_{2}:$ [96] \item[101] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{1}:$ [100], [99] \\ $h_{2}:$ [97], [96] \\ $h_{3}:$ [85], [82] \end{gl} \end{bdl} \begin{bdl} \item[50/181] \mb{50/181} \begin{gl} \item[104] {\rm Sq(0,1)[96]} \item[105] {\rm Sq(0,1)[97]} \item[106] {\rm Sq(0,1)[98]} \item[107] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [93] \item[108] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [94], [93] \\ $h_{3}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[49/181] \mb{49/181} \begin{gl} \item[102] {\rm Sq(0,1)[97]} \item[103] {\rm Sq(0,1)[98]} \item[104] {\rm Sq(0,1)[99]} \item[105] {\rm Sq(1)[106]} \\ $h_{0}:$ [106] \\ $h_{3}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[48/181] \mb{48/181} \begin{gl} \item[105] {\rm Sq(2)[109] + Sq(2)[108]} \\ $h_{1}:$ [109], [108] \item[106] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{3}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[47/181] \mb{47/181} \begin{gl} \item[111] {\rm Sq(0,1)[112]} \item[112] {\rm Sq(0,1)[113]} \item[113] {\rm Sq(0,1)[114]} \item[114] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[46/181] \mb{46/181} \begin{gl} \item[115] {\rm Sq(0,1)[115]} \item[116] {\rm Sq(0,1)[116]} \item[117] {\rm Sq(0,1)[117]} \item[118] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[45/181] \mb{45/181} \begin{gl} \item[121] {\rm Sq(0,1)[124]} \item[122] {\rm Sq(3)[124]} \end{gl} \end{bdl} \begin{bdl} \item[44/181] \mb{44/181} \begin{gl} \item[128] {\rm Sq(0,1)[137]} \item[129] {\rm Sq(0,1)[138]} \item[130] {\rm Sq(0,1)[139]} \end{gl} \end{bdl} \begin{bdl} \item[43/181] \mb{43/181} \begin{gl} \item[141] {\rm Sq(0,1)[145]} \item[142] {\rm Sq(0,1)[146]} \item[143] {\rm Sq(0,1)[147]} \item[144] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \\ $h_{1}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[42/181] \mb{42/181} \begin{gl} \item[152] {\rm Sq(0,1)[147]} \item[153] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[41/181] \mb{41/181} \begin{gl} \item[152] {\rm Sq(0,1)[150]} \item[153] {\rm Sq(0,1)[151]} \item[154] {\rm Sq(0,1)[152]} \item[155] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[40/181] \mb{40/181} \begin{gl} \item[154] {\rm Sq(1,1)[157] + Sq(1,1)[156]} \item[155] {\rm Sq(0,1)[158]} \item[156] {\rm Sq(0,1)[159]} \item[157] {\rm Sq(0,1)[160]} \item[158] {\rm Sq(2)[163] + Sq(2)[162]} \\ $h_{1}:$ [163], [162] \end{gl} \end{bdl} \begin{bdl} \item[39/181] \mb{39/181} \begin{gl} \item[166] {\rm Sq(0,1)[167]} \end{gl} \end{bdl} \begin{bdl} \item[38/181] \mb{38/181} \begin{gl} \item[173] {\rm Sq(0,1)[171]} \item[174] {\rm Sq(0,1)[173] + Sq(0,1)[172]} \item[175] {\rm Sq(3)[175] + Sq(0,1)[175] + Sq(0,1)[172]} \item[176] {\rm Sq(3)[176] + Sq(0,1)[176] + Sq(3)[174] + Sq(0,1)[172]} \end{gl} \end{bdl} \begin{bdl} \item[37/181] \mb{37/181} \begin{gl} \item[180] {\rm Sq(0,1)[179]} \item[181] {\rm Sq(0,1)[180]} \item[182] {\rm Sq(0,1)[181]} \item[183] {\rm Sq(3)[184] + Sq(0,1)[184] + Sq(3)[183] + Sq(0,1)[183] + Sq(3)[178] + Sq(0,1)[178]} \end{gl} \end{bdl} \begin{bdl} \item[36/181] \mb{36/181} \begin{gl} \item[191] {\rm Sq(3)[193] + Sq(0,1)[193] + Sq(0,1)[192]} \end{gl} \end{bdl} \begin{bdl} \item[35/181] \mb{35/181} \begin{gl} \item[201] {\rm Sq(0,1)[201]} \item[202] {\rm Sq(0,1)[202]} \item[203] {\rm Sq(3)[204] + Sq(0,1)[204]} \item[204] {\rm Sq(3)[205] + Sq(0,1)[205] + Sq(0,1)[203]} \item[205] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{1}:$ [208], [206] \\ $h_{2}:$ [197], [196] \item[206] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{1}:$ [208], [207], [206] \end{gl} \end{bdl} \begin{bdl} \item[34/181] \mb{34/181} \begin{gl} \item[210] {\rm Sq(0,1)[207] + Sq(0,1)[206]} \item[211] {\rm Sq(0,1)[208]} \item[212] {\rm Sq(3)[208] + Sq(3)[205] + Sq(0,1)[205]} \item[213] {\rm Sq(0,1)[209]} \item[214] {\rm Sq(1)[219] + Sq(1)[217]} \\ $h_{0}:$ [219], [217] \\ $h_{2}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[33/181] \mb{33/181} \begin{gl} \item[217] {\rm Sq(1,1)[206]} \item[218] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \\ $h_{1}:$ [213], [210] \\ $h_{2}:$ [207] \\ $h_{4}:$ [164] \item[219] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{2}:$ [204] \end{gl} \end{bdl} \begin{bdl} \item[32/181] \mb{32/181} \begin{gl} \item[215] {\rm Sq(3)[212]} \item[216] {\rm Sq(0,1)[213]} \item[217] {\rm Sq(0,1)[214]} \item[218] {\rm Sq(2)[217] + Sq(2)[216]} \\ $h_{1}:$ [217], [216] \item[219] {\rm Sq(1)[220] + Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [220], [219], [218] \\ $h_{2}:$ [211], [208] \\ $h_{4}:$ [166] \item[220] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \end{gl} \end{bdl} \begin{bdl} \item[31/181] \mb{31/181} \begin{gl} \item[218] {\rm Sq(0,1)[218]} \item[219] {\rm Sq(0,1)[219]} \item[220] {\rm Sq(0,1)[220]} \item[221] {\rm Sq(2)[222]} \\ $h_{1}:$ [222] \\ $h_{2}:$ [214] \item[222] {\rm Sq(1)[225]} \\ $h_{0}:$ [225] \end{gl} \end{bdl} \begin{bdl} \item[30/181] \mb{30/181} \begin{gl} \item[225] {\rm Sq(2,1)[223] + Sq(2,1)[222] + Sq(2,1)[221]} \item[226] {\rm Sq(1,1)[225]} \item[227] {\rm Sq(1,1)[226]} \end{gl} \end{bdl} \begin{bdl} \item[29/181] \mb{29/181} \begin{gl} \item[233] {\rm Sq(1,1)[234] + Sq(1,1)[233] + Sq(1,1)[232]} \item[234] {\rm Sq(0,1)[237] + Sq(0,1)[236]} \item[235] {\rm Sq(3)[238] + Sq(3)[237] + Sq(3)[236] + Sq(0,1)[236]} \item[236] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \\ $h_{1}:$ [239] \\ $h_{3}:$ [217] \\ $h_{4}:$ [180] \\ $h_{6}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[28/181] \mb{28/181} \begin{gl} \item[241] {\rm Sq(0,1)[241] + Sq(0,1)[240]} \item[242] {\rm Sq(0,1)[242] + Sq(0,1)[240]} \item[243] {\rm Sq(0,1)[243] + Sq(0,1)[240]} \item[244] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{3}:$ [225], [221] \\ $h_{6}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[27/181] \mb{27/181} \begin{gl} \item[247] {\rm Sq(0,1)[245]} \item[248] {\rm Sq(2)[247]} \\ $h_{1}:$ [247] \item[249] {\rm Sq(1)[252] + Sq(1)[251]} \\ $h_{0}:$ [252], [251] \\ $h_{2}:$ [244] \\ $h_{7}:$ [3] \item[250] {\rm Sq(1)[253] + Sq(1)[251]} \\ $h_{0}:$ [253], [251] \\ $h_{3}:$ [229] \end{gl} \end{bdl} \begin{bdl} \item[26/181] \mb{26/181} \begin{gl} \item[251] {\rm Sq(1,1)[246]} \item[252] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{7}:$ [3] \item[253] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{3}:$ [231] \end{gl} \end{bdl} \begin{bdl} \item[25/181] \mb{25/181} \begin{gl} \item[253] {\rm Sq(2,1)[246]} \\ $h_{7}:$ [3] \item[254] {\rm Sq(0,1)[252]} \item[255] {\rm Sq(2)[253]} \\ $h_{1}:$ [253] \\ $h_{7}:$ [3] \item[256] {\rm Sq(1)[258] + Sq(1)[257]} \\ $h_{0}:$ [258], [257] \end{gl} \end{bdl} \begin{bdl} \item[24/181] \mb{24/181} \begin{gl} \item[256] {\rm Sq(3)[256]} \item[257] {\rm Sq(3)[259] + Sq(0,1)[259]} \item[258] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \item[259] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{2}:$ [253] \\ $h_{3}:$ [236], [235] \\ $h_{4}:$ [211], [209] \end{gl} \end{bdl} \begin{bdl} \item[23/181] \mb{23/181} \begin{gl} \item[263] {\rm Sq(0,1)[267]} \item[264] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{2}:$ [261] \\ $h_{3}:$ [245] \\ $h_{4}:$ [219] \end{gl} \end{bdl} \begin{bdl} \item[22/181] \mb{22/181} \begin{gl} \item[275] {\rm Sq(1,1)[269] + Sq(1,1)[266]} \item[276] {\rm Sq(3)[273] + Sq(0,1)[273] + Sq(3)[272] + Sq(0,1)[272] + Sq(3)[271] + Sq(0,1)[271]} \item[277] {\rm Sq(1)[280] + Sq(1)[278]} \\ $h_{0}:$ [280], [278] \\ $h_{1}:$ [274] \\ $h_{2}:$ [268], [267], [265] \\ $h_{3}:$ [251] \\ $h_{4}:$ [222], [220] \item[278] {\rm Sq(1)[283]} \\ $h_{0}:$ [283] \end{gl} \end{bdl} \begin{bdl} \item[21/181] \mb{21/181} \begin{gl} \item[278] {\rm Sq(0,1)[268]} \\ $h_{2}:$ [265], [264] \\ $h_{4}:$ [220] \item[279] {\rm Sq(3)[272] + Sq(0,1)[272] + Sq(3)[271] + Sq(0,1)[271] + Sq(3)[270] + Sq(0,1)[269] + Sq(3)[268]} \\ $h_{2}:$ [265] \\ $h_{3}:$ [250] \\ $h_{4}:$ [220] \item[280] {\rm Sq(3)[273] + Sq(0,1)[273] + Sq(3)[270] + Sq(3)[269] + Sq(0,1)[269] + Sq(3)[268]} \\ $h_{2}:$ [264] \\ $h_{3}:$ [250] \item[281] {\rm Sq(2)[275] + Sq(2)[274]} \\ $h_{1}:$ [275], [274] \\ $h_{3}:$ [251] \\ $h_{4}:$ [221], [220] \item[282] {\rm Sq(2)[276] + Sq(2)[274]} \\ $h_{1}:$ [276], [274] \\ $h_{3}:$ [251] \item[283] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \end{gl} \end{bdl} \begin{bdl} \item[20/181] \mb{20/181} \begin{gl} \item[280] {\rm Sq(2)[281] + Sq(2)[280]} \\ $h_{1}:$ [281], [280] \\ $h_{2}:$ [273] \\ $h_{3}:$ [258], [257], [256] \\ $h_{4}:$ [227] \item[281] {\rm Sq(2)[283] + Sq(2)[282] + Sq(2)[279]} \\ $h_{1}:$ [283], [282], [279] \item[282] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \end{gl} \end{bdl} \begin{bdl} \item[19/181] \mb{19/181} \begin{gl} \item[289] {\rm Sq(0,1)[287]} \item[290] {\rm Sq(2)[291] + Sq(2)[290]} \\ $h_{1}:$ [291], [290] \item[291] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \item[292] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{1}:$ [290] \end{gl} \end{bdl} \begin{bdl} \item[18/181] \mb{18/181} \begin{gl} \item[295] {\rm Sq(3)[291] + Sq(3)[290] + Sq(3)[288]} \item[296] {\rm Sq(3)[292] + Sq(0,1)[292] + Sq(0,1)[290] + Sq(3)[289]} \item[297] {\rm Sq(2)[294]} \\ $h_{1}:$ [294] \\ $h_{2}:$ [283] \\ $h_{3}:$ [265] \item[298] {\rm Sq(2)[295]} \\ $h_{1}:$ [295] \\ $h_{4}:$ [241] \item[299] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{3}:$ [269] \item[300] {\rm Sq(1)[301]} \\ $h_{0}:$ [301] \item[301] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{1}:$ [297] \\ $h_{2}:$ [283] \\ $h_{3}:$ [270], [267] \\ $h_{4}:$ [241] \item[302] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{1}:$ [296] \\ $h_{2}:$ [286], [284] \\ $h_{3}:$ [272], [271], [265] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[17/181] \mb{17/181} \begin{gl} \item[300] {\rm Sq(1,1)[291] + Sq(1,1)[290] + Sq(1,1)[289] + Sq(1,1)[288]} \\ $h_{3}:$ [268] \item[301] {\rm Sq(3)[295] + Sq(0,1)[295] + Sq(3)[294] + Sq(0,1)[294]} \item[302] {\rm Sq(2)[297] + Sq(2)[296]} \\ $h_{1}:$ [297], [296] \\ $h_{3}:$ [268] \item[303] {\rm Sq(2)[299] + Sq(2)[298]} \\ $h_{1}:$ [299], [298] \\ $h_{2}:$ [288] \\ $h_{3}:$ [272], [269], [267] \item[304] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{3}:$ [270], [269] \item[305] {\rm Sq(1)[308] + Sq(1)[305]} \\ $h_{0}:$ [308], [305] \\ $h_{2}:$ [289], [288] \\ $h_{3}:$ [274], [273] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[16/181] \mb{16/181} \begin{gl} \item[303] {\rm Sq(3)[300] + Sq(0,1)[300]} \item[304] {\rm Sq(3)[301] + Sq(0,1)[300]} \item[305] {\rm Sq(3)[303] + Sq(0,1)[303] + Sq(3)[302] + Sq(0,1)[302] + Sq(0,1)[300] + Sq(0,1)[299]} \\ $h_{7}:$ [14] \item[306] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{3}:$ [278] \item[307] {\rm Sq(1)[312] + Sq(1)[308]} \\ $h_{0}:$ [312], [308] \\ $h_{2}:$ [298], [295], [294] \\ $h_{3}:$ [278] \\ $h_{7}:$ [14] \item[308] {\rm Sq(1)[314] + Sq(1)[313] + Sq(1)[308] + Sq(1)[307]} \\ $h_{0}:$ [314], [313], [308], [307] \\ $h_{3}:$ [280], [278] \\ $h_{7}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[15/181] \mb{15/181} \begin{gl} \item[307] {\rm Sq(3)[312] + Sq(0,1)[312]} \\ $h_{2}:$ [310] \item[308] {\rm Sq(3)[313] + Sq(0,1)[313]} \\ $h_{2}:$ [310] \\ $h_{3}:$ [300], [297] \item[309] {\rm Sq(3)[314] + Sq(0,1)[314]} \item[310] {\rm Sq(2)[316] + Sq(2)[315]} \\ $h_{1}:$ [316], [315] \item[311] {\rm Sq(2)[318] + Sq(2)[315]} \\ $h_{1}:$ [318], [315] \item[312] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [300], [297] \item[313] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{1}:$ [315] \\ $h_{2}:$ [311] \item[314] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \\ $h_{1}:$ [315] \\ $h_{2}:$ [311] \\ $h_{3}:$ [300], [296] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[14/181] \mb{14/181} \begin{gl} \item[320] {\rm Sq(0,1)[320]} \item[321] {\rm Sq(3)[322] + Sq(0,1)[322] + Sq(3)[320]} \\ $h_{5}:$ [213], [212] \item[322] {\rm Sq(1)[325]} \\ $h_{0}:$ [325] \item[323] {\rm Sq(1)[327]} \\ $h_{0}:$ [327] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[13/181] \mb{13/181} \begin{gl} \item[325] {\rm Sq(1,1)[324]} \item[326] {\rm Sq(3)[326] + Sq(0,1)[326] + Sq(0,1)[325]} \\ $h_{7}:$ [17] \item[327] {\rm Sq(1)[332] + Sq(1)[330]} \\ $h_{0}:$ [332], [330] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[12/181] \mb{12/181} \begin{gl} \item[330] {\rm Sq(3)[333] + Sq(0,1)[333]} \item[331] {\rm Sq(2)[334]} \\ $h_{1}:$ [334] \\ $h_{7}:$ [16] \item[332] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[11/181] \mb{11/181} \begin{gl} \item[336] {\rm Sq(7)[319] + Sq(1,2)[319]} \\ $h_{7}:$ [19] \item[337] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{1}:$ [327] \\ $h_{4}:$ [295] \\ $h_{5}:$ [235], [233] \\ $h_{6}:$ [117], [116] \\ $h_{7}:$ [20], [19] \end{gl} \end{bdl} \begin{bdl} \item[10/181] \mb{10/181} \begin{gl} \item[328] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \\ $h_{5}:$ [216] \\ $h_{6}:$ [116] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[9/181] \mb{9/181} \begin{gl} \item[296] {\rm Sq(1,1)[256]} \\ $h_{5}:$ [189] \\ $h_{7}:$ [26] \item[297] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{1}:$ [258] \\ $h_{4}:$ [231] \\ $h_{5}:$ [190], [189] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[8/181] \mb{8/181} \begin{gl} \item[259] {\rm Sq(2)[224]} \\ $h_{1}:$ [224] \\ $h_{3}:$ [214] \\ $h_{5}:$ [166] \item[260] {\rm Sq(1)[225]} \\ $h_{0}:$ [225] \end{gl} \end{bdl} \begin{bdl} \item[7/181] \mb{7/181} \begin{gl} \item[225] {\rm Sq(1,1)[184]} \item[226] {\rm Sq(3)[185] + Sq(0,1)[185]} \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[6/181] \mb{6/181} \begin{gl} \item[187] {\rm Sq(3)[135] + Sq(0,1)[135]} \end{gl} \end{bdl} \dm{182} \begin{bdl} \item[90/182] \mb{90/182} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[89/182] \mb{89/182} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[88/182] \mb{88/182} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[81/182] \mb{81/182} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \\ $h_{3}:$ [11], [10] \end{gl} \end{bdl} \begin{bdl} \item[80/182] \mb{80/182} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \\ $h_{3}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[79/182] \mb{79/182} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{3}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[78/182] \mb{78/182} \begin{gl} \item[16] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[77/182] \mb{77/182} \begin{gl} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[76/182] \mb{76/182} \begin{gl} \item[17] {\rm Sq(0,1)[14]} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[75/182] \mb{75/182} \begin{gl} \item[16] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[74/182] \mb{74/182} \begin{gl} \item[20] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[73/182] \mb{73/182} \begin{gl} \item[24] {\rm Sq(1,1)[24]} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[72/182] \mb{72/182} \begin{gl} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[71/182] \mb{71/182} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[70/182] \mb{70/182} \begin{gl} \item[27] {\rm Sq(0,1)[29]} \item[28] {\rm Sq(0,1)[30]} \item[29] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[67/182] \mb{67/182} \begin{gl} \item[40] {\rm Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[65/182] \mb{65/182} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44], [43] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[64/182] \mb{64/182} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[63/182] \mb{63/182} \begin{gl} \item[47] {\rm Sq(0,1)[49]} \item[48] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[62/182] \mb{62/182} \begin{gl} \item[53] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[61/182] \mb{61/182} \begin{gl} \item[54] {\rm Sq(0,1)[51]} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[60/182] \mb{60/182} \begin{gl} \item[54] {\rm Sq(0,1)[57]} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[59/182] \mb{59/182} \begin{gl} \item[61] {\rm Sq(3)[66]} \item[62] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[58/182] \mb{58/182} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[57/182] \mb{57/182} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[56/182] \mb{56/182} \begin{gl} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[55/182] \mb{55/182} \begin{gl} \item[76] {\rm Sq(0,1)[78]} \item[77] {\rm Sq(0,1)[79]} \item[78] {\rm Sq(0,1)[80]} \item[79] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[54/182] \mb{54/182} \begin{gl} \item[81] {\rm Sq(1,1)[81]} \item[82] {\rm Sq(0,1)[82]} \item[83] {\rm Sq(2)[85]} \\ $h_{1}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[52/182] \mb{52/182} \begin{gl} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(0,1)[95]} \item[94] {\rm Sq(0,1)[96]} \end{gl} \end{bdl} \begin{bdl} \item[51/182] \mb{51/182} \begin{gl} \item[102] {\rm Sq(0,1)[100]} \item[103] {\rm Sq(0,1)[101]} \end{gl} \end{bdl} \begin{bdl} \item[49/182] \mb{49/182} \begin{gl} \item[106] {\rm Sq(0,1)[100]} \item[107] {\rm Sq(0,1)[101]} \item[108] {\rm Sq(0,1)[102]} \item[109] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [105] \\ $h_{2}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[48/182] \mb{48/182} \begin{gl} \item[107] {\rm Sq(0,1)[106]} \item[108] {\rm Sq(0,1)[107]} \item[109] {\rm Sq(0,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[46/182] \mb{46/182} \begin{gl} \item[119] {\rm Sq(0,1)[118]} \item[120] {\rm Sq(0,1)[119]} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(2)[122] + Sq(2)[121]} \\ $h_{1}:$ [122], [121] \end{gl} \end{bdl} \begin{bdl} \item[45/182] \mb{45/182} \begin{gl} \item[123] {\rm Sq(0,1)[125]} \item[124] {\rm Sq(0,1)[126]} \item[125] {\rm Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[44/182] \mb{44/182} \begin{gl} \item[131] {\rm Sq(0,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[43/182] \mb{43/182} \begin{gl} \item[145] {\rm Sq(0,1)[148]} \item[146] {\rm Sq(0,1)[149]} \item[147] {\rm Sq(0,1)[150]} \end{gl} \end{bdl} \begin{bdl} \item[42/182] \mb{42/182} \begin{gl} \item[154] {\rm Sq(0,1)[149]} \item[155] {\rm Sq(0,1)[150]} \item[156] {\rm Sq(0,1)[151]} \item[157] {\rm Sq(1)[159] + Sq(1)[158]} \\ $h_{0}:$ [159], [158] \\ $h_{3}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[41/182] \mb{41/182} \begin{gl} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(1)[160] + Sq(1)[159]} \\ $h_{0}:$ [160], [159] \\ $h_{1}:$ [158] \item[158] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{1}:$ [154] \item[159] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \\ $h_{1}:$ [154] \\ $h_{3}:$ [138] \end{gl} \end{bdl} \begin{bdl} \item[40/182] \mb{40/182} \begin{gl} \item[159] {\rm Sq(0,1)[162]} \item[160] {\rm Sq(0,1)[163]} \item[161] {\rm Sq(0,1)[164]} \item[162] {\rm Sq(0,1)[165]} \item[163] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \item[164] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{3}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[39/182] \mb{39/182} \begin{gl} \item[167] {\rm Sq(1,1)[168]} \item[168] {\rm Sq(0,1)[170]} \item[169] {\rm Sq(0,1)[171]} \item[170] {\rm Sq(0,1)[172]} \item[171] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{3}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[38/182] \mb{38/182} \begin{gl} \item[177] {\rm Sq(0,1)[177]} \item[178] {\rm Sq(2)[183]} \\ $h_{1}:$ [183] \item[179] {\rm Sq(1)[188] + Sq(1)[187] + Sq(1)[186] + Sq(1)[184]} \\ $h_{0}:$ [188], [187], [186], [184] \item[180] {\rm Sq(1)[189] + Sq(1)[186]} \\ $h_{0}:$ [189], [186] \\ $h_{2}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[37/182] \mb{37/182} \begin{gl} \item[184] {\rm Sq(0,1)[187] + Sq(0,1)[186] + Sq(0,1)[185]} \item[185] {\rm Sq(0,1)[188] + Sq(0,1)[186] + Sq(0,1)[185]} \item[186] {\rm Sq(3)[189] + Sq(0,1)[189] + Sq(3)[188] + Sq(3)[187] + Sq(0,1)[185]} \item[187] {\rm Sq(3)[190] + Sq(0,1)[190] + Sq(3)[188] + Sq(0,1)[185]} \item[188] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \item[189] {\rm Sq(1)[194] + Sq(1)[193]} \\ $h_{0}:$ [194], [193] \\ $h_{2}:$ [178] \end{gl} \end{bdl} \begin{bdl} \item[36/182] \mb{36/182} \begin{gl} \item[192] {\rm Sq(2,1)[189]} \item[193] {\rm Sq(0,1)[195]} \item[194] {\rm Sq(0,1)[196]} \item[195] {\rm Sq(0,1)[197]} \item[196] {\rm Sq(3)[200] + Sq(0,1)[200] + Sq(3)[199] + Sq(0,1)[199] + Sq(0,1)[198]} \end{gl} \end{bdl} \begin{bdl} \item[35/182] \mb{35/182} \begin{gl} \item[207] {\rm Sq(0,1)[206]} \end{gl} \end{bdl} \begin{bdl} \item[34/182] \mb{34/182} \begin{gl} \item[215] {\rm Sq(0,1)[213]} \item[216] {\rm Sq(0,1)[214] + Sq(0,1)[212]} \item[217] {\rm Sq(3)[216] + Sq(0,1)[216] + Sq(0,1)[212]} \end{gl} \end{bdl} \begin{bdl} \item[33/182] \mb{33/182} \begin{gl} \item[220] {\rm Sq(0,1)[213] + Sq(0,1)[212]} \item[221] {\rm Sq(3)[213] + Sq(0,1)[211] + Sq(3)[210] + Sq(0,1)[210]} \item[222] {\rm Sq(3)[214] + Sq(0,1)[214] + Sq(0,1)[212] + Sq(0,1)[211] + Sq(0,1)[210]} \item[223] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{1}:$ [218], [217], [216] \\ $h_{2}:$ [208] \\ $h_{3}:$ [194] \item[224] {\rm Sq(1)[224] + Sq(1)[223] + Sq(1)[221]} \\ $h_{0}:$ [224], [223], [221] \\ $h_{1}:$ [215] \\ $h_{2}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[32/182] \mb{32/182} \begin{gl} \item[221] {\rm Sq(1,1)[214]} \item[222] {\rm Sq(0,1)[216]} \item[223] {\rm Sq(0,1)[217] + Sq(3)[216]} \item[224] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \\ $h_{2}:$ [212] \end{gl} \end{bdl} \begin{bdl} \item[31/182] \mb{31/182} \begin{gl} \item[223] {\rm Sq(0,1)[223] + Sq(0,1)[222] + Sq(0,1)[221]} \item[224] {\rm Sq(0,1)[224] + Sq(0,1)[221]} \item[225] {\rm Sq(2)[225]} \\ $h_{1}:$ [225] \item[226] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[30/182] \mb{30/182} \begin{gl} \item[228] {\rm Sq(2,1)[225]} \item[229] {\rm Sq(0,1)[228]} \item[230] {\rm Sq(0,1)[229]} \item[231] {\rm Sq(0,1)[230]} \item[232] {\rm Sq(3)[232] + Sq(0,1)[232] + Sq(3)[231] + Sq(0,1)[231]} \\ $h_{2}:$ [227] \\ $h_{3}:$ [216], [215], [214] \\ $h_{4}:$ [181], [180] \end{gl} \end{bdl} \begin{bdl} \item[29/182] \mb{29/182} \begin{gl} \item[237] {\rm Sq(3)[239] + Sq(0,1)[239]} \item[238] {\rm Sq(1)[248] + Sq(1)[245]} \\ $h_{0}:$ [248], [245] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[28/182] \mb{28/182} \begin{gl} \item[245] {\rm Sq(1,1)[242] + Sq(1,1)[240]} \item[246] {\rm Sq(1,1)[243] + Sq(1,1)[241]} \item[247] {\rm Sq(0,1)[245]} \item[248] {\rm Sq(1)[254] + Sq(1)[251]} \\ $h_{0}:$ [254], [251] \\ $h_{7}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[27/182] \mb{27/182} \begin{gl} \item[251] {\rm Sq(2,1)[243]} \item[252] {\rm Sq(0,1)[249] + Sq(0,1)[248]} \item[253] {\rm Sq(3)[250] + Sq(0,1)[250] + Sq(3)[247] + Sq(0,1)[247]} \item[254] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[26/182] \mb{26/182} \begin{gl} \item[254] {\rm Sq(0,1)[250]} \item[255] {\rm Sq(2)[253]} \\ $h_{1}:$ [253] \\ $h_{7}:$ [4] \item[256] {\rm Sq(2)[255] + Sq(2)[254]} \\ $h_{1}:$ [255], [254] \\ $h_{7}:$ [4] \item[257] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \\ $h_{7}:$ [5] \item[258] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{3}:$ [235], [234] \end{gl} \end{bdl} \begin{bdl} \item[25/182] \mb{25/182} \begin{gl} \item[257] {\rm Sq(2)[257]} \\ $h_{1}:$ [257] \item[258] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{7}:$ [4] \item[259] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{3}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[24/182] \mb{24/182} \begin{gl} \item[260] {\rm Sq(0,2)[248] + Sq(3,1)[247]} \item[261] {\rm Sq(3,1)[251] + Sq(3,1)[250] + Sq(3,1)[247] + Sq(0,2)[247]} \item[262] {\rm Sq(1,1)[260] + Sq(1,1)[259] + Sq(1,1)[255]} \\ $h_{7}:$ [5] \item[263] {\rm Sq(1)[270] + Sq(1)[268] + Sq(1)[267] + Sq(1)[265]} \\ $h_{0}:$ [270], [268], [267], [265] \\ $h_{3}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[23/182] \mb{23/182} \begin{gl} \item[265] {\rm Sq(1,1)[267]} \item[266] {\rm Sq(2)[276]} \\ $h_{1}:$ [276] \\ $h_{4}:$ [221] \item[267] {\rm Sq(1)[279]} \\ $h_{0}:$ [279] \\ $h_{2}:$ [267] \item[268] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{2}:$ [267] \\ $h_{3}:$ [250] \item[269] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \\ $h_{2}:$ [269], [267], [266] \\ $h_{7}:$ [8] \item[270] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{3}:$ [250] \end{gl} \end{bdl} \begin{bdl} \item[22/182] \mb{22/182} \begin{gl} \item[279] {\rm Sq(2,1)[267]} \item[280] {\rm Sq(3)[274] + Sq(0,1)[274]} \\ $h_{3}:$ [253] \item[281] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{2}:$ [270] \\ $h_{7}:$ [10] \item[282] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{3}:$ [253] \item[283] {\rm Sq(1)[287] + Sq(1)[285]} \\ $h_{0}:$ [287], [285] \\ $h_{1}:$ [282], [281] \\ $h_{2}:$ [273], [272], [271] \\ $h_{4}:$ [228], [227], [226], [225], [224] \end{gl} \end{bdl} \begin{bdl} \item[21/182] \mb{21/182} \begin{gl} \item[284] {\rm Sq(0,1)[274]} \\ $h_{7}:$ [9] \item[285] {\rm Sq(3)[275] + Sq(3)[274]} \item[286] {\rm Sq(3)[278] + Sq(0,1)[278]} \item[287] {\rm Sq(1)[283]} \\ $h_{0}:$ [283] \\ $h_{2}:$ [273], [272], [271] \\ $h_{4}:$ [226], [224], [223] \end{gl} \end{bdl} \begin{bdl} \item[20/182] \mb{20/182} \begin{gl} \item[283] {\rm Sq(3)[284] + Sq(0,1)[283] + Sq(0,1)[282] + Sq(3)[281] + Sq(3)[280] + Sq(0,1)[279]} \\ $h_{2}:$ [278], [277], [276] \\ $h_{4}:$ [230] \item[284] {\rm Sq(2)[289]} \\ $h_{1}:$ [289] \\ $h_{2}:$ [278], [277], [276] \\ $h_{4}:$ [230] \item[285] {\rm Sq(2)[290]} \\ $h_{1}:$ [290] \item[286] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \\ $h_{2}:$ [278], [277], [276] \\ $h_{3}:$ [263] \\ $h_{4}:$ [230] \item[287] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \\ $h_{2}:$ [276] \\ $h_{3}:$ [264], [262] \end{gl} \end{bdl} \begin{bdl} \item[19/182] \mb{19/182} \begin{gl} \item[293] {\rm Sq(3)[292] + Sq(0,1)[292] + Sq(0,1)[291] + Sq(0,1)[290]} \\ $h_{3}:$ [269], [268] \item[294] {\rm Sq(0,1)[293] + Sq(3)[291] + Sq(0,1)[290]} \\ $h_{3}:$ [270], [268] \item[295] {\rm Sq(1)[304] + Sq(1)[303]} \\ $h_{0}:$ [304], [303] \\ $h_{1}:$ [298], [296] \\ $h_{2}:$ [287] \\ $h_{4}:$ [241] \end{gl} \end{bdl} \begin{bdl} \item[18/182] \mb{18/182} \begin{gl} \item[303] {\rm Sq(3)[297] + Sq(3)[296] + Sq(0,1)[296] + Sq(3)[295] + Sq(0,1)[295] + Sq(0,1)[294]} \\ $h_{4}:$ [243] \\ $h_{7}:$ [18] \item[304] {\rm Sq(3)[299] + Sq(0,1)[299] + Sq(3)[296] + Sq(3)[295] + Sq(0,1)[295] + Sq(0,1)[294]} \\ $h_{7}:$ [18] \item[305] {\rm Sq(2)[301]} \\ $h_{1}:$ [301] \\ $h_{4}:$ [243] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[17/182] \mb{17/182} \begin{gl} \item[306] {\rm Sq(0,1)[297] + Sq(0,1)[296]} \item[307] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{3}:$ [279], [278], [277], [275] \item[308] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \\ $h_{2}:$ [294] \\ $h_{3}:$ [279], [278], [275] \item[309] {\rm Sq(1)[311]} \\ $h_{0}:$ [311] \\ $h_{2}:$ [294] \\ $h_{3}:$ [277] \item[310] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \\ $h_{1}:$ [303] \\ $h_{2}:$ [294] \\ $h_{3}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[16/182] \mb{16/182} \begin{gl} \item[309] {\rm Sq(0,1)[304]} \\ $h_{3}:$ [282], [281] \item[310] {\rm Sq(3)[304]} \\ $h_{2}:$ [300] \\ $h_{3}:$ [282], [281] \item[311] {\rm Sq(3)[306] + Sq(0,1)[306] + Sq(3)[305] + Sq(0,1)[305]} \\ $h_{2}:$ [300] \item[312] {\rm Sq(2)[310] + Sq(2)[309]} \\ $h_{1}:$ [310], [309] \\ $h_{2}:$ [300] \\ $h_{3}:$ [284], [283], [281] \\ $h_{4}:$ [260] \\ $h_{5}:$ [196], [194] \item[313] {\rm Sq(1)[318] + Sq(1)[316]} \\ $h_{0}:$ [318], [316] \\ $h_{2}:$ [300] \\ $h_{3}:$ [281] \item[314] {\rm Sq(1)[320] + Sq(1)[319] + Sq(1)[316]} \\ $h_{0}:$ [320], [319], [316] \\ $h_{1}:$ [311] \\ $h_{2}:$ [303], [302] \\ $h_{3}:$ [284], [283], [281] \\ $h_{4}:$ [260] \end{gl} \end{bdl} \begin{bdl} \item[15/182] \mb{15/182} \begin{gl} \item[315] {\rm Sq(3)[315] + Sq(0,1)[315]} \item[316] {\rm Sq(3)[316] + Sq(0,1)[316] + Sq(0,1)[315]} \item[317] {\rm Sq(0,1)[317] + Sq(0,1)[316]} \\ $h_{7}:$ [17] \item[318] {\rm Sq(3)[319] + Sq(0,1)[319] + Sq(3)[318] + Sq(0,1)[316]} \item[319] {\rm Sq(1)[325]} \\ $h_{0}:$ [325] \\ $h_{1}:$ [321] \\ $h_{2}:$ [313] \\ $h_{3}:$ [302], [301] \\ $h_{5}:$ [206], [204] \\ $h_{6}:$ [108] \item[320] {\rm Sq(1)[326] + Sq(1)[324]} \\ $h_{0}:$ [326], [324] \\ $h_{1}:$ [321] \\ $h_{2}:$ [314], [313], [312] \\ $h_{3}:$ [302], [301] \\ $h_{5}:$ [206], [204] \\ $h_{6}:$ [108] \item[321] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{1}:$ [321], [320] \\ $h_{2}:$ [313], [312] \\ $h_{3}:$ [302], [301] \\ $h_{5}:$ [206], [204] \\ $h_{6}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[14/182] \mb{14/182} \begin{gl} \item[324] {\rm Sq(6)[317]} \item[325] {\rm Sq(1,1)[320]} \item[326] {\rm Sq(1,1)[322] + Sq(4)[320]} \\ $h_{2}:$ [320] \item[327] {\rm Sq(3)[324] + Sq(0,1)[324] + Sq(3)[323]} \item[328] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \end{gl} \end{bdl} \begin{bdl} \item[13/182] \mb{13/182} \begin{gl} \item[328] {\rm Sq(1,1)[326]} \item[329] {\rm Sq(3)[329] + Sq(0,1)[329]} \item[330] {\rm Sq(2)[331]} \\ $h_{1}:$ [331] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[12/182] \mb{12/182} \begin{gl} \item[333] {\rm Sq(0,1)[334]} \\ $h_{7}:$ [18] \item[334] {\rm Sq(1)[339]} \\ $h_{0}:$ [339] \\ $h_{2}:$ [333] \\ $h_{5}:$ [239] \\ $h_{6}:$ [110], [109] \end{gl} \end{bdl} \begin{bdl} \item[11/182] \mb{11/182} \begin{gl} \item[338] {\rm Sq(2,1)[325]} \item[339] {\rm Sq(3)[326]} \\ $h_{5}:$ [236] \end{gl} \end{bdl} \begin{bdl} \item[8/182] \mb{8/182} \begin{gl} \item[261] {\rm Sq(2)[226] + Sq(2)[225]} \\ $h_{1}:$ [226], [225] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[7/182] \mb{7/182} \begin{gl} \item[227] {\rm Sq(2)[187]} \\ $h_{1}:$ [187] \end{gl} \end{bdl} \dm{183} \begin{bdl} \item[92/183] \mb{92/183} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[91/183] \mb{91/183} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[90/183] \mb{90/183} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[89/183] \mb{89/183} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[88/183] \mb{88/183} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[87/183] \mb{87/183} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[86/183] \mb{86/183} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[85/183] \mb{85/183} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[84/183] \mb{84/183} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[81/183] \mb{81/183} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[78/183] \mb{78/183} \begin{gl} \item[17] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[76/183] \mb{76/183} \begin{gl} \item[19] {\rm Sq(2)[16]} \\ $h_{1}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[75/183] \mb{75/183} \begin{gl} \item[18] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[72/183] \mb{72/183} \begin{gl} \item[27] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[71/183] \mb{71/183} \begin{gl} \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{1}:$ [27] \\ $h_{2}:$ [26] \item[28] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{1}:$ [29], [27] \\ $h_{2}:$ [26] \\ $h_{3}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[70/183] \mb{70/183} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [29] \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[69/183] \mb{69/183} \begin{gl} \item[32] {\rm Sq(1,1)[33]} \item[33] {\rm Sq(0,1)[34]} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[68/183] \mb{68/183} \begin{gl} \item[35] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[67/183] \mb{67/183} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[66/183] \mb{66/183} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[65/183] \mb{65/183} \begin{gl} \item[50] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[63/183] \mb{63/183} \begin{gl} \item[49] {\rm Sq(0,1)[50]} \item[50] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[62/183] \mb{62/183} \begin{gl} \item[54] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[60/183] \mb{60/183} \begin{gl} \item[56] {\rm Sq(0,1)[58]} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[59/183] \mb{59/183} \begin{gl} \item[63] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[57/183] \mb{57/183} \begin{gl} \item[74] {\rm Sq(0,1)[71]} \item[75] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[56/183] \mb{56/183} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[55/183] \mb{55/183} \begin{gl} \item[80] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{1}:$ [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [69] \item[81] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [81] \\ $h_{2}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[54/183] \mb{54/183} \begin{gl} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[53/183] \mb{53/183} \begin{gl} \item[88] {\rm Sq(1,1)[90] + Sq(1,1)[88]} \item[89] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[52/183] \mb{52/183} \begin{gl} \item[95] {\rm Sq(2)[102]} \\ $h_{1}:$ [102] \item[96] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \\ $h_{2}:$ [97] \\ $h_{4}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[51/183] \mb{51/183} \begin{gl} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(0,1)[105]} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \\ $h_{4}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[50/183] \mb{50/183} \begin{gl} \item[109] {\rm Sq(0,1)[102]} \item[110] {\rm Sq(0,1)[103]} \item[111] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[48/183] \mb{48/183} \begin{gl} \item[110] {\rm Sq(0,1)[111]} \item[111] {\rm Sq(0,1)[112]} \item[112] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[47/183] \mb{47/183} \begin{gl} \item[115] {\rm Sq(0,1)[115]} \item[116] {\rm Sq(0,1)[116]} \item[117] {\rm Sq(0,1)[117]} \item[118] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{1}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[46/183] \mb{46/183} \begin{gl} \item[123] {\rm Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[45/183] \mb{45/183} \begin{gl} \item[126] {\rm Sq(0,1)[128]} \item[127] {\rm Sq(0,1)[129]} \item[128] {\rm Sq(0,1)[130]} \end{gl} \end{bdl} \begin{bdl} \item[44/183] \mb{44/183} \begin{gl} \item[132] {\rm Sq(0,1)[141]} \item[133] {\rm Sq(0,1)[142]} \item[134] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[43/183] \mb{43/183} \begin{gl} \item[148] {\rm Sq(0,1)[152]} \end{gl} \end{bdl} \begin{bdl} \item[42/183] \mb{42/183} \begin{gl} \item[158] {\rm Sq(0,1)[152]} \item[159] {\rm Sq(0,1)[153]} \item[160] {\rm Sq(0,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[41/183] \mb{41/183} \begin{gl} \item[160] {\rm Sq(0,1)[155]} \item[161] {\rm Sq(0,1)[156]} \item[162] {\rm Sq(0,1)[157]} \item[163] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{1}:$ [160], [159] \\ $h_{3}:$ [142] \\ $h_{4}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[40/183] \mb{40/183} \begin{gl} \item[165] {\rm Sq(0,1)[166]} \item[166] {\rm Sq(1)[177] + Sq(1)[176]} \\ $h_{0}:$ [177], [176] \\ $h_{3}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[39/183] \mb{39/183} \begin{gl} \item[172] {\rm Sq(0,1)[173]} \item[173] {\rm Sq(0,1)[174]} \item[174] {\rm Sq(0,1)[175]} \item[175] {\rm Sq(0,1)[176]} \item[176] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \\ $h_{1}:$ [178] \item[177] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{1}:$ [178] \\ $h_{3}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[38/183] \mb{38/183} \begin{gl} \item[181] {\rm Sq(0,1)[180]} \item[182] {\rm Sq(0,1)[181]} \item[183] {\rm Sq(0,1)[182]} \item[184] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \item[185] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [159], [158] \end{gl} \end{bdl} \begin{bdl} \item[37/183] \mb{37/183} \begin{gl} \item[190] {\rm Sq(0,1)[191]} \item[191] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \item[192] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \item[193] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{1}:$ [194], [193] \\ $h_{2}:$ [189], [188], [187] \item[194] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \end{gl} \end{bdl} \begin{bdl} \item[36/183] \mb{36/183} \begin{gl} \item[197] {\rm Sq(1,1)[199] + Sq(1,1)[197] + Sq(1,1)[196]} \item[198] {\rm Sq(0,1)[201]} \item[199] {\rm Sq(0,1)[202]} \item[200] {\rm Sq(0,1)[204] + Sq(0,1)[203]} \item[201] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{2}:$ [196], [195] \item[202] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[35/183] \mb{35/183} \begin{gl} \item[208] {\rm Sq(1,1)[209]} \item[209] {\rm Sq(0,1)[210]} \item[210] {\rm Sq(0,1)[211]} \item[211] {\rm Sq(0,1)[212]} \item[212] {\rm Sq(0,1)[213]} \item[213] {\rm Sq(1)[219] + Sq(1)[218]} \\ $h_{0}:$ [219], [218] \\ $h_{2}:$ [207] \end{gl} \end{bdl} \begin{bdl} \item[34/183] \mb{34/183} \begin{gl} \item[218] {\rm Sq(0,1)[217]} \item[219] {\rm Sq(3)[219] + Sq(0,1)[219] + Sq(3)[217]} \end{gl} \end{bdl} \begin{bdl} \item[33/183] \mb{33/183} \begin{gl} \item[225] {\rm Sq(3)[218] + Sq(3)[217] + Sq(0,1)[217] + Sq(3)[216] + Sq(0,1)[216]} \item[226] {\rm Sq(3)[219] + Sq(0,1)[219] + Sq(0,1)[216] + Sq(0,1)[215]} \item[227] {\rm Sq(3)[220] + Sq(0,1)[220] + Sq(0,1)[217] + Sq(0,1)[216] + Sq(0,1)[215]} \end{gl} \end{bdl} \begin{bdl} \item[32/183] \mb{32/183} \begin{gl} \item[225] {\rm Sq(0,1)[218]} \item[226] {\rm Sq(0,1)[219]} \item[227] {\rm Sq(0,1)[220]} \item[228] {\rm Sq(3)[222] + Sq(0,1)[222] + Sq(3)[220] + Sq(3)[219] + Sq(3)[218]} \item[229] {\rm Sq(2)[225]} \\ $h_{1}:$ [225] \end{gl} \end{bdl} \begin{bdl} \item[31/183] \mb{31/183} \begin{gl} \item[227] {\rm Sq(0,1)[226] + Sq(0,1)[225]} \item[228] {\rm Sq(0,1)[227] + Sq(0,1)[225]} \item[229] {\rm Sq(2)[228]} \\ $h_{1}:$ [228] \\ $h_{2}:$ [222] \\ $h_{3}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[30/183] \mb{30/183} \begin{gl} \item[233] {\rm Sq(0,1)[233]} \item[234] {\rm Sq(0,1)[235] + Sq(0,1)[234]} \end{gl} \end{bdl} \begin{bdl} \item[29/183] \mb{29/183} \begin{gl} \item[239] {\rm Sq(1,1)[240]} \item[240] {\rm Sq(0,1)[242]} \item[241] {\rm Sq(0,1)[243]} \item[242] {\rm Sq(3)[244] + Sq(0,1)[244] + Sq(0,1)[241]} \item[243] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \\ $h_{3}:$ [226], [225], [223] \end{gl} \end{bdl} \begin{bdl} \item[28/183] \mb{28/183} \begin{gl} \item[249] {\rm Sq(0,1)[247]} \item[250] {\rm Sq(3)[249] + Sq(0,1)[249]} \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[27/183] \mb{27/183} \begin{gl} \item[255] {\rm Sq(0,1)[251]} \item[256] {\rm Sq(2)[255]} \\ $h_{1}:$ [255] \\ $h_{3}:$ [235] \\ $h_{7}:$ [5] \item[257] {\rm Sq(1)[262] + Sq(1)[261] + Sq(1)[260] + Sq(1)[259]} \\ $h_{0}:$ [262], [261], [260], [259] \\ $h_{1}:$ [256], [254] \\ $h_{2}:$ [250], [247] \\ $h_{3}:$ [236], [235], [234] \\ $h_{6}:$ [71] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[26/183] \mb{26/183} \begin{gl} \item[259] {\rm Sq(1,1)[252]} \item[260] {\rm Sq(0,1)[254]} \item[261] {\rm Sq(3)[256] + Sq(0,1)[256]} \item[262] {\rm Sq(1)[263] + Sq(1)[262] + Sq(1)[260]} \\ $h_{0}:$ [263], [262], [260] \\ $h_{2}:$ [252] \\ $h_{3}:$ [240] \end{gl} \end{bdl} \begin{bdl} \item[25/183] \mb{25/183} \begin{gl} \item[260] {\rm Sq(3)[257]} \item[261] {\rm Sq(3)[259] + Sq(0,1)[259]} \\ $h_{4}:$ [211] \item[262] {\rm Sq(1)[266] + Sq(1)[264]} \\ $h_{0}:$ [266], [264] \\ $h_{3}:$ [243], [240] \\ $h_{4}:$ [211] \item[263] {\rm Sq(1)[267] + Sq(1)[265] + Sq(1)[264]} \\ $h_{0}:$ [267], [265], [264] \\ $h_{2}:$ [253] \\ $h_{3}:$ [243], [242] \\ $h_{4}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[24/183] \mb{24/183} \begin{gl} \item[264] {\rm Sq(2,1)[256]} \item[265] {\rm Sq(0,1)[263]} \item[266] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \\ $h_{3}:$ [245], [242] \item[267] {\rm Sq(1)[274] + Sq(1)[272] + Sq(1)[271]} \\ $h_{0}:$ [274], [272], [271] \\ $h_{3}:$ [245], [244] \end{gl} \end{bdl} \begin{bdl} \item[23/183] \mb{23/183} \begin{gl} \item[271] {\rm Sq(3)[276]} \item[272] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(0,1)[275]} \item[273] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{3}:$ [252] \item[274] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{3}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[22/183] \mb{22/183} \begin{gl} \item[284] {\rm Sq(3)[282] + Sq(3)[281] + Sq(3)[280] + Sq(0,1)[280] + Sq(3)[278] + Sq(0,1)[278]} \item[285] {\rm Sq(2)[286]} \\ $h_{1}:$ [286] \item[286] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \item[287] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \item[288] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{1}:$ [284] \\ $h_{2}:$ [276] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[21/183] \mb{21/183} \begin{gl} \item[288] {\rm Sq(5)[273] + Sq(2,1)[273] + Sq(5)[269] + Sq(2,1)[269] + Sq(5)[268]} \item[289] {\rm Sq(1,1)[278] + Sq(1,1)[275] + Sq(1,1)[274]} \item[290] {\rm Sq(3)[281]} \item[291] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \\ $h_{2}:$ [274] \\ $h_{7}:$ [10] \item[292] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{1}:$ [284], [283] \\ $h_{3}:$ [260], [258], [257] \\ $h_{4}:$ [229], [228], [227] \item[293] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{1}:$ [284], [283] \\ $h_{3}:$ [260], [257] \\ $h_{4}:$ [229], [228] \item[294] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{1}:$ [285], [284], [283] \\ $h_{2}:$ [278] \\ $h_{3}:$ [260], [259], [258] \\ $h_{4}:$ [229], [228] \end{gl} \end{bdl} \begin{bdl} \item[20/183] \mb{20/183} \begin{gl} \item[288] {\rm Sq(1,1)[288] + Sq(1,1)[287] + Sq(1,1)[286] + Sq(1,1)[285] + Sq(1,1)[283] + Sq(1,1)[281] + Sq(1,1)[280] + Sq(1,1)[279]} \\ $h_{7}:$ [9] \item[289] {\rm Sq(3)[289] + Sq(0,1)[289]} \\ $h_{4}:$ [235] \item[290] {\rm Sq(3)[291] + Sq(0,1)[291] + Sq(3)[290] + Sq(0,1)[289]} \\ $h_{4}:$ [235] \item[291] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \\ $h_{2}:$ [285], [279] \\ $h_{4}:$ [235] \end{gl} \end{bdl} \begin{bdl} \item[19/183] \mb{19/183} \begin{gl} \item[296] {\rm Sq(2)[303]} \\ $h_{1}:$ [303] \\ $h_{3}:$ [276], [275] \\ $h_{4}:$ [243] \\ $h_{7}:$ [13] \item[297] {\rm Sq(2)[304]} \\ $h_{1}:$ [304] \\ $h_{7}:$ [13] \item[298] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \\ $h_{2}:$ [291], [290] \item[299] {\rm Sq(1)[307]} \\ $h_{0}:$ [307] \\ $h_{3}:$ [276], [275], [274] \item[300] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \\ $h_{1}:$ [305] \\ $h_{3}:$ [274], [273] \\ $h_{4}:$ [243] \\ $h_{7}:$ [13] \item[301] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{1}:$ [305] \\ $h_{3}:$ [276], [275] \\ $h_{4}:$ [243] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[18/183] \mb{18/183} \begin{gl} \item[306] {\rm Sq(0,1)[301] + Sq(3)[300] + Sq(0,1)[300]} \item[307] {\rm Sq(3)[304] + Sq(0,1)[304] + Sq(3)[301] + Sq(0,1)[300]} \item[308] {\rm Sq(1)[311]} \\ $h_{0}:$ [311] \item[309] {\rm Sq(1)[312]} \\ $h_{0}:$ [312] \end{gl} \end{bdl} \begin{bdl} \item[17/183] \mb{17/183} \begin{gl} \item[311] {\rm Sq(1,1)[299] + Sq(1,1)[298] + Sq(1,1)[297] + Sq(1,1)[296]} \item[312] {\rm Sq(0,1)[303]} \item[313] {\rm Sq(0,1)[305] + Sq(3)[303]} \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[16/183] \mb{16/183} \begin{gl} \item[315] {\rm Sq(3)[312] + Sq(0,1)[312] + Sq(3)[311] + Sq(3)[309] + Sq(0,1)[309] + Sq(3)[308] + Sq(0,1)[308] + Sq(3)[307] + Sq(0,1)[307]} \item[316] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{1}:$ [318] \item[317] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \item[318] {\rm Sq(1)[324]} \\ $h_{0}:$ [324] \\ $h_{1}:$ [318], [316] \\ $h_{3}:$ [290], [288] \end{gl} \end{bdl} \begin{bdl} \item[15/183] \mb{15/183} \begin{gl} \item[322] {\rm Sq(0,1)[320]} \item[323] {\rm Sq(3)[322] + Sq(0,1)[322] + Sq(3)[320]} \item[324] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{3}:$ [304] \item[325] {\rm Sq(1)[331] + Sq(1)[329]} \\ $h_{0}:$ [331], [329] \\ $h_{3}:$ [304] \end{gl} \end{bdl} \begin{bdl} \item[14/183] \mb{14/183} \begin{gl} \item[329] {\rm Sq(1,1)[324] + Sq(1,1)[323]} \item[330] {\rm Sq(0,1)[325]} \item[331] {\rm Sq(3)[325]} \item[332] {\rm Sq(3)[327] + Sq(0,1)[327] + Sq(0,1)[326]} \\ $h_{7}:$ [20] \item[333] {\rm Sq(2)[329] + Sq(2)[328]} \\ $h_{1}:$ [329], [328] \\ $h_{7}:$ [20] \item[334] {\rm Sq(1)[333] + Sq(1)[332]} \\ $h_{0}:$ [333], [332] \\ $h_{1}:$ [330], [328] \\ $h_{2}:$ [324] \\ $h_{7}:$ [21], [20] \end{gl} \end{bdl} \begin{bdl} \item[13/183] \mb{13/183} \begin{gl} \item[331] {\rm Sq(1,1)[327]} \item[332] {\rm Sq(0,1)[330]} \item[333] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \\ $h_{2}:$ [328] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[12/183] \mb{12/183} \begin{gl} \item[335] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{2}:$ [334] \\ $h_{7}:$ [19] \item[336] {\rm Sq(1)[342] + Sq(1)[340]} \\ $h_{0}:$ [342], [340] \\ $h_{1}:$ [339], [338] \\ $h_{2}:$ [335], [334] \\ $h_{3}:$ [329] \\ $h_{4}:$ [307] \\ $h_{5}:$ [242] \\ $h_{6}:$ [115], [113] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[11/183] \mb{11/183} \begin{gl} \item[340] {\rm Sq(1,1)[326]} \\ $h_{7}:$ [22], [21] \item[341] {\rm Sq(1,1)[327]} \\ $h_{7}:$ [22] \item[342] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \\ $h_{2}:$ [326] \\ $h_{5}:$ [240] \\ $h_{6}:$ [122] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[10/183] \mb{10/183} \begin{gl} \item[329] {\rm Sq(1,1)[295]} \\ $h_{5}:$ [218] \\ $h_{6}:$ [118] \item[330] {\rm Sq(3)[296]} \\ $h_{5}:$ [219] \\ $h_{6}:$ [118] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[9/183] \mb{9/183} \begin{gl} \item[298] {\rm Sq(3)[260] + Sq(0,1)[260] + Sq(3)[259]} \\ $h_{2}:$ [258] \\ $h_{5}:$ [191] \\ $h_{6}:$ [110] \end{gl} \end{bdl} \dm{184} \begin{bdl} \item[91/184] \mb{91/184} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[90/184] \mb{90/184} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[85/184] \mb{85/184} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[84/184] \mb{84/184} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[83/184] \mb{83/184} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[82/184] \mb{82/184} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[80/184] \mb{80/184} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[77/184] \mb{77/184} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \\ $h_{1}:$ [19] \\ $h_{2}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[76/184] \mb{76/184} \begin{gl} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{2}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[75/184] \mb{75/184} \begin{gl} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[74/184] \mb{74/184} \begin{gl} \item[21] {\rm Sq(0,1)[24]} \item[22] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[71/184] \mb{71/184} \begin{gl} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[69/184] \mb{69/184} \begin{gl} \item[35] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[68/184] \mb{68/184} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[67/184] \mb{67/184} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[66/184] \mb{66/184} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[65/184] \mb{65/184} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[64/184] \mb{64/184} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[62/184] \mb{62/184} \begin{gl} \item[55] {\rm Sq(0,1)[54]} \item[56] {\rm Sq(0,1)[55]} \end{gl} \end{bdl} \begin{bdl} \item[61/184] \mb{61/184} \begin{gl} \item[57] {\rm Sq(0,1)[54]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{1}:$ [58] \\ $h_{2}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[60/184] \mb{60/184} \begin{gl} \item[59] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[59/184] \mb{59/184} \begin{gl} \item[64] {\rm Sq(0,1)[69]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[58/184] \mb{58/184} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[57/184] \mb{57/184} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[56/184] \mb{56/184} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[55/184] \mb{55/184} \begin{gl} \item[82] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[54/184] \mb{54/184} \begin{gl} \item[88] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{3}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[53/184] \mb{53/184} \begin{gl} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(0,1)[93]} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{1}:$ [95] \item[94] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{3}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[52/184] \mb{52/184} \begin{gl} \item[97] {\rm Sq(0,1)[102]} \item[98] {\rm Sq(0,1)[103]} \item[99] {\rm Sq(1)[109] + Sq(1)[108]} \\ $h_{0}:$ [109], [108] \\ $h_{3}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[51/184] \mb{51/184} \begin{gl} \item[108] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [109] \\ $h_{2}:$ [107] \\ $h_{4}:$ [71] \item[109] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{1}:$ [109] \\ $h_{2}:$ [107] \\ $h_{3}:$ [90] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[50/184] \mb{50/184} \begin{gl} \item[112] {\rm Sq(0,1)[106]} \item[113] {\rm Sq(0,1)[107]} \item[114] {\rm Sq(0,1)[108]} \item[115] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{2}:$ [102] \item[116] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{2}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[49/184] \mb{49/184} \begin{gl} \item[110] {\rm Sq(0,1)[107]} \item[111] {\rm Sq(0,1)[108]} \item[112] {\rm Sq(0,1)[109]} \item[113] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[48/184] \mb{48/184} \begin{gl} \item[113] {\rm Sq(2,1)[110]} \end{gl} \end{bdl} \begin{bdl} \item[47/184] \mb{47/184} \begin{gl} \item[119] {\rm Sq(0,1)[119]} \item[120] {\rm Sq(0,1)[120]} \item[121] {\rm Sq(0,1)[121]} \end{gl} \end{bdl} \begin{bdl} \item[46/184] \mb{46/184} \begin{gl} \item[124] {\rm Sq(0,1)[123]} \item[125] {\rm Sq(0,1)[124]} \item[126] {\rm Sq(0,1)[125]} \end{gl} \end{bdl} \begin{bdl} \item[45/184] \mb{45/184} \begin{gl} \item[129] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[44/184] \mb{44/184} \begin{gl} \item[135] {\rm Sq(0,1)[145]} \item[136] {\rm Sq(0,1)[146]} \item[137] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[43/184] \mb{43/184} \begin{gl} \item[149] {\rm Sq(0,1)[154]} \item[150] {\rm Sq(0,1)[155]} \item[151] {\rm Sq(0,1)[156]} \item[152] {\rm Sq(3)[157] + Sq(0,1)[157]} \end{gl} \end{bdl} \begin{bdl} \item[42/184] \mb{42/184} \begin{gl} \item[161] {\rm Sq(0,1)[156]} \item[162] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{2}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[41/184] \mb{41/184} \begin{gl} \item[164] {\rm Sq(0,1)[160]} \item[165] {\rm Sq(0,1)[161]} \item[166] {\rm Sq(0,1)[162]} \item[167] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{2}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[40/184] \mb{40/184} \begin{gl} \item[167] {\rm Sq(0,1)[167]} \item[168] {\rm Sq(0,1)[168]} \item[169] {\rm Sq(0,1)[169]} \item[170] {\rm Sq(0,1)[170]} \end{gl} \end{bdl} \begin{bdl} \item[39/184] \mb{39/184} \begin{gl} \item[178] {\rm Sq(0,1)[177]} \end{gl} \end{bdl} \begin{bdl} \item[38/184] \mb{38/184} \begin{gl} \item[186] {\rm Sq(0,1)[185] + Sq(0,1)[184]} \item[187] {\rm Sq(0,1)[187] + Sq(0,1)[184]} \item[188] {\rm Sq(3)[188] + Sq(0,1)[188] + Sq(3)[187] + Sq(3)[186] + Sq(3)[184] + Sq(0,1)[184]} \item[189] {\rm Sq(3)[189] + Sq(0,1)[189] + Sq(3)[186] + Sq(0,1)[186] + Sq(0,1)[184]} \item[190] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \item[191] {\rm Sq(1)[199] + Sq(1)[195]} \\ $h_{0}:$ [199], [195] \\ $h_{3}:$ [165], [164] \end{gl} \end{bdl} \begin{bdl} \item[37/184] \mb{37/184} \begin{gl} \item[195] {\rm Sq(0,1)[194] + Sq(3)[192]} \item[196] {\rm Sq(0,1)[195] + Sq(3)[192] + Sq(0,1)[192]} \item[197] {\rm Sq(0,1)[196] + Sq(0,1)[192]} \item[198] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [197] \item[199] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{3}:$ [174], [173] \end{gl} \end{bdl} \begin{bdl} \item[36/184] \mb{36/184} \begin{gl} \item[203] {\rm Sq(1,1)[206] + Sq(1,1)[205] + Sq(1,1)[204] + Sq(1,1)[203] + Sq(1,1)[202] + Sq(1,1)[201]} \item[204] {\rm Sq(0,1)[207]} \item[205] {\rm Sq(1)[218] + Sq(1)[217]} \\ $h_{0}:$ [218], [217] \\ $h_{3}:$ [185], [181] \end{gl} \end{bdl} \begin{bdl} \item[35/184] \mb{35/184} \begin{gl} \item[214] {\rm Sq(0,1)[215]} \item[215] {\rm Sq(0,1)[216]} \item[216] {\rm Sq(0,1)[217]} \item[217] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{1}:$ [219], [218] \\ $h_{2}:$ [212], [211] \\ $h_{3}:$ [194] \item[218] {\rm Sq(1)[226] + Sq(1)[221]} \\ $h_{0}:$ [226], [221] \\ $h_{1}:$ [219], [218] \\ $h_{2}:$ [212], [211] \end{gl} \end{bdl} \begin{bdl} \item[34/184] \mb{34/184} \begin{gl} \item[220] {\rm Sq(1,1)[218]} \item[221] {\rm Sq(1,1)[219]} \item[222] {\rm Sq(0,1)[220]} \item[223] {\rm Sq(0,1)[221]} \item[224] {\rm Sq(0,1)[222]} \item[225] {\rm Sq(2)[227] + Sq(2)[225]} \\ $h_{1}:$ [227], [225] \item[226] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[33/184] \mb{33/184} \begin{gl} \item[228] {\rm Sq(3)[222]} \end{gl} \end{bdl} \begin{bdl} \item[32/184] \mb{32/184} \begin{gl} \item[230] {\rm Sq(0,1)[223]} \item[231] {\rm Sq(0,1)[224]} \item[232] {\rm Sq(3)[225]} \end{gl} \end{bdl} \begin{bdl} \item[31/184] \mb{31/184} \begin{gl} \item[230] {\rm Sq(0,1)[229] + Sq(3)[228]} \item[231] {\rm Sq(0,1)[230] + Sq(3)[228]} \item[232] {\rm Sq(0,1)[231] + Sq(3)[228] + Sq(0,1)[228]} \end{gl} \end{bdl} \begin{bdl} \item[30/184] \mb{30/184} \begin{gl} \item[235] {\rm Sq(1,1)[236] + Sq(1,1)[235]} \item[236] {\rm Sq(3)[238] + Sq(0,1)[238] + Sq(3)[237] + Sq(0,1)[237]} \\ $h_{7}:$ [1] \item[237] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{1}:$ [243], [242], [241], [239] \\ $h_{3}:$ [224], [222], [221] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[29/184] \mb{29/184} \begin{gl} \item[244] {\rm Sq(1,1)[242]} \item[245] {\rm Sq(0,1)[247] + Sq(3)[246] + Sq(0,1)[246]} \item[246] {\rm Sq(2)[250]} \\ $h_{1}:$ [250] \\ $h_{7}:$ [2] \item[247] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \\ $h_{3}:$ [230], [229] \end{gl} \end{bdl} \begin{bdl} \item[28/184] \mb{28/184} \begin{gl} \item[251] {\rm Sq(1,1)[247]} \item[252] {\rm Sq(1,1)[250]} \item[253] {\rm Sq(0,1)[251]} \item[254] {\rm Sq(0,1)[252]} \item[255] {\rm Sq(0,1)[253]} \item[256] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{1}:$ [256], [255] \\ $h_{2}:$ [249] \\ $h_{3}:$ [235], [233] \\ $h_{7}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[27/184] \mb{27/184} \begin{gl} \item[258] {\rm Sq(0,1)[254]} \item[259] {\rm Sq(3)[258] + Sq(0,1)[258]} \item[260] {\rm Sq(1)[264] + Sq(1)[263]} \\ $h_{0}:$ [264], [263] \\ $h_{2}:$ [252], [251] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[26/184] \mb{26/184} \begin{gl} \item[263] {\rm Sq(1,1)[254]} \item[264] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{2}:$ [253] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[25/184] \mb{25/184} \begin{gl} \item[264] {\rm Sq(0,1)[261]} \item[265] {\rm Sq(3)[263] + Sq(0,1)[263] + Sq(0,1)[262]} \\ $h_{7}:$ [5] \item[266] {\rm Sq(1)[268]} \\ $h_{0}:$ [268] \\ $h_{4}:$ [212] \\ $h_{5}:$ [160], [159] \\ $h_{7}:$ [5] \item[267] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{1}:$ [265] \\ $h_{2}:$ [258], [257] \\ $h_{3}:$ [247] \\ $h_{4}:$ [212] \\ $h_{5}:$ [160], [159] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[24/184] \mb{24/184} \begin{gl} \item[268] {\rm Sq(3)[266] + Sq(3)[265]} \\ $h_{4}:$ [215] \\ $h_{5}:$ [168] \item[269] {\rm Sq(3)[270] + Sq(0,1)[270] + Sq(3)[268] + Sq(0,1)[268] + Sq(3)[267] + Sq(0,1)[267] + Sq(3)[265]} \item[270] {\rm Sq(2)[271]} \\ $h_{1}:$ [271] \\ $h_{4}:$ [215] \\ $h_{5}:$ [168] \item[271] {\rm Sq(1)[277] + Sq(1)[275]} \\ $h_{0}:$ [277], [275] \\ $h_{2}:$ [263] \\ $h_{3}:$ [251], [250], [247] \\ $h_{4}:$ [215] \\ $h_{5}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[23/184] \mb{23/184} \begin{gl} \item[275] {\rm Sq(0,1)[279]} \item[276] {\rm Sq(3)[281] + Sq(0,1)[281]} \item[277] {\rm Sq(1)[291] + Sq(1)[289]} \\ $h_{0}:$ [291], [289] \\ $h_{3}:$ [258], [257], [255] \end{gl} \end{bdl} \begin{bdl} \item[22/184] \mb{22/184} \begin{gl} \item[289] {\rm Sq(3)[286]} \item[290] {\rm Sq(2)[288]} \\ $h_{1}:$ [288] \item[291] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \\ $h_{3}:$ [261] \end{gl} \end{bdl} \begin{bdl} \item[21/184] \mb{21/184} \begin{gl} \item[295] {\rm Sq(3,1)[272] + Sq(3,1)[269] + Sq(3,1)[268] + Sq(0,2)[268]} \item[296] {\rm Sq(1)[295] + Sq(1)[294] + Sq(1)[293]} \\ $h_{0}:$ [295], [294], [293] \item[297] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \\ $h_{1}:$ [290] \\ $h_{3}:$ [263] \\ $h_{4}:$ [234], [233] \end{gl} \end{bdl} \begin{bdl} \item[20/184] \mb{20/184} \begin{gl} \item[292] {\rm Sq(5)[287] + Sq(2,1)[287] + Sq(5)[286] + Sq(2,1)[286] + Sq(5)[285] + Sq(2,1)[285] + Sq(2,1)[284] + Sq(5)[283] + Sq(2,1)[283] + Sq(5)[282] + Sq(2,1)[282] + Sq(5)[281] + Sq(2,1)[281]} \item[293] {\rm Sq(3)[294] + Sq(0,1)[294]} \item[294] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{1}:$ [297] \\ $h_{7}:$ [10] \item[295] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{1}:$ [297] \\ $h_{7}:$ [10] \item[296] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{3}:$ [269] \\ $h_{4}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[19/184] \mb{19/184} \begin{gl} \item[302] {\rm Sq(1,1)[300] + Sq(1,1)[295]} \item[303] {\rm Sq(0,1)[304] + Sq(3)[303]} \\ $h_{7}:$ [14] \item[304] {\rm Sq(3)[305] + Sq(3)[304] + Sq(3)[303] + Sq(0,1)[303]} \\ $h_{7}:$ [14] \item[305] {\rm Sq(1)[311] + Sq(1)[310]} \\ $h_{0}:$ [311], [310] \item[306] {\rm Sq(1)[313] + Sq(1)[312]} \\ $h_{0}:$ [313], [312] \\ $h_{1}:$ [306] \\ $h_{2}:$ [295] \end{gl} \end{bdl} \begin{bdl} \item[18/184] \mb{18/184} \begin{gl} \item[310] {\rm Sq(1,1)[301]} \item[311] {\rm Sq(1,1)[304]} \item[312] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{1}:$ [312] \item[313] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{1}:$ [312] \item[314] {\rm Sq(1)[317]} \\ $h_{0}:$ [317] \\ $h_{1}:$ [311] \\ $h_{2}:$ [301] \\ $h_{3}:$ [281] \end{gl} \end{bdl} \begin{bdl} \item[17/184] \mb{17/184} \begin{gl} \item[314] {\rm Sq(3)[310] + Sq(0,1)[310] + Sq(3)[309] + Sq(0,1)[309]} \item[315] {\rm Sq(3)[313] + Sq(0,1)[313]} \item[316] {\rm Sq(2)[315]} \\ $h_{1}:$ [315] \\ $h_{3}:$ [286] \\ $h_{4}:$ [256] \item[317] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \\ $h_{3}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[16/184] \mb{16/184} \begin{gl} \item[319] {\rm Sq(0,1)[317]} \\ $h_{7}:$ [16] \item[320] {\rm Sq(3)[318] + Sq(3)[316]} \item[321] {\rm Sq(2)[323] + Sq(2)[322]} \\ $h_{1}:$ [323], [322] \item[322] {\rm Sq(1)[327] + Sq(1)[326]} \\ $h_{0}:$ [327], [326] \\ $h_{2}:$ [312], [309], [308] \end{gl} \end{bdl} \begin{bdl} \item[15/184] \mb{15/184} \begin{gl} \item[326] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \item[327] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{2}:$ [320] \item[328] {\rm Sq(1)[338] + Sq(1)[337]} \\ $h_{0}:$ [338], [337] \\ $h_{1}:$ [331] \\ $h_{2}:$ [322] \\ $h_{3}:$ [309] \end{gl} \end{bdl} \begin{bdl} \item[14/184] \mb{14/184} \begin{gl} \item[335] {\rm Sq(1,1)[327] + Sq(1,1)[325]} \item[336] {\rm Sq(3)[328]} \item[337] {\rm Sq(1)[334]} \\ $h_{0}:$ [334] \item[338] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{2}:$ [325] \end{gl} \end{bdl} \begin{bdl} \item[13/184] \mb{13/184} \begin{gl} \item[334] {\rm Sq(1,1)[330]} \item[335] {\rm Sq(0,1)[333]} \\ $h_{7}:$ [21] \item[336] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \end{gl} \end{bdl} \begin{bdl} \item[12/184] \mb{12/184} \begin{gl} \item[337] {\rm Sq(3,2)[329] + Sq(0,3)[329]} \item[338] {\rm Sq(3)[339] + Sq(0,1)[339] + Sq(3)[338]} \item[339] {\rm Sq(2)[341]} \\ $h_{1}:$ [341] \\ $h_{2}:$ [336] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[11/184] \mb{11/184} \begin{gl} \item[343] {\rm Sq(1)[331]} \\ $h_{0}:$ [331] \\ $h_{1}:$ [330] \\ $h_{2}:$ [328] \\ $h_{4}:$ [303] \\ $h_{5}:$ [244] \\ $h_{6}:$ [123] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[10/184] \mb{10/184} \begin{gl} \item[331] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{2}:$ [296] \\ $h_{5}:$ [221] \\ $h_{6}:$ [119] \\ $h_{7}:$ [27] \item[332] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{2}:$ [296] \\ $h_{5}:$ [221] \\ $h_{6}:$ [119] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[9/184] \mb{9/184} \begin{gl} \item[299] {\rm Sq(3)[261]} \\ $h_{5}:$ [193] \\ $h_{7}:$ [27] \item[300] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{5}:$ [193] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[8/184] \mb{8/184} \begin{gl} \item[262] {\rm Sq(1,1)[226]} \\ $h_{7}:$ [27] \item[263] {\rm Sq(3)[227]} \\ $h_{2}:$ [225] \\ $h_{6}:$ [101] \end{gl} \end{bdl} \dm{185} \begin{bdl} \item[93/185] \mb{93/185} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[92/185] \mb{92/185} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[91/185] \mb{91/185} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[90/185] \mb{90/185} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[89/185] \mb{89/185} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[88/185] \mb{88/185} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[83/185] \mb{83/185} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[82/185] \mb{82/185} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[79/185] \mb{79/185} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[76/185] \mb{76/185} \begin{gl} \item[21] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[75/185] \mb{75/185} \begin{gl} \item[20] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[74/185] \mb{74/185} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[73/185] \mb{73/185} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[72/185] \mb{72/185} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[71/185] \mb{71/185} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[70/185] \mb{70/185} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \item[33] {\rm Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[67/185] \mb{67/185} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[66/185] \mb{66/185} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[64/185] \mb{64/185} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[63/185] \mb{63/185} \begin{gl} \item[51] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[61/185] \mb{61/185} \begin{gl} \item[59] {\rm Sq(0,1)[56]} \item[60] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[60/185] \mb{60/185} \begin{gl} \item[60] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[59/185] \mb{59/185} \begin{gl} \item[67] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[58/185] \mb{58/185} \begin{gl} \item[73] {\rm Sq(1,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[57/185] \mb{57/185} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[56/185] \mb{56/185} \begin{gl} \item[79] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [79], [76] \end{gl} \end{bdl} \begin{bdl} \item[55/185] \mb{55/185} \begin{gl} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[54/185] \mb{54/185} \begin{gl} \item[89] {\rm Sq(0,1)[88]} \item[90] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[53/185] \mb{53/185} \begin{gl} \item[95] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [97] \\ $h_{3}:$ [82] \\ $h_{4}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[52/185] \mb{52/185} \begin{gl} \item[100] {\rm Sq(0,1)[104]} \item[101] {\rm Sq(0,1)[105]} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{3}:$ [91], [90] \end{gl} \end{bdl} \begin{bdl} \item[51/185] \mb{51/185} \begin{gl} \item[110] {\rm Sq(0,1)[110]} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{3}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[50/185] \mb{50/185} \begin{gl} \item[117] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{3}:$ [94], [93] \end{gl} \end{bdl} \begin{bdl} \item[49/185] \mb{49/185} \begin{gl} \item[114] {\rm Sq(0,1)[110]} \item[115] {\rm Sq(0,1)[111]} \item[116] {\rm Sq(0,1)[112]} \item[117] {\rm Sq(2)[113]} \\ $h_{1}:$ [113] \item[118] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[48/185] \mb{48/185} \begin{gl} \item[114] {\rm Sq(0,1)[115]} \item[115] {\rm Sq(0,1)[116]} \item[116] {\rm Sq(0,1)[117]} \item[117] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[47/185] \mb{47/185} \begin{gl} \item[122] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[46/185] \mb{46/185} \begin{gl} \item[127] {\rm Sq(0,1)[126]} \item[128] {\rm Sq(0,1)[127]} \item[129] {\rm Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[45/185] \mb{45/185} \begin{gl} \item[130] {\rm Sq(0,1)[132]} \item[131] {\rm Sq(0,1)[133]} \item[132] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[44/185] \mb{44/185} \begin{gl} \item[138] {\rm Sq(0,1)[148]} \item[139] {\rm Sq(2)[152]} \\ $h_{1}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[43/185] \mb{43/185} \begin{gl} \item[153] {\rm Sq(0,1)[158]} \item[154] {\rm Sq(0,1)[159]} \item[155] {\rm Sq(0,1)[160]} \end{gl} \end{bdl} \begin{bdl} \item[42/185] \mb{42/185} \begin{gl} \item[163] {\rm Sq(0,1)[160]} \item[164] {\rm Sq(0,1)[161]} \item[165] {\rm Sq(0,1)[162]} \end{gl} \end{bdl} \begin{bdl} \item[41/185] \mb{41/185} \begin{gl} \item[168] {\rm Sq(0,1)[165]} \item[169] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \\ $h_{1}:$ [167] \\ $h_{2}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[40/185] \mb{40/185} \begin{gl} \item[171] {\rm Sq(0,1)[172]} \item[172] {\rm Sq(0,1)[173]} \item[173] {\rm Sq(0,1)[174]} \item[174] {\rm Sq(0,1)[175]} \item[175] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \\ $h_{2}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[39/185] \mb{39/185} \begin{gl} \item[179] {\rm Sq(1,1)[180]} \item[180] {\rm Sq(0,1)[181]} \item[181] {\rm Sq(0,1)[182]} \item[182] {\rm Sq(0,1)[183]} \item[183] {\rm Sq(1)[194] + Sq(1)[193]} \\ $h_{0}:$ [194], [193] \\ $h_{1}:$ [190], [188] \\ $h_{2}:$ [179] \\ $h_{3}:$ [165], [162], [161] \end{gl} \end{bdl} \begin{bdl} \item[38/185] \mb{38/185} \begin{gl} \item[192] {\rm Sq(0,1)[190]} \item[193] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{2}:$ [189], [188], [187], [184] \\ $h_{3}:$ [170] \item[194] {\rm Sq(1)[206] + Sq(1)[204] + Sq(1)[203] + Sq(1)[200]} \\ $h_{0}:$ [206], [204], [203], [200] \\ $h_{2}:$ [189], [186] \\ $h_{3}:$ [170], [169] \end{gl} \end{bdl} \begin{bdl} \item[37/185] \mb{37/185} \begin{gl} \item[200] {\rm Sq(0,1)[197]} \item[201] {\rm Sq(0,1)[198]} \item[202] {\rm Sq(0,1)[200]} \item[203] {\rm Sq(3)[202] + Sq(0,1)[202] + Sq(0,1)[199]} \item[204] {\rm Sq(1)[209] + Sq(1)[208]} \\ $h_{0}:$ [209], [208] \\ $h_{1}:$ [203] \\ $h_{2}:$ [194], [193], [192] \\ $h_{4}:$ [144] \item[205] {\rm Sq(1)[211] + Sq(1)[208]} \\ $h_{0}:$ [211], [208] \\ $h_{2}:$ [194], [193], [192] \\ $h_{3}:$ [177] \item[206] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{1}:$ [203] \\ $h_{2}:$ [192] \\ $h_{3}:$ [177], [176] \\ $h_{4}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[36/185] \mb{36/185} \begin{gl} \item[206] {\rm Sq(0,1)[208]} \item[207] {\rm Sq(0,1)[209]} \item[208] {\rm Sq(0,1)[210]} \item[209] {\rm Sq(0,1)[211]} \item[210] {\rm Sq(0,1)[212]} \item[211] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{3}:$ [191] \item[212] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{3}:$ [191], [189] \end{gl} \end{bdl} \begin{bdl} \item[35/185] \mb{35/185} \begin{gl} \item[219] {\rm Sq(0,1)[218]} \item[220] {\rm Sq(1)[229] + Sq(1)[227]} \\ $h_{0}:$ [229], [227] \\ $h_{1}:$ [225], [224], [223], [222] \item[221] {\rm Sq(1)[231] + Sq(1)[227]} \\ $h_{0}:$ [231], [227] \\ $h_{3}:$ [197], [196] \item[222] {\rm Sq(1)[232] + Sq(1)[230] + Sq(1)[227]} \\ $h_{0}:$ [232], [230], [227] \\ $h_{3}:$ [197], [196] \end{gl} \end{bdl} \begin{bdl} \item[34/185] \mb{34/185} \begin{gl} \item[227] {\rm Sq(1,1)[222] + Sq(1,1)[221] + Sq(1,1)[220]} \item[228] {\rm Sq(0,1)[226]} \item[229] {\rm Sq(0,1)[227] + Sq(0,1)[225]} \item[230] {\rm Sq(3)[227] + Sq(3)[225] + Sq(0,1)[225]} \item[231] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \item[232] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \end{gl} \end{bdl} \begin{bdl} \item[33/185] \mb{33/185} \begin{gl} \item[229] {\rm Sq(0,1)[225]} \item[230] {\rm Sq(0,1)[226]} \item[231] {\rm Sq(0,1)[227]} \item[232] {\rm Sq(0,1)[228]} \item[233] {\rm Sq(3)[228]} \item[234] {\rm Sq(3)[229] + Sq(3)[226] + Sq(3)[225]} \end{gl} \end{bdl} \begin{bdl} \item[32/185] \mb{32/185} \begin{gl} \item[233] {\rm Sq(0,1)[227]} \end{gl} \end{bdl} \begin{bdl} \item[31/185] \mb{31/185} \begin{gl} \item[233] {\rm Sq(1,1)[230] + Sq(1,1)[229] + Sq(1,1)[228]} \item[234] {\rm Sq(0,1)[233]} \item[235] {\rm Sq(0,1)[234]} \item[236] {\rm Sq(2)[236]} \\ $h_{1}:$ [236] \\ $h_{7}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[30/185] \mb{30/185} \begin{gl} \item[238] {\rm Sq(0,1)[240]} \item[239] {\rm Sq(0,1)[241]} \item[240] {\rm Sq(0,1)[242]} \end{gl} \end{bdl} \begin{bdl} \item[29/185] \mb{29/185} \begin{gl} \item[248] {\rm Sq(0,1)[249]} \item[249] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{1}:$ [252] \\ $h_{2}:$ [246] \end{gl} \end{bdl} \begin{bdl} \item[28/185] \mb{28/185} \begin{gl} \item[257] {\rm Sq(1,1)[252] + Sq(1,1)[251]} \item[258] {\rm Sq(0,1)[255]} \item[259] {\rm Sq(2)[259]} \\ $h_{1}:$ [259] \item[260] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \end{gl} \end{bdl} \begin{bdl} \item[27/185] \mb{27/185} \begin{gl} \item[261] {\rm Sq(1,1)[258] + Sq(1,1)[254]} \item[262] {\rm Sq(0,1)[260]} \item[263] {\rm Sq(3)[261] + Sq(3)[259]} \end{gl} \end{bdl} \begin{bdl} \item[26/185] \mb{26/185} \begin{gl} \item[265] {\rm Sq(2,1)[255] + Sq(2,1)[254] + Sq(2,1)[253]} \item[266] {\rm Sq(1)[270] + Sq(1)[269] + Sq(1)[268]} \\ $h_{0}:$ [270], [269], [268] \\ $h_{1}:$ [265] \\ $h_{2}:$ [258] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[25/185] \mb{25/185} \begin{gl} \item[268] {\rm Sq(0,1)[265]} \item[269] {\rm Sq(3)[267] + Sq(0,1)[267] + Sq(3)[264]} \item[270] {\rm Sq(1)[272]} \\ $h_{0}:$ [272] \\ $h_{2}:$ [262] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[24/185] \mb{24/185} \begin{gl} \item[272] {\rm Sq(1,1)[270] + Sq(1,1)[269] + Sq(1,1)[268]} \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[23/185] \mb{23/185} \begin{gl} \item[278] {\rm Sq(2)[289]} \\ $h_{1}:$ [289] \\ $h_{3}:$ [263] \item[279] {\rm Sq(2)[290]} \\ $h_{1}:$ [290] \\ $h_{2}:$ [279] \\ $h_{3}:$ [263] \item[280] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{2}:$ [282], [281], [280] \\ $h_{4}:$ [228] \\ $h_{7}:$ [9] \item[281] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \\ $h_{2}:$ [282], [280] \\ $h_{3}:$ [265], [263] \end{gl} \end{bdl} \begin{bdl} \item[22/185] \mb{22/185} \begin{gl} \item[292] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \\ $h_{2}:$ [286], [284] \\ $h_{7}:$ [12] \item[293] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{2}:$ [286] \\ $h_{3}:$ [268], [267], [266] \end{gl} \end{bdl} \begin{bdl} \item[21/185] \mb{21/185} \begin{gl} \item[298] {\rm Sq(0,1)[288]} \\ $h_{7}:$ [11] \item[299] {\rm Sq(3)[290] + Sq(0,1)[290]} \\ $h_{3}:$ [265] \item[300] {\rm Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [299], [298] \\ $h_{1}:$ [292] \\ $h_{2}:$ [283] \\ $h_{3}:$ [266], [265], [264] \\ $h_{4}:$ [236] \item[301] {\rm Sq(1)[302] + Sq(1)[300] + Sq(1)[298]} \\ $h_{0}:$ [302], [300], [298] \\ $h_{2}:$ [283] \\ $h_{3}:$ [266] \\ $h_{4}:$ [236] \end{gl} \end{bdl} \begin{bdl} \item[20/185] \mb{20/185} \begin{gl} \item[297] {\rm Sq(1,1)[293]} \item[298] {\rm Sq(1,1)[294]} \item[299] {\rm Sq(3)[297] + Sq(3)[296]} \\ $h_{4}:$ [238] \item[300] {\rm Sq(3)[301] + Sq(0,1)[301] + Sq(3)[300] + Sq(0,1)[300] + Sq(3)[299] + Sq(0,1)[299]} \\ $h_{3}:$ [273] \item[301] {\rm Sq(2)[304] + Sq(2)[303]} \\ $h_{1}:$ [304], [303] \item[302] {\rm Sq(1)[308] + Sq(1)[307]} \\ $h_{0}:$ [308], [307] \\ $h_{3}:$ [273] \\ $h_{4}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[19/185] \mb{19/185} \begin{gl} \item[307] {\rm Sq(3)[308] + Sq(0,1)[308] + Sq(3)[307] + Sq(0,1)[307] + Sq(0,1)[306]} \item[308] {\rm Sq(3)[309] + Sq(0,1)[309] + Sq(3)[306]} \item[309] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{1}:$ [311], [310] \\ $h_{3}:$ [282] \item[310] {\rm Sq(1)[317] + Sq(1)[316]} \\ $h_{0}:$ [317], [316] \\ $h_{1}:$ [311], [310] \\ $h_{3}:$ [282], [281], [280] \item[311] {\rm Sq(1)[320] + Sq(1)[316]} \\ $h_{0}:$ [320], [316] \\ $h_{3}:$ [282], [280] \end{gl} \end{bdl} \begin{bdl} \item[18/185] \mb{18/185} \begin{gl} \item[315] {\rm Sq(3)[311] + Sq(0,1)[311]} \\ $h_{3}:$ [284] \item[316] {\rm Sq(0,1)[312] + Sq(0,1)[311]} \item[317] {\rm Sq(3)[312]} \\ $h_{3}:$ [284], [283] \item[318] {\rm Sq(0,1)[313]} \\ $h_{3}:$ [283] \\ $h_{7}:$ [19] \item[319] {\rm Sq(2)[315]} \\ $h_{1}:$ [315] \\ $h_{3}:$ [284] \item[320] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \\ $h_{3}:$ [284] \end{gl} \end{bdl} \begin{bdl} \item[17/185] \mb{17/185} \begin{gl} \item[318] {\rm Sq(1,1)[311] + Sq(1,1)[310]} \item[319] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \\ $h_{1}:$ [320] \\ $h_{3}:$ [290] \item[320] {\rm Sq(1)[324]} \\ $h_{0}:$ [324] \\ $h_{1}:$ [320] \\ $h_{2}:$ [311], [310], [309] \\ $h_{3}:$ [290] \\ $h_{5}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[16/185] \mb{16/185} \begin{gl} \item[323] {\rm Sq(1)[331]} \\ $h_{0}:$ [331] \\ $h_{3}:$ [294] \item[324] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \\ $h_{3}:$ [294] \item[325] {\rm Sq(1)[333]} \\ $h_{0}:$ [333] \\ $h_{3}:$ [298], [295], [294] \end{gl} \end{bdl} \begin{bdl} \item[15/185] \mb{15/185} \begin{gl} \item[329] {\rm Sq(5)[322] + Sq(2,1)[322] + Sq(2,1)[320]} \item[330] {\rm Sq(0,1)[329]} \item[331] {\rm Sq(3)[329]} \item[332] {\rm Sq(3)[330] + Sq(0,1)[330]} \item[333] {\rm Sq(3)[331] + Sq(0,1)[330]} \\ $h_{3}:$ [311] \item[334] {\rm Sq(0,1)[332]} \\ $h_{7}:$ [18] \item[335] {\rm Sq(3)[333] + Sq(3)[332] + Sq(0,1)[330]} \\ $h_{2}:$ [326], [325], [324] \\ $h_{3}:$ [310] \item[336] {\rm Sq(1)[340] + Sq(1)[339]} \\ $h_{0}:$ [340], [339] \\ $h_{1}:$ [336], [335] \\ $h_{2}:$ [328], [326], [324] \\ $h_{3}:$ [310] \end{gl} \end{bdl} \begin{bdl} \item[14/185] \mb{14/185} \begin{gl} \item[339] {\rm Sq(3)[333] + Sq(0,1)[333] + Sq(3)[332] + Sq(3)[331]} \\ $h_{4}:$ [292] \item[340] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \\ $h_{2}:$ [328] \\ $h_{4}:$ [292] \end{gl} \end{bdl} \begin{bdl} \item[13/185] \mb{13/185} \begin{gl} \item[337] {\rm Sq(1,1)[334]} \item[338] {\rm Sq(2)[337]} \\ $h_{1}:$ [337] \item[339] {\rm Sq(1)[340]} \\ $h_{0}:$ [340] \item[340] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \end{gl} \end{bdl} \begin{bdl} \item[12/185] \mb{12/185} \begin{gl} \item[340] {\rm Sq(3,1)[335]} \item[341] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \end{gl} \end{bdl} \begin{bdl} \item[11/185] \mb{11/185} \begin{gl} \item[344] {\rm Sq(3)[330]} \end{gl} \end{bdl} \begin{bdl} \item[9/185] \mb{9/185} \begin{gl} \item[301] {\rm Sq(1)[264]} \\ $h_{0}:$ [264] \\ $h_{1}:$ [262] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[8/185] \mb{8/185} \begin{gl} \item[264] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[7/185] \mb{7/185} \begin{gl} \item[228] {\rm Sq(7)[185]} \\ $h_{7}:$ [31] \end{gl} \end{bdl} \dm{186} \begin{bdl} \item[94/186] \mb{94/186} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[89/186] \mb{89/186} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[88/186] \mb{88/186} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[87/186] \mb{87/186} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[86/186] \mb{86/186} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[85/186] \mb{85/186} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[84/186] \mb{84/186} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[81/186] \mb{81/186} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[78/186] \mb{78/186} \begin{gl} \item[18] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[75/186] \mb{75/186} \begin{gl} \item[21] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[72/186] \mb{72/186} \begin{gl} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[71/186] \mb{71/186} \begin{gl} \item[31] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [32] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[70/186] \mb{70/186} \begin{gl} \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34], [32] \end{gl} \end{bdl} \begin{bdl} \item[69/186] \mb{69/186} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \item[38] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[68/186] \mb{68/186} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[67/186] \mb{67/186} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[51]} \\ $h_{0}:$ [53], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[66/186] \mb{66/186} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[65/186] \mb{65/186} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[64/186] \mb{64/186} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[63/186] \mb{63/186} \begin{gl} \item[52] {\rm Sq(0,1)[55]} \item[53] {\rm Sq(0,1)[56]} \item[54] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[62/186] \mb{62/186} \begin{gl} \item[57] {\rm Sq(0,1)[57]} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[61/186] \mb{61/186} \begin{gl} \item[61] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[60/186] \mb{60/186} \begin{gl} \item[61] {\rm Sq(2,1)[61]} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[59/186] \mb{59/186} \begin{gl} \item[68] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[57/186] \mb{57/186} \begin{gl} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[56/186] \mb{56/186} \begin{gl} \item[81] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[55/186] \mb{55/186} \begin{gl} \item[87] {\rm Sq(3)[88] + Sq(0,1)[88]} \item[88] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{1}:$ [89] \\ $h_{2}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[54/186] \mb{54/186} \begin{gl} \item[91] {\rm Sq(0,1)[90]} \item[92] {\rm Sq(0,1)[91]} \item[93] {\rm Sq(0,1)[92]} \item[94] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[53/186] \mb{53/186} \begin{gl} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[52/186] \mb{52/186} \begin{gl} \item[104] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \\ $h_{2}:$ [107] \\ $h_{3}:$ [93] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[51/186] \mb{51/186} \begin{gl} \item[113] {\rm Sq(0,1)[112]} \item[114] {\rm Sq(0,1)[113]} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(1)[122] + Sq(1)[120]} \\ $h_{0}:$ [122], [120] \\ $h_{2}:$ [109] \\ $h_{3}:$ [98] \\ $h_{4}:$ [74] \end{gl} \end{bdl} \begin{bdl} \item[50/186] \mb{50/186} \begin{gl} \item[118] {\rm Sq(0,1)[110]} \item[119] {\rm Sq(0,1)[111]} \item[120] {\rm Sq(0,1)[112]} \item[121] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \item[122] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[49/186] \mb{49/186} \begin{gl} \item[119] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{3}:$ [97] \end{gl} \end{bdl} \begin{bdl} \item[48/186] \mb{48/186} \begin{gl} \item[118] {\rm Sq(0,1)[119]} \item[119] {\rm Sq(0,1)[120]} \item[120] {\rm Sq(0,1)[121]} \item[121] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \end{gl} \end{bdl} \begin{bdl} \item[47/186] \mb{47/186} \begin{gl} \item[123] {\rm Sq(0,1)[124]} \item[124] {\rm Sq(0,1)[125]} \item[125] {\rm Sq(0,1)[126]} \item[126] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[46/186] \mb{46/186} \begin{gl} \item[130] {\rm Sq(0,1)[129]} \item[131] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[45/186] \mb{45/186} \begin{gl} \item[133] {\rm Sq(0,1)[135]} \item[134] {\rm Sq(0,1)[136]} \item[135] {\rm Sq(0,1)[137]} \item[136] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[44/186] \mb{44/186} \begin{gl} \item[140] {\rm Sq(3,1)[144]} \item[141] {\rm Sq(0,1)[149]} \item[142] {\rm Sq(0,1)[150]} \item[143] {\rm Sq(0,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[43/186] \mb{43/186} \begin{gl} \item[156] {\rm Sq(0,1)[161]} \end{gl} \end{bdl} \begin{bdl} \item[42/186] \mb{42/186} \begin{gl} \item[166] {\rm Sq(1,1)[163]} \item[167] {\rm Sq(0,1)[164]} \item[168] {\rm Sq(0,1)[165]} \item[169] {\rm Sq(0,1)[166]} \end{gl} \end{bdl} \begin{bdl} \item[41/186] \mb{41/186} \begin{gl} \item[170] {\rm Sq(0,1)[168]} \item[171] {\rm Sq(0,1)[169]} \item[172] {\rm Sq(0,1)[170]} \end{gl} \end{bdl} \begin{bdl} \item[40/186] \mb{40/186} \begin{gl} \item[176] {\rm Sq(0,1)[178]} \end{gl} \end{bdl} \begin{bdl} \item[39/186] \mb{39/186} \begin{gl} \item[184] {\rm Sq(0,1)[186]} \item[185] {\rm Sq(0,1)[187]} \item[186] {\rm Sq(0,1)[188]} \item[187] {\rm Sq(3)[190] + Sq(0,1)[189] + Sq(3)[188]} \item[188] {\rm Sq(3)[191] + Sq(0,1)[191] + Sq(3)[187]} \end{gl} \end{bdl} \begin{bdl} \item[38/186] \mb{38/186} \begin{gl} \item[195] {\rm Sq(0,1)[195]} \item[196] {\rm Sq(0,1)[196]} \item[197] {\rm Sq(0,1)[197]} \item[198] {\rm Sq(1)[208] + Sq(1)[207]} \\ $h_{0}:$ [208], [207] \\ $h_{2}:$ [192] \end{gl} \end{bdl} \begin{bdl} \item[37/186] \mb{37/186} \begin{gl} \item[207] {\rm Sq(3)[205] + Sq(0,1)[205] + Sq(0,1)[204]} \item[208] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \\ $h_{2}:$ [197] \item[209] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{1}:$ [209], [208] \\ $h_{2}:$ [202], [201] \\ $h_{4}:$ [151] \item[210] {\rm Sq(1)[219] + Sq(1)[217]} \\ $h_{0}:$ [219], [217] \\ $h_{1}:$ [209] \\ $h_{2}:$ [202], [197] \\ $h_{3}:$ [183], [181] \end{gl} \end{bdl} \begin{bdl} \item[36/186] \mb{36/186} \begin{gl} \item[213] {\rm Sq(1,1)[213] + Sq(1,1)[212] + Sq(1,1)[211] + Sq(1,1)[210] + Sq(1,1)[209]} \item[214] {\rm Sq(0,1)[214]} \item[215] {\rm Sq(0,1)[215]} \item[216] {\rm Sq(0,1)[216]} \item[217] {\rm Sq(3)[218] + Sq(0,1)[218] + Sq(3)[217] + Sq(0,1)[217]} \item[218] {\rm Sq(1)[226]} \\ $h_{0}:$ [226] \\ $h_{2}:$ [211], [210] \\ $h_{4}:$ [161] \item[219] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{2}:$ [211] \\ $h_{3}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[35/186] \mb{35/186} \begin{gl} \item[223] {\rm Sq(0,1)[222]} \item[224] {\rm Sq(0,1)[223] + Sq(0,1)[221]} \item[225] {\rm Sq(3)[225] + Sq(3)[224] + Sq(0,1)[224] + Sq(3)[223] + Sq(3)[222] + Sq(0,1)[220]} \item[226] {\rm Sq(3)[226] + Sq(0,1)[226] + Sq(3)[221] + Sq(0,1)[221] + Sq(0,1)[220]} \item[227] {\rm Sq(1)[236] + Sq(1)[234] + Sq(1)[233]} \\ $h_{0}:$ [236], [234], [233] \\ $h_{3}:$ [204] \item[228] {\rm Sq(1)[237] + Sq(1)[234] + Sq(1)[233]} \\ $h_{0}:$ [237], [234], [233] \\ $h_{1}:$ [229], [227] \\ $h_{2}:$ [219], [218] \\ $h_{3}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[34/186] \mb{34/186} \begin{gl} \item[233] {\rm Sq(1,1)[227] + Sq(1,1)[226] + Sq(1,1)[225]} \item[234] {\rm Sq(0,1)[228]} \item[235] {\rm Sq(2)[233] + Sq(2)[232]} \\ $h_{1}:$ [233], [232] \item[236] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{3}:$ [208], [205] \item[237] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{3}:$ [211], [210] \end{gl} \end{bdl} \begin{bdl} \item[33/186] \mb{33/186} \begin{gl} \item[235] {\rm Sq(0,1)[230]} \item[236] {\rm Sq(0,1)[231]} \item[237] {\rm Sq(0,1)[232]} \item[238] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \item[239] {\rm Sq(1)[239]} \\ $h_{0}:$ [239] \\ $h_{3}:$ [209], [208] \end{gl} \end{bdl} \begin{bdl} \item[32/186] \mb{32/186} \begin{gl} \item[234] {\rm Sq(0,1)[230]} \item[235] {\rm Sq(0,1)[231]} \item[236] {\rm Sq(0,1)[232]} \item[237] {\rm Sq(1)[240] + Sq(1)[237]} \\ $h_{0}:$ [240], [237] \item[238] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{1}:$ [236] \\ $h_{7}:$ [1] \item[239] {\rm Sq(1)[242] + Sq(1)[238]} \\ $h_{0}:$ [242], [238] \\ $h_{3}:$ [212] \end{gl} \end{bdl} \begin{bdl} \item[31/186] \mb{31/186} \begin{gl} \item[237] {\rm Sq(2,1)[231] + Sq(5)[228]} \item[238] {\rm Sq(1,1)[234] + Sq(1,1)[233]} \item[239] {\rm Sq(0,1)[235]} \item[240] {\rm Sq(3)[235]} \item[241] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \\ $h_{7}:$ [2] \item[242] {\rm Sq(1)[245] + Sq(1)[241]} \\ $h_{0}:$ [245], [241] \end{gl} \end{bdl} \begin{bdl} \item[30/186] \mb{30/186} \begin{gl} \item[241] {\rm Sq(3,1)[236] + Sq(3,1)[234] + Sq(0,2)[233]} \item[242] {\rm Sq(0,1)[244]} \item[243] {\rm Sq(0,1)[245]} \item[244] {\rm Sq(3)[246] + Sq(3)[245]} \\ $h_{7}:$ [2] \item[245] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \end{gl} \end{bdl} \begin{bdl} \item[29/186] \mb{29/186} \begin{gl} \item[250] {\rm Sq(3)[252] + Sq(0,1)[252] + Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[254] + Sq(0,1)[251]} \item[252] {\rm Sq(0,1)[255] + Sq(0,1)[253]} \item[253] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \end{gl} \end{bdl} \begin{bdl} \item[28/186] \mb{28/186} \begin{gl} \item[261] {\rm Sq(2,1)[253] + Sq(2,1)[251]} \item[262] {\rm Sq(0,1)[258]} \end{gl} \end{bdl} \begin{bdl} \item[27/186] \mb{27/186} \begin{gl} \item[264] {\rm Sq(1,1)[260]} \item[265] {\rm Sq(1)[268] + Sq(1)[267]} \\ $h_{0}:$ [268], [267] \item[266] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{4}:$ [217], [216] \end{gl} \end{bdl} \begin{bdl} \item[26/186] \mb{26/186} \begin{gl} \item[267] {\rm Sq(1,1)[262] + Sq(1,1)[261] + Sq(1,1)[260]} \item[268] {\rm Sq(1,1)[263] + Sq(1,1)[261]} \item[269] {\rm Sq(0,1)[264]} \item[270] {\rm Sq(2)[268]} \\ $h_{1}:$ [268] \item[271] {\rm Sq(1)[272] + Sq(1)[271]} \\ $h_{0}:$ [272], [271] \\ $h_{4}:$ [220], [218] \end{gl} \end{bdl} \begin{bdl} \item[25/186] \mb{25/186} \begin{gl} \item[271] {\rm Sq(1,1)[267] + Sq(1,1)[266]} \item[272] {\rm Sq(1)[275] + Sq(1)[274] + Sq(1)[273]} \\ $h_{0}:$ [275], [274], [273] \\ $h_{4}:$ [222], [219], [218] \end{gl} \end{bdl} \begin{bdl} \item[24/186] \mb{24/186} \begin{gl} \item[273] {\rm Sq(1,1)[274] + Sq(1,1)[273] + Sq(1,1)[272]} \item[274] {\rm Sq(0,1)[275]} \item[275] {\rm Sq(1)[283] + Sq(1)[282]} \\ $h_{0}:$ [283], [282] \\ $h_{4}:$ [225], [223], [222] \end{gl} \end{bdl} \begin{bdl} \item[23/186] \mb{23/186} \begin{gl} \item[282] {\rm Sq(3)[290] + Sq(3)[289]} \item[283] {\rm Sq(1)[298] + Sq(1)[297]} \\ $h_{0}:$ [298], [297] \\ $h_{4}:$ [232] \end{gl} \end{bdl} \begin{bdl} \item[22/186] \mb{22/186} \begin{gl} \item[294] {\rm Sq(1,1)[291] + Sq(4)[289] + Sq(4)[288]} \\ $h_{2}:$ [289], [288] \\ $h_{4}:$ [236] \\ $h_{5}:$ [188] \item[295] {\rm Sq(0,1)[295]} \\ $h_{2}:$ [289], [288] \\ $h_{4}:$ [236] \\ $h_{5}:$ [188] \item[296] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{1}:$ [298] \\ $h_{2}:$ [291], [290], [289] \\ $h_{4}:$ [236] \\ $h_{5}:$ [188] \\ $h_{7}:$ [13] \item[297] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{1}:$ [299] \\ $h_{3}:$ [273], [272] \\ $h_{4}:$ [236] \\ $h_{5}:$ [188] \item[298] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \\ $h_{1}:$ [299] \\ $h_{3}:$ [273], [272] \\ $h_{4}:$ [237], [236] \\ $h_{5}:$ [188] \end{gl} \end{bdl} \begin{bdl} \item[21/186] \mb{21/186} \begin{gl} \item[302] {\rm Sq(2)[300] + Sq(2)[298]} \\ $h_{1}:$ [300], [298] \\ $h_{2}:$ [290], [289] \\ $h_{3}:$ [270] \\ $h_{4}:$ [237] \item[303] {\rm Sq(2)[301] + Sq(2)[297]} \\ $h_{1}:$ [301], [297] \item[304] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{2}:$ [288] \\ $h_{7}:$ [12] \item[305] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{3}:$ [273], [272], [269] \item[306] {\rm Sq(1)[308] + Sq(1)[306]} \\ $h_{0}:$ [308], [306] \\ $h_{3}:$ [273], [272], [269] \end{gl} \end{bdl} \begin{bdl} \item[20/186] \mb{20/186} \begin{gl} \item[303] {\rm Sq(3)[303]} \\ $h_{7}:$ [11] \item[304] {\rm Sq(3)[305] + Sq(0,1)[305]} \\ $h_{3}:$ [278], [277] \item[305] {\rm Sq(2)[308] + Sq(2)[307]} \\ $h_{1}:$ [308], [307] \\ $h_{3}:$ [278], [277] \\ $h_{4}:$ [241], [240] \\ $h_{7}:$ [11] \item[306] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{4}:$ [241], [240] \\ $h_{7}:$ [11] \item[307] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{2}:$ [298] \\ $h_{3}:$ [278], [276] \item[308] {\rm Sq(1)[316] + Sq(1)[312]} \\ $h_{0}:$ [316], [312] \\ $h_{3}:$ [278], [277] \\ $h_{4}:$ [241], [240] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[19/186] \mb{19/186} \begin{gl} \item[312] {\rm Sq(3)[311] + Sq(3)[310] + Sq(0,1)[310]} \item[313] {\rm Sq(2)[319] + Sq(2)[316] + Sq(2)[315]} \\ $h_{1}:$ [319], [316], [315] \\ $h_{3}:$ [287] \\ $h_{4}:$ [249] \item[314] {\rm Sq(1)[321]} \\ $h_{0}:$ [321] \item[315] {\rm Sq(1)[323] + Sq(1)[322]} \\ $h_{0}:$ [323], [322] \\ $h_{2}:$ [306] \item[316] {\rm Sq(1)[324] + Sq(1)[322]} \\ $h_{0}:$ [324], [322] \item[317] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{1}:$ [317], [315] \\ $h_{2}:$ [309], [308], [307], [306] \\ $h_{3}:$ [288] \\ $h_{4}:$ [249] \end{gl} \end{bdl} \begin{bdl} \item[18/186] \mb{18/186} \begin{gl} \item[321] {\rm Sq(0,1)[315]} \item[322] {\rm Sq(3)[315] + Sq(3)[314] + Sq(0,1)[314]} \item[323] {\rm Sq(3)[317] + Sq(0,1)[317] + Sq(0,1)[314]} \item[324] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \item[325] {\rm Sq(1)[325]} \\ $h_{0}:$ [325] \\ $h_{2}:$ [312] \\ $h_{4}:$ [255] \item[326] {\rm Sq(1)[326] + Sq(1)[324] + Sq(1)[321]} \\ $h_{0}:$ [326], [324], [321] \\ $h_{2}:$ [312], [311] \\ $h_{3}:$ [292], [289] \item[327] {\rm Sq(1)[327] + Sq(1)[321]} \\ $h_{0}:$ [327], [321] \\ $h_{1}:$ [318] \\ $h_{2}:$ [312], [311] \\ $h_{3}:$ [292], [290], [289] \end{gl} \end{bdl} \begin{bdl} \item[17/186] \mb{17/186} \begin{gl} \item[321] {\rm Sq(5)[313] + Sq(2,1)[313] + Sq(2,1)[312] + Sq(5)[310] + Sq(5)[309] + Sq(2,1)[309]} \item[322] {\rm Sq(0,1)[319]} \\ $h_{7}:$ [19] \item[323] {\rm Sq(0,1)[320]} \item[324] {\rm Sq(3)[320]} \item[325] {\rm Sq(3)[321]} \\ $h_{4}:$ [260], [259] \item[326] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{3}:$ [294] \item[327] {\rm Sq(1)[327]} \\ $h_{0}:$ [327] \\ $h_{3}:$ [294] \end{gl} \end{bdl} \begin{bdl} \item[16/186] \mb{16/186} \begin{gl} \item[326] {\rm Sq(1,1)[325] + Sq(1,1)[324] + Sq(1,1)[323] + Sq(1,1)[322]} \\ $h_{3}:$ [300] \item[327] {\rm Sq(3)[327] + Sq(0,1)[327] + Sq(3)[326] + Sq(0,1)[326]} \\ $h_{3}:$ [300] \item[328] {\rm Sq(2)[332] + Sq(2)[331] + Sq(2)[330] + Sq(2)[329]} \\ $h_{1}:$ [332], [331], [330], [329] \\ $h_{3}:$ [300] \item[329] {\rm Sq(1)[339] + Sq(1)[338] + Sq(1)[337]} \\ $h_{0}:$ [339], [338], [337] \\ $h_{1}:$ [331], [330], [329] \\ $h_{3}:$ [300] \\ $h_{5}:$ [208] \end{gl} \end{bdl} \begin{bdl} \item[15/186] \mb{15/186} \begin{gl} \item[337] {\rm Sq(3)[338] + Sq(0,1)[338] + Sq(3)[337] + Sq(0,1)[337] + Sq(0,1)[336] + Sq(3)[335]} \item[338] {\rm Sq(1)[344] + Sq(1)[342] + Sq(1)[341]} \\ $h_{0}:$ [344], [342], [341] \\ $h_{3}:$ [312] \item[339] {\rm Sq(1)[346] + Sq(1)[343] + Sq(1)[342]} \\ $h_{0}:$ [346], [343], [342] \\ $h_{3}:$ [312] \item[340] {\rm Sq(1)[348] + Sq(1)[342] + Sq(1)[341]} \\ $h_{0}:$ [348], [342], [341] \\ $h_{3}:$ [314], [312] \end{gl} \end{bdl} \begin{bdl} \item[14/186] \mb{14/186} \begin{gl} \item[341] {\rm Sq(2,1)[329] + Sq(5)[328]} \\ $h_{3}:$ [320] \\ $h_{4}:$ [299], [298] \item[342] {\rm Sq(1,1)[333] + Sq(1,1)[332]} \\ $h_{3}:$ [320] \\ $h_{4}:$ [299], [298] \item[343] {\rm Sq(0,1)[334]} \item[344] {\rm Sq(3)[334]} \item[345] {\rm Sq(0,1)[335]} \\ $h_{3}:$ [320] \\ $h_{4}:$ [299], [298] \\ $h_{7}:$ [22] \item[346] {\rm Sq(3)[336] + Sq(0,1)[336]} \\ $h_{3}:$ [320] \\ $h_{4}:$ [299], [298] \item[347] {\rm Sq(2)[338]} \\ $h_{1}:$ [338] \\ $h_{4}:$ [299], [298] \item[348] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{3}:$ [320] \end{gl} \end{bdl} \begin{bdl} \item[13/186] \mb{13/186} \begin{gl} \item[341] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \item[342] {\rm Sq(1)[344] + Sq(1)[343]} \\ $h_{0}:$ [344], [343] \\ $h_{2}:$ [335] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[12/186] \mb{12/186} \begin{gl} \item[342] {\rm Sq(1,1)[342] + Sq(1,1)[341] + Sq(1,1)[340]} \item[343] {\rm Sq(1)[346] + Sq(1)[345]} \\ $h_{0}:$ [346], [345] \\ $h_{1}:$ [344] \item[344] {\rm Sq(1)[347] + Sq(1)[345]} \\ $h_{0}:$ [347], [345] \\ $h_{1}:$ [344] \\ $h_{2}:$ [341] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[11/186] \mb{11/186} \begin{gl} \item[345] {\rm Sq(7)[327] + Sq(1,2)[327] + Sq(7)[326] + Sq(4,1)[326]} \item[346] {\rm Sq(3,1)[328]} \item[347] {\rm Sq(1,1)[330] + Sq(1,1)[329]} \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[9/186] \mb{9/186} \begin{gl} \item[302] {\rm Sq(3)[263] + Sq(0,1)[263] + Sq(0,1)[262]} \\ $h_{5}:$ [195] \end{gl} \end{bdl} \dm{187} \begin{bdl} \item[95/187] \mb{95/187} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[94/187] \mb{94/187} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[93/187] \mb{93/187} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[85/187] \mb{85/187} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[84/187] \mb{84/187} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[83/187] \mb{83/187} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[80/187] \mb{80/187} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[77/187] \mb{77/187} \begin{gl} \item[22] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[76/187] \mb{76/187} \begin{gl} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{2}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[75/187] \mb{75/187} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[74/187] \mb{74/187} \begin{gl} \item[24] {\rm Sq(0,1)[26]} \item[25] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[71/187] \mb{71/187} \begin{gl} \item[32] {\rm Sq(0,1)[33]} \end{gl} \end{bdl} \begin{bdl} \item[69/187] \mb{69/187} \begin{gl} \item[39] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[68/187] \mb{68/187} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[67/187] \mb{67/187} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43] \\ $h_{4}:$ [29], [28] \end{gl} \end{bdl} \begin{bdl} \item[66/187] \mb{66/187} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [32], [30] \end{gl} \end{bdl} \begin{bdl} \item[65/187] \mb{65/187} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[64/187] \mb{64/187} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[63/187] \mb{63/187} \begin{gl} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[62/187] \mb{62/187} \begin{gl} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(0,1)[60]} \item[61] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[61/187] \mb{61/187} \begin{gl} \item[62] {\rm Sq(0,1)[60]} \item[63] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[64] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[60/187] \mb{60/187} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \item[65] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[59/187] \mb{59/187} \begin{gl} \item[69] {\rm Sq(0,1)[73]} \item[70] {\rm Sq(0,1)[74]} \item[71] {\rm Sq(0,1)[75]} \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[58/187] \mb{58/187} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[56/187] \mb{56/187} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[55/187] \mb{55/187} \begin{gl} \item[89] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[53/187] \mb{53/187} \begin{gl} \item[98] {\rm Sq(0,1)[100]} \item[99] {\rm Sq(0,1)[101]} \item[100] {\rm Sq(0,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[52/187] \mb{52/187} \begin{gl} \item[105] {\rm Sq(0,1)[110]} \item[106] {\rm Sq(0,1)[111]} \end{gl} \end{bdl} \begin{bdl} \item[51/187] \mb{51/187} \begin{gl} \item[117] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{1}:$ [121], [120] \\ $h_{2}:$ [116], [115] \\ $h_{3}:$ [103], [102] \item[118] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{1}:$ [121] \\ $h_{2}:$ [116] \\ $h_{3}:$ [103] \\ $h_{4}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[50/187] \mb{50/187} \begin{gl} \item[123] {\rm Sq(0,1)[114]} \item[124] {\rm Sq(0,1)[115]} \item[125] {\rm Sq(0,1)[116]} \item[126] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{2}:$ [113], [112] \\ $h_{3}:$ [101], [100] \item[127] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [113] \\ $h_{3}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[49/187] \mb{49/187} \begin{gl} \item[120] {\rm Sq(0,1)[114]} \item[121] {\rm Sq(0,1)[115]} \item[122] {\rm Sq(0,1)[116]} \item[123] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \\ $h_{2}:$ [113] \\ $h_{3}:$ [104], [103] \item[124] {\rm Sq(1)[124] + Sq(1)[122]} \\ $h_{0}:$ [124], [122] \\ $h_{2}:$ [113] \\ $h_{3}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[48/187] \mb{48/187} \begin{gl} \item[122] {\rm Sq(0,1)[122]} \item[123] {\rm Sq(1)[130]} \\ $h_{0}:$ [130] \\ $h_{3}:$ [110], [109] \item[124] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{3}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[47/187] \mb{47/187} \begin{gl} \item[127] {\rm Sq(0,1)[127]} \item[128] {\rm Sq(0,1)[128]} \item[129] {\rm Sq(0,1)[129]} \item[130] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \item[131] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[46/187] \mb{46/187} \begin{gl} \item[132] {\rm Sq(0,1)[130]} \item[133] {\rm Sq(0,1)[131]} \item[134] {\rm Sq(0,1)[132]} \item[135] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \item[136] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[45/187] \mb{45/187} \begin{gl} \item[137] {\rm Sq(0,1)[138]} \item[138] {\rm Sq(3)[139]} \item[139] {\rm Sq(2)[140]} \\ $h_{1}:$ [140] \item[140] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[44/187] \mb{44/187} \begin{gl} \item[144] {\rm Sq(0,1)[153]} \item[145] {\rm Sq(0,1)[154]} \item[146] {\rm Sq(0,1)[155]} \item[147] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[43/187] \mb{43/187} \begin{gl} \item[157] {\rm Sq(1,1)[162]} \item[158] {\rm Sq(0,1)[163]} \item[159] {\rm Sq(0,1)[164]} \item[160] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[42/187] \mb{42/187} \begin{gl} \item[170] {\rm Sq(0,1)[168]} \item[171] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[41/187] \mb{41/187} \begin{gl} \item[173] {\rm Sq(0,1)[171]} \item[174] {\rm Sq(0,1)[172]} \item[175] {\rm Sq(0,1)[173]} \item[176] {\rm Sq(0,1)[174]} \item[177] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [167] \end{gl} \end{bdl} \begin{bdl} \item[40/187] \mb{40/187} \begin{gl} \item[177] {\rm Sq(0,1)[179]} \item[178] {\rm Sq(0,1)[180]} \item[179] {\rm Sq(0,1)[181]} \item[180] {\rm Sq(0,1)[182]} \item[181] {\rm Sq(2)[188] + Sq(2)[185]} \\ $h_{1}:$ [188], [185] \end{gl} \end{bdl} \begin{bdl} \item[39/187] \mb{39/187} \begin{gl} \item[189] {\rm Sq(0,1)[192]} \end{gl} \end{bdl} \begin{bdl} \item[38/187] \mb{38/187} \begin{gl} \item[199] {\rm Sq(0,1)[201] + Sq(0,1)[200]} \item[200] {\rm Sq(0,1)[202]} \item[201] {\rm Sq(0,1)[203]} \item[202] {\rm Sq(3)[206] + Sq(0,1)[206] + Sq(3)[204] + Sq(0,1)[204] + Sq(3)[203] + Sq(3)[200]} \end{gl} \end{bdl} \begin{bdl} \item[37/187] \mb{37/187} \begin{gl} \item[211] {\rm Sq(0,1)[208] + Sq(0,1)[206]} \item[212] {\rm Sq(0,1)[209] + Sq(0,1)[207] + Sq(0,1)[206]} \item[213] {\rm Sq(3)[209] + Sq(0,1)[207] + Sq(0,1)[206]} \item[214] {\rm Sq(0,1)[210] + Sq(0,1)[207]} \item[215] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{1}:$ [213] \\ $h_{2}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[36/187] \mb{36/187} \begin{gl} \item[220] {\rm Sq(1,1)[217] + Sq(1,1)[216] + Sq(1,1)[215] + Sq(1,1)[214]} \item[221] {\rm Sq(0,1)[219]} \end{gl} \end{bdl} \begin{bdl} \item[35/187] \mb{35/187} \begin{gl} \item[229] {\rm Sq(0,1)[227]} \item[230] {\rm Sq(0,1)[229] + Sq(0,1)[228]} \item[231] {\rm Sq(3)[232] + Sq(0,1)[232] + Sq(3)[231] + Sq(0,1)[231] + Sq(3)[230]} \item[232] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{1}:$ [235], [233] \\ $h_{2}:$ [220] \\ $h_{3}:$ [207] \item[233] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{1}:$ [234], [233] \\ $h_{2}:$ [226], [221] \\ $h_{3}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[34/187] \mb{34/187} \begin{gl} \item[238] {\rm Sq(0,1)[229]} \item[239] {\rm Sq(0,1)[230]} \item[240] {\rm Sq(0,1)[231]} \item[241] {\rm Sq(3)[234] + Sq(0,1)[234] + Sq(3)[233] + Sq(3)[232] + Sq(0,1)[232]} \item[242] {\rm Sq(1)[243] + Sq(1)[241] + Sq(1)[240]} \\ $h_{0}:$ [243], [241], [240] \\ $h_{2}:$ [228] \\ $h_{3}:$ [216] \end{gl} \end{bdl} \begin{bdl} \item[33/187] \mb{33/187} \begin{gl} \item[240] {\rm Sq(1,1)[231] + Sq(1,1)[230]} \item[241] {\rm Sq(1,1)[232]} \item[242] {\rm Sq(0,1)[233]} \item[243] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{3}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[32/187] \mb{32/187} \begin{gl} \item[240] {\rm Sq(0,1)[234]} \item[241] {\rm Sq(0,1)[235]} \item[242] {\rm Sq(2)[240] + Sq(2)[239]} \\ $h_{1}:$ [240], [239] \item[243] {\rm Sq(1)[246]} \\ $h_{0}:$ [246] \\ $h_{3}:$ [217] \end{gl} \end{bdl} \begin{bdl} \item[31/187] \mb{31/187} \begin{gl} \item[243] {\rm Sq(0,1)[238]} \item[244] {\rm Sq(0,1)[239]} \item[245] {\rm Sq(0,1)[240]} \item[246] {\rm Sq(1)[248] + Sq(1)[246]} \\ $h_{0}:$ [248], [246] \end{gl} \end{bdl} \begin{bdl} \item[30/187] \mb{30/187} \begin{gl} \item[246] {\rm Sq(2,1)[241] + Sq(2,1)[240]} \item[247] {\rm Sq(0,1)[248]} \item[248] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \end{gl} \end{bdl} \begin{bdl} \item[29/187] \mb{29/187} \begin{gl} \item[254] {\rm Sq(0,1)[258] + Sq(0,1)[257]} \item[255] {\rm Sq(3)[259] + Sq(3)[258] + Sq(3)[257]} \item[256] {\rm Sq(3)[260] + Sq(0,1)[260]} \item[257] {\rm Sq(2)[261]} \\ $h_{1}:$ [261] \end{gl} \end{bdl} \begin{bdl} \item[28/187] \mb{28/187} \begin{gl} \item[263] {\rm Sq(2,1)[256]} \item[264] {\rm Sq(1,1)[259]} \item[265] {\rm Sq(0,1)[262]} \item[266] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{3}:$ [246], [244] \\ $h_{4}:$ [214], [213] \\ $h_{5}:$ [157] \\ $h_{6}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[27/187] \mb{27/187} \begin{gl} \item[267] {\rm Sq(0,1)[265]} \item[268] {\rm Sq(1)[272]} \\ $h_{0}:$ [272] \\ $h_{1}:$ [270] \item[269] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \\ $h_{1}:$ [270] \\ $h_{2}:$ [264], [263] \\ $h_{7}:$ [7] \item[270] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{1}:$ [267] \\ $h_{3}:$ [250], [247] \\ $h_{6}:$ [81], [78] \item[271] {\rm Sq(1)[275]} \\ $h_{0}:$ [275] \\ $h_{3}:$ [250], [247] \\ $h_{4}:$ [221] \\ $h_{6}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[26/187] \mb{26/187} \begin{gl} \item[272] {\rm Sq(0,1)[268]} \item[273] {\rm Sq(1)[275] + Sq(1)[274] + Sq(1)[273]} \\ $h_{0}:$ [275], [274], [273] \\ $h_{2}:$ [265] \\ $h_{7}:$ [8] \item[274] {\rm Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [277], [276] \\ $h_{3}:$ [252] \\ $h_{6}:$ [81] \item[275] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{3}:$ [252] \\ $h_{4}:$ [226] \\ $h_{6}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[25/187] \mb{25/187} \begin{gl} \item[273] {\rm Sq(1,1)[268]} \item[274] {\rm Sq(1,1)[271]} \item[275] {\rm Sq(0,1)[272]} \\ $h_{7}:$ [7] \item[276] {\rm Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [277], [276] \item[277] {\rm Sq(1)[279] + Sq(1)[276]} \\ $h_{0}:$ [279], [276] \\ $h_{3}:$ [253] \item[278] {\rm Sq(1)[280] + Sq(1)[278]} \\ $h_{0}:$ [280], [278] \\ $h_{3}:$ [253] \\ $h_{4}:$ [226] \end{gl} \end{bdl} \begin{bdl} \item[24/187] \mb{24/187} \begin{gl} \item[276] {\rm Sq(3,1)[266] + Sq(3,1)[265] + Sq(0,2)[265]} \item[277] {\rm Sq(2,1)[271]} \item[278] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{2}:$ [275] \\ $h_{5}:$ [174] \item[279] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \item[280] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{2}:$ [275] \\ $h_{4}:$ [228] \\ $h_{5}:$ [174] \end{gl} \end{bdl} \begin{bdl} \item[23/187] \mb{23/187} \begin{gl} \item[284] {\rm Sq(1,1)[291] + Sq(1,1)[290] + Sq(1,1)[289]} \item[285] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \item[286] {\rm Sq(1)[303] + Sq(1)[300]} \\ $h_{0}:$ [303], [300] \\ $h_{4}:$ [237], [235] \end{gl} \end{bdl} \begin{bdl} \item[22/187] \mb{22/187} \begin{gl} \item[299] {\rm Sq(5)[291] + Sq(2,1)[291] + Sq(5)[290] + Sq(5)[288]} \item[300] {\rm Sq(1,1)[296] + Sq(1,1)[295]} \item[301] {\rm Sq(0,1)[299]} \\ $h_{3}:$ [274] \item[302] {\rm Sq(3)[301] + Sq(0,1)[301] + Sq(3)[299]} \\ $h_{4}:$ [242], [239] \item[303] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \end{gl} \end{bdl} \begin{bdl} \item[21/187] \mb{21/187} \begin{gl} \item[307] {\rm Sq(2)[304]} \\ $h_{1}:$ [304] \\ $h_{2}:$ [292] \\ $h_{3}:$ [276], [274] \item[308] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{1}:$ [305], [303] \\ $h_{2}:$ [293], [292] \\ $h_{3}:$ [276], [274] \\ $h_{4}:$ [240] \item[309] {\rm Sq(1)[312] + Sq(1)[311]} \\ $h_{0}:$ [312], [311] \end{gl} \end{bdl} \begin{bdl} \item[20/187] \mb{20/187} \begin{gl} \item[309] {\rm Sq(3)[308] + Sq(3)[307]} \item[310] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{3}:$ [281], [280] \\ $h_{4}:$ [248], [247] \item[311] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \\ $h_{2}:$ [305], [304], [303] \\ $h_{3}:$ [287], [285], [283], [279] \\ $h_{4}:$ [248], [246] \item[312] {\rm Sq(1)[324]} \\ $h_{0}:$ [324] \\ $h_{2}:$ [305], [304], [303] \\ $h_{3}:$ [287], [285], [283], [279] \\ $h_{4}:$ [248], [246] \end{gl} \end{bdl} \begin{bdl} \item[19/187] \mb{19/187} \begin{gl} \item[318] {\rm Sq(0,1)[318] + Sq(0,1)[317] + Sq(0,1)[315]} \\ $h_{7}:$ [15] \item[319] {\rm Sq(3)[319] + Sq(3)[315]} \item[320] {\rm Sq(3)[320] + Sq(0,1)[320] + Sq(0,1)[317] + Sq(0,1)[315]} \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [293], [291] \item[321] {\rm Sq(2)[321]} \\ $h_{1}:$ [321] \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [293], [291] \\ $h_{4}:$ [253] \item[322] {\rm Sq(2)[322]} \\ $h_{1}:$ [322] \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [293], [291], [290] \item[323] {\rm Sq(1)[331]} \\ $h_{0}:$ [331] \\ $h_{1}:$ [323] \\ $h_{2}:$ [313], [312], [311], [310] \\ $h_{3}:$ [292], [291] \item[324] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \\ $h_{2}:$ [311], [310] \\ $h_{3}:$ [293], [291] \end{gl} \end{bdl} \begin{bdl} \item[18/187] \mb{18/187} \begin{gl} \item[328] {\rm Sq(3)[320] + Sq(0,1)[320] + Sq(3)[319] + Sq(0,1)[319]} \\ $h_{3}:$ [294] \item[329] {\rm Sq(2)[321]} \\ $h_{1}:$ [321] \\ $h_{3}:$ [297], [295] \\ $h_{4}:$ [257] \item[330] {\rm Sq(2)[323]} \\ $h_{1}:$ [323] \\ $h_{3}:$ [294] \item[331] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{2}:$ [315], [314] \item[332] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \end{gl} \end{bdl} \begin{bdl} \item[17/187] \mb{17/187} \begin{gl} \item[328] {\rm Sq(1,1)[322] + Sq(1,1)[320]} \item[329] {\rm Sq(3)[323] + Sq(0,1)[323]} \item[330] {\rm Sq(3)[324] + Sq(0,1)[324]} \item[331] {\rm Sq(2)[327]} \\ $h_{1}:$ [327] \\ $h_{2}:$ [320] \\ $h_{3}:$ [299], [298], [297], [296] \item[332] {\rm Sq(1)[333]} \\ $h_{0}:$ [333] \item[333] {\rm Sq(1)[334] + Sq(1)[331] + Sq(1)[330]} \\ $h_{0}:$ [334], [331], [330] \\ $h_{1}:$ [328] \\ $h_{2}:$ [320] \\ $h_{3}:$ [301], [299], [297] \\ $h_{4}:$ [262] \item[334] {\rm Sq(1)[335] + Sq(1)[332]} \\ $h_{0}:$ [335], [332] \\ $h_{1}:$ [326] \\ $h_{2}:$ [320] \\ $h_{3}:$ [301], [299], [296] \end{gl} \end{bdl} \begin{bdl} \item[16/187] \mb{16/187} \begin{gl} \item[330] {\rm Sq(5)[323] + Sq(2,1)[323] + Sq(5)[322] + Sq(2,1)[322]} \item[331] {\rm Sq(3)[330] + Sq(0,1)[330]} \\ $h_{3}:$ [304] \\ $h_{4}:$ [273], [272] \item[332] {\rm Sq(3)[331] + Sq(3)[329]} \\ $h_{3}:$ [304] \\ $h_{4}:$ [273], [272] \item[333] {\rm Sq(3)[332] + Sq(0,1)[332]} \item[334] {\rm Sq(0,1)[333] + Sq(3)[329] + Sq(0,1)[329]} \\ $h_{4}:$ [273], [272] \item[335] {\rm Sq(3)[333] + Sq(3)[329]} \\ $h_{4}:$ [273], [272] \item[336] {\rm Sq(0,1)[334] + Sq(0,1)[330] + Sq(0,1)[329]} \\ $h_{7}:$ [17] \item[337] {\rm Sq(3)[335] + Sq(0,1)[335] + Sq(0,1)[332] + Sq(0,1)[330] + Sq(0,1)[329]} \item[338] {\rm Sq(2)[337]} \\ $h_{1}:$ [337] \\ $h_{4}:$ [273], [272] \end{gl} \end{bdl} \begin{bdl} \item[15/187] \mb{15/187} \begin{gl} \item[341] {\rm Sq(2)[344] + Sq(2)[343]} \\ $h_{1}:$ [344], [343] \\ $h_{3}:$ [316] \item[342] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \\ $h_{1}:$ [341] \\ $h_{2}:$ [336], [335] \\ $h_{3}:$ [318], [316], [315] \\ $h_{4}:$ [293], [292] \\ $h_{5}:$ [222], [220] \\ $h_{6}:$ [118] \item[343] {\rm Sq(1)[352] + Sq(1)[351] + Sq(1)[350]} \\ $h_{0}:$ [352], [351], [350] \\ $h_{1}:$ [346], [341] \\ $h_{3}:$ [316] \item[344] {\rm Sq(1)[354] + Sq(1)[351] + Sq(1)[350]} \\ $h_{0}:$ [354], [351], [350] \\ $h_{1}:$ [347], [346], [343], [342], [341] \\ $h_{2}:$ [338], [337], [336] \\ $h_{3}:$ [318], [316] \item[345] {\rm Sq(1)[355] + Sq(1)[353] + Sq(1)[350]} \\ $h_{0}:$ [355], [353], [350] \\ $h_{1}:$ [347], [346], [343], [342] \\ $h_{2}:$ [338], [337], [335] \\ $h_{3}:$ [319], [316], [315] \\ $h_{4}:$ [293], [292] \\ $h_{5}:$ [222], [220] \\ $h_{6}:$ [118] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[14/187] \mb{14/187} \begin{gl} \item[349] {\rm Sq(3)[337]} \item[350] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \item[351] {\rm Sq(1)[346] + Sq(1)[345]} \\ $h_{0}:$ [346], [345] \\ $h_{2}:$ [336], [334] \item[352] {\rm Sq(1)[347]} \\ $h_{0}:$ [347] \\ $h_{2}:$ [336], [334] \item[353] {\rm Sq(1)[348] + Sq(1)[345]} \\ $h_{0}:$ [348], [345] \item[354] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \item[355] {\rm Sq(1)[350] + Sq(1)[345]} \\ $h_{0}:$ [350], [345] \\ $h_{2}:$ [336], [334] \\ $h_{3}:$ [324] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[13/187] \mb{13/187} \begin{gl} \item[343] {\rm Sq(3,1)[333] + Sq(0,2)[333]} \\ $h_{7}:$ [23] \item[344] {\rm Sq(1,1)[337]} \item[345] {\rm Sq(1,1)[338] + Sq(4)[337]} \\ $h_{2}:$ [337] \item[346] {\rm Sq(0,1)[340]} \item[347] {\rm Sq(3)[340]} \\ $h_{2}:$ [337] \item[348] {\rm Sq(3)[341] + Sq(0,1)[341]} \\ $h_{2}:$ [337] \item[349] {\rm Sq(1)[346]} \\ $h_{0}:$ [346] \item[350] {\rm Sq(1)[348] + Sq(1)[347]} \\ $h_{0}:$ [348], [347] \\ $h_{3}:$ [328] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[12/187] \mb{12/187} \begin{gl} \item[345] {\rm Sq(2)[347] + Sq(2)[346]} \\ $h_{1}:$ [347], [346] \\ $h_{3}:$ [334] \\ $h_{7}:$ [22] \item[346] {\rm Sq(1)[348]} \\ $h_{0}:$ [348] \item[347] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \\ $h_{1}:$ [346] \item[348] {\rm Sq(1)[350]} \\ $h_{0}:$ [350] \\ $h_{1}:$ [346] \\ $h_{3}:$ [334] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[11/187] \mb{11/187} \begin{gl} \item[348] {\rm Sq(2,1)[329]} \item[349] {\rm Sq(1,1)[331]} \item[350] {\rm Sq(1)[333]} \\ $h_{0}:$ [333] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[10/187] \mb{10/187} \begin{gl} \item[333] {\rm Sq(1,1)[300] + Sq(1,1)[299]} \\ $h_{7}:$ [29] \item[334] {\rm Sq(2)[302]} \\ $h_{1}:$ [302] \\ $h_{5}:$ [231] \item[335] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{2}:$ [300] \\ $h_{5}:$ [233] \\ $h_{6}:$ [125], [124], [123] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[9/187] \mb{9/187} \begin{gl} \item[303] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{2}:$ [262] \\ $h_{5}:$ [199], [197] \\ $h_{6}:$ [114] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[8/187] \mb{8/187} \begin{gl} \item[265] {\rm Sq(3)[228]} \\ $h_{7}:$ [29] \item[266] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{5}:$ [172] \\ $h_{6}:$ [105], [104] \end{gl} \end{bdl} \begin{bdl} \item[7/187] \mb{7/187} \begin{gl} \item[229] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{5}:$ [146] \\ $h_{6}:$ [94] \end{gl} \end{bdl} \begin{bdl} \item[6/187] \mb{6/187} \begin{gl} \item[188] {\rm Sq(6,1)[135]} \\ $h_{5}:$ [108] \end{gl} \end{bdl} \dm{188} \begin{bdl} \item[90/188] \mb{90/188} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[89/188] \mb{89/188} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[88/188] \mb{88/188} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[82/188] \mb{82/188} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[79/188] \mb{79/188} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[78/188] \mb{78/188} \begin{gl} \item[19] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[77/188] \mb{77/188} \begin{gl} \item[23] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[76/188] \mb{76/188} \begin{gl} \item[23] {\rm Sq(0,1)[21]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[75/188] \mb{75/188} \begin{gl} \item[23] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{1}:$ [24] \\ $h_{2}:$ [23] \item[24] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[74/188] \mb{74/188} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \item[27] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[73/188] \mb{73/188} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \item[30] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[72/188] \mb{72/188} \begin{gl} \item[30] {\rm Sq(3,1)[28] + Sq(3,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[71/188] \mb{71/188} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[70/188] \mb{70/188} \begin{gl} \item[36] {\rm Sq(0,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[67/188] \mb{67/188} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[66/188] \mb{66/188} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[64/188] \mb{64/188} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[63/188] \mb{63/188} \begin{gl} \item[56] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[62/188] \mb{62/188} \begin{gl} \item[62] {\rm Sq(2)[63]} \\ $h_{1}:$ [63] \item[63] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[61/188] \mb{61/188} \begin{gl} \item[65] {\rm Sq(0,1)[62]} \item[66] {\rm Sq(0,1)[63]} \item[67] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[60/188] \mb{60/188} \begin{gl} \item[66] {\rm Sq(0,1)[68]} \item[67] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[59/188] \mb{59/188} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \\ $h_{3}:$ [67] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[58/188] \mb{58/188} \begin{gl} \item[78] {\rm Sq(1,1)[78]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[57/188] \mb{57/188} \begin{gl} \item[81] {\rm Sq(1,1)[80] + Sq(1,1)[79]} \item[82] {\rm Sq(0,1)[81]} \item[83] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [85], [82] \\ $h_{2}:$ [79] \\ $h_{3}:$ [70] \\ $h_{4}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[56/188] \mb{56/188} \begin{gl} \item[86] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [86], [83] \item[87] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{2}:$ [83] \\ $h_{4}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[55/188] \mb{55/188} \begin{gl} \item[90] {\rm Sq(0,1)[91]} \item[91] {\rm Sq(0,1)[92]} \item[92] {\rm Sq(0,1)[93]} \item[93] {\rm Sq(1)[96] + Sq(1)[95]} \\ $h_{0}:$ [96], [95] \\ $h_{2}:$ [89] \item[94] {\rm Sq(1)[98] + Sq(1)[95]} \\ $h_{0}:$ [98], [95] \\ $h_{4}:$ [65] \end{gl} \end{bdl} \begin{bdl} \item[54/188] \mb{54/188} \begin{gl} \item[95] {\rm Sq(1,1)[95]} \item[96] {\rm Sq(0,1)[96]} \item[97] {\rm Sq(0,1)[97]} \item[98] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{4}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[53/188] \mb{53/188} \begin{gl} \item[101] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[52/188] \mb{52/188} \begin{gl} \item[107] {\rm Sq(0,1)[113]} \item[108] {\rm Sq(0,1)[114]} \item[109] {\rm Sq(0,1)[115]} \item[110] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{4}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[51/188] \mb{51/188} \begin{gl} \item[119] {\rm Sq(0,1)[118]} \item[120] {\rm Sq(0,1)[119]} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{4}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[50/188] \mb{50/188} \begin{gl} \item[128] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{4}:$ [85] \end{gl} \end{bdl} \begin{bdl} \item[49/188] \mb{49/188} \begin{gl} \item[125] {\rm Sq(0,1)[118]} \item[126] {\rm Sq(0,1)[119]} \item[127] {\rm Sq(0,1)[120]} \item[128] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{1}:$ [122] \\ $h_{2}:$ [117] \\ $h_{3}:$ [106] \item[129] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[48/188] \mb{48/188} \begin{gl} \item[125] {\rm Sq(0,1)[123]} \item[126] {\rm Sq(0,1)[124]} \item[127] {\rm Sq(0,1)[125]} \item[128] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{2}:$ [122] \\ $h_{3}:$ [114] \item[129] {\rm Sq(1)[134]} \\ $h_{0}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[47/188] \mb{47/188} \begin{gl} \item[132] {\rm Sq(0,1)[130]} \item[133] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{3}:$ [118] \item[134] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[46/188] \mb{46/188} \begin{gl} \item[137] {\rm Sq(0,1)[133]} \item[138] {\rm Sq(0,1)[134]} \item[139] {\rm Sq(0,1)[135]} \item[140] {\rm Sq(2)[139]} \\ $h_{1}:$ [139] \item[141] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [122] \item[142] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[45/188] \mb{45/188} \begin{gl} \item[141] {\rm Sq(0,1)[141]} \item[142] {\rm Sq(0,1)[142]} \item[143] {\rm Sq(0,1)[143]} \item[144] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[44/188] \mb{44/188} \begin{gl} \item[148] {\rm Sq(0,1)[156]} \item[149] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \item[150] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[43/188] \mb{43/188} \begin{gl} \item[161] {\rm Sq(0,1)[166]} \item[162] {\rm Sq(3)[166]} \item[163] {\rm Sq(0,1)[167]} \item[164] {\rm Sq(0,1)[168]} \item[165] {\rm Sq(0,1)[169]} \item[166] {\rm Sq(1)[175]} \\ $h_{0}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[42/188] \mb{42/188} \begin{gl} \item[172] {\rm Sq(0,1)[170]} \item[173] {\rm Sq(0,1)[171]} \item[174] {\rm Sq(0,1)[172]} \item[175] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[41/188] \mb{41/188} \begin{gl} \item[178] {\rm Sq(0,1)[176]} \item[179] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \item[180] {\rm Sq(1)[187]} \\ $h_{0}:$ [187] \\ $h_{1}:$ [177] \\ $h_{2}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[40/188] \mb{40/188} \begin{gl} \item[182] {\rm Sq(3,1)[176] + Sq(3,1)[175] + Sq(3,1)[174]} \item[183] {\rm Sq(0,1)[184]} \item[184] {\rm Sq(0,1)[185]} \item[185] {\rm Sq(0,1)[186]} \item[186] {\rm Sq(0,1)[187]} \item[187] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[39/188] \mb{39/188} \begin{gl} \item[190] {\rm Sq(1,1)[193]} \item[191] {\rm Sq(0,1)[195]} \item[192] {\rm Sq(0,1)[196]} \item[193] {\rm Sq(0,1)[197]} \item[194] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[38/188] \mb{38/188} \begin{gl} \item[203] {\rm Sq(1,1)[206] + Sq(1,1)[202] + Sq(1,1)[200]} \item[204] {\rm Sq(0,1)[207]} \item[205] {\rm Sq(2)[213] + Sq(2)[212]} \\ $h_{1}:$ [213], [212] \end{gl} \end{bdl} \begin{bdl} \item[37/188] \mb{37/188} \begin{gl} \item[216] {\rm Sq(0,1)[215] + Sq(0,1)[214] + Sq(0,1)[213]} \item[217] {\rm Sq(0,1)[216] + Sq(3)[213] + Sq(0,1)[213]} \item[218] {\rm Sq(0,1)[217] + Sq(0,1)[214] + Sq(0,1)[213]} \item[219] {\rm Sq(1)[225]} \\ $h_{0}:$ [225] \\ $h_{1}:$ [220] \\ $h_{2}:$ [209], [208] \\ $h_{4}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[36/188] \mb{36/188} \begin{gl} \item[222] {\rm Sq(1,1)[219]} \item[223] {\rm Sq(0,1)[223]} \item[224] {\rm Sq(0,1)[224]} \item[225] {\rm Sq(0,1)[226]} \item[226] {\rm Sq(3)[226] + Sq(0,1)[225]} \end{gl} \end{bdl} \begin{bdl} \item[35/188] \mb{35/188} \begin{gl} \item[234] {\rm Sq(0,1)[233]} \item[235] {\rm Sq(3)[236] + Sq(0,1)[236]} \end{gl} \end{bdl} \begin{bdl} \item[34/188] \mb{34/188} \begin{gl} \item[243] {\rm Sq(0,1)[236]} \item[244] {\rm Sq(0,1)[237] + Sq(0,1)[235]} \item[245] {\rm Sq(3)[239] + Sq(0,1)[239] + Sq(3)[238] + Sq(0,1)[238] + Sq(0,1)[235]} \end{gl} \end{bdl} \begin{bdl} \item[33/188] \mb{33/188} \begin{gl} \item[244] {\rm Sq(2,1)[231]} \item[245] {\rm Sq(0,1)[234]} \item[246] {\rm Sq(0,1)[236]} \item[247] {\rm Sq(3)[239] + Sq(0,1)[239] + Sq(0,1)[235]} \item[248] {\rm Sq(1)[245]} \\ $h_{0}:$ [245] \\ $h_{1}:$ [242], [240] \end{gl} \end{bdl} \begin{bdl} \item[32/188] \mb{32/188} \begin{gl} \item[244] {\rm Sq(0,1)[238]} \item[245] {\rm Sq(0,1)[239] + Sq(0,1)[237]} \item[246] {\rm Sq(0,1)[240] + Sq(3)[239] + Sq(3)[237]} \end{gl} \end{bdl} \begin{bdl} \item[31/188] \mb{31/188} \begin{gl} \item[247] {\rm Sq(0,1)[243] + Sq(0,1)[242]} \item[248] {\rm Sq(3)[245] + Sq(0,1)[245] + Sq(3)[241]} \end{gl} \end{bdl} \begin{bdl} \item[30/188] \mb{30/188} \begin{gl} \item[249] {\rm Sq(0,1)[250]} \item[250] {\rm Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[252]} \item[252] {\rm Sq(3)[253] + Sq(0,1)[253]} \item[253] {\rm Sq(2)[257]} \\ $h_{1}:$ [257] \item[254] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \end{gl} \end{bdl} \begin{bdl} \item[29/188] \mb{29/188} \begin{gl} \item[258] {\rm Sq(0,1)[262] + Sq(0,1)[261]} \item[259] {\rm Sq(1)[267]} \\ $h_{0}:$ [267] \end{gl} \end{bdl} \begin{bdl} \item[28/188] \mb{28/188} \begin{gl} \item[267] {\rm Sq(1,1)[263]} \item[268] {\rm Sq(0,1)[264]} \item[269] {\rm Sq(1)[276] + Sq(1)[274] + Sq(1)[273] + Sq(1)[272]} \\ $h_{0}:$ [276], [274], [273], [272] \end{gl} \end{bdl} \begin{bdl} \item[27/188] \mb{27/188} \begin{gl} \item[272] {\rm Sq(0,1)[267]} \item[273] {\rm Sq(3)[268] + Sq(0,1)[268] + Sq(3)[267]} \item[274] {\rm Sq(3)[270] + Sq(0,1)[269]} \item[275] {\rm Sq(3)[271] + Sq(0,1)[271] + Sq(0,1)[269]} \item[276] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \item[277] {\rm Sq(1)[279] + Sq(1)[278]} \\ $h_{0}:$ [279], [278] \\ $h_{1}:$ [272] \\ $h_{3}:$ [253], [251] \\ $h_{4}:$ [222] \\ $h_{5}:$ [166] \\ $h_{6}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[26/188] \mb{26/188} \begin{gl} \item[276] {\rm Sq(1,1)[268]} \item[277] {\rm Sq(3)[272] + Sq(0,1)[272] + Sq(3)[271] + Sq(0,1)[271]} \item[278] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{1}:$ [275], [274], [273] \\ $h_{2}:$ [270], [269], [268] \\ $h_{7}:$ [9] \item[279] {\rm Sq(1)[283] + Sq(1)[280]} \\ $h_{0}:$ [283], [280] \\ $h_{1}:$ [275], [274], [273] \\ $h_{2}:$ [270], [269], [268] \\ $h_{3}:$ [256] \\ $h_{5}:$ [168] \\ $h_{6}:$ [87] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[25/188] \mb{25/188} \begin{gl} \item[279] {\rm Sq(5)[271] + Sq(2,1)[271] + Sq(5)[268] + Sq(2,1)[268]} \item[280] {\rm Sq(0,1)[274] + Sq(0,1)[273]} \item[281] {\rm Sq(2)[277] + Sq(2)[276]} \\ $h_{1}:$ [277], [276] \item[282] {\rm Sq(1)[282] + Sq(1)[281]} \\ $h_{0}:$ [282], [281] \\ $h_{2}:$ [272] \\ $h_{7}:$ [8] \item[283] {\rm Sq(1)[283] + Sq(1)[281]} \\ $h_{0}:$ [283], [281] \\ $h_{2}:$ [272] \\ $h_{3}:$ [258], [257] \\ $h_{7}:$ [8] \item[284] {\rm Sq(1)[284] + Sq(1)[281]} \\ $h_{0}:$ [284], [281] \\ $h_{4}:$ [230], [229], [228] \end{gl} \end{bdl} \begin{bdl} \item[24/188] \mb{24/188} \begin{gl} \item[281] {\rm Sq(0,1)[282]} \\ $h_{7}:$ [7] \item[282] {\rm Sq(3)[283] + Sq(0,1)[283] + Sq(3)[282]} \item[283] {\rm Sq(1)[290] + Sq(1)[287]} \\ $h_{0}:$ [290], [287] \\ $h_{3}:$ [263] \item[284] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{4}:$ [230], [229] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[23/188] \mb{23/188} \begin{gl} \item[287] {\rm Sq(1,1)[292]} \item[288] {\rm Sq(2)[299]} \\ $h_{1}:$ [299] \item[289] {\rm Sq(2)[302]} \\ $h_{1}:$ [302] \\ $h_{3}:$ [276] \\ $h_{4}:$ [241] \\ $h_{5}:$ [190] \item[290] {\rm Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [305], [304] \item[291] {\rm Sq(1)[306] + Sq(1)[304]} \\ $h_{0}:$ [306], [304] \end{gl} \end{bdl} \begin{bdl} \item[22/188] \mb{22/188} \begin{gl} \item[304] {\rm Sq(1,1)[299]} \item[305] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \item[306] {\rm Sq(1)[313] + Sq(1)[312]} \\ $h_{0}:$ [313], [312] \end{gl} \end{bdl} \begin{bdl} \item[21/188] \mb{21/188} \begin{gl} \item[310] {\rm Sq(1,1)[299] + Sq(1,1)[298]} \item[311] {\rm Sq(3)[304] + Sq(0,1)[303]} \\ $h_{7}:$ [13] \item[312] {\rm Sq(3)[306] + Sq(0,1)[306] + Sq(3)[305]} \\ $h_{4}:$ [246], [245] \\ $h_{7}:$ [13] \item[313] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \\ $h_{4}:$ [246], [245] \\ $h_{7}:$ [13] \item[314] {\rm Sq(1)[316] + Sq(1)[315]} \\ $h_{0}:$ [316], [315] \\ $h_{2}:$ [302], [300], [298] \\ $h_{4}:$ [248] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[20/188] \mb{20/188} \begin{gl} \item[313] {\rm Sq(3)[316] + Sq(0,1)[316] + Sq(3)[315] + Sq(0,1)[315] + Sq(3)[312] + Sq(0,1)[312]} \item[314] {\rm Sq(2)[321] + Sq(2)[320] + Sq(2)[319]} \\ $h_{1}:$ [321], [320], [319] \\ $h_{2}:$ [308], [307] \\ $h_{3}:$ [289] \\ $h_{4}:$ [253] \item[315] {\rm Sq(1)[328] + Sq(1)[325]} \\ $h_{0}:$ [328], [325] \\ $h_{1}:$ [322], [320] \\ $h_{2}:$ [308] \\ $h_{3}:$ [292], [291], [289] \item[316] {\rm Sq(1)[329] + Sq(1)[325]} \\ $h_{0}:$ [329], [325] \\ $h_{1}:$ [322], [320] \\ $h_{2}:$ [307] \\ $h_{3}:$ [292], [291], [289] \\ $h_{4}:$ [254] \end{gl} \end{bdl} \begin{bdl} \item[19/188] \mb{19/188} \begin{gl} \item[325] {\rm Sq(3)[324] + Sq(0,1)[324] + Sq(3)[323] + Sq(0,1)[323]} \item[326] {\rm Sq(3)[325] + Sq(0,1)[325] + Sq(3)[323] + Sq(0,1)[323] + Sq(3)[322] + Sq(0,1)[322] + Sq(3)[321]} \\ $h_{4}:$ [258], [257] \item[327] {\rm Sq(1)[340] + Sq(1)[334] + Sq(1)[333]} \\ $h_{0}:$ [340], [334], [333] \\ $h_{2}:$ [320], [316], [315] \\ $h_{3}:$ [299], [296] \\ $h_{4}:$ [258], [257] \item[328] {\rm Sq(1)[341] + Sq(1)[333]} \\ $h_{0}:$ [341], [333] \\ $h_{3}:$ [300], [295] \item[329] {\rm Sq(1)[342] + Sq(1)[339] + Sq(1)[334]} \\ $h_{0}:$ [342], [339], [334] \\ $h_{3}:$ [300], [295] \\ $h_{4}:$ [261], [257] \end{gl} \end{bdl} \begin{bdl} \item[18/188] \mb{18/188} \begin{gl} \item[333] {\rm Sq(3)[323] + Sq(3)[321]} \\ $h_{2}:$ [318] \\ $h_{3}:$ [301], [300] \item[334] {\rm Sq(3)[325] + Sq(0,1)[325] + Sq(0,1)[324] + Sq(0,1)[322] + Sq(3)[321]} \\ $h_{2}:$ [318] \\ $h_{3}:$ [301], [300] \\ $h_{7}:$ [20] \item[335] {\rm Sq(3)[326] + Sq(0,1)[326] + Sq(3)[324] + Sq(0,1)[324] + Sq(0,1)[323] + Sq(0,1)[321]} \\ $h_{3}:$ [301] \item[336] {\rm Sq(3)[327] + Sq(0,1)[327] + Sq(0,1)[323] + Sq(3)[321] + Sq(0,1)[321]} \\ $h_{2}:$ [318] \\ $h_{3}:$ [300] \item[337] {\rm Sq(2)[329]} \\ $h_{1}:$ [329] \\ $h_{7}:$ [20] \item[338] {\rm Sq(2)[330]} \\ $h_{1}:$ [330] \\ $h_{2}:$ [318] \\ $h_{3}:$ [301], [300] \\ $h_{4}:$ [261] \\ $h_{7}:$ [20] \item[339] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \\ $h_{2}:$ [318] \\ $h_{3}:$ [304], [301] \\ $h_{4}:$ [262], [261] \item[340] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{2}:$ [318] \\ $h_{3}:$ [300] \\ $h_{7}:$ [20] \item[341] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \\ $h_{2}:$ [318] \\ $h_{3}:$ [300] \item[342] {\rm Sq(1)[339]} \\ $h_{0}:$ [339] \\ $h_{3}:$ [304], [301], [300] \\ $h_{4}:$ [261] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[17/188] \mb{17/188} \begin{gl} \item[335] {\rm Sq(3)[326]} \\ $h_{3}:$ [303] \item[336] {\rm Sq(3)[327] + Sq(0,1)[327]} \item[337] {\rm Sq(3)[328] + Sq(0,1)[327]} \item[338] {\rm Sq(2)[337] + Sq(2)[335] + Sq(2)[334] + Sq(2)[333] + Sq(2)[332] + Sq(2)[331]} \\ $h_{1}:$ [337], [335], [334], [333], [332], [331] \\ $h_{3}:$ [303] \item[339] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{3}:$ [303] \end{gl} \end{bdl} \begin{bdl} \item[16/188] \mb{16/188} \begin{gl} \item[339] {\rm Sq(1,1)[336] + Sq(1,1)[335] + Sq(1,1)[329]} \item[340] {\rm Sq(0,1)[337]} \\ $h_{4}:$ [277] \item[341] {\rm Sq(3)[337]} \item[342] {\rm Sq(3)[340] + Sq(0,1)[340]} \\ $h_{4}:$ [277] \item[343] {\rm Sq(1)[350] + Sq(1)[349] + Sq(1)[348]} \\ $h_{0}:$ [350], [349], [348] \\ $h_{2}:$ [331] \\ $h_{4}:$ [277] \item[344] {\rm Sq(1)[351] + Sq(1)[349] + Sq(1)[348] + Sq(1)[347]} \\ $h_{0}:$ [351], [349], [348], [347] \\ $h_{1}:$ [341] \\ $h_{2}:$ [331], [329] \\ $h_{3}:$ [313], [312], [310], [307] \\ $h_{4}:$ [277] \end{gl} \end{bdl} \begin{bdl} \item[15/188] \mb{15/188} \begin{gl} \item[346] {\rm Sq(3)[344] + Sq(0,1)[344] + Sq(0,1)[343] + Sq(3)[342] + Sq(3)[341] + Sq(0,1)[341]} \\ $h_{3}:$ [320] \item[347] {\rm Sq(0,1)[346] + Sq(3)[343] + Sq(0,1)[343] + Sq(3)[342] + Sq(0,1)[342] + Sq(3)[341]} \item[348] {\rm Sq(3)[346] + Sq(0,1)[345] + Sq(3)[343] + Sq(3)[342] + Sq(0,1)[342] + Sq(0,1)[341]} \\ $h_{7}:$ [20] \item[349] {\rm Sq(3)[347] + Sq(0,1)[343] + Sq(0,1)[342] + Sq(3)[341]} \item[350] {\rm Sq(3)[348] + Sq(0,1)[348] + Sq(0,1)[345] + Sq(0,1)[344] + Sq(3)[343] + Sq(0,1)[343] + Sq(0,1)[341]} \\ $h_{7}:$ [20] \item[351] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \\ $h_{3}:$ [322], [320] \\ $h_{7}:$ [20] \item[352] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \\ $h_{7}:$ [20] \item[353] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{1}:$ [349] \\ $h_{2}:$ [340], [339] \\ $h_{3}:$ [320] \\ $h_{6}:$ [122] \item[354] {\rm Sq(1)[361] + Sq(1)[358]} \\ $h_{0}:$ [361], [358] \\ $h_{3}:$ [320] \\ $h_{5}:$ [229], [228], [226], [224] \\ $h_{6}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[14/188] \mb{14/188} \begin{gl} \item[356] {\rm Sq(1,1)[339] + Sq(1,1)[338]} \\ $h_{3}:$ [325] \item[357] {\rm Sq(3)[341] + Sq(0,1)[341]} \item[358] {\rm Sq(1)[351]} \\ $h_{0}:$ [351] \\ $h_{1}:$ [348], [345] \\ $h_{3}:$ [325] \item[359] {\rm Sq(1)[353] + Sq(1)[352]} \\ $h_{0}:$ [353], [352] \\ $h_{2}:$ [337] \item[360] {\rm Sq(1)[357] + Sq(1)[355] + Sq(1)[354]} \\ $h_{0}:$ [357], [355], [354] \\ $h_{2}:$ [337] \\ $h_{3}:$ [327] \\ $h_{7}:$ [24] \item[361] {\rm Sq(1)[358] + Sq(1)[356] + Sq(1)[355] + Sq(1)[352]} \\ $h_{0}:$ [358], [356], [355], [352] \\ $h_{1}:$ [348], [345] \\ $h_{3}:$ [325] \\ $h_{5}:$ [238], [235], [233] \end{gl} \end{bdl} \begin{bdl} \item[13/188] \mb{13/188} \begin{gl} \item[351] {\rm Sq(1,1)[340]} \item[352] {\rm Sq(1,1)[341]} \item[353] {\rm Sq(0,1)[342]} \item[354] {\rm Sq(3)[342]} \item[355] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \item[356] {\rm Sq(1)[354] + Sq(1)[350]} \\ $h_{0}:$ [354], [350] \\ $h_{2}:$ [341], [340] \item[357] {\rm Sq(1)[355] + Sq(1)[351]} \\ $h_{0}:$ [355], [351] \\ $h_{3}:$ [332], [330] \\ $h_{7}:$ [25] \item[358] {\rm Sq(1)[356] + Sq(1)[350]} \\ $h_{0}:$ [356], [350] \\ $h_{2}:$ [341], [340] \\ $h_{5}:$ [248] \end{gl} \end{bdl} \begin{bdl} \item[12/188] \mb{12/188} \begin{gl} \item[349] {\rm Sq(1,1)[344]} \item[350] {\rm Sq(4)[344]} \\ $h_{2}:$ [344] \item[351] {\rm Sq(3)[347] + Sq(3)[346] + Sq(0,1)[346] + Sq(3)[345] + Sq(0,1)[345]} \\ $h_{7}:$ [24] \item[352] {\rm Sq(2)[348]} \\ $h_{1}:$ [348] \\ $h_{4}:$ [322] \item[353] {\rm Sq(2)[349]} \\ $h_{1}:$ [349] \item[354] {\rm Sq(1)[351]} \\ $h_{0}:$ [351] \item[355] {\rm Sq(1)[352]} \\ $h_{0}:$ [352] \\ $h_{3}:$ [336] \\ $h_{7}:$ [25] \item[356] {\rm Sq(1)[353]} \\ $h_{0}:$ [353] \\ $h_{5}:$ [258] \end{gl} \end{bdl} \begin{bdl} \item[11/188] \mb{11/188} \begin{gl} \item[351] {\rm Sq(5)[331] + Sq(2,1)[331]} \item[352] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{7}:$ [26] \item[353] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \end{gl} \end{bdl} \begin{bdl} \item[10/188] \mb{10/188} \begin{gl} \item[336] {\rm Sq(5)[300] + Sq(2,1)[300] + Sq(5)[299]} \\ $h_{7}:$ [31] \item[337] {\rm Sq(1,1)[301]} \item[338] {\rm Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [305], [304] \end{gl} \end{bdl} \begin{bdl} \item[9/188] \mb{9/188} \begin{gl} \item[304] {\rm Sq(1)[268] + Sq(1)[267]} \\ $h_{0}:$ [268], [267] \\ $h_{1}:$ [265] \\ $h_{2}:$ [264] \\ $h_{4}:$ [246] \\ $h_{7}:$ [31] \item[305] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{1}:$ [265] \\ $h_{2}:$ [264] \\ $h_{4}:$ [246] \\ $h_{7}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[8/188] \mb{8/188} \begin{gl} \item[267] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{2}:$ [228] \\ $h_{7}:$ [31] \item[268] {\rm Sq(1)[231]} \\ $h_{0}:$ [231] \\ $h_{7}:$ [30] \item[269] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \\ $h_{2}:$ [228] \\ $h_{7}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[7/188] \mb{7/188} \begin{gl} \item[230] {\rm Sq(7,1)[185] + Sq(4,2)[185] + Sq(1,3)[185]} \\ $h_{7}:$ [33] \item[231] {\rm Sq(2,2)[187] + Sq(1,0,1)[187]} \\ $h_{7}:$ [32] \item[232] {\rm Sq(2)[188]} \\ $h_{1}:$ [188] \\ $h_{5}:$ [147] \\ $h_{7}:$ [33], [32] \item[233] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{7}:$ [33], [32] \end{gl} \end{bdl} \begin{bdl} \item[6/188] \mb{6/188} \begin{gl} \item[189] {\rm Sq(7,1)[135] + Sq(4,2)[135] + Sq(0,1,1)[135]} \\ $h_{5}:$ [109] \\ $h_{6}:$ [77] \item[190] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[5/188] \mb{5/188} \begin{gl} \item[136] {\rm Sq(13)[88] + Sq(10,1)[88] + Sq(1,4)[88] + Sq(6,0,1)[88] + Sq(0,2,1)[88]} \\ $h_{7}:$ [26] \item[137] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[4/188] \mb{4/188} \begin{gl} \item[89] {\rm Sq(7,3)[55] + Sq(4,4)[55] + Sq(1,5)[55] + Sq(6,1,1)[55] + Sq(3,2,1)[55]} \end{gl} \end{bdl} \dm{189} \begin{bdl} \item[89/189] \mb{89/189} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[88/189] \mb{88/189} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[87/189] \mb{87/189} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[84/189] \mb{84/189} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[81/189] \mb{81/189} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[78/189] \mb{78/189} \begin{gl} \item[20] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[77/189] \mb{77/189} \begin{gl} \item[24] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[76/189] \mb{76/189} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[75/189] \mb{75/189} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[74/189] \mb{74/189} \begin{gl} \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[73/189] \mb{73/189} \begin{gl} \item[31] {\rm Sq(2)[30]} \\ $h_{1}:$ [30] \item[32] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[72/189] \mb{72/189} \begin{gl} \item[31] {\rm Sq(1,1)[31]} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[71/189] \mb{71/189} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[70/189] \mb{70/189} \begin{gl} \item[38] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[69/189] \mb{69/189} \begin{gl} \item[40] {\rm Sq(0,1)[39]} \item[41] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[68/189] \mb{68/189} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[66/189] \mb{66/189} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[65/189] \mb{65/189} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[63/189] \mb{63/189} \begin{gl} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(0,1)[60]} \item[59] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [62] \\ $h_{2}:$ [58] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[62/189] \mb{62/189} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [61] \\ $h_{3}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[61/189] \mb{61/189} \begin{gl} \item[68] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [61] \item[69] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [61] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[60/189] \mb{60/189} \begin{gl} \item[68] {\rm Sq(0,1)[69]} \item[69] {\rm Sq(0,1)[70]} \item[70] {\rm Sq(0,1)[71]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[59/189] \mb{59/189} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[58/189] \mb{58/189} \begin{gl} \item[82] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[57/189] \mb{57/189} \begin{gl} \item[84] {\rm Sq(0,1)[82]} \item[85] {\rm Sq(0,1)[83]} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(3)[85]} \end{gl} \end{bdl} \begin{bdl} \item[56/189] \mb{56/189} \begin{gl} \item[88] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[55/189] \mb{55/189} \begin{gl} \item[95] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [96], [95] \\ $h_{2}:$ [94] \item[96] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{1}:$ [95] \\ $h_{4}:$ [68] \\ $h_{5}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[54/189] \mb{54/189} \begin{gl} \item[99] {\rm Sq(0,1)[98]} \item[100] {\rm Sq(0,1)[99]} \item[101] {\rm Sq(0,1)[100]} \item[102] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{2}:$ [96] \item[103] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[53/189] \mb{53/189} \begin{gl} \item[102] {\rm Sq(1,1)[104]} \item[103] {\rm Sq(0,1)[105]} \item[104] {\rm Sq(0,1)[106]} \item[105] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{4}:$ [73], [72] \end{gl} \end{bdl} \begin{bdl} \item[52/189] \mb{52/189} \begin{gl} \item[111] {\rm Sq(2)[121]} \\ $h_{1}:$ [121] \item[112] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{4}:$ [80], [79] \end{gl} \end{bdl} \begin{bdl} \item[51/189] \mb{51/189} \begin{gl} \item[123] {\rm Sq(0,1)[123]} \item[124] {\rm Sq(0,1)[124]} \item[125] {\rm Sq(0,1)[125]} \item[126] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{4}:$ [85], [82] \end{gl} \end{bdl} \begin{bdl} \item[50/189] \mb{50/189} \begin{gl} \item[129] {\rm Sq(0,1)[120]} \item[130] {\rm Sq(0,1)[121]} \item[131] {\rm Sq(0,1)[122]} \item[132] {\rm Sq(1)[131] + Sq(1)[130]} \\ $h_{0}:$ [131], [130] \\ $h_{4}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[49/189] \mb{49/189} \begin{gl} \item[130] {\rm Sq(0,1)[122]} \item[131] {\rm Sq(1)[133]} \\ $h_{0}:$ [133] \\ $h_{4}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[48/189] \mb{48/189} \begin{gl} \item[130] {\rm Sq(0,1)[127]} \item[131] {\rm Sq(0,1)[128]} \item[132] {\rm Sq(0,1)[129]} \item[133] {\rm Sq(1)[139] + Sq(1)[138]} \\ $h_{0}:$ [139], [138] \\ $h_{4}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[47/189] \mb{47/189} \begin{gl} \item[135] {\rm Sq(0,1)[132]} \item[136] {\rm Sq(0,1)[133]} \item[137] {\rm Sq(0,1)[134]} \item[138] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{1}:$ [140] \\ $h_{2}:$ [131] \item[139] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{1}:$ [140] \\ $h_{2}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[46/189] \mb{46/189} \begin{gl} \item[143] {\rm Sq(0,1)[137]} \item[144] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \\ $h_{2}:$ [136] \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{2}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[45/189] \mb{45/189} \begin{gl} \item[146] {\rm Sq(0,1)[144]} \item[147] {\rm Sq(0,1)[145]} \item[148] {\rm Sq(0,1)[146]} \item[149] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{2}:$ [140] \item[150] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{2}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[44/189] \mb{44/189} \begin{gl} \item[151] {\rm Sq(0,1)[157]} \item[152] {\rm Sq(0,1)[158]} \item[153] {\rm Sq(0,1)[159]} \item[154] {\rm Sq(0,1)[160]} \item[155] {\rm Sq(2)[162] + Sq(2)[161]} \\ $h_{1}:$ [162], [161] \item[156] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[43/189] \mb{43/189} \begin{gl} \item[167] {\rm Sq(0,1)[170]} \item[168] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[42/189] \mb{42/189} \begin{gl} \item[176] {\rm Sq(0,1)[173]} \item[177] {\rm Sq(0,1)[174]} \item[178] {\rm Sq(0,1)[175]} \item[179] {\rm Sq(0,1)[176]} \item[180] {\rm Sq(1)[184]} \\ $h_{0}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[41/189] \mb{41/189} \begin{gl} \item[181] {\rm Sq(0,1)[178]} \item[182] {\rm Sq(0,1)[179]} \item[183] {\rm Sq(0,1)[180]} \item[184] {\rm Sq(3)[181] + Sq(3)[177]} \item[185] {\rm Sq(2)[182]} \\ $h_{1}:$ [182] \end{gl} \end{bdl} \begin{bdl} \item[40/189] \mb{40/189} \begin{gl} \item[188] {\rm Sq(0,1)[189]} \end{gl} \end{bdl} \begin{bdl} \item[39/189] \mb{39/189} \begin{gl} \item[195] {\rm Sq(0,1)[199]} \item[196] {\rm Sq(0,1)[200]} \item[197] {\rm Sq(0,1)[201]} \item[198] {\rm Sq(0,1)[202]} \item[199] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{1}:$ [203] \item[200] {\rm Sq(1)[209] + Sq(1)[208]} \\ $h_{0}:$ [209], [208] \\ $h_{1}:$ [205] \end{gl} \end{bdl} \begin{bdl} \item[38/189] \mb{38/189} \begin{gl} \item[206] {\rm Sq(1,1)[209] + Sq(1,1)[208]} \item[207] {\rm Sq(0,1)[211]} \item[208] {\rm Sq(0,1)[212]} \item[209] {\rm Sq(0,1)[213]} \item[210] {\rm Sq(0,1)[214]} \item[211] {\rm Sq(1)[222] + Sq(1)[221]} \\ $h_{0}:$ [222], [221] \\ $h_{2}:$ [208], [207] \\ $h_{3}:$ [188], [187], [186], [184] \end{gl} \end{bdl} \begin{bdl} \item[37/189] \mb{37/189} \begin{gl} \item[220] {\rm Sq(0,1)[221] + Sq(0,1)[220]} \item[221] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{1}:$ [225] \\ $h_{2}:$ [218] \\ $h_{4}:$ [163] \item[222] {\rm Sq(1)[233] + Sq(1)[227]} \\ $h_{0}:$ [233], [227] \\ $h_{1}:$ [225] \\ $h_{2}:$ [218], [213] \\ $h_{3}:$ [192] \\ $h_{4}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[36/189] \mb{36/189} \begin{gl} \item[227] {\rm Sq(1,1)[228] + Sq(1,1)[226] + Sq(1,1)[225]} \item[228] {\rm Sq(0,1)[229]} \item[229] {\rm Sq(0,1)[230]} \item[230] {\rm Sq(0,1)[231]} \item[231] {\rm Sq(2)[235]} \\ $h_{1}:$ [235] \item[232] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{2}:$ [226] \\ $h_{4}:$ [171] \item[233] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{2}:$ [226] \\ $h_{4}:$ [171] \end{gl} \end{bdl} \begin{bdl} \item[35/189] \mb{35/189} \begin{gl} \item[236] {\rm Sq(1,1)[234]} \item[237] {\rm Sq(0,1)[238]} \item[238] {\rm Sq(0,1)[239]} \item[239] {\rm Sq(0,1)[240]} \item[240] {\rm Sq(0,1)[241]} \item[241] {\rm Sq(1)[246]} \\ $h_{0}:$ [246] \end{gl} \end{bdl} \begin{bdl} \item[34/189] \mb{34/189} \begin{gl} \item[246] {\rm Sq(1,1)[237] + Sq(1,1)[236]} \item[247] {\rm Sq(3)[243] + Sq(0,1)[243] + Sq(0,1)[242] + Sq(3)[241] + Sq(3)[240]} \end{gl} \end{bdl} \begin{bdl} \item[33/189] \mb{33/189} \begin{gl} \item[249] {\rm Sq(1,1)[237] + Sq(1,1)[235]} \item[250] {\rm Sq(0,1)[240]} \item[251] {\rm Sq(3)[243] + Sq(0,1)[243] + Sq(3)[242] + Sq(0,1)[241] + Sq(3)[240]} \end{gl} \end{bdl} \begin{bdl} \item[32/189] \mb{32/189} \begin{gl} \item[247] {\rm Sq(0,1)[243]} \item[248] {\rm Sq(0,1)[244]} \item[249] {\rm Sq(0,1)[245]} \end{gl} \end{bdl} \begin{bdl} \item[31/189] \mb{31/189} \begin{gl} \item[249] {\rm Sq(3)[248] + Sq(0,1)[248] + Sq(0,1)[247] + Sq(3)[246] + Sq(0,1)[246]} \item[250] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \\ $h_{2}:$ [244] \\ $h_{3}:$ [228] \\ $h_{7}:$ [3] \item[251] {\rm Sq(1)[258] + Sq(1)[256]} \\ $h_{0}:$ [258], [256] \\ $h_{1}:$ [253], [251], [250], [249] \\ $h_{2}:$ [245], [244], [241] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[30/189] \mb{30/189} \begin{gl} \item[255] {\rm Sq(0,1)[254]} \item[256] {\rm Sq(3)[257]} \item[257] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{7}:$ [3] \item[258] {\rm Sq(1)[267] + Sq(1)[261]} \\ $h_{0}:$ [267], [261] \\ $h_{2}:$ [253] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[29/189] \mb{29/189} \begin{gl} \item[260] {\rm Sq(1,1)[261]} \\ $h_{7}:$ [3] \item[261] {\rm Sq(1,1)[262]} \item[262] {\rm Sq(0,1)[263]} \item[263] {\rm Sq(0,1)[264]} \item[264] {\rm Sq(0,1)[265]} \item[265] {\rm Sq(3)[266] + Sq(0,1)[266] + Sq(3)[263]} \\ $h_{3}:$ [246] \item[266] {\rm Sq(2)[267]} \\ $h_{1}:$ [267] \item[267] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \\ $h_{2}:$ [261] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[28/189] \mb{28/189} \begin{gl} \item[270] {\rm Sq(1,1)[266] + Sq(1,1)[264]} \item[271] {\rm Sq(0,1)[267]} \item[272] {\rm Sq(2)[272]} \\ $h_{1}:$ [272] \item[273] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{3}:$ [254], [251] \\ $h_{4}:$ [224] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[27/189] \mb{27/189} \begin{gl} \item[278] {\rm Sq(1,1)[269]} \item[279] {\rm Sq(2)[276]} \\ $h_{1}:$ [276] \item[280] {\rm Sq(1)[284] + Sq(1)[281]} \\ $h_{0}:$ [284], [281] \\ $h_{3}:$ [257] \\ $h_{4}:$ [226], [225], [224] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[26/189] \mb{26/189} \begin{gl} \item[280] {\rm Sq(2,1)[268]} \item[281] {\rm Sq(0,1)[273]} \item[282] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(3)[276] + Sq(0,1)[276] + Sq(3)[273]} \item[283] {\rm Sq(2)[281] + Sq(2)[280] + Sq(2)[279]} \\ $h_{1}:$ [281], [280], [279] \\ $h_{4}:$ [231], [230] \item[284] {\rm Sq(1)[286] + Sq(1)[285]} \\ $h_{0}:$ [286], [285] \\ $h_{3}:$ [258] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[25/189] \mb{25/189} \begin{gl} \item[285] {\rm Sq(3)[280] + Sq(0,1)[280] + Sq(3)[278] + Sq(0,1)[278] + Sq(0,1)[276]} \item[286] {\rm Sq(1)[289] + Sq(1)[287] + Sq(1)[285]} \\ $h_{0}:$ [289], [287], [285] \\ $h_{3}:$ [262] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[24/189] \mb{24/189} \begin{gl} \item[285] {\rm Sq(1,1)[282]} \item[286] {\rm Sq(1,1)[283]} \item[287] {\rm Sq(0,1)[284]} \item[288] {\rm Sq(2)[288] + Sq(2)[287]} \\ $h_{1}:$ [288], [287] \item[289] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{7}:$ [8] \item[290] {\rm Sq(1)[294] + Sq(1)[293]} \\ $h_{0}:$ [294], [293] \\ $h_{3}:$ [270], [268], [267], [265] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[23/189] \mb{23/189} \begin{gl} \item[292] {\rm Sq(0,1)[299]} \\ $h_{7}:$ [10] \item[293] {\rm Sq(3)[301] + Sq(0,1)[301] + Sq(3)[300] + Sq(0,1)[300] + Sq(3)[299]} \item[294] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \\ $h_{3}:$ [282], [280], [279] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[22/189] \mb{22/189} \begin{gl} \item[307] {\rm Sq(1,1)[305]} \item[308] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{3}:$ [286] \item[309] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \\ $h_{1}:$ [311], [310] \\ $h_{2}:$ [304] \\ $h_{3}:$ [286] \\ $h_{4}:$ [252] \\ $h_{5}:$ [199] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[21/189] \mb{21/189} \begin{gl} \item[315] {\rm Sq(1,1)[307] + Sq(1,1)[304] + Sq(1,1)[303]} \item[316] {\rm Sq(3)[312] + Sq(0,1)[312] + Sq(3)[311] + Sq(0,1)[311] + Sq(0,1)[309]} \item[317] {\rm Sq(2)[313]} \\ $h_{1}:$ [313] \item[318] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{2}:$ [303] \\ $h_{4}:$ [253] \\ $h_{5}:$ [197], [195] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[20/189] \mb{20/189} \begin{gl} \item[317] {\rm Sq(0,1)[318]} \\ $h_{7}:$ [12] \item[318] {\rm Sq(3)[324] + Sq(0,1)[324] + Sq(3)[321] + Sq(3)[320] + Sq(0,1)[319]} \item[319] {\rm Sq(2)[326]} \\ $h_{1}:$ [326] \\ $h_{4}:$ [259], [258], [256] \item[320] {\rm Sq(1)[331] + Sq(1)[330]} \\ $h_{0}:$ [331], [330] \\ $h_{2}:$ [314] \\ $h_{3}:$ [293] \\ $h_{4}:$ [257], [256] \item[321] {\rm Sq(1)[333] + Sq(1)[330]} \\ $h_{0}:$ [333], [330] \\ $h_{2}:$ [315] \\ $h_{3}:$ [294] \item[322] {\rm Sq(1)[335] + Sq(1)[332] + Sq(1)[330]} \\ $h_{0}:$ [335], [332], [330] \\ $h_{4}:$ [261], [256] \\ $h_{5}:$ [203], [201] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[19/189] \mb{19/189} \begin{gl} \item[330] {\rm Sq(3)[330]} \\ $h_{2}:$ [321] \item[331] {\rm Sq(3)[331] + Sq(0,1)[331]} \item[332] {\rm Sq(1)[343]} \\ $h_{0}:$ [343] \\ $h_{2}:$ [323], [322], [321] \item[333] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \\ $h_{2}:$ [323], [322], [321] \item[334] {\rm Sq(1)[347] + Sq(1)[346] + Sq(1)[344]} \\ $h_{0}:$ [347], [346], [344] \\ $h_{1}:$ [338], [337], [335], [333] \\ $h_{2}:$ [325], [324], [322] \\ $h_{3}:$ [305], [303] \\ $h_{4}:$ [265] \item[335] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \\ $h_{2}:$ [323], [322] \\ $h_{4}:$ [266] \\ $h_{5}:$ [210] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[18/189] \mb{18/189} \begin{gl} \item[343] {\rm Sq(3)[329] + Sq(3)[328]} \item[344] {\rm Sq(0,1)[330] + Sq(0,1)[329] + Sq(0,1)[328]} \item[345] {\rm Sq(3)[330] + Sq(3)[328]} \item[346] {\rm Sq(1)[343] + Sq(1)[340]} \\ $h_{0}:$ [343], [340] \\ $h_{1}:$ [337] \\ $h_{3}:$ [309], [308], [307] \item[347] {\rm Sq(1)[344] + Sq(1)[341] + Sq(1)[340]} \\ $h_{0}:$ [344], [341], [340] \\ $h_{1}:$ [337] \\ $h_{2}:$ [325], [323] \\ $h_{3}:$ [309], [308], [307] \\ $h_{4}:$ [270], [269] \item[348] {\rm Sq(1)[347] + Sq(1)[341] + Sq(1)[340]} \\ $h_{0}:$ [347], [341], [340] \\ $h_{1}:$ [336] \\ $h_{2}:$ [327], [326], [325], [324], [323], [321] \\ $h_{3}:$ [307], [306] \\ $h_{4}:$ [270], [269] \item[349] {\rm Sq(1)[350] + Sq(1)[349] + Sq(1)[341] + Sq(1)[340]} \\ $h_{0}:$ [350], [349], [341], [340] \\ $h_{4}:$ [272], [271] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[17/189] \mb{17/189} \begin{gl} \item[340] {\rm Sq(0,1)[333] + Sq(3)[330]} \\ $h_{3}:$ [311], [310], [309] \item[341] {\rm Sq(0,1)[335] + Sq(0,1)[334] + Sq(0,1)[332] + Sq(3)[331] + Sq(0,1)[331] + Sq(0,1)[330]} \\ $h_{2}:$ [327], [326] \\ $h_{3}:$ [311], [310] \\ $h_{4}:$ [270], [269], [268] \item[342] {\rm Sq(0,1)[336] + Sq(3)[335] + Sq(3)[334] + Sq(3)[333] + Sq(3)[332] + Sq(3)[331] + Sq(3)[330]} \\ $h_{7}:$ [20] \item[343] {\rm Sq(3)[337] + Sq(3)[335] + Sq(3)[334] + Sq(3)[333] + Sq(3)[332] + Sq(3)[331]} \item[344] {\rm Sq(3)[338] + Sq(3)[335] + Sq(3)[334] + Sq(3)[333] + Sq(3)[331]} \\ $h_{2}:$ [327], [326] \\ $h_{3}:$ [311], [310] \item[345] {\rm Sq(2)[341] + Sq(2)[340]} \\ $h_{1}:$ [341], [340] \\ $h_{2}:$ [327], [326] \\ $h_{3}:$ [311], [310] \\ $h_{4}:$ [272], [270], [269] \item[346] {\rm Sq(2)[342] + Sq(2)[340] + Sq(2)[339]} \\ $h_{1}:$ [342], [340], [339] \\ $h_{2}:$ [327], [326] \\ $h_{3}:$ [311], [310] \\ $h_{4}:$ [269], [268], [267] \item[347] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \item[348] {\rm Sq(1)[346]} \\ $h_{0}:$ [346] \\ $h_{3}:$ [313], [310] \\ $h_{4}:$ [268] \item[349] {\rm Sq(1)[348]} \\ $h_{0}:$ [348] \\ $h_{1}:$ [340], [339] \\ $h_{2}:$ [327], [326] \\ $h_{3}:$ [313], [310], [309] \\ $h_{4}:$ [272], [270], [269], [268] \item[350] {\rm Sq(1)[350]} \\ $h_{0}:$ [350] \\ $h_{1}:$ [340], [339] \\ $h_{3}:$ [313], [310] \\ $h_{4}:$ [274], [273], [272] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[16/189] \mb{16/189} \begin{gl} \item[345] {\rm Sq(1,1)[337]} \item[346] {\rm Sq(1,1)[340] + Sq(1,1)[339]} \\ $h_{3}:$ [318], [316] \item[347] {\rm Sq(3)[345] + Sq(0,1)[345] + Sq(3)[344] + Sq(0,1)[344] + Sq(3)[342] + Sq(0,1)[342]} \\ $h_{7}:$ [18] \item[348] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \\ $h_{3}:$ [318], [316] \item[349] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \\ $h_{1}:$ [349], [347] \\ $h_{2}:$ [337] \\ $h_{3}:$ [316] \\ $h_{4}:$ [278] \item[350] {\rm Sq(1)[359] + Sq(1)[358] + Sq(1)[357]} \\ $h_{0}:$ [359], [358], [357] \\ $h_{3}:$ [318], [316] \\ $h_{4}:$ [280], [278] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[15/189] \mb{15/189} \begin{gl} \item[355] {\rm Sq(3)[349]} \item[356] {\rm Sq(3)[354] + Sq(0,1)[354] + Sq(3)[352] + Sq(0,1)[352] + Sq(0,1)[349]} \item[357] {\rm Sq(3)[355] + Sq(0,1)[355] + Sq(3)[353] + Sq(0,1)[353] + Sq(3)[352] + Sq(0,1)[352] + Sq(3)[351] + Sq(0,1)[351]} \\ $h_{2}:$ [342], [341] \\ $h_{4}:$ [300], [297] \item[358] {\rm Sq(1)[368] + Sq(1)[367]} \\ $h_{0}:$ [368], [367] \\ $h_{1}:$ [357] \\ $h_{2}:$ [344] \\ $h_{3}:$ [327] \\ $h_{4}:$ [300], [297] \item[359] {\rm Sq(1)[369] + Sq(1)[363] + Sq(1)[362]} \\ $h_{0}:$ [369], [363], [362] \\ $h_{1}:$ [357] \\ $h_{2}:$ [344], [342], [341] \\ $h_{3}:$ [327] \\ $h_{4}:$ [297], [296] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[14/189] \mb{14/189} \begin{gl} \item[362] {\rm Sq(0,1)[348] + Sq(0,1)[346] + Sq(3)[345] + Sq(0,1)[343]} \\ $h_{3}:$ [328] \\ $h_{7}:$ [25] \item[363] {\rm Sq(3)[349] + Sq(0,1)[349] + Sq(3)[347] + Sq(3)[345]} \\ $h_{3}:$ [328] \item[364] {\rm Sq(2)[351]} \\ $h_{1}:$ [351] \\ $h_{3}:$ [328] \\ $h_{7}:$ [25] \item[365] {\rm Sq(2)[352]} \\ $h_{1}:$ [352] \\ $h_{3}:$ [328] \item[366] {\rm Sq(2)[354] + Sq(2)[353]} \\ $h_{1}:$ [354], [353] \\ $h_{3}:$ [328] \\ $h_{7}:$ [25] \item[367] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{7}:$ [25] \item[368] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{7}:$ [25] \item[369] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{7}:$ [26], [25] \end{gl} \end{bdl} \begin{bdl} \item[13/189] \mb{13/189} \begin{gl} \item[359] {\rm Sq(1,1)[342]} \item[360] {\rm Sq(2)[353]} \\ $h_{1}:$ [353] \\ $h_{2}:$ [342] \item[361] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \item[362] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{7}:$ [26] \item[363] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{2}:$ [344], [343], [342] \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[12/189] \mb{12/189} \begin{gl} \item[357] {\rm Sq(3)[350] + Sq(0,1)[350] + Sq(3)[349]} \item[358] {\rm Sq(1)[356] + Sq(1)[355]} \\ $h_{0}:$ [356], [355] \\ $h_{1}:$ [351] \\ $h_{2}:$ [346], [345] \item[359] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \\ $h_{7}:$ [26] \item[360] {\rm Sq(1)[358] + Sq(1)[355] + Sq(1)[354]} \\ $h_{0}:$ [358], [355], [354] \\ $h_{2}:$ [347], [346] \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[11/189] \mb{11/189} \begin{gl} \item[354] {\rm Sq(4,1)[329] + Sq(0,0,1)[329]} \item[355] {\rm Sq(7)[329] + Sq(0,0,1)[329]} \item[356] {\rm Sq(7)[330] + Sq(1,2)[330] + Sq(1,2)[329] + Sq(0,0,1)[329]} \item[357] {\rm Sq(3,1)[332]} \\ $h_{7}:$ [27] \item[358] {\rm Sq(3)[333]} \\ $h_{7}:$ [28] \item[359] {\rm Sq(2)[336]} \\ $h_{1}:$ [336] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[10/189] \mb{10/189} \begin{gl} \item[339] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \\ $h_{5}:$ [239], [238] \\ $h_{6}:$ [131] \item[340] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{5}:$ [242], [240] \\ $h_{6}:$ [136], [134] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[9/189] \mb{9/189} \begin{gl} \item[306] {\rm Sq(3,1)[262] + Sq(0,2)[262]} \\ $h_{7}:$ [32] \item[307] {\rm Sq(5)[264] + Sq(2,1)[264]} \\ $h_{7}:$ [33] \item[308] {\rm Sq(3)[265]} \item[309] {\rm Sq(1)[271]} \\ $h_{0}:$ [271] \\ $h_{5}:$ [208], [204] \\ $h_{6}:$ [122], [117] \\ $h_{7}:$ [34], [33] \end{gl} \end{bdl} \begin{bdl} \item[8/189] \mb{8/189} \begin{gl} \item[270] {\rm Sq(2)[232] + Sq(2)[231] + Sq(2)[230]} \\ $h_{1}:$ [232], [231], [230] \\ $h_{4}:$ [214] \\ $h_{5}:$ [177] \item[271] {\rm Sq(1)[235] + Sq(1)[234]} \\ $h_{0}:$ [235], [234] \\ $h_{5}:$ [179] \\ $h_{6}:$ [108] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[7/189] \mb{7/189} \begin{gl} \item[234] {\rm Sq(6,1)[187] + Sq(3,2)[187] + Sq(0,3)[187]} \\ $h_{5}:$ [150], [149] \\ $h_{6}:$ [97] \\ $h_{7}:$ [34] \item[235] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{5}:$ [151], [150], [149] \\ $h_{6}:$ [98], [97] \\ $h_{7}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[6/189] \mb{6/189} \begin{gl} \item[191] {\rm Sq(4,3)[134]} \\ $h_{7}:$ [32] \item[192] {\rm Sq(2)[136]} \\ $h_{1}:$ [136] \\ $h_{7}:$ [33] \item[193] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{5}:$ [111] \\ $h_{6}:$ [78] \\ $h_{7}:$ [34], [32] \end{gl} \end{bdl} \begin{bdl} \item[5/189] \mb{5/189} \begin{gl} \item[138] {\rm Sq(2)[89]} \\ $h_{1}:$ [89] \item[139] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{5}:$ [76] \\ $h_{6}:$ [54] \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[4/189] \mb{4/189} \begin{gl} \item[90] {\rm Sq(1)[56]} \\ $h_{0}:$ [56] \\ $h_{5}:$ [51] \\ $h_{6}:$ [36] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[3/189] \mb{3/189} \begin{gl} \item[56] {\rm Sq(32)[27] + Sq(29,1)[27] + Sq(26,2)[27] + Sq(23,3)[27] + Sq(25,0,1)[27] + Sq(19,2,1)[27] + Sq(16,3,1)[27] + Sq(13,4,1)[27] + Sq(10,5,1)[27] + Sq(4,7,1)[27] + Sq(12,2,2)[27] + Sq(14,1,0,1)[27] + Sq(2,5,0,1)[27] + Sq(7,1,1,1)[27] + Sq(4,2,1,1)[27] + Sq(0,1,2,1)[27]} \\ $h_{5}:$ [27] \\ $h_{6}:$ [21] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \dm{190} \begin{bdl} \item[94/190] \mb{94/190} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[93/190] \mb{93/190} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[92/190] \mb{92/190} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[91/190] \mb{91/190} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[90/190] \mb{90/190} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[89/190] \mb{89/190} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[88/190] \mb{88/190} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[87/190] \mb{87/190} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[86/190] \mb{86/190} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[85/190] \mb{85/190} \begin{gl} \item[14] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \\ $h_{4}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[84/190] \mb{84/190} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [11] \\ $h_{4}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[83/190] \mb{83/190} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \item[13] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{4}:$ [10], [9] \end{gl} \end{bdl} \begin{bdl} \item[82/190] \mb{82/190} \begin{gl} \item[16] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [12], [11] \end{gl} \end{bdl} \begin{bdl} \item[81/190] \mb{81/190} \begin{gl} \item[21] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11], [10] \end{gl} \end{bdl} \begin{bdl} \item[80/190] \mb{80/190} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \item[21] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \\ $h_{4}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[79/190] \mb{79/190} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \item[19] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{4}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[78/190] \mb{78/190} \begin{gl} \item[21] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{4}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[77/190] \mb{77/190} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[76/190] \mb{76/190} \begin{gl} \item[26] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{2}:$ [22] \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[75/190] \mb{75/190} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \item[28] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[74/190] \mb{74/190} \begin{gl} \item[29] {\rm Sq(0,1)[28]} \item[30] {\rm Sq(0,1)[29]} \item[31] {\rm Sq(2)[31]} \\ $h_{1}:$ [31] \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[73/190] \mb{73/190} \begin{gl} \item[33] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[72/190] \mb{72/190} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[71/190] \mb{71/190} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[70/190] \mb{70/190} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[69/190] \mb{69/190} \begin{gl} \item[42] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[43] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \\ $h_{5}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[68/190] \mb{68/190} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(0,1)[48]} \item[45] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{5}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[67/190] \mb{67/190} \begin{gl} \item[49] {\rm Sq(0,1)[55]} \item[50] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{5}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[66/190] \mb{66/190} \begin{gl} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{5}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[65/190] \mb{65/190} \begin{gl} \item[59] {\rm Sq(0,1)[55]} \item[60] {\rm Sq(0,1)[56]} \item[61] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{5}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[64/190] \mb{64/190} \begin{gl} \item[57] {\rm Sq(0,1)[56]} \item[58] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \\ $h_{5}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[63/190] \mb{63/190} \begin{gl} \item[60] {\rm Sq(3)[63] + Sq(0,1)[63]} \item[61] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{5}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[62/190] \mb{62/190} \begin{gl} \item[66] {\rm Sq(0,1)[65]} \item[67] {\rm Sq(0,1)[66]} \item[68] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{5}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[61/190] \mb{61/190} \begin{gl} \item[70] {\rm Sq(0,1)[66]} \item[71] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \item[72] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{5}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[60/190] \mb{60/190} \begin{gl} \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [69] \item[73] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{2}:$ [72], [69] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{5}:$ [31], [30], [29] \end{gl} \end{bdl} \begin{bdl} \item[59/190] \mb{59/190} \begin{gl} \item[77] {\rm Sq(0,1)[78]} \item[78] {\rm Sq(0,1)[79]} \item[79] {\rm Sq(0,1)[80]} \item[80] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[81] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{5}:$ [35], [34], [33] \end{gl} \end{bdl} \begin{bdl} \item[58/190] \mb{58/190} \begin{gl} \item[83] {\rm Sq(0,1)[81]} \item[84] {\rm Sq(0,1)[82]} \item[85] {\rm Sq(2)[87] + Sq(2)[84]} \\ $h_{1}:$ [87], [84] \item[86] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{5}:$ [37], [36], [34] \end{gl} \end{bdl} \begin{bdl} \item[57/190] \mb{57/190} \begin{gl} \item[88] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{5}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[56/190] \mb{56/190} \begin{gl} \item[89] {\rm Sq(0,1)[90]} \item[90] {\rm Sq(0,1)[91]} \item[91] {\rm Sq(0,1)[92]} \item[92] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{5}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[55/190] \mb{55/190} \begin{gl} \item[97] {\rm Sq(0,1)[96]} \item[98] {\rm Sq(0,1)[97]} \item[99] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{5}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[54/190] \mb{54/190} \begin{gl} \item[104] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{5}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[53/190] \mb{53/190} \begin{gl} \item[106] {\rm Sq(0,1)[107]} \item[107] {\rm Sq(0,1)[108]} \item[108] {\rm Sq(0,1)[109]} \item[109] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [111] \item[110] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[52/190] \mb{52/190} \begin{gl} \item[113] {\rm Sq(0,1)[119]} \item[114] {\rm Sq(0,1)[120]} \item[115] {\rm Sq(0,1)[121]} \item[116] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[51/190] \mb{51/190} \begin{gl} \item[127] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \end{gl} \end{bdl} \begin{bdl} \item[50/190] \mb{50/190} \begin{gl} \item[133] {\rm Sq(0,1)[125]} \item[134] {\rm Sq(0,1)[126]} \item[135] {\rm Sq(0,1)[127]} \item[136] {\rm Sq(2)[130]} \\ $h_{1}:$ [130] \item[137] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[49/190] \mb{49/190} \begin{gl} \item[132] {\rm Sq(0,1)[125]} \item[133] {\rm Sq(0,1)[126]} \item[134] {\rm Sq(0,1)[127]} \item[135] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[48/190] \mb{48/190} \begin{gl} \item[134] {\rm Sq(0,1)[132]} \item[135] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[47/190] \mb{47/190} \begin{gl} \item[140] {\rm Sq(0,1)[137]} \item[141] {\rm Sq(0,1)[138]} \item[142] {\rm Sq(0,1)[139]} \item[143] {\rm Sq(1)[149]} \\ $h_{0}:$ [149] \end{gl} \end{bdl} \begin{bdl} \item[46/190] \mb{46/190} \begin{gl} \item[146] {\rm Sq(0,1)[141]} \item[147] {\rm Sq(0,1)[142]} \item[148] {\rm Sq(0,1)[143]} \item[149] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[45/190] \mb{45/190} \begin{gl} \item[151] {\rm Sq(0,1)[148]} \item[152] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{1}:$ [155], [151] \item[153] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{1}:$ [151] \\ $h_{2}:$ [147] \item[154] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[44/190] \mb{44/190} \begin{gl} \item[157] {\rm Sq(0,1)[162] + Sq(3)[161] + Sq(0,1)[161]} \item[158] {\rm Sq(0,1)[163]} \item[159] {\rm Sq(0,1)[164]} \item[160] {\rm Sq(0,1)[165]} \item[161] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{2}:$ [157] \item[162] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \end{gl} \end{bdl} \begin{bdl} \item[43/190] \mb{43/190} \begin{gl} \item[169] {\rm Sq(0,1)[172]} \item[170] {\rm Sq(0,1)[173]} \item[171] {\rm Sq(0,1)[174]} \item[172] {\rm Sq(3)[175] + Sq(0,1)[175]} \item[173] {\rm Sq(1)[184] + Sq(1)[183]} \\ $h_{0}:$ [184], [183] \end{gl} \end{bdl} \begin{bdl} \item[42/190] \mb{42/190} \begin{gl} \item[181] {\rm Sq(0,1)[178]} \item[182] {\rm Sq(2)[185]} \\ $h_{1}:$ [185] \item[183] {\rm Sq(1)[190] + Sq(1)[189]} \\ $h_{0}:$ [190], [189] \\ $h_{2}:$ [177] \item[184] {\rm Sq(1)[191] + Sq(1)[189]} \\ $h_{0}:$ [191], [189] \\ $h_{2}:$ [177] \end{gl} \end{bdl} \begin{bdl} \item[41/190] \mb{41/190} \begin{gl} \item[186] {\rm Sq(0,1)[183]} \item[187] {\rm Sq(0,1)[184]} \item[188] {\rm Sq(0,1)[186]} \item[189] {\rm Sq(3)[187] + Sq(0,1)[187] + Sq(0,1)[185]} \item[190] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{2}:$ [177] \item[191] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [177] \end{gl} \end{bdl} \begin{bdl} \item[40/190] \mb{40/190} \begin{gl} \item[189] {\rm Sq(0,1)[190]} \item[190] {\rm Sq(3)[190]} \item[191] {\rm Sq(0,1)[191]} \item[192] {\rm Sq(0,1)[192]} \item[193] {\rm Sq(0,1)[193]} \end{gl} \end{bdl} \begin{bdl} \item[39/190] \mb{39/190} \begin{gl} \item[201] {\rm Sq(0,1)[204]} \end{gl} \end{bdl} \begin{bdl} \item[38/190] \mb{38/190} \begin{gl} \item[212] {\rm Sq(1,1)[213] + Sq(1,1)[212] + Sq(1,1)[211]} \item[213] {\rm Sq(0,1)[216]} \item[214] {\rm Sq(0,1)[217]} \item[215] {\rm Sq(0,1)[218]} \end{gl} \end{bdl} \begin{bdl} \item[37/190] \mb{37/190} \begin{gl} \item[223] {\rm Sq(0,1)[222]} \item[224] {\rm Sq(0,1)[224]} \item[225] {\rm Sq(0,1)[225] + Sq(0,1)[223]} \item[226] {\rm Sq(0,1)[226]} \item[227] {\rm Sq(1)[235]} \\ $h_{0}:$ [235] \\ $h_{1}:$ [231], [230], [228] \\ $h_{2}:$ [220] \\ $h_{3}:$ [197] \item[228] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{1}:$ [227] \\ $h_{2}:$ [220] \\ $h_{3}:$ [202], [197] \end{gl} \end{bdl} \begin{bdl} \item[36/190] \mb{36/190} \begin{gl} \item[234] {\rm Sq(0,1)[234]} \item[235] {\rm Sq(0,1)[235]} \item[236] {\rm Sq(1)[247]} \\ $h_{0}:$ [247] \\ $h_{3}:$ [211] \end{gl} \end{bdl} \begin{bdl} \item[35/190] \mb{35/190} \begin{gl} \item[242] {\rm Sq(3,1)[231] + Sq(3,1)[230] + Sq(3,1)[228] + Sq(3,1)[227] + Sq(0,2)[227]} \item[243] {\rm Sq(0,1)[243]} \item[244] {\rm Sq(0,1)[244]} \item[245] {\rm Sq(0,1)[245]} \item[246] {\rm Sq(2)[246]} \\ $h_{1}:$ [246] \item[247] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[34/190] \mb{34/190} \begin{gl} \item[248] {\rm Sq(0,1)[244]} \item[249] {\rm Sq(0,1)[245]} \item[250] {\rm Sq(0,1)[246]} \item[251] {\rm Sq(0,1)[247]} \item[252] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \end{gl} \end{bdl} \begin{bdl} \item[33/190] \mb{33/190} \begin{gl} \item[252] {\rm Sq(0,1)[244]} \item[253] {\rm Sq(0,1)[245]} \end{gl} \end{bdl} \begin{bdl} \item[32/190] \mb{32/190} \begin{gl} \item[250] {\rm Sq(1,1)[245] + Sq(1,1)[244]} \item[251] {\rm Sq(1,1)[246] + Sq(1,1)[243]} \item[252] {\rm Sq(0,1)[247]} \item[253] {\rm Sq(0,1)[248]} \end{gl} \end{bdl} \begin{bdl} \item[31/190] \mb{31/190} \begin{gl} \item[252] {\rm Sq(0,1)[251]} \item[253] {\rm Sq(0,1)[252] + Sq(0,1)[250]} \item[254] {\rm Sq(3)[253] + Sq(3)[251] + Sq(3)[250] + Sq(0,1)[250] + Sq(3)[249] + Sq(0,1)[249]} \item[255] {\rm Sq(3)[254] + Sq(0,1)[254] + Sq(3)[252] + Sq(0,1)[250]} \end{gl} \end{bdl} \begin{bdl} \item[30/190] \mb{30/190} \begin{gl} \item[259] {\rm Sq(0,1)[258]} \item[260] {\rm Sq(2)[260]} \\ $h_{1}:$ [260] \\ $h_{7}:$ [4] \item[261] {\rm Sq(2)[266] + Sq(2)[263]} \\ $h_{1}:$ [266], [263] \end{gl} \end{bdl} \begin{bdl} \item[29/190] \mb{29/190} \begin{gl} \item[268] {\rm Sq(3)[267] + Sq(0,1)[267]} \item[269] {\rm Sq(0,1)[268] + Sq(0,1)[267]} \item[270] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \\ $h_{1}:$ [270] \item[271] {\rm Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [277], [276] \\ $h_{1}:$ [272], [270] \end{gl} \end{bdl} \begin{bdl} \item[28/190] \mb{28/190} \begin{gl} \item[274] {\rm Sq(5)[266] + Sq(2,1)[266] + Sq(2,1)[264]} \item[275] {\rm Sq(1,1)[269] + Sq(1,1)[268]} \item[276] {\rm Sq(0,1)[274] + Sq(0,1)[273] + Sq(0,1)[272]} \item[277] {\rm Sq(3)[276] + Sq(0,1)[276] + Sq(3)[274] + Sq(3)[273] + Sq(3)[272] + Sq(0,1)[272]} \item[278] {\rm Sq(2)[279] + Sq(2)[278]} \\ $h_{1}:$ [279], [278] \end{gl} \end{bdl} \begin{bdl} \item[27/190] \mb{27/190} \begin{gl} \item[281] {\rm Sq(3)[276] + Sq(0,1)[276]} \item[282] {\rm Sq(2)[282] + Sq(2)[281]} \\ $h_{1}:$ [282], [281] \\ $h_{3}:$ [261], [259] \item[283] {\rm Sq(1)[288] + Sq(1)[287]} \\ $h_{0}:$ [288], [287] \\ $h_{2}:$ [273], [272] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[26/190] \mb{26/190} \begin{gl} \item[285] {\rm Sq(0,1)[280] + Sq(0,1)[279]} \item[286] {\rm Sq(3)[283] + Sq(0,1)[283] + Sq(3)[282] + Sq(0,1)[282] + Sq(3)[281] + Sq(3)[279]} \item[287] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(3)[281] + Sq(3)[280] + Sq(3)[279]} \item[288] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{2}:$ [275], [274], [273] \\ $h_{7}:$ [11] \item[289] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{2}:$ [275], [274], [273] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[25/190] \mb{25/190} \begin{gl} \item[287] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(0,1)[282] + Sq(3)[281]} \\ $h_{7}:$ [10] \item[288] {\rm Sq(2)[285]} \\ $h_{1}:$ [285] \\ $h_{2}:$ [277], [276] \\ $h_{7}:$ [10] \item[289] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \\ $h_{7}:$ [10] \item[290] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \\ $h_{1}:$ [288] \\ $h_{2}:$ [279], [276] \\ $h_{3}:$ [267], [266], [265] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[24/190] \mb{24/190} \begin{gl} \item[291] {\rm Sq(3)[291] + Sq(0,1)[291]} \item[292] {\rm Sq(1)[296] + Sq(1)[295]} \\ $h_{0}:$ [296], [295] \\ $h_{1}:$ [293] \\ $h_{2}:$ [284] \\ $h_{3}:$ [273] \\ $h_{4}:$ [238] \\ $h_{5}:$ [186] \item[293] {\rm Sq(1)[297] + Sq(1)[295]} \\ $h_{0}:$ [297], [295] \\ $h_{2}:$ [285] \\ $h_{3}:$ [274], [273], [272], [271] \end{gl} \end{bdl} \begin{bdl} \item[23/190] \mb{23/190} \begin{gl} \item[295] {\rm Sq(5)[298] + Sq(2,1)[298] + Sq(5)[297] + Sq(2,1)[297]} \item[296] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \\ $h_{3}:$ [286] \item[297] {\rm Sq(1)[314] + Sq(1)[312]} \\ $h_{0}:$ [314], [312] \\ $h_{2}:$ [299] \\ $h_{3}:$ [287], [286] \end{gl} \end{bdl} \begin{bdl} \item[22/190] \mb{22/190} \begin{gl} \item[310] {\rm Sq(5)[305] + Sq(2,1)[305]} \\ $h_{3}:$ [288] \item[311] {\rm Sq(0,1)[311]} \\ $h_{7}:$ [15] \item[312] {\rm Sq(3)[313] + Sq(0,1)[313] + Sq(3)[312] + Sq(0,1)[312] + Sq(3)[310]} \\ $h_{3}:$ [288] \item[313] {\rm Sq(2)[317]} \\ $h_{1}:$ [317] \\ $h_{4}:$ [255], [254] \\ $h_{7}:$ [15] \item[314] {\rm Sq(1)[321] + Sq(1)[320]} \\ $h_{0}:$ [321], [320] \\ $h_{3}:$ [290] \end{gl} \end{bdl} \begin{bdl} \item[21/190] \mb{21/190} \begin{gl} \item[319] {\rm Sq(3)[313] + Sq(0,1)[313]} \item[320] {\rm Sq(3)[316] + Sq(0,1)[316] + Sq(3)[315] + Sq(0,1)[315] + Sq(0,1)[313]} \item[321] {\rm Sq(1)[325] + Sq(1)[323]} \\ $h_{0}:$ [325], [323] \end{gl} \end{bdl} \begin{bdl} \item[20/190] \mb{20/190} \begin{gl} \item[323] {\rm Sq(1,1)[324] + Sq(1,1)[320]} \item[324] {\rm Sq(3)[329] + Sq(0,1)[329] + Sq(3)[325] + Sq(0,1)[325]} \item[325] {\rm Sq(1)[338] + Sq(1)[336]} \\ $h_{0}:$ [338], [336] \end{gl} \end{bdl} \begin{bdl} \item[19/190] \mb{19/190} \begin{gl} \item[336] {\rm Sq(3)[340] + Sq(0,1)[340] + Sq(3)[337] + Sq(0,1)[336] + Sq(0,1)[335] + Sq(0,1)[333]} \\ $h_{7}:$ [17] \item[337] {\rm Sq(3)[341] + Sq(0,1)[341] + Sq(0,1)[334] + Sq(3)[333]} \\ $h_{7}:$ [17] \item[338] {\rm Sq(3)[342] + Sq(0,1)[342] + Sq(3)[339] + Sq(0,1)[339] + Sq(0,1)[336] + Sq(0,1)[335] + Sq(3)[334]} \\ $h_{7}:$ [17] \item[339] {\rm Sq(2)[345] + Sq(2)[344]} \\ $h_{1}:$ [345], [344] \\ $h_{4}:$ [269], [268] \\ $h_{7}:$ [17] \item[340] {\rm Sq(1)[350]} \\ $h_{0}:$ [350] \\ $h_{1}:$ [344] \\ $h_{2}:$ [332], [331] \\ $h_{3}:$ [307] \\ $h_{4}:$ [269], [268] \end{gl} \end{bdl} \begin{bdl} \item[18/190] \mb{18/190} \begin{gl} \item[350] {\rm Sq(1)[351]} \\ $h_{0}:$ [351] \\ $h_{2}:$ [329], [328] \item[351] {\rm Sq(1)[353]} \\ $h_{0}:$ [353] \\ $h_{1}:$ [345], [341] \\ $h_{2}:$ [330] \\ $h_{4}:$ [275] \item[352] {\rm Sq(1)[356] + Sq(1)[355] + Sq(1)[352]} \\ $h_{0}:$ [356], [355], [352] \\ $h_{1}:$ [346], [344], [343] \\ $h_{2}:$ [328] \\ $h_{3}:$ [312] \\ $h_{4}:$ [276], [273] \end{gl} \end{bdl} \begin{bdl} \item[17/190] \mb{17/190} \begin{gl} \item[351] {\rm Sq(3)[339]} \item[352] {\rm Sq(0,1)[341]} \item[353] {\rm Sq(3)[341] + Sq(0,1)[340]} \\ $h_{4}:$ [277] \item[354] {\rm Sq(2)[347]} \\ $h_{1}:$ [347] \\ $h_{4}:$ [277] \\ $h_{7}:$ [22] \item[355] {\rm Sq(1)[358] + Sq(1)[357] + Sq(1)[356] + Sq(1)[353] + Sq(1)[351]} \\ $h_{0}:$ [358], [357], [356], [353], [351] \\ $h_{1}:$ [346] \\ $h_{2}:$ [335], [330] \\ $h_{3}:$ [318], [317], [315] \\ $h_{4}:$ [279], [278] \item[356] {\rm Sq(1)[359] + Sq(1)[357] + Sq(1)[356] + Sq(1)[352] + Sq(1)[351]} \\ $h_{0}:$ [359], [357], [356], [352], [351] \\ $h_{1}:$ [346] \\ $h_{2}:$ [335], [330] \\ $h_{3}:$ [318], [317], [315] \\ $h_{4}:$ [278], [275] \end{gl} \end{bdl} \begin{bdl} \item[16/190] \mb{16/190} \begin{gl} \item[351] {\rm Sq(3)[349] + Sq(3)[347]} \item[352] {\rm Sq(0,1)[350] + Sq(0,1)[347]} \\ $h_{7}:$ [20] \item[353] {\rm Sq(3)[351] + Sq(0,1)[351] + Sq(3)[348] + Sq(3)[347]} \\ $h_{7}:$ [20] \item[354] {\rm Sq(2)[355]} \\ $h_{1}:$ [355] \\ $h_{4}:$ [284], [283], [281] \item[355] {\rm Sq(2)[356]} \\ $h_{1}:$ [356] \\ $h_{7}:$ [20] \item[356] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{3}:$ [324], [323] \\ $h_{4}:$ [281] \\ $h_{7}:$ [20] \item[357] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{3}:$ [325] \\ $h_{4}:$ [281] \\ $h_{7}:$ [20] \item[358] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{3}:$ [325] \\ $h_{4}:$ [282], [281] \\ $h_{7}:$ [20] \item[359] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \\ $h_{3}:$ [325] \\ $h_{4}:$ [281] \\ $h_{7}:$ [20] \item[360] {\rm Sq(1)[366] + Sq(1)[365]} \\ $h_{0}:$ [366], [365] \\ $h_{3}:$ [324], [323] \\ $h_{4}:$ [284], [283], [282] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[15/190] \mb{15/190} \begin{gl} \item[360] {\rm Sq(0,1)[356]} \\ $h_{3}:$ [330] \item[361] {\rm Sq(0,1)[357] + Sq(3)[356]} \\ $h_{3}:$ [331], [329] \item[362] {\rm Sq(3)[359] + Sq(0,1)[359] + Sq(3)[357] + Sq(3)[356]} \\ $h_{3}:$ [331], [329] \item[363] {\rm Sq(3)[361] + Sq(0,1)[361] + Sq(3)[358] + Sq(0,1)[358] + Sq(3)[357] + Sq(3)[356]} \\ $h_{3}:$ [331], [329] \item[364] {\rm Sq(2)[364] + Sq(2)[362]} \\ $h_{1}:$ [364], [362] \\ $h_{3}:$ [331] \\ $h_{4}:$ [302] \item[365] {\rm Sq(1)[371] + Sq(1)[370]} \\ $h_{0}:$ [371], [370] \\ $h_{1}:$ [366], [365], [363], [362] \\ $h_{2}:$ [349] \\ $h_{3}:$ [329] \\ $h_{4}:$ [302] \\ $h_{5}:$ [234], [233] \item[366] {\rm Sq(1)[372] + Sq(1)[370]} \\ $h_{0}:$ [372], [370] \\ $h_{1}:$ [366], [365], [363], [362] \\ $h_{2}:$ [349] \\ $h_{3}:$ [330], [329] \\ $h_{4}:$ [302] \\ $h_{5}:$ [234], [233] \end{gl} \end{bdl} \begin{bdl} \item[14/190] \mb{14/190} \begin{gl} \item[370] {\rm Sq(0,1)[353] + Sq(3)[352] + Sq(3)[351]} \\ $h_{2}:$ [347], [346] \\ $h_{4}:$ [308] \item[371] {\rm Sq(3)[357] + Sq(0,1)[357] + Sq(3)[355] + Sq(0,1)[355] + Sq(3)[352] + Sq(0,1)[352] + Sq(3)[351]} \\ $h_{2}:$ [347], [346] \\ $h_{4}:$ [308] \item[372] {\rm Sq(3)[358] + Sq(0,1)[358] + Sq(3)[356] + Sq(0,1)[356] + Sq(3)[355] + Sq(0,1)[355] + Sq(0,1)[354] + Sq(3)[353] + Sq(3)[352] + Sq(3)[351]} \\ $h_{2}:$ [347], [346] \\ $h_{4}:$ [308] \item[373] {\rm Sq(1)[367] + Sq(1)[365]} \\ $h_{0}:$ [367], [365] \\ $h_{1}:$ [359] \\ $h_{2}:$ [347], [345], [344] \\ $h_{3}:$ [331] \\ $h_{4}:$ [308] \end{gl} \end{bdl} \begin{bdl} \item[13/190] \mb{13/190} \begin{gl} \item[364] {\rm Sq(2)[357]} \\ $h_{1}:$ [357] \item[365] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \item[366] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \item[367] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \end{gl} \end{bdl} \begin{bdl} \item[12/190] \mb{12/190} \begin{gl} \item[361] {\rm Sq(1,1)[350] + Sq(1,1)[349]} \item[362] {\rm Sq(3)[351] + Sq(0,1)[351]} \item[363] {\rm Sq(3)[352] + Sq(0,1)[352] + Sq(0,1)[351]} \item[364] {\rm Sq(2)[359] + Sq(2)[356]} \\ $h_{1}:$ [359], [356] \\ $h_{3}:$ [341] \\ $h_{7}:$ [28] \item[365] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{1}:$ [358], [355], [354] \\ $h_{2}:$ [350], [349], [348] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[11/190] \mb{11/190} \begin{gl} \item[360] {\rm Sq(1,1)[335] + Sq(4)[333] + Sq(1,1)[333]} \\ $h_{2}:$ [333] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[10/190] \mb{10/190} \begin{gl} \item[341] {\rm Sq(3)[305] + Sq(0,1)[305] + Sq(3)[304] + Sq(0,1)[304]} \item[342] {\rm Sq(2)[307]} \\ $h_{1}:$ [307] \\ $h_{7}:$ [33] \item[343] {\rm Sq(2)[308]} \\ $h_{1}:$ [308] \item[344] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \\ $h_{2}:$ [303] \\ $h_{4}:$ [289] \\ $h_{5}:$ [245] \\ $h_{6}:$ [139] \\ $h_{7}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[9/190] \mb{9/190} \begin{gl} \item[310] {\rm Sq(1)[274] + Sq(1)[272]} \\ $h_{0}:$ [274], [272] \\ $h_{2}:$ [265] \\ $h_{4}:$ [251] \\ $h_{5}:$ [209] \\ $h_{6}:$ [125], [123] \\ $h_{7}:$ [35] \item[311] {\rm Sq(1)[275] + Sq(1)[272]} \\ $h_{0}:$ [275], [272] \\ $h_{1}:$ [270] \\ $h_{2}:$ [266], [265] \\ $h_{4}:$ [252] \\ $h_{5}:$ [210], [209] \\ $h_{6}:$ [128], [127], [124] \\ $h_{7}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[8/190] \mb{8/190} \begin{gl} \item[272] {\rm Sq(6,1)[227] + Sq(3,2)[227] + Sq(0,3)[227]} \item[273] {\rm Sq(0,1)[230]} \\ $h_{7}:$ [34] \item[274] {\rm Sq(3)[233] + Sq(0,1)[233] + Sq(0,1)[231] + Sq(3)[230]} \\ $h_{7}:$ [34], [33] \item[275] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{2}:$ [229] \\ $h_{4}:$ [216] \\ $h_{5}:$ [183], [182] \\ $h_{6}:$ [112], [110] \\ $h_{7}:$ [34], [33] \end{gl} \end{bdl} \begin{bdl} \item[7/190] \mb{7/190} \begin{gl} \item[236] {\rm Sq(3)[189]} \\ $h_{2}:$ [188] \\ $h_{5}:$ [153], [152] \\ $h_{6}:$ [99] \item[237] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \\ $h_{7}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[6/190] \mb{6/190} \begin{gl} \item[194] {\rm Sq(2)[138]} \\ $h_{1}:$ [138] \end{gl} \end{bdl} \begin{bdl} \item[4/190] \mb{4/190} \begin{gl} \item[91] {\rm Sq(2)[56]} \\ $h_{1}:$ [56] \\ $h_{5}:$ [52] \\ $h_{6}:$ [37] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \dm{191} \begin{bdl} \item[96/191] \mb{96/191} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[95/191] \mb{95/191} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[94/191] \mb{94/191} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[93/191] \mb{93/191} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[92/191] \mb{92/191} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[91/191] \mb{91/191} \begin{gl} \item[6] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[90/191] \mb{90/191} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[89/191] \mb{89/191} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[88/191] \mb{88/191} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[87/191] \mb{87/191} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[86/191] \mb{86/191} \begin{gl} \item[11] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[85/191] \mb{85/191} \begin{gl} \item[15] {\rm Sq(0,1)[13]} \item[16] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[84/191] \mb{84/191} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[83/191] \mb{83/191} \begin{gl} \item[14] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[82/191] \mb{82/191} \begin{gl} \item[17] {\rm Sq(0,1)[20]} \item[18] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[81/191] \mb{81/191} \begin{gl} \item[22] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[80/191] \mb{80/191} \begin{gl} \item[22] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \item[23] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[79/191] \mb{79/191} \begin{gl} \item[20] {\rm Sq(0,1)[20]} \item[21] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[78/191] \mb{78/191} \begin{gl} \item[22] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[77/191] \mb{77/191} \begin{gl} \item[27] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[76/191] \mb{76/191} \begin{gl} \item[28] {\rm Sq(0,1)[25]} \item[29] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[75/191] \mb{75/191} \begin{gl} \item[29] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [29] \\ $h_{2}:$ [26] \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [27] \\ $h_{3}:$ [21] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[74/191] \mb{74/191} \begin{gl} \item[33] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [28] \item[34] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[73/191] \mb{73/191} \begin{gl} \item[34] {\rm Sq(0,1)[31]} \item[35] {\rm Sq(0,1)[32]} \item[36] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [30] \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[72/191] \mb{72/191} \begin{gl} \item[34] {\rm Sq(1,1)[33]} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[71/191] \mb{71/191} \begin{gl} \item[37] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [39] \\ $h_{2}:$ [36] \\ $h_{4}:$ [21] \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[70/191] \mb{70/191} \begin{gl} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(0,1)[41]} \item[42] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[69/191] \mb{69/191} \begin{gl} \item[44] {\rm Sq(0,1)[41]} \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[68/191] \mb{68/191} \begin{gl} \item[46] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[67/191] \mb{67/191} \begin{gl} \item[51] {\rm Sq(0,1)[56]} \item[52] {\rm Sq(0,1)[57]} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[66/191] \mb{66/191} \begin{gl} \item[59] {\rm Sq(0,1)[58]} \item[60] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[65/191] \mb{65/191} \begin{gl} \item[62] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[64/191] \mb{64/191} \begin{gl} \item[59] {\rm Sq(0,1)[57]} \item[60] {\rm Sq(0,1)[58]} \item[61] {\rm Sq(2)[60]} \\ $h_{1}:$ [60] \item[62] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[63/191] \mb{63/191} \begin{gl} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[62/191] \mb{62/191} \begin{gl} \item[69] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[61/191] \mb{61/191} \begin{gl} \item[73] {\rm Sq(0,1)[69]} \item[74] {\rm Sq(0,1)[70]} \item[75] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[60/191] \mb{60/191} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \item[76] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[59/191] \mb{59/191} \begin{gl} \item[82] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \\ $h_{1}:$ [85], [83] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71] \item[83] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{1}:$ [83] \\ $h_{2}:$ [81] \item[84] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[58/191] \mb{58/191} \begin{gl} \item[87] {\rm Sq(0,1)[84]} \item[88] {\rm Sq(0,1)[85]} \item[89] {\rm Sq(0,1)[86]} \item[90] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \item[91] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[57/191] \mb{57/191} \begin{gl} \item[89] {\rm Sq(1,1)[87] + Sq(1,1)[86]} \item[90] {\rm Sq(0,1)[88]} \item[91] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[56/191] \mb{56/191} \begin{gl} \item[93] {\rm Sq(2)[97]} \\ $h_{1}:$ [97] \item[94] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [93] \\ $h_{4}:$ [66] \item[95] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \end{gl} \end{bdl} \begin{bdl} \item[55/191] \mb{55/191} \begin{gl} \item[100] {\rm Sq(0,1)[99]} \item[101] {\rm Sq(0,1)[100]} \item[102] {\rm Sq(0,1)[101]} \item[103] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [96], [95] \\ $h_{4}:$ [69] \item[104] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[54/191] \mb{54/191} \begin{gl} \item[105] {\rm Sq(0,1)[102]} \item[106] {\rm Sq(0,1)[103]} \item[107] {\rm Sq(0,1)[104]} \item[108] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[53/191] \mb{53/191} \begin{gl} \item[111] {\rm Sq(1)[121] + Sq(1)[120]} \\ $h_{0}:$ [121], [120] \end{gl} \end{bdl} \begin{bdl} \item[52/191] \mb{52/191} \begin{gl} \item[117] {\rm Sq(0,1)[123]} \item[118] {\rm Sq(0,1)[124]} \item[119] {\rm Sq(0,1)[125]} \item[120] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{3}:$ [109], [108] \item[121] {\rm Sq(1)[133] + Sq(1)[131]} \\ $h_{0}:$ [133], [131] \\ $h_{3}:$ [109], [108] \end{gl} \end{bdl} \begin{bdl} \item[51/191] \mb{51/191} \begin{gl} \item[128] {\rm Sq(0,1)[129]} \item[129] {\rm Sq(0,1)[130]} \item[130] {\rm Sq(0,1)[131]} \item[131] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{1}:$ [136] \item[132] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [116], [115] \item[133] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{1}:$ [136] \\ $h_{3}:$ [116], [115] \end{gl} \end{bdl} \begin{bdl} \item[50/191] \mb{50/191} \begin{gl} \item[138] {\rm Sq(0,1)[130]} \item[139] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [113], [112] \item[140] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [113], [112] \end{gl} \end{bdl} \begin{bdl} \item[49/191] \mb{49/191} \begin{gl} \item[136] {\rm Sq(0,1)[130]} \item[137] {\rm Sq(0,1)[131]} \item[138] {\rm Sq(0,1)[132]} \item[139] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [113] \item[140] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[48/191] \mb{48/191} \begin{gl} \item[136] {\rm Sq(0,1)[135]} \item[137] {\rm Sq(0,1)[136]} \item[138] {\rm Sq(0,1)[137]} \item[139] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \item[140] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \end{gl} \end{bdl} \begin{bdl} \item[47/191] \mb{47/191} \begin{gl} \item[144] {\rm Sq(0,1)[143]} \item[145] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \item[146] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[46/191] \mb{46/191} \begin{gl} \item[150] {\rm Sq(2,1)[138]} \item[151] {\rm Sq(0,1)[146]} \item[152] {\rm Sq(0,1)[147]} \item[153] {\rm Sq(0,1)[148]} \item[154] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \end{gl} \end{bdl} \begin{bdl} \item[45/191] \mb{45/191} \begin{gl} \item[155] {\rm Sq(0,1)[152]} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(0,1)[154]} \item[158] {\rm Sq(1)[164]} \\ $h_{0}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[44/191] \mb{44/191} \begin{gl} \item[163] {\rm Sq(0,1)[167]} \item[164] {\rm Sq(1)[179]} \\ $h_{0}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[43/191] \mb{43/191} \begin{gl} \item[174] {\rm Sq(0,1)[176]} \item[175] {\rm Sq(0,1)[177]} \item[176] {\rm Sq(0,1)[178]} \item[177] {\rm Sq(0,1)[179]} \item[178] {\rm Sq(1)[188]} \\ $h_{0}:$ [188] \\ $h_{1}:$ [182] \\ $h_{2}:$ [175] \item[179] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[42/191] \mb{42/191} \begin{gl} \item[185] {\rm Sq(0,1)[181]} \item[186] {\rm Sq(0,1)[182]} \item[187] {\rm Sq(0,1)[183]} \item[188] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{2}:$ [179] \item[189] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[41/191] \mb{41/191} \begin{gl} \item[192] {\rm Sq(0,1)[188]} \item[193] {\rm Sq(2)[190] + Sq(2)[189]} \\ $h_{1}:$ [190], [189] \item[194] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{2}:$ [182] \item[195] {\rm Sq(1)[199]} \\ $h_{0}:$ [199] \item[196] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{1}:$ [189] \\ $h_{2}:$ [187] \end{gl} \end{bdl} \begin{bdl} \item[40/191] \mb{40/191} \begin{gl} \item[194] {\rm Sq(1,1)[194]} \item[195] {\rm Sq(0,1)[195]} \item[196] {\rm Sq(0,1)[196]} \item[197] {\rm Sq(0,1)[197]} \item[198] {\rm Sq(0,1)[198]} \item[199] {\rm Sq(1)[204] + Sq(1)[203]} \\ $h_{0}:$ [204], [203] \item[200] {\rm Sq(1)[205]} \\ $h_{0}:$ [205] \\ $h_{2}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[39/191] \mb{39/191} \begin{gl} \item[202] {\rm Sq(0,1)[207]} \item[203] {\rm Sq(0,1)[208]} \item[204] {\rm Sq(0,1)[209]} \item[205] {\rm Sq(3)[209] + Sq(3)[208] + Sq(3)[206]} \item[206] {\rm Sq(0,1)[210] + Sq(0,1)[206]} \item[207] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{2}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[38/191] \mb{38/191} \begin{gl} \item[216] {\rm Sq(1,1)[219] + Sq(1,1)[218] + Sq(1,1)[217] + Sq(1,1)[216]} \item[217] {\rm Sq(0,1)[220]} \end{gl} \end{bdl} \begin{bdl} \item[37/191] \mb{37/191} \begin{gl} \item[229] {\rm Sq(1,1)[226]} \item[230] {\rm Sq(0,1)[229]} \item[231] {\rm Sq(0,1)[230] + Sq(0,1)[228] + Sq(0,1)[227]} \item[232] {\rm Sq(3)[231] + Sq(3)[230] + Sq(3)[228] + Sq(0,1)[228] + Sq(3)[227] + Sq(0,1)[227]} \item[233] {\rm Sq(3)[233] + Sq(0,1)[233] + Sq(3)[232] + Sq(0,1)[232]} \item[234] {\rm Sq(1)[242] + Sq(1)[240]} \\ $h_{0}:$ [242], [240] \\ $h_{1}:$ [235] \\ $h_{2}:$ [225] \\ $h_{3}:$ [205], [203] \\ $h_{4}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[36/191] \mb{36/191} \begin{gl} \item[237] {\rm Sq(0,1)[237] + Sq(0,1)[236]} \item[238] {\rm Sq(0,1)[238] + Sq(0,1)[236]} \item[239] {\rm Sq(0,1)[239]} \item[240] {\rm Sq(0,1)[240]} \item[241] {\rm Sq(2)[246] + Sq(2)[245] + Sq(2)[244] + Sq(2)[243] + Sq(2)[242]} \\ $h_{1}:$ [246], [245], [244], [243], [242] \item[242] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{3}:$ [218], [217] \end{gl} \end{bdl} \begin{bdl} \item[35/191] \mb{35/191} \begin{gl} \item[248] {\rm Sq(1,1)[244]} \item[249] {\rm Sq(0,1)[247] + Sq(3)[246]} \item[250] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{3}:$ [226], [221], [220] \end{gl} \end{bdl} \begin{bdl} \item[34/191] \mb{34/191} \begin{gl} \item[253] {\rm Sq(0,1)[249]} \item[254] {\rm Sq(0,1)[250]} \item[255] {\rm Sq(0,1)[251]} \item[256] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \\ $h_{3}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[33/191] \mb{33/191} \begin{gl} \item[254] {\rm Sq(0,1)[247]} \item[255] {\rm Sq(0,1)[248]} \item[256] {\rm Sq(0,1)[249]} \item[257] {\rm Sq(1)[259] + Sq(1)[257]} \\ $h_{0}:$ [259], [257] \end{gl} \end{bdl} \begin{bdl} \item[32/191] \mb{32/191} \begin{gl} \item[254] {\rm Sq(2,1)[245] + Sq(2,1)[244]} \item[255] {\rm Sq(1,1)[248] + Sq(1,1)[247]} \item[256] {\rm Sq(0,1)[249]} \item[257] {\rm Sq(3)[250] + Sq(0,1)[250] + Sq(3)[249]} \\ $h_{7}:$ [3] \item[258] {\rm Sq(2)[255] + Sq(2)[253]} \\ $h_{1}:$ [255], [253] \item[259] {\rm Sq(1)[260] + Sq(1)[258]} \\ $h_{0}:$ [260], [258] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[31/191] \mb{31/191} \begin{gl} \item[256] {\rm Sq(1,1)[254] + Sq(1,1)[251] + Sq(1,1)[249]} \item[257] {\rm Sq(0,1)[255]} \item[258] {\rm Sq(0,1)[256]} \item[259] {\rm Sq(2)[260]} \\ $h_{1}:$ [260] \\ $h_{3}:$ [236] \\ $h_{4}:$ [211] \\ $h_{7}:$ [5] \item[260] {\rm Sq(1)[265] + Sq(1)[262]} \\ $h_{0}:$ [265], [262] \end{gl} \end{bdl} \begin{bdl} \item[30/191] \mb{30/191} \begin{gl} \item[262] {\rm Sq(0,1)[261]} \item[263] {\rm Sq(0,1)[262] + Sq(3)[260] + Sq(0,1)[260]} \item[264] {\rm Sq(0,1)[264] + Sq(3)[260] + Sq(0,1)[260]} \item[265] {\rm Sq(3)[267] + Sq(0,1)[267] + Sq(3)[261]} \item[266] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \\ $h_{2}:$ [259] \\ $h_{3}:$ [247] \end{gl} \end{bdl} \begin{bdl} \item[29/191] \mb{29/191} \begin{gl} \item[272] {\rm Sq(0,1)[271] + Sq(0,1)[270]} \item[273] {\rm Sq(3)[272] + Sq(0,1)[270]} \\ $h_{2}:$ [267] \\ $h_{3}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[28/191] \mb{28/191} \begin{gl} \item[279] {\rm Sq(1,1)[276] + Sq(1,1)[272]} \item[280] {\rm Sq(1,1)[277] + Sq(1,1)[275] + Sq(1,1)[274]} \end{gl} \end{bdl} \begin{bdl} \item[27/191] \mb{27/191} \begin{gl} \item[284] {\rm Sq(0,1)[281]} \item[285] {\rm Sq(3)[282] + Sq(3)[281] + Sq(0,1)[280]} \item[286] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(3)[281] + Sq(0,1)[280]} \\ $h_{2}:$ [276] \item[287] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{2}:$ [276] \end{gl} \end{bdl} \begin{bdl} \item[26/191] \mb{26/191} \begin{gl} \item[290] {\rm Sq(1,1)[284] + Sq(1,1)[283] + Sq(1,1)[282] + Sq(1,1)[280]} \item[291] {\rm Sq(3)[286] + Sq(0,1)[286] + Sq(3)[285] + Sq(0,1)[285]} \item[292] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{1}:$ [287] \\ $h_{2}:$ [282] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[25/191] \mb{25/191} \begin{gl} \item[291] {\rm Sq(0,1)[287] + Sq(3)[285] + Sq(0,1)[285]} \item[292] {\rm Sq(3)[288] + Sq(3)[285]} \item[293] {\rm Sq(3)[290] + Sq(0,1)[290] + Sq(3)[289] + Sq(0,1)[289] + Sq(3)[287]} \item[294] {\rm Sq(2)[291]} \\ $h_{1}:$ [291] \item[295] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{2}:$ [282], [281] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[24/191] \mb{24/191} \begin{gl} \item[294] {\rm Sq(1,1)[291]} \item[295] {\rm Sq(3)[292]} \\ $h_{7}:$ [10] \item[296] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \end{gl} \end{bdl} \begin{bdl} \item[23/191] \mb{23/191} \begin{gl} \item[298] {\rm Sq(1,1)[306] + Sq(1,1)[305]} \item[299] {\rm Sq(3)[308] + Sq(0,1)[308] + Sq(0,1)[307]} \item[300] {\rm Sq(2)[310]} \\ $h_{1}:$ [310] \\ $h_{2}:$ [304] \\ $h_{3}:$ [290] \\ $h_{5}:$ [201] \item[301] {\rm Sq(2)[312] + Sq(2)[311]} \\ $h_{1}:$ [312], [311] \\ $h_{2}:$ [304] \\ $h_{3}:$ [290] \\ $h_{5}:$ [201] \\ $h_{7}:$ [12] \item[302] {\rm Sq(1)[317] + Sq(1)[315]} \\ $h_{0}:$ [317], [315] \\ $h_{1}:$ [311] \\ $h_{2}:$ [305], [304] \\ $h_{3}:$ [291], [289] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[22/191] \mb{22/191} \begin{gl} \item[315] {\rm Sq(3)[315] + Sq(0,1)[315]} \item[316] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \\ $h_{2}:$ [313], [312] \\ $h_{4}:$ [260], [259] \item[317] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{2}:$ [310] \\ $h_{3}:$ [296] \end{gl} \end{bdl} \begin{bdl} \item[21/191] \mb{21/191} \begin{gl} \item[322] {\rm Sq(0,1)[317]} \\ $h_{7}:$ [16] \item[323] {\rm Sq(3)[319]} \\ $h_{2}:$ [313] \\ $h_{4}:$ [259], [258], [257] \item[324] {\rm Sq(3)[320] + Sq(0,1)[320]} \\ $h_{4}:$ [260], [257] \item[325] {\rm Sq(2)[324]} \\ $h_{1}:$ [324] \\ $h_{3}:$ [292] \\ $h_{4}:$ [260], [257] \\ $h_{6}:$ [114] \item[326] {\rm Sq(1)[328] + Sq(1)[326]} \\ $h_{0}:$ [328], [326] \\ $h_{3}:$ [295], [294], [293] \end{gl} \end{bdl} \begin{bdl} \item[20/191] \mb{20/191} \begin{gl} \item[326] {\rm Sq(1,1)[328] + Sq(1,1)[326] + Sq(4)[325] + Sq(1,1)[325]} \\ $h_{2}:$ [325] \item[327] {\rm Sq(0,1)[331]} \\ $h_{3}:$ [304], [303] \item[328] {\rm Sq(3)[335] + Sq(0,1)[335] + Sq(3)[332] + Sq(0,1)[332] + Sq(3)[330] + Sq(0,1)[330]} \\ $h_{2}:$ [325] \\ $h_{3}:$ [304], [303] \item[329] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \\ $h_{1}:$ [339], [338] \\ $h_{3}:$ [305], [304], [303] \\ $h_{4}:$ [267] \end{gl} \end{bdl} \begin{bdl} \item[19/191] \mb{19/191} \begin{gl} \item[341] {\rm Sq(3)[347] + Sq(0,1)[347] + Sq(3)[346] + Sq(0,1)[346] + Sq(0,1)[345] + Sq(3)[344] + Sq(0,1)[343]} \\ $h_{3}:$ [311], [310] \\ $h_{4}:$ [276], [275] \item[342] {\rm Sq(3)[349] + Sq(0,1)[349] + Sq(3)[345] + Sq(0,1)[345] + Sq(0,1)[344] + Sq(3)[343] + Sq(0,1)[343]} \\ $h_{3}:$ [311], [310] \\ $h_{4}:$ [276], [275] \end{gl} \end{bdl} \begin{bdl} \item[18/191] \mb{18/191} \begin{gl} \item[353] {\rm Sq(3)[347] + Sq(0,1)[347] + Sq(3)[345] + Sq(3)[344] + Sq(0,1)[344] + Sq(0,1)[342] + Sq(3)[341]} \\ $h_{7}:$ [23] \item[354] {\rm Sq(3)[350] + Sq(0,1)[350] + Sq(3)[349] + Sq(0,1)[349] + Sq(3)[344] + Sq(0,1)[344] + Sq(3)[343] + Sq(0,1)[343] + Sq(0,1)[342] + Sq(3)[340] + Sq(0,1)[340]} \\ $h_{7}:$ [23] \item[355] {\rm Sq(2)[352] + Sq(2)[351]} \\ $h_{1}:$ [352], [351] \\ $h_{7}:$ [23] \item[356] {\rm Sq(2)[353]} \\ $h_{1}:$ [353] \\ $h_{3}:$ [315] \\ $h_{4}:$ [279], [278], [277] \item[357] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \\ $h_{2}:$ [337], [336] \\ $h_{3}:$ [317], [315] \\ $h_{7}:$ [23] \item[358] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{1}:$ [354] \\ $h_{3}:$ [315] \\ $h_{4}:$ [279], [278], [277] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[17/191] \mb{17/191} \begin{gl} \item[357] {\rm Sq(3)[350] + Sq(0,1)[350] + Sq(3)[346] + Sq(0,1)[346] + Sq(0,1)[345]} \\ $h_{3}:$ [320] \item[358] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{1}:$ [355], [353] \\ $h_{2}:$ [341] \\ $h_{3}:$ [320] \item[359] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{1}:$ [354], [353], [352], [351] \\ $h_{2}:$ [343], [342], [341] \\ $h_{3}:$ [320] \\ $h_{4}:$ [283], [282], [280] \\ $h_{5}:$ [230] \item[360] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \\ $h_{1}:$ [355], [353] \\ $h_{2}:$ [341] \\ $h_{3}:$ [320] \item[361] {\rm Sq(1)[364]} \\ $h_{0}:$ [364] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[16/191] \mb{16/191} \begin{gl} \item[361] {\rm Sq(0,1)[356] + Sq(0,1)[355]} \item[362] {\rm Sq(3)[356] + Sq(0,1)[355]} \\ $h_{2}:$ [350], [349], [348] \\ $h_{5}:$ [230], [229] \item[363] {\rm Sq(3)[359] + Sq(0,1)[359] + Sq(3)[358] + Sq(0,1)[358] + Sq(3)[357] + Sq(0,1)[357] + Sq(3)[355]} \item[364] {\rm Sq(1)[370]} \\ $h_{0}:$ [370] \\ $h_{7}:$ [22] \item[365] {\rm Sq(1)[374] + Sq(1)[373] + Sq(1)[371] + Sq(1)[369] + Sq(1)[368] + Sq(1)[367]} \\ $h_{0}:$ [374], [373], [371], [369], [368], [367] \\ $h_{1}:$ [363], [362] \\ $h_{4}:$ [290], [288] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[15/191] \mb{15/191} \begin{gl} \item[367] {\rm Sq(0,1)[363] + Sq(0,1)[362]} \\ $h_{7}:$ [24], [23] \item[368] {\rm Sq(3)[364] + Sq(3)[362]} \item[369] {\rm Sq(3)[366] + Sq(3)[365] + Sq(3)[363] + Sq(3)[362]} \item[370] {\rm Sq(3)[368] + Sq(0,1)[368] + Sq(3)[367] + Sq(0,1)[367]} \\ $h_{7}:$ [23] \item[371] {\rm Sq(3)[369] + Sq(0,1)[369] + Sq(3)[363] + Sq(3)[362]} \\ $h_{7}:$ [24], [23] \item[372] {\rm Sq(2)[372] + Sq(2)[371]} \\ $h_{1}:$ [372], [371] \\ $h_{4}:$ [303] \\ $h_{7}:$ [24], [23] \item[373] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{3}:$ [337], [336], [335] \item[374] {\rm Sq(1)[375]} \\ $h_{0}:$ [375] \\ $h_{3}:$ [337], [336], [335] \\ $h_{4}:$ [304] \\ $h_{7}:$ [23] \item[375] {\rm Sq(1)[376]} \\ $h_{0}:$ [376] \\ $h_{4}:$ [304] \item[376] {\rm Sq(1)[379] + Sq(1)[378]} \\ $h_{0}:$ [379], [378] \\ $h_{1}:$ [371], [370] \\ $h_{2}:$ [359] \\ $h_{3}:$ [335] \\ $h_{4}:$ [303] \\ $h_{5}:$ [237] \\ $h_{6}:$ [134], [132] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[14/191] \mb{14/191} \begin{gl} \item[374] {\rm Sq(3)[359] + Sq(0,1)[359]} \\ $h_{3}:$ [334] \item[375] {\rm Sq(3)[361] + Sq(0,1)[361]} \\ $h_{3}:$ [334] \item[376] {\rm Sq(3)[362] + Sq(0,1)[362]} \item[377] {\rm Sq(1)[369] + Sq(1)[368]} \\ $h_{0}:$ [369], [368] \\ $h_{2}:$ [353], [352] \\ $h_{3}:$ [336] \\ $h_{5}:$ [246] \\ $h_{6}:$ [137] \item[378] {\rm Sq(1)[370] + Sq(1)[368]} \\ $h_{0}:$ [370], [368] \\ $h_{2}:$ [354], [351] \\ $h_{3}:$ [336], [334] \\ $h_{4}:$ [313] \\ $h_{5}:$ [246] \\ $h_{6}:$ [137] \item[379] {\rm Sq(1)[371]} \\ $h_{0}:$ [371] \\ $h_{2}:$ [354], [353], [352], [351] \\ $h_{3}:$ [336], [334] \\ $h_{4}:$ [313] \end{gl} \end{bdl} \begin{bdl} \item[13/191] \mb{13/191} \begin{gl} \item[368] {\rm Sq(0,1)[357]} \item[369] {\rm Sq(3)[357]} \\ $h_{3}:$ [337] \item[370] {\rm Sq(3)[359] + Sq(0,1)[359]} \\ $h_{3}:$ [337] \item[371] {\rm Sq(3)[360] + Sq(0,1)[360]} \\ $h_{3}:$ [337] \item[372] {\rm Sq(1)[368] + Sq(1)[366]} \\ $h_{0}:$ [368], [366] \\ $h_{2}:$ [354], [350] \end{gl} \end{bdl} \begin{bdl} \item[12/191] \mb{12/191} \begin{gl} \item[366] {\rm Sq(3)[358] + Sq(3)[356] + Sq(3)[354] + Sq(0,1)[354]} \\ $h_{4}:$ [329] \item[367] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \item[368] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \\ $h_{2}:$ [351] \\ $h_{4}:$ [329] \end{gl} \end{bdl} \begin{bdl} \item[11/191] \mb{11/191} \begin{gl} \item[361] {\rm Sq(5)[333]} \item[362] {\rm Sq(1,1)[336]} \item[363] {\rm Sq(1,1)[338]} \item[364] {\rm Sq(3)[340] + Sq(0,1)[340] + Sq(3)[339] + Sq(0,1)[339]} \\ $h_{7}:$ [32] \item[365] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \item[366] {\rm Sq(1)[346]} \\ $h_{0}:$ [346] \\ $h_{1}:$ [342], [341] \\ $h_{3}:$ [332], [331] \\ $h_{7}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[10/191] \mb{10/191} \begin{gl} \item[345] {\rm Sq(3)[308] + Sq(0,1)[308] + Sq(3)[307]} \item[346] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \\ $h_{3}:$ [300], [299] \\ $h_{7}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[9/191] \mb{9/191} \begin{gl} \item[312] {\rm Sq(3)[270]} \\ $h_{3}:$ [262] \\ $h_{7}:$ [37] \item[313] {\rm Sq(3)[271] + Sq(0,1)[271]} \\ $h_{3}:$ [262] \\ $h_{7}:$ [37] \item[314] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{1}:$ [273], [272] \\ $h_{2}:$ [267] \\ $h_{3}:$ [262] \\ $h_{7}:$ [38], [37] \item[315] {\rm Sq(1)[277]} \\ $h_{0}:$ [277] \\ $h_{1}:$ [274], [273] \\ $h_{2}:$ [268] \\ $h_{3}:$ [262] \\ $h_{7}:$ [39], [37] \end{gl} \end{bdl} \begin{bdl} \item[8/191] \mb{8/191} \begin{gl} \item[276] {\rm Sq(1,1)[233] + Sq(4)[230]} \\ $h_{2}:$ [230] \\ $h_{7}:$ [36] \item[277] {\rm Sq(1)[239] + Sq(1)[238]} \\ $h_{0}:$ [239], [238] \\ $h_{2}:$ [231] \\ $h_{7}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[7/191] \mb{7/191} \begin{gl} \item[238] {\rm Sq(3)[192] + Sq(3)[191]} \\ $h_{2}:$ [189] \\ $h_{4}:$ [181], [180] \\ $h_{5}:$ [154] \\ $h_{6}:$ [103], [101] \\ $h_{7}:$ [38] \item[239] {\rm Sq(3)[193] + Sq(0,1)[193]} \\ $h_{2}:$ [189] \\ $h_{4}:$ [181], [180] \\ $h_{5}:$ [154] \\ $h_{6}:$ [103], [101] \item[240] {\rm Sq(1)[196] + Sq(1)[195]} \\ $h_{0}:$ [196], [195] \\ $h_{1}:$ [194] \\ $h_{2}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[6/191] \mb{6/191} \begin{gl} \item[195] {\rm Sq(3)[139] + Sq(0,1)[139]} \\ $h_{2}:$ [136] \\ $h_{7}:$ [36] \item[196] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{2}:$ [137], [136] \\ $h_{7}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[5/191] \mb{5/191} \begin{gl} \item[140] {\rm Sq(4)[89] + Sq(1,1)[89]} \\ $h_{2}:$ [89] \item[141] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \\ $h_{5}:$ [77] \\ $h_{6}:$ [56] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \dm{192} \begin{bdl} \item[95/192] \mb{95/192} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[94/192] \mb{94/192} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[89/192] \mb{89/192} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[88/192] \mb{88/192} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[87/192] \mb{87/192} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[86/192] \mb{86/192} \begin{gl} \item[12] {\rm Sq(2)[15]} \\ $h_{1}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[84/192] \mb{84/192} \begin{gl} \item[16] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[81/192] \mb{81/192} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{1}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[80/192] \mb{80/192} \begin{gl} \item[24] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[79/192] \mb{79/192} \begin{gl} \item[22] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[78/192] \mb{78/192} \begin{gl} \item[23] {\rm Sq(0,1)[25]} \item[24] {\rm Sq(3)[26] + Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[75/192] \mb{75/192} \begin{gl} \item[32] {\rm Sq(0,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[73/192] \mb{73/192} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[72/192] \mb{72/192} \begin{gl} \item[36] {\rm Sq(1,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[71/192] \mb{71/192} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [40] \\ $h_{2}:$ [38] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[70/192] \mb{70/192} \begin{gl} \item[43] {\rm Sq(2)[44]} \\ $h_{1}:$ [44] \item[44] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [40] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[69/192] \mb{69/192} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[68/192] \mb{68/192} \begin{gl} \item[47] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[66/192] \mb{66/192} \begin{gl} \item[61] {\rm Sq(0,1)[59]} \item[62] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[65/192] \mb{65/192} \begin{gl} \item[63] {\rm Sq(0,1)[57]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[64/192] \mb{64/192} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[63/192] \mb{63/192} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(0,1)[67]} \item[66] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[62/192] \mb{62/192} \begin{gl} \item[70] {\rm Sq(1,1)[69] + Sq(1,1)[68]} \item[71] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[61/192] \mb{61/192} \begin{gl} \item[76] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[60/192] \mb{60/192} \begin{gl} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(0,1)[79]} \end{gl} \end{bdl} \begin{bdl} \item[59/192] \mb{59/192} \begin{gl} \item[85] {\rm Sq(0,1)[84]} \end{gl} \end{bdl} \begin{bdl} \item[57/192] \mb{57/192} \begin{gl} \item[92] {\rm Sq(0,1)[89]} \item[93] {\rm Sq(0,1)[90]} \item[94] {\rm Sq(0,1)[91]} \item[95] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{1}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[56/192] \mb{56/192} \begin{gl} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[55/192] \mb{55/192} \begin{gl} \item[105] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{1}:$ [105] \\ $h_{2}:$ [102] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[54/192] \mb{54/192} \begin{gl} \item[109] {\rm Sq(0,1)[106]} \item[110] {\rm Sq(0,1)[107]} \item[111] {\rm Sq(0,1)[108]} \item[112] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{2}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[53/192] \mb{53/192} \begin{gl} \item[112] {\rm Sq(0,1)[113]} \item[113] {\rm Sq(0,1)[114]} \item[114] {\rm Sq(0,1)[115]} \end{gl} \end{bdl} \begin{bdl} \item[51/192] \mb{51/192} \begin{gl} \item[134] {\rm Sq(0,1)[133]} \item[135] {\rm Sq(0,1)[134]} \item[136] {\rm Sq(0,1)[135]} \item[137] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{1}:$ [138] \\ $h_{3}:$ [117] \\ $h_{4}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[50/192] \mb{50/192} \begin{gl} \item[141] {\rm Sq(0,1)[132]} \item[142] {\rm Sq(0,1)[133]} \item[143] {\rm Sq(0,1)[134]} \item[144] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{3}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[49/192] \mb{49/192} \begin{gl} \item[141] {\rm Sq(0,1)[134]} \item[142] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[48/192] \mb{48/192} \begin{gl} \item[141] {\rm Sq(0,1)[140]} \item[142] {\rm Sq(0,1)[141]} \item[143] {\rm Sq(0,1)[142]} \item[144] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{3}:$ [122] \end{gl} \end{bdl} \begin{bdl} \item[47/192] \mb{47/192} \begin{gl} \item[147] {\rm Sq(0,1)[146]} \item[148] {\rm Sq(0,1)[147]} \item[149] {\rm Sq(0,1)[148]} \item[150] {\rm Sq(2)[150]} \\ $h_{1}:$ [150] \item[151] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[46/192] \mb{46/192} \begin{gl} \item[155] {\rm Sq(0,1)[151]} \item[156] {\rm Sq(1)[159]} \\ $h_{0}:$ [159] \item[157] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{2}:$ [149] \end{gl} \end{bdl} \begin{bdl} \item[45/192] \mb{45/192} \begin{gl} \item[159] {\rm Sq(3)[157]} \item[160] {\rm Sq(0,1)[158]} \item[161] {\rm Sq(0,1)[159]} \item[162] {\rm Sq(0,1)[160]} \item[163] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[44/192] \mb{44/192} \begin{gl} \item[165] {\rm Sq(0,1)[169]} \item[166] {\rm Sq(0,1)[170]} \item[167] {\rm Sq(0,1)[171]} \item[168] {\rm Sq(0,1)[172]} \end{gl} \end{bdl} \begin{bdl} \item[43/192] \mb{43/192} \begin{gl} \item[180] {\rm Sq(0,1)[181]} \end{gl} \end{bdl} \begin{bdl} \item[42/192] \mb{42/192} \begin{gl} \item[190] {\rm Sq(0,1)[186]} \item[191] {\rm Sq(0,1)[187]} \item[192] {\rm Sq(0,1)[188]} \item[193] {\rm Sq(3)[191] + Sq(0,1)[191] + Sq(3)[190] + Sq(0,1)[190] + Sq(0,1)[189]} \item[194] {\rm Sq(2)[193]} \\ $h_{1}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[41/192] \mb{41/192} \begin{gl} \item[197] {\rm Sq(0,1)[191]} \item[198] {\rm Sq(0,1)[192] + Sq(0,1)[190]} \item[199] {\rm Sq(0,1)[193] + Sq(0,1)[190]} \item[200] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{1}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[40/192] \mb{40/192} \begin{gl} \item[201] {\rm Sq(1,1)[199]} \item[202] {\rm Sq(0,1)[201]} \end{gl} \end{bdl} \begin{bdl} \item[39/192] \mb{39/192} \begin{gl} \item[208] {\rm Sq(0,1)[212]} \item[209] {\rm Sq(0,1)[213]} \item[210] {\rm Sq(0,1)[214]} \item[211] {\rm Sq(0,1)[215]} \item[212] {\rm Sq(1)[218]} \\ $h_{0}:$ [218] \\ $h_{1}:$ [216] \\ $h_{2}:$ [206] \end{gl} \end{bdl} \begin{bdl} \item[38/192] \mb{38/192} \begin{gl} \item[218] {\rm Sq(1,1)[221] + Sq(1,1)[220]} \item[219] {\rm Sq(0,1)[223]} \item[220] {\rm Sq(0,1)[224]} \item[221] {\rm Sq(0,1)[225]} \item[222] {\rm Sq(0,1)[226]} \item[223] {\rm Sq(2)[233] + Sq(2)[229]} \\ $h_{1}:$ [233], [229] \end{gl} \end{bdl} \begin{bdl} \item[37/192] \mb{37/192} \begin{gl} \item[235] {\rm Sq(0,1)[234]} \item[236] {\rm Sq(1)[247] + Sq(1)[246] + Sq(1)[245] + Sq(1)[244] + Sq(1)[243]} \\ $h_{0}:$ [247], [246], [245], [244], [243] \\ $h_{1}:$ [241], [239], [238], [237] \\ $h_{2}:$ [233], [232], [227] \\ $h_{3}:$ [212], [211], [209] \item[237] {\rm Sq(1)[248] + Sq(1)[246] + Sq(1)[245] + Sq(1)[244] + Sq(1)[243]} \\ $h_{0}:$ [248], [246], [245], [244], [243] \\ $h_{1}:$ [241], [240], [239], [238], [237] \\ $h_{2}:$ [233], [227] \\ $h_{3}:$ [212] \\ $h_{4}:$ [174] \end{gl} \end{bdl} \begin{bdl} \item[36/192] \mb{36/192} \begin{gl} \item[243] {\rm Sq(0,1)[242]} \item[244] {\rm Sq(0,1)[243]} \item[245] {\rm Sq(0,1)[244]} \item[246] {\rm Sq(0,1)[245]} \item[247] {\rm Sq(1)[255] + Sq(1)[254]} \\ $h_{0}:$ [255], [254] \\ $h_{2}:$ [241], [240] \\ $h_{3}:$ [222], [221] \item[248] {\rm Sq(1)[256] + Sq(1)[254]} \\ $h_{0}:$ [256], [254] \\ $h_{2}:$ [241] \\ $h_{3}:$ [222] \\ $h_{4}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[35/192] \mb{35/192} \begin{gl} \item[251] {\rm Sq(0,1)[248]} \item[252] {\rm Sq(0,1)[250]} \item[253] {\rm Sq(0,1)[251]} \item[254] {\rm Sq(3)[252] + Sq(0,1)[252] + Sq(0,1)[249]} \item[255] {\rm Sq(1)[261] + Sq(1)[260] + Sq(1)[257]} \\ $h_{0}:$ [261], [260], [257] \\ $h_{2}:$ [246] \\ $h_{3}:$ [232], [231], [230] \item[256] {\rm Sq(1)[262] + Sq(1)[260] + Sq(1)[259] + Sq(1)[257]} \\ $h_{0}:$ [262], [260], [259], [257] \\ $h_{2}:$ [246] \\ $h_{3}:$ [232], [230], [227] \\ $h_{4}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[34/192] \mb{34/192} \begin{gl} \item[257] {\rm Sq(1,1)[251] + Sq(1,1)[250]} \item[258] {\rm Sq(0,1)[252]} \item[259] {\rm Sq(0,1)[253]} \item[260] {\rm Sq(3)[253]} \item[261] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{3}:$ [234], [233] \item[262] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{3}:$ [234] \end{gl} \end{bdl} \begin{bdl} \item[33/192] \mb{33/192} \begin{gl} \item[258] {\rm Sq(0,1)[252] + Sq(0,1)[250]} \item[259] {\rm Sq(0,1)[253] + Sq(0,1)[250]} \item[260] {\rm Sq(2)[257] + Sq(2)[256] + Sq(2)[255] + Sq(2)[254]} \\ $h_{1}:$ [257], [256], [255], [254] \\ $h_{7}:$ [2] \item[261] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{1}:$ [258] \item[262] {\rm Sq(1)[264] + Sq(1)[262]} \\ $h_{0}:$ [264], [262] \item[263] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \end{gl} \end{bdl} \begin{bdl} \item[32/192] \mb{32/192} \begin{gl} \item[260] {\rm Sq(0,1)[252]} \item[261] {\rm Sq(0,1)[254]} \item[262] {\rm Sq(3)[255] + Sq(3)[253] + Sq(0,1)[253]} \item[263] {\rm Sq(1)[262] + Sq(1)[261]} \\ $h_{0}:$ [262], [261] \item[264] {\rm Sq(1)[264] + Sq(1)[261]} \\ $h_{0}:$ [264], [261] \item[265] {\rm Sq(1)[267] + Sq(1)[261]} \\ $h_{0}:$ [267], [261] \end{gl} \end{bdl} \begin{bdl} \item[31/192] \mb{31/192} \begin{gl} \item[261] {\rm Sq(1,1)[256]} \item[262] {\rm Sq(1,1)[258] + Sq(1,1)[257] + Sq(1,1)[255]} \item[263] {\rm Sq(0,1)[259]} \item[264] {\rm Sq(3)[261]} \item[265] {\rm Sq(2)[265] + Sq(2)[262]} \\ $h_{1}:$ [265], [262] \item[266] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{2}:$ [257] \\ $h_{7}:$ [6] \item[267] {\rm Sq(1)[270] + Sq(1)[267]} \\ $h_{0}:$ [270], [267] \end{gl} \end{bdl} \begin{bdl} \item[30/192] \mb{30/192} \begin{gl} \item[267] {\rm Sq(1,1)[267] + Sq(1,1)[265] + Sq(1,1)[261] + Sq(1,1)[260]} \item[268] {\rm Sq(0,1)[269]} \item[269] {\rm Sq(1)[276] + Sq(1)[274]} \\ $h_{0}:$ [276], [274] \\ $h_{2}:$ [260] \\ $h_{7}:$ [6] \item[270] {\rm Sq(1)[278] + Sq(1)[277] + Sq(1)[275] + Sq(1)[274]} \\ $h_{0}:$ [278], [277], [275], [274] \item[271] {\rm Sq(1)[279] + Sq(1)[274]} \\ $h_{0}:$ [279], [274] \\ $h_{2}:$ [267], [261], [260] \end{gl} \end{bdl} \begin{bdl} \item[29/192] \mb{29/192} \begin{gl} \item[274] {\rm Sq(2,1)[268]} \item[275] {\rm Sq(1,1)[271]} \item[276] {\rm Sq(3)[274] + Sq(0,1)[274]} \\ $h_{7}:$ [5] \item[277] {\rm Sq(0,1)[276]} \item[278] {\rm Sq(0,1)[277]} \item[279] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \\ $h_{2}:$ [270] \end{gl} \end{bdl} \begin{bdl} \item[28/192] \mb{28/192} \begin{gl} \item[281] {\rm Sq(2,1)[274] + Sq(2,1)[273]} \item[282] {\rm Sq(0,1)[281]} \item[283] {\rm Sq(3)[282] + Sq(3)[281]} \\ $h_{3}:$ [263] \end{gl} \end{bdl} \begin{bdl} \item[27/192] \mb{27/192} \begin{gl} \item[288] {\rm Sq(0,1)[285]} \end{gl} \end{bdl} \begin{bdl} \item[26/192] \mb{26/192} \begin{gl} \item[293] {\rm Sq(3,1)[278] + Sq(3,1)[277] + Sq(0,2)[273]} \item[294] {\rm Sq(3)[287] + Sq(0,1)[287]} \item[295] {\rm Sq(2)[293] + Sq(2)[292] + Sq(2)[291]} \\ $h_{1}:$ [293], [292], [291] \item[296] {\rm Sq(1)[298] + Sq(1)[297] + Sq(1)[296]} \\ $h_{0}:$ [298], [297], [296] \\ $h_{1}:$ [294], [291] \end{gl} \end{bdl} \begin{bdl} \item[25/192] \mb{25/192} \begin{gl} \item[296] {\rm Sq(1,1)[290] + Sq(1,1)[289] + Sq(1,1)[287] + Sq(4)[285]} \\ $h_{2}:$ [285] \item[297] {\rm Sq(0,1)[291]} \item[298] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \\ $h_{2}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[24/192] \mb{24/192} \begin{gl} \item[297] {\rm Sq(1,1)[294] + Sq(1,1)[293] + Sq(1,1)[292]} \item[298] {\rm Sq(0,1)[295]} \item[299] {\rm Sq(3)[296] + Sq(0,1)[296] + Sq(3)[295]} \item[300] {\rm Sq(1)[305] + Sq(1)[304] + Sq(1)[303]} \\ $h_{0}:$ [305], [304], [303] \\ $h_{1}:$ [301], [300], [299] \\ $h_{2}:$ [292] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[23/192] \mb{23/192} \begin{gl} \item[303] {\rm Sq(0,1)[311]} \\ $h_{7}:$ [13] \item[304] {\rm Sq(0,1)[312] + Sq(0,1)[310]} \item[305] {\rm Sq(3)[312] + Sq(3)[310]} \end{gl} \end{bdl} \begin{bdl} \item[22/192] \mb{22/192} \begin{gl} \item[318] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{1}:$ [324] \\ $h_{2}:$ [316], [315] \\ $h_{4}:$ [263], [261] \\ $h_{5}:$ [208] \item[319] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \\ $h_{1}:$ [325] \\ $h_{3}:$ [301], [300], [299] \\ $h_{4}:$ [263], [261] \\ $h_{6}:$ [113], [111] \end{gl} \end{bdl} \begin{bdl} \item[21/192] \mb{21/192} \begin{gl} \item[327] {\rm Sq(2,1)[313]} \item[328] {\rm Sq(3)[325] + Sq(0,1)[325] + Sq(3)[323] + Sq(0,1)[323]} \item[329] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{3}:$ [302], [300], [299] \\ $h_{6}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[20/192] \mb{20/192} \begin{gl} \item[330] {\rm Sq(1,1)[333] + Sq(1,1)[332]} \\ $h_{3}:$ [308], [307] \item[331] {\rm Sq(3)[339] + Sq(3)[336] + Sq(0,1)[336]} \\ $h_{3}:$ [308], [307] \\ $h_{7}:$ [15] \item[332] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \\ $h_{1}:$ [342], [341] \\ $h_{2}:$ [333], [332], [331], [330] \\ $h_{3}:$ [310], [309], [307] \\ $h_{4}:$ [268] \item[333] {\rm Sq(1)[345] + Sq(1)[343]} \\ $h_{0}:$ [345], [343] \\ $h_{1}:$ [342], [341] \\ $h_{2}:$ [333], [332] \\ $h_{3}:$ [308] \\ $h_{7}:$ [15] \item[334] {\rm Sq(1)[346]} \\ $h_{0}:$ [346] \\ $h_{1}:$ [341] \\ $h_{2}:$ [332], [331] \\ $h_{3}:$ [311], [309], [308], [307] \\ $h_{4}:$ [270], [269], [268] \end{gl} \end{bdl} \begin{bdl} \item[19/192] \mb{19/192} \begin{gl} \item[343] {\rm Sq(1,1)[349] + Sq(1,1)[347] + Sq(4)[345] + Sq(4)[343]} \\ $h_{2}:$ [345], [343] \\ $h_{3}:$ [317], [316], [315] \\ $h_{4}:$ [277] \item[344] {\rm Sq(3)[350] + Sq(0,1)[350]} \\ $h_{2}:$ [345], [343] \\ $h_{3}:$ [317], [316], [315] \item[345] {\rm Sq(1)[360] + Sq(1)[359]} \\ $h_{0}:$ [360], [359] \\ $h_{3}:$ [317], [316], [315] \\ $h_{4}:$ [277] \item[346] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{2}:$ [343] \\ $h_{3}:$ [320], [316], [315] \item[347] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{1}:$ [356], [354], [353] \\ $h_{2}:$ [347], [346], [345], [343] \\ $h_{3}:$ [320], [319], [316], [315] \\ $h_{4}:$ [279] \end{gl} \end{bdl} \begin{bdl} \item[18/192] \mb{18/192} \begin{gl} \item[359] {\rm Sq(0,1)[353] + Sq(3)[352]} \\ $h_{2}:$ [343] \\ $h_{5}:$ [229] \item[360] {\rm Sq(3)[354] + Sq(3)[353] + Sq(3)[352]} \\ $h_{2}:$ [343] \\ $h_{5}:$ [229] \item[361] {\rm Sq(3)[356] + Sq(0,1)[356] + Sq(3)[355] + Sq(0,1)[355] + Sq(0,1)[352]} \\ $h_{3}:$ [318] \item[362] {\rm Sq(1)[367] + Sq(1)[366] + Sq(1)[364]} \\ $h_{0}:$ [367], [366], [364] \\ $h_{2}:$ [344], [343], [341] \\ $h_{3}:$ [318] \\ $h_{4}:$ [282] \item[363] {\rm Sq(1)[368] + Sq(1)[366] + Sq(1)[365] + Sq(1)[364] + Sq(1)[363] + Sq(1)[362]} \\ $h_{0}:$ [368], [366], [365], [364], [363], [362] \\ $h_{1}:$ [357] \\ $h_{2}:$ [347], [344], [341] \\ $h_{3}:$ [319], [318] \\ $h_{4}:$ [282] \\ $h_{5}:$ [229] \end{gl} \end{bdl} \begin{bdl} \item[17/192] \mb{17/192} \begin{gl} \item[362] {\rm Sq(0,1)[352] + Sq(0,1)[351]} \\ $h_{7}:$ [25] \item[363] {\rm Sq(3)[355] + Sq(3)[354] + Sq(3)[352] + Sq(3)[351] + Sq(0,1)[351]} \item[364] {\rm Sq(3)[360] + Sq(0,1)[360] + Sq(3)[356] + Sq(0,1)[356] + Sq(3)[354] + Sq(3)[353] + Sq(0,1)[353] + Sq(3)[352] + Sq(3)[351]} \\ $h_{4}:$ [286] \\ $h_{7}:$ [25] \item[365] {\rm Sq(1)[366]} \\ $h_{0}:$ [366] \\ $h_{2}:$ [345] \\ $h_{3}:$ [324] \\ $h_{4}:$ [287] \\ $h_{7}:$ [25] \item[366] {\rm Sq(1)[367]} \\ $h_{0}:$ [367] \\ $h_{2}:$ [345] \\ $h_{3}:$ [325], [323] \\ $h_{4}:$ [287], [285] \\ $h_{7}:$ [25] \item[367] {\rm Sq(1)[368]} \\ $h_{0}:$ [368] \\ $h_{2}:$ [345] \\ $h_{3}:$ [325], [323] \\ $h_{4}:$ [286], [285] \item[368] {\rm Sq(1)[371]} \\ $h_{0}:$ [371] \\ $h_{2}:$ [345] \\ $h_{3}:$ [325], [324] \\ $h_{4}:$ [287], [286], [285] \end{gl} \end{bdl} \begin{bdl} \item[16/192] \mb{16/192} \begin{gl} \item[366] {\rm Sq(0,1)[362] + Sq(3)[361] + Sq(3)[360] + Sq(0,1)[360]} \\ $h_{3}:$ [332] \item[367] {\rm Sq(0,1)[363] + Sq(3)[362] + Sq(0,1)[361] + Sq(3)[360]} \\ $h_{3}:$ [333], [331] \item[368] {\rm Sq(3)[366] + Sq(0,1)[366] + Sq(3)[365] + Sq(0,1)[365] + Sq(0,1)[361] + Sq(3)[360]} \\ $h_{3}:$ [333], [331] \item[369] {\rm Sq(2)[371] + Sq(2)[369] + Sq(2)[368] + Sq(2)[367]} \\ $h_{1}:$ [371], [369], [368], [367] \\ $h_{2}:$ [357], [356] \\ $h_{3}:$ [333], [332], [329] \\ $h_{4}:$ [292] \item[370] {\rm Sq(2)[372] + Sq(2)[367]} \\ $h_{1}:$ [372], [367] \\ $h_{2}:$ [356], [355] \\ $h_{3}:$ [332], [330], [329] \\ $h_{4}:$ [293] \\ $h_{5}:$ [235] \item[371] {\rm Sq(1)[377]} \\ $h_{0}:$ [377] \\ $h_{3}:$ [333], [332] \item[372] {\rm Sq(1)[379]} \\ $h_{0}:$ [379] \\ $h_{1}:$ [370] \\ $h_{3}:$ [333], [332] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[15/192] \mb{15/192} \begin{gl} \item[377] {\rm Sq(0,1)[372] + Sq(0,1)[371]} \item[378] {\rm Sq(2)[376]} \\ $h_{1}:$ [376] \\ $h_{4}:$ [309] \item[379] {\rm Sq(1)[382] + Sq(1)[381] + Sq(1)[380]} \\ $h_{0}:$ [382], [381], [380] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[14/192] \mb{14/192} \begin{gl} \item[380] {\rm Sq(1,1)[362] + Sq(1,1)[361] + Sq(1,1)[359]} \item[381] {\rm Sq(1,1)[363] + Sq(1,1)[361] + Sq(1,1)[359]} \\ $h_{7}:$ [29], [28] \item[382] {\rm Sq(3)[367] + Sq(0,1)[367] + Sq(3)[365] + Sq(0,1)[365]} \\ $h_{7}:$ [28] \item[383] {\rm Sq(2)[371] + Sq(2)[369]} \\ $h_{1}:$ [371], [369] \\ $h_{7}:$ [29] \item[384] {\rm Sq(1)[373]} \\ $h_{0}:$ [373] \\ $h_{3}:$ [339] \\ $h_{7}:$ [29] \item[385] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{2}:$ [361], [359] \\ $h_{3}:$ [337] \item[386] {\rm Sq(1)[376]} \\ $h_{0}:$ [376] \\ $h_{1}:$ [370] \\ $h_{2}:$ [361] \\ $h_{3}:$ [340], [339], [338], [337] \\ $h_{5}:$ [252], [251] \item[387] {\rm Sq(1)[377]} \\ $h_{0}:$ [377] \\ $h_{1}:$ [369] \\ $h_{2}:$ [361] \\ $h_{3}:$ [340], [339], [338], [337] \\ $h_{5}:$ [252], [251] \end{gl} \end{bdl} \begin{bdl} \item[13/192] \mb{13/192} \begin{gl} \item[373] {\rm Sq(0,1)[363]} \\ $h_{3}:$ [340] \item[374] {\rm Sq(3)[363] + Sq(3)[362]} \\ $h_{2}:$ [357] \item[375] {\rm Sq(3)[364] + Sq(3)[362] + Sq(3)[361]} \\ $h_{2}:$ [357] \\ $h_{5}:$ [262] \\ $h_{7}:$ [29] \item[376] {\rm Sq(1)[369]} \\ $h_{0}:$ [369] \\ $h_{2}:$ [357] \\ $h_{3}:$ [341], [340] \item[377] {\rm Sq(1)[371]} \\ $h_{0}:$ [371] \\ $h_{2}:$ [357] \\ $h_{3}:$ [341], [340] \item[378] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{2}:$ [360], [357] \\ $h_{3}:$ [341], [340] \\ $h_{5}:$ [262] \\ $h_{7}:$ [30], [29] \end{gl} \end{bdl} \begin{bdl} \item[12/192] \mb{12/192} \begin{gl} \item[369] {\rm Sq(1,1)[356]} \\ $h_{3}:$ [344] \item[370] {\rm Sq(4)[356] + Sq(4)[354] + Sq(1,1)[354]} \\ $h_{2}:$ [356], [354] \item[371] {\rm Sq(1,1)[357] + Sq(1,1)[355] + Sq(1,1)[354]} \\ $h_{3}:$ [344] \item[372] {\rm Sq(1,1)[359] + Sq(1,1)[355]} \item[373] {\rm Sq(2)[364] + Sq(2)[363] + Sq(2)[362] + Sq(2)[361]} \\ $h_{1}:$ [364], [363], [362], [361] \\ $h_{3}:$ [344] \\ $h_{7}:$ [31] \item[374] {\rm Sq(1)[367]} \\ $h_{0}:$ [367] \\ $h_{2}:$ [358], [355], [354] \\ $h_{3}:$ [344] \\ $h_{7}:$ [32] \item[375] {\rm Sq(1)[368]} \\ $h_{0}:$ [368] \\ $h_{1}:$ [363] \\ $h_{2}:$ [355], [354] \end{gl} \end{bdl} \begin{bdl} \item[11/192] \mb{11/192} \begin{gl} \item[367] {\rm Sq(3,1)[333] + Sq(0,2)[333]} \\ $h_{7}:$ [34] \item[368] {\rm Sq(3)[343]} \item[369] {\rm Sq(1)[350] + Sq(1)[348]} \\ $h_{0}:$ [350], [348] \\ $h_{1}:$ [345] \\ $h_{2}:$ [339] \\ $h_{5}:$ [277], [276] \\ $h_{6}:$ [153], [152] \end{gl} \end{bdl} \begin{bdl} \item[10/192] \mb{10/192} \begin{gl} \item[347] {\rm Sq(1,1)[308] + Sq(1,1)[307]} \item[348] {\rm Sq(1,1)[309] + Sq(1,1)[307]} \item[349] {\rm Sq(3)[310] + Sq(0,1)[310]} \\ $h_{2}:$ [308], [307], [306] \\ $h_{7}:$ [37] \item[350] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \\ $h_{2}:$ [308] \\ $h_{5}:$ [249], [247] \\ $h_{6}:$ [146] \item[351] {\rm Sq(1)[317]} \\ $h_{0}:$ [317] \\ $h_{1}:$ [313] \\ $h_{2}:$ [308], [306] \\ $h_{3}:$ [301] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[9/192] \mb{9/192} \begin{gl} \item[316] {\rm Sq(3,1)[266] + Sq(3,1)[265]} \item[317] {\rm Sq(1)[279] + Sq(1)[278]} \\ $h_{0}:$ [279], [278] \\ $h_{3}:$ [264] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[8/192] \mb{8/192} \begin{gl} \item[278] {\rm Sq(3)[236] + Sq(0,1)[236]} \\ $h_{2}:$ [234] \\ $h_{4}:$ [220] \\ $h_{5}:$ [186] \\ $h_{6}:$ [117] \\ $h_{7}:$ [38] \item[279] {\rm Sq(3)[237]} \\ $h_{2}:$ [234] \\ $h_{3}:$ [228] \\ $h_{4}:$ [220] \\ $h_{5}:$ [186] \\ $h_{6}:$ [117] \\ $h_{7}:$ [39], [38] \end{gl} \end{bdl} \begin{bdl} \item[7/192] \mb{7/192} \begin{gl} \item[241] {\rm Sq(3)[194]} \\ $h_{2}:$ [191] \\ $h_{7}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[6/192] \mb{6/192} \begin{gl} \item[197] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{1}:$ [141] \\ $h_{2}:$ [139] \\ $h_{5}:$ [114] \\ $h_{6}:$ [83], [81] \\ $h_{7}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[5/192] \mb{5/192} \begin{gl} \item[142] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \\ $h_{2}:$ [90] \\ $h_{5}:$ [78] \\ $h_{6}:$ [57] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[4/192] \mb{4/192} \begin{gl} \item[92] {\rm Sq(4)[56]} \\ $h_{2}:$ [56] \\ $h_{5}:$ [53] \\ $h_{6}:$ [39] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \dm{193} \begin{bdl} \item[97/193] \mb{97/193} \begin{gl} \item[1] {\rm Sq(3)[1] + Sq(0,1)[1]} \end{gl} \end{bdl} \begin{bdl} \item[96/193] \mb{96/193} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[95/193] \mb{95/193} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[94/193] \mb{94/193} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[93/193] \mb{93/193} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[92/193] \mb{92/193} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[87/193] \mb{87/193} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[86/193] \mb{86/193} \begin{gl} \item[13] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[83/193] \mb{83/193} \begin{gl} \item[15] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[80/193] \mb{80/193} \begin{gl} \item[25] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[79/193] \mb{79/193} \begin{gl} \item[23] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[78/193] \mb{78/193} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[77/193] \mb{77/193} \begin{gl} \item[28] {\rm Sq(1,1)[26]} \item[29] {\rm Sq(0,1)[28]} \end{gl} \end{bdl} \begin{bdl} \item[76/193] \mb{76/193} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[75/193] \mb{75/193} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[74/193] \mb{74/193} \begin{gl} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[71/193] \mb{71/193} \begin{gl} \item[40] {\rm Sq(0,1)[41]} \item[41] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [43] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[70/193] \mb{70/193} \begin{gl} \item[45] {\rm Sq(0,1)[44]} \end{gl} \end{bdl} \begin{bdl} \item[68/193] \mb{68/193} \begin{gl} \item[48] {\rm Sq(0,1)[51]} \item[49] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[67/193] \mb{67/193} \begin{gl} \item[54] {\rm Sq(0,1)[59]} \end{gl} \end{bdl} \begin{bdl} \item[65/193] \mb{65/193} \begin{gl} \item[65] {\rm Sq(0,1)[59]} \item[66] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[64/193] \mb{64/193} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[63/193] \mb{63/193} \begin{gl} \item[67] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{1}:$ [70] \item[68] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{3}:$ [58] \end{gl} \end{bdl} \begin{bdl} \item[62/193] \mb{62/193} \begin{gl} \item[72] {\rm Sq(1,1)[71]} \item[73] {\rm Sq(0,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[61/193] \mb{61/193} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{1}:$ [77] \\ $h_{2}:$ [72] \item[79] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[60/193] \mb{60/193} \begin{gl} \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [77] \item[81] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \item[82] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [80], [77] \end{gl} \end{bdl} \begin{bdl} \item[59/193] \mb{59/193} \begin{gl} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(0,1)[88]} \item[88] {\rm Sq(0,1)[89]} \item[89] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \item[90] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[58/193] \mb{58/193} \begin{gl} \item[92] {\rm Sq(2,1)[87]} \item[93] {\rm Sq(0,1)[89]} \item[94] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[56/193] \mb{56/193} \begin{gl} \item[98] {\rm Sq(0,1)[100]} \item[99] {\rm Sq(0,1)[101]} \item[100] {\rm Sq(0,1)[102]} \end{gl} \end{bdl} \begin{bdl} \item[55/193] \mb{55/193} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \end{gl} \end{bdl} \begin{bdl} \item[53/193] \mb{53/193} \begin{gl} \item[115] {\rm Sq(0,1)[117]} \item[116] {\rm Sq(0,1)[118]} \item[117] {\rm Sq(0,1)[119]} \item[118] {\rm Sq(3)[120] + Sq(0,1)[120]} \end{gl} \end{bdl} \begin{bdl} \item[52/193] \mb{52/193} \begin{gl} \item[122] {\rm Sq(0,1)[128]} \item[123] {\rm Sq(0,1)[129]} \item[124] {\rm Sq(0,1)[130]} \end{gl} \end{bdl} \begin{bdl} \item[50/193] \mb{50/193} \begin{gl} \item[145] {\rm Sq(0,1)[136]} \item[146] {\rm Sq(0,1)[137]} \item[147] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[49/193] \mb{49/193} \begin{gl} \item[143] {\rm Sq(0,1)[136]} \item[144] {\rm Sq(0,1)[137]} \item[145] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[48/193] \mb{48/193} \begin{gl} \item[145] {\rm Sq(0,1)[144]} \item[146] {\rm Sq(2)[150]} \\ $h_{1}:$ [150] \item[147] {\rm Sq(1)[155]} \\ $h_{0}:$ [155] \\ $h_{3}:$ [126] \end{gl} \end{bdl} \begin{bdl} \item[47/193] \mb{47/193} \begin{gl} \item[152] {\rm Sq(0,1)[151]} \item[153] {\rm Sq(0,1)[152]} \item[154] {\rm Sq(0,1)[153]} \item[155] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{3}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[46/193] \mb{46/193} \begin{gl} \item[158] {\rm Sq(0,1)[155]} \item[159] {\rm Sq(0,1)[156]} \item[160] {\rm Sq(0,1)[157]} \item[161] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{3}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[45/193] \mb{45/193} \begin{gl} \item[164] {\rm Sq(0,1)[163]} \item[165] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{1}:$ [168] \\ $h_{2}:$ [161] \item[166] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{3}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[44/193] \mb{44/193} \begin{gl} \item[169] {\rm Sq(0,1)[174]} \item[170] {\rm Sq(0,1)[175]} \item[171] {\rm Sq(0,1)[176]} \item[172] {\rm Sq(0,1)[177]} \item[173] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{2}:$ [172] \item[174] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[43/193] \mb{43/193} \begin{gl} \item[181] {\rm Sq(1,1)[184]} \item[182] {\rm Sq(0,1)[185]} \item[183] {\rm Sq(0,1)[186]} \item[184] {\rm Sq(0,1)[187]} \item[185] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[42/193] \mb{42/193} \begin{gl} \item[195] {\rm Sq(2,1)[184]} \item[196] {\rm Sq(0,1)[192]} \end{gl} \end{bdl} \begin{bdl} \item[41/193] \mb{41/193} \begin{gl} \item[201] {\rm Sq(0,1)[196]} \item[202] {\rm Sq(0,1)[197] + Sq(0,1)[195]} \item[203] {\rm Sq(0,1)[198]} \item[204] {\rm Sq(3)[199] + Sq(0,1)[199] + Sq(0,1)[195] + Sq(3)[194]} \item[205] {\rm Sq(1)[206] + Sq(1)[205] + Sq(1)[204]} \\ $h_{0}:$ [206], [205], [204] \\ $h_{1}:$ [201] \\ $h_{2}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[40/193] \mb{40/193} \begin{gl} \item[203] {\rm Sq(0,1)[202]} \item[204] {\rm Sq(0,1)[203]} \item[205] {\rm Sq(0,1)[204]} \item[206] {\rm Sq(0,1)[205]} \item[207] {\rm Sq(0,1)[206]} \end{gl} \end{bdl} \begin{bdl} \item[39/193] \mb{39/193} \begin{gl} \item[213] {\rm Sq(0,1)[217]} \item[214] {\rm Sq(1)[227] + Sq(1)[226]} \\ $h_{0}:$ [227], [226] \\ $h_{1}:$ [223], [222], [221], [220], [219] \end{gl} \end{bdl} \begin{bdl} \item[38/193] \mb{38/193} \begin{gl} \item[224] {\rm Sq(0,1)[230]} \item[225] {\rm Sq(0,1)[232]} \item[226] {\rm Sq(0,1)[233] + Sq(0,1)[231]} \item[227] {\rm Sq(3)[233] + Sq(0,1)[231] + Sq(3)[229] + Sq(0,1)[229]} \end{gl} \end{bdl} \begin{bdl} \item[37/193] \mb{37/193} \begin{gl} \item[238] {\rm Sq(2,1)[230] + Sq(2,1)[229] + Sq(2,1)[227]} \item[239] {\rm Sq(0,1)[237]} \item[240] {\rm Sq(0,1)[239]} \item[241] {\rm Sq(0,1)[240]} \item[242] {\rm Sq(3)[241] + Sq(3)[239] + Sq(3)[238] + Sq(0,1)[238] + Sq(3)[237]} \end{gl} \end{bdl} \begin{bdl} \item[36/193] \mb{36/193} \begin{gl} \item[249] {\rm Sq(0,1)[248]} \item[250] {\rm Sq(0,1)[249]} \end{gl} \end{bdl} \begin{bdl} \item[35/193] \mb{35/193} \begin{gl} \item[257] {\rm Sq(0,1)[253]} \item[258] {\rm Sq(0,1)[254]} \item[259] {\rm Sq(0,1)[255]} \item[260] {\rm Sq(1)[267] + Sq(1)[263]} \\ $h_{0}:$ [267], [263] \\ $h_{1}:$ [259] \\ $h_{2}:$ [252] \\ $h_{3}:$ [236], [234], [233] \end{gl} \end{bdl} \begin{bdl} \item[34/193] \mb{34/193} \begin{gl} \item[263] {\rm Sq(1,1)[253]} \item[264] {\rm Sq(0,1)[254]} \item[265] {\rm Sq(0,1)[255]} \item[266] {\rm Sq(0,1)[256]} \item[267] {\rm Sq(1)[267]} \\ $h_{0}:$ [267] \\ $h_{2}:$ [253] \\ $h_{3}:$ [238] \end{gl} \end{bdl} \begin{bdl} \item[33/193] \mb{33/193} \begin{gl} \item[264] {\rm Sq(0,1)[254]} \item[265] {\rm Sq(0,1)[255]} \item[266] {\rm Sq(0,1)[256]} \item[267] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{3}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[32/193] \mb{32/193} \begin{gl} \item[266] {\rm Sq(0,1)[256]} \item[267] {\rm Sq(0,1)[257]} \item[268] {\rm Sq(2)[265] + Sq(2)[263] + Sq(2)[261]} \\ $h_{1}:$ [265], [263], [261] \item[269] {\rm Sq(1)[272] + Sq(1)[271] + Sq(1)[268]} \\ $h_{0}:$ [272], [271], [268] \\ $h_{3}:$ [240], [237] \item[270] {\rm Sq(1)[273] + Sq(1)[270] + Sq(1)[268]} \\ $h_{0}:$ [273], [270], [268] \\ $h_{3}:$ [242], [238] \end{gl} \end{bdl} \begin{bdl} \item[31/193] \mb{31/193} \begin{gl} \item[268] {\rm Sq(2,1)[255]} \item[269] {\rm Sq(0,1)[264]} \item[270] {\rm Sq(0,1)[265] + Sq(0,1)[263] + Sq(0,1)[262]} \item[271] {\rm Sq(3)[265] + Sq(3)[262] + Sq(0,1)[262]} \item[272] {\rm Sq(1)[273]} \\ $h_{0}:$ [273] \item[273] {\rm Sq(1)[275]} \\ $h_{0}:$ [275] \\ $h_{3}:$ [245], [241] \end{gl} \end{bdl} \begin{bdl} \item[30/193] \mb{30/193} \begin{gl} \item[272] {\rm Sq(0,1)[272]} \item[273] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \item[274] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \\ $h_{1}:$ [276], [274] \\ $h_{7}:$ [7] \item[275] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \\ $h_{3}:$ [253] \end{gl} \end{bdl} \begin{bdl} \item[29/193] \mb{29/193} \begin{gl} \item[280] {\rm Sq(0,1)[279]} \item[281] {\rm Sq(0,1)[280]} \item[282] {\rm Sq(3)[280]} \item[283] {\rm Sq(2)[281]} \\ $h_{1}:$ [281] \\ $h_{2}:$ [274] \item[284] {\rm Sq(1)[286] + Sq(1)[285]} \\ $h_{0}:$ [286], [285] \\ $h_{7}:$ [6] \item[285] {\rm Sq(1)[289] + Sq(1)[284]} \\ $h_{0}:$ [289], [284] \\ $h_{3}:$ [261] \end{gl} \end{bdl} \begin{bdl} \item[28/193] \mb{28/193} \begin{gl} \item[284] {\rm Sq(2,1)[279] + Sq(2,1)[278]} \item[285] {\rm Sq(1,1)[281]} \item[286] {\rm Sq(1,1)[283]} \\ $h_{7}:$ [7] \item[287] {\rm Sq(0,1)[284]} \\ $h_{7}:$ [7] \item[288] {\rm Sq(0,1)[285]} \\ $h_{7}:$ [7] \item[289] {\rm Sq(1)[290] + Sq(1)[289]} \\ $h_{0}:$ [290], [289] \end{gl} \end{bdl} \begin{bdl} \item[27/193] \mb{27/193} \begin{gl} \item[289] {\rm Sq(1,1)[288] + Sq(1,1)[287]} \item[290] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \item[291] {\rm Sq(1)[300] + Sq(1)[298]} \\ $h_{0}:$ [300], [298] \\ $h_{2}:$ [288], [287] \\ $h_{3}:$ [268], [267] \\ $h_{4}:$ [244] \\ $h_{5}:$ [184], [182] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[26/193] \mb{26/193} \begin{gl} \item[297] {\rm Sq(1,1)[287]} \item[298] {\rm Sq(1,1)[289]} \item[299] {\rm Sq(0,1)[292] + Sq(0,1)[291]} \item[300] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{2}:$ [287] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[25/193] \mb{25/193} \begin{gl} \item[299] {\rm Sq(0,1)[294]} \item[300] {\rm Sq(0,1)[295]} \\ $h_{7}:$ [13] \item[301] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{1}:$ [297] \\ $h_{2}:$ [291] \end{gl} \end{bdl} \begin{bdl} \item[24/193] \mb{24/193} \begin{gl} \item[301] {\rm Sq(3)[301] + Sq(3)[300] + Sq(3)[299]} \item[302] {\rm Sq(2)[304]} \\ $h_{1}:$ [304] \item[303] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \end{gl} \end{bdl} \begin{bdl} \item[23/193] \mb{23/193} \begin{gl} \item[306] {\rm Sq(3)[315]} \item[307] {\rm Sq(3)[317] + Sq(0,1)[317] + Sq(0,1)[315]} \end{gl} \end{bdl} \begin{bdl} \item[22/193] \mb{22/193} \begin{gl} \item[320] {\rm Sq(5)[318] + Sq(2,1)[318] + Sq(2,1)[317] + Sq(5)[315] + Sq(2,1)[315]} \item[321] {\rm Sq(3)[323] + Sq(0,1)[323] + Sq(0,1)[322]} \\ $h_{7}:$ [17] \item[322] {\rm Sq(2)[328] + Sq(2)[327]} \\ $h_{1}:$ [328], [327] \\ $h_{4}:$ [267], [266], [265] \end{gl} \end{bdl} \begin{bdl} \item[21/193] \mb{21/193} \begin{gl} \item[330] {\rm Sq(1)[336] + Sq(1)[335]} \\ $h_{0}:$ [336], [335] \\ $h_{1}:$ [330] \\ $h_{2}:$ [324] \\ $h_{3}:$ [306], [305] \\ $h_{4}:$ [265] \end{gl} \end{bdl} \begin{bdl} \item[20/193] \mb{20/193} \begin{gl} \item[335] {\rm Sq(1,1)[337] + Sq(1,1)[336]} \item[336] {\rm Sq(1)[351] + Sq(1)[349]} \\ $h_{0}:$ [351], [349] \\ $h_{3}:$ [314] \end{gl} \end{bdl} \begin{bdl} \item[19/193] \mb{19/193} \begin{gl} \item[348] {\rm Sq(5)[349] + Sq(2,1)[349] + Sq(5)[347] + Sq(2,1)[347] + Sq(5)[346] + Sq(2,1)[346] + Sq(5)[345] + Sq(2,1)[345] + Sq(5)[344] + Sq(2,1)[344] + Sq(5)[343]} \item[349] {\rm Sq(1,1)[350]} \item[350] {\rm Sq(0,1)[354]} \\ $h_{7}:$ [19] \item[351] {\rm Sq(3)[356] + Sq(3)[355] + Sq(3)[353]} \\ $h_{3}:$ [321] \item[352] {\rm Sq(3)[357] + Sq(0,1)[357] + Sq(3)[354]} \\ $h_{3}:$ [322] \\ $h_{7}:$ [19] \item[353] {\rm Sq(2)[360] + Sq(2)[359]} \\ $h_{1}:$ [360], [359] \\ $h_{3}:$ [322] \\ $h_{7}:$ [19] \item[354] {\rm Sq(1)[367] + Sq(1)[365] + Sq(1)[364]} \\ $h_{0}:$ [367], [365], [364] \\ $h_{1}:$ [361] \\ $h_{2}:$ [350] \\ $h_{3}:$ [327], [326], [324] \end{gl} \end{bdl} \begin{bdl} \item[18/193] \mb{18/193} \begin{gl} \item[364] {\rm Sq(3)[360] + Sq(0,1)[360] + Sq(3)[358] + Sq(0,1)[358] + Sq(0,1)[357]} \\ $h_{2}:$ [352], [351] \\ $h_{3}:$ [323], [321] \item[365] {\rm Sq(3)[361] + Sq(0,1)[361] + Sq(3)[357] + Sq(0,1)[357]} \\ $h_{2}:$ [352], [351] \item[366] {\rm Sq(1)[369]} \\ $h_{0}:$ [369] \\ $h_{3}:$ [327], [321] \\ $h_{4}:$ [283] \item[367] {\rm Sq(1)[372] + Sq(1)[371] + Sq(1)[370]} \\ $h_{0}:$ [372], [371], [370] \\ $h_{2}:$ [351] \\ $h_{3}:$ [327], [326], [324], [321] \item[368] {\rm Sq(1)[373]} \\ $h_{0}:$ [373] \\ $h_{2}:$ [351] \\ $h_{3}:$ [327], [326], [324] \end{gl} \end{bdl} \begin{bdl} \item[17/193] \mb{17/193} \begin{gl} \item[369] {\rm Sq(1,1)[356] + Sq(1,1)[353]} \\ $h_{3}:$ [327] \item[370] {\rm Sq(0,1)[361]} \\ $h_{3}:$ [327] \\ $h_{4}:$ [288] \item[371] {\rm Sq(3)[361]} \\ $h_{3}:$ [327] \\ $h_{4}:$ [288] \item[372] {\rm Sq(0,1)[363]} \\ $h_{3}:$ [327], [326] \item[373] {\rm Sq(3)[363]} \\ $h_{3}:$ [327], [326] \item[374] {\rm Sq(2)[368] + Sq(2)[367]} \\ $h_{1}:$ [368], [367] \\ $h_{4}:$ [288] \item[375] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{2}:$ [353], [352], [351] \\ $h_{3}:$ [327] \\ $h_{4}:$ [288] \item[376] {\rm Sq(1)[378] + Sq(1)[377]} \\ $h_{0}:$ [378], [377] \\ $h_{2}:$ [359], [358], [353], [352] \\ $h_{3}:$ [326] \\ $h_{4}:$ [292], [290] \end{gl} \end{bdl} \begin{bdl} \item[16/193] \mb{16/193} \begin{gl} \item[373] {\rm Sq(0,1)[369] + Sq(0,1)[368] + Sq(0,1)[367]} \\ $h_{7}:$ [24] \item[374] {\rm Sq(3)[370]} \item[375] {\rm Sq(3)[372] + Sq(0,1)[371] + Sq(3)[368] + Sq(0,1)[368] + Sq(3)[367]} \\ $h_{7}:$ [24] \item[376] {\rm Sq(2)[377]} \\ $h_{1}:$ [377] \\ $h_{3}:$ [337] \item[377] {\rm Sq(1)[382]} \\ $h_{0}:$ [382] \\ $h_{2}:$ [363], [362] \\ $h_{3}:$ [339] \\ $h_{4}:$ [298], [295] \\ $h_{7}:$ [24] \item[378] {\rm Sq(1)[384]} \\ $h_{0}:$ [384] \\ $h_{3}:$ [339] \\ $h_{4}:$ [294] \\ $h_{7}:$ [24] \item[379] {\rm Sq(1)[385] + Sq(1)[383]} \\ $h_{0}:$ [385], [383] \\ $h_{1}:$ [378] \\ $h_{2}:$ [366], [365], [362], [361], [360] \\ $h_{4}:$ [298], [297], [296] \end{gl} \end{bdl} \begin{bdl} \item[15/193] \mb{15/193} \begin{gl} \item[380] {\rm Sq(0,1)[374]} \\ $h_{2}:$ [372], [371] \\ $h_{3}:$ [344], [342], [341] \\ $h_{4}:$ [310] \item[381] {\rm Sq(3)[375] + Sq(0,1)[375]} \\ $h_{2}:$ [372], [371] \\ $h_{4}:$ [310] \item[382] {\rm Sq(0,1)[376] + Sq(3)[374]} \\ $h_{3}:$ [346], [343], [342] \\ $h_{4}:$ [311] \item[383] {\rm Sq(3)[377] + Sq(0,1)[377] + Sq(3)[376] + Sq(0,1)[375] + Sq(3)[374]} \\ $h_{3}:$ [346], [341] \item[384] {\rm Sq(3)[379] + Sq(0,1)[379] + Sq(3)[378] + Sq(0,1)[378] + Sq(3)[376] + Sq(0,1)[375]} \\ $h_{3}:$ [346], [343], [342] \item[385] {\rm Sq(1)[391] + Sq(1)[390] + Sq(1)[389]} \\ $h_{0}:$ [391], [390], [389] \\ $h_{2}:$ [372], [371] \\ $h_{3}:$ [346], [341] \\ $h_{4}:$ [311], [310] \end{gl} \end{bdl} \begin{bdl} \item[14/193] \mb{14/193} \begin{gl} \item[388] {\rm Sq(3)[368]} \item[389] {\rm Sq(0,1)[370] + Sq(3)[369] + Sq(0,1)[369]} \item[390] {\rm Sq(3)[370] + Sq(0,1)[368]} \item[391] {\rm Sq(0,1)[371] + Sq(3)[369] + Sq(0,1)[368]} \end{gl} \end{bdl} \begin{bdl} \item[13/193] \mb{13/193} \begin{gl} \item[379] {\rm Sq(1,1)[363] + Sq(1,1)[361]} \\ $h_{7}:$ [31] \item[380] {\rm Sq(1,1)[365] + Sq(1,1)[362]} \item[381] {\rm Sq(3)[367] + Sq(0,1)[367]} \\ $h_{2}:$ [363], [361] \\ $h_{3}:$ [342] \item[382] {\rm Sq(2)[372] + Sq(2)[371] + Sq(2)[369]} \\ $h_{1}:$ [372], [371], [369] \\ $h_{2}:$ [363], [361] \\ $h_{3}:$ [342] \\ $h_{4}:$ [324] \item[383] {\rm Sq(1)[379] + Sq(1)[378] + Sq(1)[377]} \\ $h_{0}:$ [379], [378], [377] \\ $h_{1}:$ [373] \\ $h_{2}:$ [363], [362] \\ $h_{3}:$ [343], [342] \\ $h_{4}:$ [324] \\ $h_{5}:$ [270], [268] \\ $h_{6}:$ [146], [145] \\ $h_{7}:$ [32] \item[384] {\rm Sq(1)[381] + Sq(1)[377] + Sq(1)[376]} \\ $h_{0}:$ [381], [377], [376] \\ $h_{1}:$ [369] \\ $h_{2}:$ [363], [362] \\ $h_{3}:$ [343], [342] \\ $h_{5}:$ [270], [268] \\ $h_{6}:$ [146], [145] \\ $h_{7}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[12/193] \mb{12/193} \begin{gl} \item[376] {\rm Sq(3)[365] + Sq(0,1)[365] + Sq(3)[363]} \item[377] {\rm Sq(1)[370]} \\ $h_{0}:$ [370] \item[378] {\rm Sq(1)[372] + Sq(1)[371]} \\ $h_{0}:$ [372], [371] \\ $h_{1}:$ [367] \\ $h_{2}:$ [360] \\ $h_{3}:$ [346], [345] \\ $h_{7}:$ [33] \item[379] {\rm Sq(1)[373]} \\ $h_{0}:$ [373] \\ $h_{1}:$ [367] \\ $h_{2}:$ [360] \\ $h_{7}:$ [34] \item[380] {\rm Sq(1)[374] + Sq(1)[371]} \\ $h_{0}:$ [374], [371] \\ $h_{1}:$ [367] \\ $h_{2}:$ [360] \\ $h_{3}:$ [346], [345] \\ $h_{7}:$ [33] \item[381] {\rm Sq(1)[375]} \\ $h_{0}:$ [375] \\ $h_{3}:$ [346], [345] \end{gl} \end{bdl} \begin{bdl} \item[11/193] \mb{11/193} \begin{gl} \item[370] {\rm Sq(3,1)[338]} \item[371] {\rm Sq(5)[340] + Sq(2,1)[340] + Sq(5)[339] + Sq(2,1)[339]} \\ $h_{7}:$ [35] \item[372] {\rm Sq(1,1)[343]} \item[373] {\rm Sq(1,1)[344]} \\ $h_{7}:$ [36] \item[374] {\rm Sq(3)[345]} \item[375] {\rm Sq(3)[346] + Sq(0,1)[346] + Sq(0,1)[345]} \end{gl} \end{bdl} \begin{bdl} \item[10/193] \mb{10/193} \begin{gl} \item[352] {\rm Sq(1)[319] + Sq(1)[318]} \\ $h_{0}:$ [319], [318] \\ $h_{1}:$ [316] \end{gl} \end{bdl} \begin{bdl} \item[9/193] \mb{9/193} \begin{gl} \item[318] {\rm Sq(1,1)[275] + Sq(1,1)[274] + Sq(4)[272]} \\ $h_{2}:$ [272] \\ $h_{6}:$ [133] \item[319] {\rm Sq(3)[276] + Sq(0,1)[276]} \\ $h_{2}:$ [272] \\ $h_{6}:$ [133] \item[320] {\rm Sq(3)[277] + Sq(0,1)[277]} \item[321] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{2}:$ [273] \\ $h_{6}:$ [133] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[8/193] \mb{8/193} \begin{gl} \item[280] {\rm Sq(3)[239] + Sq(0,1)[239] + Sq(3)[238] + Sq(0,1)[238]} \\ $h_{7}:$ [40] \item[281] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{7}:$ [41], [40] \end{gl} \end{bdl} \begin{bdl} \item[7/193] \mb{7/193} \begin{gl} \item[242] {\rm Sq(3)[196] + Sq(0,1)[196] + Sq(3)[195] + Sq(0,1)[195]} \\ $h_{7}:$ [40] \end{gl} \end{bdl} \dm{194} \begin{bdl} \item[98/194] \mb{98/194} \begin{gl} \item[1] {\rm Sq(2)[1]} \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[93/194] \mb{93/194} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[92/194] \mb{92/194} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[91/194] \mb{91/194} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[90/194] \mb{90/194} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[89/194] \mb{89/194} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[88/194] \mb{88/194} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[85/194] \mb{85/194} \begin{gl} \item[17] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[82/194] \mb{82/194} \begin{gl} \item[19] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[79/194] \mb{79/194} \begin{gl} \item[24] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[76/194] \mb{76/194} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[75/194] \mb{75/194} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[74/194] \mb{74/194} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [34] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36], [34] \end{gl} \end{bdl} \begin{bdl} \item[73/194] \mb{73/194} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[72/194] \mb{72/194} \begin{gl} \item[38] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[70/194] \mb{70/194} \begin{gl} \item[46] {\rm Sq(0,1)[46]} \item[47] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[69/194] \mb{69/194} \begin{gl} \item[48] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[67/194] \mb{67/194} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[66/194] \mb{66/194} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[64/194] \mb{64/194} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[63/194] \mb{63/194} \begin{gl} \item[69] {\rm Sq(0,1)[71]} \item[70] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{1}:$ [72] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[62/194] \mb{62/194} \begin{gl} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[61/194] \mb{61/194} \begin{gl} \item[80] {\rm Sq(0,1)[78]} \item[81] {\rm Sq(0,1)[79]} \item[82] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[60/194] \mb{60/194} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(1)[93] + Sq(1)[92]} \\ $h_{0}:$ [93], [92] \\ $h_{3}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[59/194] \mb{59/194} \begin{gl} \item[91] {\rm Sq(2)[92]} \\ $h_{1}:$ [92] \item[92] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [93] \\ $h_{2}:$ [90] \item[93] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [93] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[58/194] \mb{58/194} \begin{gl} \item[95] {\rm Sq(0,1)[92]} \item[96] {\rm Sq(0,1)[93]} \item[97] {\rm Sq(0,1)[94]} \item[98] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [89] \item[99] {\rm Sq(1)[97]} \\ $h_{0}:$ [97] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[57/194] \mb{57/194} \begin{gl} \item[96] {\rm Sq(1,1)[94]} \item[97] {\rm Sq(0,1)[96]} \item[98] {\rm Sq(0,1)[97]} \end{gl} \end{bdl} \begin{bdl} \item[55/194] \mb{55/194} \begin{gl} \item[108] {\rm Sq(0,1)[109]} \item[109] {\rm Sq(0,1)[110]} \item[110] {\rm Sq(0,1)[111]} \end{gl} \end{bdl} \begin{bdl} \item[54/194] \mb{54/194} \begin{gl} \item[113] {\rm Sq(0,1)[112]} \item[114] {\rm Sq(0,1)[113]} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(2)[118]} \\ $h_{1}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[52/194] \mb{52/194} \begin{gl} \item[125] {\rm Sq(0,1)[134]} \item[126] {\rm Sq(0,1)[135]} \item[127] {\rm Sq(0,1)[136]} \end{gl} \end{bdl} \begin{bdl} \item[51/194] \mb{51/194} \begin{gl} \item[138] {\rm Sq(0,1)[141]} \item[139] {\rm Sq(0,1)[142]} \item[140] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[50/194] \mb{50/194} \begin{gl} \item[148] {\rm Sq(0,1)[141]} \end{gl} \end{bdl} \begin{bdl} \item[49/194] \mb{49/194} \begin{gl} \item[146] {\rm Sq(0,1)[141]} \item[147] {\rm Sq(0,1)[142]} \item[148] {\rm Sq(0,1)[143]} \item[149] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146] \\ $h_{2}:$ [139] \\ $h_{3}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[48/194] \mb{48/194} \begin{gl} \item[148] {\rm Sq(0,1)[147]} \item[149] {\rm Sq(0,1)[148]} \item[150] {\rm Sq(0,1)[149]} \item[151] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{2}:$ [145] \\ $h_{3}:$ [130] \end{gl} \end{bdl} \begin{bdl} \item[47/194] \mb{47/194} \begin{gl} \item[156] {\rm Sq(0,1)[155]} \item[157] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{2}:$ [150] \\ $h_{3}:$ [135] \item[158] {\rm Sq(1)[167]} \\ $h_{0}:$ [167] \\ $h_{3}:$ [136], [135] \end{gl} \end{bdl} \begin{bdl} \item[46/194] \mb{46/194} \begin{gl} \item[162] {\rm Sq(3)[159]} \item[163] {\rm Sq(0,1)[160]} \item[164] {\rm Sq(0,1)[161]} \item[165] {\rm Sq(0,1)[162]} \item[166] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [138] \item[167] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{3}:$ [140], [138] \end{gl} \end{bdl} \begin{bdl} \item[45/194] \mb{45/194} \begin{gl} \item[167] {\rm Sq(0,1)[165]} \item[168] {\rm Sq(0,1)[166]} \item[169] {\rm Sq(0,1)[167]} \item[170] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \item[171] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{3}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[44/194] \mb{44/194} \begin{gl} \item[175] {\rm Sq(0,1)[180]} \item[176] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \item[177] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{3}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[43/194] \mb{43/194} \begin{gl} \item[186] {\rm Sq(0,1)[190]} \item[187] {\rm Sq(0,1)[191]} \item[188] {\rm Sq(0,1)[192]} \item[189] {\rm Sq(0,1)[193]} \item[190] {\rm Sq(3)[194] + Sq(3)[193] + Sq(3)[192]} \item[191] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \item[192] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \end{gl} \end{bdl} \begin{bdl} \item[42/194] \mb{42/194} \begin{gl} \item[197] {\rm Sq(1,1)[196] + Sq(1,1)[195] + Sq(1,1)[194]} \item[198] {\rm Sq(0,1)[197]} \item[199] {\rm Sq(0,1)[198]} \item[200] {\rm Sq(0,1)[199]} \item[201] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{2}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[41/194] \mb{41/194} \begin{gl} \item[206] {\rm Sq(0,1)[202]} \item[207] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{2}:$ [194] \item[208] {\rm Sq(1)[213]} \\ $h_{0}:$ [213] \\ $h_{1}:$ [206], [205], [204] \\ $h_{2}:$ [200], [199] \end{gl} \end{bdl} \begin{bdl} \item[40/194] \mb{40/194} \begin{gl} \item[208] {\rm Sq(1,1)[207] + Sq(1,1)[205] + Sq(1,1)[203] + Sq(1,1)[202]} \item[209] {\rm Sq(0,1)[208]} \item[210] {\rm Sq(0,1)[209]} \item[211] {\rm Sq(0,1)[210]} \item[212] {\rm Sq(0,1)[211]} \item[213] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{2}:$ [205], [204], [203] \end{gl} \end{bdl} \begin{bdl} \item[39/194] \mb{39/194} \begin{gl} \item[215] {\rm Sq(0,1)[218]} \item[216] {\rm Sq(0,1)[220] + Sq(0,1)[219]} \item[217] {\rm Sq(0,1)[221]} \item[218] {\rm Sq(0,1)[222]} \item[219] {\rm Sq(3)[223] + Sq(3)[222] + Sq(3)[221] + Sq(3)[220] + Sq(3)[219] + Sq(0,1)[219] + Sq(3)[218]} \end{gl} \end{bdl} \begin{bdl} \item[38/194] \mb{38/194} \begin{gl} \item[228] {\rm Sq(1,1)[234] + Sq(1,1)[233] + Sq(1,1)[232] + Sq(1,1)[231]} \item[229] {\rm Sq(0,1)[235]} \item[230] {\rm Sq(2)[241]} \\ $h_{1}:$ [241] \end{gl} \end{bdl} \begin{bdl} \item[37/194] \mb{37/194} \begin{gl} \item[243] {\rm Sq(0,1)[243]} \item[244] {\rm Sq(0,1)[244]} \item[245] {\rm Sq(0,1)[245]} \item[246] {\rm Sq(0,1)[246]} \end{gl} \end{bdl} \begin{bdl} \item[36/194] \mb{36/194} \begin{gl} \item[251] {\rm Sq(2,1)[245]} \item[252] {\rm Sq(0,1)[251]} \item[253] {\rm Sq(0,1)[252]} \item[254] {\rm Sq(0,1)[253]} \item[255] {\rm Sq(3)[255] + Sq(0,1)[255] + Sq(3)[254]} \end{gl} \end{bdl} \begin{bdl} \item[35/194] \mb{35/194} \begin{gl} \item[261] {\rm Sq(0,1)[259]} \item[262] {\rm Sq(3)[262] + Sq(0,1)[262] + Sq(3)[260] + Sq(0,1)[260] + Sq(3)[259] + Sq(0,1)[258] + Sq(3)[257] + Sq(0,1)[257]} \end{gl} \end{bdl} \begin{bdl} \item[34/194] \mb{34/194} \begin{gl} \item[268] {\rm Sq(1,1)[257] + Sq(1,1)[256] + Sq(1,1)[255] + Sq(1,1)[254]} \item[269] {\rm Sq(0,1)[258]} \item[270] {\rm Sq(0,1)[259]} \end{gl} \end{bdl} \begin{bdl} \item[33/194] \mb{33/194} \begin{gl} \item[268] {\rm Sq(0,1)[261] + Sq(0,1)[260]} \item[269] {\rm Sq(0,1)[262]} \item[270] {\rm Sq(3)[263] + Sq(0,1)[263] + Sq(0,1)[260]} \item[271] {\rm Sq(1)[272] + Sq(1)[271]} \\ $h_{0}:$ [272], [271] \\ $h_{1}:$ [268] \\ $h_{2}:$ [259], [257] \\ $h_{3}:$ [243] \end{gl} \end{bdl} \begin{bdl} \item[32/194] \mb{32/194} \begin{gl} \item[271] {\rm Sq(3)[267] + Sq(0,1)[267] + Sq(0,1)[263] + Sq(0,1)[262] + Sq(3)[261]} \item[272] {\rm Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [277], [276] \\ $h_{2}:$ [260], [258] \\ $h_{3}:$ [246] \end{gl} \end{bdl} \begin{bdl} \item[31/194] \mb{31/194} \begin{gl} \item[274] {\rm Sq(0,1)[268]} \item[275] {\rm Sq(3)[269] + Sq(0,1)[269]} \item[276] {\rm Sq(1)[283] + Sq(1)[281] + Sq(1)[279] + Sq(1)[278] + Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [283], [281], [279], [278], [277], [276] \\ $h_{3}:$ [248], [246] \item[277] {\rm Sq(1)[284] + Sq(1)[281] + Sq(1)[280] + Sq(1)[279] + Sq(1)[278] + Sq(1)[277] + Sq(1)[276]} \\ $h_{0}:$ [284], [281], [280], [279], [278], [277], [276] \\ $h_{2}:$ [265], [262] \end{gl} \end{bdl} \begin{bdl} \item[30/194] \mb{30/194} \begin{gl} \item[276] {\rm Sq(3,1)[267] + Sq(6)[265] + Sq(0,2)[265] + Sq(6)[262] + Sq(0,2)[262] + Sq(6)[261] + Sq(3,1)[260]} \item[277] {\rm Sq(3)[276] + Sq(0,1)[276] + Sq(3)[274] + Sq(0,1)[274]} \item[278] {\rm Sq(0,1)[277] + Sq(0,1)[274]} \item[279] {\rm Sq(0,1)[278]} \item[280] {\rm Sq(3)[278] + Sq(3)[277] + Sq(3)[275] + Sq(3)[274]} \item[281] {\rm Sq(3)[279] + Sq(0,1)[279] + Sq(0,1)[276] + Sq(0,1)[275] + Sq(3)[274] + Sq(0,1)[274]} \item[282] {\rm Sq(2)[282] + Sq(2)[281]} \\ $h_{1}:$ [282], [281] \item[283] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{3}:$ [255] \item[284] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \end{gl} \end{bdl} \begin{bdl} \item[29/194] \mb{29/194} \begin{gl} \item[286] {\rm Sq(0,1)[282] + Sq(0,1)[281]} \item[287] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \item[288] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \end{gl} \end{bdl} \begin{bdl} \item[28/194] \mb{28/194} \begin{gl} \item[290] {\rm Sq(1,1)[285] + Sq(1,1)[284]} \item[291] {\rm Sq(4)[286] + Sq(1,1)[286] + Sq(4)[285] + Sq(4)[284] + Sq(1,1)[284]} \\ $h_{2}:$ [286], [285], [284] \\ $h_{5}:$ [177] \item[292] {\rm Sq(1,1)[287] + Sq(1,1)[286]} \item[293] {\rm Sq(0,1)[288]} \item[294] {\rm Sq(1)[295] + Sq(1)[293]} \\ $h_{0}:$ [295], [293] \end{gl} \end{bdl} \begin{bdl} \item[27/194] \mb{27/194} \begin{gl} \item[292] {\rm Sq(1,1)[290]} \item[293] {\rm Sq(1,1)[292] + Sq(4)[290]} \\ $h_{2}:$ [290] \item[294] {\rm Sq(0,1)[293]} \item[295] {\rm Sq(3)[295] + Sq(3)[294] + Sq(3)[293]} \\ $h_{2}:$ [290] \item[296] {\rm Sq(2)[297]} \\ $h_{1}:$ [297] \\ $h_{2}:$ [290] \end{gl} \end{bdl} \begin{bdl} \item[26/194] \mb{26/194} \begin{gl} \item[301] {\rm Sq(0,1)[297]} \item[302] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{3}:$ [276], [273] \item[303] {\rm Sq(1)[306] + Sq(1)[305] + Sq(1)[302]} \\ $h_{0}:$ [306], [305], [302] \\ $h_{1}:$ [300] \\ $h_{2}:$ [295] \\ $h_{3}:$ [276], [273] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[25/194] \mb{25/194} \begin{gl} \item[302] {\rm Sq(1,1)[296] + Sq(1,1)[294]} \\ $h_{3}:$ [277], [276] \item[303] {\rm Sq(0,1)[297]} \\ $h_{3}:$ [277], [276] \item[304] {\rm Sq(0,1)[299] + Sq(0,1)[298]} \item[305] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{1}:$ [302], [301] \\ $h_{3}:$ [277], [276] \item[306] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{1}:$ [302], [301] \\ $h_{2}:$ [295] \\ $h_{3}:$ [277], [276] \\ $h_{7}:$ [14] \item[307] {\rm Sq(1)[307] + Sq(1)[306]} \\ $h_{0}:$ [307], [306] \\ $h_{1}:$ [302], [301] \\ $h_{2}:$ [295] \\ $h_{3}:$ [279], [276] \\ $h_{6}:$ [99] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[24/194] \mb{24/194} \begin{gl} \item[304] {\rm Sq(3)[304] + Sq(0,1)[304]} \item[305] {\rm Sq(0,1)[305] + Sq(0,1)[303]} \\ $h_{7}:$ [12] \item[306] {\rm Sq(3)[305] + Sq(0,1)[304] + Sq(3)[303]} \\ $h_{2}:$ [298] \\ $h_{7}:$ [12] \item[307] {\rm Sq(1)[309] + Sq(1)[308]} \\ $h_{0}:$ [309], [308] \\ $h_{2}:$ [298] \\ $h_{3}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[23/194] \mb{23/194} \begin{gl} \item[308] {\rm Sq(1,1)[317] + Sq(1,1)[315]} \item[309] {\rm Sq(1)[325] + Sq(1)[324]} \\ $h_{0}:$ [325], [324] \\ $h_{3}:$ [299] \end{gl} \end{bdl} \begin{bdl} \item[22/194] \mb{22/194} \begin{gl} \item[323] {\rm Sq(0,1)[327]} \item[324] {\rm Sq(3)[328] + Sq(3)[327]} \item[325] {\rm Sq(1)[333] + Sq(1)[331]} \\ $h_{0}:$ [333], [331] \end{gl} \end{bdl} \begin{bdl} \item[21/194] \mb{21/194} \begin{gl} \item[331] {\rm Sq(3)[330]} \item[332] {\rm Sq(0,1)[331] + Sq(0,1)[330]} \\ $h_{7}:$ [17] \item[333] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \item[334] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \\ $h_{1}:$ [335] \\ $h_{2}:$ [326] \\ $h_{3}:$ [309] \\ $h_{4}:$ [273], [272], [271] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[20/194] \mb{20/194} \begin{gl} \item[337] {\rm Sq(1,1)[342]} \item[338] {\rm Sq(3)[345] + Sq(0,1)[345] + Sq(3)[344] + Sq(0,1)[344] + Sq(3)[343] + Sq(0,1)[343]} \\ $h_{4}:$ [278], [277], [276] \item[339] {\rm Sq(3)[346] + Sq(0,1)[346] + Sq(3)[344] + Sq(0,1)[344]} \\ $h_{4}:$ [278], [277], [276] \item[340] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \\ $h_{1}:$ [353], [350], [349], [348] \\ $h_{2}:$ [342], [341] \\ $h_{3}:$ [322], [320] \\ $h_{4}:$ [278], [277], [276] \end{gl} \end{bdl} \begin{bdl} \item[19/194] \mb{19/194} \begin{gl} \item[355] {\rm Sq(1,1)[354]} \item[356] {\rm Sq(3)[361] + Sq(0,1)[360] + Sq(0,1)[359]} \\ $h_{4}:$ [287] \item[357] {\rm Sq(1)[371] + Sq(1)[370] + Sq(1)[369]} \\ $h_{0}:$ [371], [370], [369] \\ $h_{4}:$ [287] \end{gl} \end{bdl} \begin{bdl} \item[18/194] \mb{18/194} \begin{gl} \item[369] {\rm Sq(0,1)[362]} \\ $h_{7}:$ [25] \item[370] {\rm Sq(3)[367] + Sq(0,1)[367] + Sq(3)[366] + Sq(0,1)[366] + Sq(3)[364] + Sq(0,1)[364]} \item[371] {\rm Sq(3)[368] + Sq(0,1)[368] + Sq(3)[366] + Sq(0,1)[366] + Sq(3)[365] + Sq(0,1)[365] + Sq(3)[364] + Sq(0,1)[364] + Sq(3)[363] + Sq(0,1)[363] + Sq(3)[362]} \\ $h_{7}:$ [25] \item[372] {\rm Sq(2)[374]} \\ $h_{1}:$ [374] \\ $h_{3}:$ [330], [329] \\ $h_{4}:$ [291], [290], [288] \\ $h_{7}:$ [25] \item[373] {\rm Sq(1)[380]} \\ $h_{0}:$ [380] \\ $h_{1}:$ [373], [371], [369] \\ $h_{2}:$ [360], [358] \\ $h_{3}:$ [334], [331] \\ $h_{4}:$ [292], [291], [290], [289], [288] \end{gl} \end{bdl} \begin{bdl} \item[17/194] \mb{17/194} \begin{gl} \item[377] {\rm Sq(2)[375] + Sq(2)[374] + Sq(2)[373]} \\ $h_{1}:$ [375], [374], [373] \\ $h_{3}:$ [333], [330] \item[378] {\rm Sq(2)[376]} \\ $h_{1}:$ [376] \\ $h_{2}:$ [363], [362] \\ $h_{3}:$ [338], [335], [334], [331], [330] \\ $h_{5}:$ [240] \item[379] {\rm Sq(1)[384] + Sq(1)[382] + Sq(1)[381]} \\ $h_{0}:$ [384], [382], [381] \\ $h_{3}:$ [333] \item[380] {\rm Sq(1)[386] + Sq(1)[381]} \\ $h_{0}:$ [386], [381] \\ $h_{2}:$ [363], [361] \\ $h_{3}:$ [335], [332] \\ $h_{4}:$ [294] \item[381] {\rm Sq(1)[387] + Sq(1)[381] + Sq(1)[380]} \\ $h_{0}:$ [387], [381], [380] \\ $h_{2}:$ [364], [363], [361] \\ $h_{3}:$ [335], [332] \\ $h_{4}:$ [294] \\ $h_{7}:$ [26] \item[382] {\rm Sq(1)[388] + Sq(1)[382] + Sq(1)[381]} \\ $h_{0}:$ [388], [382], [381] \\ $h_{2}:$ [363], [361] \\ $h_{3}:$ [335], [333], [332] \\ $h_{4}:$ [295] \end{gl} \end{bdl} \begin{bdl} \item[16/194] \mb{16/194} \begin{gl} \item[380] {\rm Sq(1,1)[376] + Sq(1,1)[372] + Sq(1,1)[370] + Sq(1,1)[368] + Sq(1,1)[367]} \item[381] {\rm Sq(0,1)[377]} \item[382] {\rm Sq(3)[377]} \item[383] {\rm Sq(3)[378]} \\ $h_{2}:$ [369], [368] \item[384] {\rm Sq(3)[379] + Sq(0,1)[379]} \item[385] {\rm Sq(2)[384] + Sq(2)[383] + Sq(2)[381] + Sq(2)[380]} \\ $h_{1}:$ [384], [383], [381], [380] \\ $h_{2}:$ [371], [369], [368], [367] \\ $h_{3}:$ [341] \item[386] {\rm Sq(1)[386]} \\ $h_{0}:$ [386] \\ $h_{4}:$ [300] \item[387] {\rm Sq(1)[388] + Sq(1)[387]} \\ $h_{0}:$ [388], [387] \\ $h_{2}:$ [370] \\ $h_{4}:$ [300] \\ $h_{7}:$ [25] \item[388] {\rm Sq(1)[390]} \\ $h_{0}:$ [390] \\ $h_{4}:$ [303], [302] \item[389] {\rm Sq(1)[391]} \\ $h_{0}:$ [391] \\ $h_{1}:$ [383], [382], [381], [380] \\ $h_{2}:$ [374], [373], [370], [369], [368] \\ $h_{3}:$ [341] \\ $h_{4}:$ [303], [299] \end{gl} \end{bdl} \begin{bdl} \item[15/194] \mb{15/194} \begin{gl} \item[386] {\rm Sq(1,1)[377] + Sq(1,1)[376] + Sq(1,1)[374]} \item[387] {\rm Sq(0,1)[381]} \\ $h_{7}:$ [27], [26] \item[388] {\rm Sq(0,1)[382] + Sq(0,1)[380]} \\ $h_{7}:$ [26] \item[389] {\rm Sq(2)[391] + Sq(2)[389] + Sq(2)[388]} \\ $h_{1}:$ [391], [389], [388] \item[390] {\rm Sq(1)[393] + Sq(1)[392]} \\ $h_{0}:$ [393], [392] \\ $h_{4}:$ [314], [312] \item[391] {\rm Sq(1)[394] + Sq(1)[392]} \\ $h_{0}:$ [394], [392] \\ $h_{2}:$ [375], [374] \\ $h_{4}:$ [314] \item[392] {\rm Sq(1)[396] + Sq(1)[392]} \\ $h_{0}:$ [396], [392] \\ $h_{1}:$ [390], [389], [388] \\ $h_{2}:$ [378], [377], [375] \\ $h_{3}:$ [353], [350], [349] \\ $h_{4}:$ [314], [313], [312] \item[393] {\rm Sq(1)[397]} \\ $h_{0}:$ [397] \\ $h_{1}:$ [390], [389], [388] \\ $h_{2}:$ [375], [374] \\ $h_{3}:$ [350], [349] \\ $h_{4}:$ [314] \end{gl} \end{bdl} \begin{bdl} \item[14/194] \mb{14/194} \begin{gl} \item[392] {\rm Sq(3)[374] + Sq(0,1)[374]} \\ $h_{2}:$ [370], [369] \\ $h_{3}:$ [348], [347], [346], [344] \\ $h_{4}:$ [320] \item[393] {\rm Sq(3)[376] + Sq(0,1)[376] + Sq(3)[373] + Sq(0,1)[373]} \\ $h_{2}:$ [370], [369] \\ $h_{3}:$ [348], [347], [346], [344] \item[394] {\rm Sq(3)[377] + Sq(0,1)[377] + Sq(3)[373] + Sq(0,1)[373]} \\ $h_{2}:$ [370], [369] \\ $h_{3}:$ [348], [347], [346], [344] \item[395] {\rm Sq(2)[380]} \\ $h_{1}:$ [380] \\ $h_{2}:$ [370], [369] \\ $h_{3}:$ [346], [344] \item[396] {\rm Sq(1)[385]} \\ $h_{0}:$ [385] \\ $h_{3}:$ [347], [346], [345] \item[397] {\rm Sq(1)[386]} \\ $h_{0}:$ [386] \\ $h_{3}:$ [344] \\ $h_{4}:$ [320] \end{gl} \end{bdl} \begin{bdl} \item[13/194] \mb{13/194} \begin{gl} \item[385] {\rm Sq(3)[372] + Sq(3)[371] + Sq(3)[369]} \item[386] {\rm Sq(3)[373] + Sq(3)[369]} \item[387] {\rm Sq(3)[374] + Sq(0,1)[374] + Sq(0,1)[372] + Sq(3)[371] + Sq(0,1)[371] + Sq(3)[369] + Sq(0,1)[369]} \item[388] {\rm Sq(2)[376]} \\ $h_{1}:$ [376] \item[389] {\rm Sq(1)[384] + Sq(1)[382]} \\ $h_{0}:$ [384], [382] \\ $h_{3}:$ [348], [347], [346] \\ $h_{7}:$ [33] \item[390] {\rm Sq(1)[385] + Sq(1)[382]} \\ $h_{0}:$ [385], [382] \\ $h_{2}:$ [368], [366] \\ $h_{3}:$ [348], [347], [346] \\ $h_{7}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[12/194] \mb{12/194} \begin{gl} \item[382] {\rm Sq(1,1)[365] + Sq(1,1)[363] + Sq(1,1)[361]} \\ $h_{7}:$ [35] \item[383] {\rm Sq(3)[367] + Sq(0,1)[367]} \\ $h_{2}:$ [361] \\ $h_{3}:$ [349], [348] \item[384] {\rm Sq(1)[377] + Sq(1)[376]} \\ $h_{0}:$ [377], [376] \\ $h_{3}:$ [350], [349], [348] \\ $h_{7}:$ [36], [35] \item[385] {\rm Sq(1)[378] + Sq(1)[376]} \\ $h_{0}:$ [378], [376] \\ $h_{2}:$ [363] \\ $h_{3}:$ [350], [349], [348] \\ $h_{7}:$ [36], [35] \item[386] {\rm Sq(1)[379]} \\ $h_{0}:$ [379] \\ $h_{1}:$ [375], [374], [372], [370] \\ $h_{2}:$ [365], [363], [361] \\ $h_{7}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[11/194] \mb{11/194} \begin{gl} \item[376] {\rm Sq(1)[354] + Sq(1)[353]} \\ $h_{0}:$ [354], [353] \\ $h_{2}:$ [345] \item[377] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \\ $h_{2}:$ [345] \\ $h_{3}:$ [333] \\ $h_{7}:$ [37] \item[378] {\rm Sq(1)[356] + Sq(1)[353]} \\ $h_{0}:$ [356], [353] \\ $h_{2}:$ [345] \\ $h_{3}:$ [333] \\ $h_{7}:$ [37] \item[379] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \\ $h_{2}:$ [345] \end{gl} \end{bdl} \begin{bdl} \item[10/194] \mb{10/194} \begin{gl} \item[353] {\rm Sq(6)[308] + Sq(6)[307] + Sq(0,2)[307] + Sq(0,2)[306]} \\ $h_{7}:$ [39] \item[354] {\rm Sq(5)[310] + Sq(2,1)[310]} \\ $h_{7}:$ [39] \item[355] {\rm Sq(0,1)[316]} \\ $h_{7}:$ [40] \item[356] {\rm Sq(3)[316]} \\ $h_{7}:$ [40], [39] \item[357] {\rm Sq(3)[317] + Sq(0,1)[317]} \item[358] {\rm Sq(2)[320] + Sq(2)[319] + Sq(2)[318]} \\ $h_{1}:$ [320], [319], [318] \\ $h_{2}:$ [313], [312] \\ $h_{7}:$ [40], [39] \end{gl} \end{bdl} \begin{bdl} \item[9/194] \mb{9/194} \begin{gl} \item[322] {\rm Sq(2)[280]} \\ $h_{1}:$ [280] \\ $h_{2}:$ [276] \\ $h_{7}:$ [42] \item[323] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \\ $h_{5}:$ [222] \\ $h_{6}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[8/194] \mb{8/194} \begin{gl} \item[282] {\rm Sq(5)[236]} \\ $h_{5}:$ [191], [190] \item[283] {\rm Sq(1,1)[239] + Sq(1,1)[238]} \\ $h_{5}:$ [191], [190] \item[284] {\rm Sq(1)[243]} \\ $h_{0}:$ [243] \\ $h_{2}:$ [239], [238] \\ $h_{5}:$ [191], [190] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[7/194] \mb{7/194} \begin{gl} \item[243] {\rm Sq(1)[198]} \\ $h_{0}:$ [198] \\ $h_{7}:$ [42] \item[244] {\rm Sq(1)[200]} \\ $h_{0}:$ [200] \\ $h_{2}:$ [195] \\ $h_{4}:$ [185] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[6/194] \mb{6/194} \begin{gl} \item[198] {\rm Sq(6)[138] + Sq(3,1)[138] + Sq(0,2)[138]} \\ $h_{7}:$ [39] \item[199] {\rm Sq(4)[140] + Sq(1,1)[140]} \\ $h_{2}:$ [140] \\ $h_{5}:$ [115] \\ $h_{7}:$ [38] \item[200] {\rm Sq(3)[142] + Sq(0,1)[142]} \\ $h_{7}:$ [38] \end{gl} \end{bdl} \dm{195} \begin{bdl} \item[99/195] \mb{99/195} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \\ $h_{1}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[98/195] \mb{98/195} \begin{gl} \item[2] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[97/195] \mb{97/195} \begin{gl} \item[2] {\rm Sq(3)[2]} \end{gl} \end{bdl} \begin{bdl} \item[89/195] \mb{89/195} \begin{gl} \item[15] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[88/195] \mb{88/195} \begin{gl} \item[14] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[87/195] \mb{87/195} \begin{gl} \item[12] {\rm Sq(0,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[84/195] \mb{84/195} \begin{gl} \item[17] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[81/195] \mb{81/195} \begin{gl} \item[25] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[80/195] \mb{80/195} \begin{gl} \item[26] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[79/195] \mb{79/195} \begin{gl} \item[25] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[78/195] \mb{78/195} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[76/195] \mb{76/195} \begin{gl} \item[32] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[75/195] \mb{75/195} \begin{gl} \item[35] {\rm Sq(0,1)[37]} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{3}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[74/195] \mb{74/195} \begin{gl} \item[40] {\rm Sq(1)[43] + Sq(1)[42]} \\ $h_{0}:$ [43], [42] \\ $h_{3}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[73/195] \mb{73/195} \begin{gl} \item[42] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \\ $h_{3}:$ [30] \item[43] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[72/195] \mb{72/195} \begin{gl} \item[39] {\rm Sq(1,1)[39]} \item[40] {\rm Sq(0,1)[40]} \item[41] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[71/195] \mb{71/195} \begin{gl} \item[42] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[69/195] \mb{69/195} \begin{gl} \item[49] {\rm Sq(0,1)[48]} \item[50] {\rm Sq(0,1)[49]} \end{gl} \end{bdl} \begin{bdl} \item[68/195] \mb{68/195} \begin{gl} \item[50] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[66/195] \mb{66/195} \begin{gl} \item[64] {\rm Sq(0,1)[65]} \item[65] {\rm Sq(0,1)[66]} \end{gl} \end{bdl} \begin{bdl} \item[65/195] \mb{65/195} \begin{gl} \item[67] {\rm Sq(0,1)[64]} \item[68] {\rm Sq(3)[65] + Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[64/195] \mb{64/195} \begin{gl} \item[68] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[63/195] \mb{63/195} \begin{gl} \item[71] {\rm Sq(0,1)[73]} \item[72] {\rm Sq(0,1)[74]} \item[73] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[62/195] \mb{62/195} \begin{gl} \item[77] {\rm Sq(1,1)[76]} \item[78] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[61/195] \mb{61/195} \begin{gl} \item[83] {\rm Sq(1)[89] + Sq(1)[85]} \\ $h_{0}:$ [89], [85] \\ $h_{2}:$ [77] \\ $h_{3}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[60/195] \mb{60/195} \begin{gl} \item[85] {\rm Sq(0,1)[86]} \item[86] {\rm Sq(0,1)[87]} \item[87] {\rm Sq(0,1)[88]} \item[88] {\rm Sq(2)[91]} \\ $h_{1}:$ [91] \item[89] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{3}:$ [74], [73] \end{gl} \end{bdl} \begin{bdl} \item[59/195] \mb{59/195} \begin{gl} \item[94] {\rm Sq(0,1)[94]} \item[95] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{3}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[58/195] \mb{58/195} \begin{gl} \item[100] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[57/195] \mb{57/195} \begin{gl} \item[99] {\rm Sq(0,1)[98]} \item[100] {\rm Sq(0,1)[99]} \item[101] {\rm Sq(0,1)[100]} \item[102] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[56/195] \mb{56/195} \begin{gl} \item[101] {\rm Sq(1,1)[105]} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(0,1)[107]} \end{gl} \end{bdl} \begin{bdl} \item[54/195] \mb{54/195} \begin{gl} \item[117] {\rm Sq(0,1)[115]} \item[118] {\rm Sq(0,1)[116]} \item[119] {\rm Sq(0,1)[117]} \end{gl} \end{bdl} \begin{bdl} \item[53/195] \mb{53/195} \begin{gl} \item[119] {\rm Sq(0,1)[122]} \item[120] {\rm Sq(0,1)[123]} \item[121] {\rm Sq(0,1)[124]} \end{gl} \end{bdl} \begin{bdl} \item[52/195] \mb{52/195} \begin{gl} \item[128] {\rm Sq(1,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[51/195] \mb{51/195} \begin{gl} \item[141] {\rm Sq(0,1)[145]} \item[142] {\rm Sq(0,1)[146]} \item[143] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[50/195] \mb{50/195} \begin{gl} \item[149] {\rm Sq(0,1)[143]} \item[150] {\rm Sq(0,1)[144]} \item[151] {\rm Sq(0,1)[145]} \end{gl} \end{bdl} \begin{bdl} \item[49/195] \mb{49/195} \begin{gl} \item[150] {\rm Sq(0,1)[145]} \item[151] {\rm Sq(3)[147] + Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[48/195] \mb{48/195} \begin{gl} \item[152] {\rm Sq(0,1)[152]} \item[153] {\rm Sq(0,1)[153]} \item[154] {\rm Sq(0,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[47/195] \mb{47/195} \begin{gl} \item[159] {\rm Sq(0,1)[158]} \item[160] {\rm Sq(0,1)[159]} \item[161] {\rm Sq(0,1)[160]} \item[162] {\rm Sq(1)[170] + Sq(1)[169]} \\ $h_{0}:$ [170], [169] \\ $h_{1}:$ [162] \\ $h_{2}:$ [156] \\ $h_{3}:$ [141] \end{gl} \end{bdl} \begin{bdl} \item[46/195] \mb{46/195} \begin{gl} \item[168] {\rm Sq(0,1)[164]} \item[169] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \\ $h_{2}:$ [163], [159] \item[170] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{2}:$ [163] \\ $h_{3}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[45/195] \mb{45/195} \begin{gl} \item[172] {\rm Sq(0,1)[169]} \item[173] {\rm Sq(0,1)[170]} \item[174] {\rm Sq(0,1)[171]} \item[175] {\rm Sq(0,1)[172]} \item[176] {\rm Sq(1)[178]} \\ $h_{0}:$ [178] \\ $h_{2}:$ [168] \item[177] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{2}:$ [168] \\ $h_{3}:$ [149] \end{gl} \end{bdl} \begin{bdl} \item[44/195] \mb{44/195} \begin{gl} \item[178] {\rm Sq(0,1)[181]} \item[179] {\rm Sq(0,1)[182]} \item[180] {\rm Sq(0,1)[183]} \item[181] {\rm Sq(0,1)[184]} \item[182] {\rm Sq(2)[191]} \\ $h_{1}:$ [191] \item[183] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [162] \item[184] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{3}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[43/195] \mb{43/195} \begin{gl} \item[193] {\rm Sq(0,1)[196]} \item[194] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \item[195] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{3}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[42/195] \mb{42/195} \begin{gl} \item[202] {\rm Sq(0,1)[201]} \item[203] {\rm Sq(0,1)[202]} \item[204] {\rm Sq(0,1)[203]} \item[205] {\rm Sq(0,1)[204]} \item[206] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \item[207] {\rm Sq(1)[215] + Sq(1)[214]} \\ $h_{0}:$ [215], [214] \\ $h_{3}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[41/195] \mb{41/195} \begin{gl} \item[209] {\rm Sq(0,1)[203]} \item[210] {\rm Sq(0,1)[205] + Sq(0,1)[204]} \item[211] {\rm Sq(3)[205] + Sq(3)[204]} \item[212] {\rm Sq(0,1)[206] + Sq(0,1)[204]} \item[213] {\rm Sq(0,1)[207] + Sq(0,1)[204]} \item[214] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{1}:$ [208] \\ $h_{2}:$ [201] \\ $h_{3}:$ [182] \item[215] {\rm Sq(1)[216]} \\ $h_{0}:$ [216] \\ $h_{1}:$ [208] \\ $h_{2}:$ [201] \end{gl} \end{bdl} \begin{bdl} \item[40/195] \mb{40/195} \begin{gl} \item[214] {\rm Sq(1,1)[212] + Sq(1,1)[210] + Sq(1,1)[209]} \item[215] {\rm Sq(0,1)[213]} \item[216] {\rm Sq(1)[224] + Sq(1)[223] + Sq(1)[220]} \\ $h_{0}:$ [224], [223], [220] \end{gl} \end{bdl} \begin{bdl} \item[39/195] \mb{39/195} \begin{gl} \item[220] {\rm Sq(1,1)[221] + Sq(1,1)[220] + Sq(1,1)[219] + Sq(1,1)[218]} \item[221] {\rm Sq(0,1)[224]} \item[222] {\rm Sq(0,1)[225]} \item[223] {\rm Sq(0,1)[226]} \item[224] {\rm Sq(0,1)[227]} \item[225] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \\ $h_{1}:$ [230] \\ $h_{2}:$ [218] \\ $h_{3}:$ [203] \end{gl} \end{bdl} \begin{bdl} \item[38/195] \mb{38/195} \begin{gl} \item[231] {\rm Sq(0,1)[238]} \item[232] {\rm Sq(0,1)[239]} \item[233] {\rm Sq(0,1)[240]} \item[234] {\rm Sq(0,1)[241]} \item[235] {\rm Sq(0,1)[242]} \end{gl} \end{bdl} \begin{bdl} \item[37/195] \mb{37/195} \begin{gl} \item[247] {\rm Sq(0,1)[249]} \item[248] {\rm Sq(0,1)[250]} \end{gl} \end{bdl} \begin{bdl} \item[36/195] \mb{36/195} \begin{gl} \item[256] {\rm Sq(1,1)[254] + Sq(1,1)[253] + Sq(1,1)[251]} \item[257] {\rm Sq(0,1)[257]} \item[258] {\rm Sq(0,1)[258]} \item[259] {\rm Sq(0,1)[259]} \item[260] {\rm Sq(2)[261]} \\ $h_{1}:$ [261] \end{gl} \end{bdl} \begin{bdl} \item[35/195] \mb{35/195} \begin{gl} \item[263] {\rm Sq(0,1)[263]} \item[264] {\rm Sq(0,1)[264]} \item[265] {\rm Sq(0,1)[265]} \item[266] {\rm Sq(0,1)[266]} \end{gl} \end{bdl} \begin{bdl} \item[34/195] \mb{34/195} \begin{gl} \item[271] {\rm Sq(0,1)[265] + Sq(0,1)[264]} \item[272] {\rm Sq(0,1)[266]} \end{gl} \end{bdl} \begin{bdl} \item[33/195] \mb{33/195} \begin{gl} \item[272] {\rm Sq(1,1)[264]} \item[273] {\rm Sq(0,1)[266]} \item[274] {\rm Sq(0,1)[267]} \item[275] {\rm Sq(3)[268]} \item[276] {\rm Sq(3)[270] + Sq(0,1)[270] + Sq(3)[269] + Sq(0,1)[269]} \end{gl} \end{bdl} \begin{bdl} \item[32/195] \mb{32/195} \begin{gl} \item[273] {\rm Sq(0,1)[269]} \item[274] {\rm Sq(0,1)[270]} \item[275] {\rm Sq(0,1)[271] + Sq(0,1)[268]} \item[276] {\rm Sq(3)[273] + Sq(0,1)[273] + Sq(3)[270] + Sq(3)[268] + Sq(0,1)[268]} \\ $h_{2}:$ [262], [261] \end{gl} \end{bdl} \begin{bdl} \item[31/195] \mb{31/195} \begin{gl} \item[278] {\rm Sq(0,1)[272]} \item[279] {\rm Sq(1)[287] + Sq(1)[286]} \\ $h_{0}:$ [287], [286] \\ $h_{1}:$ [282], [277], [276] \item[280] {\rm Sq(1)[289] + Sq(1)[286]} \\ $h_{0}:$ [289], [286] \\ $h_{1}:$ [282], [277], [276] \\ $h_{2}:$ [269] \\ $h_{3}:$ [254], [252] \\ $h_{7}:$ [7] \item[281] {\rm Sq(1)[290] + Sq(1)[286]} \\ $h_{0}:$ [290], [286] \\ $h_{1}:$ [282], [280], [276] \\ $h_{2}:$ [270], [267] \end{gl} \end{bdl} \begin{bdl} \item[30/195] \mb{30/195} \begin{gl} \item[285] {\rm Sq(0,1)[280]} \item[286] {\rm Sq(3)[282] + Sq(0,1)[282]} \item[287] {\rm Sq(3)[285] + Sq(0,1)[285] + Sq(0,1)[282] + Sq(3)[281] + Sq(0,1)[281]} \item[288] {\rm Sq(1)[290] + Sq(1)[289]} \\ $h_{0}:$ [290], [289] \\ $h_{2}:$ [279], [274] \\ $h_{3}:$ [259] \item[289] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \\ $h_{2}:$ [276], [274] \\ $h_{3}:$ [259] \\ $h_{7}:$ [8] \item[290] {\rm Sq(1)[295] + Sq(1)[289]} \\ $h_{0}:$ [295], [289] \\ $h_{2}:$ [278], [277], [275], [274] \end{gl} \end{bdl} \begin{bdl} \item[29/195] \mb{29/195} \begin{gl} \item[289] {\rm Sq(2,1)[280]} \item[290] {\rm Sq(4)[281]} \\ $h_{2}:$ [281] \\ $h_{3}:$ [267] \item[291] {\rm Sq(0,1)[287] + Sq(0,1)[286] + Sq(0,1)[285] + Sq(0,1)[284]} \item[292] {\rm Sq(0,1)[288] + Sq(0,1)[286] + Sq(0,1)[284]} \item[293] {\rm Sq(3)[289] + Sq(0,1)[289] + Sq(3)[286] + Sq(3)[285] + Sq(3)[284] + Sq(0,1)[284]} \\ $h_{3}:$ [267] \\ $h_{7}:$ [7] \item[294] {\rm Sq(1)[297] + Sq(1)[295]} \\ $h_{0}:$ [297], [295] \\ $h_{1}:$ [292] \\ $h_{3}:$ [269] \item[295] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \end{gl} \end{bdl} \begin{bdl} \item[28/195] \mb{28/195} \begin{gl} \item[295] {\rm Sq(3,1)[281] + Sq(0,2)[281]} \item[296] {\rm Sq(2)[296] + Sq(2)[293] + Sq(2)[292]} \\ $h_{1}:$ [296], [293], [292] \item[297] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \\ $h_{3}:$ [276], [274], [273], [272] \item[298] {\rm Sq(1)[300] + Sq(1)[299]} \\ $h_{0}:$ [300], [299] \end{gl} \end{bdl} \begin{bdl} \item[27/195] \mb{27/195} \begin{gl} \item[297] {\rm Sq(1,1)[293]} \\ $h_{3}:$ [276] \item[298] {\rm Sq(0,1)[299] + Sq(3)[297]} \\ $h_{3}:$ [276] \item[299] {\rm Sq(3)[300] + Sq(0,1)[300] + Sq(3)[298]} \item[300] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \end{gl} \end{bdl} \begin{bdl} \item[26/195] \mb{26/195} \begin{gl} \item[304] {\rm Sq(5)[295] + Sq(2,1)[295] + Sq(2,1)[292] + Sq(2,1)[291]} \item[305] {\rm Sq(1,1)[298] + Sq(1,1)[297] + Sq(4)[296]} \\ $h_{2}:$ [296] \item[306] {\rm Sq(1)[310] + Sq(1)[309]} \\ $h_{0}:$ [310], [309] \\ $h_{1}:$ [303] \\ $h_{2}:$ [298], [297], [296] \\ $h_{3}:$ [281], [280], [279] \\ $h_{5}:$ [196] \end{gl} \end{bdl} \begin{bdl} \item[25/195] \mb{25/195} \begin{gl} \item[308] {\rm Sq(3)[302] + Sq(3)[301]} \item[309] {\rm Sq(3)[303] + Sq(0,1)[303]} \item[310] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{2}:$ [297] \\ $h_{5}:$ [195] \item[311] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \\ $h_{1}:$ [304] \\ $h_{2}:$ [297] \\ $h_{3}:$ [283], [282] \\ $h_{4}:$ [253] \\ $h_{6}:$ [104], [103] \end{gl} \end{bdl} \begin{bdl} \item[24/195] \mb{24/195} \begin{gl} \item[308] {\rm Sq(3)[306] + Sq(0,1)[306]} \item[309] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \item[310] {\rm Sq(1)[314] + Sq(1)[311]} \\ $h_{0}:$ [314], [311] \\ $h_{3}:$ [290], [287] \\ $h_{6}:$ [111], [110] \end{gl} \end{bdl} \begin{bdl} \item[23/195] \mb{23/195} \begin{gl} \item[310] {\rm Sq(2,1)[315]} \item[311] {\rm Sq(5)[317] + Sq(2,1)[317] + Sq(5)[316] + Sq(2,1)[316]} \item[312] {\rm Sq(0,1)[320]} \item[313] {\rm Sq(0,1)[321]} \\ $h_{7}:$ [14] \item[314] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{3}:$ [305], [304] \end{gl} \end{bdl} \begin{bdl} \item[22/195] \mb{22/195} \begin{gl} \item[326] {\rm Sq(1,1)[328]} \item[327] {\rm Sq(1,1)[329] + Sq(1,1)[327]} \item[328] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \\ $h_{3}:$ [310] \item[329] {\rm Sq(1)[339] + Sq(1)[335]} \\ $h_{0}:$ [339], [335] \\ $h_{3}:$ [313], [312] \\ $h_{4}:$ [277], [274] \end{gl} \end{bdl} \begin{bdl} \item[21/195] \mb{21/195} \begin{gl} \item[335] {\rm Sq(3)[335]} \item[336] {\rm Sq(2)[337]} \\ $h_{1}:$ [337] \item[337] {\rm Sq(2)[338]} \\ $h_{1}:$ [338] \\ $h_{3}:$ [313] \\ $h_{4}:$ [276], [275] \item[338] {\rm Sq(1)[344] + Sq(1)[342]} \\ $h_{0}:$ [344], [342] \item[339] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \\ $h_{3}:$ [313] \\ $h_{4}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[20/195] \mb{20/195} \begin{gl} \item[341] {\rm Sq(0,1)[350] + Sq(0,1)[349]} \\ $h_{7}:$ [16] \item[342] {\rm Sq(3)[353] + Sq(3)[352] + Sq(0,1)[348]} \item[343] {\rm Sq(2)[356] + Sq(2)[355]} \\ $h_{1}:$ [356], [355] \\ $h_{2}:$ [344], [343] \\ $h_{3}:$ [325] \\ $h_{4}:$ [284], [283], [281], [280], [279] \item[344] {\rm Sq(1)[358]} \\ $h_{0}:$ [358] \item[345] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{4}:$ [285], [279] \item[346] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{1}:$ [355] \\ $h_{2}:$ [345], [343] \\ $h_{3}:$ [328], [325] \\ $h_{4}:$ [283], [282], [279] \end{gl} \end{bdl} \begin{bdl} \item[19/195] \mb{19/195} \begin{gl} \item[358] {\rm Sq(1,1)[362] + Sq(1,1)[360] + Sq(1,1)[359]} \item[359] {\rm Sq(3)[367] + Sq(0,1)[367] + Sq(3)[365] + Sq(0,1)[365] + Sq(3)[364] + Sq(0,1)[364]} \\ $h_{4}:$ [291], [290] \item[360] {\rm Sq(1)[376] + Sq(1)[375] + Sq(1)[374]} \\ $h_{0}:$ [376], [375], [374] \\ $h_{2}:$ [360], [359] \\ $h_{3}:$ [341], [333] \end{gl} \end{bdl} \begin{bdl} \item[18/195] \mb{18/195} \begin{gl} \item[374] {\rm Sq(0,1)[373] + Sq(3)[372] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{3}:$ [337], [336] \\ $h_{4}:$ [295] \item[375] {\rm Sq(3)[373] + Sq(3)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{3}:$ [337] \\ $h_{4}:$ [295] \item[376] {\rm Sq(3)[374] + Sq(0,1)[372] + Sq(0,1)[371] + Sq(0,1)[370] + Sq(3)[369] + Sq(0,1)[369]} \\ $h_{3}:$ [337], [336] \item[377] {\rm Sq(1)[387] + Sq(1)[386] + Sq(1)[383]} \\ $h_{0}:$ [387], [386], [383] \\ $h_{2}:$ [367], [366], [364] \\ $h_{3}:$ [337], [335] \\ $h_{4}:$ [298], [297] \end{gl} \end{bdl} \begin{bdl} \item[17/195] \mb{17/195} \begin{gl} \item[383] {\rm Sq(3)[375] + Sq(3)[374] + Sq(3)[373]} \item[384] {\rm Sq(3)[378] + Sq(0,1)[378] + Sq(3)[377] + Sq(0,1)[377] + Sq(0,1)[373]} \\ $h_{7}:$ [27] \item[385] {\rm Sq(2)[384] + Sq(2)[382]} \\ $h_{1}:$ [384], [382] \\ $h_{4}:$ [297], [296] \\ $h_{7}:$ [27] \item[386] {\rm Sq(1)[391] + Sq(1)[390]} \\ $h_{0}:$ [391], [390] \item[387] {\rm Sq(1)[394] + Sq(1)[393] + Sq(1)[392] + Sq(1)[390]} \\ $h_{0}:$ [394], [393], [392], [390] \\ $h_{2}:$ [368], [367] \\ $h_{4}:$ [298], [296] \end{gl} \end{bdl} \begin{bdl} \item[16/195] \mb{16/195} \begin{gl} \item[390] {\rm Sq(0,1)[384] + Sq(0,1)[382]} \item[391] {\rm Sq(3)[384] + Sq(3)[382]} \item[392] {\rm Sq(1)[394]} \\ $h_{0}:$ [394] \\ $h_{1}:$ [386] \\ $h_{2}:$ [377] \\ $h_{3}:$ [352], [351], [350], [348], [347], [346] \\ $h_{4}:$ [304] \item[393] {\rm Sq(1)[397]} \\ $h_{0}:$ [397] \\ $h_{1}:$ [386] \\ $h_{2}:$ [377] \\ $h_{3}:$ [351], [348], [346] \\ $h_{4}:$ [304] \item[394] {\rm Sq(1)[398] + Sq(1)[395]} \\ $h_{0}:$ [398], [395] \\ $h_{3}:$ [352], [350], [347] \item[395] {\rm Sq(1)[399] + Sq(1)[396]} \\ $h_{0}:$ [399], [396] \\ $h_{1}:$ [386] \\ $h_{2}:$ [377] \\ $h_{3}:$ [351], [350], [349], [347], [346] \\ $h_{4}:$ [304] \item[396] {\rm Sq(1)[401] + Sq(1)[396]} \\ $h_{0}:$ [401], [396] \\ $h_{2}:$ [377] \\ $h_{3}:$ [352], [351], [350], [349], [348], [347] \\ $h_{4}:$ [304] \item[397] {\rm Sq(1)[402] + Sq(1)[396]} \\ $h_{0}:$ [402], [396] \\ $h_{1}:$ [388], [387] \\ $h_{2}:$ [379] \\ $h_{3}:$ [351], [348], [346] \\ $h_{4}:$ [304] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[15/195] \mb{15/195} \begin{gl} \item[394] {\rm Sq(1,1)[387] + Sq(1,1)[386] + Sq(1,1)[384]} \\ $h_{3}:$ [357], [356] \item[395] {\rm Sq(0,1)[389] + Sq(3)[388] + Sq(0,1)[388]} \\ $h_{3}:$ [356] \\ $h_{4}:$ [316] \item[396] {\rm Sq(3)[389] + Sq(3)[388] + Sq(0,1)[388]} \\ $h_{3}:$ [357] \item[397] {\rm Sq(3)[390] + Sq(3)[388]} \\ $h_{3}:$ [356] \item[398] {\rm Sq(0,1)[391] + Sq(0,1)[390] + Sq(0,1)[388]} \\ $h_{3}:$ [357], [356] \\ $h_{4}:$ [316] \item[399] {\rm Sq(3)[391] + Sq(0,1)[388]} \\ $h_{3}:$ [357], [356] \item[400] {\rm Sq(2)[393] + Sq(2)[392]} \\ $h_{1}:$ [393], [392] \\ $h_{4}:$ [318], [316] \item[401] {\rm Sq(1)[398]} \\ $h_{0}:$ [398] \\ $h_{3}:$ [356] \item[402] {\rm Sq(1)[399]} \\ $h_{0}:$ [399] \\ $h_{2}:$ [382], [381], [380] \\ $h_{3}:$ [357], [356] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[14/195] \mb{14/195} \begin{gl} \item[398] {\rm Sq(1,1)[377] + Sq(1,1)[374]} \item[399] {\rm Sq(3)[380]} \\ $h_{7}:$ [30] \item[400] {\rm Sq(2)[386] + Sq(2)[385]} \\ $h_{1}:$ [386], [385] \\ $h_{3}:$ [352] \\ $h_{7}:$ [30] \item[401] {\rm Sq(1)[393] + Sq(1)[391]} \\ $h_{0}:$ [393], [391] \\ $h_{1}:$ [387], [385] \\ $h_{2}:$ [377], [376] \\ $h_{3}:$ [354], [353], [352] \\ $h_{4}:$ [323] \item[402] {\rm Sq(1)[396] + Sq(1)[394]} \\ $h_{0}:$ [396], [394] \\ $h_{1}:$ [385] \\ $h_{3}:$ [355], [353], [351] \item[403] {\rm Sq(1)[397] + Sq(1)[392] + Sq(1)[391]} \\ $h_{0}:$ [397], [392], [391] \\ $h_{1}:$ [387], [385] \\ $h_{2}:$ [377], [376], [375], [374] \\ $h_{3}:$ [357], [355] \\ $h_{4}:$ [324], [323] \\ $h_{5}:$ [270], [268], [267] \\ $h_{6}:$ [151] \\ $h_{7}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[13/195] \mb{13/195} \begin{gl} \item[391] {\rm Sq(3)[379] + Sq(0,1)[379] + Sq(3)[378] + Sq(0,1)[378] + Sq(3)[377] + Sq(0,1)[377] + Sq(3)[376]} \\ $h_{3}:$ [349] \item[392] {\rm Sq(3)[380] + Sq(0,1)[380] + Sq(3)[378] + Sq(0,1)[378] + Sq(3)[377] + Sq(0,1)[377]} \item[393] {\rm Sq(3)[381] + Sq(0,1)[381] + Sq(3)[377] + Sq(0,1)[377] + Sq(0,1)[376]} \\ $h_{2}:$ [371], [369] \\ $h_{3}:$ [349] \item[394] {\rm Sq(1)[387]} \\ $h_{0}:$ [387] \\ $h_{2}:$ [371], [369] \\ $h_{3}:$ [354], [349] \item[395] {\rm Sq(1)[388]} \\ $h_{0}:$ [388] \\ $h_{2}:$ [374], [371] \\ $h_{3}:$ [354] \\ $h_{4}:$ [328] \\ $h_{5}:$ [277] \\ $h_{7}:$ [34] \item[396] {\rm Sq(1)[389]} \\ $h_{0}:$ [389] \\ $h_{2}:$ [371], [369] \\ $h_{3}:$ [354] \item[397] {\rm Sq(1)[391] + Sq(1)[390]} \\ $h_{0}:$ [391], [390] \\ $h_{2}:$ [371], [369] \\ $h_{3}:$ [355], [351] \\ $h_{4}:$ [328] \\ $h_{5}:$ [277] \\ $h_{7}:$ [35], [34] \end{gl} \end{bdl} \begin{bdl} \item[12/195] \mb{12/195} \begin{gl} \item[387] {\rm Sq(0,1)[370]} \\ $h_{3}:$ [351] \item[388] {\rm Sq(3)[373] + Sq(3)[372] + Sq(0,1)[372] + Sq(3)[371] + Sq(0,1)[371] + Sq(3)[370]} \\ $h_{2}:$ [367] \\ $h_{3}:$ [351] \\ $h_{4}:$ [334] \\ $h_{7}:$ [37] \item[389] {\rm Sq(3)[375] + Sq(0,1)[375] + Sq(3)[372] + Sq(0,1)[372] + Sq(3)[371] + Sq(0,1)[371] + Sq(3)[370]} \\ $h_{3}:$ [351] \item[390] {\rm Sq(1)[383] + Sq(1)[380]} \\ $h_{0}:$ [383], [380] \\ $h_{2}:$ [368], [367] \\ $h_{4}:$ [334] \\ $h_{7}:$ [37] \item[391] {\rm Sq(1)[384] + Sq(1)[380]} \\ $h_{0}:$ [384], [380] \\ $h_{2}:$ [368], [367] \\ $h_{3}:$ [352] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[11/195] \mb{11/195} \begin{gl} \item[380] {\rm Sq(1,1)[350] + Sq(4)[348]} \\ $h_{2}:$ [348] \\ $h_{3}:$ [337] \item[381] {\rm Sq(2)[354]} \\ $h_{1}:$ [354] \\ $h_{2}:$ [349], [348] \\ $h_{3}:$ [337], [336] \\ $h_{7}:$ [38] \item[382] {\rm Sq(2)[356] + Sq(2)[355] + Sq(2)[353]} \\ $h_{1}:$ [356], [355], [353] \item[383] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{2}:$ [348] \\ $h_{3}:$ [337] \item[384] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{2}:$ [348] \\ $h_{3}:$ [337], [336] \\ $h_{7}:$ [39] \item[385] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{1}:$ [353] \\ $h_{2}:$ [350], [349], [348] \\ $h_{3}:$ [336] \\ $h_{4}:$ [326] \\ $h_{5}:$ [289], [288], [287] \\ $h_{6}:$ [167], [165], [164] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[10/195] \mb{10/195} \begin{gl} \item[359] {\rm Sq(1)[325] + Sq(1)[324]} \\ $h_{0}:$ [325], [324] \item[360] {\rm Sq(1)[326] + Sq(1)[324]} \\ $h_{0}:$ [326], [324] \\ $h_{7}:$ [41] \item[361] {\rm Sq(1)[327] + Sq(1)[324]} \\ $h_{0}:$ [327], [324] \\ $h_{2}:$ [316] \\ $h_{5}:$ [261], [260] \\ $h_{6}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[9/195] \mb{9/195} \begin{gl} \item[324] {\rm Sq(5)[277] + Sq(2,1)[277] + Sq(5)[276] + Sq(2,1)[276]} \\ $h_{7}:$ [43] \item[325] {\rm Sq(1,1)[279] + Sq(1,1)[278]} \\ $h_{7}:$ [43] \item[326] {\rm Sq(0,1)[280]} \item[327] {\rm Sq(3)[280]} \\ $h_{7}:$ [43] \item[328] {\rm Sq(2)[282]} \\ $h_{1}:$ [282] \\ $h_{5}:$ [226], [225] \\ $h_{7}:$ [43] \item[329] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \\ $h_{3}:$ [268] \\ $h_{7}:$ [44], [43] \end{gl} \end{bdl} \begin{bdl} \item[8/195] \mb{8/195} \begin{gl} \item[285] {\rm Sq(0,1)[242]} \\ $h_{3}:$ [231] \\ $h_{7}:$ [44] \item[286] {\rm Sq(3)[242]} \\ $h_{2}:$ [241] \\ $h_{3}:$ [231], [230] \\ $h_{7}:$ [44], [43] \item[287] {\rm Sq(1)[246]} \\ $h_{0}:$ [246] \\ $h_{2}:$ [241] \\ $h_{3}:$ [233], [231] \\ $h_{5}:$ [195] \\ $h_{7}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[7/195] \mb{7/195} \begin{gl} \item[245] {\rm Sq(2)[198]} \\ $h_{1}:$ [198] \\ $h_{7}:$ [43] \item[246] {\rm Sq(1)[202] + Sq(1)[201]} \\ $h_{0}:$ [202], [201] \\ $h_{3}:$ [190] \\ $h_{5}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[6/195] \mb{6/195} \begin{gl} \item[201] {\rm Sq(1)[143]} \\ $h_{0}:$ [143] \\ $h_{3}:$ [136] \\ $h_{7}:$ [40] \item[202] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [137], [136] \\ $h_{5}:$ [116] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[5/195] \mb{5/195} \begin{gl} \item[143] {\rm Sq(20)[88] + Sq(11,3)[88] + Sq(8,4)[88] + Sq(5,5)[88] + Sq(0,2,2)[88]} \\ $h_{7}:$ [32] \item[144] {\rm Sq(3,1)[91]} \\ $h_{3}:$ [89] \\ $h_{5}:$ [79] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \dm{196} \begin{bdl} \item[94/196] \mb{94/196} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[93/196] \mb{93/196} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[92/196] \mb{92/196} \begin{gl} \item[7] {\rm Sq(0,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[86/196] \mb{86/196} \begin{gl} \item[14] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[83/196] \mb{83/196} \begin{gl} \item[16] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[80/196] \mb{80/196} \begin{gl} \item[27] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[79/196] \mb{79/196} \begin{gl} \item[26] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[78/196] \mb{78/196} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[77/196] \mb{77/196} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[76/196] \mb{76/196} \begin{gl} \item[33] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [33] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[75/196] \mb{75/196} \begin{gl} \item[37] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [36] \\ $h_{4}:$ [18] \item[38] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [36] \\ $h_{3}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[74/196] \mb{74/196} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{3}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[73/196] \mb{73/196} \begin{gl} \item[44] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{3}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[72/196] \mb{72/196} \begin{gl} \item[42] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[71/196] \mb{71/196} \begin{gl} \item[43] {\rm Sq(0,1)[46]} \item[44] {\rm Sq(3)[46]} \item[45] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[70/196] \mb{70/196} \begin{gl} \item[48] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[68/196] \mb{68/196} \begin{gl} \item[51] {\rm Sq(0,1)[55]} \item[52] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[67/196] \mb{67/196} \begin{gl} \item[57] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[66/196] \mb{66/196} \begin{gl} \item[66] {\rm Sq(2)[68]} \\ $h_{1}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[65/196] \mb{65/196} \begin{gl} \item[69] {\rm Sq(0,1)[66]} \item[70] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[64/196] \mb{64/196} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \end{gl} \end{bdl} \begin{bdl} \item[63/196] \mb{63/196} \begin{gl} \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [77] \\ $h_{2}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[62/196] \mb{62/196} \begin{gl} \item[79] {\rm Sq(1,1)[78]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[61/196] \mb{61/196} \begin{gl} \item[84] {\rm Sq(0,1)[83]} \item[85] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{1}:$ [85] \\ $h_{2}:$ [80] \\ $h_{3}:$ [71], [68] \\ $h_{4}:$ [53] \item[86] {\rm Sq(1)[92] + Sq(1)[90]} \\ $h_{0}:$ [92], [90] \\ $h_{1}:$ [88] \\ $h_{2}:$ [81] \\ $h_{3}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[60/196] \mb{60/196} \begin{gl} \item[90] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{2}:$ [90], [89], [86] \\ $h_{4}:$ [60] \item[91] {\rm Sq(1)[100]} \\ $h_{0}:$ [100] \\ $h_{2}:$ [86] \\ $h_{3}:$ [76] \\ $h_{4}:$ [60] \item[92] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [90], [86] \\ $h_{3}:$ [76] \\ $h_{4}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[59/196] \mb{59/196} \begin{gl} \item[96] {\rm Sq(0,1)[95]} \item[97] {\rm Sq(0,1)[96]} \item[98] {\rm Sq(0,1)[97]} \item[99] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [93], [92] \\ $h_{4}:$ [67] \item[100] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{3}:$ [82] \\ $h_{4}:$ [67] \item[101] {\rm Sq(1)[105] + Sq(1)[102]} \\ $h_{0}:$ [105], [102] \\ $h_{2}:$ [93] \\ $h_{3}:$ [82] \\ $h_{4}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[58/196] \mb{58/196} \begin{gl} \item[101] {\rm Sq(0,1)[96]} \item[102] {\rm Sq(0,1)[97]} \item[103] {\rm Sq(0,1)[98]} \item[104] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{3}:$ [87] \item[105] {\rm Sq(1)[104]} \\ $h_{0}:$ [104] \\ $h_{3}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[57/196] \mb{57/196} \begin{gl} \item[103] {\rm Sq(1)[107]} \\ $h_{0}:$ [107] \item[104] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \end{gl} \end{bdl} \begin{bdl} \item[56/196] \mb{56/196} \begin{gl} \item[104] {\rm Sq(0,1)[108]} \item[105] {\rm Sq(0,1)[109]} \item[106] {\rm Sq(0,1)[110]} \item[107] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \item[108] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \end{gl} \end{bdl} \begin{bdl} \item[55/196] \mb{55/196} \begin{gl} \item[111] {\rm Sq(0,1)[113]} \item[112] {\rm Sq(0,1)[114]} \item[113] {\rm Sq(0,1)[115]} \item[114] {\rm Sq(3)[115]} \item[115] {\rm Sq(3)[116]} \end{gl} \end{bdl} \begin{bdl} \item[53/196] \mb{53/196} \begin{gl} \item[122] {\rm Sq(0,1)[125]} \item[123] {\rm Sq(0,1)[126]} \item[124] {\rm Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[52/196] \mb{52/196} \begin{gl} \item[129] {\rm Sq(0,1)[138]} \item[130] {\rm Sq(0,1)[139]} \item[131] {\rm Sq(0,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[51/196] \mb{51/196} \begin{gl} \item[144] {\rm Sq(0,1)[148]} \end{gl} \end{bdl} \begin{bdl} \item[50/196] \mb{50/196} \begin{gl} \item[152] {\rm Sq(0,1)[146]} \item[153] {\rm Sq(0,1)[147]} \item[154] {\rm Sq(0,1)[148]} \item[155] {\rm Sq(2)[151]} \\ $h_{1}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[49/196] \mb{49/196} \begin{gl} \item[152] {\rm Sq(0,1)[148]} \item[153] {\rm Sq(0,1)[149]} \item[154] {\rm Sq(0,1)[150]} \end{gl} \end{bdl} \begin{bdl} \item[48/196] \mb{48/196} \begin{gl} \item[155] {\rm Sq(0,1)[156]} \end{gl} \end{bdl} \begin{bdl} \item[47/196] \mb{47/196} \begin{gl} \item[163] {\rm Sq(3)[162] + Sq(0,1)[162]} \item[164] {\rm Sq(0,1)[163]} \item[165] {\rm Sq(0,1)[164]} \item[166] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[46/196] \mb{46/196} \begin{gl} \item[171] {\rm Sq(0,1)[167]} \item[172] {\rm Sq(0,1)[168]} \item[173] {\rm Sq(0,1)[169]} \end{gl} \end{bdl} \begin{bdl} \item[45/196] \mb{45/196} \begin{gl} \item[178] {\rm Sq(0,1)[175]} \item[179] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [178] \\ $h_{2}:$ [173] \item[180] {\rm Sq(1)[190] + Sq(1)[188]} \\ $h_{0}:$ [190], [188] \\ $h_{1}:$ [182] \\ $h_{2}:$ [174] \\ $h_{3}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[44/196] \mb{44/196} \begin{gl} \item[185] {\rm Sq(0,1)[186]} \item[186] {\rm Sq(0,1)[187]} \item[187] {\rm Sq(0,1)[188]} \item[188] {\rm Sq(3)[192] + Sq(0,1)[192] + Sq(3)[190] + Sq(0,1)[190] + Sq(0,1)[189]} \item[189] {\rm Sq(1)[196]} \\ $h_{0}:$ [196] \\ $h_{2}:$ [181] \item[190] {\rm Sq(1)[201]} \\ $h_{0}:$ [201] \\ $h_{2}:$ [185] \\ $h_{3}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[43/196] \mb{43/196} \begin{gl} \item[196] {\rm Sq(0,1)[197]} \item[197] {\rm Sq(0,1)[198]} \item[198] {\rm Sq(0,1)[199]} \item[199] {\rm Sq(0,1)[200]} \item[200] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{2}:$ [195] \item[201] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{2}:$ [195] \\ $h_{3}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[42/196] \mb{42/196} \begin{gl} \item[208] {\rm Sq(1,1)[205]} \item[209] {\rm Sq(0,1)[206]} \item[210] {\rm Sq(2)[211] + Sq(2)[210]} \\ $h_{1}:$ [211], [210] \item[211] {\rm Sq(1)[221] + Sq(1)[220]} \\ $h_{0}:$ [221], [220] \\ $h_{3}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[41/196] \mb{41/196} \begin{gl} \item[216] {\rm Sq(0,1)[209] + Sq(0,1)[208]} \item[217] {\rm Sq(0,1)[210] + Sq(0,1)[208]} \item[218] {\rm Sq(0,1)[211] + Sq(0,1)[208]} \item[219] {\rm Sq(0,1)[212] + Sq(0,1)[208]} \item[220] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \\ $h_{1}:$ [214] \\ $h_{2}:$ [206], [205], [204] \\ $h_{4}:$ [154] \item[221] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{1}:$ [214] \\ $h_{2}:$ [206], [205], [204] \\ $h_{4}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[40/196] \mb{40/196} \begin{gl} \item[217] {\rm Sq(0,1)[215]} \item[218] {\rm Sq(0,1)[216]} \item[219] {\rm Sq(0,1)[217]} \item[220] {\rm Sq(0,1)[218]} \item[221] {\rm Sq(0,1)[219]} \item[222] {\rm Sq(1)[228] + Sq(1)[226]} \\ $h_{0}:$ [228], [226] \end{gl} \end{bdl} \begin{bdl} \item[39/196] \mb{39/196} \begin{gl} \item[226] {\rm Sq(3)[228] + Sq(0,1)[228]} \item[227] {\rm Sq(0,1)[229]} \item[228] {\rm Sq(3)[230] + Sq(0,1)[228]} \end{gl} \end{bdl} \begin{bdl} \item[38/196] \mb{38/196} \begin{gl} \item[236] {\rm Sq(1,1)[242] + Sq(1,1)[241] + Sq(1,1)[240] + Sq(1,1)[238]} \item[237] {\rm Sq(0,1)[243]} \item[238] {\rm Sq(0,1)[244]} \item[239] {\rm Sq(0,1)[245]} \item[240] {\rm Sq(0,1)[246]} \end{gl} \end{bdl} \begin{bdl} \item[37/196] \mb{37/196} \begin{gl} \item[249] {\rm Sq(0,1)[252]} \item[250] {\rm Sq(0,1)[253] + Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[254]} \item[252] {\rm Sq(0,1)[255] + Sq(0,1)[251]} \item[253] {\rm Sq(1)[262] + Sq(1)[261]} \\ $h_{0}:$ [262], [261] \\ $h_{1}:$ [260], [258] \end{gl} \end{bdl} \begin{bdl} \item[36/196] \mb{36/196} \begin{gl} \item[261] {\rm Sq(2,1)[254] + Sq(2,1)[253] + Sq(2,1)[251]} \item[262] {\rm Sq(0,1)[261]} \item[263] {\rm Sq(0,1)[262]} \end{gl} \end{bdl} \begin{bdl} \item[35/196] \mb{35/196} \begin{gl} \item[267] {\rm Sq(0,1)[268]} \item[268] {\rm Sq(0,1)[269]} \item[269] {\rm Sq(0,1)[270]} \end{gl} \end{bdl} \begin{bdl} \item[34/196] \mb{34/196} \begin{gl} \item[273] {\rm Sq(0,1)[268]} \item[274] {\rm Sq(0,1)[269]} \item[275] {\rm Sq(0,1)[270]} \item[276] {\rm Sq(2)[276] + Sq(2)[272]} \\ $h_{1}:$ [276], [272] \item[277] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \end{gl} \end{bdl} \begin{bdl} \item[33/196] \mb{33/196} \begin{gl} \item[277] {\rm Sq(1,1)[267]} \item[278] {\rm Sq(1,1)[269] + Sq(1,1)[266]} \item[279] {\rm Sq(0,1)[271]} \item[280] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[32/196] \mb{32/196} \begin{gl} \item[277] {\rm Sq(2,1)[265] + Sq(2,1)[262]} \item[278] {\rm Sq(1,1)[271] + Sq(1,1)[270] + Sq(1,1)[269] + Sq(1,1)[268]} \item[279] {\rm Sq(1,1)[273] + Sq(1,1)[272] + Sq(1,1)[269] + Sq(1,1)[268]} \item[280] {\rm Sq(0,1)[274]} \item[281] {\rm Sq(0,1)[275]} \end{gl} \end{bdl} \begin{bdl} \item[31/196] \mb{31/196} \begin{gl} \item[282] {\rm Sq(0,1)[277] + Sq(0,1)[276]} \item[283] {\rm Sq(0,1)[278]} \item[284] {\rm Sq(0,1)[280] + Sq(0,1)[279]} \item[285] {\rm Sq(3)[283] + Sq(0,1)[283] + Sq(3)[281] + Sq(0,1)[281] + Sq(3)[280] + Sq(3)[279] + Sq(3)[278] + Sq(3)[276] + Sq(0,1)[276]} \end{gl} \end{bdl} \begin{bdl} \item[30/196] \mb{30/196} \begin{gl} \item[291] {\rm Sq(0,1)[286]} \item[292] {\rm Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [299], [298] \\ $h_{1}:$ [293] \\ $h_{2}:$ [284], [282] \\ $h_{3}:$ [266], [265], [263], [262], [261] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[29/196] \mb{29/196} \begin{gl} \item[296] {\rm Sq(3)[292]} \item[297] {\rm Sq(0,1)[293]} \item[298] {\rm Sq(3)[294] + Sq(0,1)[294]} \item[299] {\rm Sq(1)[301]} \\ $h_{0}:$ [301] \\ $h_{2}:$ [286], [285] \\ $h_{7}:$ [8] \item[300] {\rm Sq(1)[303] + Sq(1)[299]} \\ $h_{0}:$ [303], [299] \\ $h_{1}:$ [296] \\ $h_{2}:$ [289], [284] \\ $h_{3}:$ [270] \end{gl} \end{bdl} \begin{bdl} \item[28/196] \mb{28/196} \begin{gl} \item[299] {\rm Sq(0,1)[292]} \\ $h_{7}:$ [8] \item[300] {\rm Sq(0,1)[294]} \item[301] {\rm Sq(3)[295] + Sq(0,1)[295] + Sq(3)[293] + Sq(0,1)[293]} \\ $h_{7}:$ [8] \item[302] {\rm Sq(2)[297]} \\ $h_{1}:$ [297] \\ $h_{3}:$ [279], [278] \\ $h_{7}:$ [8] \item[303] {\rm Sq(1)[304] + Sq(1)[301]} \\ $h_{0}:$ [304], [301] \\ $h_{2}:$ [290], [289] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[27/196] \mb{27/196} \begin{gl} \item[301] {\rm Sq(1,1)[299] + Sq(1,1)[297]} \item[302] {\rm Sq(3)[302] + Sq(0,1)[302]} \\ $h_{2}:$ [297] \\ $h_{3}:$ [282], [281] \item[303] {\rm Sq(2)[304]} \\ $h_{1}:$ [304] \item[304] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{2}:$ [297] \item[305] {\rm Sq(1)[312] + Sq(1)[307]} \\ $h_{0}:$ [312], [307] \\ $h_{2}:$ [300], [298] \\ $h_{3}:$ [284], [281] \\ $h_{4}:$ [252], [251] \\ $h_{5}:$ [194] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[26/196] \mb{26/196} \begin{gl} \item[307] {\rm Sq(3)[303] + Sq(0,1)[303]} \item[308] {\rm Sq(0,1)[304] + Sq(0,1)[303] + Sq(0,1)[302]} \item[309] {\rm Sq(3)[306] + Sq(0,1)[306] + Sq(3)[305] + Sq(0,1)[305] + Sq(3)[302] + Sq(0,1)[302]} \item[310] {\rm Sq(2)[308]} \\ $h_{1}:$ [308] \item[311] {\rm Sq(2)[309]} \\ $h_{1}:$ [309] \item[312] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{2}:$ [300] \\ $h_{3}:$ [286], [285] \\ $h_{4}:$ [253] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[25/196] \mb{25/196} \begin{gl} \item[312] {\rm Sq(3)[304] + Sq(0,1)[304]} \item[313] {\rm Sq(0,1)[305]} \\ $h_{7}:$ [15] \item[314] {\rm Sq(3)[306] + Sq(0,1)[306] + Sq(3)[305] + Sq(0,1)[304]} \\ $h_{3}:$ [285] \\ $h_{7}:$ [15] \item[315] {\rm Sq(1)[315] + Sq(1)[313]} \\ $h_{0}:$ [315], [313] \\ $h_{3}:$ [289], [287], [285] \\ $h_{7}:$ [16], [15] \end{gl} \end{bdl} \begin{bdl} \item[24/196] \mb{24/196} \begin{gl} \item[311] {\rm Sq(0,1)[308]} \item[312] {\rm Sq(2)[310]} \\ $h_{1}:$ [310] \item[313] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \\ $h_{2}:$ [306] \item[314] {\rm Sq(1)[317] + Sq(1)[315]} \\ $h_{0}:$ [317], [315] \\ $h_{2}:$ [306] \item[315] {\rm Sq(1)[318] + Sq(1)[315]} \\ $h_{0}:$ [318], [315] \\ $h_{2}:$ [306] \\ $h_{3}:$ [292] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[23/196] \mb{23/196} \begin{gl} \item[315] {\rm Sq(3,1)[317] + Sq(3,1)[316] + Sq(6)[315] + Sq(3,1)[315]} \item[316] {\rm Sq(1,1)[320]} \item[317] {\rm Sq(3)[325] + Sq(0,1)[325] + Sq(3)[324] + Sq(0,1)[324]} \item[318] {\rm Sq(1)[333]} \\ $h_{0}:$ [333] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[22/196] \mb{22/196} \begin{gl} \item[330] {\rm Sq(0,1)[332]} \\ $h_{7}:$ [18] \item[331] {\rm Sq(2)[336] + Sq(2)[335]} \\ $h_{1}:$ [336], [335] \item[332] {\rm Sq(1)[342] + Sq(1)[340]} \\ $h_{0}:$ [342], [340] \\ $h_{3}:$ [315] \\ $h_{6}:$ [118] \item[333] {\rm Sq(1)[343] + Sq(1)[340]} \\ $h_{0}:$ [343], [340] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[21/196] \mb{21/196} \begin{gl} \item[340] {\rm Sq(3)[338] + Sq(0,1)[338] + Sq(3)[337]} \item[341] {\rm Sq(0,1)[339] + Sq(0,1)[338] + Sq(3)[337] + Sq(0,1)[337]} \item[342] {\rm Sq(1)[347]} \\ $h_{0}:$ [347] \item[343] {\rm Sq(1)[349]} \\ $h_{0}:$ [349] \\ $h_{7}:$ [18] \item[344] {\rm Sq(1)[350]} \\ $h_{0}:$ [350] \\ $h_{4}:$ [282] \\ $h_{5}:$ [218] \end{gl} \end{bdl} \begin{bdl} \item[20/196] \mb{20/196} \begin{gl} \item[347] {\rm Sq(3)[355]} \item[348] {\rm Sq(2)[359]} \\ $h_{1}:$ [359] \\ $h_{2}:$ [349] \\ $h_{4}:$ [290], [289] \item[349] {\rm Sq(1)[363] + Sq(1)[362]} \\ $h_{0}:$ [363], [362] \\ $h_{7}:$ [17] \item[350] {\rm Sq(1)[364] + Sq(1)[362] + Sq(1)[361]} \\ $h_{0}:$ [364], [362], [361] \\ $h_{4}:$ [291] \item[351] {\rm Sq(1)[366]} \\ $h_{0}:$ [366] \\ $h_{1}:$ [358] \\ $h_{2}:$ [349] \\ $h_{3}:$ [333], [332] \end{gl} \end{bdl} \begin{bdl} \item[19/196] \mb{19/196} \begin{gl} \item[361] {\rm Sq(1,1)[367] + Sq(1,1)[365] + Sq(1,1)[364]} \item[362] {\rm Sq(0,1)[369]} \\ $h_{7}:$ [21], [20] \item[363] {\rm Sq(3)[371] + Sq(0,1)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{7}:$ [21] \item[364] {\rm Sq(3)[372] + Sq(0,1)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{4}:$ [295] \\ $h_{7}:$ [21], [20] \item[365] {\rm Sq(2)[376] + Sq(2)[374]} \\ $h_{1}:$ [376], [374] \\ $h_{3}:$ [345], [344] \\ $h_{4}:$ [298], [296], [295] \\ $h_{7}:$ [21] \item[366] {\rm Sq(1)[378]} \\ $h_{0}:$ [378] \\ $h_{3}:$ [345], [343] \item[367] {\rm Sq(1)[379]} \\ $h_{0}:$ [379] \\ $h_{1}:$ [375] \\ $h_{2}:$ [365] \\ $h_{3}:$ [346] \\ $h_{4}:$ [300], [298], [296] \\ $h_{7}:$ [21], [20] \end{gl} \end{bdl} \begin{bdl} \item[18/196] \mb{18/196} \begin{gl} \item[378] {\rm Sq(1,1)[376] + Sq(1,1)[374] + Sq(1,1)[371] + Sq(1,1)[370] + Sq(1,1)[369]} \item[379] {\rm Sq(3)[380] + Sq(0,1)[380] + Sq(3)[377]} \\ $h_{3}:$ [343], [340] \\ $h_{4}:$ [301] \item[380] {\rm Sq(3)[382] + Sq(0,1)[382] + Sq(3)[379] + Sq(0,1)[379]} \\ $h_{4}:$ [301] \item[381] {\rm Sq(1)[392] + Sq(1)[389] + Sq(1)[388]} \\ $h_{0}:$ [392], [389], [388] \\ $h_{1}:$ [385], [384], [383] \\ $h_{2}:$ [375], [373], [372], [370] \\ $h_{3}:$ [347], [343] \\ $h_{4}:$ [302], [300] \\ $h_{5}:$ [240] \\ $h_{6}:$ [143] \end{gl} \end{bdl} \begin{bdl} \item[17/196] \mb{17/196} \begin{gl} \item[388] {\rm Sq(3)[386] + Sq(0,1)[386] + Sq(3)[382] + Sq(3)[381] + Sq(0,1)[381] + Sq(3)[380]} \\ $h_{2}:$ [374] \\ $h_{3}:$ [345] \item[389] {\rm Sq(3)[388] + Sq(0,1)[388] + Sq(0,1)[382] + Sq(3)[380] + Sq(0,1)[380]} \\ $h_{2}:$ [374] \item[390] {\rm Sq(2)[390]} \\ $h_{1}:$ [390] \\ $h_{2}:$ [374] \\ $h_{3}:$ [345] \\ $h_{4}:$ [303] \item[391] {\rm Sq(2)[391]} \\ $h_{1}:$ [391] \\ $h_{2}:$ [374] \\ $h_{3}:$ [345] \\ $h_{4}:$ [303] \item[392] {\rm Sq(1)[399] + Sq(1)[398]} \\ $h_{0}:$ [399], [398] \\ $h_{2}:$ [374] \item[393] {\rm Sq(1)[401] + Sq(1)[398]} \\ $h_{0}:$ [401], [398] \\ $h_{2}:$ [378], [377], [374] \\ $h_{3}:$ [346], [345] \\ $h_{4}:$ [307], [306], [305], [304] \end{gl} \end{bdl} \begin{bdl} \item[16/196] \mb{16/196} \begin{gl} \item[398] {\rm Sq(3)[389] + Sq(3)[388] + Sq(0,1)[388] + Sq(3)[387]} \\ $h_{7}:$ [27] \item[399] {\rm Sq(3)[390] + Sq(0,1)[390] + Sq(3)[388] + Sq(0,1)[388] + Sq(3)[387] + Sq(3)[386] + Sq(0,1)[386]} \\ $h_{7}:$ [27] \item[400] {\rm Sq(2)[397] + Sq(2)[396] + Sq(2)[394]} \\ $h_{1}:$ [397], [396], [394] \\ $h_{7}:$ [27] \item[401] {\rm Sq(1)[404] + Sq(1)[403]} \\ $h_{0}:$ [404], [403] \\ $h_{2}:$ [384], [382] \\ $h_{4}:$ [312], [309], [308] \\ $h_{7}:$ [27] \item[402] {\rm Sq(1)[406]} \\ $h_{0}:$ [406] \\ $h_{1}:$ [400], [398], [394] \\ $h_{2}:$ [385], [383] \\ $h_{3}:$ [355] \\ $h_{4}:$ [313], [311], [309], [307] \item[403] {\rm Sq(1)[409] + Sq(1)[407] + Sq(1)[403]} \\ $h_{0}:$ [409], [407], [403] \\ $h_{1}:$ [399], [396], [395] \\ $h_{2}:$ [385], [383] \\ $h_{3}:$ [356] \\ $h_{4}:$ [313], [310], [307] \end{gl} \end{bdl} \begin{bdl} \item[15/196] \mb{15/196} \begin{gl} \item[403] {\rm Sq(3)[396] + Sq(0,1)[396] + Sq(3)[394] + Sq(0,1)[394]} \item[404] {\rm Sq(3)[397] + Sq(0,1)[397] + Sq(3)[394] + Sq(0,1)[393] + Sq(3)[392] + Sq(0,1)[392]} \\ $h_{4}:$ [320] \item[405] {\rm Sq(1)[404]} \\ $h_{0}:$ [404] \\ $h_{3}:$ [367], [363], [362] \\ $h_{4}:$ [320] \item[406] {\rm Sq(1)[406]} \\ $h_{0}:$ [406] \\ $h_{2}:$ [391], [390], [389] \\ $h_{4}:$ [322] \item[407] {\rm Sq(1)[409]} \\ $h_{0}:$ [409] \\ $h_{1}:$ [400], [399] \\ $h_{2}:$ [391], [390] \\ $h_{3}:$ [368], [367], [365] \\ $h_{4}:$ [320] \item[408] {\rm Sq(1)[410]} \\ $h_{0}:$ [410] \\ $h_{1}:$ [398] \\ $h_{2}:$ [391], [390], [389] \\ $h_{3}:$ [367], [362] \\ $h_{4}:$ [322] \item[409] {\rm Sq(1)[411] + Sq(1)[407]} \\ $h_{0}:$ [411], [407] \\ $h_{1}:$ [400], [399] \\ $h_{2}:$ [389] \\ $h_{3}:$ [368], [367], [365] \\ $h_{4}:$ [322], [320] \end{gl} \end{bdl} \begin{bdl} \item[14/196] \mb{14/196} \begin{gl} \item[404] {\rm Sq(0,1)[385]} \\ $h_{3}:$ [359] \item[405] {\rm Sq(0,1)[387] + Sq(3)[386]} \\ $h_{3}:$ [359] \item[406] {\rm Sq(3)[388] + Sq(3)[387] + Sq(3)[386] + Sq(0,1)[386]} \\ $h_{4}:$ [325] \item[407] {\rm Sq(3)[389] + Sq(0,1)[389] + Sq(3)[387] + Sq(0,1)[386] + Sq(3)[385]} \\ $h_{7}:$ [32] \item[408] {\rm Sq(2)[392]} \\ $h_{1}:$ [392] \\ $h_{7}:$ [32] \item[409] {\rm Sq(1)[398]} \\ $h_{0}:$ [398] \\ $h_{3}:$ [361], [359] \item[410] {\rm Sq(1)[399]} \\ $h_{0}:$ [399] \\ $h_{3}:$ [359] \\ $h_{4}:$ [325] \item[411] {\rm Sq(1)[401] + Sq(1)[400]} \\ $h_{0}:$ [401], [400] \\ $h_{3}:$ [361], [359] \\ $h_{4}:$ [325] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[13/196] \mb{13/196} \begin{gl} \item[398] {\rm Sq(1,1)[378]} \\ $h_{3}:$ [357] \item[399] {\rm Sq(1,1)[379] + Sq(1,1)[376]} \item[400] {\rm Sq(1)[396] + Sq(1)[395] + Sq(1)[393] + Sq(1)[392]} \\ $h_{0}:$ [396], [395], [393], [392] \\ $h_{1}:$ [389], [387] \\ $h_{4}:$ [330] \item[401] {\rm Sq(1)[397] + Sq(1)[393]} \\ $h_{0}:$ [397], [393] \\ $h_{1}:$ [389], [387] \\ $h_{3}:$ [357] \\ $h_{4}:$ [330] \end{gl} \end{bdl} \begin{bdl} \item[12/196] \mb{12/196} \begin{gl} \item[392] {\rm Sq(1,1)[370]} \item[393] {\rm Sq(1,1)[375] + Sq(1,1)[373]} \\ $h_{3}:$ [356] \item[394] {\rm Sq(4)[375] + Sq(1,1)[374] + Sq(1,1)[373] + Sq(4)[372] + Sq(4)[371] + Sq(1,1)[371]} \\ $h_{2}:$ [375], [372], [371] \\ $h_{3}:$ [357] \\ $h_{4}:$ [336] \\ $h_{7}:$ [39] \item[395] {\rm Sq(3)[377] + Sq(0,1)[377] + Sq(3)[376] + Sq(0,1)[376]} \\ $h_{3}:$ [355], [354] \item[396] {\rm Sq(3)[378] + Sq(0,1)[378] + Sq(3)[376] + Sq(0,1)[376]} \\ $h_{3}:$ [356], [355], [354] \item[397] {\rm Sq(3)[379] + Sq(0,1)[379]} \\ $h_{3}:$ [356] \item[398] {\rm Sq(1)[386]} \\ $h_{0}:$ [386] \\ $h_{2}:$ [373] \\ $h_{3}:$ [356], [355], [354] \\ $h_{4}:$ [336] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[11/196] \mb{11/196} \begin{gl} \item[386] {\rm Sq(0,1)[356] + Sq(3)[354] + Sq(0,1)[354] + Sq(3)[353]} \\ $h_{7}:$ [40] \item[387] {\rm Sq(0,1)[357] + Sq(3)[356] + Sq(0,1)[354] + Sq(0,1)[353]} \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[10/196] \mb{10/196} \begin{gl} \item[362] {\rm Sq(2)[324]} \\ $h_{1}:$ [324] \\ $h_{2}:$ [319], [318] \\ $h_{3}:$ [308], [307] \\ $h_{7}:$ [42] \item[363] {\rm Sq(2)[325]} \\ $h_{1}:$ [325] \\ $h_{2}:$ [320] \\ $h_{3}:$ [308], [307] \\ $h_{7}:$ [42] \item[364] {\rm Sq(2)[326]} \\ $h_{1}:$ [326] \\ $h_{2}:$ [320] \\ $h_{3}:$ [308] \item[365] {\rm Sq(2)[328] + Sq(2)[327]} \\ $h_{1}:$ [328], [327] \\ $h_{2}:$ [320], [319] \\ $h_{3}:$ [308] \\ $h_{5}:$ [264] \\ $h_{6}:$ [163] \item[366] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{2}:$ [321], [319] \\ $h_{3}:$ [308], [307], [306] \\ $h_{7}:$ [43] \item[367] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \\ $h_{1}:$ [327] \\ $h_{2}:$ [320], [319], [318] \\ $h_{3}:$ [307] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[9/196] \mb{9/196} \begin{gl} \item[330] {\rm Sq(4)[280] + Sq(1,1)[280]} \\ $h_{2}:$ [280] \\ $h_{7}:$ [45] \item[331] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(3)[282] + Sq(0,1)[282]} \\ $h_{7}:$ [46] \item[332] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \end{gl} \end{bdl} \begin{bdl} \item[8/196] \mb{8/196} \begin{gl} \item[288] {\rm Sq(5)[241]} \item[289] {\rm Sq(3)[243] + Sq(0,1)[243]} \item[290] {\rm Sq(1)[249] + Sq(1)[248]} \\ $h_{0}:$ [249], [248] \\ $h_{1}:$ [245] \\ $h_{4}:$ [226], [225] \\ $h_{7}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[7/196] \mb{7/196} \begin{gl} \item[247] {\rm Sq(3,1)[196] + Sq(6)[195] + Sq(3,1)[195]} \\ $h_{3}:$ [191] \\ $h_{7}:$ [44] \item[248] {\rm Sq(3)[200] + Sq(0,1)[200] + Sq(3)[199] + Sq(0,1)[199] + Sq(0,1)[198]} \\ $h_{3}:$ [191] \\ $h_{7}:$ [44] \item[249] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{3}:$ [191] \\ $h_{7}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[6/196] \mb{6/196} \begin{gl} \item[203] {\rm Sq(2)[144] + Sq(2)[143]} \\ $h_{1}:$ [144], [143] \\ $h_{3}:$ [138] \\ $h_{5}:$ [118], [117] \item[204] {\rm Sq(1)[145]} \\ $h_{0}:$ [145] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[5/196] \mb{5/196} \begin{gl} \item[145] {\rm Sq(2,1)[92]} \\ $h_{7}:$ [33] \end{gl} \end{bdl} \dm{197} \begin{bdl} \item[93/197] \mb{93/197} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[92/197] \mb{92/197} \begin{gl} \item[8] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[91/197] \mb{91/197} \begin{gl} \item[8] {\rm Sq(1,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[90/197] \mb{90/197} \begin{gl} \item[12] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \\ $h_{2}:$ [14] \\ $h_{3}:$ [10] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[89/197] \mb{89/197} \begin{gl} \item[16] {\rm Sq(1)[16] + Sq(1)[15]} \\ $h_{0}:$ [16], [15] \\ $h_{2}:$ [13] \\ $h_{3}:$ [9] \\ $h_{4}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[88/197] \mb{88/197} \begin{gl} \item[15] {\rm Sq(0,1)[12]} \item[16] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{3}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[87/197] \mb{87/197} \begin{gl} \item[13] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{3}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[86/197] \mb{86/197} \begin{gl} \item[15] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[85/197] \mb{85/197} \begin{gl} \item[18] {\rm Sq(0,1)[17]} \item[19] {\rm Sq(1)[18]} \\ $h_{0}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[84/197] \mb{84/197} \begin{gl} \item[18] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[83/197] \mb{83/197} \begin{gl} \item[17] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[82/197] \mb{82/197} \begin{gl} \item[20] {\rm Sq(3,1)[24]} \item[21] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[79/197] \mb{79/197} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[77/197] \mb{77/197} \begin{gl} \item[32] {\rm Sq(3)[32] + Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[76/197] \mb{76/197} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[75/197] \mb{75/197} \begin{gl} \item[39] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [41] \\ $h_{2}:$ [38] \\ $h_{4}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[74/197] \mb{74/197} \begin{gl} \item[44] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{2}:$ [39] \\ $h_{4}:$ [24] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[73/197] \mb{73/197} \begin{gl} \item[45] {\rm Sq(0,1)[39]} \item[46] {\rm Sq(0,1)[40]} \item[47] {\rm Sq(1)[45] + Sq(1)[43]} \\ $h_{0}:$ [45], [43] \\ $h_{2}:$ [38] \\ $h_{3}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[72/197] \mb{72/197} \begin{gl} \item[43] {\rm Sq(0,1)[42]} \item[44] {\rm Sq(2)[44] + Sq(2)[43]} \\ $h_{1}:$ [44], [43] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{3}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[71/197] \mb{71/197} \begin{gl} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{3}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[70/197] \mb{70/197} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \item[51] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[69/197] \mb{69/197} \begin{gl} \item[51] {\rm Sq(0,1)[50]} \item[52] {\rm Sq(1)[53]} \\ $h_{0}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[68/197] \mb{68/197} \begin{gl} \item[53] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[67/197] \mb{67/197} \begin{gl} \item[58] {\rm Sq(0,1)[64]} \item[59] {\rm Sq(0,1)[65]} \item[60] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[66/197] \mb{66/197} \begin{gl} \item[67] {\rm Sq(3,1)[64]} \item[68] {\rm Sq(0,1)[67]} \end{gl} \end{bdl} \begin{bdl} \item[65/197] \mb{65/197} \begin{gl} \item[71] {\rm Sq(1)[70]} \\ $h_{0}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[64/197] \mb{64/197} \begin{gl} \item[70] {\rm Sq(1,1)[70]} \item[71] {\rm Sq(0,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[63/197] \mb{63/197} \begin{gl} \item[75] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[61/197] \mb{61/197} \begin{gl} \item[87] {\rm Sq(0,1)[85]} \item[88] {\rm Sq(0,1)[86]} \item[89] {\rm Sq(0,1)[87]} \end{gl} \end{bdl} \begin{bdl} \item[60/197] \mb{60/197} \begin{gl} \item[93] {\rm Sq(0,1)[94]} \end{gl} \end{bdl} \begin{bdl} \item[59/197] \mb{59/197} \begin{gl} \item[102] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [101] \\ $h_{2}:$ [98] \item[103] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \\ $h_{1}:$ [102], [101] \\ $h_{2}:$ [99], [98] \end{gl} \end{bdl} \begin{bdl} \item[58/197] \mb{58/197} \begin{gl} \item[106] {\rm Sq(0,1)[99]} \item[107] {\rm Sq(0,1)[100]} \item[108] {\rm Sq(0,1)[101]} \item[109] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{2}:$ [96] \item[110] {\rm Sq(1)[108]} \\ $h_{0}:$ [108] \\ $h_{2}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[57/197] \mb{57/197} \begin{gl} \item[105] {\rm Sq(0,1)[101]} \item[106] {\rm Sq(0,1)[102]} \item[107] {\rm Sq(0,1)[103]} \item[108] {\rm Sq(1)[110]} \\ $h_{0}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[56/197] \mb{56/197} \begin{gl} \item[109] {\rm Sq(2)[114] + Sq(2)[113]} \\ $h_{1}:$ [114], [113] \item[110] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[55/197] \mb{55/197} \begin{gl} \item[116] {\rm Sq(0,1)[117]} \item[117] {\rm Sq(0,1)[118]} \item[118] {\rm Sq(0,1)[119]} \item[119] {\rm Sq(1)[123]} \\ $h_{0}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[54/197] \mb{54/197} \begin{gl} \item[120] {\rm Sq(0,1)[119]} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(0,1)[121]} \item[123] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \end{gl} \end{bdl} \begin{bdl} \item[53/197] \mb{53/197} \begin{gl} \item[125] {\rm Sq(0,1)[128]} \item[126] {\rm Sq(3)[128]} \end{gl} \end{bdl} \begin{bdl} \item[52/197] \mb{52/197} \begin{gl} \item[132] {\rm Sq(0,1)[141]} \item[133] {\rm Sq(0,1)[142]} \item[134] {\rm Sq(0,1)[143]} \end{gl} \end{bdl} \begin{bdl} \item[51/197] \mb{51/197} \begin{gl} \item[145] {\rm Sq(0,1)[149]} \item[146] {\rm Sq(0,1)[150]} \item[147] {\rm Sq(0,1)[151]} \item[148] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \\ $h_{1}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[50/197] \mb{50/197} \begin{gl} \item[156] {\rm Sq(0,1)[150]} \item[157] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \end{gl} \end{bdl} \begin{bdl} \item[49/197] \mb{49/197} \begin{gl} \item[155] {\rm Sq(0,1)[152]} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(0,1)[154]} \item[158] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[48/197] \mb{48/197} \begin{gl} \item[156] {\rm Sq(1,1)[158]} \item[157] {\rm Sq(0,1)[159]} \item[158] {\rm Sq(0,1)[160]} \item[159] {\rm Sq(0,1)[161]} \item[160] {\rm Sq(2)[163]} \\ $h_{1}:$ [163] \end{gl} \end{bdl} \begin{bdl} \item[47/197] \mb{47/197} \begin{gl} \item[167] {\rm Sq(0,1)[168]} \end{gl} \end{bdl} \begin{bdl} \item[46/197] \mb{46/197} \begin{gl} \item[174] {\rm Sq(0,1)[172]} \item[175] {\rm Sq(0,1)[173]} \item[176] {\rm Sq(0,1)[174]} \item[177] {\rm Sq(0,1)[175]} \end{gl} \end{bdl} \begin{bdl} \item[45/197] \mb{45/197} \begin{gl} \item[181] {\rm Sq(0,1)[179]} \item[182] {\rm Sq(0,1)[180]} \item[183] {\rm Sq(0,1)[181]} \item[184] {\rm Sq(3)[184] + Sq(0,1)[184] + Sq(3)[183] + Sq(0,1)[183] + Sq(3)[178]} \end{gl} \end{bdl} \begin{bdl} \item[44/197] \mb{44/197} \begin{gl} \item[191] {\rm Sq(0,1)[193]} \end{gl} \end{bdl} \begin{bdl} \item[43/197] \mb{43/197} \begin{gl} \item[202] {\rm Sq(0,1)[202]} \item[203] {\rm Sq(0,1)[203]} \item[204] {\rm Sq(0,1)[204]} \item[205] {\rm Sq(0,1)[205]} \item[206] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{1}:$ [208] \\ $h_{2}:$ [197] \item[207] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{1}:$ [210] \end{gl} \end{bdl} \begin{bdl} \item[42/197] \mb{42/197} \begin{gl} \item[212] {\rm Sq(1,1)[208]} \item[213] {\rm Sq(0,1)[209]} \item[214] {\rm Sq(0,1)[210]} \item[215] {\rm Sq(0,1)[212]} \item[216] {\rm Sq(0,1)[213]} \item[217] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{2}:$ [207] \\ $h_{3}:$ [191], [190] \end{gl} \end{bdl} \begin{bdl} \item[41/197] \mb{41/197} \begin{gl} \item[222] {\rm Sq(0,1)[215]} \item[223] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{1}:$ [217] \\ $h_{2}:$ [213] \\ $h_{4}:$ [163] \item[224] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{2}:$ [208] \\ $h_{3}:$ [190], [189] \end{gl} \end{bdl} \begin{bdl} \item[40/197] \mb{40/197} \begin{gl} \item[223] {\rm Sq(0,1)[220]} \item[224] {\rm Sq(0,1)[221]} \item[225] {\rm Sq(0,1)[222]} \item[226] {\rm Sq(0,1)[223]} \item[227] {\rm Sq(0,1)[224]} \item[228] {\rm Sq(2)[226]} \\ $h_{1}:$ [226] \item[229] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{2}:$ [215] \\ $h_{4}:$ [167] \item[230] {\rm Sq(1)[234]} \\ $h_{0}:$ [234] \end{gl} \end{bdl} \begin{bdl} \item[39/197] \mb{39/197} \begin{gl} \item[229] {\rm Sq(0,1)[231]} \item[230] {\rm Sq(0,1)[232]} \item[231] {\rm Sq(0,1)[233]} \item[232] {\rm Sq(3)[234]} \item[233] {\rm Sq(0,1)[235] + Sq(0,1)[234]} \item[234] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \end{gl} \end{bdl} \begin{bdl} \item[38/197] \mb{38/197} \begin{gl} \item[241] {\rm Sq(1,1)[244]} \item[242] {\rm Sq(0,1)[247]} \item[243] {\rm Sq(0,1)[248]} \end{gl} \end{bdl} \begin{bdl} \item[37/197] \mb{37/197} \begin{gl} \item[254] {\rm Sq(0,1)[256]} \item[255] {\rm Sq(0,1)[257]} \item[256] {\rm Sq(0,1)[258]} \item[257] {\rm Sq(0,1)[259]} \end{gl} \end{bdl} \begin{bdl} \item[36/197] \mb{36/197} \begin{gl} \item[264] {\rm Sq(0,1)[263]} \item[265] {\rm Sq(0,1)[264]} \item[266] {\rm Sq(0,1)[265]} \item[267] {\rm Sq(0,1)[266]} \end{gl} \end{bdl} \begin{bdl} \item[35/197] \mb{35/197} \begin{gl} \item[270] {\rm Sq(2,1)[265] + Sq(2,1)[263]} \item[271] {\rm Sq(1,1)[268]} \item[272] {\rm Sq(0,1)[271]} \item[273] {\rm Sq(0,1)[272]} \item[274] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \\ $h_{1}:$ [276], [273] \\ $h_{3}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[34/197] \mb{34/197} \begin{gl} \item[278] {\rm Sq(0,1)[273]} \item[279] {\rm Sq(0,1)[275] + Sq(0,1)[274]} \item[280] {\rm Sq(1)[286]} \\ $h_{0}:$ [286] \\ $h_{7}:$ [3] \item[281] {\rm Sq(1)[287] + Sq(1)[284]} \\ $h_{0}:$ [287], [284] \\ $h_{3}:$ [253] \end{gl} \end{bdl} \begin{bdl} \item[33/197] \mb{33/197} \begin{gl} \item[281] {\rm Sq(0,1)[273]} \item[282] {\rm Sq(0,1)[274]} \item[283] {\rm Sq(0,1)[275]} \item[284] {\rm Sq(3)[276] + Sq(0,1)[276] + Sq(3)[274]} \\ $h_{7}:$ [3] \item[285] {\rm Sq(2)[278]} \\ $h_{1}:$ [278] \item[286] {\rm Sq(1)[283] + Sq(1)[282]} \\ $h_{0}:$ [283], [282] \\ $h_{7}:$ [3] \item[287] {\rm Sq(1)[286] + Sq(1)[282]} \\ $h_{0}:$ [286], [282] \\ $h_{7}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[32/197] \mb{32/197} \begin{gl} \item[282] {\rm Sq(1,1)[275] + Sq(1,1)[274]} \item[283] {\rm Sq(1,1)[276]} \item[284] {\rm Sq(0,1)[278]} \item[285] {\rm Sq(2)[285] + Sq(2)[284] + Sq(2)[283]} \\ $h_{1}:$ [285], [284], [283] \item[286] {\rm Sq(1)[287] + Sq(1)[286]} \\ $h_{0}:$ [287], [286] \end{gl} \end{bdl} \begin{bdl} \item[31/197] \mb{31/197} \begin{gl} \item[286] {\rm Sq(1,1)[279] + Sq(1,1)[278] + Sq(4)[277]} \\ $h_{2}:$ [277] \item[287] {\rm Sq(0,1)[287] + Sq(0,1)[286]} \\ $h_{2}:$ [277] \item[288] {\rm Sq(3)[287] + Sq(3)[286] + Sq(0,1)[285]} \item[289] {\rm Sq(3)[289] + Sq(0,1)[289] + Sq(3)[286] + Sq(0,1)[286]} \end{gl} \end{bdl} \begin{bdl} \item[30/197] \mb{30/197} \begin{gl} \item[293] {\rm Sq(1,1)[288] + Sq(1,1)[286]} \item[294] {\rm Sq(0,1)[291]} \item[295] {\rm Sq(0,1)[292] + Sq(0,1)[289]} \item[296] {\rm Sq(3)[295] + Sq(0,1)[295] + Sq(3)[293] + Sq(0,1)[293] + Sq(3)[290] + Sq(0,1)[290]} \end{gl} \end{bdl} \begin{bdl} \item[29/197] \mb{29/197} \begin{gl} \item[301] {\rm Sq(0,1)[295]} \item[302] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \\ $h_{1}:$ [302], [300], [299] \\ $h_{2}:$ [292], [291], [290] \\ $h_{3}:$ [278], [277] \\ $h_{4}:$ [246] \\ $h_{5}:$ [183] \end{gl} \end{bdl} \begin{bdl} \item[28/197] \mb{28/197} \begin{gl} \item[304] {\rm Sq(3)[300] + Sq(0,1)[300] + Sq(3)[299] + Sq(0,1)[299] + Sq(0,1)[298] + Sq(0,1)[297]} \item[305] {\rm Sq(2)[303]} \\ $h_{1}:$ [303] \item[306] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \end{gl} \end{bdl} \begin{bdl} \item[27/197] \mb{27/197} \begin{gl} \item[306] {\rm Sq(1,1)[302]} \item[307] {\rm Sq(1,1)[303] + Sq(1,1)[301]} \item[308] {\rm Sq(0,1)[304]} \item[309] {\rm Sq(3)[304]} \item[310] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{1}:$ [311], [310] \item[311] {\rm Sq(1)[315] + Sq(1)[313]} \\ $h_{0}:$ [315], [313] \\ $h_{1}:$ [310], [309] \\ $h_{3}:$ [289], [288], [286], [285] \end{gl} \end{bdl} \begin{bdl} \item[26/197] \mb{26/197} \begin{gl} \item[313] {\rm Sq(3)[308]} \item[314] {\rm Sq(0,1)[309] + Sq(0,1)[308]} \item[315] {\rm Sq(1)[320] + Sq(1)[317]} \\ $h_{0}:$ [320], [317] \\ $h_{3}:$ [289], [287] \item[316] {\rm Sq(1)[321] + Sq(1)[318] + Sq(1)[317]} \\ $h_{0}:$ [321], [318], [317] \\ $h_{1}:$ [313], [312] \\ $h_{2}:$ [306], [305], [303], [302] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[25/197] \mb{25/197} \begin{gl} \item[316] {\rm Sq(5)[303] + Sq(2,1)[303] + Sq(2,1)[302] + Sq(2,1)[301]} \item[317] {\rm Sq(1,1)[307] + Sq(1,1)[304]} \\ $h_{3}:$ [291] \item[318] {\rm Sq(3)[309] + Sq(0,1)[309] + Sq(0,1)[308]} \item[319] {\rm Sq(2)[312]} \\ $h_{1}:$ [312] \\ $h_{2}:$ [306], [305] \\ $h_{3}:$ [291] \item[320] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \item[321] {\rm Sq(1)[320] + Sq(1)[319]} \\ $h_{0}:$ [320], [319] \\ $h_{2}:$ [305], [304] \\ $h_{3}:$ [291] \\ $h_{7}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[24/197] \mb{24/197} \begin{gl} \item[316] {\rm Sq(3)[310] + Sq(0,1)[310]} \item[317] {\rm Sq(0,1)[312] + Sq(0,1)[310]} \item[318] {\rm Sq(0,1)[313]} \\ $h_{7}:$ [14] \item[319] {\rm Sq(3)[314] + Sq(0,1)[314] + Sq(3)[311] + Sq(0,1)[311]} \item[320] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[23/197] \mb{23/197} \begin{gl} \item[319] {\rm Sq(3)[329] + Sq(0,1)[329] + Sq(3)[327] + Sq(0,1)[327]} \item[320] {\rm Sq(1)[338] + Sq(1)[334]} \\ $h_{0}:$ [338], [334] \\ $h_{7}:$ [16] \item[321] {\rm Sq(1)[339] + Sq(1)[336] + Sq(1)[335] + Sq(1)[334]} \\ $h_{0}:$ [339], [336], [335], [334] \\ $h_{1}:$ [331] \\ $h_{2}:$ [325], [324] \\ $h_{3}:$ [314], [312] \end{gl} \end{bdl} \begin{bdl} \item[22/197] \mb{22/197} \begin{gl} \item[334] {\rm Sq(1,1)[333] + Sq(1,1)[331]} \item[335] {\rm Sq(3)[336] + Sq(3)[335]} \item[336] {\rm Sq(3)[338] + Sq(0,1)[338] + Sq(3)[337]} \item[337] {\rm Sq(2)[340]} \\ $h_{1}:$ [340] \\ $h_{4}:$ [286] \item[338] {\rm Sq(1)[347] + Sq(1)[345]} \\ $h_{0}:$ [347], [345] \\ $h_{7}:$ [20] \item[339] {\rm Sq(1)[348] + Sq(1)[345]} \\ $h_{0}:$ [348], [345] \\ $h_{2}:$ [333], [331] \\ $h_{3}:$ [321], [320] \end{gl} \end{bdl} \begin{bdl} \item[21/197] \mb{21/197} \begin{gl} \item[345] {\rm Sq(3)[345] + Sq(0,1)[345] + Sq(0,1)[341]} \\ $h_{7}:$ [19] \item[346] {\rm Sq(2)[347]} \\ $h_{1}:$ [347] \\ $h_{3}:$ [324] \\ $h_{5}:$ [220] \\ $h_{6}:$ [128] \\ $h_{7}:$ [19] \item[347] {\rm Sq(1)[354] + Sq(1)[352]} \\ $h_{0}:$ [354], [352] \\ $h_{7}:$ [20], [19] \item[348] {\rm Sq(1)[355] + Sq(1)[352]} \\ $h_{0}:$ [355], [352] \\ $h_{2}:$ [337] \\ $h_{3}:$ [325], [323] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[20/197] \mb{20/197} \begin{gl} \item[352] {\rm Sq(3)[358]} \item[353] {\rm Sq(2)[363] + Sq(2)[362]} \\ $h_{1}:$ [363], [362] \\ $h_{7}:$ [18] \item[354] {\rm Sq(1)[371]} \\ $h_{0}:$ [371] \\ $h_{7}:$ [19] \item[355] {\rm Sq(1)[372]} \\ $h_{0}:$ [372] \\ $h_{3}:$ [338], [336] \end{gl} \end{bdl} \begin{bdl} \item[19/197] \mb{19/197} \begin{gl} \item[368] {\rm Sq(3)[376] + Sq(0,1)[376] + Sq(3)[375]} \item[369] {\rm Sq(2)[378]} \\ $h_{1}:$ [378] \item[370] {\rm Sq(2)[380]} \\ $h_{1}:$ [380] \\ $h_{4}:$ [305], [303] \item[371] {\rm Sq(1)[382]} \\ $h_{0}:$ [382] \\ $h_{7}:$ [22] \item[372] {\rm Sq(1)[387] + Sq(1)[385] + Sq(1)[384]} \\ $h_{0}:$ [387], [385], [384] \end{gl} \end{bdl} \begin{bdl} \item[18/197] \mb{18/197} \begin{gl} \item[382] {\rm Sq(1,1)[381]} \\ $h_{7}:$ [26] \item[383] {\rm Sq(3)[385] + Sq(3)[384] + Sq(3)[383] + Sq(0,1)[383]} \item[384] {\rm Sq(3)[386] + Sq(0,1)[386] + Sq(3)[383] + Sq(0,1)[383]} \\ $h_{3}:$ [352], [351] \item[385] {\rm Sq(3)[387] + Sq(0,1)[387] + Sq(0,1)[384]} \\ $h_{3}:$ [352], [351] \\ $h_{7}:$ [27] \item[386] {\rm Sq(2)[391] + Sq(2)[390]} \\ $h_{1}:$ [391], [390] \\ $h_{3}:$ [352], [351] \\ $h_{4}:$ [306] \item[387] {\rm Sq(1)[395] + Sq(1)[394]} \\ $h_{0}:$ [395], [394] \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[17/197] \mb{17/197} \begin{gl} \item[394] {\rm Sq(3)[391] + Sq(0,1)[390]} \item[395] {\rm Sq(3)[394] + Sq(0,1)[394] + Sq(3)[393] + Sq(0,1)[393] + Sq(3)[392] + Sq(0,1)[392] + Sq(0,1)[391] + Sq(0,1)[390]} \item[396] {\rm Sq(1)[405]} \\ $h_{0}:$ [405] \\ $h_{3}:$ [359], [357], [353], [352], [351] \\ $h_{4}:$ [311], [310], [309] \item[397] {\rm Sq(1)[406]} \\ $h_{0}:$ [406] \\ $h_{1}:$ [400], [399] \\ $h_{2}:$ [386], [384], [383], [381] \\ $h_{3}:$ [359], [356], [353], [352], [351] \\ $h_{4}:$ [311] \item[398] {\rm Sq(1)[408] + Sq(1)[404]} \\ $h_{0}:$ [408], [404] \\ $h_{2}:$ [387], [386], [380] \\ $h_{3}:$ [359], [357], [353], [352], [351] \\ $h_{4}:$ [311], [310], [309] \\ $h_{7}:$ [28] \item[399] {\rm Sq(1)[409] + Sq(1)[404]} \\ $h_{0}:$ [409], [404] \\ $h_{2}:$ [387], [381], [380] \\ $h_{3}:$ [359], [356] \\ $h_{4}:$ [310], [309] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[16/197] \mb{16/197} \begin{gl} \item[404] {\rm Sq(3)[400] + Sq(0,1)[399] + Sq(3)[397] + Sq(3)[395] + Sq(0,1)[394]} \\ $h_{2}:$ [386] \\ $h_{3}:$ [361], [360] \item[405] {\rm Sq(3)[401] + Sq(0,1)[401] + Sq(3)[399] + Sq(0,1)[399] + Sq(3)[398] + Sq(0,1)[398] + Sq(0,1)[397] + Sq(3)[396] + Sq(0,1)[395] + Sq(3)[394] + Sq(0,1)[394]} \\ $h_{3}:$ [363], [361] \item[406] {\rm Sq(3)[402] + Sq(0,1)[402] + Sq(3)[399] + Sq(0,1)[398] + Sq(3)[396] + Sq(3)[395] + Sq(0,1)[395] + Sq(3)[394] + Sq(0,1)[394]} \\ $h_{2}:$ [386] \\ $h_{3}:$ [363], [360] \item[407] {\rm Sq(2)[403]} \\ $h_{1}:$ [403] \\ $h_{3}:$ [363], [361] \\ $h_{4}:$ [318] \item[408] {\rm Sq(1)[411] + Sq(1)[410]} \\ $h_{0}:$ [411], [410] \\ $h_{2}:$ [388], [387] \\ $h_{3}:$ [363], [360] \\ $h_{7}:$ [28] \item[409] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{2}:$ [388], [387], [386] \\ $h_{3}:$ [363], [361] \\ $h_{7}:$ [28] \item[410] {\rm Sq(1)[414] + Sq(1)[410]} \\ $h_{0}:$ [414], [410] \\ $h_{1}:$ [404] \\ $h_{2}:$ [391], [390] \\ $h_{3}:$ [362] \\ $h_{4}:$ [321], [319], [318], [316], [315] \item[411] {\rm Sq(1)[417] + Sq(1)[415] + Sq(1)[410]} \\ $h_{0}:$ [417], [415], [410] \\ $h_{2}:$ [390], [386] \\ $h_{3}:$ [366], [365], [362], [361], [360] \\ $h_{4}:$ [320], [319], [316] \end{gl} \end{bdl} \begin{bdl} \item[15/197] \mb{15/197} \begin{gl} \item[410] {\rm Sq(0,1)[399]} \\ $h_{7}:$ [30], [29] \item[411] {\rm Sq(3)[400] + Sq(3)[399] + Sq(3)[398]} \\ $h_{7}:$ [29] \item[412] {\rm Sq(2)[407] + Sq(2)[405] + Sq(2)[404]} \\ $h_{1}:$ [407], [405], [404] \\ $h_{7}:$ [31], [29] \item[413] {\rm Sq(1)[412]} \\ $h_{0}:$ [412] \\ $h_{7}:$ [30] \item[414] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{2}:$ [394], [393] \\ $h_{4}:$ [328], [325] \\ $h_{7}:$ [30], [29] \item[415] {\rm Sq(1)[414]} \\ $h_{0}:$ [414] \\ $h_{1}:$ [405], [404] \\ $h_{4}:$ [327] \\ $h_{7}:$ [30], [29] \item[416] {\rm Sq(1)[416]} \\ $h_{0}:$ [416] \\ $h_{1}:$ [408] \\ $h_{4}:$ [324] \\ $h_{7}:$ [31], [29] \item[417] {\rm Sq(1)[418] + Sq(1)[415]} \\ $h_{0}:$ [418], [415] \\ $h_{1}:$ [405], [404] \\ $h_{2}:$ [393], [392] \\ $h_{3}:$ [372], [371] \\ $h_{4}:$ [327], [326], [325], [324] \end{gl} \end{bdl} \begin{bdl} \item[14/197] \mb{14/197} \begin{gl} \item[412] {\rm Sq(1,1)[389]} \item[413] {\rm Sq(1,1)[390] + Sq(1,1)[386]} \\ $h_{4}:$ [328] \item[414] {\rm Sq(3)[393] + Sq(0,1)[393] + Sq(3)[391] + Sq(0,1)[391]} \item[415] {\rm Sq(1)[405] + Sq(1)[403] + Sq(1)[402]} \\ $h_{0}:$ [405], [403], [402] \\ $h_{3}:$ [367], [366] \item[416] {\rm Sq(1)[409]} \\ $h_{0}:$ [409] \item[417] {\rm Sq(1)[410] + Sq(1)[404] + Sq(1)[403]} \\ $h_{0}:$ [410], [404], [403] \\ $h_{1}:$ [399], [398] \\ $h_{2}:$ [385] \\ $h_{3}:$ [365], [364] \\ $h_{6}:$ [159] \item[418] {\rm Sq(1)[411] + Sq(1)[402]} \\ $h_{0}:$ [411], [402] \\ $h_{3}:$ [367], [366] \end{gl} \end{bdl} \begin{bdl} \item[13/197] \mb{13/197} \begin{gl} \item[402] {\rm Sq(3)[388] + Sq(0,1)[388] + Sq(0,1)[387]} \\ $h_{3}:$ [361] \item[403] {\rm Sq(0,1)[389] + Sq(0,1)[387]} \\ $h_{3}:$ [363], [361] \item[404] {\rm Sq(3)[389] + Sq(0,1)[387]} \\ $h_{2}:$ [382] \\ $h_{3}:$ [363], [362] \\ $h_{7}:$ [36] \item[405] {\rm Sq(3)[391] + Sq(0,1)[391] + Sq(3)[390] + Sq(0,1)[390] + Sq(3)[387]} \\ $h_{3}:$ [362] \item[406] {\rm Sq(2)[392]} \\ $h_{1}:$ [392] \\ $h_{2}:$ [382] \\ $h_{3}:$ [363] \\ $h_{7}:$ [36] \item[407] {\rm Sq(2)[396] + Sq(2)[395] + Sq(2)[393]} \\ $h_{1}:$ [396], [395], [393] \\ $h_{2}:$ [382] \\ $h_{3}:$ [363], [362], [361] \\ $h_{7}:$ [36] \item[408] {\rm Sq(2)[397] + Sq(2)[393]} \\ $h_{1}:$ [397], [393] \\ $h_{2}:$ [382] \\ $h_{7}:$ [36] \item[409] {\rm Sq(1)[399]} \\ $h_{0}:$ [399] \item[410] {\rm Sq(1)[400]} \\ $h_{0}:$ [400] \\ $h_{2}:$ [382] \\ $h_{3}:$ [362] \\ $h_{7}:$ [36] \item[411] {\rm Sq(1)[401]} \\ $h_{0}:$ [401] \\ $h_{3}:$ [363], [362], [361] \end{gl} \end{bdl} \begin{bdl} \item[12/197] \mb{12/197} \begin{gl} \item[399] {\rm Sq(3)[383] + Sq(0,1)[383] + Sq(3)[380] + Sq(0,1)[380]} \item[400] {\rm Sq(1)[389]} \\ $h_{0}:$ [389] \item[401] {\rm Sq(1)[390] + Sq(1)[388]} \\ $h_{0}:$ [390], [388] \end{gl} \end{bdl} \begin{bdl} \item[11/197] \mb{11/197} \begin{gl} \item[388] {\rm Sq(1,1)[356] + Sq(1,1)[355] + Sq(1,1)[354] + Sq(1,1)[353]} \\ $h_{3}:$ [341] \item[389] {\rm Sq(3)[359] + Sq(0,1)[359]} \item[390] {\rm Sq(3)[360] + Sq(0,1)[360]} \\ $h_{3}:$ [341] \item[391] {\rm Sq(2)[364] + Sq(2)[363]} \\ $h_{1}:$ [364], [363] \\ $h_{2}:$ [354] \\ $h_{3}:$ [342] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[10/197] \mb{10/197} \begin{gl} \item[368] {\rm Sq(2)[331]} \\ $h_{1}:$ [331] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[9/197] \mb{9/197} \begin{gl} \item[333] {\rm Sq(0,1)[285]} \\ $h_{3}:$ [274], [273] \\ $h_{7}:$ [47] \item[334] {\rm Sq(3)[287] + Sq(0,1)[287] + Sq(3)[286] + Sq(0,1)[286] + Sq(3)[285]} \\ $h_{3}:$ [274], [273] \\ $h_{5}:$ [231] \\ $h_{7}:$ [47] \item[335] {\rm Sq(2)[289]} \\ $h_{1}:$ [289] \\ $h_{2}:$ [283], [282] \\ $h_{3}:$ [272] \item[336] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \\ $h_{1}:$ [288] \\ $h_{5}:$ [231] \end{gl} \end{bdl} \begin{bdl} \item[8/197] \mb{8/197} \begin{gl} \item[291] {\rm Sq(2)[247]} \\ $h_{1}:$ [247] \\ $h_{3}:$ [237] \\ $h_{7}:$ [46] \item[292] {\rm Sq(2)[248]} \\ $h_{1}:$ [248] \\ $h_{3}:$ [237] \\ $h_{7}:$ [46] \item[293] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \item[294] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{2}:$ [243] \\ $h_{7}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[7/197] \mb{7/197} \begin{gl} \item[250] {\rm Sq(7)[196] + Sq(4,1)[196] + Sq(1,2)[196] + Sq(0,0,1)[196] + Sq(7)[195] + Sq(1,2)[195] + Sq(0,0,1)[195]} \item[251] {\rm Sq(1,1)[200] + Sq(4)[198] + Sq(1,1)[198]} \\ $h_{2}:$ [198] \\ $h_{7}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[6/197] \mb{6/197} \begin{gl} \item[205] {\rm Sq(2)[145]} \\ $h_{1}:$ [145] \\ $h_{5}:$ [120] \\ $h_{6}:$ [86] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[5/197] \mb{5/197} \begin{gl} \item[146] {\rm Sq(6)[92]} \\ $h_{7}:$ [34] \end{gl} \end{bdl} \dm{198} \begin{bdl} \item[98/198] \mb{98/198} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \\ $h_{2}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[97/198] \mb{97/198} \begin{gl} \item[3] {\rm Sq(1)[3]} \\ $h_{0}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[96/198] \mb{96/198} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[89/198] \mb{89/198} \begin{gl} \item[17] {\rm Sq(1)[17]} \\ $h_{0}:$ [17] \\ $h_{1}:$ [15] \\ $h_{2}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[88/198] \mb{88/198} \begin{gl} \item[17] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \\ $h_{2}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[87/198] \mb{87/198} \begin{gl} \item[14] {\rm Sq(0,1)[14]} \item[15] {\rm Sq(1)[16]} \\ $h_{0}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[86/198] \mb{86/198} \begin{gl} \item[16] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[85/198] \mb{85/198} \begin{gl} \item[20] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[84/198] \mb{84/198} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \item[20] {\rm Sq(1)[19]} \\ $h_{0}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[83/198] \mb{83/198} \begin{gl} \item[18] {\rm Sq(2)[20]} \\ $h_{1}:$ [20] \item[19] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[82/198] \mb{82/198} \begin{gl} \item[22] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[81/198] \mb{81/198} \begin{gl} \item[26] {\rm Sq(1,1)[26]} \item[27] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[80/198] \mb{80/198} \begin{gl} \item[28] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[79/198] \mb{79/198} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[78/198] \mb{78/198} \begin{gl} \item[29] {\rm Sq(0,1)[30]} \item[30] {\rm Sq(0,1)[31]} \item[31] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[75/198] \mb{75/198} \begin{gl} \item[40] {\rm Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[73/198] \mb{73/198} \begin{gl} \item[48] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \\ $h_{2}:$ [39] \\ $h_{3}:$ [34] \item[49] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{1}:$ [43] \\ $h_{2}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[72/198] \mb{72/198} \begin{gl} \item[46] {\rm Sq(0,1)[43]} \item[47] {\rm Sq(0,1)[45]} \item[48] {\rm Sq(1)[48]} \\ $h_{0}:$ [48] \\ $h_{2}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[71/198] \mb{71/198} \begin{gl} \item[47] {\rm Sq(0,1)[48]} \item[48] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[70/198] \mb{70/198} \begin{gl} \item[52] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[69/198] \mb{69/198} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(0,1)[52]} \item[55] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[68/198] \mb{68/198} \begin{gl} \item[54] {\rm Sq(0,1)[57]} \item[55] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[67/198] \mb{67/198} \begin{gl} \item[61] {\rm Sq(3)[66]} \item[62] {\rm Sq(2)[67]} \\ $h_{1}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[66/198] \mb{66/198} \begin{gl} \item[69] {\rm Sq(0,1)[69]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[65/198] \mb{65/198} \begin{gl} \item[72] {\rm Sq(0,1)[69]} \item[73] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[64/198] \mb{64/198} \begin{gl} \item[73] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \item[74] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[63/198] \mb{63/198} \begin{gl} \item[76] {\rm Sq(0,1)[79]} \item[77] {\rm Sq(0,1)[80]} \item[78] {\rm Sq(0,1)[81]} \item[79] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \\ $h_{2}:$ [77] \end{gl} \end{bdl} \begin{bdl} \item[62/198] \mb{62/198} \begin{gl} \item[82] {\rm Sq(1,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[60/198] \mb{60/198} \begin{gl} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(0,1)[97]} \item[96] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[59/198] \mb{59/198} \begin{gl} \item[104] {\rm Sq(0,1)[102]} \item[105] {\rm Sq(0,1)[103]} \end{gl} \end{bdl} \begin{bdl} \item[57/198] \mb{57/198} \begin{gl} \item[109] {\rm Sq(0,1)[104]} \item[110] {\rm Sq(0,1)[105]} \item[111] {\rm Sq(0,1)[106]} \item[112] {\rm Sq(1)[113]} \\ $h_{0}:$ [113] \\ $h_{1}:$ [109] \\ $h_{2}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[56/198] \mb{56/198} \begin{gl} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[54/198] \mb{54/198} \begin{gl} \item[124] {\rm Sq(0,1)[122]} \item[125] {\rm Sq(0,1)[123]} \item[126] {\rm Sq(0,1)[124]} \item[127] {\rm Sq(2)[126] + Sq(2)[125]} \\ $h_{1}:$ [126], [125] \end{gl} \end{bdl} \begin{bdl} \item[53/198] \mb{53/198} \begin{gl} \item[127] {\rm Sq(0,1)[129]} \item[128] {\rm Sq(0,1)[130]} \item[129] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[52/198] \mb{52/198} \begin{gl} \item[135] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[51/198] \mb{51/198} \begin{gl} \item[149] {\rm Sq(0,1)[152]} \item[150] {\rm Sq(0,1)[153]} \item[151] {\rm Sq(0,1)[154]} \end{gl} \end{bdl} \begin{bdl} \item[50/198] \mb{50/198} \begin{gl} \item[158] {\rm Sq(0,1)[152]} \item[159] {\rm Sq(0,1)[153]} \item[160] {\rm Sq(0,1)[154]} \item[161] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{3}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[49/198] \mb{49/198} \begin{gl} \item[159] {\rm Sq(0,1)[155]} \item[160] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \\ $h_{1}:$ [160] \item[161] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{1}:$ [156] \item[162] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{3}:$ [139] \end{gl} \end{bdl} \begin{bdl} \item[48/198] \mb{48/198} \begin{gl} \item[161] {\rm Sq(0,1)[163]} \item[162] {\rm Sq(0,1)[164]} \item[163] {\rm Sq(0,1)[165]} \item[164] {\rm Sq(0,1)[166]} \item[165] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \item[166] {\rm Sq(1)[172]} \\ $h_{0}:$ [172] \\ $h_{3}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[47/198] \mb{47/198} \begin{gl} \item[168] {\rm Sq(1,1)[169]} \item[169] {\rm Sq(0,1)[171]} \item[170] {\rm Sq(0,1)[172]} \item[171] {\rm Sq(0,1)[173]} \item[172] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{3}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[46/198] \mb{46/198} \begin{gl} \item[178] {\rm Sq(0,1)[178]} \item[179] {\rm Sq(2)[184]} \\ $h_{1}:$ [184] \item[180] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \item[181] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{2}:$ [176] \end{gl} \end{bdl} \begin{bdl} \item[45/198] \mb{45/198} \begin{gl} \item[185] {\rm Sq(0,1)[185]} \item[186] {\rm Sq(0,1)[186]} \item[187] {\rm Sq(0,1)[187]} \item[188] {\rm Sq(0,1)[188]} \item[189] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \item[190] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{2}:$ [178] \end{gl} \end{bdl} \begin{bdl} \item[44/198] \mb{44/198} \begin{gl} \item[192] {\rm Sq(5)[190]} \item[193] {\rm Sq(0,1)[196]} \item[194] {\rm Sq(0,1)[197]} \item[195] {\rm Sq(0,1)[198]} \item[196] {\rm Sq(0,1)[199]} \end{gl} \end{bdl} \begin{bdl} \item[43/198] \mb{43/198} \begin{gl} \item[208] {\rm Sq(0,1)[209]} \end{gl} \end{bdl} \begin{bdl} \item[42/198] \mb{42/198} \begin{gl} \item[218] {\rm Sq(0,1)[216]} \item[219] {\rm Sq(0,1)[217]} \item[220] {\rm Sq(0,1)[218]} \item[221] {\rm Sq(0,1)[219]} \end{gl} \end{bdl} \begin{bdl} \item[41/198] \mb{41/198} \begin{gl} \item[225] {\rm Sq(0,1)[219] + Sq(0,1)[218] + Sq(0,1)[217]} \item[226] {\rm Sq(0,1)[220] + Sq(0,1)[218] + Sq(0,1)[217]} \item[227] {\rm Sq(0,1)[221] + Sq(0,1)[217]} \item[228] {\rm Sq(3)[222] + Sq(0,1)[222] + Sq(0,1)[218] + Sq(3)[217] + Sq(0,1)[217]} \item[229] {\rm Sq(1)[232]} \\ $h_{0}:$ [232] \\ $h_{1}:$ [228], [226], [225], [224] \\ $h_{2}:$ [214] \\ $h_{3}:$ [194] \item[230] {\rm Sq(1)[233]} \\ $h_{0}:$ [233] \\ $h_{1}:$ [227], [226], [223] \\ $h_{2}:$ [216] \\ $h_{3}:$ [199] \end{gl} \end{bdl} \begin{bdl} \item[40/198] \mb{40/198} \begin{gl} \item[231] {\rm Sq(0,1)[227]} \item[232] {\rm Sq(0,1)[228]} \item[233] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{2}:$ [224], [223], [220] \\ $h_{3}:$ [204], [203] \end{gl} \end{bdl} \begin{bdl} \item[39/198] \mb{39/198} \begin{gl} \item[235] {\rm Sq(0,1)[237] + Sq(0,1)[236]} \item[236] {\rm Sq(0,1)[238]} \item[237] {\rm Sq(0,1)[239]} \item[238] {\rm Sq(0,1)[240]} \item[239] {\rm Sq(2)[241]} \\ $h_{1}:$ [241] \item[240] {\rm Sq(1)[249] + Sq(1)[244]} \\ $h_{0}:$ [249], [244] \end{gl} \end{bdl} \begin{bdl} \item[38/198] \mb{38/198} \begin{gl} \item[244] {\rm Sq(1,1)[247]} \item[245] {\rm Sq(0,1)[249]} \item[246] {\rm Sq(0,1)[250]} \item[247] {\rm Sq(0,1)[251]} \item[248] {\rm Sq(0,1)[252]} \item[249] {\rm Sq(1)[259] + Sq(1)[258]} \\ $h_{0}:$ [259], [258] \end{gl} \end{bdl} \begin{bdl} \item[37/198] \mb{37/198} \begin{gl} \item[258] {\rm Sq(0,1)[261]} \item[259] {\rm Sq(0,1)[262]} \item[260] {\rm Sq(0,1)[263]} \end{gl} \end{bdl} \begin{bdl} \item[36/198] \mb{36/198} \begin{gl} \item[268] {\rm Sq(0,1)[267]} \item[269] {\rm Sq(0,1)[268]} \item[270] {\rm Sq(0,1)[269]} \end{gl} \end{bdl} \begin{bdl} \item[35/198] \mb{35/198} \begin{gl} \item[275] {\rm Sq(0,1)[273]} \item[276] {\rm Sq(0,1)[274]} \item[277] {\rm Sq(0,1)[275]} \item[278] {\rm Sq(3)[276] + Sq(3)[273]} \item[279] {\rm Sq(3)[277] + Sq(0,1)[277]} \end{gl} \end{bdl} \begin{bdl} \item[34/198] \mb{34/198} \begin{gl} \item[282] {\rm Sq(0,1)[277]} \item[283] {\rm Sq(0,1)[278]} \item[284] {\rm Sq(0,1)[279]} \item[285] {\rm Sq(2)[285] + Sq(2)[283] + Sq(2)[282] + Sq(2)[281]} \\ $h_{1}:$ [285], [283], [282], [281] \item[286] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \\ $h_{1}:$ [284], [282] \\ $h_{4}:$ [227], [225] \\ $h_{7}:$ [5], [4] \item[287] {\rm Sq(1)[293] + Sq(1)[288]} \\ $h_{0}:$ [293], [288] \\ $h_{3}:$ [257] \end{gl} \end{bdl} \begin{bdl} \item[33/198] \mb{33/198} \begin{gl} \item[288] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(0,1)[277]} \item[289] {\rm Sq(0,1)[280] + Sq(0,1)[278] + Sq(0,1)[277]} \item[290] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \\ $h_{7}:$ [4] \item[291] {\rm Sq(1)[292] + Sq(1)[291] + Sq(1)[290]} \\ $h_{0}:$ [292], [291], [290] \\ $h_{1}:$ [285], [284] \item[292] {\rm Sq(1)[293] + Sq(1)[287]} \\ $h_{0}:$ [293], [287] \\ $h_{1}:$ [283], [282] \item[293] {\rm Sq(1)[294] + Sq(1)[287]} \\ $h_{0}:$ [294], [287] \\ $h_{3}:$ [259], [257] \end{gl} \end{bdl} \begin{bdl} \item[32/198] \mb{32/198} \begin{gl} \item[287] {\rm Sq(2,1)[274]} \item[288] {\rm Sq(1,1)[280] + Sq(1,1)[279] + Sq(1,1)[278]} \\ $h_{7}:$ [5] \item[289] {\rm Sq(0,1)[282]} \item[290] {\rm Sq(0,1)[283]} \item[291] {\rm Sq(0,1)[284]} \item[292] {\rm Sq(0,1)[285]} \item[293] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \item[294] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \\ $h_{3}:$ [260], [258] \end{gl} \end{bdl} \begin{bdl} \item[31/198] \mb{31/198} \begin{gl} \item[290] {\rm Sq(1,1)[288] + Sq(1,1)[286]} \item[291] {\rm Sq(0,1)[291]} \item[292] {\rm Sq(1)[301] + Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [301], [299], [298] \\ $h_{3}:$ [265], [262] \end{gl} \end{bdl} \begin{bdl} \item[30/198] \mb{30/198} \begin{gl} \item[297] {\rm Sq(0,1)[297]} \item[298] {\rm Sq(3)[298] + Sq(0,1)[298] + Sq(3)[296] + Sq(0,1)[296]} \item[299] {\rm Sq(3)[299] + Sq(0,1)[299] + Sq(3)[296]} \item[300] {\rm Sq(1)[307] + Sq(1)[306] + Sq(1)[304]} \\ $h_{0}:$ [307], [306], [304] \\ $h_{2}:$ [293], [290], [289] \\ $h_{5}:$ [181], [180] \\ $h_{7}:$ [10] \item[301] {\rm Sq(1)[308] + Sq(1)[304] + Sq(1)[303]} \\ $h_{0}:$ [308], [304], [303] \end{gl} \end{bdl} \begin{bdl} \item[29/198] \mb{29/198} \begin{gl} \item[303] {\rm Sq(2,1)[293] + Sq(5)[292]} \item[304] {\rm Sq(0,1)[299]} \\ $h_{7}:$ [9] \item[305] {\rm Sq(0,1)[300]} \item[306] {\rm Sq(0,1)[301]} \\ $h_{7}:$ [9] \item[307] {\rm Sq(3)[303] + Sq(0,1)[303] + Sq(3)[299]} \\ $h_{7}:$ [9] \item[308] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[28/198] \mb{28/198} \begin{gl} \item[307] {\rm Sq(3)[303]} \item[308] {\rm Sq(3)[304] + Sq(0,1)[304] + Sq(3)[301] + Sq(0,1)[301]} \item[309] {\rm Sq(1)[314] + Sq(1)[313]} \\ $h_{0}:$ [314], [313] \\ $h_{1}:$ [307], [306] \\ $h_{3}:$ [287], [286], [285], [284] \end{gl} \end{bdl} \begin{bdl} \item[27/198] \mb{27/198} \begin{gl} \item[312] {\rm Sq(0,1)[308]} \item[313] {\rm Sq(3)[309] + Sq(0,1)[309]} \item[314] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{3}:$ [290] \end{gl} \end{bdl} \begin{bdl} \item[26/198] \mb{26/198} \begin{gl} \item[317] {\rm Sq(1,1)[311] + Sq(1,1)[310]} \item[318] {\rm Sq(0,1)[312]} \item[319] {\rm Sq(3)[314] + Sq(3)[312]} \item[320] {\rm Sq(3)[315] + Sq(0,1)[315] + Sq(0,1)[313]} \\ $h_{7}:$ [18] \item[321] {\rm Sq(2)[317] + Sq(2)[316]} \\ $h_{1}:$ [317], [316] \\ $h_{2}:$ [308] \\ $h_{3}:$ [294], [293], [292] \\ $h_{7}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[25/198] \mb{25/198} \begin{gl} \item[322] {\rm Sq(3)[315] + Sq(0,1)[315] + Sq(3)[313] + Sq(0,1)[313] + Sq(3)[312]} \item[323] {\rm Sq(1)[323] + Sq(1)[322] + Sq(1)[321]} \\ $h_{0}:$ [323], [322], [321] \\ $h_{1}:$ [316] \\ $h_{3}:$ [296] \end{gl} \end{bdl} \begin{bdl} \item[24/198] \mb{24/198} \begin{gl} \item[321] {\rm Sq(3)[316] + Sq(0,1)[316]} \item[322] {\rm Sq(3)[317] + Sq(0,1)[316] + Sq(3)[315]} \item[323] {\rm Sq(3)[318] + Sq(0,1)[318] + Sq(0,1)[315]} \\ $h_{3}:$ [298] \item[324] {\rm Sq(2)[319]} \\ $h_{1}:$ [319] \\ $h_{2}:$ [311], [310] \\ $h_{4}:$ [271] \end{gl} \end{bdl} \begin{bdl} \item[23/198] \mb{23/198} \begin{gl} \item[322] {\rm Sq(1,1)[328]} \item[323] {\rm Sq(0,1)[330]} \\ $h_{7}:$ [17] \item[324] {\rm Sq(3)[332] + Sq(0,1)[332] + Sq(3)[331]} \item[325] {\rm Sq(2)[335]} \\ $h_{1}:$ [335] \\ $h_{3}:$ [315] \end{gl} \end{bdl} \begin{bdl} \item[21/198] \mb{21/198} \begin{gl} \item[349] {\rm Sq(3)[347]} \item[350] {\rm Sq(3)[350] + Sq(0,1)[350] + Sq(3)[349] + Sq(0,1)[349] + Sq(0,1)[347]} \item[351] {\rm Sq(2)[353] + Sq(2)[352]} \\ $h_{1}:$ [353], [352] \\ $h_{7}:$ [21] \item[352] {\rm Sq(1)[358]} \\ $h_{0}:$ [358] \\ $h_{1}:$ [352] \\ $h_{2}:$ [344], [342] \\ $h_{3}:$ [328], [326] \item[353] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \end{gl} \end{bdl} \begin{bdl} \item[20/198] \mb{20/198} \begin{gl} \item[356] {\rm Sq(0,1)[363] + Sq(0,1)[361]} \\ $h_{2}:$ [358] \\ $h_{7}:$ [20] \item[357] {\rm Sq(3)[364] + Sq(0,1)[364] + Sq(3)[362] + Sq(0,1)[362] + Sq(3)[361] + Sq(0,1)[361]} \\ $h_{2}:$ [358] \item[358] {\rm Sq(3)[365] + Sq(0,1)[364] + Sq(3)[362] + Sq(0,1)[362] + Sq(0,1)[361]} \\ $h_{2}:$ [358] \item[359] {\rm Sq(3)[366] + Sq(0,1)[366]} \item[360] {\rm Sq(2)[369]} \\ $h_{1}:$ [369] \\ $h_{3}:$ [342], [341] \item[361] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{1}:$ [370], [368] \\ $h_{4}:$ [301], [296] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[19/198] \mb{19/198} \begin{gl} \item[373] {\rm Sq(2)[384]} \\ $h_{1}:$ [384] \\ $h_{3}:$ [355], [354] \\ $h_{5}:$ [240] \\ $h_{6}:$ [143] \item[374] {\rm Sq(1)[388]} \\ $h_{0}:$ [388] \\ $h_{4}:$ [309] \end{gl} \end{bdl} \begin{bdl} \item[18/198] \mb{18/198} \begin{gl} \item[388] {\rm Sq(3)[390] + Sq(3)[388]} \\ $h_{4}:$ [312] \item[389] {\rm Sq(3)[391] + Sq(0,1)[389]} \\ $h_{3}:$ [357] \\ $h_{4}:$ [312], [311] \item[390] {\rm Sq(2)[394]} \\ $h_{1}:$ [394] \\ $h_{4}:$ [312] \item[391] {\rm Sq(2)[395]} \\ $h_{1}:$ [395] \\ $h_{3}:$ [357] \\ $h_{4}:$ [312], [311] \item[392] {\rm Sq(1)[402] + Sq(1)[400]} \\ $h_{0}:$ [402], [400] \end{gl} \end{bdl} \begin{bdl} \item[17/198] \mb{17/198} \begin{gl} \item[400] {\rm Sq(0,1)[399]} \\ $h_{7}:$ [29] \item[401] {\rm Sq(2)[406] + Sq(2)[405] + Sq(2)[404]} \\ $h_{1}:$ [406], [405], [404] \\ $h_{2}:$ [391], [390] \item[402] {\rm Sq(1)[412]} \\ $h_{0}:$ [412] \\ $h_{7}:$ [29] \item[403] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{1}:$ [407], [405] \\ $h_{2}:$ [391] \\ $h_{3}:$ [363], [361] \\ $h_{4}:$ [317], [316] \end{gl} \end{bdl} \begin{bdl} \item[16/198] \mb{16/198} \begin{gl} \item[412] {\rm Sq(0,1)[404] + Sq(0,1)[403]} \item[413] {\rm Sq(3)[406] + Sq(0,1)[406] + Sq(0,1)[403]} \\ $h_{4}:$ [323], [322] \item[414] {\rm Sq(1)[418]} \\ $h_{0}:$ [418] \\ $h_{3}:$ [375], [374], [373], [370], [369] \item[415] {\rm Sq(1)[423] + Sq(1)[422] + Sq(1)[420]} \\ $h_{0}:$ [423], [422], [420] \\ $h_{1}:$ [411], [410] \\ $h_{2}:$ [402], [397], [396] \\ $h_{3}:$ [375], [374], [373], [370], [369] \\ $h_{7}:$ [30] \item[416] {\rm Sq(1)[425] + Sq(1)[424]} \\ $h_{0}:$ [425], [424] \\ $h_{1}:$ [412], [411] \\ $h_{2}:$ [401], [398], [397], [396], [395] \\ $h_{3}:$ [375], [374], [371], [367] \\ $h_{4}:$ [323] \\ $h_{7}:$ [29] \item[417] {\rm Sq(1)[426] + Sq(1)[424] + Sq(1)[422]} \\ $h_{0}:$ [426], [424], [422] \\ $h_{2}:$ [401], [398], [397], [396], [395] \\ $h_{3}:$ [373], [371], [369], [367] \\ $h_{4}:$ [322] \item[418] {\rm Sq(1)[427] + Sq(1)[420]} \\ $h_{0}:$ [427], [420] \\ $h_{1}:$ [412], [411] \\ $h_{2}:$ [401], [398], [397], [396], [395] \\ $h_{3}:$ [373], [370] \\ $h_{4}:$ [323] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[15/198] \mb{15/198} \begin{gl} \item[418] {\rm Sq(3)[406] + Sq(0,1)[406] + Sq(0,1)[404]} \\ $h_{3}:$ [376], [375], [374] \item[419] {\rm Sq(3)[409] + Sq(0,1)[409] + Sq(3)[408] + Sq(3)[407] + Sq(0,1)[405] + Sq(0,1)[404]} \\ $h_{4}:$ [329] \item[420] {\rm Sq(3)[410] + Sq(0,1)[410] + Sq(3)[407] + Sq(3)[405] + Sq(0,1)[404]} \\ $h_{2}:$ [398] \\ $h_{3}:$ [376], [375] \item[421] {\rm Sq(2)[414] + Sq(2)[412]} \\ $h_{1}:$ [414], [412] \\ $h_{2}:$ [398] \\ $h_{3}:$ [376], [375] \\ $h_{4}:$ [329] \item[422] {\rm Sq(1)[419]} \\ $h_{0}:$ [419] \\ $h_{1}:$ [412] \\ $h_{2}:$ [398] \\ $h_{3}:$ [376], [375] \\ $h_{4}:$ [329] \\ $h_{7}:$ [32] \item[423] {\rm Sq(1)[420]} \\ $h_{0}:$ [420] \\ $h_{1}:$ [412] \\ $h_{2}:$ [399] \\ $h_{3}:$ [376], [375], [374] \\ $h_{4}:$ [329] \\ $h_{7}:$ [33], [32] \item[424] {\rm Sq(1)[422] + Sq(1)[421]} \\ $h_{0}:$ [422], [421] \\ $h_{1}:$ [412] \\ $h_{3}:$ [379], [378], [377], [374] \\ $h_{4}:$ [331], [330] \\ $h_{6}:$ [162] \\ $h_{7}:$ [32] \item[425] {\rm Sq(1)[423]} \\ $h_{0}:$ [423] \\ $h_{1}:$ [412] \\ $h_{2}:$ [398] \\ $h_{3}:$ [379], [378], [377], [376], [375], [374] \\ $h_{4}:$ [331], [330] \\ $h_{6}:$ [162] \item[426] {\rm Sq(1)[424]} \\ $h_{0}:$ [424] \\ $h_{3}:$ [379], [378], [377], [376], [375] \\ $h_{4}:$ [331], [330], [329] \\ $h_{6}:$ [162] \item[427] {\rm Sq(1)[427]} \\ $h_{0}:$ [427] \\ $h_{3}:$ [376], [375], [374] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[14/198] \mb{14/198} \begin{gl} \item[419] {\rm Sq(1,1)[395] + Sq(1,1)[394] + Sq(1,1)[393] + Sq(1,1)[392] + Sq(1,1)[391]} \\ $h_{7}:$ [34] \item[420] {\rm Sq(1,1)[397] + Sq(1,1)[393] + Sq(1,1)[391]} \\ $h_{7}:$ [35], [34] \item[421] {\rm Sq(3)[398] + Sq(0,1)[398]} \\ $h_{7}:$ [33] \item[422] {\rm Sq(0,1)[399]} \\ $h_{3}:$ [371], [370], [369] \\ $h_{6}:$ [164] \\ $h_{7}:$ [34], [33] \item[423] {\rm Sq(3)[399] + Sq(0,1)[398]} \\ $h_{3}:$ [371], [370], [369] \\ $h_{6}:$ [164] \item[424] {\rm Sq(3)[401] + Sq(0,1)[401] + Sq(3)[400] + Sq(0,1)[400]} \\ $h_{3}:$ [371], [370], [369] \\ $h_{6}:$ [164] \item[425] {\rm Sq(2)[407] + Sq(2)[406] + Sq(2)[405] + Sq(2)[402]} \\ $h_{1}:$ [407], [406], [405], [402] \\ $h_{2}:$ [393], [391] \\ $h_{3}:$ [371], [370] \\ $h_{4}:$ [332] \\ $h_{6}:$ [164] \\ $h_{7}:$ [33] \item[426] {\rm Sq(2)[408] + Sq(2)[405] + Sq(2)[404] + Sq(2)[403] + Sq(2)[402]} \\ $h_{1}:$ [408], [405], [404], [403], [402] \\ $h_{3}:$ [371], [370] \\ $h_{4}:$ [332], [331] \\ $h_{6}:$ [164] \\ $h_{7}:$ [35], [34], [33] \item[427] {\rm Sq(1)[412]} \\ $h_{0}:$ [412] \\ $h_{7}:$ [34] \item[428] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{1}:$ [406], [405], [404] \\ $h_{4}:$ [331] \\ $h_{7}:$ [35], [33] \end{gl} \end{bdl} \begin{bdl} \item[13/198] \mb{13/198} \begin{gl} \item[412] {\rm Sq(3)[396] + Sq(3)[395] + Sq(3)[393] + Sq(3)[392]} \item[413] {\rm Sq(3)[397] + Sq(0,1)[397] + Sq(0,1)[396] + Sq(0,1)[395] + Sq(3)[393] + Sq(3)[392]} \item[414] {\rm Sq(3)[398] + Sq(0,1)[398] + Sq(0,1)[397] + Sq(0,1)[396] + Sq(3)[395] + Sq(3)[394] + Sq(0,1)[394] + Sq(3)[393] + Sq(0,1)[393]} \\ $h_{7}:$ [37] \item[415] {\rm Sq(1)[404] + Sq(1)[403]} \\ $h_{0}:$ [404], [403] \\ $h_{2}:$ [389], [388] \\ $h_{3}:$ [367] \\ $h_{4}:$ [335] \\ $h_{5}:$ [290], [288] \\ $h_{6}:$ [167] \\ $h_{7}:$ [38] \item[416] {\rm Sq(1)[405] + Sq(1)[403] + Sq(1)[402]} \\ $h_{0}:$ [405], [403], [402] \\ $h_{2}:$ [388], [387] \\ $h_{4}:$ [335] \\ $h_{5}:$ [290], [288] \\ $h_{6}:$ [167] \\ $h_{7}:$ [38], [37] \item[417] {\rm Sq(1)[409] + Sq(1)[408]} \\ $h_{0}:$ [409], [408] \\ $h_{1}:$ [399] \\ $h_{2}:$ [389], [387] \\ $h_{3}:$ [367] \end{gl} \end{bdl} \begin{bdl} \item[12/198] \mb{12/198} \begin{gl} \item[402] {\rm Sq(1,1)[383] + Sq(1,1)[380]} \\ $h_{3}:$ [363], [362], [361] \item[403] {\rm Sq(1,1)[385] + Sq(1,1)[384] + Sq(1,1)[382] + Sq(1,1)[381]} \\ $h_{3}:$ [362], [361] \item[404] {\rm Sq(0,1)[386]} \\ $h_{3}:$ [362] \\ $h_{4}:$ [341] \\ $h_{7}:$ [41] \item[405] {\rm Sq(3)[386]} \\ $h_{3}:$ [363] \\ $h_{4}:$ [341] \\ $h_{7}:$ [41] \item[406] {\rm Sq(2)[389]} \\ $h_{1}:$ [389] \\ $h_{3}:$ [362], [361] \item[407] {\rm Sq(2)[390] + Sq(2)[388]} \\ $h_{1}:$ [390], [388] \\ $h_{3}:$ [363], [362], [361] \item[408] {\rm Sq(1)[392]} \\ $h_{0}:$ [392] \\ $h_{3}:$ [365] \\ $h_{4}:$ [341] \\ $h_{7}:$ [41] \item[409] {\rm Sq(1)[393]} \\ $h_{0}:$ [393] \\ $h_{3}:$ [365], [361] \\ $h_{4}:$ [341] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[11/198] \mb{11/198} \begin{gl} \item[392] {\rm Sq(1,1)[361] + Sq(1,1)[360]} \\ $h_{3}:$ [345] \item[393] {\rm Sq(3)[364] + Sq(3)[363]} \\ $h_{3}:$ [345] \item[394] {\rm Sq(1)[369]} \\ $h_{0}:$ [369] \\ $h_{2}:$ [360], [359] \\ $h_{3}:$ [346], [345] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[10/198] \mb{10/198} \begin{gl} \item[369] {\rm Sq(3)[332] + Sq(0,1)[332] + Sq(3)[330] + Sq(0,1)[330]} \\ $h_{2}:$ [326], [325] \\ $h_{3}:$ [313] \\ $h_{7}:$ [45] \item[370] {\rm Sq(2)[334] + Sq(2)[333]} \\ $h_{1}:$ [334], [333] \\ $h_{2}:$ [327], [326], [325], [324] \\ $h_{3}:$ [312] \\ $h_{5}:$ [268] \\ $h_{7}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[8/198] \mb{8/198} \begin{gl} \item[295] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \\ $h_{1}:$ [250] \item[296] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{3}:$ [239], [238] \\ $h_{7}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[7/198] \mb{7/198} \begin{gl} \item[252] {\rm Sq(3)[203]} \item[253] {\rm Sq(3)[204] + Sq(0,1)[204]} \\ $h_{7}:$ [47] \item[254] {\rm Sq(2)[205]} \\ $h_{1}:$ [205] \\ $h_{5}:$ [165] \\ $h_{6}:$ [112] \\ $h_{7}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[6/198] \mb{6/198} \begin{gl} \item[206] {\rm Sq(2)[146]} \\ $h_{1}:$ [146] \\ $h_{2}:$ [143] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \dm{199} \begin{bdl} \item[100/199] \mb{100/199} \begin{gl} \item[1] {\rm Sq(1)[2]} \\ $h_{0}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[99/199] \mb{99/199} \begin{gl} \item[2] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[98/199] \mb{98/199} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[97/199] \mb{97/199} \begin{gl} \item[4] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \item[5] {\rm Sq(1)[4]} \\ $h_{0}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[96/199] \mb{96/199} \begin{gl} \item[4] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[95/199] \mb{95/199} \begin{gl} \item[5] {\rm Sq(1,1)[7]} \end{gl} \end{bdl} \begin{bdl} \item[94/199] \mb{94/199} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[93/199] \mb{93/199} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[92/199] \mb{92/199} \begin{gl} \item[9] {\rm Sq(0,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[89/199] \mb{89/199} \begin{gl} \item[18] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[86/199] \mb{86/199} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[84/199] \mb{84/199} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[83/199] \mb{83/199} \begin{gl} \item[20] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[80/199] \mb{80/199} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[79/199] \mb{79/199} \begin{gl} \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{1}:$ [29] \\ $h_{2}:$ [28] \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{1}:$ [31], [29] \\ $h_{2}:$ [28] \\ $h_{3}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[78/199] \mb{78/199} \begin{gl} \item[32] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [30] \item[33] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[77/199] \mb{77/199} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \item[35] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[76/199] \mb{76/199} \begin{gl} \item[35] {\rm Sq(1,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[75/199] \mb{75/199} \begin{gl} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{2}:$ [41] \\ $h_{4}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[74/199] \mb{74/199} \begin{gl} \item[46] {\rm Sq(0,1)[45]} \item[47] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[73/199] \mb{73/199} \begin{gl} \item[50] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[71/199] \mb{71/199} \begin{gl} \item[49] {\rm Sq(0,1)[49]} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[70/199] \mb{70/199} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \end{gl} \end{bdl} \begin{bdl} \item[68/199] \mb{68/199} \begin{gl} \item[56] {\rm Sq(0,1)[58]} \item[57] {\rm Sq(0,1)[59]} \item[58] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[67/199] \mb{67/199} \begin{gl} \item[63] {\rm Sq(0,1)[68]} \end{gl} \end{bdl} \begin{bdl} \item[65/199] \mb{65/199} \begin{gl} \item[74] {\rm Sq(0,1)[71]} \item[75] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[64/199] \mb{64/199} \begin{gl} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[63/199] \mb{63/199} \begin{gl} \item[80] {\rm Sq(1)[85]} \\ $h_{0}:$ [85] \\ $h_{1}:$ [84] \\ $h_{2}:$ [79] \\ $h_{3}:$ [70] \item[81] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [82] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[62/199] \mb{62/199} \begin{gl} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(0,1)[89]} \item[88] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[61/199] \mb{61/199} \begin{gl} \item[90] {\rm Sq(1,1)[92] + Sq(1,1)[91]} \item[91] {\rm Sq(0,1)[93]} \end{gl} \end{bdl} \begin{bdl} \item[60/199] \mb{60/199} \begin{gl} \item[97] {\rm Sq(2)[104]} \\ $h_{1}:$ [104] \item[98] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{2}:$ [99] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[59/199] \mb{59/199} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{2}:$ [101] \\ $h_{4}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[58/199] \mb{58/199} \begin{gl} \item[111] {\rm Sq(0,1)[105]} \item[112] {\rm Sq(0,1)[106]} \item[113] {\rm Sq(0,1)[107]} \end{gl} \end{bdl} \begin{bdl} \item[56/199] \mb{56/199} \begin{gl} \item[114] {\rm Sq(0,1)[116]} \item[115] {\rm Sq(0,1)[117]} \item[116] {\rm Sq(0,1)[118]} \end{gl} \end{bdl} \begin{bdl} \item[55/199] \mb{55/199} \begin{gl} \item[120] {\rm Sq(0,1)[120]} \item[121] {\rm Sq(0,1)[121]} \item[122] {\rm Sq(0,1)[122]} \item[123] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{1}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[54/199] \mb{54/199} \begin{gl} \item[128] {\rm Sq(0,1)[125]} \end{gl} \end{bdl} \begin{bdl} \item[53/199] \mb{53/199} \begin{gl} \item[130] {\rm Sq(0,1)[132]} \item[131] {\rm Sq(0,1)[133]} \item[132] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[52/199] \mb{52/199} \begin{gl} \item[136] {\rm Sq(0,1)[145]} \item[137] {\rm Sq(0,1)[146]} \item[138] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[51/199] \mb{51/199} \begin{gl} \item[152] {\rm Sq(0,1)[156]} \end{gl} \end{bdl} \begin{bdl} \item[50/199] \mb{50/199} \begin{gl} \item[162] {\rm Sq(0,1)[155]} \item[163] {\rm Sq(0,1)[156]} \item[164] {\rm Sq(0,1)[157]} \end{gl} \end{bdl} \begin{bdl} \item[49/199] \mb{49/199} \begin{gl} \item[163] {\rm Sq(0,1)[157]} \item[164] {\rm Sq(0,1)[158]} \item[165] {\rm Sq(0,1)[159]} \item[166] {\rm Sq(1)[168]} \\ $h_{0}:$ [168] \\ $h_{1}:$ [161] \\ $h_{3}:$ [144] \\ $h_{4}:$ [113] \end{gl} \end{bdl} \begin{bdl} \item[48/199] \mb{48/199} \begin{gl} \item[167] {\rm Sq(0,1)[167]} \item[168] {\rm Sq(1)[178] + Sq(1)[177]} \\ $h_{0}:$ [178], [177] \\ $h_{3}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[47/199] \mb{47/199} \begin{gl} \item[173] {\rm Sq(0,1)[174]} \item[174] {\rm Sq(0,1)[175]} \item[175] {\rm Sq(0,1)[176]} \item[176] {\rm Sq(0,1)[177]} \item[177] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \\ $h_{1}:$ [179] \item[178] {\rm Sq(1)[186]} \\ $h_{0}:$ [186] \\ $h_{1}:$ [179] \\ $h_{3}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[46/199] \mb{46/199} \begin{gl} \item[182] {\rm Sq(0,1)[181]} \item[183] {\rm Sq(0,1)[182]} \item[184] {\rm Sq(0,1)[183]} \item[185] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \item[186] {\rm Sq(1)[194]} \\ $h_{0}:$ [194] \\ $h_{3}:$ [159] \end{gl} \end{bdl} \begin{bdl} \item[45/199] \mb{45/199} \begin{gl} \item[191] {\rm Sq(0,1)[191]} \item[192] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \item[193] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \item[194] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \item[195] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [193] \\ $h_{2}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[44/199] \mb{44/199} \begin{gl} \item[197] {\rm Sq(1,1)[200]} \item[198] {\rm Sq(0,1)[202]} \item[199] {\rm Sq(0,1)[203]} \item[200] {\rm Sq(0,1)[204]} \item[201] {\rm Sq(0,1)[205]} \item[202] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \item[203] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{2}:$ [196] \end{gl} \end{bdl} \begin{bdl} \item[43/199] \mb{43/199} \begin{gl} \item[209] {\rm Sq(0,1)[213]} \item[210] {\rm Sq(0,1)[214]} \item[211] {\rm Sq(3)[214] + Sq(0,1)[212]} \item[212] {\rm Sq(0,1)[215]} \item[213] {\rm Sq(0,1)[216]} \item[214] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{2}:$ [208] \end{gl} \end{bdl} \begin{bdl} \item[42/199] \mb{42/199} \begin{gl} \item[222] {\rm Sq(1,1)[221]} \item[223] {\rm Sq(0,1)[222]} \end{gl} \end{bdl} \begin{bdl} \item[41/199] \mb{41/199} \begin{gl} \item[231] {\rm Sq(0,1)[223]} \item[232] {\rm Sq(0,1)[225] + Sq(0,1)[224]} \item[233] {\rm Sq(0,1)[226]} \item[234] {\rm Sq(0,1)[227]} \item[235] {\rm Sq(3)[230] + Sq(0,1)[230] + Sq(3)[228] + Sq(3)[226] + Sq(3)[225] + Sq(3)[224] + Sq(0,1)[224]} \end{gl} \end{bdl} \begin{bdl} \item[40/199] \mb{40/199} \begin{gl} \item[234] {\rm Sq(0,1)[230] + Sq(0,1)[229]} \item[235] {\rm Sq(0,1)[232] + Sq(0,1)[231] + Sq(0,1)[229]} \item[236] {\rm Sq(3)[232]} \item[237] {\rm Sq(0,1)[233]} \item[238] {\rm Sq(3)[234] + Sq(0,1)[234] + Sq(0,1)[231]} \item[239] {\rm Sq(2)[239] + Sq(2)[236]} \\ $h_{1}:$ [239], [236] \end{gl} \end{bdl} \begin{bdl} \item[39/199] \mb{39/199} \begin{gl} \item[241] {\rm Sq(0,1)[242]} \item[242] {\rm Sq(0,1)[243] + Sq(0,1)[241]} \end{gl} \end{bdl} \begin{bdl} \item[38/199] \mb{38/199} \begin{gl} \item[250] {\rm Sq(0,1)[254]} \item[251] {\rm Sq(0,1)[255]} \item[252] {\rm Sq(0,1)[256]} \item[253] {\rm Sq(0,1)[257]} \end{gl} \end{bdl} \begin{bdl} \item[37/199] \mb{37/199} \begin{gl} \item[261] {\rm Sq(1,1)[263] + Sq(1,1)[262] + Sq(1,1)[261]} \item[262] {\rm Sq(0,1)[264]} \item[263] {\rm Sq(0,1)[265]} \item[264] {\rm Sq(0,1)[266]} \item[265] {\rm Sq(0,1)[267]} \end{gl} \end{bdl} \begin{bdl} \item[36/199] \mb{36/199} \begin{gl} \item[271] {\rm Sq(0,1)[272] + Sq(0,1)[271] + Sq(0,1)[270]} \item[272] {\rm Sq(0,1)[273] + Sq(0,1)[271]} \item[273] {\rm Sq(2)[279]} \\ $h_{1}:$ [279] \end{gl} \end{bdl} \begin{bdl} \item[35/199] \mb{35/199} \begin{gl} \item[280] {\rm Sq(1,1)[275] + Sq(1,1)[274] + Sq(1,1)[273]} \item[281] {\rm Sq(0,1)[278]} \item[282] {\rm Sq(0,1)[279]} \end{gl} \end{bdl} \begin{bdl} \item[34/199] \mb{34/199} \begin{gl} \item[288] {\rm Sq(0,1)[281]} \item[289] {\rm Sq(0,1)[282]} \item[290] {\rm Sq(0,1)[283]} \item[291] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{2}:$ [280] \\ $h_{3}:$ [262] \end{gl} \end{bdl} \begin{bdl} \item[33/199] \mb{33/199} \begin{gl} \item[294] {\rm Sq(0,1)[284] + Sq(0,1)[283] + Sq(0,1)[282]} \item[295] {\rm Sq(1)[298] + Sq(1)[296] + Sq(1)[295]} \\ $h_{0}:$ [298], [296], [295] \\ $h_{2}:$ [278] \\ $h_{3}:$ [264], [262] \item[296] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{1}:$ [292], [291], [290] \\ $h_{3}:$ [265], [264], [262] \end{gl} \end{bdl} \begin{bdl} \item[32/199] \mb{32/199} \begin{gl} \item[295] {\rm Sq(0,1)[287] + Sq(0,1)[286]} \item[296] {\rm Sq(3)[287] + Sq(3)[286]} \item[297] {\rm Sq(0,1)[289] + Sq(0,1)[288]} \item[298] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{3}:$ [264], [261] \item[299] {\rm Sq(1)[300] + Sq(1)[293]} \\ $h_{0}:$ [300], [293] \\ $h_{3}:$ [267], [264] \end{gl} \end{bdl} \begin{bdl} \item[31/199] \mb{31/199} \begin{gl} \item[293] {\rm Sq(3,1)[282] + Sq(3,1)[280] + Sq(3,1)[279] + Sq(3,1)[277] + Sq(0,2)[277] + Sq(3,1)[276] + Sq(0,2)[276]} \item[294] {\rm Sq(0,1)[293]} \item[295] {\rm Sq(0,1)[294]} \item[296] {\rm Sq(0,1)[295]} \item[297] {\rm Sq(0,1)[296]} \item[298] {\rm Sq(2)[298]} \\ $h_{1}:$ [298] \item[299] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \item[300] {\rm Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [305], [304] \\ $h_{3}:$ [270], [267] \end{gl} \end{bdl} \begin{bdl} \item[30/199] \mb{30/199} \begin{gl} \item[302] {\rm Sq(0,1)[301]} \item[303] {\rm Sq(1)[311]} \\ $h_{0}:$ [311] \item[304] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \\ $h_{1}:$ [307], [306], [304] \\ $h_{2}:$ [299], [298] \\ $h_{7}:$ [11] \item[305] {\rm Sq(1)[314] + Sq(1)[309]} \\ $h_{0}:$ [314], [309] \\ $h_{1}:$ [307], [306], [304] \\ $h_{2}:$ [299], [298] \\ $h_{3}:$ [278], [277], [275], [274] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[29/199] \mb{29/199} \begin{gl} \item[309] {\rm Sq(1,1)[303] + Sq(1,1)[301]} \item[310] {\rm Sq(0,1)[304]} \item[311] {\rm Sq(3)[305]} \item[312] {\rm Sq(2)[308]} \\ $h_{1}:$ [308] \item[313] {\rm Sq(1)[311] + Sq(1)[310]} \\ $h_{0}:$ [311], [310] \\ $h_{2}:$ [301] \\ $h_{7}:$ [10] \item[314] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{2}:$ [301] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[28/199] \mb{28/199} \begin{gl} \item[310] {\rm Sq(5)[300] + Sq(2,1)[300] + Sq(5)[299] + Sq(2,1)[299]} \item[311] {\rm Sq(3)[306]} \\ $h_{7}:$ [9] \item[312] {\rm Sq(0,1)[307]} \\ $h_{7}:$ [9] \item[313] {\rm Sq(0,1)[308]} \item[314] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{7}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[27/199] \mb{27/199} \begin{gl} \item[315] {\rm Sq(0,1)[314]} \item[316] {\rm Sq(3)[314] + Sq(0,1)[313]} \item[317] {\rm Sq(2)[320] + Sq(2)[318] + Sq(2)[317]} \\ $h_{1}:$ [320], [318], [317] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[26/199] \mb{26/199} \begin{gl} \item[322] {\rm Sq(0,1)[316]} \item[323] {\rm Sq(3)[321] + Sq(0,1)[321] + Sq(3)[320] + Sq(0,1)[320] + Sq(3)[318] + Sq(0,1)[318] + Sq(3)[317] + Sq(3)[316]} \item[324] {\rm Sq(1)[324]} \\ $h_{0}:$ [324] \\ $h_{3}:$ [298], [297], [296] \end{gl} \end{bdl} \begin{bdl} \item[25/199] \mb{25/199} \begin{gl} \item[324] {\rm Sq(3)[316]} \\ $h_{3}:$ [297] \item[325] {\rm Sq(0,1)[317]} \item[326] {\rm Sq(1)[327] + Sq(1)[325]} \\ $h_{0}:$ [327], [325] \\ $h_{1}:$ [322], [321] \\ $h_{2}:$ [314], [313] \\ $h_{3}:$ [298] \end{gl} \end{bdl} \begin{bdl} \item[24/199] \mb{24/199} \begin{gl} \item[325] {\rm Sq(3)[320] + Sq(0,1)[320] + Sq(3)[319]} \item[326] {\rm Sq(2)[324] + Sq(2)[322]} \\ $h_{1}:$ [324], [322] \item[327] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{2}:$ [317], [316], [315] \end{gl} \end{bdl} \begin{bdl} \item[23/199] \mb{23/199} \begin{gl} \item[326] {\rm Sq(3)[337] + Sq(3)[335]} \item[327] {\rm Sq(3)[339] + Sq(0,1)[339] + Sq(3)[336] + Sq(0,1)[336] + Sq(3)[335] + Sq(0,1)[335] + Sq(3)[334]} \item[328] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \end{gl} \end{bdl} \begin{bdl} \item[22/199] \mb{22/199} \begin{gl} \item[340] {\rm Sq(1,1)[343] + Sq(1,1)[342]} \item[341] {\rm Sq(1,1)[344] + Sq(1,1)[342] + Sq(1,1)[340]} \item[342] {\rm Sq(0,1)[345]} \\ $h_{7}:$ [21] \item[343] {\rm Sq(1)[357]} \\ $h_{0}:$ [357] \\ $h_{1}:$ [351], [349] \\ $h_{2}:$ [343], [340] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[21/199] \mb{21/199} \begin{gl} \item[354] {\rm Sq(3)[353]} \item[355] {\rm Sq(3)[355] + Sq(0,1)[355] + Sq(3)[352]} \item[356] {\rm Sq(2)[359]} \\ $h_{1}:$ [359] \\ $h_{2}:$ [347] \\ $h_{3}:$ [330] \\ $h_{5}:$ [227] \\ $h_{6}:$ [134], [133] \item[357] {\rm Sq(1)[364] + Sq(1)[363]} \\ $h_{0}:$ [364], [363] \\ $h_{2}:$ [349] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[20/199] \mb{20/199} \begin{gl} \item[362] {\rm Sq(3)[371] + Sq(0,1)[371] + Sq(3)[369]} \item[363] {\rm Sq(1)[376]} \\ $h_{0}:$ [376] \\ $h_{2}:$ [363], [362] \\ $h_{7}:$ [21] \item[364] {\rm Sq(1)[379] + Sq(1)[378]} \\ $h_{0}:$ [379], [378] \end{gl} \end{bdl} \begin{bdl} \item[19/199] \mb{19/199} \begin{gl} \item[375] {\rm Sq(2,1)[376] + Sq(2,1)[375]} \item[376] {\rm Sq(0,1)[382]} \\ $h_{7}:$ [23] \item[377] {\rm Sq(3)[384]} \\ $h_{2}:$ [378] \item[378] {\rm Sq(0,1)[385] + Sq(0,1)[384]} \\ $h_{2}:$ [378] \\ $h_{7}:$ [24] \item[379] {\rm Sq(3)[387] + Sq(0,1)[387] + Sq(3)[385]} \\ $h_{2}:$ [378] \\ $h_{7}:$ [24] \item[380] {\rm Sq(1)[393]} \\ $h_{0}:$ [393] \\ $h_{1}:$ [391], [389], [388] \\ $h_{2}:$ [378] \\ $h_{4}:$ [312] \\ $h_{7}:$ [24], [23] \item[381] {\rm Sq(1)[394]} \\ $h_{0}:$ [394] \\ $h_{1}:$ [391], [389], [388] \\ $h_{2}:$ [378] \\ $h_{3}:$ [360], [359] \\ $h_{4}:$ [312] \\ $h_{7}:$ [24], [23] \end{gl} \end{bdl} \begin{bdl} \item[18/199] \mb{18/199} \begin{gl} \item[393] {\rm Sq(3)[394] + Sq(0,1)[394]} \\ $h_{4}:$ [314] \item[394] {\rm Sq(3)[395] + Sq(0,1)[394]} \\ $h_{4}:$ [314] \end{gl} \end{bdl} \begin{bdl} \item[17/199] \mb{17/199} \begin{gl} \item[404] {\rm Sq(3)[411] + Sq(0,1)[411] + Sq(3)[407] + Sq(0,1)[406] + Sq(3)[405] + Sq(0,1)[405] + Sq(0,1)[404]} \item[405] {\rm Sq(2)[412]} \\ $h_{1}:$ [412] \item[406] {\rm Sq(2)[413]} \\ $h_{1}:$ [413] \\ $h_{3}:$ [368], [367] \\ $h_{4}:$ [321] \item[407] {\rm Sq(1)[420]} \\ $h_{0}:$ [420] \\ $h_{3}:$ [371], [368], [366] \item[408] {\rm Sq(1)[421]} \\ $h_{0}:$ [421] \\ $h_{2}:$ [401], [398] \\ $h_{3}:$ [368], [366] \\ $h_{4}:$ [322], [320] \item[409] {\rm Sq(1)[423]} \\ $h_{0}:$ [423] \\ $h_{2}:$ [399], [398] \\ $h_{3}:$ [371], [367] \end{gl} \end{bdl} \begin{bdl} \item[16/199] \mb{16/199} \begin{gl} \item[419] {\rm Sq(3)[411] + Sq(3)[410] + Sq(0,1)[410]} \\ $h_{7}:$ [31] \item[420] {\rm Sq(3)[414] + Sq(0,1)[414] + Sq(3)[410] + Sq(0,1)[410]} \\ $h_{3}:$ [377] \item[421] {\rm Sq(1)[428]} \\ $h_{0}:$ [428] \\ $h_{2}:$ [404], [403] \\ $h_{4}:$ [327], [326] \item[422] {\rm Sq(1)[430] + Sq(1)[429]} \\ $h_{0}:$ [430], [429] \\ $h_{3}:$ [377] \\ $h_{7}:$ [31] \item[423] {\rm Sq(1)[431]} \\ $h_{0}:$ [431] \\ $h_{3}:$ [377] \end{gl} \end{bdl} \begin{bdl} \item[15/199] \mb{15/199} \begin{gl} \item[428] {\rm Sq(3)[413] + Sq(3)[412] + Sq(0,1)[412]} \\ $h_{4}:$ [336], [335] \item[429] {\rm Sq(3)[414] + Sq(0,1)[413] + Sq(3)[412] + Sq(0,1)[412]} \\ $h_{4}:$ [336], [335] \item[430] {\rm Sq(3)[416] + Sq(0,1)[416] + Sq(0,1)[414] + Sq(0,1)[413] + Sq(3)[412]} \\ $h_{4}:$ [336], [335] \item[431] {\rm Sq(3)[418] + Sq(0,1)[418] + Sq(3)[415] + Sq(0,1)[415] + Sq(0,1)[412]} \item[432] {\rm Sq(2)[424] + Sq(2)[423]} \\ $h_{1}:$ [424], [423] \\ $h_{3}:$ [380] \\ $h_{4}:$ [336], [335] \item[433] {\rm Sq(1)[432]} \\ $h_{0}:$ [432] \\ $h_{1}:$ [423], [422], [421], [419] \\ $h_{2}:$ [410], [406], [404] \\ $h_{3}:$ [384], [382], [381] \\ $h_{4}:$ [336] \item[434] {\rm Sq(1)[435] + Sq(1)[434] + Sq(1)[429]} \\ $h_{0}:$ [435], [434], [429] \\ $h_{2}:$ [406] \\ $h_{4}:$ [338], [337], [336] \end{gl} \end{bdl} \begin{bdl} \item[14/199] \mb{14/199} \begin{gl} \item[429] {\rm Sq(3)[411] + Sq(0,1)[411] + Sq(3)[410] + Sq(0,1)[410] + Sq(3)[409] + Sq(0,1)[409] + Sq(3)[408] + Sq(3)[407] + Sq(0,1)[405] + Sq(3)[404] + Sq(0,1)[404] + Sq(0,1)[403]} \item[430] {\rm Sq(2)[412]} \\ $h_{1}:$ [412] \item[431] {\rm Sq(2)[414]} \\ $h_{1}:$ [414] \\ $h_{7}:$ [36] \item[432] {\rm Sq(1)[418]} \\ $h_{0}:$ [418] \\ $h_{2}:$ [399] \\ $h_{3}:$ [373] \item[433] {\rm Sq(1)[419]} \\ $h_{0}:$ [419] \\ $h_{2}:$ [399] \\ $h_{3}:$ [376], [374], [373] \\ $h_{4}:$ [334] \item[434] {\rm Sq(1)[420]} \\ $h_{0}:$ [420] \\ $h_{4}:$ [336], [334] \item[435] {\rm Sq(1)[421]} \\ $h_{0}:$ [421] \end{gl} \end{bdl} \begin{bdl} \item[13/199] \mb{13/199} \begin{gl} \item[418] {\rm Sq(1,1)[398] + Sq(1,1)[397] + Sq(1,1)[395]} \item[419] {\rm Sq(0,1)[399]} \\ $h_{3}:$ [369] \item[420] {\rm Sq(3)[400] + Sq(0,1)[400]} \\ $h_{4}:$ [337] \item[421] {\rm Sq(3)[401] + Sq(0,1)[401]} \item[422] {\rm Sq(2)[407] + Sq(2)[402]} \\ $h_{1}:$ [407], [402] \\ $h_{2}:$ [397], [396], [395], [392] \\ $h_{3}:$ [371], [369] \\ $h_{4}:$ [337] \item[423] {\rm Sq(1)[411] + Sq(1)[410]} \\ $h_{0}:$ [411], [410] \\ $h_{1}:$ [405], [403], [402] \\ $h_{2}:$ [398], [396] \\ $h_{4}:$ [339], [337] \\ $h_{7}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[12/199] \mb{12/199} \begin{gl} \item[410] {\rm Sq(3)[390] + Sq(0,1)[389] + Sq(3)[388]} \item[411] {\rm Sq(1)[398] + Sq(1)[397] + Sq(1)[396]} \\ $h_{0}:$ [398], [397], [396] \\ $h_{2}:$ [386] \\ $h_{7}:$ [42] \item[412] {\rm Sq(1)[399] + Sq(1)[396] + Sq(1)[395]} \\ $h_{0}:$ [399], [396], [395] \\ $h_{2}:$ [386] \\ $h_{3}:$ [368] \\ $h_{5}:$ [307] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[11/199] \mb{11/199} \begin{gl} \item[395] {\rm Sq(5)[361] + Sq(2,1)[361] + Sq(5)[359] + Sq(2,1)[359]} \\ $h_{3}:$ [348], [347] \item[396] {\rm Sq(1,1)[364] + Sq(1,1)[363]} \\ $h_{3}:$ [347] \item[397] {\rm Sq(1,1)[367] + Sq(1,1)[363]} \\ $h_{3}:$ [348] \item[398] {\rm Sq(3)[368]} \\ $h_{3}:$ [348], [347] \\ $h_{7}:$ [43] \item[399] {\rm Sq(1)[371]} \\ $h_{0}:$ [371] \\ $h_{3}:$ [348] \\ $h_{7}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[10/199] \mb{10/199} \begin{gl} \item[371] {\rm Sq(1,1)[332] + Sq(1,1)[331] + Sq(1,1)[330]} \item[372] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \\ $h_{2}:$ [330] \\ $h_{3}:$ [317] \\ $h_{4}:$ [300], [299] \\ $h_{7}:$ [46] \item[373] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \\ $h_{2}:$ [332], [330] \\ $h_{3}:$ [317], [316] \\ $h_{4}:$ [300], [299] \\ $h_{5}:$ [269] \\ $h_{7}:$ [46] \end{gl} \end{bdl} \begin{bdl} \item[9/199] \mb{9/199} \begin{gl} \item[337] {\rm Sq(3)[291]} \\ $h_{3}:$ [279], [278] \\ $h_{4}:$ [262] \\ $h_{7}:$ [48] \item[338] {\rm Sq(3)[292]} \\ $h_{2}:$ [288] \\ $h_{3}:$ [279], [278] \\ $h_{4}:$ [262] \\ $h_{5}:$ [234] \\ $h_{7}:$ [48] \item[339] {\rm Sq(3)[294] + Sq(0,1)[294]} \\ $h_{4}:$ [262] \\ $h_{7}:$ [49] \end{gl} \end{bdl} \dm{200} \begin{bdl} \item[99/200] \mb{99/200} \begin{gl} \item[3] {\rm Sq(3)[3] + Sq(0,1)[3]} \end{gl} \end{bdl} \begin{bdl} \item[98/200] \mb{98/200} \begin{gl} \item[5] {\rm Sq(2)[4]} \\ $h_{1}:$ [4] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[93/200] \mb{93/200} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{1}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[92/200] \mb{92/200} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[91/200] \mb{91/200} \begin{gl} \item[9] {\rm Sq(1,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[90/200] \mb{90/200} \begin{gl} \item[13] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[88/200] \mb{88/200} \begin{gl} \item[18] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[85/200] \mb{85/200} \begin{gl} \item[21] {\rm Sq(0,1)[19]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \\ $h_{2}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[84/200] \mb{84/200} \begin{gl} \item[22] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \\ $h_{2}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[83/200] \mb{83/200} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{2}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[82/200] \mb{82/200} \begin{gl} \item[23] {\rm Sq(0,1)[26]} \item[24] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[79/200] \mb{79/200} \begin{gl} \item[31] {\rm Sq(0,1)[30]} \end{gl} \end{bdl} \begin{bdl} \item[77/200] \mb{77/200} \begin{gl} \item[36] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[76/200] \mb{76/200} \begin{gl} \item[36] {\rm Sq(1,1)[39]} \item[37] {\rm Sq(0,1)[40]} \end{gl} \end{bdl} \begin{bdl} \item[75/200] \mb{75/200} \begin{gl} \item[42] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{1}:$ [46] \\ $h_{2}:$ [44] \\ $h_{4}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[74/200] \mb{74/200} \begin{gl} \item[48] {\rm Sq(2)[50]} \\ $h_{1}:$ [50] \item[49] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \\ $h_{2}:$ [45] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[73/200] \mb{73/200} \begin{gl} \item[51] {\rm Sq(0,1)[46]} \item[52] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[72/200] \mb{72/200} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[70/200] \mb{70/200} \begin{gl} \item[54] {\rm Sq(0,1)[53]} \item[55] {\rm Sq(0,1)[54]} \end{gl} \end{bdl} \begin{bdl} \item[69/200] \mb{69/200} \begin{gl} \item[56] {\rm Sq(0,1)[54]} \item[57] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{1}:$ [58] \\ $h_{2}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[68/200] \mb{68/200} \begin{gl} \item[59] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{2}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[67/200] \mb{67/200} \begin{gl} \item[64] {\rm Sq(0,1)[69]} \item[65] {\rm Sq(0,1)[70]} \item[66] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[66/200] \mb{66/200} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[65/200] \mb{65/200} \begin{gl} \item[76] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[64/200] \mb{64/200} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(0,1)[77]} \item[78] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[63/200] \mb{63/200} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \end{gl} \end{bdl} \begin{bdl} \item[62/200] \mb{62/200} \begin{gl} \item[89] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{3}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[61/200] \mb{61/200} \begin{gl} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(0,1)[95]} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [97] \item[96] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{3}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[60/200] \mb{60/200} \begin{gl} \item[99] {\rm Sq(0,1)[104]} \item[100] {\rm Sq(0,1)[105]} \item[101] {\rm Sq(1)[111]} \\ $h_{0}:$ [111] \\ $h_{3}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[59/200] \mb{59/200} \begin{gl} \item[110] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \\ $h_{1}:$ [111] \\ $h_{2}:$ [109] \\ $h_{4}:$ [73] \item[111] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{3}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[58/200] \mb{58/200} \begin{gl} \item[114] {\rm Sq(0,1)[109]} \item[115] {\rm Sq(0,1)[110]} \item[116] {\rm Sq(0,1)[111]} \item[117] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{2}:$ [105] \item[118] {\rm Sq(1)[116]} \\ $h_{0}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[57/200] \mb{57/200} \begin{gl} \item[113] {\rm Sq(0,1)[111]} \item[114] {\rm Sq(0,1)[112]} \item[115] {\rm Sq(0,1)[113]} \item[116] {\rm Sq(1)[117]} \\ $h_{0}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[56/200] \mb{56/200} \begin{gl} \item[117] {\rm Sq(2,1)[115]} \end{gl} \end{bdl} \begin{bdl} \item[55/200] \mb{55/200} \begin{gl} \item[124] {\rm Sq(0,1)[124]} \item[125] {\rm Sq(0,1)[125]} \item[126] {\rm Sq(0,1)[126]} \end{gl} \end{bdl} \begin{bdl} \item[54/200] \mb{54/200} \begin{gl} \item[129] {\rm Sq(0,1)[127]} \item[130] {\rm Sq(0,1)[128]} \item[131] {\rm Sq(0,1)[129]} \end{gl} \end{bdl} \begin{bdl} \item[53/200] \mb{53/200} \begin{gl} \item[133] {\rm Sq(0,1)[135]} \end{gl} \end{bdl} \begin{bdl} \item[52/200] \mb{52/200} \begin{gl} \item[139] {\rm Sq(0,1)[149]} \item[140] {\rm Sq(0,1)[150]} \item[141] {\rm Sq(0,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[51/200] \mb{51/200} \begin{gl} \item[153] {\rm Sq(0,1)[158]} \item[154] {\rm Sq(0,1)[159]} \item[155] {\rm Sq(0,1)[160]} \item[156] {\rm Sq(3)[161] + Sq(0,1)[161]} \end{gl} \end{bdl} \begin{bdl} \item[50/200] \mb{50/200} \begin{gl} \item[165] {\rm Sq(0,1)[159]} \item[166] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{2}:$ [158] \end{gl} \end{bdl} \begin{bdl} \item[49/200] \mb{49/200} \begin{gl} \item[167] {\rm Sq(0,1)[162]} \item[168] {\rm Sq(0,1)[163]} \item[169] {\rm Sq(0,1)[164]} \item[170] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \\ $h_{2}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[48/200] \mb{48/200} \begin{gl} \item[169] {\rm Sq(0,1)[168]} \item[170] {\rm Sq(0,1)[169]} \item[171] {\rm Sq(0,1)[170]} \item[172] {\rm Sq(0,1)[171]} \end{gl} \end{bdl} \begin{bdl} \item[47/200] \mb{47/200} \begin{gl} \item[179] {\rm Sq(0,1)[178]} \end{gl} \end{bdl} \begin{bdl} \item[46/200] \mb{46/200} \begin{gl} \item[187] {\rm Sq(0,1)[185]} \item[188] {\rm Sq(0,1)[186]} \item[189] {\rm Sq(0,1)[187]} \item[190] {\rm Sq(0,1)[188]} \item[191] {\rm Sq(2)[192]} \\ $h_{1}:$ [192] \item[192] {\rm Sq(1)[200] + Sq(1)[199]} \\ $h_{0}:$ [200], [199] \\ $h_{3}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[45/200] \mb{45/200} \begin{gl} \item[196] {\rm Sq(0,1)[194]} \item[197] {\rm Sq(0,1)[195]} \item[198] {\rm Sq(0,1)[196]} \item[199] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{1}:$ [197] \item[200] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \\ $h_{1}:$ [197] \\ $h_{3}:$ [174] \end{gl} \end{bdl} \begin{bdl} \item[44/200] \mb{44/200} \begin{gl} \item[204] {\rm Sq(1,1)[206]} \item[205] {\rm Sq(0,1)[208]} \item[206] {\rm Sq(1)[220] + Sq(1)[219]} \\ $h_{0}:$ [220], [219] \\ $h_{3}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[43/200] \mb{43/200} \begin{gl} \item[215] {\rm Sq(0,1)[218]} \item[216] {\rm Sq(0,1)[219]} \item[217] {\rm Sq(0,1)[220]} \item[218] {\rm Sq(0,1)[221]} \item[219] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{1}:$ [222] \\ $h_{2}:$ [212] \\ $h_{3}:$ [195] \item[220] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{1}:$ [222] \\ $h_{2}:$ [212] \end{gl} \end{bdl} \begin{bdl} \item[42/200] \mb{42/200} \begin{gl} \item[224] {\rm Sq(1,1)[224] + Sq(1,1)[223]} \item[225] {\rm Sq(0,1)[225]} \item[226] {\rm Sq(0,1)[226]} \item[227] {\rm Sq(0,1)[227]} \item[228] {\rm Sq(0,1)[228]} \item[229] {\rm Sq(2)[234] + Sq(2)[233] + Sq(2)[231]} \\ $h_{1}:$ [234], [233], [231] \item[230] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[41/200] \mb{41/200} \begin{gl} \item[236] {\rm Sq(0,1)[231]} \item[237] {\rm Sq(3)[232]} \end{gl} \end{bdl} \begin{bdl} \item[40/200] \mb{40/200} \begin{gl} \item[240] {\rm Sq(1,1)[234] + Sq(1,1)[233] + Sq(1,1)[231] + Sq(1,1)[230]} \item[241] {\rm Sq(0,1)[235]} \item[242] {\rm Sq(0,1)[236]} \item[243] {\rm Sq(0,1)[237]} \item[244] {\rm Sq(0,1)[238]} \end{gl} \end{bdl} \begin{bdl} \item[39/200] \mb{39/200} \begin{gl} \item[243] {\rm Sq(0,1)[244]} \item[244] {\rm Sq(0,1)[245]} \item[245] {\rm Sq(0,1)[247]} \item[246] {\rm Sq(0,1)[248] + Sq(0,1)[246]} \item[247] {\rm Sq(3)[249] + Sq(0,1)[249] + Sq(0,1)[246] + Sq(3)[244]} \end{gl} \end{bdl} \begin{bdl} \item[38/200] \mb{38/200} \begin{gl} \item[254] {\rm Sq(0,1)[258]} \item[255] {\rm Sq(0,1)[259]} \item[256] {\rm Sq(0,1)[260]} \end{gl} \end{bdl} \begin{bdl} \item[37/200] \mb{37/200} \begin{gl} \item[266] {\rm Sq(1,1)[265] + Sq(1,1)[264]} \item[267] {\rm Sq(0,1)[268]} \item[268] {\rm Sq(0,1)[269]} \item[269] {\rm Sq(0,1)[270]} \item[270] {\rm Sq(1)[278] + Sq(1)[277]} \\ $h_{0}:$ [278], [277] \\ $h_{1}:$ [273], [272] \end{gl} \end{bdl} \begin{bdl} \item[36/200] \mb{36/200} \begin{gl} \item[274] {\rm Sq(0,1)[275]} \item[275] {\rm Sq(0,1)[277] + Sq(0,1)[276]} \item[276] {\rm Sq(0,1)[278]} \item[277] {\rm Sq(3)[279] + Sq(0,1)[276]} \item[278] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[35/200] \mb{35/200} \begin{gl} \item[283] {\rm Sq(0,1)[283]} \item[284] {\rm Sq(0,1)[284] + Sq(0,1)[282]} \item[285] {\rm Sq(3)[285]} \item[286] {\rm Sq(3)[287] + Sq(0,1)[287]} \end{gl} \end{bdl} \begin{bdl} \item[34/200] \mb{34/200} \begin{gl} \item[292] {\rm Sq(1,1)[285] + Sq(1,1)[282] + Sq(1,1)[281]} \item[293] {\rm Sq(0,1)[288]} \item[294] {\rm Sq(0,1)[289]} \item[295] {\rm Sq(3)[293] + Sq(0,1)[293] + Sq(3)[288]} \item[296] {\rm Sq(1)[301] + Sq(1)[297]} \\ $h_{0}:$ [301], [297] \\ $h_{2}:$ [286] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[33/200] \mb{33/200} \begin{gl} \item[297] {\rm Sq(0,1)[288]} \\ $h_{7}:$ [5] \item[298] {\rm Sq(0,1)[290] + Sq(0,1)[287]} \item[299] {\rm Sq(0,1)[291] + Sq(0,1)[289]} \item[300] {\rm Sq(0,1)[292]} \item[301] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{2}:$ [283], [282] \item[302] {\rm Sq(1)[302]} \\ $h_{0}:$ [302] \\ $h_{1}:$ [296] \\ $h_{2}:$ [286], [282] \\ $h_{3}:$ [269] \\ $h_{7}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[32/200] \mb{32/200} \begin{gl} \item[300] {\rm Sq(0,1)[290]} \item[301] {\rm Sq(0,1)[291]} \item[302] {\rm Sq(1)[304] + Sq(1)[303]} \\ $h_{0}:$ [304], [303] \\ $h_{2}:$ [287], [286] \\ $h_{3}:$ [272], [271], [268] \end{gl} \end{bdl} \begin{bdl} \item[31/200] \mb{31/200} \begin{gl} \item[301] {\rm Sq(1,1)[294] + Sq(1,1)[293]} \item[302] {\rm Sq(0,1)[297]} \item[303] {\rm Sq(0,1)[299] + Sq(3)[298] + Sq(0,1)[298]} \item[304] {\rm Sq(1)[310] + Sq(1)[307] + Sq(1)[306]} \\ $h_{0}:$ [310], [307], [306] \\ $h_{3}:$ [273] \end{gl} \end{bdl} \begin{bdl} \item[30/200] \mb{30/200} \begin{gl} \item[306] {\rm Sq(0,1)[306] + Sq(0,1)[305] + Sq(0,1)[304] + Sq(0,1)[303]} \item[307] {\rm Sq(0,1)[307] + Sq(0,1)[303]} \item[308] {\rm Sq(3)[308] + Sq(0,1)[308] + Sq(3)[307] + Sq(3)[306] + Sq(0,1)[304] + Sq(3)[303] + Sq(0,1)[303]} \item[309] {\rm Sq(2)[312] + Sq(2)[310] + Sq(2)[309]} \\ $h_{1}:$ [312], [310], [309] \item[310] {\rm Sq(1)[317] + Sq(1)[316] + Sq(1)[315]} \\ $h_{0}:$ [317], [316], [315] \\ $h_{3}:$ [282] \item[311] {\rm Sq(1)[318] + Sq(1)[315]} \\ $h_{0}:$ [318], [315] \\ $h_{3}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[29/200] \mb{29/200} \begin{gl} \item[315] {\rm Sq(1,1)[306] + Sq(1,1)[304]} \item[316] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \\ $h_{1}:$ [312], [311], [310] \item[317] {\rm Sq(1)[318] + Sq(1)[317]} \\ $h_{0}:$ [318], [317] \\ $h_{1}:$ [312], [311], [310] \item[318] {\rm Sq(1)[320]} \\ $h_{0}:$ [320] \\ $h_{3}:$ [289], [284] \end{gl} \end{bdl} \begin{bdl} \item[28/200] \mb{28/200} \begin{gl} \item[315] {\rm Sq(1,1)[308] + Sq(1,1)[306]} \item[316] {\rm Sq(0,1)[312]} \item[317] {\rm Sq(0,1)[313]} \item[318] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \item[319] {\rm Sq(1)[320] + Sq(1)[319]} \\ $h_{0}:$ [320], [319] \\ $h_{1}:$ [317] \\ $h_{2}:$ [307] \\ $h_{3}:$ [290], [289] \\ $h_{7}:$ [10] \item[320] {\rm Sq(1)[321]} \\ $h_{0}:$ [321] \\ $h_{3}:$ [290], [289] \end{gl} \end{bdl} \begin{bdl} \item[27/200] \mb{27/200} \begin{gl} \item[318] {\rm Sq(3)[317]} \item[319] {\rm Sq(3)[319] + Sq(0,1)[319] + Sq(0,1)[317]} \item[320] {\rm Sq(3)[320] + Sq(0,1)[320] + Sq(3)[318] + Sq(0,1)[318]} \\ $h_{3}:$ [297] \\ $h_{7}:$ [14] \item[321] {\rm Sq(1)[326] + Sq(1)[325]} \\ $h_{0}:$ [326], [325] \\ $h_{3}:$ [297] \end{gl} \end{bdl} \begin{bdl} \item[26/200] \mb{26/200} \begin{gl} \item[325] {\rm Sq(1,1)[320]} \item[326] {\rm Sq(1)[328] + Sq(1)[327]} \\ $h_{0}:$ [328], [327] \end{gl} \end{bdl} \begin{bdl} \item[25/200] \mb{25/200} \begin{gl} \item[327] {\rm Sq(1,1)[318] + Sq(1,1)[317]} \item[328] {\rm Sq(3)[322] + Sq(3)[321]} \item[329] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{2}:$ [316] \\ $h_{3}:$ [303] \end{gl} \end{bdl} \begin{bdl} \item[24/200] \mb{24/200} \begin{gl} \item[328] {\rm Sq(0,1)[322]} \item[329] {\rm Sq(0,1)[323]} \\ $h_{7}:$ [16] \item[330] {\rm Sq(3)[325]} \\ $h_{3}:$ [306] \end{gl} \end{bdl} \begin{bdl} \item[23/200] \mb{23/200} \begin{gl} \item[329] {\rm Sq(5)[333] + Sq(2,1)[333]} \item[330] {\rm Sq(1,1)[336] + Sq(1,1)[334]} \item[331] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \\ $h_{2}:$ [335] \end{gl} \end{bdl} \begin{bdl} \item[22/200] \mb{22/200} \begin{gl} \item[344] {\rm Sq(1,1)[347] + Sq(1,1)[345]} \item[345] {\rm Sq(3)[351] + Sq(3)[350] + Sq(3)[349]} \item[346] {\rm Sq(3)[353] + Sq(0,1)[353] + Sq(3)[349] + Sq(0,1)[349]} \item[347] {\rm Sq(2)[355]} \\ $h_{1}:$ [355] \end{gl} \end{bdl} \begin{bdl} \item[21/200] \mb{21/200} \begin{gl} \item[358] {\rm Sq(0,1)[359] + Sq(0,1)[357] + Sq(0,1)[356]} \\ $h_{7}:$ [23] \item[359] {\rm Sq(1)[365]} \\ $h_{0}:$ [365] \\ $h_{2}:$ [352] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[20/200] \mb{20/200} \begin{gl} \item[365] {\rm Sq(1,1)[372] + Sq(1,1)[371]} \item[366] {\rm Sq(2)[379] + Sq(2)[378]} \\ $h_{1}:$ [379], [378] \\ $h_{4}:$ [308], [307] \item[367] {\rm Sq(1)[382]} \\ $h_{0}:$ [382] \\ $h_{3}:$ [351], [349] \\ $h_{4}:$ [308], [307] \\ $h_{5}:$ [237] \\ $h_{6}:$ [145] \item[368] {\rm Sq(1)[383]} \\ $h_{0}:$ [383] \\ $h_{1}:$ [376] \\ $h_{2}:$ [371] \\ $h_{3}:$ [351], [349] \\ $h_{5}:$ [237] \\ $h_{6}:$ [145] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[19/200] \mb{19/200} \begin{gl} \item[382] {\rm Sq(3)[391] + Sq(3)[389] + Sq(3)[388]} \item[383] {\rm Sq(1)[396]} \\ $h_{0}:$ [396] \\ $h_{2}:$ [382] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[18/200] \mb{18/200} \begin{gl} \item[395] {\rm Sq(2,1)[391] + Sq(2,1)[390] + Sq(2,1)[389] + Sq(2,1)[388]} \item[396] {\rm Sq(1,1)[398] + Sq(1,1)[396]} \\ $h_{7}:$ [28] \item[397] {\rm Sq(3)[402] + Sq(0,1)[402] + Sq(3)[400]} \\ $h_{7}:$ [29] \item[398] {\rm Sq(1)[410]} \\ $h_{0}:$ [410] \\ $h_{7}:$ [29], [28] \item[399] {\rm Sq(1)[413] + Sq(1)[412] + Sq(1)[411]} \\ $h_{0}:$ [413], [412], [411] \\ $h_{1}:$ [405], [404] \\ $h_{3}:$ [373], [372] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[17/200] \mb{17/200} \begin{gl} \item[410] {\rm Sq(1,1)[406]} \item[411] {\rm Sq(3)[418] + Sq(0,1)[418] + Sq(3)[416] + Sq(0,1)[416] + Sq(3)[414] + Sq(0,1)[414] + Sq(3)[413] + Sq(0,1)[413] + Sq(3)[412] + Sq(0,1)[412]} \\ $h_{2}:$ [406], [405], [404] \\ $h_{3}:$ [375], [374], [373] \item[412] {\rm Sq(1)[424]} \\ $h_{0}:$ [424] \item[413] {\rm Sq(1)[425]} \\ $h_{0}:$ [425] \\ $h_{2}:$ [406], [405], [404] \\ $h_{3}:$ [375], [374], [373] \item[414] {\rm Sq(1)[427]} \\ $h_{0}:$ [427] \\ $h_{2}:$ [408], [405], [404] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[16/200] \mb{16/200} \begin{gl} \item[424] {\rm Sq(3)[426] + Sq(0,1)[426] + Sq(3)[424] + Sq(0,1)[424] + Sq(3)[422] + Sq(0,1)[422] + Sq(3)[418] + Sq(0,1)[418]} \item[425] {\rm Sq(3)[427] + Sq(0,1)[427] + Sq(3)[423] + Sq(0,1)[423] + Sq(3)[422] + Sq(0,1)[422] + Sq(3)[421] + Sq(3)[420] + Sq(3)[419]} \item[426] {\rm Sq(2)[431] + Sq(2)[430] + Sq(2)[428]} \\ $h_{1}:$ [431], [430], [428] \item[427] {\rm Sq(1)[435]} \\ $h_{0}:$ [435] \\ $h_{2}:$ [411], [410] \\ $h_{7}:$ [32] \item[428] {\rm Sq(1)[436]} \\ $h_{0}:$ [436] \\ $h_{1}:$ [430], [428] \\ $h_{2}:$ [411], [410] \\ $h_{3}:$ [385], [384], [383], [382], [380] \\ $h_{4}:$ [330], [329] \\ $h_{7}:$ [32] \item[429] {\rm Sq(1)[439] + Sq(1)[438]} \\ $h_{0}:$ [439], [438] \\ $h_{1}:$ [428] \\ $h_{2}:$ [414], [413], [410] \\ $h_{3}:$ [383], [381], [380] \\ $h_{4}:$ [336], [335], [332], [330] \\ $h_{7}:$ [32] \item[430] {\rm Sq(1)[440] + Sq(1)[438]} \\ $h_{0}:$ [440], [438] \\ $h_{1}:$ [430], [428] \\ $h_{2}:$ [413] \\ $h_{3}:$ [384], [381], [380] \\ $h_{4}:$ [330], [329] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[15/200] \mb{15/200} \begin{gl} \item[435] {\rm Sq(3)[420] + Sq(3)[419]} \\ $h_{7}:$ [34] \item[436] {\rm Sq(3)[427] + Sq(0,1)[427] + Sq(3)[424] + Sq(0,1)[423] + Sq(0,1)[420] + Sq(3)[419]} \\ $h_{3}:$ [391], [390], [389] \\ $h_{7}:$ [34] \item[437] {\rm Sq(2)[429]} \\ $h_{1}:$ [429] \\ $h_{3}:$ [389] \\ $h_{7}:$ [34] \item[438] {\rm Sq(1)[436]} \\ $h_{0}:$ [436] \\ $h_{1}:$ [430] \\ $h_{2}:$ [414], [412] \\ $h_{3}:$ [391], [388] \\ $h_{4}:$ [339] \\ $h_{7}:$ [34] \item[439] {\rm Sq(1)[437]} \\ $h_{0}:$ [437] \\ $h_{1}:$ [430] \\ $h_{2}:$ [414], [413] \\ $h_{3}:$ [391], [388] \\ $h_{4}:$ [340] \item[440] {\rm Sq(1)[438]} \\ $h_{0}:$ [438] \\ $h_{1}:$ [430] \\ $h_{2}:$ [414] \\ $h_{3}:$ [391], [388] \\ $h_{4}:$ [339] \end{gl} \end{bdl} \begin{bdl} \item[14/200] \mb{14/200} \begin{gl} \item[436] {\rm Sq(3)[412] + Sq(0,1)[412]} \item[437] {\rm Sq(3)[413]} \\ $h_{4}:$ [337] \item[438] {\rm Sq(3)[414]} \item[439] {\rm Sq(2)[420] + Sq(2)[418]} \\ $h_{1}:$ [420], [418] \\ $h_{3}:$ [380] \\ $h_{4}:$ [338] \item[440] {\rm Sq(2)[421] + Sq(2)[418]} \\ $h_{1}:$ [421], [418] \\ $h_{3}:$ [380] \\ $h_{4}:$ [337] \item[441] {\rm Sq(1)[425]} \\ $h_{0}:$ [425] \\ $h_{2}:$ [409] \\ $h_{4}:$ [340], [339] \end{gl} \end{bdl} \begin{bdl} \item[13/200] \mb{13/200} \begin{gl} \item[424] {\rm Sq(1)[414]} \\ $h_{0}:$ [414] \\ $h_{2}:$ [399] \\ $h_{3}:$ [381], [380], [378] \\ $h_{4}:$ [341] \item[425] {\rm Sq(1)[415] + Sq(1)[413]} \\ $h_{0}:$ [415], [413] \\ $h_{2}:$ [399] \\ $h_{4}:$ [341], [340] \item[426] {\rm Sq(1)[416] + Sq(1)[413]} \\ $h_{0}:$ [416], [413] \\ $h_{2}:$ [401], [400] \\ $h_{3}:$ [381], [380], [378], [377] \\ $h_{4}:$ [340] \\ $h_{6}:$ [176] \item[427] {\rm Sq(1)[417]} \\ $h_{0}:$ [417] \\ $h_{1}:$ [410] \\ $h_{2}:$ [401], [400], [399] \\ $h_{3}:$ [376] \\ $h_{4}:$ [341] \end{gl} \end{bdl} \begin{bdl} \item[12/200] \mb{12/200} \begin{gl} \item[413] {\rm Sq(1,1)[390] + Sq(1,1)[389] + Sq(1,1)[388]} \item[414] {\rm Sq(0,1)[392]} \\ $h_{3}:$ [375], [374], [372] \\ $h_{4}:$ [344] \item[415] {\rm Sq(0,1)[393] + Sq(3)[392]} \\ $h_{4}:$ [344] \item[416] {\rm Sq(3)[393]} \\ $h_{2}:$ [390], [389], [388] \\ $h_{3}:$ [375], [374], [372], [370] \\ $h_{6}:$ [181] \item[417] {\rm Sq(1)[400]} \\ $h_{0}:$ [400] \\ $h_{2}:$ [390], [389], [388] \\ $h_{4}:$ [344] \end{gl} \end{bdl} \begin{bdl} \item[11/200] \mb{11/200} \begin{gl} \item[400] {\rm Sq(1)[376]} \\ $h_{0}:$ [376] \end{gl} \end{bdl} \begin{bdl} \item[10/200] \mb{10/200} \begin{gl} \item[374] {\rm Sq(5)[332] + Sq(2,1)[332] + Sq(2,1)[331] + Sq(2,1)[330]} \\ $h_{3}:$ [319], [318] \item[375] {\rm Sq(1,1)[334] + Sq(1,1)[333]} \\ $h_{3}:$ [320] \item[376] {\rm Sq(1,1)[336]} \item[377] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{1}:$ [339] \\ $h_{3}:$ [320] \\ $h_{4}:$ [301] \\ $h_{7}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[9/200] \mb{9/200} \begin{gl} \item[340] {\rm Sq(1)[297]} \\ $h_{0}:$ [297] \item[341] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \\ $h_{4}:$ [264] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \begin{bdl} \item[8/200] \mb{8/200} \begin{gl} \item[297] {\rm Sq(1,1)[250]} \item[298] {\rm Sq(0,1)[253]} \\ $h_{4}:$ [228] \\ $h_{7}:$ [49] \item[299] {\rm Sq(3)[254] + Sq(3)[253] + Sq(3)[252] + Sq(0,1)[252]} \\ $h_{2}:$ [251] \\ $h_{3}:$ [242] \\ $h_{5}:$ [202] \\ $h_{6}:$ [133] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \dm{201} \begin{bdl} \item[100/201] \mb{100/201} \begin{gl} \item[2] {\rm Sq(2)[3]} \\ $h_{1}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[99/201] \mb{99/201} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [3] \\ $h_{3}:$ [1] \end{gl} \end{bdl} \begin{bdl} \item[98/201] \mb{98/201} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[97/201] \mb{97/201} \begin{gl} \item[6] {\rm Sq(1)[5]} \\ $h_{0}:$ [5] \\ $h_{2}:$ [3] \end{gl} \end{bdl} \begin{bdl} \item[96/201] \mb{96/201} \begin{gl} \item[5] {\rm Sq(0,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[91/201] \mb{91/201} \begin{gl} \item[10] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{1}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[90/201] \mb{90/201} \begin{gl} \item[14] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[87/201] \mb{87/201} \begin{gl} \item[16] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[84/201] \mb{84/201} \begin{gl} \item[23] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[83/201] \mb{83/201} \begin{gl} \item[22] {\rm Sq(1)[25]} \\ $h_{0}:$ [25] \\ $h_{1}:$ [23] \\ $h_{2}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[82/201] \mb{82/201} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[81/201] \mb{81/201} \begin{gl} \item[28] {\rm Sq(1,1)[28]} \item[29] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[80/201] \mb{80/201} \begin{gl} \item[30] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \\ $h_{2}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[79/201] \mb{79/201} \begin{gl} \item[32] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[78/201] \mb{78/201} \begin{gl} \item[34] {\rm Sq(0,1)[33]} \item[35] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[75/201] \mb{75/201} \begin{gl} \item[43] {\rm Sq(0,1)[47]} \item[44] {\rm Sq(1)[50]} \\ $h_{0}:$ [50] \\ $h_{1}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[74/201] \mb{74/201} \begin{gl} \item[50] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[72/201] \mb{72/201} \begin{gl} \item[50] {\rm Sq(0,1)[49]} \item[51] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[71/201] \mb{71/201} \begin{gl} \item[51] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[69/201] \mb{69/201} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[68/201] \mb{68/201} \begin{gl} \item[60] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[67/201] \mb{67/201} \begin{gl} \item[67] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[66/201] \mb{66/201} \begin{gl} \item[73] {\rm Sq(1,1)[73]} \item[74] {\rm Sq(0,1)[74]} \item[75] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[65/201] \mb{65/201} \begin{gl} \item[77] {\rm Sq(0,1)[75]} \item[78] {\rm Sq(1)[79]} \\ $h_{0}:$ [79] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[64/201] \mb{64/201} \begin{gl} \item[79] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \\ $h_{2}:$ [76] \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [79] \end{gl} \end{bdl} \begin{bdl} \item[63/201] \mb{63/201} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(0,1)[86]} \item[85] {\rm Sq(0,1)[87]} \item[86] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[62/201] \mb{62/201} \begin{gl} \item[90] {\rm Sq(0,1)[90]} \item[91] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[61/201] \mb{61/201} \begin{gl} \item[97] {\rm Sq(1)[105]} \\ $h_{0}:$ [105] \\ $h_{1}:$ [99] \\ $h_{3}:$ [84] \\ $h_{4}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[60/201] \mb{60/201} \begin{gl} \item[102] {\rm Sq(0,1)[106]} \item[103] {\rm Sq(0,1)[107]} \item[104] {\rm Sq(0,1)[108]} \item[105] {\rm Sq(1)[114]} \\ $h_{0}:$ [114] \\ $h_{3}:$ [93], [92] \end{gl} \end{bdl} \begin{bdl} \item[59/201] \mb{59/201} \begin{gl} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(0,1)[113]} \item[114] {\rm Sq(1)[119]} \\ $h_{0}:$ [119] \\ $h_{3}:$ [99], [98] \end{gl} \end{bdl} \begin{bdl} \item[58/201] \mb{58/201} \begin{gl} \item[119] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \\ $h_{3}:$ [97], [96] \end{gl} \end{bdl} \begin{bdl} \item[57/201] \mb{57/201} \begin{gl} \item[117] {\rm Sq(0,1)[114]} \item[118] {\rm Sq(0,1)[115]} \item[119] {\rm Sq(0,1)[116]} \item[120] {\rm Sq(2)[117]} \\ $h_{1}:$ [117] \item[121] {\rm Sq(1)[121]} \\ $h_{0}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[56/201] \mb{56/201} \begin{gl} \item[118] {\rm Sq(0,1)[120]} \item[119] {\rm Sq(0,1)[121]} \item[120] {\rm Sq(0,1)[122]} \item[121] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[55/201] \mb{55/201} \begin{gl} \item[127] {\rm Sq(0,1)[128]} \end{gl} \end{bdl} \begin{bdl} \item[54/201] \mb{54/201} \begin{gl} \item[132] {\rm Sq(0,1)[130]} \item[133] {\rm Sq(0,1)[131]} \item[134] {\rm Sq(0,1)[132]} \end{gl} \end{bdl} \begin{bdl} \item[53/201] \mb{53/201} \begin{gl} \item[134] {\rm Sq(0,1)[136]} \item[135] {\rm Sq(0,1)[137]} \item[136] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[52/201] \mb{52/201} \begin{gl} \item[142] {\rm Sq(0,1)[152]} \item[143] {\rm Sq(2)[156]} \\ $h_{1}:$ [156] \end{gl} \end{bdl} \begin{bdl} \item[51/201] \mb{51/201} \begin{gl} \item[157] {\rm Sq(0,1)[162]} \item[158] {\rm Sq(0,1)[163]} \item[159] {\rm Sq(0,1)[164]} \end{gl} \end{bdl} \begin{bdl} \item[50/201] \mb{50/201} \begin{gl} \item[167] {\rm Sq(0,1)[163]} \item[168] {\rm Sq(0,1)[164]} \item[169] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[49/201] \mb{49/201} \begin{gl} \item[171] {\rm Sq(0,1)[167]} \item[172] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{1}:$ [169] \\ $h_{2}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[48/201] \mb{48/201} \begin{gl} \item[173] {\rm Sq(0,1)[173]} \item[174] {\rm Sq(0,1)[174]} \item[175] {\rm Sq(0,1)[175]} \item[176] {\rm Sq(0,1)[176]} \item[177] {\rm Sq(1)[183]} \\ $h_{0}:$ [183] \\ $h_{2}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[47/201] \mb{47/201} \begin{gl} \item[180] {\rm Sq(0,1)[182]} \item[181] {\rm Sq(0,1)[183]} \item[182] {\rm Sq(0,1)[184]} \item[183] {\rm Sq(3)[186] + Sq(0,1)[186]} \item[184] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \\ $h_{1}:$ [191] \\ $h_{2}:$ [180] \\ $h_{3}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[46/201] \mb{46/201} \begin{gl} \item[193] {\rm Sq(0,1)[191]} \item[194] {\rm Sq(1)[206] + Sq(1)[205]} \\ $h_{0}:$ [206], [205] \\ $h_{2}:$ [190] \\ $h_{3}:$ [171] \item[195] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{2}:$ [189] \\ $h_{3}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[45/201] \mb{45/201} \begin{gl} \item[201] {\rm Sq(0,1)[198]} \item[202] {\rm Sq(0,1)[199]} \item[203] {\rm Sq(0,1)[200]} \item[204] {\rm Sq(0,1)[201]} \item[205] {\rm Sq(1)[209] + Sq(1)[208]} \\ $h_{0}:$ [209], [208] \\ $h_{1}:$ [204] \\ $h_{2}:$ [193] \\ $h_{4}:$ [140] \item[206] {\rm Sq(1)[212] + Sq(1)[208]} \\ $h_{0}:$ [212], [208] \\ $h_{1}:$ [204] \\ $h_{3}:$ [177] \\ $h_{4}:$ [140] \item[207] {\rm Sq(1)[213] + Sq(1)[208]} \\ $h_{0}:$ [213], [208] \\ $h_{2}:$ [192] \\ $h_{3}:$ [176] \end{gl} \end{bdl} \begin{bdl} \item[44/201] \mb{44/201} \begin{gl} \item[207] {\rm Sq(0,1)[209]} \item[208] {\rm Sq(0,1)[210]} \item[209] {\rm Sq(0,1)[211]} \item[210] {\rm Sq(0,1)[212]} \item[211] {\rm Sq(0,1)[213]} \item[212] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{3}:$ [192] \item[213] {\rm Sq(1)[224]} \\ $h_{0}:$ [224] \\ $h_{3}:$ [190] \end{gl} \end{bdl} \begin{bdl} \item[43/201] \mb{43/201} \begin{gl} \item[221] {\rm Sq(0,1)[223]} \item[222] {\rm Sq(1)[234] + Sq(1)[233] + Sq(1)[231]} \\ $h_{0}:$ [234], [233], [231] \\ $h_{1}:$ [229], [228], [225] \item[223] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{3}:$ [197] \item[224] {\rm Sq(1)[237]} \\ $h_{0}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[42/201] \mb{42/201} \begin{gl} \item[231] {\rm Sq(0,1)[231]} \item[232] {\rm Sq(0,1)[232]} \item[233] {\rm Sq(0,1)[233]} \item[234] {\rm Sq(0,1)[234]} \item[235] {\rm Sq(0,1)[235]} \item[236] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \item[237] {\rm Sq(1)[244]} \\ $h_{0}:$ [244] \end{gl} \end{bdl} \begin{bdl} \item[41/201] \mb{41/201} \begin{gl} \item[238] {\rm Sq(0,1)[234]} \item[239] {\rm Sq(0,1)[235]} \item[240] {\rm Sq(0,1)[236]} \item[241] {\rm Sq(3)[236]} \item[242] {\rm Sq(0,1)[237]} \item[243] {\rm Sq(0,1)[238]} \item[244] {\rm Sq(3)[239] + Sq(3)[238] + Sq(3)[237] + Sq(3)[234]} \end{gl} \end{bdl} \begin{bdl} \item[40/201] \mb{40/201} \begin{gl} \item[245] {\rm Sq(0,1)[241]} \item[246] {\rm Sq(0,1)[242]} \end{gl} \end{bdl} \begin{bdl} \item[39/201] \mb{39/201} \begin{gl} \item[248] {\rm Sq(1,1)[249] + Sq(1,1)[248]} \item[249] {\rm Sq(0,1)[250]} \item[250] {\rm Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[252]} \item[252] {\rm Sq(0,1)[253]} \end{gl} \end{bdl} \begin{bdl} \item[38/201] \mb{38/201} \begin{gl} \item[257] {\rm Sq(0,1)[262] + Sq(0,1)[261]} \item[258] {\rm Sq(0,1)[263] + Sq(0,1)[261]} \item[259] {\rm Sq(0,1)[264] + Sq(0,1)[261]} \item[260] {\rm Sq(0,1)[265]} \end{gl} \end{bdl} \begin{bdl} \item[37/201] \mb{37/201} \begin{gl} \item[271] {\rm Sq(1,1)[270] + Sq(1,1)[269]} \item[272] {\rm Sq(0,1)[272]} \item[273] {\rm Sq(3)[273] + Sq(3)[272] + Sq(0,1)[271]} \end{gl} \end{bdl} \begin{bdl} \item[36/201] \mb{36/201} \begin{gl} \item[279] {\rm Sq(0,1)[280]} \item[280] {\rm Sq(0,1)[281]} \item[281] {\rm Sq(0,1)[282]} \item[282] {\rm Sq(2)[286]} \\ $h_{1}:$ [286] \end{gl} \end{bdl} \begin{bdl} \item[35/201] \mb{35/201} \begin{gl} \item[287] {\rm Sq(0,1)[288]} \item[288] {\rm Sq(0,1)[289]} \item[289] {\rm Sq(0,1)[290]} \item[290] {\rm Sq(3)[291] + Sq(0,1)[291] + Sq(3)[290] + Sq(3)[288]} \end{gl} \end{bdl} \begin{bdl} \item[34/201] \mb{34/201} \begin{gl} \item[297] {\rm Sq(2,1)[285]} \item[298] {\rm Sq(1,1)[288]} \item[299] {\rm Sq(0,1)[294]} \item[300] {\rm Sq(1)[307] + Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [307], [305], [304] \\ $h_{1}:$ [297] \\ $h_{2}:$ [290] \\ $h_{4}:$ [237] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[33/201] \mb{33/201} \begin{gl} \item[303] {\rm Sq(1,1)[293] + Sq(1,1)[292] + Sq(1,1)[291] + Sq(1,1)[290] + Sq(1,1)[289]} \item[304] {\rm Sq(0,1)[295]} \item[305] {\rm Sq(0,1)[296]} \item[306] {\rm Sq(0,1)[297]} \item[307] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{2}:$ [288] \\ $h_{7}:$ [6] \item[308] {\rm Sq(1)[308] + Sq(1)[307]} \\ $h_{0}:$ [308], [307] \\ $h_{1}:$ [300] \\ $h_{2}:$ [293], [288], [287] \\ $h_{7}:$ [6] \item[309] {\rm Sq(1)[309] + Sq(1)[306]} \\ $h_{0}:$ [309], [306] \\ $h_{2}:$ [288] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[32/201] \mb{32/201} \begin{gl} \item[303] {\rm Sq(0,1)[295] + Sq(0,1)[294]} \item[304] {\rm Sq(0,1)[297]} \item[305] {\rm Sq(3)[298] + Sq(3)[295] + Sq(3)[294] + Sq(3)[293]} \\ $h_{7}:$ [6] \item[306] {\rm Sq(3)[299] + Sq(0,1)[299] + Sq(0,1)[296] + Sq(0,1)[293]} \item[307] {\rm Sq(3)[300] + Sq(0,1)[300] + Sq(3)[293]} \item[308] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{2}:$ [290] \\ $h_{7}:$ [6] \item[309] {\rm Sq(1)[307]} \\ $h_{0}:$ [307] \\ $h_{7}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[31/201] \mb{31/201} \begin{gl} \item[305] {\rm Sq(1,1)[300]} \item[306] {\rm Sq(0,1)[302]} \item[307] {\rm Sq(3)[305] + Sq(0,1)[305] + Sq(3)[304] + Sq(0,1)[304]} \item[308] {\rm Sq(1)[315] + Sq(1)[314] + Sq(1)[313]} \\ $h_{0}:$ [315], [314], [313] \\ $h_{1}:$ [309], [308] \\ $h_{2}:$ [301], [299], [298] \\ $h_{3}:$ [284], [283], [280] \end{gl} \end{bdl} \begin{bdl} \item[30/201] \mb{30/201} \begin{gl} \item[312] {\rm Sq(1,1)[308] + Sq(1,1)[306]} \item[313] {\rm Sq(0,1)[310] + Sq(0,1)[309]} \item[314] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{2}:$ [307], [306], [304] \\ $h_{3}:$ [287] \\ $h_{7}:$ [12] \item[315] {\rm Sq(1)[323] + Sq(1)[320]} \\ $h_{0}:$ [323], [320] \\ $h_{2}:$ [308], [307], [306], [303] \\ $h_{3}:$ [288] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[29/201] \mb{29/201} \begin{gl} \item[319] {\rm Sq(3)[311] + Sq(3)[310]} \\ $h_{3}:$ [292] \\ $h_{7}:$ [11] \item[320] {\rm Sq(3)[312] + Sq(0,1)[311]} \item[321] {\rm Sq(0,1)[313] + Sq(0,1)[311]} \\ $h_{3}:$ [292] \\ $h_{7}:$ [11] \item[322] {\rm Sq(2)[315]} \\ $h_{1}:$ [315] \\ $h_{4}:$ [261] \\ $h_{7}:$ [11] \item[323] {\rm Sq(1)[324] + Sq(1)[322] + Sq(1)[321]} \\ $h_{0}:$ [324], [322], [321] \\ $h_{2}:$ [308] \\ $h_{3}:$ [294] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[28/201] \mb{28/201} \begin{gl} \item[321] {\rm Sq(0,1)[315]} \item[322] {\rm Sq(3)[315]} \item[323] {\rm Sq(2)[319] + Sq(2)[318]} \\ $h_{1}:$ [319], [318] \item[324] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{3}:$ [295], [293] \end{gl} \end{bdl} \begin{bdl} \item[27/201] \mb{27/201} \begin{gl} \item[322] {\rm Sq(1,1)[320] + Sq(1,1)[318]} \item[323] {\rm Sq(0,1)[322]} \item[324] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{2}:$ [319] \\ $h_{3}:$ [302] \\ $h_{4}:$ [268], [267] \item[325] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \\ $h_{2}:$ [319] \\ $h_{3}:$ [302] \\ $h_{4}:$ [268], [267] \item[326] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \end{gl} \end{bdl} \begin{bdl} \item[26/201] \mb{26/201} \begin{gl} \item[327] {\rm Sq(5)[321] + Sq(2,1)[321] + Sq(5)[318] + Sq(2,1)[318] + Sq(5)[317] + Sq(2,1)[316]} \item[328] {\rm Sq(1,1)[323] + Sq(1,1)[322]} \\ $h_{3}:$ [303] \item[329] {\rm Sq(3)[324]} \\ $h_{3}:$ [303] \item[330] {\rm Sq(0,1)[325]} \item[331] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{1}:$ [328], [327] \\ $h_{3}:$ [303] \\ $h_{7}:$ [19] \item[332] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \end{gl} \end{bdl} \begin{bdl} \item[25/201] \mb{25/201} \begin{gl} \item[330] {\rm Sq(1,1)[323] + Sq(1,1)[322] + Sq(1,1)[321]} \item[331] {\rm Sq(0,1)[325]} \item[332] {\rm Sq(3)[326] + Sq(3)[325]} \end{gl} \end{bdl} \begin{bdl} \item[24/201] \mb{24/201} \begin{gl} \item[331] {\rm Sq(1,1)[324] + Sq(1,1)[322]} \item[332] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \item[333] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{3}:$ [309], [308] \\ $h_{4}:$ [283], [282] \\ $h_{5}:$ [220] \\ $h_{6}:$ [125] \end{gl} \end{bdl} \begin{bdl} \item[23/201] \mb{23/201} \begin{gl} \item[332] {\rm Sq(0,1)[341]} \item[333] {\rm Sq(3)[341]} \item[334] {\rm Sq(0,1)[342]} \\ $h_{7}:$ [18] \item[335] {\rm Sq(1)[348]} \\ $h_{0}:$ [348] \\ $h_{1}:$ [347], [346], [345], [344] \item[336] {\rm Sq(1)[350]} \\ $h_{0}:$ [350] \\ $h_{3}:$ [325], [324] \\ $h_{4}:$ [298], [297] \\ $h_{6}:$ [129] \end{gl} \end{bdl} \begin{bdl} \item[22/201] \mb{22/201} \begin{gl} \item[348] {\rm Sq(0,1)[355]} \item[349] {\rm Sq(3)[357] + Sq(0,1)[357] + Sq(3)[355] + Sq(0,1)[354]} \item[350] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{3}:$ [333], [331] \\ $h_{4}:$ [306], [305] \\ $h_{6}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[21/201] \mb{21/201} \begin{gl} \item[360] {\rm Sq(0,1)[362]} \item[361] {\rm Sq(1)[370] + Sq(1)[369]} \\ $h_{0}:$ [370], [369] \item[362] {\rm Sq(1)[373] + Sq(1)[371]} \\ $h_{0}:$ [373], [371] \\ $h_{3}:$ [337] \\ $h_{4}:$ [308], [306], [304] \\ $h_{6}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[20/201] \mb{20/201} \begin{gl} \item[369] {\rm Sq(0,1)[378] + Sq(0,1)[377] + Sq(0,1)[375]} \\ $h_{7}:$ [23] \item[370] {\rm Sq(0,1)[379] + Sq(0,1)[377] + Sq(0,1)[375]} \\ $h_{7}:$ [23] \item[371] {\rm Sq(3)[379] + Sq(3)[378] + Sq(3)[376]} \item[372] {\rm Sq(1)[384]} \\ $h_{0}:$ [384] \item[373] {\rm Sq(1)[385]} \\ $h_{0}:$ [385] \\ $h_{4}:$ [316], [314], [312] \end{gl} \end{bdl} \begin{bdl} \item[19/201] \mb{19/201} \begin{gl} \item[384] {\rm Sq(1)[400]} \\ $h_{0}:$ [400] \item[385] {\rm Sq(1)[403] + Sq(1)[401]} \\ $h_{0}:$ [403], [401] \\ $h_{4}:$ [324], [322], [321] \end{gl} \end{bdl} \begin{bdl} \item[18/201] \mb{18/201} \begin{gl} \item[400] {\rm Sq(1,1)[402]} \item[401] {\rm Sq(3)[406]} \\ $h_{4}:$ [325], [323] \item[402] {\rm Sq(2)[410]} \\ $h_{1}:$ [410] \\ $h_{4}:$ [323] \item[403] {\rm Sq(1)[418] + Sq(1)[416]} \\ $h_{0}:$ [418], [416] \\ $h_{4}:$ [325] \end{gl} \end{bdl} \begin{bdl} \item[17/201] \mb{17/201} \begin{gl} \item[415] {\rm Sq(3)[420] + Sq(0,1)[420] + Sq(0,1)[419]} \\ $h_{7}:$ [31] \item[416] {\rm Sq(3)[423] + Sq(0,1)[423] + Sq(0,1)[419]} \\ $h_{7}:$ [31] \item[417] {\rm Sq(1)[433] + Sq(1)[432] + Sq(1)[431]} \\ $h_{0}:$ [433], [432], [431] \\ $h_{1}:$ [426], [424] \\ $h_{2}:$ [412] \\ $h_{3}:$ [384], [382] \item[418] {\rm Sq(1)[436] + Sq(1)[435] + Sq(1)[434] + Sq(1)[432] + Sq(1)[431]} \\ $h_{0}:$ [436], [435], [434], [432], [431] \\ $h_{7}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[16/201] \mb{16/201} \begin{gl} \item[431] {\rm Sq(3)[431] + Sq(0,1)[431] + Sq(3)[428] + Sq(0,1)[428]} \\ $h_{3}:$ [386] \\ $h_{4}:$ [337] \item[432] {\rm Sq(3)[434] + Sq(0,1)[434] + Sq(0,1)[428]} \\ $h_{4}:$ [337] \item[433] {\rm Sq(1)[442] + Sq(1)[441]} \\ $h_{0}:$ [442], [441] \\ $h_{3}:$ [386] \item[434] {\rm Sq(1)[443]} \\ $h_{0}:$ [443] \\ $h_{1}:$ [437], [436], [435] \\ $h_{2}:$ [426], [424], [423] \\ $h_{3}:$ [393], [391], [389] \\ $h_{4}:$ [339], [338], [337] \\ $h_{7}:$ [33] \item[435] {\rm Sq(1)[444]} \\ $h_{0}:$ [444] \\ $h_{1}:$ [437], [436] \\ $h_{2}:$ [426], [424], [422], [420], [418] \\ $h_{3}:$ [393], [391], [389], [386] \\ $h_{4}:$ [339], [338] \item[436] {\rm Sq(1)[446]} \\ $h_{0}:$ [446] \\ $h_{1}:$ [435] \\ $h_{2}:$ [423], [422], [420], [418] \\ $h_{4}:$ [337] \\ $h_{7}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[15/201] \mb{15/201} \begin{gl} \item[441] {\rm Sq(3)[432] + Sq(0,1)[432] + Sq(3)[431] + Sq(3)[429]} \\ $h_{2}:$ [424], [423], [420] \\ $h_{7}:$ [35] \item[442] {\rm Sq(3)[435] + Sq(0,1)[435] + Sq(3)[434] + Sq(0,1)[434] + Sq(3)[431] + Sq(3)[430] + Sq(3)[429] + Sq(0,1)[429]} \\ $h_{2}:$ [424], [423], [420] \\ $h_{7}:$ [35] \item[443] {\rm Sq(1)[443]} \\ $h_{0}:$ [443] \\ $h_{2}:$ [424], [422], [421], [420] \\ $h_{3}:$ [397], [394], [392] \\ $h_{4}:$ [346], [344], [343], [341] \\ $h_{7}:$ [36] \item[444] {\rm Sq(1)[444] + Sq(1)[442]} \\ $h_{0}:$ [444], [442] \\ $h_{2}:$ [424], [422], [421], [419] \\ $h_{3}:$ [397], [394], [392] \\ $h_{4}:$ [346], [344], [343], [341] \item[445] {\rm Sq(1)[446] + Sq(1)[442]} \\ $h_{0}:$ [446], [442] \\ $h_{1}:$ [438], [436] \\ $h_{2}:$ [427], [424], [423] \\ $h_{3}:$ [396], [394], [393] \\ $h_{4}:$ [346], [344], [343], [341] \\ $h_{7}:$ [36], [35] \item[446] {\rm Sq(1)[447] + Sq(1)[445]} \\ $h_{0}:$ [447], [445] \\ $h_{2}:$ [420], [419] \\ $h_{7}:$ [36] \item[447] {\rm Sq(1)[448] + Sq(1)[442]} \\ $h_{0}:$ [448], [442] \\ $h_{1}:$ [440], [439], [438], [437] \\ $h_{2}:$ [427], [420] \\ $h_{3}:$ [396], [394], [393] \\ $h_{4}:$ [348], [347], [344], [341] \\ $h_{7}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[14/201] \mb{14/201} \begin{gl} \item[442] {\rm Sq(3)[419] + Sq(0,1)[419] + Sq(3)[418]} \\ $h_{3}:$ [385] \\ $h_{7}:$ [37] \item[443] {\rm Sq(0,1)[420] + Sq(3)[418] + Sq(0,1)[418]} \\ $h_{3}:$ [386] \\ $h_{7}:$ [37] \item[444] {\rm Sq(0,1)[421] + Sq(3)[420] + Sq(3)[418] + Sq(0,1)[418]} \\ $h_{3}:$ [386], [385] \\ $h_{7}:$ [37] \item[445] {\rm Sq(1)[429] + Sq(1)[428]} \\ $h_{0}:$ [429], [428] \\ $h_{2}:$ [412] \\ $h_{3}:$ [386] \item[446] {\rm Sq(1)[431]} \\ $h_{0}:$ [431] \\ $h_{2}:$ [412] \item[447] {\rm Sq(1)[432] + Sq(1)[430]} \\ $h_{0}:$ [432], [430] \\ $h_{2}:$ [412] \\ $h_{3}:$ [386] \\ $h_{7}:$ [37] \item[448] {\rm Sq(1)[433] + Sq(1)[430] + Sq(1)[428]} \\ $h_{0}:$ [433], [430], [428] \\ $h_{2}:$ [412] \\ $h_{4}:$ [341] \end{gl} \end{bdl} \begin{bdl} \item[13/201] \mb{13/201} \begin{gl} \item[428] {\rm Sq(1,1)[405] + Sq(1,1)[404] + Sq(1,1)[402]} \\ $h_{4}:$ [342] \item[429] {\rm Sq(1,1)[407] + Sq(1,1)[406] + Sq(1,1)[404] + Sq(1,1)[403]} \\ $h_{4}:$ [342] \item[430] {\rm Sq(0,1)[410]} \\ $h_{4}:$ [342] \item[431] {\rm Sq(3)[410]} \item[432] {\rm Sq(3)[411] + Sq(0,1)[411]} \\ $h_{4}:$ [342] \item[433] {\rm Sq(1)[420] + Sq(1)[419] + Sq(1)[418]} \\ $h_{0}:$ [420], [419], [418] \\ $h_{4}:$ [342] \item[434] {\rm Sq(1)[421] + Sq(1)[419]} \\ $h_{0}:$ [421], [419] \\ $h_{1}:$ [415], [413] \\ $h_{2}:$ [409], [408], [405], [404], [402] \\ $h_{4}:$ [343] \item[435] {\rm Sq(1)[422] + Sq(1)[419]} \\ $h_{0}:$ [422], [419] \\ $h_{1}:$ [415], [413] \\ $h_{2}:$ [409], [408], [404], [403] \\ $h_{3}:$ [384], [382] \\ $h_{4}:$ [344], [342] \\ $h_{5}:$ [301], [299], [298] \\ $h_{6}:$ [178], [177] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[12/201] \mb{12/201} \begin{gl} \item[418] {\rm Sq(0,1)[397] + Sq(0,1)[396] + Sq(0,1)[395]} \\ $h_{4}:$ [345] \item[419] {\rm Sq(1)[402] + Sq(1)[401]} \\ $h_{0}:$ [402], [401] \\ $h_{3}:$ [379], [376] \\ $h_{4}:$ [345] \item[420] {\rm Sq(1)[403] + Sq(1)[401]} \\ $h_{0}:$ [403], [401] \\ $h_{3}:$ [379], [376] \item[421] {\rm Sq(1)[405] + Sq(1)[401]} \\ $h_{0}:$ [405], [401] \\ $h_{2}:$ [393], [392] \\ $h_{3}:$ [379], [376] \\ $h_{4}:$ [346] \item[422] {\rm Sq(1)[407]} \\ $h_{0}:$ [407] \\ $h_{2}:$ [393], [392] \\ $h_{3}:$ [379], [377] \\ $h_{4}:$ [347] \\ $h_{7}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[11/201] \mb{11/201} \begin{gl} \item[401] {\rm Sq(6)[364] + Sq(3,1)[364] + Sq(0,2)[364] + Sq(6)[363] + Sq(3,1)[363] + Sq(0,2)[363]} \\ $h_{3}:$ [356], [355], [354] \\ $h_{6}:$ [188], [187] \item[402] {\rm Sq(3,1)[367] + Sq(3,1)[363] + Sq(3,1)[362]} \\ $h_{3}:$ [357], [356], [355], [353] \\ $h_{6}:$ [188], [187] \item[403] {\rm Sq(2,1)[368]} \\ $h_{3}:$ [357], [356], [355], [353] \\ $h_{6}:$ [188], [187] \item[404] {\rm Sq(1,1)[369]} \\ $h_{3}:$ [357], [354], [353] \item[405] {\rm Sq(3)[371] + Sq(0,1)[371]} \\ $h_{3}:$ [357], [356], [355], [353] \\ $h_{6}:$ [188], [187] \item[406] {\rm Sq(2)[376]} \\ $h_{1}:$ [376] \\ $h_{3}:$ [357], [356], [355], [353] \\ $h_{6}:$ [188], [187] \item[407] {\rm Sq(1)[378]} \\ $h_{0}:$ [378] \\ $h_{3}:$ [357], [355] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[10/201] \mb{10/201} \begin{gl} \item[378] {\rm Sq(1)[343]} \\ $h_{0}:$ [343] \\ $h_{7}:$ [48] \end{gl} \end{bdl} \begin{bdl} \item[9/201] \mb{9/201} \begin{gl} \item[342] {\rm Sq(3,1)[289]} \\ $h_{3}:$ [283], [282] \item[343] {\rm Sq(1,1)[296]} \\ $h_{7}:$ [51] \item[344] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{1}:$ [297] \end{gl} \end{bdl} \begin{bdl} \item[8/201] \mb{8/201} \begin{gl} \item[300] {\rm Sq(1)[256] + Sq(1)[255]} \\ $h_{0}:$ [256], [255] \end{gl} \end{bdl} \begin{bdl} \item[7/201] \mb{7/201} \begin{gl} \item[255] {\rm Sq(3,1)[203]} \\ $h_{3}:$ [200], [198] \\ $h_{7}:$ [50] \item[256] {\rm Sq(2,1)[205]} \\ $h_{3}:$ [200], [198] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \dm{202} \begin{bdl} \item[97/202] \mb{97/202} \begin{gl} \item[7] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{1}:$ [5] \\ $h_{2}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[96/202] \mb{96/202} \begin{gl} \item[6] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[95/202] \mb{95/202} \begin{gl} \item[6] {\rm Sq(1,1)[8]} \end{gl} \end{bdl} \begin{bdl} \item[94/202] \mb{94/202} \begin{gl} \item[9] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [10] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[93/202] \mb{93/202} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[92/202] \mb{92/202} \begin{gl} \item[11] {\rm Sq(0,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[89/202] \mb{89/202} \begin{gl} \item[19] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[86/202] \mb{86/202} \begin{gl} \item[18] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[83/202] \mb{83/202} \begin{gl} \item[23] {\rm Sq(0,1)[24]} \end{gl} \end{bdl} \begin{bdl} \item[80/202] \mb{80/202} \begin{gl} \item[31] {\rm Sq(0,1)[31]} \end{gl} \end{bdl} \begin{bdl} \item[79/202] \mb{79/202} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [34] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[78/202] \mb{78/202} \begin{gl} \item[36] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [33] \item[37] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35], [33] \end{gl} \end{bdl} \begin{bdl} \item[77/202] \mb{77/202} \begin{gl} \item[37] {\rm Sq(0,1)[36]} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[76/202] \mb{76/202} \begin{gl} \item[38] {\rm Sq(1,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[75/202] \mb{75/202} \begin{gl} \item[45] {\rm Sq(1)[53] + Sq(1)[51]} \\ $h_{0}:$ [53], [51] \\ $h_{1}:$ [50] \\ $h_{2}:$ [46] \\ $h_{3}:$ [40] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[74/202] \mb{74/202} \begin{gl} \item[51] {\rm Sq(0,1)[51]} \item[52] {\rm Sq(0,1)[52]} \item[53] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [43], [42] \end{gl} \end{bdl} \begin{bdl} \item[73/202] \mb{73/202} \begin{gl} \item[53] {\rm Sq(0,1)[49]} \item[54] {\rm Sq(1)[52]} \\ $h_{0}:$ [52] \\ $h_{3}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[72/202] \mb{72/202} \begin{gl} \item[52] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[71/202] \mb{71/202} \begin{gl} \item[52] {\rm Sq(0,1)[54]} \item[53] {\rm Sq(0,1)[55]} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[70/202] \mb{70/202} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \item[57] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[69/202] \mb{69/202} \begin{gl} \item[60] {\rm Sq(1)[61]} \\ $h_{0}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[68/202] \mb{68/202} \begin{gl} \item[61] {\rm Sq(2,1)[61]} \item[62] {\rm Sq(0,1)[64]} \item[63] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[67/202] \mb{67/202} \begin{gl} \item[68] {\rm Sq(0,1)[72]} \end{gl} \end{bdl} \begin{bdl} \item[65/202] \mb{65/202} \begin{gl} \item[79] {\rm Sq(0,1)[77]} \item[80] {\rm Sq(0,1)[78]} \end{gl} \end{bdl} \begin{bdl} \item[64/202] \mb{64/202} \begin{gl} \item[81] {\rm Sq(0,1)[82]} \end{gl} \end{bdl} \begin{bdl} \item[63/202] \mb{63/202} \begin{gl} \item[87] {\rm Sq(3)[89] + Sq(0,1)[89]} \item[88] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{1}:$ [90] \\ $h_{2}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[62/202] \mb{62/202} \begin{gl} \item[92] {\rm Sq(0,1)[92]} \item[93] {\rm Sq(0,1)[93]} \item[94] {\rm Sq(0,1)[94]} \item[95] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[61/202] \mb{61/202} \begin{gl} \item[98] {\rm Sq(0,1)[99]} \item[99] {\rm Sq(0,1)[100]} \end{gl} \end{bdl} \begin{bdl} \item[60/202] \mb{60/202} \begin{gl} \item[106] {\rm Sq(1)[118]} \\ $h_{0}:$ [118] \\ $h_{2}:$ [109] \\ $h_{3}:$ [95] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[59/202] \mb{59/202} \begin{gl} \item[115] {\rm Sq(0,1)[114]} \item[116] {\rm Sq(0,1)[115]} \item[117] {\rm Sq(0,1)[116]} \item[118] {\rm Sq(1)[124]} \\ $h_{0}:$ [124] \\ $h_{2}:$ [111] \\ $h_{3}:$ [100] \\ $h_{4}:$ [76] \end{gl} \end{bdl} \begin{bdl} \item[58/202] \mb{58/202} \begin{gl} \item[120] {\rm Sq(0,1)[113]} \item[121] {\rm Sq(0,1)[114]} \item[122] {\rm Sq(0,1)[115]} \item[123] {\rm Sq(2)[120]} \\ $h_{1}:$ [120] \item[124] {\rm Sq(1)[122]} \\ $h_{0}:$ [122] \\ $h_{3}:$ [102] \end{gl} \end{bdl} \begin{bdl} \item[57/202] \mb{57/202} \begin{gl} \item[122] {\rm Sq(1)[125]} \\ $h_{0}:$ [125] \\ $h_{3}:$ [101] \end{gl} \end{bdl} \begin{bdl} \item[56/202] \mb{56/202} \begin{gl} \item[122] {\rm Sq(0,1)[124]} \item[123] {\rm Sq(0,1)[125]} \item[124] {\rm Sq(0,1)[126]} \item[125] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[55/202] \mb{55/202} \begin{gl} \item[128] {\rm Sq(0,1)[129]} \item[129] {\rm Sq(0,1)[130]} \item[130] {\rm Sq(0,1)[131]} \item[131] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[54/202] \mb{54/202} \begin{gl} \item[135] {\rm Sq(0,1)[133]} \item[136] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[53/202] \mb{53/202} \begin{gl} \item[137] {\rm Sq(0,1)[139]} \item[138] {\rm Sq(0,1)[140]} \item[139] {\rm Sq(0,1)[141]} \item[140] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[52/202] \mb{52/202} \begin{gl} \item[144] {\rm Sq(0,1)[153]} \item[145] {\rm Sq(0,1)[154]} \item[146] {\rm Sq(0,1)[155]} \item[147] {\rm Sq(3)[156]} \end{gl} \end{bdl} \begin{bdl} \item[51/202] \mb{51/202} \begin{gl} \item[160] {\rm Sq(0,1)[165]} \end{gl} \end{bdl} \begin{bdl} \item[50/202] \mb{50/202} \begin{gl} \item[170] {\rm Sq(0,1)[167]} \item[171] {\rm Sq(0,1)[168]} \item[172] {\rm Sq(0,1)[169]} \item[173] {\rm Sq(3)[170] + Sq(0,1)[170]} \end{gl} \end{bdl} \begin{bdl} \item[49/202] \mb{49/202} \begin{gl} \item[173] {\rm Sq(0,1)[170]} \item[174] {\rm Sq(0,1)[171]} \item[175] {\rm Sq(0,1)[172]} \end{gl} \end{bdl} \begin{bdl} \item[48/202] \mb{48/202} \begin{gl} \item[178] {\rm Sq(0,1)[179]} \end{gl} \end{bdl} \begin{bdl} \item[47/202] \mb{47/202} \begin{gl} \item[185] {\rm Sq(0,1)[187]} \item[186] {\rm Sq(0,1)[188]} \item[187] {\rm Sq(0,1)[189]} \item[188] {\rm Sq(0,1)[190]} \item[189] {\rm Sq(3)[192] + Sq(0,1)[192]} \end{gl} \end{bdl} \begin{bdl} \item[46/202] \mb{46/202} \begin{gl} \item[196] {\rm Sq(0,1)[196]} \item[197] {\rm Sq(0,1)[197]} \item[198] {\rm Sq(0,1)[198]} \item[199] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{2}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[45/202] \mb{45/202} \begin{gl} \item[208] {\rm Sq(0,1)[205]} \item[209] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{2}:$ [197] \item[210] {\rm Sq(1)[219]} \\ $h_{0}:$ [219] \\ $h_{1}:$ [209], [208] \\ $h_{2}:$ [203], [202], [197] \\ $h_{4}:$ [147] \item[211] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{1}:$ [209] \\ $h_{2}:$ [203], [197] \\ $h_{3}:$ [183], [178] \\ $h_{4}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[44/202] \mb{44/202} \begin{gl} \item[214] {\rm Sq(1,1)[214] + Sq(1,1)[211]} \item[215] {\rm Sq(0,1)[215]} \item[216] {\rm Sq(0,1)[216]} \item[217] {\rm Sq(0,1)[217]} \item[218] {\rm Sq(0,1)[218]} \item[219] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{2}:$ [211], [210] \\ $h_{4}:$ [157] \item[220] {\rm Sq(1)[230]} \\ $h_{0}:$ [230] \\ $h_{2}:$ [211] \\ $h_{3}:$ [194] \\ $h_{4}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[43/202] \mb{43/202} \begin{gl} \item[225] {\rm Sq(0,1)[225]} \item[226] {\rm Sq(0,1)[226]} \item[227] {\rm Sq(0,1)[227]} \item[228] {\rm Sq(0,1)[228]} \item[229] {\rm Sq(3)[229] + Sq(3)[228] + Sq(3)[225] + Sq(3)[224]} \item[230] {\rm Sq(1)[241] + Sq(1)[239]} \\ $h_{0}:$ [241], [239] \\ $h_{3}:$ [206] \item[231] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{1}:$ [234], [233], [231] \\ $h_{2}:$ [222] \\ $h_{3}:$ [207], [206] \end{gl} \end{bdl} \begin{bdl} \item[42/202] \mb{42/202} \begin{gl} \item[238] {\rm Sq(0,1)[236]} \item[239] {\rm Sq(0,1)[237]} \item[240] {\rm Sq(2)[241] + Sq(2)[240]} \\ $h_{1}:$ [241], [240] \item[241] {\rm Sq(1)[250]} \\ $h_{0}:$ [250] \\ $h_{3}:$ [211] \item[242] {\rm Sq(1)[251]} \\ $h_{0}:$ [251] \\ $h_{3}:$ [215], [214], [211] \end{gl} \end{bdl} \begin{bdl} \item[41/202] \mb{41/202} \begin{gl} \item[245] {\rm Sq(0,1)[240]} \item[246] {\rm Sq(0,1)[241]} \item[247] {\rm Sq(0,1)[242]} \item[248] {\rm Sq(0,1)[243]} \item[249] {\rm Sq(0,1)[244]} \item[250] {\rm Sq(1)[252]} \\ $h_{0}:$ [252] \item[251] {\rm Sq(1)[253]} \\ $h_{0}:$ [253] \\ $h_{3}:$ [216], [214] \end{gl} \end{bdl} \begin{bdl} \item[40/202] \mb{40/202} \begin{gl} \item[247] {\rm Sq(0,1)[243]} \item[248] {\rm Sq(0,1)[244]} \item[249] {\rm Sq(0,1)[245]} \item[250] {\rm Sq(0,1)[246]} \item[251] {\rm Sq(0,1)[247]} \item[252] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \item[253] {\rm Sq(1)[257]} \\ $h_{0}:$ [257] \\ $h_{3}:$ [224], [223], [220] \end{gl} \end{bdl} \begin{bdl} \item[39/202] \mb{39/202} \begin{gl} \item[253] {\rm Sq(0,1)[254]} \item[254] {\rm Sq(0,1)[255]} \item[255] {\rm Sq(3)[255] + Sq(3)[254]} \item[256] {\rm Sq(0,1)[256]} \item[257] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \end{gl} \end{bdl} \begin{bdl} \item[38/202] \mb{38/202} \begin{gl} \item[261] {\rm Sq(0,1)[266]} \item[262] {\rm Sq(0,1)[267]} \item[263] {\rm Sq(0,1)[268]} \item[264] {\rm Sq(0,1)[269]} \item[265] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[37/202] \mb{37/202} \begin{gl} \item[274] {\rm Sq(0,1)[274]} \item[275] {\rm Sq(0,1)[275]} \item[276] {\rm Sq(0,1)[276]} \item[277] {\rm Sq(0,1)[277]} \item[278] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[36/202] \mb{36/202} \begin{gl} \item[283] {\rm Sq(2,1)[277]} \item[284] {\rm Sq(2,1)[278]} \item[285] {\rm Sq(1,1)[282] + Sq(1,1)[281] + Sq(1,1)[280]} \item[286] {\rm Sq(0,1)[283]} \item[287] {\rm Sq(0,1)[284]} \end{gl} \end{bdl} \begin{bdl} \item[35/202] \mb{35/202} \begin{gl} \item[291] {\rm Sq(0,1)[293]} \item[292] {\rm Sq(0,1)[294] + Sq(0,1)[292]} \end{gl} \end{bdl} \begin{bdl} \item[34/202] \mb{34/202} \begin{gl} \item[301] {\rm Sq(1,1)[296]} \item[302] {\rm Sq(0,1)[298]} \item[303] {\rm Sq(0,1)[299]} \item[304] {\rm Sq(0,1)[300]} \item[305] {\rm Sq(2)[305] + Sq(2)[303]} \\ $h_{1}:$ [305], [303] \end{gl} \end{bdl} \begin{bdl} \item[33/202] \mb{33/202} \begin{gl} \item[310] {\rm Sq(1,1)[299] + Sq(1,1)[297]} \item[311] {\rm Sq(0,1)[301] + Sq(0,1)[300]} \end{gl} \end{bdl} \begin{bdl} \item[32/202] \mb{32/202} \begin{gl} \item[310] {\rm Sq(1,1)[300] + Sq(1,1)[299] + Sq(1,1)[297] + Sq(1,1)[293]} \item[311] {\rm Sq(0,1)[302] + Sq(0,1)[301]} \item[312] {\rm Sq(0,1)[303] + Sq(0,1)[301]} \item[313] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{1}:$ [307] \end{gl} \end{bdl} \begin{bdl} \item[31/202] \mb{31/202} \begin{gl} \item[309] {\rm Sq(1,1)[302]} \item[310] {\rm Sq(1,1)[305] + Sq(1,1)[304]} \item[311] {\rm Sq(0,1)[306]} \item[312] {\rm Sq(0,1)[307]} \item[313] {\rm Sq(3)[311] + Sq(0,1)[311] + Sq(3)[309] + Sq(3)[308]} \item[314] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \end{gl} \end{bdl} \begin{bdl} \item[30/202] \mb{30/202} \begin{gl} \item[316] {\rm Sq(1,1)[313] + Sq(1,1)[311]} \item[317] {\rm Sq(0,1)[315]} \item[318] {\rm Sq(1)[326] + Sq(1)[325]} \\ $h_{0}:$ [326], [325] \\ $h_{1}:$ [322], [321], [320], [319] \\ $h_{2}:$ [313] \\ $h_{4}:$ [257], [255] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[29/202] \mb{29/202} \begin{gl} \item[324] {\rm Sq(0,1)[316] + Sq(3)[315]} \item[325] {\rm Sq(1)[327] + Sq(1)[325]} \\ $h_{0}:$ [327], [325] \\ $h_{1}:$ [323] \item[326] {\rm Sq(1)[328]} \\ $h_{0}:$ [328] \\ $h_{1}:$ [323] \\ $h_{2}:$ [311], [310] \\ $h_{7}:$ [12] \item[327] {\rm Sq(1)[330] + Sq(1)[326]} \\ $h_{0}:$ [330], [326] \\ $h_{1}:$ [322] \\ $h_{2}:$ [314] \\ $h_{3}:$ [298] \\ $h_{7}:$ [12] \end{gl} \end{bdl} \begin{bdl} \item[28/202] \mb{28/202} \begin{gl} \item[325] {\rm Sq(2,1)[312]} \item[326] {\rm Sq(5)[314] + Sq(2,1)[314] + Sq(5)[313] + Sq(2,1)[313]} \\ $h_{3}:$ [297] \item[327] {\rm Sq(0,1)[319] + Sq(3)[318] + Sq(0,1)[318]} \item[328] {\rm Sq(0,1)[320] + Sq(3)[319] + Sq(3)[318] + Sq(0,1)[318]} \\ $h_{7}:$ [11] \item[329] {\rm Sq(3)[321] + Sq(0,1)[321] + Sq(3)[320]} \\ $h_{7}:$ [11] \item[330] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \\ $h_{2}:$ [315] \\ $h_{3}:$ [300], [299], [297] \\ $h_{7}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[27/202] \mb{27/202} \begin{gl} \item[327] {\rm Sq(5)[319] + Sq(2,1)[319]} \item[328] {\rm Sq(3)[326] + Sq(0,1)[326] + Sq(3)[325]} \item[329] {\rm Sq(1)[337] + Sq(1)[334] + Sq(1)[333]} \\ $h_{0}:$ [337], [334], [333] \\ $h_{3}:$ [304] \end{gl} \end{bdl} \begin{bdl} \item[26/202] \mb{26/202} \begin{gl} \item[333] {\rm Sq(1,1)[325] + Sq(1,1)[324]} \item[334] {\rm Sq(3)[328] + Sq(3)[327] + Sq(0,1)[327]} \item[335] {\rm Sq(3)[329] + Sq(0,1)[329] + Sq(0,1)[327]} \\ $h_{3}:$ [308] \item[336] {\rm Sq(2)[330]} \\ $h_{1}:$ [330] \item[337] {\rm Sq(1)[337] + Sq(1)[334]} \\ $h_{0}:$ [337], [334] \end{gl} \end{bdl} \begin{bdl} \item[25/202] \mb{25/202} \begin{gl} \item[333] {\rm Sq(1,1)[325]} \item[334] {\rm Sq(1,1)[327]} \item[335] {\rm Sq(0,1)[328]} \item[336] {\rm Sq(3)[330] + Sq(0,1)[330] + Sq(0,1)[329]} \\ $h_{7}:$ [19] \item[337] {\rm Sq(1)[334]} \\ $h_{0}:$ [334] \item[338] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \\ $h_{3}:$ [309] \\ $h_{4}:$ [277], [276] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[24/202] \mb{24/202} \begin{gl} \item[334] {\rm Sq(2,1)[322]} \item[335] {\rm Sq(1,1)[328]} \\ $h_{3}:$ [310] \end{gl} \end{bdl} \begin{bdl} \item[23/202] \mb{23/202} \begin{gl} \item[337] {\rm Sq(3,1)[339] + Sq(3,1)[335] + Sq(0,2)[334]} \item[338] {\rm Sq(1,1)[341]} \item[339] {\rm Sq(3)[347] + Sq(3)[346] + Sq(0,1)[345] + Sq(3)[344]} \item[340] {\rm Sq(1)[355] + Sq(1)[351]} \\ $h_{0}:$ [355], [351] \\ $h_{1}:$ [348] \\ $h_{3}:$ [328] \\ $h_{4}:$ [303], [300] \\ $h_{5}:$ [232] \\ $h_{6}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[22/202] \mb{22/202} \begin{gl} \item[351] {\rm Sq(1,1)[356] + Sq(1,1)[355] + Sq(1,1)[354]} \item[352] {\rm Sq(0,1)[358]} \\ $h_{7}:$ [23] \item[353] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \item[354] {\rm Sq(1)[364]} \\ $h_{0}:$ [364] \item[355] {\rm Sq(1)[367] + Sq(1)[366]} \\ $h_{0}:$ [367], [366] \\ $h_{3}:$ [338] \\ $h_{4}:$ [309] \\ $h_{5}:$ [237] \\ $h_{6}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[21/202] \mb{21/202} \begin{gl} \item[363] {\rm Sq(5)[359]} \item[364] {\rm Sq(1,1)[364]} \item[365] {\rm Sq(0,1)[365]} \item[366] {\rm Sq(1)[375] + Sq(1)[374]} \\ $h_{0}:$ [375], [374] \\ $h_{2}:$ [364], [363] \\ $h_{7}:$ [24] \item[367] {\rm Sq(1)[376]} \\ $h_{0}:$ [376] \\ $h_{2}:$ [364], [363] \\ $h_{3}:$ [344], [342] \\ $h_{4}:$ [312], [311] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[20/202] \mb{20/202} \begin{gl} \item[374] {\rm Sq(1)[387]} \\ $h_{0}:$ [387] \item[375] {\rm Sq(1)[389] + Sq(1)[386]} \\ $h_{0}:$ [389], [386] \\ $h_{2}:$ [379], [378], [376] \\ $h_{7}:$ [24] \item[376] {\rm Sq(1)[394]} \\ $h_{0}:$ [394] \\ $h_{2}:$ [379], [378], [376] \\ $h_{3}:$ [358] \\ $h_{4}:$ [324], [320] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[19/202] \mb{19/202} \begin{gl} \item[386] {\rm Sq(1,1)[393]} \item[387] {\rm Sq(1,1)[394]} \item[388] {\rm Sq(0,1)[395]} \item[389] {\rm Sq(0,1)[396]} \\ $h_{7}:$ [26] \item[390] {\rm Sq(3)[396]} \\ $h_{7}:$ [26] \item[391] {\rm Sq(0,1)[397]} \\ $h_{7}:$ [27] \item[392] {\rm Sq(2)[400]} \\ $h_{1}:$ [400] \\ $h_{7}:$ [27] \item[393] {\rm Sq(1)[404]} \\ $h_{0}:$ [404] \\ $h_{1}:$ [402] \\ $h_{2}:$ [394], [393] \\ $h_{3}:$ [376], [375], [374] \\ $h_{4}:$ [330], [328] \\ $h_{7}:$ [27], [26] \item[394] {\rm Sq(1)[406] + Sq(1)[405]} \\ $h_{0}:$ [406], [405] \\ $h_{4}:$ [332] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[18/202] \mb{18/202} \begin{gl} \item[404] {\rm Sq(1,1)[409]} \item[405] {\rm Sq(1)[419]} \\ $h_{0}:$ [419] \\ $h_{3}:$ [386], [383] \\ $h_{4}:$ [330], [329], [328] \\ $h_{5}:$ [255] \\ $h_{6}:$ [155] \item[406] {\rm Sq(1)[421]} \\ $h_{0}:$ [421] \\ $h_{3}:$ [386], [383] \\ $h_{4}:$ [330], [328] \\ $h_{5}:$ [255] \\ $h_{6}:$ [155] \end{gl} \end{bdl} \begin{bdl} \item[17/202] \mb{17/202} \begin{gl} \item[419] {\rm Sq(3)[424] + Sq(0,1)[424]} \\ $h_{3}:$ [391], [390] \\ $h_{5}:$ [260], [259] \\ $h_{6}:$ [160] \item[420] {\rm Sq(2)[432]} \\ $h_{1}:$ [432] \\ $h_{3}:$ [390] \\ $h_{4}:$ [338], [337], [335], [334], [330] \item[421] {\rm Sq(1)[437]} \\ $h_{0}:$ [437] \\ $h_{3}:$ [391], [390] \\ $h_{5}:$ [260], [259] \\ $h_{6}:$ [160] \item[422] {\rm Sq(1)[440]} \\ $h_{0}:$ [440] \\ $h_{2}:$ [423], [420] \\ $h_{3}:$ [395], [392], [390] \\ $h_{4}:$ [335], [334], [333], [332], [331], [330] \\ $h_{5}:$ [260], [259] \\ $h_{6}:$ [160] \end{gl} \end{bdl} \begin{bdl} \item[16/202] \mb{16/202} \begin{gl} \item[437] {\rm Sq(3)[437] + Sq(3)[436] + Sq(3)[435]} \item[438] {\rm Sq(3)[439] + Sq(0,1)[439] + Sq(3)[438] + Sq(0,1)[438] + Sq(3)[436] + Sq(0,1)[436] + Sq(3)[435]} \\ $h_{2}:$ [431], [430], [429] \\ $h_{3}:$ [399], [396], [394] \item[439] {\rm Sq(3)[440] + Sq(0,1)[440] + Sq(3)[438] + Sq(0,1)[438] + Sq(3)[436] + Sq(0,1)[436]} \\ $h_{2}:$ [431], [430], [429] \\ $h_{3}:$ [399], [396], [394] \\ $h_{7}:$ [34] \item[440] {\rm Sq(1)[449] + Sq(1)[448]} \\ $h_{0}:$ [449], [448] \\ $h_{2}:$ [431] \\ $h_{3}:$ [399], [396], [394] \end{gl} \end{bdl} \begin{bdl} \item[15/202] \mb{15/202} \begin{gl} \item[448] {\rm Sq(3)[437] + Sq(0,1)[436]} \\ $h_{3}:$ [398] \\ $h_{4}:$ [349] \item[449] {\rm Sq(3)[440] + Sq(3)[439] + Sq(3)[438] + Sq(0,1)[438] + Sq(3)[436] + Sq(0,1)[436]} \\ $h_{3}:$ [398] \\ $h_{4}:$ [349] \item[450] {\rm Sq(1)[451]} \\ $h_{0}:$ [451] \\ $h_{1}:$ [444], [443] \\ $h_{2}:$ [435], [429] \\ $h_{3}:$ [402] \\ $h_{4}:$ [352], [351], [350], [349] \item[451] {\rm Sq(1)[453]} \\ $h_{0}:$ [453] \\ $h_{1}:$ [444], [443] \\ $h_{2}:$ [434] \\ $h_{3}:$ [402] \\ $h_{4}:$ [354], [351], [350] \item[452] {\rm Sq(1)[454]} \\ $h_{0}:$ [454] \\ $h_{1}:$ [444], [443] \\ $h_{2}:$ [434] \\ $h_{3}:$ [402] \\ $h_{4}:$ [351], [350] \end{gl} \end{bdl} \begin{bdl} \item[14/202] \mb{14/202} \begin{gl} \item[449] {\rm Sq(2)[431] + Sq(2)[430] + Sq(2)[428]} \\ $h_{1}:$ [431], [430], [428] \\ $h_{2}:$ [421] \\ $h_{3}:$ [391] \\ $h_{4}:$ [347], [346], [345], [344] \item[450] {\rm Sq(2)[432] + Sq(2)[429]} \\ $h_{1}:$ [432], [429] \\ $h_{4}:$ [348], [345] \item[451] {\rm Sq(1)[436]} \\ $h_{0}:$ [436] \\ $h_{2}:$ [421] \\ $h_{3}:$ [396], [394] \\ $h_{4}:$ [347], [346], [345], [344] \item[452] {\rm Sq(1)[438] + Sq(1)[437]} \\ $h_{0}:$ [438], [437] \\ $h_{1}:$ [430], [428] \\ $h_{2}:$ [421], [418] \\ $h_{3}:$ [396], [393], [392], [391] \\ $h_{4}:$ [348], [345], [344] \item[453] {\rm Sq(1)[439]} \\ $h_{0}:$ [439] \\ $h_{2}:$ [420] \\ $h_{3}:$ [396], [394] \\ $h_{4}:$ [349], [346], [345], [344] \item[454] {\rm Sq(1)[440] + Sq(1)[437]} \\ $h_{0}:$ [440], [437] \\ $h_{2}:$ [420] \\ $h_{3}:$ [396], [394] \\ $h_{4}:$ [346], [345], [344] \end{gl} \end{bdl} \begin{bdl} \item[13/202] \mb{13/202} \begin{gl} \item[436] {\rm Sq(3)[416] + Sq(0,1)[416] + Sq(3)[415] + Sq(0,1)[415] + Sq(3)[414] + Sq(0,1)[414] + Sq(3)[413]} \\ $h_{3}:$ [389], [387] \item[437] {\rm Sq(3)[417] + Sq(0,1)[417] + Sq(0,1)[415] + Sq(3)[413] + Sq(0,1)[413]} \\ $h_{3}:$ [389], [387] \item[438] {\rm Sq(1)[425] + Sq(1)[424]} \\ $h_{0}:$ [425], [424] \\ $h_{3}:$ [387] \item[439] {\rm Sq(1)[428]} \\ $h_{0}:$ [428] \\ $h_{3}:$ [389], [387] \\ $h_{4}:$ [346] \item[440] {\rm Sq(1)[429]} \\ $h_{0}:$ [429] \end{gl} \end{bdl} \begin{bdl} \item[12/202] \mb{12/202} \begin{gl} \item[423] {\rm Sq(1,1)[395]} \item[424] {\rm Sq(1,1)[399] + Sq(1,1)[398] + Sq(1,1)[396]} \\ $h_{4}:$ [349], [348] \item[425] {\rm Sq(3)[400] + Sq(0,1)[400]} \\ $h_{4}:$ [349], [348] \item[426] {\rm Sq(2)[403] + Sq(2)[402]} \\ $h_{1}:$ [403], [402] \\ $h_{4}:$ [349] \item[427] {\rm Sq(2)[406] + Sq(2)[402]} \\ $h_{1}:$ [406], [402] \item[428] {\rm Sq(1)[408]} \\ $h_{0}:$ [408] \\ $h_{4}:$ [348] \item[429] {\rm Sq(1)[409]} \\ $h_{0}:$ [409] \item[430] {\rm Sq(1)[410]} \\ $h_{0}:$ [410] \\ $h_{2}:$ [398], [397], [396] \\ $h_{3}:$ [384], [383] \\ $h_{4}:$ [349], [348] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[11/202] \mb{11/202} \begin{gl} \item[408] {\rm Sq(1)[380]} \\ $h_{0}:$ [380] \item[409] {\rm Sq(1)[381]} \\ $h_{0}:$ [381] \item[410] {\rm Sq(1)[382]} \\ $h_{0}:$ [382] \\ $h_{3}:$ [360], [359] \\ $h_{7}:$ [45] \item[411] {\rm Sq(1)[384]} \\ $h_{0}:$ [384] \\ $h_{2}:$ [371] \\ $h_{3}:$ [360] \\ $h_{7}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[10/202] \mb{10/202} \begin{gl} \item[379] {\rm Sq(7)[332] + Sq(4,1)[332]} \\ $h_{3}:$ [326] \item[380] {\rm Sq(3,1)[336] + Sq(3,1)[334] + Sq(3,1)[333]} \item[381] {\rm Sq(1,1)[337]} \item[382] {\rm Sq(1,1)[339]} \\ $h_{3}:$ [326], [325] \\ $h_{7}:$ [49] \item[383] {\rm Sq(3)[340] + Sq(0,1)[340]} \\ $h_{3}:$ [326], [325], [324] \item[384] {\rm Sq(3)[341] + Sq(0,1)[341]} \\ $h_{3}:$ [326], [324] \\ $h_{7}:$ [49] \item[385] {\rm Sq(1)[346]} \\ $h_{0}:$ [346] \\ $h_{1}:$ [343] \\ $h_{3}:$ [329], [327], [325], [324] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \begin{bdl} \item[9/202] \mb{9/202} \begin{gl} \item[345] {\rm Sq(3)[299] + Sq(0,1)[299] + Sq(3)[298] + Sq(3)[297] + Sq(0,1)[297]} \\ $h_{4}:$ [265] \\ $h_{7}:$ [53] \item[346] {\rm Sq(1)[301]} \\ $h_{0}:$ [301] \\ $h_{3}:$ [285] \\ $h_{7}:$ [54], [53] \end{gl} \end{bdl} \begin{bdl} \item[8/202] \mb{8/202} \begin{gl} \item[301] {\rm Sq(7)[249] + Sq(4,1)[249] + Sq(1,2)[249] + Sq(0,0,1)[249] + Sq(4,1)[248] + Sq(0,0,1)[248]} \\ $h_{7}:$ [53] \item[302] {\rm Sq(2)[256] + Sq(2)[255]} \\ $h_{1}:$ [256], [255] \end{gl} \end{bdl} \begin{bdl} \item[7/202] \mb{7/202} \begin{gl} \item[257] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{3}:$ [201] \\ $h_{5}:$ [170] \\ $h_{6}:$ [117] \\ $h_{7}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[6/202] \mb{6/202} \begin{gl} \item[207] {\rm Sq(6)[146] + Sq(3,1)[146] + Sq(0,2)[146]} \\ $h_{3}:$ [143] \\ $h_{5}:$ [124] \\ $h_{6}:$ [90] \\ $h_{7}:$ [46] \end{gl} \end{bdl} \dm{203} \begin{bdl} \item[93/203] \mb{93/203} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [11] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[92/203] \mb{92/203} \begin{gl} \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[91/203] \mb{91/203} \begin{gl} \item[11] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[88/203] \mb{88/203} \begin{gl} \item[19] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[85/203] \mb{85/203} \begin{gl} \item[23] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[84/203] \mb{84/203} \begin{gl} \item[24] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{2}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[83/203] \mb{83/203} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{2}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[82/203] \mb{82/203} \begin{gl} \item[26] {\rm Sq(0,1)[28]} \item[27] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[79/203] \mb{79/203} \begin{gl} \item[34] {\rm Sq(0,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[77/203] \mb{77/203} \begin{gl} \item[40] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[76/203] \mb{76/203} \begin{gl} \item[39] {\rm Sq(1,1)[42]} \item[40] {\rm Sq(0,1)[43]} \end{gl} \end{bdl} \begin{bdl} \item[75/203] \mb{75/203} \begin{gl} \item[46] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{1}:$ [51] \\ $h_{2}:$ [49] \\ $h_{3}:$ [43], [41] \\ $h_{4}:$ [27], [26] \end{gl} \end{bdl} \begin{bdl} \item[74/203] \mb{74/203} \begin{gl} \item[54] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{2}:$ [51] \\ $h_{3}:$ [44] \\ $h_{4}:$ [30], [28] \end{gl} \end{bdl} \begin{bdl} \item[73/203] \mb{73/203} \begin{gl} \item[55] {\rm Sq(0,1)[50]} \item[56] {\rm Sq(0,1)[51]} \item[57] {\rm Sq(1)[54]} \\ $h_{0}:$ [54] \\ $h_{3}:$ [42] \\ $h_{4}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[72/203] \mb{72/203} \begin{gl} \item[53] {\rm Sq(0,1)[51]} \item[54] {\rm Sq(1)[55]} \\ $h_{0}:$ [55] \\ $h_{3}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[71/203] \mb{71/203} \begin{gl} \item[55] {\rm Sq(1)[60]} \\ $h_{0}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[70/203] \mb{70/203} \begin{gl} \item[58] {\rm Sq(0,1)[58]} \item[59] {\rm Sq(0,1)[59]} \item[60] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[69/203] \mb{69/203} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \item[63] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[68/203] \mb{68/203} \begin{gl} \item[64] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \item[65] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[67/203] \mb{67/203} \begin{gl} \item[69] {\rm Sq(0,1)[73]} \item[70] {\rm Sq(0,1)[74]} \item[71] {\rm Sq(0,1)[75]} \item[72] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{2}:$ [71] \end{gl} \end{bdl} \begin{bdl} \item[66/203] \mb{66/203} \begin{gl} \item[76] {\rm Sq(1,1)[76]} \item[77] {\rm Sq(0,1)[77]} \end{gl} \end{bdl} \begin{bdl} \item[64/203] \mb{64/203} \begin{gl} \item[82] {\rm Sq(0,1)[83]} \item[83] {\rm Sq(0,1)[84]} \item[84] {\rm Sq(0,1)[85]} \item[85] {\rm Sq(2)[87]} \\ $h_{1}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[63/203] \mb{63/203} \begin{gl} \item[89] {\rm Sq(0,1)[91]} \end{gl} \end{bdl} \begin{bdl} \item[61/203] \mb{61/203} \begin{gl} \item[100] {\rm Sq(0,1)[102]} \item[101] {\rm Sq(0,1)[103]} \item[102] {\rm Sq(0,1)[104]} \end{gl} \end{bdl} \begin{bdl} \item[60/203] \mb{60/203} \begin{gl} \item[107] {\rm Sq(0,1)[112]} \item[108] {\rm Sq(0,1)[113]} \end{gl} \end{bdl} \begin{bdl} \item[59/203] \mb{59/203} \begin{gl} \item[119] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{1}:$ [123] \\ $h_{2}:$ [118] \\ $h_{3}:$ [105], [102], [101] \item[120] {\rm Sq(1)[129]} \\ $h_{0}:$ [129] \\ $h_{1}:$ [123], [122] \\ $h_{2}:$ [118], [117] \\ $h_{3}:$ [105], [104], [102], [101] \\ $h_{4}:$ [78] \end{gl} \end{bdl} \begin{bdl} \item[58/203] \mb{58/203} \begin{gl} \item[125] {\rm Sq(0,1)[117]} \item[126] {\rm Sq(0,1)[118]} \item[127] {\rm Sq(0,1)[119]} \item[128] {\rm Sq(1)[126]} \\ $h_{0}:$ [126] \\ $h_{2}:$ [116] \\ $h_{3}:$ [104] \item[129] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{2}:$ [116], [115] \\ $h_{3}:$ [104], [103] \end{gl} \end{bdl} \begin{bdl} \item[57/203] \mb{57/203} \begin{gl} \item[123] {\rm Sq(0,1)[118]} \item[124] {\rm Sq(0,1)[119]} \item[125] {\rm Sq(0,1)[120]} \item[126] {\rm Sq(1)[127]} \\ $h_{0}:$ [127] \\ $h_{2}:$ [117] \\ $h_{3}:$ [108] \item[127] {\rm Sq(1)[128]} \\ $h_{0}:$ [128] \\ $h_{2}:$ [117] \\ $h_{3}:$ [108], [107] \end{gl} \end{bdl} \begin{bdl} \item[56/203] \mb{56/203} \begin{gl} \item[126] {\rm Sq(0,1)[127]} \item[127] {\rm Sq(1)[135]} \\ $h_{0}:$ [135] \\ $h_{3}:$ [115] \item[128] {\rm Sq(1)[136]} \\ $h_{0}:$ [136] \\ $h_{3}:$ [115], [114] \end{gl} \end{bdl} \begin{bdl} \item[55/203] \mb{55/203} \begin{gl} \item[132] {\rm Sq(0,1)[132]} \item[133] {\rm Sq(0,1)[133]} \item[134] {\rm Sq(0,1)[134]} \item[135] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \item[136] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \end{gl} \end{bdl} \begin{bdl} \item[54/203] \mb{54/203} \begin{gl} \item[137] {\rm Sq(0,1)[134]} \item[138] {\rm Sq(0,1)[135]} \item[139] {\rm Sq(0,1)[136]} \item[140] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \item[141] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \end{gl} \end{bdl} \begin{bdl} \item[53/203] \mb{53/203} \begin{gl} \item[141] {\rm Sq(0,1)[142]} \item[142] {\rm Sq(3)[143]} \item[143] {\rm Sq(2)[147]} \\ $h_{1}:$ [147] \item[144] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[52/203] \mb{52/203} \begin{gl} \item[148] {\rm Sq(0,1)[157]} \item[149] {\rm Sq(0,1)[158]} \item[150] {\rm Sq(0,1)[159]} \item[151] {\rm Sq(1)[161]} \\ $h_{0}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[51/203] \mb{51/203} \begin{gl} \item[161] {\rm Sq(1,1)[166]} \item[162] {\rm Sq(0,1)[167]} \item[163] {\rm Sq(0,1)[168]} \item[164] {\rm Sq(0,1)[169]} \end{gl} \end{bdl} \begin{bdl} \item[50/203] \mb{50/203} \begin{gl} \item[174] {\rm Sq(0,1)[171]} \item[175] {\rm Sq(1)[180]} \\ $h_{0}:$ [180] \\ $h_{2}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[49/203] \mb{49/203} \begin{gl} \item[176] {\rm Sq(0,1)[173]} \item[177] {\rm Sq(0,1)[174]} \item[178] {\rm Sq(0,1)[175]} \item[179] {\rm Sq(0,1)[176]} \item[180] {\rm Sq(1)[182]} \\ $h_{0}:$ [182] \\ $h_{2}:$ [169] \end{gl} \end{bdl} \begin{bdl} \item[48/203] \mb{48/203} \begin{gl} \item[179] {\rm Sq(0,1)[180]} \item[180] {\rm Sq(0,1)[181]} \item[181] {\rm Sq(0,1)[182]} \item[182] {\rm Sq(3)[183]} \item[183] {\rm Sq(2)[189]} \\ $h_{1}:$ [189] \item[184] {\rm Sq(1)[191]} \\ $h_{0}:$ [191] \\ $h_{4}:$ [134] \end{gl} \end{bdl} \begin{bdl} \item[47/203] \mb{47/203} \begin{gl} \item[190] {\rm Sq(0,1)[193]} \item[191] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{4}:$ [142] \end{gl} \end{bdl} \begin{bdl} \item[46/203] \mb{46/203} \begin{gl} \item[200] {\rm Sq(0,1)[201]} \item[201] {\rm Sq(0,1)[202]} \item[202] {\rm Sq(0,1)[203]} \item[203] {\rm Sq(0,1)[204]} \item[204] {\rm Sq(1)[217]} \\ $h_{0}:$ [217] \\ $h_{4}:$ [145] \end{gl} \end{bdl} \begin{bdl} \item[45/203] \mb{45/203} \begin{gl} \item[212] {\rm Sq(0,1)[207]} \item[213] {\rm Sq(0,1)[208]} \item[214] {\rm Sq(0,1)[210]} \item[215] {\rm Sq(0,1)[211]} \item[216] {\rm Sq(1)[221]} \\ $h_{0}:$ [221] \\ $h_{1}:$ [214] \\ $h_{2}:$ [204] \item[217] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{4}:$ [150] \end{gl} \end{bdl} \begin{bdl} \item[44/203] \mb{44/203} \begin{gl} \item[221] {\rm Sq(1,1)[220]} \item[222] {\rm Sq(0,1)[221]} \item[223] {\rm Sq(1)[238] + Sq(1)[237] + Sq(1)[235]} \\ $h_{0}:$ [238], [237], [235] \\ $h_{4}:$ [166] \end{gl} \end{bdl} \begin{bdl} \item[43/203] \mb{43/203} \begin{gl} \item[232] {\rm Sq(0,1)[232] + Sq(0,1)[231]} \item[233] {\rm Sq(0,1)[233] + Sq(0,1)[231]} \item[234] {\rm Sq(0,1)[234] + Sq(0,1)[231]} \item[235] {\rm Sq(3)[237] + Sq(0,1)[237] + Sq(0,1)[235]} \item[236] {\rm Sq(1)[245] + Sq(1)[244]} \\ $h_{0}:$ [245], [244] \\ $h_{1}:$ [240] \\ $h_{2}:$ [224] \\ $h_{3}:$ [208] \item[237] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \\ $h_{1}:$ [239] \\ $h_{2}:$ [230] \\ $h_{3}:$ [211], [208] \item[238] {\rm Sq(1)[249]} \\ $h_{0}:$ [249] \\ $h_{1}:$ [239] \\ $h_{2}:$ [230] \\ $h_{3}:$ [211], [208] \\ $h_{4}:$ [175] \end{gl} \end{bdl} \begin{bdl} \item[42/203] \mb{42/203} \begin{gl} \item[243] {\rm Sq(0,1)[238]} \item[244] {\rm Sq(0,1)[240] + Sq(0,1)[239]} \item[245] {\rm Sq(3)[241] + Sq(3)[240] + Sq(0,1)[239]} \item[246] {\rm Sq(0,1)[242]} \item[247] {\rm Sq(0,1)[243]} \item[248] {\rm Sq(1)[254]} \\ $h_{0}:$ [254] \\ $h_{2}:$ [237] \\ $h_{3}:$ [221], [220] \item[249] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{2}:$ [237] \\ $h_{3}:$ [221], [220] \\ $h_{4}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[41/203] \mb{41/203} \begin{gl} \item[252] {\rm Sq(0,1)[245]} \item[253] {\rm Sq(0,1)[246]} \item[254] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{3}:$ [222], [217] \item[255] {\rm Sq(1)[260]} \\ $h_{0}:$ [260] \\ $h_{3}:$ [222], [217] \\ $h_{4}:$ [182] \end{gl} \end{bdl} \begin{bdl} \item[40/203] \mb{40/203} \begin{gl} \item[254] {\rm Sq(0,1)[249]} \item[255] {\rm Sq(0,1)[250]} \item[256] {\rm Sq(0,1)[251]} \item[257] {\rm Sq(0,1)[252] + Sq(0,1)[248]} \item[258] {\rm Sq(2)[255] + Sq(2)[254] + Sq(2)[253]} \\ $h_{1}:$ [255], [254], [253] \item[259] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{3}:$ [228], [226] \item[260] {\rm Sq(1)[264] + Sq(1)[258]} \\ $h_{0}:$ [264], [258] \\ $h_{3}:$ [228], [226] \end{gl} \end{bdl} \begin{bdl} \item[39/203] \mb{39/203} \begin{gl} \item[258] {\rm Sq(1,1)[254]} \item[259] {\rm Sq(0,1)[257]} \item[260] {\rm Sq(0,1)[258]} \item[261] {\rm Sq(0,1)[259]} \item[262] {\rm Sq(0,1)[260]} \item[263] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \item[264] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \end{gl} \end{bdl} \begin{bdl} \item[38/203] \mb{38/203} \begin{gl} \item[266] {\rm Sq(0,1)[271]} \item[267] {\rm Sq(0,1)[272]} \item[268] {\rm Sq(0,1)[273]} \item[269] {\rm Sq(1)[282]} \\ $h_{0}:$ [282] \item[270] {\rm Sq(1)[284]} \\ $h_{0}:$ [284] \end{gl} \end{bdl} \begin{bdl} \item[37/203] \mb{37/203} \begin{gl} \item[279] {\rm Sq(0,1)[279]} \item[280] {\rm Sq(0,1)[280]} \item[281] {\rm Sq(0,1)[281]} \item[282] {\rm Sq(3)[282] + Sq(3)[280]} \item[283] {\rm Sq(2)[285]} \\ $h_{1}:$ [285] \item[284] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \end{gl} \end{bdl} \begin{bdl} \item[36/203] \mb{36/203} \begin{gl} \item[288] {\rm Sq(1,1)[285]} \item[289] {\rm Sq(0,1)[287]} \item[290] {\rm Sq(0,1)[288]} \item[291] {\rm Sq(0,1)[289]} \item[292] {\rm Sq(1)[293]} \\ $h_{0}:$ [293] \item[293] {\rm Sq(1)[298]} \\ $h_{0}:$ [298] \\ $h_{2}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[35/203] \mb{35/203} \begin{gl} \item[293] {\rm Sq(1,1)[296]} \item[294] {\rm Sq(0,1)[297]} \item[295] {\rm Sq(0,1)[298]} \item[296] {\rm Sq(0,1)[299]} \item[297] {\rm Sq(1)[307] + Sq(1)[306]} \\ $h_{0}:$ [307], [306] \\ $h_{1}:$ [305], [304], [302] \item[298] {\rm Sq(1)[308]} \\ $h_{0}:$ [308] \end{gl} \end{bdl} \begin{bdl} \item[34/203] \mb{34/203} \begin{gl} \item[306] {\rm Sq(0,1)[303]} \item[307] {\rm Sq(0,1)[305]} \item[308] {\rm Sq(3)[305] + Sq(3)[303]} \item[309] {\rm Sq(0,1)[306]} \item[310] {\rm Sq(1)[317] + Sq(1)[312]} \\ $h_{0}:$ [317], [312] \\ $h_{2}:$ [301], [297] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[33/203] \mb{33/203} \begin{gl} \item[312] {\rm Sq(2,1)[295]} \item[313] {\rm Sq(0,1)[303]} \item[314] {\rm Sq(0,1)[304]} \item[315] {\rm Sq(0,1)[306]} \item[316] {\rm Sq(0,1)[307]} \item[317] {\rm Sq(1)[314]} \\ $h_{0}:$ [314] \\ $h_{2}:$ [300] \\ $h_{7}:$ [7] \item[318] {\rm Sq(1)[317]} \\ $h_{0}:$ [317] \\ $h_{2}:$ [300] \\ $h_{3}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[32/203] \mb{32/203} \begin{gl} \item[314] {\rm Sq(0,1)[305]} \item[315] {\rm Sq(0,1)[306]} \item[316] {\rm Sq(2)[313] + Sq(2)[310]} \\ $h_{1}:$ [313], [310] \item[317] {\rm Sq(1)[317]} \\ $h_{0}:$ [317] \end{gl} \end{bdl} \begin{bdl} \item[31/203] \mb{31/203} \begin{gl} \item[315] {\rm Sq(0,1)[312]} \item[316] {\rm Sq(0,1)[313]} \item[317] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \end{gl} \end{bdl} \begin{bdl} \item[30/203] \mb{30/203} \begin{gl} \item[319] {\rm Sq(1,1)[317] + Sq(1,1)[316] + Sq(1,1)[315]} \item[320] {\rm Sq(0,1)[320]} \item[321] {\rm Sq(0,1)[321] + Sq(0,1)[319]} \item[322] {\rm Sq(3)[322] + Sq(3)[321] + Sq(3)[320] + Sq(0,1)[319]} \item[323] {\rm Sq(3)[323] + Sq(0,1)[323] + Sq(3)[320]} \end{gl} \end{bdl} \begin{bdl} \item[29/203] \mb{29/203} \begin{gl} \item[328] {\rm Sq(1,1)[320] + Sq(1,1)[318] + Sq(1,1)[317]} \item[329] {\rm Sq(0,1)[322]} \item[330] {\rm Sq(3)[323]} \end{gl} \end{bdl} \begin{bdl} \item[28/203] \mb{28/203} \begin{gl} \item[331] {\rm Sq(2,1)[317] + Sq(5)[315] + Sq(2,1)[315]} \item[332] {\rm Sq(1,1)[321] + Sq(1,1)[320]} \item[333] {\rm Sq(0,1)[323] + Sq(0,1)[322]} \end{gl} \end{bdl} \begin{bdl} \item[27/203] \mb{27/203} \begin{gl} \item[330] {\rm Sq(0,1)[330] + Sq(3)[329] + Sq(0,1)[329] + Sq(0,1)[327]} \item[331] {\rm Sq(3)[332] + Sq(0,1)[332] + Sq(3)[328] + Sq(0,1)[328] + Sq(0,1)[327]} \item[332] {\rm Sq(2)[335] + Sq(2)[334]} \\ $h_{1}:$ [335], [334] \\ $h_{3}:$ [310], [309] \item[333] {\rm Sq(2)[336] + Sq(2)[334]} \\ $h_{1}:$ [336], [334] \\ $h_{7}:$ [15] \item[334] {\rm Sq(1)[339]} \\ $h_{0}:$ [339] \\ $h_{2}:$ [326], [325] \\ $h_{3}:$ [309] \\ $h_{7}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[26/203] \mb{26/203} \begin{gl} \item[338] {\rm Sq(3)[330] + Sq(0,1)[330]} \item[339] {\rm Sq(1)[339]} \\ $h_{0}:$ [339] \\ $h_{2}:$ [328], [327] \end{gl} \end{bdl} \begin{bdl} \item[25/203] \mb{25/203} \begin{gl} \item[339] {\rm Sq(1,1)[329] + Sq(1,1)[328]} \item[340] {\rm Sq(1,1)[330] + Sq(1,1)[328]} \item[341] {\rm Sq(2)[334]} \\ $h_{1}:$ [334] \item[342] {\rm Sq(1)[341] + Sq(1)[340] + Sq(1)[337] + Sq(1)[336]} \\ $h_{0}:$ [341], [340], [337], [336] \\ $h_{3}:$ [314], [313] \end{gl} \end{bdl} \begin{bdl} \item[24/203] \mb{24/203} \begin{gl} \item[336] {\rm Sq(3,1)[325] + Sq(3,1)[323] + Sq(3,1)[322] + Sq(0,2)[322]} \item[337] {\rm Sq(3)[336] + Sq(0,1)[336] + Sq(0,1)[334] + Sq(3)[333] + Sq(3)[332]} \\ $h_{7}:$ [17] \item[338] {\rm Sq(2)[338] + Sq(2)[337]} \\ $h_{1}:$ [338], [337] \item[339] {\rm Sq(2)[339]} \\ $h_{1}:$ [339] \\ $h_{3}:$ [317], [316] \item[340] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{7}:$ [17] \item[341] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \\ $h_{3}:$ [317], [316], [315] \end{gl} \end{bdl} \begin{bdl} \item[23/203] \mb{23/203} \begin{gl} \item[341] {\rm Sq(1,1)[346] + Sq(1,1)[344]} \item[342] {\rm Sq(3)[348]} \item[343] {\rm Sq(1)[359] + Sq(1)[357]} \\ $h_{0}:$ [359], [357] \\ $h_{3}:$ [333] \\ $h_{4}:$ [306], [304] \\ $h_{7}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[22/203] \mb{22/203} \begin{gl} \item[356] {\rm Sq(5)[357] + Sq(2,1)[357]} \item[357] {\rm Sq(3)[362] + Sq(0,1)[362]} \item[358] {\rm Sq(1)[372] + Sq(1)[371] + Sq(1)[370]} \\ $h_{0}:$ [372], [371], [370] \\ $h_{1}:$ [363] \\ $h_{3}:$ [340] \item[359] {\rm Sq(1)[373] + Sq(1)[370] + Sq(1)[369]} \\ $h_{0}:$ [373], [370], [369] \\ $h_{3}:$ [343], [340] \\ $h_{4}:$ [313], [312] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[21/203] \mb{21/203} \begin{gl} \item[368] {\rm Sq(0,1)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{2}:$ [365] \\ $h_{7}:$ [25] \item[369] {\rm Sq(3)[372] + Sq(0,1)[372] + Sq(3)[371] + Sq(0,1)[369]} \\ $h_{2}:$ [365] \\ $h_{7}:$ [25] \item[370] {\rm Sq(3)[373] + Sq(0,1)[373] + Sq(3)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[369]} \\ $h_{3}:$ [347] \\ $h_{4}:$ [313] \\ $h_{6}:$ [145] \\ $h_{7}:$ [25] \item[371] {\rm Sq(1)[377]} \\ $h_{0}:$ [377] \item[372] {\rm Sq(1)[380]} \\ $h_{0}:$ [380] \\ $h_{3}:$ [347] \\ $h_{4}:$ [313] \\ $h_{6}:$ [145] \\ $h_{7}:$ [25] \item[373] {\rm Sq(1)[383]} \\ $h_{0}:$ [383] \\ $h_{2}:$ [365] \\ $h_{3}:$ [349], [347] \\ $h_{6}:$ [145] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[20/203] \mb{20/203} \begin{gl} \item[377] {\rm Sq(1,1)[383]} \item[378] {\rm Sq(2)[387] + Sq(2)[386]} \\ $h_{1}:$ [387], [386] \\ $h_{4}:$ [326] \item[379] {\rm Sq(2)[392] + Sq(2)[391] + Sq(2)[386]} \\ $h_{1}:$ [392], [391], [386] \\ $h_{4}:$ [326] \item[380] {\rm Sq(1)[395]} \\ $h_{0}:$ [395] \item[381] {\rm Sq(1)[396]} \\ $h_{0}:$ [396] \\ $h_{1}:$ [389] \\ $h_{2}:$ [383], [382] \\ $h_{4}:$ [326] \\ $h_{7}:$ [25] \item[382] {\rm Sq(1)[397]} \\ $h_{0}:$ [397] \\ $h_{3}:$ [366], [363], [362] \\ $h_{4}:$ [329], [328] \\ $h_{5}:$ [249], [248], [247] \\ $h_{6}:$ [154], [153] \\ $h_{7}:$ [26] \item[383] {\rm Sq(1)[398]} \\ $h_{0}:$ [398] \\ $h_{3}:$ [363], [362] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[19/203] \mb{19/203} \begin{gl} \item[395] {\rm Sq(3)[403] + Sq(0,1)[403] + Sq(3)[402] + Sq(3)[401] + Sq(0,1)[401] + Sq(3)[400] + Sq(0,1)[400]} \item[396] {\rm Sq(1)[408] + Sq(1)[407]} \\ $h_{0}:$ [408], [407] \\ $h_{2}:$ [396] \\ $h_{7}:$ [28] \item[397] {\rm Sq(1)[411] + Sq(1)[410] + Sq(1)[409]} \\ $h_{0}:$ [411], [410], [409] \\ $h_{3}:$ [378] \\ $h_{4}:$ [342], [341], [339], [334], [333] \\ $h_{5}:$ [252] \\ $h_{6}:$ [153] \\ $h_{7}:$ [29] \item[398] {\rm Sq(1)[412] + Sq(1)[410]} \\ $h_{0}:$ [412], [410] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[18/203] \mb{18/203} \begin{gl} \item[407] {\rm Sq(1,1)[413] + Sq(1,1)[411] + Sq(4)[410] + Sq(1,1)[410]} \\ $h_{2}:$ [410] \\ $h_{5}:$ [257] \item[408] {\rm Sq(1,1)[414] + Sq(1,1)[412] + Sq(4)[410] + Sq(1,1)[410]} \\ $h_{2}:$ [410] \\ $h_{5}:$ [257] \\ $h_{7}:$ [30] \item[409] {\rm Sq(0,1)[416]} \\ $h_{2}:$ [410] \\ $h_{5}:$ [257] \\ $h_{7}:$ [31] \item[410] {\rm Sq(3)[418] + Sq(0,1)[418] + Sq(3)[416]} \\ $h_{2}:$ [410] \\ $h_{5}:$ [257] \\ $h_{7}:$ [31] \item[411] {\rm Sq(1)[424]} \\ $h_{0}:$ [424] \\ $h_{4}:$ [339], [337], [335] \\ $h_{7}:$ [32] \item[412] {\rm Sq(1)[426] + Sq(1)[425]} \\ $h_{0}:$ [426], [425] \\ $h_{2}:$ [410] \\ $h_{5}:$ [257] \\ $h_{7}:$ [32], [31] \end{gl} \end{bdl} \begin{bdl} \item[17/203] \mb{17/203} \begin{gl} \item[423] {\rm Sq(0,1)[431]} \\ $h_{4}:$ [340] \\ $h_{7}:$ [32] \item[424] {\rm Sq(3)[431]} \\ $h_{4}:$ [341] \\ $h_{7}:$ [32] \item[425] {\rm Sq(3)[433] + Sq(0,1)[433] + Sq(0,1)[432]} \\ $h_{4}:$ [341], [340] \item[426] {\rm Sq(3)[436] + Sq(0,1)[436] + Sq(3)[435] + Sq(0,1)[435] + Sq(3)[434] + Sq(0,1)[434] + Sq(3)[432] + Sq(0,1)[432]} \\ $h_{4}:$ [341], [340] \\ $h_{7}:$ [32] \item[427] {\rm Sq(2)[437]} \\ $h_{1}:$ [437] \\ $h_{4}:$ [342], [340], [339] \item[428] {\rm Sq(1)[442]} \\ $h_{0}:$ [442] \\ $h_{2}:$ [425], [424] \\ $h_{3}:$ [399], [398] \\ $h_{4}:$ [340] \\ $h_{5}:$ [262] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[16/203] \mb{16/203} \begin{gl} \item[441] {\rm Sq(2)[449] + Sq(2)[448]} \\ $h_{1}:$ [449], [448] \\ $h_{4}:$ [349] \item[442] {\rm Sq(1)[453]} \\ $h_{0}:$ [453] \item[443] {\rm Sq(1)[457] + Sq(1)[454]} \\ $h_{0}:$ [457], [454] \\ $h_{2}:$ [440], [438] \\ $h_{3}:$ [405], [404], [403] \\ $h_{7}:$ [35] \item[444] {\rm Sq(1)[458]} \\ $h_{0}:$ [458] \\ $h_{2}:$ [435] \\ $h_{7}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[15/203] \mb{15/203} \begin{gl} \item[453] {\rm Sq(1,1)[438] + Sq(1,1)[436]} \item[454] {\rm Sq(4)[438] + Sq(1,1)[437]} \\ $h_{2}:$ [438] \\ $h_{3}:$ [404] \item[455] {\rm Sq(3)[444] + Sq(3)[443] + Sq(3)[442]} \\ $h_{7}:$ [38] \item[456] {\rm Sq(3)[445] + Sq(0,1)[445] + Sq(0,1)[444] + Sq(0,1)[443] + Sq(0,1)[442]} \\ $h_{2}:$ [436] \\ $h_{3}:$ [404] \\ $h_{7}:$ [38] \item[457] {\rm Sq(3)[446] + Sq(0,1)[446] + Sq(0,1)[444] + Sq(0,1)[443] + Sq(3)[442]} \\ $h_{2}:$ [436] \\ $h_{7}:$ [38], [37] \item[458] {\rm Sq(3)[448] + Sq(0,1)[448] + Sq(0,1)[444] + Sq(3)[443] + Sq(3)[442]} \\ $h_{7}:$ [38], [37] \item[459] {\rm Sq(1)[457] + Sq(1)[455]} \\ $h_{0}:$ [457], [455] \\ $h_{2}:$ [436] \\ $h_{3}:$ [409] \\ $h_{4}:$ [357] \\ $h_{7}:$ [37] \item[460] {\rm Sq(1)[459] + Sq(1)[456] + Sq(1)[455]} \\ $h_{0}:$ [459], [456], [455] \\ $h_{1}:$ [450] \\ $h_{3}:$ [410], [406], [405] \\ $h_{4}:$ [358], [356] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[14/203] \mb{14/203} \begin{gl} \item[455] {\rm Sq(3)[429] + Sq(0,1)[429] + Sq(3)[428] + Sq(0,1)[428]} \\ $h_{4}:$ [354], [353], [352], [351] \item[456] {\rm Sq(0,1)[432] + Sq(0,1)[431] + Sq(3)[430] + Sq(3)[428]} \\ $h_{3}:$ [399], [398] \\ $h_{4}:$ [353], [352] \item[457] {\rm Sq(3)[433] + Sq(0,1)[433] + Sq(3)[431] + Sq(0,1)[430] + Sq(0,1)[428]} \\ $h_{3}:$ [398] \\ $h_{4}:$ [354], [353], [352], [351] \item[458] {\rm Sq(2)[437] + Sq(2)[436]} \\ $h_{1}:$ [437], [436] \\ $h_{4}:$ [354], [353], [351] \item[459] {\rm Sq(1)[442] + Sq(1)[441]} \\ $h_{0}:$ [442], [441] \\ $h_{3}:$ [398] \\ $h_{4}:$ [354] \item[460] {\rm Sq(1)[445]} \\ $h_{0}:$ [445] \\ $h_{2}:$ [425] \\ $h_{3}:$ [399], [398] \\ $h_{4}:$ [356], [353] \end{gl} \end{bdl} \begin{bdl} \item[13/203] \mb{13/203} \begin{gl} \item[441] {\rm Sq(1,1)[415] + Sq(1,1)[413]} \\ $h_{3}:$ [397], [395], [393], [392] \\ $h_{4}:$ [349] \item[442] {\rm Sq(3)[421] + Sq(0,1)[421] + Sq(3)[420] + Sq(0,1)[420] + Sq(3)[418] + Sq(0,1)[418]} \\ $h_{3}:$ [397], [395], [393], [392] \\ $h_{4}:$ [349] \item[443] {\rm Sq(2)[425] + Sq(2)[424] + Sq(2)[423]} \\ $h_{1}:$ [425], [424], [423] \\ $h_{2}:$ [413] \\ $h_{3}:$ [396], [395], [392] \\ $h_{4}:$ [349] \item[444] {\rm Sq(2)[426] + Sq(2)[424] + Sq(2)[423]} \\ $h_{1}:$ [426], [424], [423] \\ $h_{2}:$ [413] \\ $h_{3}:$ [397], [395] \\ $h_{4}:$ [352] \\ $h_{6}:$ [186] \item[445] {\rm Sq(1)[431]} \\ $h_{0}:$ [431] \\ $h_{2}:$ [415], [413] \\ $h_{4}:$ [354], [350] \item[446] {\rm Sq(1)[432]} \\ $h_{0}:$ [432] \\ $h_{1}:$ [427] \\ $h_{2}:$ [417], [415] \\ $h_{3}:$ [396], [395] \\ $h_{4}:$ [354] \item[447] {\rm Sq(1)[434]} \\ $h_{0}:$ [434] \\ $h_{1}:$ [424] \\ $h_{2}:$ [415] \\ $h_{3}:$ [393], [392] \\ $h_{4}:$ [354], [353], [352], [350], [349] \\ $h_{6}:$ [186] \end{gl} \end{bdl} \begin{bdl} \item[12/203] \mb{12/203} \begin{gl} \item[431] {\rm Sq(0,1)[405] + Sq(3)[403] + Sq(3)[402] + Sq(0,1)[402]} \\ $h_{4}:$ [351] \item[432] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{2}:$ [400] \\ $h_{4}:$ [351] \item[433] {\rm Sq(1)[414]} \\ $h_{0}:$ [414] \\ $h_{3}:$ [387], [386] \item[434] {\rm Sq(1)[418]} \\ $h_{0}:$ [418] \\ $h_{4}:$ [351] \end{gl} \end{bdl} \begin{bdl} \item[11/203] \mb{11/203} \begin{gl} \item[412] {\rm Sq(7)[368] + Sq(1,2)[368]} \\ $h_{4}:$ [337] \item[413] {\rm Sq(4)[376] + Sq(1,1)[376] + Sq(1,1)[374]} \\ $h_{2}:$ [376] \item[414] {\rm Sq(3)[378] + Sq(0,1)[378]} \item[415] {\rm Sq(2)[381]} \\ $h_{1}:$ [381] \item[416] {\rm Sq(2)[384] + Sq(2)[383] + Sq(2)[382] + Sq(2)[380] + Sq(2)[379]} \\ $h_{1}:$ [384], [383], [382], [380], [379] \\ $h_{4}:$ [337] \item[417] {\rm Sq(1)[386]} \\ $h_{0}:$ [386] \\ $h_{1}:$ [382] \\ $h_{3}:$ [364], [363] \\ $h_{7}:$ [46] \item[418] {\rm Sq(1)[387]} \\ $h_{0}:$ [387] \end{gl} \end{bdl} \begin{bdl} \item[10/203] \mb{10/203} \begin{gl} \item[386] {\rm Sq(1,1)[341]} \\ $h_{7}:$ [51] \item[387] {\rm Sq(1)[349] + Sq(1)[348] + Sq(1)[347]} \\ $h_{0}:$ [349], [348], [347] \item[388] {\rm Sq(1)[352] + Sq(1)[348] + Sq(1)[347]} \\ $h_{0}:$ [352], [348], [347] \\ $h_{1}:$ [345] \\ $h_{2}:$ [341] \\ $h_{3}:$ [331] \\ $h_{4}:$ [304] \\ $h_{7}:$ [52], [51] \end{gl} \end{bdl} \begin{bdl} \item[9/203] \mb{9/203} \begin{gl} \item[347] {\rm Sq(3,1)[296]} \item[348] {\rm Sq(1,1)[299] + Sq(1,1)[298]} \\ $h_{3}:$ [289] \item[349] {\rm Sq(3)[300] + Sq(0,1)[300]} \\ $h_{3}:$ [289] \item[350] {\rm Sq(2)[301]} \\ $h_{1}:$ [301] \\ $h_{7}:$ [55] \item[351] {\rm Sq(2)[302]} \\ $h_{1}:$ [302] \\ $h_{2}:$ [297] \\ $h_{3}:$ [288] \\ $h_{5}:$ [242], [241] \\ $h_{6}:$ [161] \item[352] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{2}:$ [298] \\ $h_{3}:$ [289] \\ $h_{4}:$ [268], [267] \\ $h_{7}:$ [56] \end{gl} \end{bdl} \begin{bdl} \item[8/203] \mb{8/203} \begin{gl} \item[303] {\rm Sq(3)[255] + Sq(0,1)[255]} \\ $h_{3}:$ [247] \\ $h_{4}:$ [230] \\ $h_{7}:$ [54] \item[304] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \\ $h_{4}:$ [231], [230] \\ $h_{7}:$ [55], [54] \item[305] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{4}:$ [233] \\ $h_{5}:$ [210] \\ $h_{7}:$ [55], [54] \end{gl} \end{bdl} \begin{bdl} \item[7/203] \mb{7/203} \begin{gl} \item[258] {\rm Sq(7)[205] + Sq(1,2)[205]} \\ $h_{7}:$ [53] \item[259] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{4}:$ [190] \\ $h_{5}:$ [174] \\ $h_{7}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[6/203] \mb{6/203} \begin{gl} \item[208] {\rm Sq(4,1)[146] + Sq(1,2)[146] + Sq(0,0,1)[146]} \\ $h_{4}:$ [136] \\ $h_{7}:$ [47] \item[209] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \\ $h_{4}:$ [137] \\ $h_{5}:$ [126] \end{gl} \end{bdl} \begin{bdl} \item[5/203] \mb{5/203} \begin{gl} \item[147] {\rm Sq(6,2)[92] + Sq(2,1,1)[92]} \\ $h_{4}:$ [89] \\ $h_{5}:$ [84] \end{gl} \end{bdl} \dm{204} \begin{bdl} \item[98/204] \mb{98/204} \begin{gl} \item[7] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[97/204] \mb{97/204} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[96/204] \mb{96/204} \begin{gl} \item[7] {\rm Sq(0,1)[6]} \end{gl} \end{bdl} \begin{bdl} \item[90/204] \mb{90/204} \begin{gl} \item[15] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[87/204] \mb{87/204} \begin{gl} \item[17] {\rm Sq(0,1)[18]} \end{gl} \end{bdl} \begin{bdl} \item[86/204] \mb{86/204} \begin{gl} \item[19] {\rm Sq(1)[24]} \\ $h_{0}:$ [24] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[85/204] \mb{85/204} \begin{gl} \item[24] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[84/204] \mb{84/204} \begin{gl} \item[25] {\rm Sq(0,1)[23]} \item[26] {\rm Sq(1)[26]} \\ $h_{0}:$ [26] \\ $h_{3}:$ [17] \end{gl} \end{bdl} \begin{bdl} \item[83/204] \mb{83/204} \begin{gl} \item[25] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{1}:$ [26] \\ $h_{2}:$ [25] \item[26] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[82/204] \mb{82/204} \begin{gl} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{2}:$ [28] \item[29] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[81/204] \mb{81/204} \begin{gl} \item[30] {\rm Sq(1,1)[30]} \item[31] {\rm Sq(0,1)[31]} \item[32] {\rm Sq(1)[32]} \\ $h_{0}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[80/204] \mb{80/204} \begin{gl} \item[32] {\rm Sq(3,1)[30] + Sq(3,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[79/204] \mb{79/204} \begin{gl} \item[35] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[78/204] \mb{78/204} \begin{gl} \item[38] {\rm Sq(0,1)[37]} \item[39] {\rm Sq(0,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[75/204] \mb{75/204} \begin{gl} \item[47] {\rm Sq(0,1)[51]} \item[48] {\rm Sq(0,1)[52]} \end{gl} \end{bdl} \begin{bdl} \item[74/204] \mb{74/204} \begin{gl} \item[55] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[72/204] \mb{72/204} \begin{gl} \item[55] {\rm Sq(0,1)[52]} \item[56] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[71/204] \mb{71/204} \begin{gl} \item[56] {\rm Sq(0,1)[56]} \end{gl} \end{bdl} \begin{bdl} \item[70/204] \mb{70/204} \begin{gl} \item[61] {\rm Sq(2)[62]} \\ $h_{1}:$ [62] \item[62] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \\ $h_{3}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[69/204] \mb{69/204} \begin{gl} \item[64] {\rm Sq(0,1)[62]} \item[65] {\rm Sq(0,1)[63]} \item[66] {\rm Sq(1)[67]} \\ $h_{0}:$ [67] \\ $h_{3}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[68/204] \mb{68/204} \begin{gl} \item[66] {\rm Sq(0,1)[68]} \item[67] {\rm Sq(1)[74] + Sq(1)[73]} \\ $h_{0}:$ [74], [73] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[67/204] \mb{67/204} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \\ $h_{3}:$ [67] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{1}:$ [76] \\ $h_{2}:$ [73] \end{gl} \end{bdl} \begin{bdl} \item[66/204] \mb{66/204} \begin{gl} \item[78] {\rm Sq(1,1)[78]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[65/204] \mb{65/204} \begin{gl} \item[81] {\rm Sq(1,1)[80]} \item[82] {\rm Sq(0,1)[81]} \end{gl} \end{bdl} \begin{bdl} \item[64/204] \mb{64/204} \begin{gl} \item[86] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [86], [83] \end{gl} \end{bdl} \begin{bdl} \item[63/204] \mb{63/204} \begin{gl} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(0,1)[93]} \item[92] {\rm Sq(0,1)[94]} \item[93] {\rm Sq(1)[97] + Sq(1)[96]} \\ $h_{0}:$ [97], [96] \\ $h_{2}:$ [90] \end{gl} \end{bdl} \begin{bdl} \item[62/204] \mb{62/204} \begin{gl} \item[96] {\rm Sq(1,1)[97]} \item[97] {\rm Sq(0,1)[98]} \item[98] {\rm Sq(0,1)[99]} \end{gl} \end{bdl} \begin{bdl} \item[60/204] \mb{60/204} \begin{gl} \item[109] {\rm Sq(0,1)[115]} \item[110] {\rm Sq(0,1)[116]} \item[111] {\rm Sq(0,1)[117]} \end{gl} \end{bdl} \begin{bdl} \item[59/204] \mb{59/204} \begin{gl} \item[121] {\rm Sq(0,1)[120]} \item[122] {\rm Sq(0,1)[121]} \item[123] {\rm Sq(0,1)[122]} \end{gl} \end{bdl} \begin{bdl} \item[57/204] \mb{57/204} \begin{gl} \item[128] {\rm Sq(0,1)[122]} \item[129] {\rm Sq(0,1)[123]} \item[130] {\rm Sq(0,1)[124]} \item[131] {\rm Sq(1)[132]} \\ $h_{0}:$ [132] \\ $h_{1}:$ [126] \\ $h_{2}:$ [121] \\ $h_{3}:$ [110] \end{gl} \end{bdl} \begin{bdl} \item[56/204] \mb{56/204} \begin{gl} \item[129] {\rm Sq(0,1)[128]} \item[130] {\rm Sq(0,1)[129]} \item[131] {\rm Sq(0,1)[130]} \item[132] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{2}:$ [127] \\ $h_{3}:$ [119] \end{gl} \end{bdl} \begin{bdl} \item[55/204] \mb{55/204} \begin{gl} \item[137] {\rm Sq(0,1)[135]} \item[138] {\rm Sq(1)[146]} \\ $h_{0}:$ [146] \\ $h_{3}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[54/204] \mb{54/204} \begin{gl} \item[142] {\rm Sq(0,1)[137]} \item[143] {\rm Sq(0,1)[138]} \item[144] {\rm Sq(0,1)[139]} \item[145] {\rm Sq(2)[143] + Sq(2)[142]} \\ $h_{1}:$ [143], [142] \item[146] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{3}:$ [126] \end{gl} \end{bdl} \begin{bdl} \item[53/204] \mb{53/204} \begin{gl} \item[145] {\rm Sq(0,1)[144]} \item[146] {\rm Sq(0,1)[145]} \item[147] {\rm Sq(0,1)[146]} \item[148] {\rm Sq(1)[153]} \\ $h_{0}:$ [153] \end{gl} \end{bdl} \begin{bdl} \item[52/204] \mb{52/204} \begin{gl} \item[152] {\rm Sq(0,1)[160]} \item[153] {\rm Sq(1)[169]} \\ $h_{0}:$ [169] \end{gl} \end{bdl} \begin{bdl} \item[51/204] \mb{51/204} \begin{gl} \item[165] {\rm Sq(0,1)[170]} \item[166] {\rm Sq(0,1)[171]} \item[167] {\rm Sq(0,1)[172]} \item[168] {\rm Sq(0,1)[173]} \item[169] {\rm Sq(3)[173]} \end{gl} \end{bdl} \begin{bdl} \item[50/204] \mb{50/204} \begin{gl} \item[176] {\rm Sq(0,1)[173]} \item[177] {\rm Sq(0,1)[174]} \item[178] {\rm Sq(0,1)[175]} \end{gl} \end{bdl} \begin{bdl} \item[49/204] \mb{49/204} \begin{gl} \item[181] {\rm Sq(0,1)[178]} \item[182] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [182] \\ $h_{2}:$ [177] \item[183] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \\ $h_{1}:$ [183], [182] \\ $h_{2}:$ [177] \\ $h_{3}:$ [156] \\ $h_{4}:$ [133] \end{gl} \end{bdl} \begin{bdl} \item[48/204] \mb{48/204} \begin{gl} \item[185] {\rm Sq(0,1)[185]} \item[186] {\rm Sq(0,1)[186]} \item[187] {\rm Sq(0,1)[187]} \item[188] {\rm Sq(0,1)[188]} \item[189] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{2}:$ [183] \item[190] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \\ $h_{2}:$ [183] \\ $h_{4}:$ [139], [138] \end{gl} \end{bdl} \begin{bdl} \item[47/204] \mb{47/204} \begin{gl} \item[192] {\rm Sq(1,1)[194]} \item[193] {\rm Sq(0,1)[196]} \item[194] {\rm Sq(0,1)[197]} \item[195] {\rm Sq(0,1)[198]} \item[196] {\rm Sq(1)[206]} \\ $h_{0}:$ [206] \item[197] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{4}:$ [145], [144] \end{gl} \end{bdl} \begin{bdl} \item[46/204] \mb{46/204} \begin{gl} \item[205] {\rm Sq(0,1)[208]} \item[206] {\rm Sq(3)[209] + Sq(0,1)[209]} \item[207] {\rm Sq(2)[213]} \\ $h_{1}:$ [213] \item[208] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{4}:$ [150], [149] \end{gl} \end{bdl} \begin{bdl} \item[45/204] \mb{45/204} \begin{gl} \item[218] {\rm Sq(0,1)[215]} \item[219] {\rm Sq(0,1)[216]} \item[220] {\rm Sq(0,1)[217]} \item[221] {\rm Sq(0,1)[218]} \item[222] {\rm Sq(1)[228]} \\ $h_{0}:$ [228] \\ $h_{1}:$ [221] \\ $h_{2}:$ [209], [208] \\ $h_{4}:$ [151] \item[223] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{4}:$ [156], [151] \end{gl} \end{bdl} \begin{bdl} \item[44/204] \mb{44/204} \begin{gl} \item[224] {\rm Sq(0,1)[225]} \item[225] {\rm Sq(0,1)[226]} \item[226] {\rm Sq(0,1)[227]} \item[227] {\rm Sq(0,1)[228]} \item[228] {\rm Sq(0,1)[229]} \item[229] {\rm Sq(1)[241] + Sq(1)[240]} \\ $h_{0}:$ [241], [240] \\ $h_{4}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[43/204] \mb{43/204} \begin{gl} \item[239] {\rm Sq(0,1)[238]} \item[240] {\rm Sq(0,1)[239]} \item[241] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{4}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[42/204] \mb{42/204} \begin{gl} \item[250] {\rm Sq(0,1)[245]} \item[251] {\rm Sq(0,1)[246]} \item[252] {\rm Sq(0,1)[247]} \item[253] {\rm Sq(0,1)[248]} \item[254] {\rm Sq(0,1)[249]} \item[255] {\rm Sq(1)[262] + Sq(1)[259]} \\ $h_{0}:$ [262], [259] \\ $h_{4}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[41/204] \mb{41/204} \begin{gl} \item[256] {\rm Sq(0,1)[247]} \item[257] {\rm Sq(0,1)[250] + Sq(0,1)[248]} \item[258] {\rm Sq(0,1)[251] + Sq(0,1)[248]} \item[259] {\rm Sq(3)[252] + Sq(0,1)[252] + Sq(0,1)[249] + Sq(0,1)[248]} \item[260] {\rm Sq(3)[253] + Sq(0,1)[253] + Sq(0,1)[249]} \item[261] {\rm Sq(1)[261]} \\ $h_{0}:$ [261] \\ $h_{1}:$ [258] \item[262] {\rm Sq(1)[264] + Sq(1)[262]} \\ $h_{0}:$ [264], [262] \end{gl} \end{bdl} \begin{bdl} \item[40/204] \mb{40/204} \begin{gl} \item[261] {\rm Sq(0,1)[254] + Sq(0,1)[253]} \item[262] {\rm Sq(3)[255] + Sq(3)[254] + Sq(3)[253] + Sq(0,1)[253]} \item[263] {\rm Sq(0,1)[256] + Sq(0,1)[253]} \item[264] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \end{gl} \end{bdl} \begin{bdl} \item[39/204] \mb{39/204} \begin{gl} \item[265] {\rm Sq(0,1)[261]} \item[266] {\rm Sq(0,1)[262]} \item[267] {\rm Sq(0,1)[263]} \item[268] {\rm Sq(0,1)[264]} \item[269] {\rm Sq(1)[278] + Sq(1)[277] + Sq(1)[275]} \\ $h_{0}:$ [278], [277], [275] \end{gl} \end{bdl} \begin{bdl} \item[38/204] \mb{38/204} \begin{gl} \item[271] {\rm Sq(1,1)[273]} \item[272] {\rm Sq(0,1)[274]} \item[273] {\rm Sq(0,1)[275]} \item[274] {\rm Sq(0,1)[277]} \item[275] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(0,1)[276]} \item[276] {\rm Sq(2)[283] + Sq(2)[281] + Sq(2)[280] + Sq(2)[279]} \\ $h_{1}:$ [283], [281], [280], [279] \item[277] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \item[278] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \end{gl} \end{bdl} \begin{bdl} \item[37/204] \mb{37/204} \begin{gl} \item[285] {\rm Sq(0,1)[286]} \item[286] {\rm Sq(0,1)[287] + Sq(0,1)[284]} \item[287] {\rm Sq(1)[294]} \\ $h_{0}:$ [294] \item[288] {\rm Sq(1)[298] + Sq(1)[295]} \\ $h_{0}:$ [298], [295] \end{gl} \end{bdl} \begin{bdl} \item[36/204] \mb{36/204} \begin{gl} \item[294] {\rm Sq(2,1)[285]} \item[295] {\rm Sq(1,1)[289]} \item[296] {\rm Sq(0,1)[291]} \item[297] {\rm Sq(0,1)[292]} \item[298] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \end{gl} \end{bdl} \begin{bdl} \item[35/204] \mb{35/204} \begin{gl} \item[299] {\rm Sq(0,1)[301]} \item[300] {\rm Sq(3)[301]} \item[301] {\rm Sq(0,1)[302]} \item[302] {\rm Sq(0,1)[303]} \item[303] {\rm Sq(0,1)[304]} \item[304] {\rm Sq(2)[308]} \\ $h_{1}:$ [308] \end{gl} \end{bdl} \begin{bdl} \item[34/204] \mb{34/204} \begin{gl} \item[311] {\rm Sq(0,1)[311] + Sq(0,1)[310]} \end{gl} \end{bdl} \begin{bdl} \item[33/204] \mb{33/204} \begin{gl} \item[319] {\rm Sq(1,1)[309] + Sq(1,1)[305] + Sq(1,1)[303]} \item[320] {\rm Sq(0,1)[311] + Sq(0,1)[310]} \item[321] {\rm Sq(0,1)[312] + Sq(0,1)[310]} \item[322] {\rm Sq(1)[323] + Sq(1)[322]} \\ $h_{0}:$ [323], [322] \\ $h_{1}:$ [314] \\ $h_{2}:$ [308], [307] \\ $h_{7}:$ [8] \item[323] {\rm Sq(1)[324] + Sq(1)[322]} \\ $h_{0}:$ [324], [322] \\ $h_{2}:$ [309], [306] \\ $h_{7}:$ [8] \item[324] {\rm Sq(1)[325] + Sq(1)[322]} \\ $h_{0}:$ [325], [322] \\ $h_{2}:$ [305] \\ $h_{3}:$ [286], [283] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[32/204] \mb{32/204} \begin{gl} \item[318] {\rm Sq(0,1)[309]} \item[319] {\rm Sq(0,1)[310]} \item[320] {\rm Sq(0,1)[311]} \item[321] {\rm Sq(0,1)[312]} \item[322] {\rm Sq(3)[313] + Sq(3)[310]} \item[323] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \\ $h_{2}:$ [305] \\ $h_{7}:$ [7] \item[324] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{2}:$ [307] \\ $h_{7}:$ [7] \item[325] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{3}:$ [287], [286] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[31/204] \mb{31/204} \begin{gl} \item[318] {\rm Sq(0,1)[316]} \item[319] {\rm Sq(3)[316]} \item[320] {\rm Sq(0,1)[317]} \item[321] {\rm Sq(2)[319]} \\ $h_{1}:$ [319] \item[322] {\rm Sq(1)[328] + Sq(1)[324]} \\ $h_{0}:$ [328], [324] \end{gl} \end{bdl} \begin{bdl} \item[30/204] \mb{30/204} \begin{gl} \item[324] {\rm Sq(1,1)[322] + Sq(1,1)[319]} \item[325] {\rm Sq(0,1)[324]} \item[326] {\rm Sq(3)[326] + Sq(0,1)[326] + Sq(3)[325] + Sq(0,1)[325]} \item[327] {\rm Sq(2)[329]} \\ $h_{1}:$ [329] \item[328] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \end{gl} \end{bdl} \begin{bdl} \item[29/204] \mb{29/204} \begin{gl} \item[331] {\rm Sq(1,1)[322]} \item[332] {\rm Sq(0,1)[327] + Sq(0,1)[325]} \item[333] {\rm Sq(0,1)[329] + Sq(0,1)[328]} \item[334] {\rm Sq(2)[332] + Sq(2)[331]} \\ $h_{1}:$ [332], [331] \\ $h_{4}:$ [270] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[28/204] \mb{28/204} \begin{gl} \item[334] {\rm Sq(0,1)[327]} \item[335] {\rm Sq(0,1)[328]} \end{gl} \end{bdl} \begin{bdl} \item[27/204] \mb{27/204} \begin{gl} \item[335] {\rm Sq(0,1)[333]} \item[336] {\rm Sq(3)[335] + Sq(3)[334]} \item[337] {\rm Sq(3)[336] + Sq(3)[334]} \item[338] {\rm Sq(1)[343]} \\ $h_{0}:$ [343] \\ $h_{2}:$ [329], [328] \\ $h_{3}:$ [315], [313] \end{gl} \end{bdl} \begin{bdl} \item[26/204] \mb{26/204} \begin{gl} \item[340] {\rm Sq(0,1)[335]} \item[341] {\rm Sq(2)[339]} \\ $h_{1}:$ [339] \\ $h_{2}:$ [330] \\ $h_{3}:$ [317], [316] \\ $h_{7}:$ [20] \item[342] {\rm Sq(2)[341] + Sq(2)[340]} \\ $h_{1}:$ [341], [340] \item[343] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \\ $h_{3}:$ [320], [317] \end{gl} \end{bdl} \begin{bdl} \item[25/204] \mb{25/204} \begin{gl} \item[343] {\rm Sq(1,1)[333] + Sq(1,1)[331]} \item[344] {\rm Sq(0,1)[334]} \\ $h_{3}:$ [316] \item[345] {\rm Sq(1)[343] + Sq(1)[342]} \\ $h_{0}:$ [343], [342] \\ $h_{1}:$ [338], [336] \end{gl} \end{bdl} \begin{bdl} \item[24/204] \mb{24/204} \begin{gl} \item[342] {\rm Sq(3)[338] + Sq(0,1)[338] + Sq(3)[337]} \item[343] {\rm Sq(3)[339] + Sq(0,1)[337]} \item[344] {\rm Sq(2)[342] + Sq(2)[341]} \\ $h_{1}:$ [342], [341] \end{gl} \end{bdl} \begin{bdl} \item[23/204] \mb{23/204} \begin{gl} \item[344] {\rm Sq(0,1)[352]} \\ $h_{7}:$ [20] \item[345] {\rm Sq(3)[353] + Sq(0,1)[353] + Sq(3)[351] + Sq(0,1)[351]} \\ $h_{3}:$ [335] \item[346] {\rm Sq(3)[355] + Sq(0,1)[355] + Sq(3)[351] + Sq(0,1)[351]} \item[347] {\rm Sq(1)[361] + Sq(1)[360]} \\ $h_{0}:$ [361], [360] \\ $h_{3}:$ [336], [335], [334] \item[348] {\rm Sq(1)[362] + Sq(1)[360]} \\ $h_{0}:$ [362], [360] \\ $h_{3}:$ [335] \end{gl} \end{bdl} \begin{bdl} \item[22/204] \mb{22/204} \begin{gl} \item[360] {\rm Sq(3)[363]} \item[361] {\rm Sq(0,1)[364]} \item[362] {\rm Sq(3)[364] + Sq(0,1)[363]} \item[363] {\rm Sq(0,1)[365]} \item[364] {\rm Sq(3)[367] + Sq(0,1)[367] + Sq(3)[366] + Sq(0,1)[366]} \item[365] {\rm Sq(2)[369] + Sq(2)[368]} \\ $h_{1}:$ [369], [368] \item[366] {\rm Sq(1)[377] + Sq(1)[375]} \\ $h_{0}:$ [377], [375] \\ $h_{3}:$ [347], [345] \\ $h_{7}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[21/204] \mb{21/204} \begin{gl} \item[374] {\rm Sq(1,1)[371] + Sq(1,1)[369]} \item[375] {\rm Sq(1,1)[373] + Sq(1,1)[372]} \item[376] {\rm Sq(2)[377]} \\ $h_{1}:$ [377] \item[377] {\rm Sq(1)[388]} \\ $h_{0}:$ [388] \\ $h_{3}:$ [354], [352] \\ $h_{7}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[20/204] \mb{20/204} \begin{gl} \item[384] {\rm Sq(3)[392] + Sq(3)[391] + Sq(0,1)[391] + Sq(0,1)[390] + Sq(0,1)[389] + Sq(0,1)[388] + Sq(3)[387] + Sq(3)[386]} \\ $h_{5}:$ [251] \\ $h_{7}:$ [27] \item[385] {\rm Sq(3)[394] + Sq(0,1)[394] + Sq(3)[390] + Sq(0,1)[390] + Sq(0,1)[387] + Sq(0,1)[386]} \\ $h_{5}:$ [251] \item[386] {\rm Sq(2)[395]} \\ $h_{1}:$ [395] \\ $h_{5}:$ [251] \item[387] {\rm Sq(1)[400] + Sq(1)[399]} \\ $h_{0}:$ [400], [399] \item[388] {\rm Sq(1)[402] + Sq(1)[401]} \\ $h_{0}:$ [402], [401] \\ $h_{3}:$ [371] \\ $h_{7}:$ [28] \item[389] {\rm Sq(1)[403] + Sq(1)[401] + Sq(1)[399]} \\ $h_{0}:$ [403], [401], [399] \\ $h_{2}:$ [384] \\ $h_{3}:$ [372], [371] \\ $h_{5}:$ [251] \\ $h_{7}:$ [28], [27] \end{gl} \end{bdl} \begin{bdl} \item[19/204] \mb{19/204} \begin{gl} \item[399] {\rm Sq(2,1)[396]} \item[400] {\rm Sq(1,1)[400]} \item[401] {\rm Sq(3)[405] + Sq(0,1)[405] + Sq(3)[404]} \\ $h_{2}:$ [400] \\ $h_{3}:$ [384] \\ $h_{4}:$ [344], [343] \\ $h_{5}:$ [258] \\ $h_{6}:$ [157], [156] \item[402] {\rm Sq(1)[416]} \\ $h_{0}:$ [416] \\ $h_{2}:$ [400] \\ $h_{3}:$ [384], [382] \\ $h_{4}:$ [344], [343] \\ $h_{5}:$ [258] \\ $h_{6}:$ [157], [156] \\ $h_{7}:$ [30] \item[403] {\rm Sq(1)[417]} \\ $h_{0}:$ [417] \\ $h_{3}:$ [387], [385], [382] \\ $h_{4}:$ [344], [343] \\ $h_{5}:$ [258] \\ $h_{6}:$ [157], [156] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[18/204] \mb{18/204} \begin{gl} \item[413] {\rm Sq(2)[424] + Sq(2)[423]} \\ $h_{1}:$ [424], [423] \\ $h_{3}:$ [394] \\ $h_{4}:$ [345], [341] \\ $h_{5}:$ [262] \item[414] {\rm Sq(2)[425]} \\ $h_{1}:$ [425] \\ $h_{3}:$ [394] \\ $h_{4}:$ [345], [341] \\ $h_{5}:$ [262] \item[415] {\rm Sq(2)[426]} \\ $h_{1}:$ [426] \\ $h_{3}:$ [394] \\ $h_{4}:$ [345], [341] \\ $h_{5}:$ [262] \\ $h_{7}:$ [33] \item[416] {\rm Sq(1)[431]} \\ $h_{0}:$ [431] \\ $h_{7}:$ [34] \item[417] {\rm Sq(1)[432] + Sq(1)[429]} \\ $h_{0}:$ [432], [429] \\ $h_{3}:$ [395], [394] \\ $h_{7}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[17/204] \mb{17/204} \begin{gl} \item[429] {\rm Sq(3)[438] + Sq(0,1)[438]} \\ $h_{3}:$ [406], [405], [404] \\ $h_{5}:$ [264] \\ $h_{6}:$ [166] \item[430] {\rm Sq(0,1)[439] + Sq(0,1)[438] + Sq(3)[437] + Sq(0,1)[437]} \\ $h_{7}:$ [34], [33] \item[431] {\rm Sq(3)[440] + Sq(0,1)[440]} \\ $h_{7}:$ [33] \item[432] {\rm Sq(1)[447] + Sq(1)[445]} \\ $h_{0}:$ [447], [445] \\ $h_{3}:$ [406], [405], [404] \\ $h_{5}:$ [264] \\ $h_{6}:$ [166] \\ $h_{7}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[16/204] \mb{16/204} \begin{gl} \item[445] {\rm Sq(1,1)[445] + Sq(1,1)[443] + Sq(1,1)[441]} \item[446] {\rm Sq(0,1)[448]} \\ $h_{4}:$ [356] \item[447] {\rm Sq(3)[448]} \item[448] {\rm Sq(0,1)[449]} \\ $h_{2}:$ [442], [441] \\ $h_{4}:$ [356] \item[449] {\rm Sq(3)[451] + Sq(0,1)[451] + Sq(3)[450] + Sq(0,1)[450]} \\ $h_{2}:$ [442], [441] \\ $h_{4}:$ [356], [355] \item[450] {\rm Sq(2)[453]} \\ $h_{1}:$ [453] \\ $h_{2}:$ [442], [441] \\ $h_{4}:$ [356], [355] \item[451] {\rm Sq(1)[463] + Sq(1)[462]} \\ $h_{0}:$ [463], [462] \\ $h_{1}:$ [458] \\ $h_{2}:$ [444], [443] \\ $h_{3}:$ [413], [411], [410] \\ $h_{4}:$ [355] \\ $h_{7}:$ [36] \item[452] {\rm Sq(1)[464]} \\ $h_{0}:$ [464] \\ $h_{1}:$ [458] \\ $h_{2}:$ [444], [443] \\ $h_{4}:$ [356] \\ $h_{7}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[15/204] \mb{15/204} \begin{gl} \item[461] {\rm Sq(2)[455]} \\ $h_{1}:$ [455] \\ $h_{3}:$ [414], [412] \\ $h_{4}:$ [366], [365], [364], [363] \item[462] {\rm Sq(1)[463]} \\ $h_{0}:$ [463] \\ $h_{2}:$ [447], [446], [445] \\ $h_{3}:$ [415] \\ $h_{7}:$ [39] \item[463] {\rm Sq(1)[464] + Sq(1)[462]} \\ $h_{0}:$ [464], [462] \\ $h_{2}:$ [447], [446], [445], [444], [443], [442] \\ $h_{3}:$ [415], [412] \item[464] {\rm Sq(1)[465]} \\ $h_{0}:$ [465] \\ $h_{2}:$ [444], [443], [442] \\ $h_{7}:$ [39] \item[465] {\rm Sq(1)[468] + Sq(1)[466] + Sq(1)[461]} \\ $h_{0}:$ [468], [466], [461] \\ $h_{3}:$ [412] \\ $h_{4}:$ [369], [368], [367], [363], [362] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[14/204] \mb{14/204} \begin{gl} \item[461] {\rm Sq(3)[436] + Sq(0,1)[436]} \\ $h_{2}:$ [432], [431], [430], [429], [428] \\ $h_{3}:$ [405], [402] \\ $h_{4}:$ [359] \\ $h_{7}:$ [38] \item[462] {\rm Sq(0,1)[437] + Sq(0,1)[436]} \\ $h_{2}:$ [432], [431], [430], [429], [428] \\ $h_{3}:$ [405], [403], [402] \\ $h_{7}:$ [38] \item[463] {\rm Sq(3)[437] + Sq(0,1)[436]} \\ $h_{2}:$ [432], [431], [430], [429], [428] \\ $h_{3}:$ [405], [403], [402] \\ $h_{7}:$ [38] \item[464] {\rm Sq(3)[438] + Sq(0,1)[438]} \\ $h_{7}:$ [38] \item[465] {\rm Sq(3)[439] + Sq(0,1)[439]} \\ $h_{7}:$ [38] \item[466] {\rm Sq(1)[448]} \\ $h_{0}:$ [448] \\ $h_{2}:$ [431] \\ $h_{3}:$ [403] \\ $h_{4}:$ [359] \\ $h_{7}:$ [38] \item[467] {\rm Sq(1)[451] + Sq(1)[450]} \\ $h_{0}:$ [451], [450] \\ $h_{2}:$ [432], [430] \\ $h_{3}:$ [411], [410], [404], [402] \\ $h_{4}:$ [361], [359] \\ $h_{6}:$ [187], [186] \item[468] {\rm Sq(1)[454] + Sq(1)[450] + Sq(1)[449]} \\ $h_{0}:$ [454], [450], [449] \\ $h_{2}:$ [432], [430], [429], [428] \\ $h_{3}:$ [405], [403], [402] \\ $h_{4}:$ [362], [361], [359] \\ $h_{7}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[13/204] \mb{13/204} \begin{gl} \item[448] {\rm Sq(0,1)[425] + Sq(3)[424] + Sq(0,1)[424]} \item[449] {\rm Sq(3)[429] + Sq(0,1)[429] + Sq(3)[426] + Sq(0,1)[424] + Sq(3)[423] + Sq(0,1)[423]} \\ $h_{4}:$ [357] \item[450] {\rm Sq(3)[430] + Sq(0,1)[430] + Sq(3)[427] + Sq(3)[426] + Sq(3)[425] + Sq(0,1)[424] + Sq(0,1)[423]} \\ $h_{7}:$ [41] \item[451] {\rm Sq(1)[437] + Sq(1)[436] + Sq(1)[435]} \\ $h_{0}:$ [437], [436], [435] \\ $h_{3}:$ [401], [400] \\ $h_{4}:$ [357] \\ $h_{7}:$ [41] \item[452] {\rm Sq(1)[440]} \\ $h_{0}:$ [440] \\ $h_{2}:$ [420], [419], [418] \\ $h_{3}:$ [399] \\ $h_{4}:$ [357] \item[453] {\rm Sq(1)[441] + Sq(1)[436]} \\ $h_{0}:$ [441], [436] \\ $h_{1}:$ [431] \\ $h_{2}:$ [421], [420], [418] \\ $h_{3}:$ [401], [400], [399] \\ $h_{4}:$ [358] \\ $h_{7}:$ [41] \item[454] {\rm Sq(1)[443] + Sq(1)[438] + Sq(1)[435]} \\ $h_{0}:$ [443], [438], [435] \\ $h_{4}:$ [359] \\ $h_{7}:$ [42], [41] \end{gl} \end{bdl} \begin{bdl} \item[12/204] \mb{12/204} \begin{gl} \item[435] {\rm Sq(1,1)[406] + Sq(1,1)[405] + Sq(4)[404] + Sq(1,1)[404] + Sq(1,1)[403] + Sq(4)[402] + Sq(4)[401]} \\ $h_{2}:$ [404], [402], [401] \\ $h_{3}:$ [390] \\ $h_{4}:$ [356], [355], [354] \item[436] {\rm Sq(3)[409] + Sq(0,1)[409]} \\ $h_{3}:$ [390], [389], [388] \\ $h_{7}:$ [45] \item[437] {\rm Sq(3)[410] + Sq(0,1)[410] + Sq(3)[408] + Sq(0,1)[408]} \\ $h_{2}:$ [404], [402], [401] \\ $h_{3}:$ [390] \\ $h_{4}:$ [356], [355], [354] \\ $h_{7}:$ [45] \item[438] {\rm Sq(3)[411] + Sq(0,1)[411]} \\ $h_{2}:$ [405], [404], [401] \\ $h_{3}:$ [390] \\ $h_{4}:$ [356], [355] \\ $h_{7}:$ [45] \item[439] {\rm Sq(2)[415]} \\ $h_{1}:$ [415] \\ $h_{2}:$ [405], [402] \\ $h_{3}:$ [390], [389], [388] \\ $h_{4}:$ [354] \\ $h_{7}:$ [45] \item[440] {\rm Sq(1)[419]} \\ $h_{0}:$ [419] \\ $h_{2}:$ [403], [402] \item[441] {\rm Sq(1)[420]} \\ $h_{0}:$ [420] \\ $h_{2}:$ [405], [403] \\ $h_{4}:$ [356], [355] \\ $h_{7}:$ [45] \item[442] {\rm Sq(1)[421]} \\ $h_{0}:$ [421] \\ $h_{1}:$ [416], [414], [412] \\ $h_{2}:$ [404], [402], [401] \\ $h_{3}:$ [390] \\ $h_{4}:$ [355] \\ $h_{7}:$ [45] \item[443] {\rm Sq(1)[422]} \\ $h_{0}:$ [422] \\ $h_{2}:$ [405], [402] \\ $h_{4}:$ [357], [354] \\ $h_{7}:$ [46], [45] \end{gl} \end{bdl} \begin{bdl} \item[11/204] \mb{11/204} \begin{gl} \item[419] {\rm Sq(0,1)[380]} \item[420] {\rm Sq(3)[384] + Sq(3)[383] + Sq(3)[382] + Sq(0,1)[382] + Sq(3)[379]} \item[421] {\rm Sq(1)[391] + Sq(1)[390] + Sq(1)[389]} \\ $h_{0}:$ [391], [390], [389] \item[422] {\rm Sq(1)[393] + Sq(1)[389]} \\ $h_{0}:$ [393], [389] \\ $h_{7}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[10/204] \mb{10/204} \begin{gl} \item[389] {\rm Sq(5)[341] + Sq(2,1)[341] + Sq(5)[340] + Sq(2,1)[340]} \item[390] {\rm Sq(1,1)[343]} \item[391] {\rm Sq(3)[346] + Sq(0,1)[346]} \item[392] {\rm Sq(2)[349] + Sq(2)[348] + Sq(2)[347]} \\ $h_{1}:$ [349], [348], [347] \\ $h_{4}:$ [308] \item[393] {\rm Sq(1)[354]} \\ $h_{0}:$ [354] \\ $h_{7}:$ [53] \item[394] {\rm Sq(1)[355] + Sq(1)[353]} \\ $h_{0}:$ [355], [353] \\ $h_{1}:$ [350] \\ $h_{2}:$ [343] \\ $h_{3}:$ [333] \\ $h_{4}:$ [306] \\ $h_{5}:$ [282], [281] \\ $h_{6}:$ [186], [185] \\ $h_{7}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[9/204] \mb{9/204} \begin{gl} \item[353] {\rm Sq(3)[301] + Sq(0,1)[301]} \\ $h_{7}:$ [57] \item[354] {\rm Sq(1)[306]} \\ $h_{0}:$ [306] \\ $h_{7}:$ [58], [57] \item[355] {\rm Sq(1)[309] + Sq(1)[308]} \\ $h_{0}:$ [309], [308] \\ $h_{7}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[8/204] \mb{8/204} \begin{gl} \item[306] {\rm Sq(5,1)[251] + Sq(2,2)[251] + Sq(1,0,1)[250]} \\ $h_{7}:$ [56] \item[307] {\rm Sq(7)[254] + Sq(1,2)[254] + Sq(1,2)[253] + Sq(0,0,1)[253] + Sq(7)[252] + Sq(4,1)[252] + Sq(1,2)[252] + Sq(0,0,1)[252]} \\ $h_{3}:$ [250] \\ $h_{7}:$ [57], [56] \item[308] {\rm Sq(1,1)[255]} \\ $h_{7}:$ [57] \item[309] {\rm Sq(1,1)[256]} \item[310] {\rm Sq(2)[258]} \\ $h_{1}:$ [258] \\ $h_{3}:$ [250] \\ $h_{7}:$ [58], [56] \end{gl} \end{bdl} \begin{bdl} \item[7/204] \mb{7/204} \begin{gl} \item[260] {\rm Sq(2)[208]} \\ $h_{1}:$ [208] \\ $h_{4}:$ [192], [191] \\ $h_{7}:$ [54] \item[261] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{5}:$ [175] \\ $h_{6}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[6/204] \mb{6/204} \begin{gl} \item[210] {\rm Sq(2)[147]} \\ $h_{1}:$ [147] \\ $h_{4}:$ [138] \\ $h_{5}:$ [128] \item[211] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{5}:$ [129] \\ $h_{6}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[5/204] \mb{5/204} \begin{gl} \item[148] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{5}:$ [86] \end{gl} \end{bdl} \begin{bdl} \item[4/204] \mb{4/204} \begin{gl} \item[93] {\rm Sq(10,2)[56] + Sq(3,2,1)[56] + Sq(0,3,1)[56]} \\ $h_{5}:$ [55] \end{gl} \end{bdl} \dm{205} \begin{bdl} \item[97/205] \mb{97/205} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{1}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[96/205] \mb{96/205} \begin{gl} \item[8] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \\ $h_{2}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[95/205] \mb{95/205} \begin{gl} \item[7] {\rm Sq(1,1)[9]} \end{gl} \end{bdl} \begin{bdl} \item[92/205] \mb{92/205} \begin{gl} \item[13] {\rm Sq(0,1)[11]} \end{gl} \end{bdl} \begin{bdl} \item[89/205] \mb{89/205} \begin{gl} \item[20] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[86/205] \mb{86/205} \begin{gl} \item[20] {\rm Sq(0,1)[23]} \end{gl} \end{bdl} \begin{bdl} \item[85/205] \mb{85/205} \begin{gl} \item[25] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \\ $h_{3}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[84/205] \mb{84/205} \begin{gl} \item[27] {\rm Sq(1)[28]} \\ $h_{0}:$ [28] \\ $h_{3}:$ [19] \end{gl} \end{bdl} \begin{bdl} \item[83/205] \mb{83/205} \begin{gl} \item[27] {\rm Sq(0,1)[27]} \item[28] {\rm Sq(1)[30]} \\ $h_{0}:$ [30] \\ $h_{3}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[82/205] \mb{82/205} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{3}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[81/205] \mb{81/205} \begin{gl} \item[33] {\rm Sq(2)[32]} \\ $h_{1}:$ [32] \item[34] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[80/205] \mb{80/205} \begin{gl} \item[33] {\rm Sq(1,1)[33]} \item[34] {\rm Sq(0,1)[34]} \end{gl} \end{bdl} \begin{bdl} \item[79/205] \mb{79/205} \begin{gl} \item[36] {\rm Sq(1)[40]} \\ $h_{0}:$ [40] \\ $h_{1}:$ [38] \\ $h_{2}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[78/205] \mb{78/205} \begin{gl} \item[40] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37] \item[41] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [39], [37] \\ $h_{4}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[77/205] \mb{77/205} \begin{gl} \item[41] {\rm Sq(0,1)[39]} \item[42] {\rm Sq(0,1)[40]} \item[43] {\rm Sq(1)[43]} \\ $h_{0}:$ [43] \\ $h_{2}:$ [38] \\ $h_{4}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[76/205] \mb{76/205} \begin{gl} \item[41] {\rm Sq(1,1)[45]} \item[42] {\rm Sq(2)[47]} \\ $h_{1}:$ [47] \item[43] {\rm Sq(1)[49]} \\ $h_{0}:$ [49] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[75/205] \mb{75/205} \begin{gl} \item[49] {\rm Sq(1)[58]} \\ $h_{0}:$ [58] \\ $h_{4}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[74/205] \mb{74/205} \begin{gl} \item[56] {\rm Sq(0,1)[55]} \item[57] {\rm Sq(0,1)[56]} \item[58] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[73/205] \mb{73/205} \begin{gl} \item[58] {\rm Sq(0,1)[53]} \item[59] {\rm Sq(1)[57]} \\ $h_{0}:$ [57] \\ $h_{4}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[72/205] \mb{72/205} \begin{gl} \item[57] {\rm Sq(1)[60] + Sq(1)[59]} \\ $h_{0}:$ [60], [59] \\ $h_{4}:$ [36] \end{gl} \end{bdl} \begin{bdl} \item[71/205] \mb{71/205} \begin{gl} \item[57] {\rm Sq(0,1)[58]} \item[58] {\rm Sq(0,1)[59]} \item[59] {\rm Sq(1)[64]} \\ $h_{0}:$ [64] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \\ $h_{4}:$ [39] \item[60] {\rm Sq(1)[65]} \\ $h_{0}:$ [65] \\ $h_{1}:$ [61] \\ $h_{2}:$ [57] \\ $h_{3}:$ [52] \end{gl} \end{bdl} \begin{bdl} \item[70/205] \mb{70/205} \begin{gl} \item[63] {\rm Sq(0,1)[61]} \item[64] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [60] \\ $h_{3}:$ [55] \item[65] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \\ $h_{2}:$ [60] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[69/205] \mb{69/205} \begin{gl} \item[67] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{2}:$ [61] \item[68] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{2}:$ [61] \\ $h_{3}:$ [55] \item[69] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \\ $h_{2}:$ [61] \\ $h_{3}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[68/205] \mb{68/205} \begin{gl} \item[68] {\rm Sq(0,1)[69]} \item[69] {\rm Sq(0,1)[70]} \item[70] {\rm Sq(0,1)[71]} \item[71] {\rm Sq(1)[76]} \\ $h_{0}:$ [76] \\ $h_{3}:$ [61] \item[72] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[67/205] \mb{67/205} \begin{gl} \item[75] {\rm Sq(0,1)[77]} \item[76] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \item[77] {\rm Sq(1)[83]} \\ $h_{0}:$ [83] \end{gl} \end{bdl} \begin{bdl} \item[66/205] \mb{66/205} \begin{gl} \item[82] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \item[83] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[65/205] \mb{65/205} \begin{gl} \item[83] {\rm Sq(0,1)[82]} \item[84] {\rm Sq(3)[82]} \item[85] {\rm Sq(0,1)[83]} \item[86] {\rm Sq(0,1)[84]} \item[87] {\rm Sq(3)[85]} \end{gl} \end{bdl} \begin{bdl} \item[64/205] \mb{64/205} \begin{gl} \item[87] {\rm Sq(0,1)[89]} \end{gl} \end{bdl} \begin{bdl} \item[63/205] \mb{63/205} \begin{gl} \item[94] {\rm Sq(1)[102]} \\ $h_{0}:$ [102] \\ $h_{1}:$ [97], [96] \\ $h_{2}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[62/205] \mb{62/205} \begin{gl} \item[99] {\rm Sq(0,1)[100]} \item[100] {\rm Sq(0,1)[101]} \item[101] {\rm Sq(0,1)[102]} \item[102] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [98] \end{gl} \end{bdl} \begin{bdl} \item[61/205] \mb{61/205} \begin{gl} \item[103] {\rm Sq(1,1)[106]} \item[104] {\rm Sq(0,1)[107]} \item[105] {\rm Sq(0,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[60/205] \mb{60/205} \begin{gl} \item[112] {\rm Sq(2)[123]} \\ $h_{1}:$ [123] \end{gl} \end{bdl} \begin{bdl} \item[59/205] \mb{59/205} \begin{gl} \item[124] {\rm Sq(0,1)[125]} \item[125] {\rm Sq(0,1)[126]} \item[126] {\rm Sq(0,1)[127]} \end{gl} \end{bdl} \begin{bdl} \item[58/205] \mb{58/205} \begin{gl} \item[130] {\rm Sq(0,1)[123]} \item[131] {\rm Sq(0,1)[124]} \item[132] {\rm Sq(0,1)[125]} \end{gl} \end{bdl} \begin{bdl} \item[57/205] \mb{57/205} \begin{gl} \item[132] {\rm Sq(0,1)[126]} \end{gl} \end{bdl} \begin{bdl} \item[56/205] \mb{56/205} \begin{gl} \item[133] {\rm Sq(0,1)[132]} \item[134] {\rm Sq(0,1)[133]} \item[135] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[55/205] \mb{55/205} \begin{gl} \item[139] {\rm Sq(0,1)[137]} \item[140] {\rm Sq(0,1)[138]} \item[141] {\rm Sq(0,1)[139]} \item[142] {\rm Sq(1)[148]} \\ $h_{0}:$ [148] \\ $h_{1}:$ [145] \\ $h_{2}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[54/205] \mb{54/205} \begin{gl} \item[147] {\rm Sq(0,1)[141]} \item[148] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{2}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[53/205] \mb{53/205} \begin{gl} \item[149] {\rm Sq(0,1)[148]} \item[150] {\rm Sq(0,1)[149]} \item[151] {\rm Sq(0,1)[150]} \item[152] {\rm Sq(1)[154]} \\ $h_{0}:$ [154] \\ $h_{2}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[52/205] \mb{52/205} \begin{gl} \item[154] {\rm Sq(0,1)[161]} \item[155] {\rm Sq(0,1)[162]} \item[156] {\rm Sq(0,1)[163]} \item[157] {\rm Sq(0,1)[164]} \item[158] {\rm Sq(2)[169] + Sq(2)[168]} \\ $h_{1}:$ [169], [168] \end{gl} \end{bdl} \begin{bdl} \item[51/205] \mb{51/205} \begin{gl} \item[170] {\rm Sq(0,1)[174]} \end{gl} \end{bdl} \begin{bdl} \item[50/205] \mb{50/205} \begin{gl} \item[179] {\rm Sq(0,1)[176]} \item[180] {\rm Sq(0,1)[177]} \item[181] {\rm Sq(0,1)[178]} \item[182] {\rm Sq(0,1)[179]} \end{gl} \end{bdl} \begin{bdl} \item[49/205] \mb{49/205} \begin{gl} \item[184] {\rm Sq(0,1)[179]} \item[185] {\rm Sq(0,1)[180]} \item[186] {\rm Sq(0,1)[181]} \item[187] {\rm Sq(3)[184] + Sq(0,1)[184] + Sq(3)[182]} \end{gl} \end{bdl} \begin{bdl} \item[48/205] \mb{48/205} \begin{gl} \item[191] {\rm Sq(0,1)[190]} \item[192] {\rm Sq(1)[204]} \\ $h_{0}:$ [204] \\ $h_{3}:$ [172] \\ $h_{4}:$ [143] \\ $h_{5}:$ [93] \end{gl} \end{bdl} \begin{bdl} \item[47/205] \mb{47/205} \begin{gl} \item[198] {\rm Sq(0,1)[200]} \item[199] {\rm Sq(0,1)[201]} \item[200] {\rm Sq(0,1)[202]} \item[201] {\rm Sq(0,1)[203]} \item[202] {\rm Sq(1)[209]} \\ $h_{0}:$ [209] \\ $h_{1}:$ [206] \item[203] {\rm Sq(1)[211]} \\ $h_{0}:$ [211] \\ $h_{1}:$ [207], [206] \item[204] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{3}:$ [180] \\ $h_{4}:$ [149] \end{gl} \end{bdl} \begin{bdl} \item[46/205] \mb{46/205} \begin{gl} \item[209] {\rm Sq(1,1)[210] + Sq(1,1)[209]} \item[210] {\rm Sq(0,1)[212]} \item[211] {\rm Sq(0,1)[213]} \item[212] {\rm Sq(0,1)[214]} \item[213] {\rm Sq(0,1)[215]} \item[214] {\rm Sq(1)[226] + Sq(1)[225]} \\ $h_{0}:$ [226], [225] \\ $h_{2}:$ [209] \\ $h_{3}:$ [189] \item[215] {\rm Sq(1)[227]} \\ $h_{0}:$ [227] \\ $h_{3}:$ [189] \\ $h_{4}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[45/205] \mb{45/205} \begin{gl} \item[224] {\rm Sq(0,1)[222] + Sq(0,1)[221]} \item[225] {\rm Sq(1)[236]} \\ $h_{0}:$ [236] \\ $h_{1}:$ [228] \\ $h_{2}:$ [219], [214] \\ $h_{4}:$ [161] \item[226] {\rm Sq(1)[237] + Sq(1)[234] + Sq(1)[230]} \\ $h_{0}:$ [237], [234], [230] \\ $h_{1}:$ [228] \\ $h_{2}:$ [219] \\ $h_{3}:$ [192] \\ $h_{4}:$ [161] \item[227] {\rm Sq(1)[238]} \\ $h_{0}:$ [238] \\ $h_{3}:$ [192] \\ $h_{4}:$ [162] \end{gl} \end{bdl} \begin{bdl} \item[44/205] \mb{44/205} \begin{gl} \item[230] {\rm Sq(1,1)[231]} \item[231] {\rm Sq(0,1)[232]} \item[232] {\rm Sq(0,1)[233]} \item[233] {\rm Sq(0,1)[234]} \item[234] {\rm Sq(0,1)[235]} \item[235] {\rm Sq(2)[240]} \\ $h_{1}:$ [240] \item[236] {\rm Sq(1)[246] + Sq(1)[243]} \\ $h_{0}:$ [246], [243] \\ $h_{2}:$ [229] \\ $h_{4}:$ [172] \item[237] {\rm Sq(1)[247] + Sq(1)[243]} \\ $h_{0}:$ [247], [243] \\ $h_{2}:$ [229] \\ $h_{4}:$ [172] \item[238] {\rm Sq(1)[248]} \\ $h_{0}:$ [248] \\ $h_{4}:$ [173] \end{gl} \end{bdl} \begin{bdl} \item[43/205] \mb{43/205} \begin{gl} \item[242] {\rm Sq(0,1)[243]} \item[243] {\rm Sq(0,1)[244]} \item[244] {\rm Sq(0,1)[246]} \item[245] {\rm Sq(0,1)[247]} \item[246] {\rm Sq(3)[249] + Sq(0,1)[249] + Sq(3)[248] + Sq(0,1)[248] + Sq(0,1)[245]} \item[247] {\rm Sq(1)[258]} \\ $h_{0}:$ [258] \item[248] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{4}:$ [184], [183] \end{gl} \end{bdl} \begin{bdl} \item[42/205] \mb{42/205} \begin{gl} \item[256] {\rm Sq(0,1)[252]} \item[257] {\rm Sq(0,1)[253]} \item[258] {\rm Sq(3)[255] + Sq(0,1)[255] + Sq(3)[254] + Sq(0,1)[254]} \item[259] {\rm Sq(1)[268] + Sq(1)[263]} \\ $h_{0}:$ [268], [263] \\ $h_{4}:$ [191], [190] \end{gl} \end{bdl} \begin{bdl} \item[41/205] \mb{41/205} \begin{gl} \item[263] {\rm Sq(1,1)[253] + Sq(1,1)[252] + Sq(1,1)[251] + Sq(1,1)[247]} \item[264] {\rm Sq(0,1)[254]} \item[265] {\rm Sq(0,1)[255]} \item[266] {\rm Sq(0,1)[256]} \item[267] {\rm Sq(0,1)[257]} \item[268] {\rm Sq(1)[270] + Sq(1)[265]} \\ $h_{0}:$ [270], [265] \\ $h_{4}:$ [190], [189] \end{gl} \end{bdl} \begin{bdl} \item[40/205] \mb{40/205} \begin{gl} \item[265] {\rm Sq(0,1)[258]} \item[266] {\rm Sq(0,1)[259]} \item[267] {\rm Sq(0,1)[260]} \item[268] {\rm Sq(0,1)[262]} \item[269] {\rm Sq(3)[264] + Sq(0,1)[264] + Sq(0,1)[261] + Sq(3)[258]} \item[270] {\rm Sq(1)[274]} \\ $h_{0}:$ [274] \end{gl} \end{bdl} \begin{bdl} \item[39/205] \mb{39/205} \begin{gl} \item[270] {\rm Sq(0,1)[266]} \item[271] {\rm Sq(0,1)[267]} \item[272] {\rm Sq(0,1)[268]} \item[273] {\rm Sq(1)[283] + Sq(1)[282] + Sq(1)[281] + Sq(1)[280] + Sq(1)[279]} \\ $h_{0}:$ [283], [282], [281], [280], [279] \\ $h_{1}:$ [276], [275], [274], [271] \\ $h_{2}:$ [265] \\ $h_{3}:$ [249], [244] \item[274] {\rm Sq(1)[284] + Sq(1)[282]} \\ $h_{0}:$ [284], [282] \end{gl} \end{bdl} \begin{bdl} \item[38/205] \mb{38/205} \begin{gl} \item[279] {\rm Sq(1,1)[275]} \item[280] {\rm Sq(0,1)[279]} \item[281] {\rm Sq(0,1)[281]} \item[282] {\rm Sq(3)[282] + Sq(0,1)[282] + Sq(0,1)[280]} \item[283] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{2}:$ [278] \\ $h_{3}:$ [259], [258] \item[284] {\rm Sq(1)[296]} \\ $h_{0}:$ [296] \end{gl} \end{bdl} \begin{bdl} \item[37/205] \mb{37/205} \begin{gl} \item[289] {\rm Sq(0,1)[288]} \item[290] {\rm Sq(0,1)[289]} \item[291] {\rm Sq(0,1)[290]} \item[292] {\rm Sq(0,1)[291]} \item[293] {\rm Sq(2)[294]} \\ $h_{1}:$ [294] \item[294] {\rm Sq(1)[299]} \\ $h_{0}:$ [299] \\ $h_{2}:$ [285] \item[295] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{2}:$ [285] \item[296] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \end{gl} \end{bdl} \begin{bdl} \item[36/205] \mb{36/205} \begin{gl} \item[299] {\rm Sq(0,1)[293]} \item[300] {\rm Sq(0,1)[294]} \item[301] {\rm Sq(0,1)[296] + Sq(0,1)[295]} \item[302] {\rm Sq(2)[300] + Sq(2)[299]} \\ $h_{1}:$ [300], [299] \item[303] {\rm Sq(1)[307]} \\ $h_{0}:$ [307] \item[304] {\rm Sq(1)[310] + Sq(1)[306]} \\ $h_{0}:$ [310], [306] \end{gl} \end{bdl} \begin{bdl} \item[35/205] \mb{35/205} \begin{gl} \item[305] {\rm Sq(2,1)[298]} \item[306] {\rm Sq(1,1)[302] + Sq(1,1)[301]} \item[307] {\rm Sq(0,1)[307] + Sq(0,1)[306]} \item[308] {\rm Sq(3)[307] + Sq(3)[306] + Sq(0,1)[306]} \item[309] {\rm Sq(0,1)[309] + Sq(0,1)[306]} \item[310] {\rm Sq(1)[316]} \\ $h_{0}:$ [316] \end{gl} \end{bdl} \begin{bdl} \item[34/205] \mb{34/205} \begin{gl} \item[312] {\rm Sq(0,1)[313] + Sq(0,1)[312]} \item[313] {\rm Sq(0,1)[314]} \item[314] {\rm Sq(0,1)[315]} \item[315] {\rm Sq(0,1)[316]} \item[316] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \end{gl} \end{bdl} \begin{bdl} \item[33/205] \mb{33/205} \begin{gl} \item[325] {\rm Sq(0,1)[315] + Sq(0,1)[314]} \item[326] {\rm Sq(3)[316]} \end{gl} \end{bdl} \begin{bdl} \item[32/205] \mb{32/205} \begin{gl} \item[326] {\rm Sq(1,1)[313] + Sq(1,1)[309]} \item[327] {\rm Sq(0,1)[315]} \item[328] {\rm Sq(0,1)[316]} \item[329] {\rm Sq(2)[321]} \\ $h_{1}:$ [321] \item[330] {\rm Sq(1)[327]} \\ $h_{0}:$ [327] \\ $h_{1}:$ [319] \\ $h_{2}:$ [314] \\ $h_{4}:$ [255], [253] \item[331] {\rm Sq(1)[330] + Sq(1)[323]} \\ $h_{0}:$ [330], [323] \\ $h_{1}:$ [319] \\ $h_{2}:$ [314] \\ $h_{3}:$ [292] \\ $h_{4}:$ [255], [253] \\ $h_{6}:$ [97], [95] \\ $h_{7}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[31/205] \mb{31/205} \begin{gl} \item[323] {\rm Sq(3)[319]} \item[324] {\rm Sq(0,1)[320]} \item[325] {\rm Sq(0,1)[321] + Sq(0,1)[319]} \item[326] {\rm Sq(2)[324]} \\ $h_{1}:$ [324] \\ $h_{2}:$ [316] \\ $h_{7}:$ [10] \item[327] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{2}:$ [316] \item[328] {\rm Sq(1)[331]} \\ $h_{0}:$ [331] \\ $h_{1}:$ [327] \\ $h_{7}:$ [10] \item[329] {\rm Sq(1)[332] + Sq(1)[329]} \\ $h_{0}:$ [332], [329] \item[330] {\rm Sq(1)[333] + Sq(1)[329]} \\ $h_{0}:$ [333], [329] \\ $h_{2}:$ [316] \\ $h_{3}:$ [301], [299], [298] \\ $h_{7}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[30/205] \mb{30/205} \begin{gl} \item[329] {\rm Sq(3,1)[317] + Sq(3,1)[315] + Sq(0,2)[315]} \item[330] {\rm Sq(1,1)[326] + Sq(1,1)[325] + Sq(1,1)[324]} \item[331] {\rm Sq(0,1)[329]} \item[332] {\rm Sq(3)[329]} \item[333] {\rm Sq(1)[338] + Sq(1)[336]} \\ $h_{0}:$ [338], [336] \\ $h_{3}:$ [308], [304], [303] \end{gl} \end{bdl} \begin{bdl} \item[29/205] \mb{29/205} \begin{gl} \item[335] {\rm Sq(0,1)[331]} \item[336] {\rm Sq(3)[332] + Sq(0,1)[332] + Sq(3)[331]} \item[337] {\rm Sq(0,1)[333] + Sq(0,1)[332]} \item[338] {\rm Sq(1)[339] + Sq(1)[336]} \\ $h_{0}:$ [339], [336] \\ $h_{3}:$ [308] \end{gl} \end{bdl} \begin{bdl} \item[28/205] \mb{28/205} \begin{gl} \item[336] {\rm Sq(1,1)[329] + Sq(1,1)[328] + Sq(1,1)[327]} \item[337] {\rm Sq(0,1)[331] + Sq(0,1)[330]} \item[338] {\rm Sq(3)[334] + Sq(0,1)[334] + Sq(3)[333] + Sq(3)[331] + Sq(3)[330] + Sq(0,1)[330]} \\ $h_{7}:$ [12] \item[339] {\rm Sq(1)[340] + Sq(1)[339]} \\ $h_{0}:$ [340], [339] \end{gl} \end{bdl} \begin{bdl} \item[27/205] \mb{27/205} \begin{gl} \item[339] {\rm Sq(2,1)[330] + Sq(5)[329] + Sq(2,1)[329] + Sq(5)[328] + Sq(2,1)[328]} \item[340] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \end{gl} \end{bdl} \begin{bdl} \item[26/205] \mb{26/205} \begin{gl} \item[344] {\rm Sq(1,1)[337] + Sq(1,1)[335] + Sq(1,1)[334]} \item[345] {\rm Sq(3)[339] + Sq(0,1)[339]} \item[346] {\rm Sq(3)[341] + Sq(3)[340] + Sq(0,1)[339]} \item[347] {\rm Sq(1)[347] + Sq(1)[346]} \\ $h_{0}:$ [347], [346] \\ $h_{1}:$ [344] \\ $h_{2}:$ [337] \\ $h_{3}:$ [323], [322] \\ $h_{4}:$ [289], [287] \end{gl} \end{bdl} \begin{bdl} \item[25/205] \mb{25/205} \begin{gl} \item[346] {\rm Sq(0,1)[336]} \item[347] {\rm Sq(3)[341] + Sq(0,1)[341] + Sq(3)[340] + Sq(0,1)[340] + Sq(3)[339] + Sq(3)[337] + Sq(0,1)[337] + Sq(3)[336]} \\ $h_{2}:$ [334] \\ $h_{3}:$ [323], [322], [321] \\ $h_{4}:$ [291] \item[348] {\rm Sq(2)[343] + Sq(2)[342]} \\ $h_{1}:$ [343], [342] \\ $h_{2}:$ [334] \\ $h_{3}:$ [323], [322], [321] \\ $h_{4}:$ [291] \\ $h_{7}:$ [20] \item[349] {\rm Sq(2)[344]} \\ $h_{1}:$ [344] \\ $h_{2}:$ [334] \\ $h_{3}:$ [322], [321] \end{gl} \end{bdl} \begin{bdl} \item[24/205] \mb{24/205} \begin{gl} \item[345] {\rm Sq(1,1)[338] + Sq(1,1)[337]} \item[346] {\rm Sq(1,1)[340] + Sq(1,1)[339]} \item[347] {\rm Sq(3)[342] + Sq(0,1)[342]} \item[348] {\rm Sq(3)[343] + Sq(0,1)[343] + Sq(0,1)[342] + Sq(3)[341]} \\ $h_{7}:$ [18] \item[349] {\rm Sq(2)[345]} \\ $h_{1}:$ [345] \\ $h_{2}:$ [339], [338], [337] \\ $h_{3}:$ [325] \\ $h_{4}:$ [295] \end{gl} \end{bdl} \begin{bdl} \item[23/205] \mb{23/205} \begin{gl} \item[349] {\rm Sq(1,1)[353] + Sq(1,1)[352]} \item[350] {\rm Sq(1)[372] + Sq(1)[371] + Sq(1)[370] + Sq(1)[367]} \\ $h_{0}:$ [372], [371], [370], [367] \\ $h_{1}:$ [365], [363] \item[351] {\rm Sq(1)[373] + Sq(1)[369]} \\ $h_{0}:$ [373], [369] \\ $h_{1}:$ [364], [360] \end{gl} \end{bdl} \begin{bdl} \item[22/205] \mb{22/205} \begin{gl} \item[367] {\rm Sq(3)[373] + Sq(0,1)[373] + Sq(3)[371] + Sq(0,1)[371] + Sq(3)[370] + Sq(3)[369] + Sq(0,1)[369]} \\ $h_{7}:$ [26] \item[368] {\rm Sq(2)[375]} \\ $h_{1}:$ [375] \\ $h_{2}:$ [363] \\ $h_{3}:$ [350] \\ $h_{7}:$ [26] \item[369] {\rm Sq(1)[378]} \\ $h_{0}:$ [378] \\ $h_{2}:$ [365], [364] \\ $h_{7}:$ [26] \item[370] {\rm Sq(1)[379]} \\ $h_{0}:$ [379] \\ $h_{2}:$ [365], [364] \\ $h_{3}:$ [353], [349] \\ $h_{7}:$ [26] \item[371] {\rm Sq(1)[380]} \\ $h_{0}:$ [380] \\ $h_{1}:$ [376] \\ $h_{2}:$ [365], [364] \\ $h_{3}:$ [353], [350] \item[372] {\rm Sq(1)[381]} \\ $h_{0}:$ [381] \\ $h_{1}:$ [376] \\ $h_{3}:$ [350], [349] \item[373] {\rm Sq(1)[383]} \\ $h_{0}:$ [383] \\ $h_{2}:$ [365], [364] \\ $h_{7}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[21/205] \mb{21/205} \begin{gl} \item[378] {\rm Sq(3,1)[365] + Sq(0,2)[365]} \item[379] {\rm Sq(0,1)[377]} \\ $h_{3}:$ [359] \item[380] {\rm Sq(3)[378] + Sq(3)[377]} \\ $h_{3}:$ [359] \item[381] {\rm Sq(3)[379]} \item[382] {\rm Sq(3)[382] + Sq(0,1)[382] + Sq(3)[380] + Sq(0,1)[380] + Sq(3)[377]} \item[383] {\rm Sq(3)[383] + Sq(0,1)[383] + Sq(3)[380] + Sq(0,1)[380]} \item[384] {\rm Sq(2)[386] + Sq(2)[385]} \\ $h_{1}:$ [386], [385] \item[385] {\rm Sq(1)[393] + Sq(1)[390]} \\ $h_{0}:$ [393], [390] \\ $h_{2}:$ [375], [374] \\ $h_{7}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[20/205] \mb{20/205} \begin{gl} \item[390] {\rm Sq(3)[396] + Sq(0,1)[396] + Sq(0,1)[395]} \item[391] {\rm Sq(2)[400]} \\ $h_{1}:$ [400] \\ $h_{2}:$ [390], [389], [387], [386] \item[392] {\rm Sq(1)[408] + Sq(1)[407] + Sq(1)[406] + Sq(1)[405]} \\ $h_{0}:$ [408], [407], [406], [405] \\ $h_{2}:$ [389], [387], [386] \\ $h_{7}:$ [29] \item[393] {\rm Sq(1)[409] + Sq(1)[407]} \\ $h_{0}:$ [409], [407] \\ $h_{2}:$ [389], [387], [386] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[19/205] \mb{19/205} \begin{gl} \item[404] {\rm Sq(2,1)[402] + Sq(5)[401] + Sq(2,1)[401] + Sq(2,1)[400]} \item[405] {\rm Sq(3)[408] + Sq(3)[407]} \\ $h_{7}:$ [32] \item[406] {\rm Sq(0,1)[409] + Sq(0,1)[408]} \\ $h_{7}:$ [31] \item[407] {\rm Sq(3)[410] + Sq(0,1)[410] + Sq(3)[409] + Sq(3)[407]} \\ $h_{7}:$ [32], [31] \item[408] {\rm Sq(3)[411] + Sq(0,1)[411] + Sq(0,1)[408] + Sq(3)[407]} \\ $h_{7}:$ [32] \item[409] {\rm Sq(3)[412] + Sq(0,1)[412] + Sq(3)[409] + Sq(0,1)[408] + Sq(3)[407] + Sq(0,1)[407]} \\ $h_{7}:$ [31] \item[410] {\rm Sq(2)[415] + Sq(2)[414]} \\ $h_{1}:$ [415], [414] \\ $h_{7}:$ [33] \item[411] {\rm Sq(1)[418]} \\ $h_{0}:$ [418] \\ $h_{2}:$ [404] \\ $h_{5}:$ [263] \\ $h_{7}:$ [32], [31] \end{gl} \end{bdl} \begin{bdl} \item[18/205] \mb{18/205} \begin{gl} \item[418] {\rm Sq(3)[426] + Sq(3)[425]} \item[419] {\rm Sq(3)[428] + Sq(0,1)[428] + Sq(3)[425] + Sq(0,1)[424] + Sq(0,1)[423]} \item[420] {\rm Sq(1)[435] + Sq(1)[434]} \\ $h_{0}:$ [435], [434] \\ $h_{2}:$ [421], [419] \\ $h_{3}:$ [402], [400] \\ $h_{4}:$ [356], [355], [352], [351] \\ $h_{5}:$ [269] \\ $h_{6}:$ [165], [162] \end{gl} \end{bdl} \begin{bdl} \item[17/205] \mb{17/205} \begin{gl} \item[433] {\rm Sq(2)[447] + Sq(2)[446]} \\ $h_{1}:$ [447], [446] \\ $h_{3}:$ [412] \\ $h_{4}:$ [355], [353] \\ $h_{5}:$ [269], [267] \\ $h_{6}:$ [170] \item[434] {\rm Sq(1)[453]} \\ $h_{0}:$ [453] \item[435] {\rm Sq(1)[454]} \\ $h_{0}:$ [454] \\ $h_{2}:$ [437] \\ $h_{3}:$ [412] \\ $h_{4}:$ [359], [358], [353], [352] \\ $h_{5}:$ [268] \\ $h_{6}:$ [170] \item[436] {\rm Sq(1)[455]} \\ $h_{0}:$ [455] \\ $h_{1}:$ [449], [448], [446] \\ $h_{3}:$ [412] \\ $h_{4}:$ [360], [359], [357], [356], [355], [354], [352], [351] \\ $h_{5}:$ [269], [268], [267] \\ $h_{6}:$ [170] \item[437] {\rm Sq(1)[456]} \\ $h_{0}:$ [456] \\ $h_{1}:$ [450], [449], [445] \\ $h_{2}:$ [440], [438], [437] \\ $h_{3}:$ [418], [416], [414] \\ $h_{4}:$ [359], [357] \\ $h_{5}:$ [273], [270], [269], [267] \\ $h_{6}:$ [170] \end{gl} \end{bdl} \begin{bdl} \item[16/205] \mb{16/205} \begin{gl} \item[453] {\rm Sq(3)[457] + Sq(0,1)[457] + Sq(3)[454] + Sq(0,1)[454] + Sq(3)[453]} \item[454] {\rm Sq(3)[458] + Sq(0,1)[458] + Sq(0,1)[453]} \\ $h_{4}:$ [363], [362] \item[455] {\rm Sq(1)[468] + Sq(1)[467] + Sq(1)[466]} \\ $h_{0}:$ [468], [467], [466] \\ $h_{4}:$ [366], [365], [363], [361], [360] \item[456] {\rm Sq(1)[471] + Sq(1)[467] + Sq(1)[466]} \\ $h_{0}:$ [471], [467], [466] \\ $h_{2}:$ [449], [448] \\ $h_{3}:$ [427], [425], [424], [420], [418] \\ $h_{4}:$ [363], [361] \\ $h_{5}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[15/205] \mb{15/205} \begin{gl} \item[466] {\rm Sq(0,1)[457] + Sq(0,1)[456]} \\ $h_{3}:$ [424], [422], [421], [419] \\ $h_{4}:$ [371], [370] \item[467] {\rm Sq(3)[457] + Sq(0,1)[456] + Sq(3)[455] + Sq(0,1)[455]} \\ $h_{3}:$ [424], [422], [421], [419] \\ $h_{4}:$ [371], [370] \\ $h_{5}:$ [300], [297] \item[468] {\rm Sq(3)[458]} \\ $h_{4}:$ [372], [371] \\ $h_{5}:$ [300], [297] \item[469] {\rm Sq(2)[463] + Sq(2)[462]} \\ $h_{1}:$ [463], [462] \\ $h_{3}:$ [424], [423] \\ $h_{4}:$ [372], [371] \\ $h_{5}:$ [300], [297] \item[470] {\rm Sq(2)[465] + Sq(2)[464]} \\ $h_{1}:$ [465], [464] \\ $h_{5}:$ [300], [297] \item[471] {\rm Sq(1)[471]} \\ $h_{0}:$ [471] \\ $h_{3}:$ [427], [423], [422], [421] \\ $h_{5}:$ [300], [297] \end{gl} \end{bdl} \begin{bdl} \item[14/205] \mb{14/205} \begin{gl} \item[469] {\rm Sq(2)[449] + Sq(2)[448]} \\ $h_{1}:$ [449], [448] \\ $h_{2}:$ [437], [436] \\ $h_{3}:$ [412] \\ $h_{4}:$ [364] \item[470] {\rm Sq(2)[450] + Sq(2)[448]} \\ $h_{1}:$ [450], [448] \\ $h_{7}:$ [40] \item[471] {\rm Sq(1)[456]} \\ $h_{0}:$ [456] \\ $h_{3}:$ [412] \item[472] {\rm Sq(1)[461]} \\ $h_{0}:$ [461] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[13/205] \mb{13/205} \begin{gl} \item[455] {\rm Sq(0,1)[431]} \\ $h_{2}:$ [425], [424], [423] \\ $h_{3}:$ [402] \\ $h_{4}:$ [363], [362] \item[456] {\rm Sq(3)[431]} \item[457] {\rm Sq(3)[432] + Sq(0,1)[432]} \\ $h_{3}:$ [405], [404], [402] \\ $h_{4}:$ [363], [362] \item[458] {\rm Sq(2)[437] + Sq(2)[436] + Sq(2)[435]} \\ $h_{1}:$ [437], [436], [435] \\ $h_{2}:$ [423] \\ $h_{3}:$ [407], [406], [402] \\ $h_{4}:$ [362], [361] \\ $h_{6}:$ [194] \item[459] {\rm Sq(1)[444]} \\ $h_{0}:$ [444] \\ $h_{2}:$ [425], [424] \\ $h_{3}:$ [409], [405] \\ $h_{4}:$ [363], [362], [361] \item[460] {\rm Sq(1)[446]} \\ $h_{0}:$ [446] \\ $h_{1}:$ [439], [438], [435] \\ $h_{2}:$ [429] \\ $h_{3}:$ [408], [407], [406], [404], [403] \\ $h_{4}:$ [363], [362], [361] \\ $h_{5}:$ [314] \\ $h_{7}:$ [43] \item[461] {\rm Sq(1)[447]} \\ $h_{0}:$ [447] \\ $h_{7}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[12/205] \mb{12/205} \begin{gl} \item[444] {\rm Sq(3)[418] + Sq(0,1)[418] + Sq(3)[416] + Sq(0,1)[414] + Sq(3)[413] + Sq(0,1)[413] + Sq(3)[412]} \\ $h_{3}:$ [393] \item[445] {\rm Sq(2)[420] + Sq(2)[419]} \\ $h_{1}:$ [420], [419] \\ $h_{3}:$ [393] \item[446] {\rm Sq(1)[423]} \\ $h_{0}:$ [423] \\ $h_{2}:$ [409] \\ $h_{3}:$ [392] \\ $h_{7}:$ [47] \item[447] {\rm Sq(1)[424]} \\ $h_{0}:$ [424] \\ $h_{7}:$ [47] \item[448] {\rm Sq(1)[426]} \\ $h_{0}:$ [426] \\ $h_{1}:$ [419] \\ $h_{2}:$ [408] \\ $h_{7}:$ [47] \end{gl} \end{bdl} \begin{bdl} \item[11/205] \mb{11/205} \begin{gl} \item[423] {\rm Sq(1,1)[383] + Sq(4)[381] + Sq(1,1)[379]} \\ $h_{2}:$ [381] \\ $h_{7}:$ [48] \item[424] {\rm Sq(1,1)[384] + Sq(1,1)[381] + Sq(1,1)[380]} \\ $h_{7}:$ [48] \item[425] {\rm Sq(0,1)[386]} \\ $h_{7}:$ [49] \item[426] {\rm Sq(3)[387] + Sq(0,1)[387]} \\ $h_{2}:$ [380] \\ $h_{7}:$ [48] \item[427] {\rm Sq(2)[391] + Sq(2)[389]} \\ $h_{1}:$ [391], [389] \\ $h_{7}:$ [49], [48] \end{gl} \end{bdl} \begin{bdl} \item[10/205] \mb{10/205} \begin{gl} \item[395] {\rm Sq(1,1)[345]} \\ $h_{7}:$ [55] \item[396] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \\ $h_{7}:$ [55] \end{gl} \end{bdl} \begin{bdl} \item[9/205] \mb{9/205} \begin{gl} \item[356] {\rm Sq(5)[300] + Sq(2,1)[300]} \item[357] {\rm Sq(3)[305] + Sq(0,1)[305] + Sq(3)[304] + Sq(0,1)[304]} \item[358] {\rm Sq(2)[309]} \\ $h_{1}:$ [309] \\ $h_{4}:$ [272] \item[359] {\rm Sq(2)[310] + Sq(2)[307]} \\ $h_{1}:$ [310], [307] \\ $h_{4}:$ [274], [272] \\ $h_{7}:$ [60] \item[360] {\rm Sq(1)[312] + Sq(1)[311]} \\ $h_{0}:$ [312], [311] \\ $h_{1}:$ [308] \\ $h_{3}:$ [296] \\ $h_{4}:$ [274] \\ $h_{7}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[8/205] \mb{8/205} \begin{gl} \item[311] {\rm Sq(1)[262]} \\ $h_{0}:$ [262] \\ $h_{3}:$ [253], [252] \\ $h_{5}:$ [214] \\ $h_{7}:$ [60] \item[312] {\rm Sq(1)[263]} \\ $h_{0}:$ [263] \\ $h_{3}:$ [252] \\ $h_{5}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[7/205] \mb{7/205} \begin{gl} \item[262] {\rm Sq(7,1)[204] + Sq(3,0,1)[204] + Sq(0,1,1)[204] + Sq(10)[203] + Sq(7,1)[203] + Sq(4,2)[203] + Sq(1,3)[203] + Sq(3,0,1)[203] + Sq(0,1,1)[203]} \\ $h_{7}:$ [56] \item[263] {\rm Sq(3)[208]} \item[264] {\rm Sq(3)[209] + Sq(0,1)[209]} \end{gl} \end{bdl} \begin{bdl} \item[5/205] \mb{5/205} \begin{gl} \item[149] {\rm Sq(2)[93]} \\ $h_{1}:$ [93] \\ $h_{5}:$ [87] \\ $h_{6}:$ [67] \end{gl} \end{bdl} \dm{206} \begin{bdl} \item[100/206] \mb{100/206} \begin{gl} \item[3] {\rm Sq(3,1)[4]} \end{gl} \end{bdl} \begin{bdl} \item[99/206] \mb{99/206} \begin{gl} \item[5] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[98/206] \mb{98/206} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[97/206] \mb{97/206} \begin{gl} \item[10] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \\ $h_{3}:$ [4] \end{gl} \end{bdl} \begin{bdl} \item[96/206] \mb{96/206} \begin{gl} \item[9] {\rm Sq(1)[8]} \\ $h_{0}:$ [8] \\ $h_{3}:$ [5] \end{gl} \end{bdl} \begin{bdl} \item[95/206] \mb{95/206} \begin{gl} \item[8] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[94/206] \mb{94/206} \begin{gl} \item[10] {\rm Sq(1,1)[13]} \end{gl} \end{bdl} \begin{bdl} \item[91/206] \mb{91/206} \begin{gl} \item[12] {\rm Sq(0,1)[15]} \end{gl} \end{bdl} \begin{bdl} \item[88/206] \mb{88/206} \begin{gl} \item[20] {\rm Sq(0,1)[17]} \end{gl} \end{bdl} \begin{bdl} \item[87/206] \mb{87/206} \begin{gl} \item[18] {\rm Sq(3)[19] + Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[85/206] \mb{85/206} \begin{gl} \item[26] {\rm Sq(0,1)[25]} \end{gl} \end{bdl} \begin{bdl} \item[84/206] \mb{84/206} \begin{gl} \item[28] {\rm Sq(1)[29]} \\ $h_{0}:$ [29] \\ $h_{2}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[83/206] \mb{83/206} \begin{gl} \item[29] {\rm Sq(1)[31]} \\ $h_{0}:$ [31] \\ $h_{2}:$ [26] \end{gl} \end{bdl} \begin{bdl} \item[82/206] \mb{82/206} \begin{gl} \item[31] {\rm Sq(0,1)[30]} \item[32] {\rm Sq(0,1)[31]} \item[33] {\rm Sq(2)[33]} \\ $h_{1}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[79/206] \mb{79/206} \begin{gl} \item[37] {\rm Sq(0,1)[39]} \end{gl} \end{bdl} \begin{bdl} \item[77/206] \mb{77/206} \begin{gl} \item[44] {\rm Sq(1)[44]} \\ $h_{0}:$ [44] \\ $h_{1}:$ [42] \\ $h_{2}:$ [39] \\ $h_{3}:$ [35] \item[45] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [41] \\ $h_{2}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[76/206] \mb{76/206} \begin{gl} \item[44] {\rm Sq(0,1)[47]} \item[45] {\rm Sq(0,1)[48]} \item[46] {\rm Sq(1)[51]} \\ $h_{0}:$ [51] \end{gl} \end{bdl} \begin{bdl} \item[75/206] \mb{75/206} \begin{gl} \item[50] {\rm Sq(0,1)[55]} \item[51] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[74/206] \mb{74/206} \begin{gl} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[73/206] \mb{73/206} \begin{gl} \item[60] {\rm Sq(0,1)[55]} \item[61] {\rm Sq(0,1)[56]} \item[62] {\rm Sq(1)[59]} \\ $h_{0}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[72/206] \mb{72/206} \begin{gl} \item[58] {\rm Sq(0,1)[56]} \item[59] {\rm Sq(1)[62]} \\ $h_{0}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[71/206] \mb{71/206} \begin{gl} \item[61] {\rm Sq(3)[62] + Sq(0,1)[62]} \item[62] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[70/206] \mb{70/206} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \item[68] {\rm Sq(1)[72]} \\ $h_{0}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[69/206] \mb{69/206} \begin{gl} \item[70] {\rm Sq(0,1)[66]} \item[71] {\rm Sq(1)[73]} \\ $h_{0}:$ [73] \\ $h_{1}:$ [68] \\ $h_{2}:$ [64] \item[72] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \end{gl} \end{bdl} \begin{bdl} \item[68/206] \mb{68/206} \begin{gl} \item[73] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{2}:$ [69] \item[74] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{2}:$ [72], [69] \item[75] {\rm Sq(1)[82]} \\ $h_{0}:$ [82] \end{gl} \end{bdl} \begin{bdl} \item[67/206] \mb{67/206} \begin{gl} \item[78] {\rm Sq(0,1)[78]} \item[79] {\rm Sq(0,1)[79]} \item[80] {\rm Sq(0,1)[80]} \item[81] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{2}:$ [76] \item[82] {\rm Sq(1)[87]} \\ $h_{0}:$ [87] \end{gl} \end{bdl} \begin{bdl} \item[66/206] \mb{66/206} \begin{gl} \item[84] {\rm Sq(0,1)[81]} \item[85] {\rm Sq(0,1)[82]} \item[86] {\rm Sq(2)[84] + Sq(2)[83]} \\ $h_{1}:$ [84], [83] \item[87] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \end{gl} \end{bdl} \begin{bdl} \item[65/206] \mb{65/206} \begin{gl} \item[88] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[64/206] \mb{64/206} \begin{gl} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(0,1)[91]} \item[90] {\rm Sq(0,1)[92]} \item[91] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \end{gl} \end{bdl} \begin{bdl} \item[63/206] \mb{63/206} \begin{gl} \item[95] {\rm Sq(3)[96]} \item[96] {\rm Sq(0,1)[97]} \item[97] {\rm Sq(0,1)[98]} \end{gl} \end{bdl} \begin{bdl} \item[61/206] \mb{61/206} \begin{gl} \item[106] {\rm Sq(0,1)[109]} \item[107] {\rm Sq(0,1)[110]} \item[108] {\rm Sq(0,1)[111]} \item[109] {\rm Sq(1)[115]} \\ $h_{0}:$ [115] \\ $h_{1}:$ [112] \end{gl} \end{bdl} \begin{bdl} \item[60/206] \mb{60/206} \begin{gl} \item[113] {\rm Sq(0,1)[121]} \item[114] {\rm Sq(0,1)[122]} \item[115] {\rm Sq(0,1)[123]} \end{gl} \end{bdl} \begin{bdl} \item[58/206] \mb{58/206} \begin{gl} \item[133] {\rm Sq(0,1)[128]} \item[134] {\rm Sq(0,1)[129]} \item[135] {\rm Sq(0,1)[130]} \item[136] {\rm Sq(2)[132]} \\ $h_{1}:$ [132] \end{gl} \end{bdl} \begin{bdl} \item[57/206] \mb{57/206} \begin{gl} \item[133] {\rm Sq(0,1)[129]} \item[134] {\rm Sq(0,1)[130]} \item[135] {\rm Sq(0,1)[131]} \end{gl} \end{bdl} \begin{bdl} \item[56/206] \mb{56/206} \begin{gl} \item[136] {\rm Sq(0,1)[137]} \end{gl} \end{bdl} \begin{bdl} \item[55/206] \mb{55/206} \begin{gl} \item[143] {\rm Sq(0,1)[142]} \item[144] {\rm Sq(0,1)[143]} \item[145] {\rm Sq(0,1)[144]} \end{gl} \end{bdl} \begin{bdl} \item[54/206] \mb{54/206} \begin{gl} \item[149] {\rm Sq(0,1)[145]} \item[150] {\rm Sq(0,1)[146]} \item[151] {\rm Sq(0,1)[147]} \end{gl} \end{bdl} \begin{bdl} \item[53/206] \mb{53/206} \begin{gl} \item[153] {\rm Sq(0,1)[152]} \item[154] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{1}:$ [158] \item[155] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{1}:$ [154] \\ $h_{2}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[52/206] \mb{52/206} \begin{gl} \item[159] {\rm Sq(0,1)[165]} \item[160] {\rm Sq(0,1)[166]} \item[161] {\rm Sq(0,1)[167]} \item[162] {\rm Sq(0,1)[168]} \item[163] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{2}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[51/206] \mb{51/206} \begin{gl} \item[171] {\rm Sq(1,1)[175]} \item[172] {\rm Sq(0,1)[176]} \item[173] {\rm Sq(0,1)[177]} \item[174] {\rm Sq(0,1)[178]} \end{gl} \end{bdl} \begin{bdl} \item[50/206] \mb{50/206} \begin{gl} \item[183] {\rm Sq(0,1)[181]} \item[184] {\rm Sq(2)[187]} \\ $h_{1}:$ [187] \item[185] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{2}:$ [180] \end{gl} \end{bdl} \begin{bdl} \item[49/206] \mb{49/206} \begin{gl} \item[188] {\rm Sq(0,1)[185]} \item[189] {\rm Sq(0,1)[186]} \item[190] {\rm Sq(0,1)[187]} \item[191] {\rm Sq(0,1)[188]} \item[192] {\rm Sq(1)[193]} \\ $h_{0}:$ [193] \\ $h_{2}:$ [182] \end{gl} \end{bdl} \begin{bdl} \item[48/206] \mb{48/206} \begin{gl} \item[193] {\rm Sq(3)[192]} \item[194] {\rm Sq(0,1)[193]} \item[195] {\rm Sq(0,1)[194]} \item[196] {\rm Sq(0,1)[195]} \end{gl} \end{bdl} \begin{bdl} \item[47/206] \mb{47/206} \begin{gl} \item[205] {\rm Sq(0,1)[205]} \item[206] {\rm Sq(1)[220]} \\ $h_{0}:$ [220] \\ $h_{1}:$ [211] \\ $h_{3}:$ [186], [185] \\ $h_{4}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[46/206] \mb{46/206} \begin{gl} \item[216] {\rm Sq(0,1)[218]} \item[217] {\rm Sq(0,1)[219]} \item[218] {\rm Sq(0,1)[220]} \item[219] {\rm Sq(0,1)[221]} \item[220] {\rm Sq(1)[234] + Sq(1)[232]} \\ $h_{0}:$ [234], [232] \\ $h_{3}:$ [194], [193] \\ $h_{4}:$ [158] \end{gl} \end{bdl} \begin{bdl} \item[45/206] \mb{45/206} \begin{gl} \item[228] {\rm Sq(0,1)[224]} \item[229] {\rm Sq(0,1)[225]} \item[230] {\rm Sq(0,1)[226]} \item[231] {\rm Sq(0,1)[227]} \item[232] {\rm Sq(1)[240]} \\ $h_{0}:$ [240] \\ $h_{1}:$ [235], [233], [232] \\ $h_{2}:$ [221] \\ $h_{3}:$ [197] \item[233] {\rm Sq(1)[241]} \\ $h_{0}:$ [241] \\ $h_{1}:$ [230] \\ $h_{2}:$ [221] \\ $h_{3}:$ [202], [197] \item[234] {\rm Sq(1)[242]} \\ $h_{0}:$ [242] \\ $h_{1}:$ [235], [233], [232] \\ $h_{2}:$ [221] \\ $h_{3}:$ [202] \\ $h_{4}:$ [164] \end{gl} \end{bdl} \begin{bdl} \item[44/206] \mb{44/206} \begin{gl} \item[239] {\rm Sq(0,1)[239]} \item[240] {\rm Sq(0,1)[240]} \item[241] {\rm Sq(1)[255]} \\ $h_{0}:$ [255] \\ $h_{3}:$ [210] \item[242] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{3}:$ [210] \\ $h_{4}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[43/206] \mb{43/206} \begin{gl} \item[249] {\rm Sq(0,1)[250]} \item[250] {\rm Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[252]} \item[252] {\rm Sq(0,1)[253]} \item[253] {\rm Sq(0,1)[254]} \item[254] {\rm Sq(2)[258]} \\ $h_{1}:$ [258] \item[255] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \item[256] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{4}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[42/206] \mb{42/206} \begin{gl} \item[260] {\rm Sq(0,1)[256]} \item[261] {\rm Sq(0,1)[257]} \item[262] {\rm Sq(0,1)[258]} \item[263] {\rm Sq(0,1)[259]} \item[264] {\rm Sq(0,1)[260]} \item[265] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \item[266] {\rm Sq(1)[272] + Sq(1)[270]} \\ $h_{0}:$ [272], [270] \\ $h_{4}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[41/206] \mb{41/206} \begin{gl} \item[269] {\rm Sq(0,1)[261]} \item[270] {\rm Sq(0,1)[262]} \item[271] {\rm Sq(0,1)[263]} \item[272] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{4}:$ [199] \end{gl} \end{bdl} \begin{bdl} \item[40/206] \mb{40/206} \begin{gl} \item[271] {\rm Sq(1,1)[264] + Sq(1,1)[262] + Sq(1,1)[261] + Sq(1,1)[259] + Sq(1,1)[258]} \item[272] {\rm Sq(0,1)[265]} \item[273] {\rm Sq(0,1)[266]} \item[274] {\rm Sq(0,1)[267]} \item[275] {\rm Sq(0,1)[268]} \item[276] {\rm Sq(1)[280]} \\ $h_{0}:$ [280] \\ $h_{4}:$ [204], [203] \end{gl} \end{bdl} \begin{bdl} \item[39/206] \mb{39/206} \begin{gl} \item[275] {\rm Sq(0,1)[272] + Sq(0,1)[271]} \item[276] {\rm Sq(0,1)[274]} \item[277] {\rm Sq(3)[276] + Sq(3)[275] + Sq(0,1)[275] + Sq(3)[274] + Sq(0,1)[273] + Sq(3)[271] + Sq(0,1)[271]} \item[278] {\rm Sq(3)[277] + Sq(0,1)[277] + Sq(3)[275] + Sq(0,1)[275]} \item[279] {\rm Sq(3)[278] + Sq(0,1)[278] + Sq(0,1)[273] + Sq(0,1)[271]} \item[280] {\rm Sq(1)[289] + Sq(1)[287] + Sq(1)[285]} \\ $h_{0}:$ [289], [287], [285] \end{gl} \end{bdl} \begin{bdl} \item[38/206] \mb{38/206} \begin{gl} \item[285] {\rm Sq(1,1)[281] + Sq(1,1)[280] + Sq(1,1)[279]} \item[286] {\rm Sq(0,1)[286] + Sq(0,1)[285]} \item[287] {\rm Sq(3)[288] + Sq(0,1)[288] + Sq(0,1)[285]} \item[288] {\rm Sq(2)[293]} \\ $h_{1}:$ [293] \item[289] {\rm Sq(1)[302] + Sq(1)[301] + Sq(1)[299]} \\ $h_{0}:$ [302], [301], [299] \end{gl} \end{bdl} \begin{bdl} \item[37/206] \mb{37/206} \begin{gl} \item[297] {\rm Sq(0,1)[296] + Sq(0,1)[294]} \item[298] {\rm Sq(0,1)[297] + Sq(0,1)[295] + Sq(0,1)[294]} \item[299] {\rm Sq(3)[298] + Sq(0,1)[298] + Sq(3)[295]} \item[300] {\rm Sq(1)[305]} \\ $h_{0}:$ [305] \\ $h_{1}:$ [302] \item[301] {\rm Sq(1)[309]} \\ $h_{0}:$ [309] \\ $h_{1}:$ [302], [299] \\ $h_{2}:$ [292] \item[302] {\rm Sq(1)[310]} \\ $h_{0}:$ [310] \\ $h_{1}:$ [302], [299] \\ $h_{2}:$ [292] \end{gl} \end{bdl} \begin{bdl} \item[36/206] \mb{36/206} \begin{gl} \item[305] {\rm Sq(3)[300] + Sq(3)[299] + Sq(0,1)[299]} \item[306] {\rm Sq(0,1)[301] + Sq(0,1)[299]} \item[307] {\rm Sq(0,1)[302] + Sq(0,1)[299]} \item[308] {\rm Sq(0,1)[303]} \item[309] {\rm Sq(1)[313] + Sq(1)[312] + Sq(1)[311]} \\ $h_{0}:$ [313], [312], [311] \\ $h_{2}:$ [293] \item[310] {\rm Sq(1)[315] + Sq(1)[312] + Sq(1)[311]} \\ $h_{0}:$ [315], [312], [311] \\ $h_{2}:$ [293] \item[311] {\rm Sq(1)[316] + Sq(1)[311]} \\ $h_{0}:$ [316], [311] \\ $h_{2}:$ [298] \end{gl} \end{bdl} \begin{bdl} \item[35/206] \mb{35/206} \begin{gl} \item[311] {\rm Sq(2,1)[304]} \item[312] {\rm Sq(1,1)[308]} \item[313] {\rm Sq(1,1)[310] + Sq(1,1)[309] + Sq(1,1)[307] + Sq(1,1)[306]} \item[314] {\rm Sq(0,1)[311]} \item[315] {\rm Sq(1)[318] + Sq(1)[317]} \\ $h_{0}:$ [318], [317] \item[316] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{2}:$ [308] \end{gl} \end{bdl} \begin{bdl} \item[34/206] \mb{34/206} \begin{gl} \item[317] {\rm Sq(1,1)[315] + Sq(1,1)[314]} \item[318] {\rm Sq(1,1)[317] + Sq(1,1)[314] + Sq(1,1)[312]} \item[319] {\rm Sq(1,1)[318] + Sq(1,1)[313] + Sq(1,1)[312]} \item[320] {\rm Sq(0,1)[319]} \item[321] {\rm Sq(0,1)[320]} \item[322] {\rm Sq(0,1)[321]} \item[323] {\rm Sq(3)[324] + Sq(0,1)[324] + Sq(3)[319]} \item[324] {\rm Sq(1)[332] + Sq(1)[330]} \\ $h_{0}:$ [332], [330] \\ $h_{2}:$ [317], [312] \\ $h_{5}:$ [193] \\ $h_{7}:$ [12], [11] \end{gl} \end{bdl} \begin{bdl} \item[33/206] \mb{33/206} \begin{gl} \item[327] {\rm Sq(0,1)[319] + Sq(0,1)[318]} \item[328] {\rm Sq(0,1)[320]} \item[329] {\rm Sq(0,1)[321]} \item[330] {\rm Sq(0,1)[322]} \item[331] {\rm Sq(1)[332]} \\ $h_{0}:$ [332] \\ $h_{2}:$ [314] \\ $h_{5}:$ [194] \\ $h_{7}:$ [10] \item[332] {\rm Sq(1)[336]} \\ $h_{0}:$ [336] \\ $h_{2}:$ [314] \\ $h_{5}:$ [194] \\ $h_{7}:$ [11], [10] \item[333] {\rm Sq(1)[337] + Sq(1)[334]} \\ $h_{0}:$ [337], [334] \\ $h_{1}:$ [329], [328] \\ $h_{2}:$ [317] \\ $h_{3}:$ [298], [296], [295] \end{gl} \end{bdl} \begin{bdl} \item[32/206] \mb{32/206} \begin{gl} \item[332] {\rm Sq(0,1)[318]} \item[333] {\rm Sq(0,1)[320]} \item[334] {\rm Sq(3)[321]} \item[335] {\rm Sq(3)[322] + Sq(0,1)[322] + Sq(3)[318]} \item[336] {\rm Sq(1)[334]} \\ $h_{0}:$ [334] \\ $h_{7}:$ [9] \item[337] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \\ $h_{2}:$ [317] \\ $h_{3}:$ [299] \end{gl} \end{bdl} \begin{bdl} \item[31/206] \mb{31/206} \begin{gl} \item[331] {\rm Sq(1,1)[320]} \item[332] {\rm Sq(0,1)[325] + Sq(0,1)[324]} \item[333] {\rm Sq(3)[328] + Sq(0,1)[328] + Sq(3)[324]} \item[334] {\rm Sq(1)[338] + Sq(1)[336]} \\ $h_{0}:$ [338], [336] \\ $h_{7}:$ [11] \item[335] {\rm Sq(1)[340]} \\ $h_{0}:$ [340] \\ $h_{2}:$ [319] \\ $h_{3}:$ [303] \item[336] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{1}:$ [331], [330] \\ $h_{3}:$ [305], [304] \\ $h_{4}:$ [265], [262] \end{gl} \end{bdl} \begin{bdl} \item[30/206] \mb{30/206} \begin{gl} \item[334] {\rm Sq(4)[330]} \\ $h_{2}:$ [330] \\ $h_{5}:$ [216], [215], [214] \item[335] {\rm Sq(0,1)[331]} \item[336] {\rm Sq(0,1)[332]} \item[337] {\rm Sq(0,1)[333]} \item[338] {\rm Sq(3)[334] + Sq(3)[333] + Sq(3)[332] + Sq(3)[331]} \\ $h_{7}:$ [15] \item[339] {\rm Sq(2)[336] + Sq(2)[335]} \\ $h_{1}:$ [336], [335] \\ $h_{7}:$ [15], [14] \item[340] {\rm Sq(1)[343] + Sq(1)[339]} \\ $h_{0}:$ [343], [339] \\ $h_{3}:$ [311] \item[341] {\rm Sq(1)[344] + Sq(1)[340] + Sq(1)[339]} \\ $h_{0}:$ [344], [340], [339] \\ $h_{3}:$ [314], [313], [309] \end{gl} \end{bdl} \begin{bdl} \item[29/206] \mb{29/206} \begin{gl} \item[339] {\rm Sq(5)[330] + Sq(2,1)[330] + Sq(2,1)[329] + Sq(2,1)[328] + Sq(2,1)[327] + Sq(5)[326] + Sq(2,1)[326] + Sq(2,1)[325]} \item[340] {\rm Sq(1,1)[333] + Sq(1,1)[331]} \item[341] {\rm Sq(0,1)[335]} \item[342] {\rm Sq(2)[336]} \\ $h_{1}:$ [336] \item[343] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \item[344] {\rm Sq(1)[343] + Sq(1)[340]} \\ $h_{0}:$ [343], [340] \\ $h_{3}:$ [314], [311], [310] \end{gl} \end{bdl} \begin{bdl} \item[28/206] \mb{28/206} \begin{gl} \item[340] {\rm Sq(1,1)[331] + Sq(1,1)[330]} \item[341] {\rm Sq(0,1)[335]} \item[342] {\rm Sq(1)[343] + Sq(1)[341]} \\ $h_{0}:$ [343], [341] \item[343] {\rm Sq(1)[347] + Sq(1)[341]} \\ $h_{0}:$ [347], [341] \\ $h_{3}:$ [315] \end{gl} \end{bdl} \begin{bdl} \item[27/206] \mb{27/206} \begin{gl} \item[341] {\rm Sq(5)[337] + Sq(2,1)[337] + Sq(2,1)[336] + Sq(2,1)[335] + Sq(5)[334] + Sq(2,1)[334] + Sq(5)[333]} \item[342] {\rm Sq(0,1)[340]} \item[343] {\rm Sq(3)[342]} \item[344] {\rm Sq(2)[344]} \\ $h_{1}:$ [344] \item[345] {\rm Sq(1)[350] + Sq(1)[348]} \\ $h_{0}:$ [350], [348] \\ $h_{2}:$ [339] \\ $h_{3}:$ [324], [322] \\ $h_{7}:$ [16] \item[346] {\rm Sq(1)[351]} \\ $h_{0}:$ [351] \\ $h_{1}:$ [346], [345] \\ $h_{3}:$ [324], [322] \\ $h_{4}:$ [290] \item[347] {\rm Sq(1)[352]} \\ $h_{0}:$ [352] \end{gl} \end{bdl} \begin{bdl} \item[26/206] \mb{26/206} \begin{gl} \item[348] {\rm Sq(4)[339]} \\ $h_{2}:$ [339] \item[349] {\rm Sq(0,1)[343]} \item[350] {\rm Sq(0,1)[344]} \\ $h_{3}:$ [324] \item[351] {\rm Sq(3)[344]} \\ $h_{3}:$ [324] \item[352] {\rm Sq(1)[351] + Sq(1)[350]} \\ $h_{0}:$ [351], [350] \end{gl} \end{bdl} \begin{bdl} \item[25/206] \mb{25/206} \begin{gl} \item[350] {\rm Sq(1,1)[341] + Sq(1,1)[340] + Sq(1,1)[336]} \item[351] {\rm Sq(0,1)[343] + Sq(0,1)[342]} \item[352] {\rm Sq(2)[348] + Sq(2)[347] + Sq(2)[346] + Sq(2)[345]} \\ $h_{1}:$ [348], [347], [346], [345] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[24/206] \mb{24/206} \begin{gl} \item[350] {\rm Sq(0,1)[346] + Sq(0,1)[344]} \\ $h_{7}:$ [19] \item[351] {\rm Sq(1)[354]} \\ $h_{0}:$ [354] \\ $h_{2}:$ [342], [341] \\ $h_{3}:$ [328], [326] \\ $h_{4}:$ [298] \item[352] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \\ $h_{2}:$ [342], [341] \\ $h_{3}:$ [328] \\ $h_{4}:$ [298] \end{gl} \end{bdl} \begin{bdl} \item[23/206] \mb{23/206} \begin{gl} \item[352] {\rm Sq(0,1)[363] + Sq(3)[362] + Sq(0,1)[362] + Sq(0,1)[361] + Sq(3)[360] + Sq(0,1)[360]} \item[353] {\rm Sq(0,1)[364] + Sq(0,1)[362] + Sq(0,1)[361]} \item[354] {\rm Sq(3)[364] + Sq(3)[362] + Sq(3)[361] + Sq(3)[360]} \\ $h_{3}:$ [341] \item[355] {\rm Sq(3)[365] + Sq(3)[363] + Sq(0,1)[362] + Sq(3)[361] + Sq(3)[360] + Sq(0,1)[360]} \\ $h_{3}:$ [341] \end{gl} \end{bdl} \begin{bdl} \item[22/206] \mb{22/206} \begin{gl} \item[374] {\rm Sq(3)[377] + Sq(0,1)[377] + Sq(0,1)[375] + Sq(0,1)[374]} \item[375] {\rm Sq(2)[383] + Sq(2)[378]} \\ $h_{1}:$ [383], [378] \end{gl} \end{bdl} \begin{bdl} \item[21/206] \mb{21/206} \begin{gl} \item[386] {\rm Sq(3,1)[371] + Sq(0,2)[371] + Sq(3,1)[370] + Sq(0,2)[370] + Sq(0,2)[369]} \item[387] {\rm Sq(3)[386] + Sq(3)[385]} \\ $h_{2}:$ [377] \item[388] {\rm Sq(3)[389] + Sq(0,1)[389] + Sq(0,1)[385] + Sq(3)[384]} \\ $h_{2}:$ [377] \\ $h_{7}:$ [29] \item[389] {\rm Sq(1)[395]} \\ $h_{0}:$ [395] \\ $h_{2}:$ [380], [377] \\ $h_{3}:$ [364] \\ $h_{7}:$ [29] \item[390] {\rm Sq(1)[396]} \\ $h_{0}:$ [396] \\ $h_{2}:$ [380], [377] \\ $h_{3}:$ [364] \item[391] {\rm Sq(1)[397]} \\ $h_{0}:$ [397] \item[392] {\rm Sq(1)[398] + Sq(1)[394]} \\ $h_{0}:$ [398], [394] \\ $h_{2}:$ [380] \\ $h_{7}:$ [29] \item[393] {\rm Sq(1)[399] + Sq(1)[394]} \\ $h_{0}:$ [399], [394] \\ $h_{2}:$ [380], [377] \\ $h_{7}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[20/206] \mb{20/206} \begin{gl} \item[394] {\rm Sq(1,1)[398] + Sq(1,1)[396] + Sq(1,1)[395]} \item[395] {\rm Sq(3)[399]} \\ $h_{2}:$ [395] \\ $h_{3}:$ [379], [378] \item[396] {\rm Sq(0,1)[400] + Sq(0,1)[399]} \\ $h_{2}:$ [395] \\ $h_{3}:$ [379], [378] \item[397] {\rm Sq(3)[400]} \item[398] {\rm Sq(3)[402] + Sq(0,1)[402] + Sq(3)[401] + Sq(0,1)[401]} \\ $h_{2}:$ [395] \item[399] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{2}:$ [395] \item[400] {\rm Sq(1)[414]} \\ $h_{0}:$ [414] \\ $h_{1}:$ [409], [407] \\ $h_{2}:$ [396] \\ $h_{3}:$ [379], [378] \\ $h_{7}:$ [30] \item[401] {\rm Sq(1)[416] + Sq(1)[412]} \\ $h_{0}:$ [416], [412] \\ $h_{1}:$ [410], [408] \\ $h_{2}:$ [398], [396], [395] \\ $h_{3}:$ [376] \\ $h_{7}:$ [31], [30] \end{gl} \end{bdl} \begin{bdl} \item[19/206] \mb{19/206} \begin{gl} \item[412] {\rm Sq(3)[415] + Sq(3)[414]} \item[413] {\rm Sq(3)[416] + Sq(0,1)[416]} \item[414] {\rm Sq(1)[423]} \\ $h_{0}:$ [423] \\ $h_{2}:$ [408], [407] \\ $h_{7}:$ [34] \item[415] {\rm Sq(1)[424]} \\ $h_{0}:$ [424] \\ $h_{2}:$ [410], [409], [408], [407] \\ $h_{7}:$ [34] \item[416] {\rm Sq(1)[426] + Sq(1)[425] + Sq(1)[421]} \\ $h_{0}:$ [426], [425], [421] \\ $h_{2}:$ [412], [410], [408], [407] \\ $h_{7}:$ [35], [34] \item[417] {\rm Sq(1)[427] + Sq(1)[425] + Sq(1)[421]} \\ $h_{0}:$ [427], [425], [421] \\ $h_{1}:$ [419], [418] \\ $h_{2}:$ [410], [409], [407] \\ $h_{3}:$ [394], [393] \\ $h_{5}:$ [271], [270], [269], [267] \\ $h_{6}:$ [165] \end{gl} \end{bdl} \begin{bdl} \item[18/206] \mb{18/206} \begin{gl} \item[421] {\rm Sq(3,1)[418] + Sq(3,1)[417] + Sq(3,1)[416] + Sq(3,1)[415]} \item[422] {\rm Sq(0,1)[430]} \\ $h_{7}:$ [36], [35] \item[423] {\rm Sq(0,1)[431]} \\ $h_{7}:$ [35] \item[424] {\rm Sq(3)[431]} \\ $h_{7}:$ [35] \item[425] {\rm Sq(3)[432] + Sq(0,1)[432] + Sq(3)[429] + Sq(0,1)[429]} \item[426] {\rm Sq(1)[438]} \\ $h_{0}:$ [438] \\ $h_{2}:$ [426], [425] \\ $h_{7}:$ [37], [35] \item[427] {\rm Sq(1)[439]} \\ $h_{0}:$ [439] \end{gl} \end{bdl} \begin{bdl} \item[17/206] \mb{17/206} \begin{gl} \item[438] {\rm Sq(3)[447] + Sq(0,1)[447] + Sq(3)[445] + Sq(0,1)[445]} \\ $h_{7}:$ [35] \item[439] {\rm Sq(3)[450] + Sq(3)[449] + Sq(0,1)[447] + Sq(3)[446] + Sq(0,1)[445]} \item[440] {\rm Sq(1)[460] + Sq(1)[459]} \\ $h_{0}:$ [460], [459] \\ $h_{1}:$ [454], [453] \\ $h_{3}:$ [422], [420], [419] \\ $h_{4}:$ [365], [364], [361] \\ $h_{5}:$ [279], [278], [277], [275] \\ $h_{6}:$ [174], [173], [172] \end{gl} \end{bdl} \begin{bdl} \item[16/206] \mb{16/206} \begin{gl} \item[457] {\rm Sq(2)[470] + Sq(2)[469]} \\ $h_{1}:$ [470], [469] \\ $h_{2}:$ [458], [457] \\ $h_{3}:$ [432], [431], [430] \\ $h_{4}:$ [372], [371], [369] \\ $h_{5}:$ [283], [282] \item[458] {\rm Sq(1)[472]} \\ $h_{0}:$ [472] \\ $h_{1}:$ [469], [467], [466] \\ $h_{2}:$ [457], [453] \\ $h_{3}:$ [432], [431], [430] \\ $h_{4}:$ [375], [374], [373], [372], [371], [369], [368] \\ $h_{5}:$ [283], [282] \\ $h_{7}:$ [37] \item[459] {\rm Sq(1)[473]} \\ $h_{0}:$ [473] \\ $h_{2}:$ [458], [453] \\ $h_{4}:$ [370] \\ $h_{7}:$ [37] \item[460] {\rm Sq(1)[475]} \\ $h_{0}:$ [475] \\ $h_{2}:$ [458], [453] \\ $h_{3}:$ [430], [429] \\ $h_{4}:$ [374], [373], [371], [369], [368], [367] \\ $h_{5}:$ [282], [281] \\ $h_{6}:$ [175] \\ $h_{7}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[15/206] \mb{15/206} \begin{gl} \item[472] {\rm Sq(3)[464] + Sq(0,1)[463] + Sq(0,1)[462]} \\ $h_{4}:$ [376], [375], [374] \\ $h_{7}:$ [41] \item[473] {\rm Sq(0,1)[465]} \\ $h_{7}:$ [41] \item[474] {\rm Sq(3)[467] + Sq(0,1)[467] + Sq(3)[466] + Sq(0,1)[466] + Sq(0,1)[464] + Sq(3)[462] + Sq(0,1)[462] + Sq(3)[461] + Sq(0,1)[461]} \\ $h_{3}:$ [429] \\ $h_{4}:$ [375], [374] \\ $h_{7}:$ [41] \item[475] {\rm Sq(3)[468] + Sq(0,1)[468] + Sq(3)[466] + Sq(0,1)[466] + Sq(0,1)[464] + Sq(3)[462] + Sq(0,1)[462] + Sq(3)[461] + Sq(0,1)[461]} \\ $h_{4}:$ [375], [374] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[14/206] \mb{14/206} \begin{gl} \item[473] {\rm Sq(3)[449] + Sq(0,1)[449] + Sq(3)[448]} \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [421], [418] \\ $h_{4}:$ [371], [369] \\ $h_{7}:$ [42] \item[474] {\rm Sq(3)[450] + Sq(3)[448]} \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [421] \\ $h_{4}:$ [370], [369], [368] \item[475] {\rm Sq(3)[451] + Sq(0,1)[451] + Sq(0,1)[450] + Sq(3)[448]} \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [421] \\ $h_{4}:$ [370], [369], [368] \\ $h_{7}:$ [42] \item[476] {\rm Sq(3)[452] + Sq(0,1)[452] + Sq(0,1)[449] + Sq(0,1)[448]} \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [421] \\ $h_{4}:$ [368] \\ $h_{7}:$ [42] \item[477] {\rm Sq(3)[454] + Sq(0,1)[454] + Sq(0,1)[450]} \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [421], [418] \\ $h_{4}:$ [371], [369] \item[478] {\rm Sq(2)[456]} \\ $h_{1}:$ [456] \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [418] \\ $h_{4}:$ [371], [370], [368] \\ $h_{7}:$ [42] \item[479] {\rm Sq(1)[463]} \\ $h_{0}:$ [463] \\ $h_{2}:$ [445] \\ $h_{3}:$ [421], [419] \\ $h_{4}:$ [372] \end{gl} \end{bdl} \begin{bdl} \item[13/206] \mb{13/206} \begin{gl} \item[462] {\rm Sq(2)[445] + Sq(2)[444]} \\ $h_{1}:$ [445], [444] \\ $h_{3}:$ [410] \\ $h_{4}:$ [366] \item[463] {\rm Sq(1)[451] + Sq(1)[449]} \\ $h_{0}:$ [451], [449] \\ $h_{2}:$ [431] \\ $h_{4}:$ [368], [366] \item[464] {\rm Sq(1)[455] + Sq(1)[454] + Sq(1)[450] + Sq(1)[449]} \\ $h_{0}:$ [455], [454], [450], [449] \\ $h_{2}:$ [431] \\ $h_{3}:$ [412], [411], [410] \\ $h_{4}:$ [368], [367] \\ $h_{5}:$ [316] \end{gl} \end{bdl} \begin{bdl} \item[12/206] \mb{12/206} \begin{gl} \item[449] {\rm Sq(0,1)[420]} \item[450] {\rm Sq(3)[420] + Sq(3)[419]} \\ $h_{2}:$ [414] \\ $h_{3}:$ [396] \\ $h_{4}:$ [362], [361] \item[451] {\rm Sq(3)[421] + Sq(0,1)[421]} \\ $h_{4}:$ [363] \item[452] {\rm Sq(3)[422] + Sq(0,1)[422] + Sq(3)[419]} \\ $h_{3}:$ [396], [395] \\ $h_{4}:$ [363], [362] \item[453] {\rm Sq(2)[424]} \\ $h_{1}:$ [424] \\ $h_{4}:$ [364], [363], [362], [361] \\ $h_{5}:$ [327] \\ $h_{7}:$ [48] \item[454] {\rm Sq(1)[428]} \\ $h_{0}:$ [428] \\ $h_{2}:$ [413] \\ $h_{3}:$ [396], [395] \\ $h_{4}:$ [365], [362] \item[455] {\rm Sq(1)[429]} \\ $h_{0}:$ [429] \\ $h_{2}:$ [414], [413] \\ $h_{3}:$ [399], [398], [397] \\ $h_{4}:$ [365], [363] \end{gl} \end{bdl} \begin{bdl} \item[11/206] \mb{11/206} \begin{gl} \item[428] {\rm Sq(3)[392] + Sq(3)[391] + Sq(0,1)[391] + Sq(0,1)[390] + Sq(0,1)[389]} \\ $h_{4}:$ [345] \item[429] {\rm Sq(3)[393] + Sq(0,1)[393] + Sq(3)[391] + Sq(0,1)[391] + Sq(3)[390] + Sq(0,1)[390]} \\ $h_{3}:$ [371] \\ $h_{4}:$ [345] \item[430] {\rm Sq(2)[395]} \\ $h_{1}:$ [395] \\ $h_{2}:$ [386] \\ $h_{3}:$ [371] \\ $h_{4}:$ [345] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \begin{bdl} \item[10/206] \mb{10/206} \begin{gl} \item[397] {\rm Sq(1,1)[352] + Sq(1,1)[349] + Sq(4)[347]} \\ $h_{2}:$ [347] \\ $h_{4}:$ [313], [312] \item[398] {\rm Sq(2)[357]} \\ $h_{1}:$ [357] \\ $h_{2}:$ [349], [348], [347] \item[399] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{1}:$ [359] \\ $h_{2}:$ [352], [349] \\ $h_{3}:$ [339], [337] \\ $h_{4}:$ [315], [314], [313], [312] \\ $h_{7}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[9/206] \mb{9/206} \begin{gl} \item[361] {\rm Sq(1)[313]} \\ $h_{0}:$ [313] \\ $h_{2}:$ [304] \\ $h_{4}:$ [277], [276] \\ $h_{7}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[8/206] \mb{8/206} \begin{gl} \item[313] {\rm Sq(3)[260]} \\ $h_{2}:$ [258] \\ $h_{4}:$ [239], [238] \\ $h_{7}:$ [62] \item[314] {\rm Sq(3)[261] + Sq(0,1)[261]} \item[315] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{1}:$ [264], [263] \\ $h_{2}:$ [258] \\ $h_{4}:$ [239], [238] \\ $h_{7}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[7/206] \mb{7/206} \begin{gl} \item[265] {\rm Sq(3)[210]} \item[266] {\rm Sq(1)[212]} \\ $h_{0}:$ [212] \\ $h_{2}:$ [208] \\ $h_{4}:$ [195] \\ $h_{5}:$ [178] \\ $h_{6}:$ [128] \\ $h_{7}:$ [59] \end{gl} \end{bdl} \begin{bdl} \item[6/206] \mb{6/206} \begin{gl} \item[212] {\rm Sq(10)[146] + Sq(3,0,1)[146]} \\ $h_{7}:$ [50] \item[213] {\rm Sq(2)[149]} \\ $h_{1}:$ [149] \\ $h_{2}:$ [147] \\ $h_{4}:$ [140] \\ $h_{5}:$ [132], [131], [130] \\ $h_{6}:$ [97] \end{gl} \end{bdl} \dm{207} \begin{bdl} \item[100/207] \mb{100/207} \begin{gl} \item[4] {\rm Sq(1)[6]} \\ $h_{0}:$ [6] \end{gl} \end{bdl} \begin{bdl} \item[99/207] \mb{99/207} \begin{gl} \item[6] {\rm Sq(1)[10] + Sq(1)[9]} \\ $h_{0}:$ [10], [9] \end{gl} \end{bdl} \begin{bdl} \item[98/207] \mb{98/207} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [8] \item[10] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[97/207] \mb{97/207} \begin{gl} \item[11] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \item[12] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[96/207] \mb{96/207} \begin{gl} \item[10] {\rm Sq(0,1)[7]} \item[11] {\rm Sq(1)[9]} \\ $h_{0}:$ [9] \end{gl} \end{bdl} \begin{bdl} \item[95/207] \mb{95/207} \begin{gl} \item[9] {\rm Sq(1)[11]} \\ $h_{0}:$ [11] \end{gl} \end{bdl} \begin{bdl} \item[94/207] \mb{94/207} \begin{gl} \item[11] {\rm Sq(1)[15]} \\ $h_{0}:$ [15] \end{gl} \end{bdl} \begin{bdl} \item[93/207] \mb{93/207} \begin{gl} \item[14] {\rm Sq(0,1)[13]} \item[15] {\rm Sq(3)[13]} \end{gl} \end{bdl} \begin{bdl} \item[90/207] \mb{90/207} \begin{gl} \item[16] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[88/207] \mb{88/207} \begin{gl} \item[21] {\rm Sq(2)[18]} \\ $h_{1}:$ [18] \end{gl} \end{bdl} \begin{bdl} \item[87/207] \mb{87/207} \begin{gl} \item[19] {\rm Sq(0,1)[20]} \end{gl} \end{bdl} \begin{bdl} \item[84/207] \mb{84/207} \begin{gl} \item[29] {\rm Sq(0,1)[27]} \end{gl} \end{bdl} \begin{bdl} \item[83/207] \mb{83/207} \begin{gl} \item[30] {\rm Sq(1)[34]} \\ $h_{0}:$ [34] \\ $h_{1}:$ [31] \\ $h_{2}:$ [28] \item[31] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{1}:$ [33] \\ $h_{2}:$ [29] \\ $h_{3}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[82/207] \mb{82/207} \begin{gl} \item[34] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [30] \item[35] {\rm Sq(1)[37]} \\ $h_{0}:$ [37] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[81/207] \mb{81/207} \begin{gl} \item[35] {\rm Sq(0,1)[33]} \item[36] {\rm Sq(0,1)[34]} \item[37] {\rm Sq(1)[35]} \\ $h_{0}:$ [35] \\ $h_{2}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[80/207] \mb{80/207} \begin{gl} \item[35] {\rm Sq(1,1)[35]} \end{gl} \end{bdl} \begin{bdl} \item[79/207] \mb{79/207} \begin{gl} \item[38] {\rm Sq(1)[42]} \\ $h_{0}:$ [42] \\ $h_{2}:$ [38] \\ $h_{4}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[78/207] \mb{78/207} \begin{gl} \item[42] {\rm Sq(0,1)[41]} \item[43] {\rm Sq(0,1)[42]} \end{gl} \end{bdl} \begin{bdl} \item[77/207] \mb{77/207} \begin{gl} \item[46] {\rm Sq(0,1)[41]} \end{gl} \end{bdl} \begin{bdl} \item[75/207] \mb{75/207} \begin{gl} \item[52] {\rm Sq(0,1)[56]} \item[53] {\rm Sq(0,1)[57]} \end{gl} \end{bdl} \begin{bdl} \item[74/207] \mb{74/207} \begin{gl} \item[60] {\rm Sq(0,1)[58]} \end{gl} \end{bdl} \begin{bdl} \item[72/207] \mb{72/207} \begin{gl} \item[60] {\rm Sq(0,1)[57]} \item[61] {\rm Sq(0,1)[58]} \item[62] {\rm Sq(2)[61]} \\ $h_{1}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[71/207] \mb{71/207} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[69/207] \mb{69/207} \begin{gl} \item[73] {\rm Sq(0,1)[69]} \item[74] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[68/207] \mb{68/207} \begin{gl} \item[76] {\rm Sq(0,1)[75]} \end{gl} \end{bdl} \begin{bdl} \item[67/207] \mb{67/207} \begin{gl} \item[83] {\rm Sq(1)[88]} \\ $h_{0}:$ [88] \\ $h_{1}:$ [86], [84] \\ $h_{2}:$ [78] \\ $h_{3}:$ [71] \item[84] {\rm Sq(1)[91]} \\ $h_{0}:$ [91] \\ $h_{1}:$ [84] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[66/207] \mb{66/207} \begin{gl} \item[88] {\rm Sq(0,1)[83]} \item[89] {\rm Sq(0,1)[85]} \item[90] {\rm Sq(0,1)[86]} \item[91] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \\ $h_{2}:$ [81] \end{gl} \end{bdl} \begin{bdl} \item[65/207] \mb{65/207} \begin{gl} \item[89] {\rm Sq(1,1)[86]} \item[90] {\rm Sq(0,1)[87]} \end{gl} \end{bdl} \begin{bdl} \item[64/207] \mb{64/207} \begin{gl} \item[92] {\rm Sq(2)[96] + Sq(2)[95]} \\ $h_{1}:$ [96], [95] \item[93] {\rm Sq(1)[101]} \\ $h_{0}:$ [101] \\ $h_{2}:$ [93] \\ $h_{4}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[63/207] \mb{63/207} \begin{gl} \item[98] {\rm Sq(0,1)[99]} \item[99] {\rm Sq(0,1)[100]} \item[100] {\rm Sq(0,1)[101]} \item[101] {\rm Sq(1)[103]} \\ $h_{0}:$ [103] \\ $h_{2}:$ [97], [96] \\ $h_{4}:$ [70] \end{gl} \end{bdl} \begin{bdl} \item[62/207] \mb{62/207} \begin{gl} \item[103] {\rm Sq(0,1)[103]} \item[104] {\rm Sq(0,1)[104]} \item[105] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[60/207] \mb{60/207} \begin{gl} \item[116] {\rm Sq(0,1)[124]} \item[117] {\rm Sq(0,1)[125]} \item[118] {\rm Sq(0,1)[126]} \item[119] {\rm Sq(1)[131]} \\ $h_{0}:$ [131] \\ $h_{3}:$ [111] \end{gl} \end{bdl} \begin{bdl} \item[59/207] \mb{59/207} \begin{gl} \item[127] {\rm Sq(0,1)[130]} \item[128] {\rm Sq(0,1)[131]} \item[129] {\rm Sq(0,1)[132]} \item[130] {\rm Sq(1)[137]} \\ $h_{0}:$ [137] \\ $h_{1}:$ [136] \item[131] {\rm Sq(1)[138]} \\ $h_{0}:$ [138] \\ $h_{3}:$ [118] \end{gl} \end{bdl} \begin{bdl} \item[58/207] \mb{58/207} \begin{gl} \item[137] {\rm Sq(0,1)[132]} \item[138] {\rm Sq(1)[139]} \\ $h_{0}:$ [139] \\ $h_{3}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[57/207] \mb{57/207} \begin{gl} \item[136] {\rm Sq(0,1)[133]} \item[137] {\rm Sq(0,1)[134]} \item[138] {\rm Sq(0,1)[135]} \item[139] {\rm Sq(1)[140]} \\ $h_{0}:$ [140] \\ $h_{3}:$ [117] \end{gl} \end{bdl} \begin{bdl} \item[56/207] \mb{56/207} \begin{gl} \item[137] {\rm Sq(0,1)[139]} \item[138] {\rm Sq(0,1)[140]} \item[139] {\rm Sq(0,1)[141]} \item[140] {\rm Sq(1)[147]} \\ $h_{0}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[55/207] \mb{55/207} \begin{gl} \item[146] {\rm Sq(0,1)[147]} \item[147] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[54/207] \mb{54/207} \begin{gl} \item[152] {\rm Sq(2,1)[142]} \item[153] {\rm Sq(0,1)[149]} \item[154] {\rm Sq(0,1)[150]} \item[155] {\rm Sq(0,1)[151]} \end{gl} \end{bdl} \begin{bdl} \item[53/207] \mb{53/207} \begin{gl} \item[156] {\rm Sq(0,1)[155]} \item[157] {\rm Sq(0,1)[156]} \item[158] {\rm Sq(0,1)[157]} \end{gl} \end{bdl} \begin{bdl} \item[52/207] \mb{52/207} \begin{gl} \item[164] {\rm Sq(0,1)[170]} \end{gl} \end{bdl} \begin{bdl} \item[51/207] \mb{51/207} \begin{gl} \item[175] {\rm Sq(0,1)[179]} \item[176] {\rm Sq(0,1)[180]} \item[177] {\rm Sq(0,1)[181]} \item[178] {\rm Sq(0,1)[182]} \item[179] {\rm Sq(1)[189]} \\ $h_{0}:$ [189] \\ $h_{1}:$ [184] \end{gl} \end{bdl} \begin{bdl} \item[50/207] \mb{50/207} \begin{gl} \item[186] {\rm Sq(0,1)[184]} \item[187] {\rm Sq(0,1)[185]} \item[188] {\rm Sq(0,1)[186]} \item[189] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[49/207] \mb{49/207} \begin{gl} \item[193] {\rm Sq(0,1)[191]} \item[194] {\rm Sq(3)[192] + Sq(0,1)[192]} \item[195] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \item[196] {\rm Sq(1)[202]} \\ $h_{0}:$ [202] \\ $h_{1}:$ [193] \\ $h_{2}:$ [189] \end{gl} \end{bdl} \begin{bdl} \item[48/207] \mb{48/207} \begin{gl} \item[197] {\rm Sq(1,1)[196]} \item[198] {\rm Sq(0,1)[198]} \item[199] {\rm Sq(0,1)[199]} \item[200] {\rm Sq(0,1)[200]} \item[201] {\rm Sq(0,1)[201]} \item[202] {\rm Sq(1)[208]} \\ $h_{0}:$ [208] \\ $h_{2}:$ [192] \end{gl} \end{bdl} \begin{bdl} \item[47/207] \mb{47/207} \begin{gl} \item[207] {\rm Sq(0,1)[210]} \item[208] {\rm Sq(3)[211] + Sq(0,1)[209]} \item[209] {\rm Sq(0,1)[212]} \item[210] {\rm Sq(0,1)[213]} \item[211] {\rm Sq(1)[222]} \\ $h_{0}:$ [222] \\ $h_{2}:$ [206] \end{gl} \end{bdl} \begin{bdl} \item[46/207] \mb{46/207} \begin{gl} \item[221] {\rm Sq(0,1)[224]} \item[222] {\rm Sq(3)[226] + Sq(0,1)[226] + Sq(3)[225] + Sq(0,1)[225]} \end{gl} \end{bdl} \begin{bdl} \item[45/207] \mb{45/207} \begin{gl} \item[235] {\rm Sq(0,1)[230]} \item[236] {\rm Sq(0,1)[231]} \item[237] {\rm Sq(0,1)[232]} \item[238] {\rm Sq(0,1)[233]} \item[239] {\rm Sq(0,1)[234]} \item[240] {\rm Sq(1)[249] + Sq(1)[247] + Sq(1)[244]} \\ $h_{0}:$ [249], [247], [244] \\ $h_{1}:$ [240] \\ $h_{2}:$ [228] \\ $h_{3}:$ [206] \\ $h_{4}:$ [168] \end{gl} \end{bdl} \begin{bdl} \item[44/207] \mb{44/207} \begin{gl} \item[243] {\rm Sq(0,1)[242]} \item[244] {\rm Sq(0,1)[243]} \item[245] {\rm Sq(0,1)[244]} \item[246] {\rm Sq(0,1)[245]} \item[247] {\rm Sq(0,1)[246]} \item[248] {\rm Sq(2)[254] + Sq(2)[252] + Sq(2)[249]} \\ $h_{1}:$ [254], [252], [249] \item[249] {\rm Sq(1)[259]} \\ $h_{0}:$ [259] \\ $h_{3}:$ [220], [219] \end{gl} \end{bdl} \begin{bdl} \item[43/207] \mb{43/207} \begin{gl} \item[257] {\rm Sq(0,1)[256]} \item[258] {\rm Sq(0,1)[257]} \item[259] {\rm Sq(1)[272] + Sq(1)[267]} \\ $h_{0}:$ [272], [267] \\ $h_{3}:$ [230], [224] \end{gl} \end{bdl} \begin{bdl} \item[42/207] \mb{42/207} \begin{gl} \item[267] {\rm Sq(0,1)[263]} \item[268] {\rm Sq(0,1)[264]} \item[269] {\rm Sq(0,1)[265]} \item[270] {\rm Sq(0,1)[266]} \item[271] {\rm Sq(0,1)[267]} \item[272] {\rm Sq(1)[278]} \\ $h_{0}:$ [278] \\ $h_{3}:$ [237] \end{gl} \end{bdl} \begin{bdl} \item[41/207] \mb{41/207} \begin{gl} \item[273] {\rm Sq(0,1)[265]} \item[274] {\rm Sq(0,1)[266]} \item[275] {\rm Sq(0,1)[267]} \item[276] {\rm Sq(0,1)[268]} \item[277] {\rm Sq(0,1)[269]} \item[278] {\rm Sq(1)[281]} \\ $h_{0}:$ [281] \end{gl} \end{bdl} \begin{bdl} \item[40/207] \mb{40/207} \begin{gl} \item[277] {\rm Sq(0,1)[271] + Sq(0,1)[270]} \item[278] {\rm Sq(0,1)[272]} \item[279] {\rm Sq(3)[274] + Sq(0,1)[274] + Sq(0,1)[270]} \item[280] {\rm Sq(2)[278]} \\ $h_{1}:$ [278] \item[281] {\rm Sq(1)[285]} \\ $h_{0}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[39/207] \mb{39/207} \begin{gl} \item[281] {\rm Sq(0,1)[279]} \item[282] {\rm Sq(0,1)[281] + Sq(0,1)[280]} \item[283] {\rm Sq(0,1)[282] + Sq(0,1)[280]} \item[284] {\rm Sq(3)[284] + Sq(0,1)[284] + Sq(3)[282]} \item[285] {\rm Sq(1)[290]} \\ $h_{0}:$ [290] \end{gl} \end{bdl} \begin{bdl} \item[38/207] \mb{38/207} \begin{gl} \item[290] {\rm Sq(2,1)[282]} \item[291] {\rm Sq(0,1)[290]} \item[292] {\rm Sq(0,1)[291]} \item[293] {\rm Sq(0,1)[292] + Sq(0,1)[289]} \item[294] {\rm Sq(3)[295] + Sq(0,1)[295] + Sq(0,1)[289]} \end{gl} \end{bdl} \begin{bdl} \item[37/207] \mb{37/207} \begin{gl} \item[303] {\rm Sq(1,1)[297]} \item[304] {\rm Sq(0,1)[301]} \item[305] {\rm Sq(3)[303] + Sq(0,1)[303] + Sq(0,1)[300] + Sq(0,1)[299]} \item[306] {\rm Sq(3)[304] + Sq(0,1)[304] + Sq(0,1)[300] + Sq(3)[299] + Sq(0,1)[299]} \end{gl} \end{bdl} \begin{bdl} \item[36/207] \mb{36/207} \begin{gl} \item[312] {\rm Sq(0,1)[307]} \item[313] {\rm Sq(0,1)[308] + Sq(3)[307]} \item[314] {\rm Sq(0,1)[309] + Sq(3)[307]} \end{gl} \end{bdl} \begin{bdl} \item[35/207] \mb{35/207} \begin{gl} \item[317] {\rm Sq(0,1)[312]} \item[318] {\rm Sq(0,1)[313]} \item[319] {\rm Sq(0,1)[314]} \item[320] {\rm Sq(0,1)[315]} \item[321] {\rm Sq(2)[323] + Sq(2)[320] + Sq(2)[318]} \\ $h_{1}:$ [323], [320], [318] \item[322] {\rm Sq(1)[327] + Sq(1)[325]} \\ $h_{0}:$ [327], [325] \\ $h_{1}:$ [319] \end{gl} \end{bdl} \begin{bdl} \item[34/207] \mb{34/207} \begin{gl} \item[325] {\rm Sq(1,1)[321] + Sq(1,1)[319]} \item[326] {\rm Sq(0,1)[325]} \item[327] {\rm Sq(3)[326] + Sq(0,1)[326]} \end{gl} \end{bdl} \begin{bdl} \item[33/207] \mb{33/207} \begin{gl} \item[334] {\rm Sq(1,1)[325] + Sq(1,1)[324] + Sq(1,1)[321] + Sq(1,1)[320] + Sq(1,1)[319] + Sq(1,1)[318]} \item[335] {\rm Sq(0,1)[327]} \item[336] {\rm Sq(0,1)[328] + Sq(0,1)[326]} \item[337] {\rm Sq(3)[331] + Sq(0,1)[331] + Sq(3)[330] + Sq(0,1)[330]} \item[338] {\rm Sq(2)[334]} \\ $h_{1}:$ [334] \item[339] {\rm Sq(1)[343] + Sq(1)[338]} \\ $h_{0}:$ [343], [338] \\ $h_{2}:$ [324], [322] \\ $h_{4}:$ [263] \\ $h_{7}:$ [12] \item[340] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \\ $h_{1}:$ [332] \\ $h_{2}:$ [324], [323] \\ $h_{4}:$ [263] \\ $h_{5}:$ [199], [198] \end{gl} \end{bdl} \begin{bdl} \item[32/207] \mb{32/207} \begin{gl} \item[338] {\rm Sq(1,1)[321] + Sq(1,1)[319] + Sq(1,1)[318]} \item[339] {\rm Sq(1,1)[322] + Sq(1,1)[320] + Sq(1,1)[319]} \item[340] {\rm Sq(0,1)[324]} \item[341] {\rm Sq(0,1)[325]} \item[342] {\rm Sq(2)[333] + Sq(2)[331]} \\ $h_{1}:$ [333], [331] \item[343] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \\ $h_{2}:$ [319] \\ $h_{4}:$ [262], [261] \\ $h_{7}:$ [10] \item[344] {\rm Sq(1)[340] + Sq(1)[339]} \\ $h_{0}:$ [340], [339] \\ $h_{2}:$ [319], [318] \\ $h_{4}:$ [262], [261] \end{gl} \end{bdl} \begin{bdl} \item[31/207] \mb{31/207} \begin{gl} \item[337] {\rm Sq(0,1)[331] + Sq(0,1)[330] + Sq(0,1)[329]} \item[338] {\rm Sq(3)[331] + Sq(3)[330] + Sq(0,1)[330]} \item[339] {\rm Sq(0,1)[332] + Sq(3)[330]} \item[340] {\rm Sq(3)[332] + Sq(3)[330] + Sq(0,1)[330] + Sq(3)[329] + Sq(0,1)[329]} \item[341] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \\ $h_{1}:$ [339], [335] \\ $h_{2}:$ [324] \\ $h_{5}:$ [211] \\ $h_{7}:$ [12] \item[342] {\rm Sq(1)[345]} \\ $h_{0}:$ [345] \\ $h_{1}:$ [336] \\ $h_{2}:$ [328], [324] \\ $h_{3}:$ [310], [307], [306] \end{gl} \end{bdl} \begin{bdl} \item[30/207] \mb{30/207} \begin{gl} \item[342] {\rm Sq(3)[336] + Sq(0,1)[336] + Sq(3)[335] + Sq(0,1)[335]} \item[343] {\rm Sq(0,1)[337] + Sq(0,1)[335]} \item[344] {\rm Sq(2)[340]} \\ $h_{1}:$ [340] \item[345] {\rm Sq(1)[348] + Sq(1)[346]} \\ $h_{0}:$ [348], [346] \\ $h_{2}:$ [332] \\ $h_{3}:$ [317], [316], [315] \end{gl} \end{bdl} \begin{bdl} \item[29/207] \mb{29/207} \begin{gl} \item[345] {\rm Sq(2,1)[333] + Sq(2,1)[331]} \item[346] {\rm Sq(3)[336]} \item[347] {\rm Sq(0,1)[337]} \item[348] {\rm Sq(1)[348]} \\ $h_{0}:$ [348] \\ $h_{3}:$ [318], [317], [315] \item[349] {\rm Sq(1)[349] + Sq(1)[346]} \\ $h_{0}:$ [349], [346] \\ $h_{3}:$ [320], [318], [317] \\ $h_{4}:$ [281] \\ $h_{7}:$ [14] \end{gl} \end{bdl} \begin{bdl} \item[28/207] \mb{28/207} \begin{gl} \item[344] {\rm Sq(2,1)[333] + Sq(2,1)[331]} \item[345] {\rm Sq(0,1)[339]} \item[346] {\rm Sq(3)[340] + Sq(0,1)[340] + Sq(3)[339]} \\ $h_{2}:$ [337] \item[347] {\rm Sq(2)[344] + Sq(2)[342]} \\ $h_{1}:$ [344], [342] \\ $h_{2}:$ [337] \item[348] {\rm Sq(1)[351] + Sq(1)[349] + Sq(1)[348]} \\ $h_{0}:$ [351], [349], [348] \\ $h_{3}:$ [318] \item[349] {\rm Sq(1)[352] + Sq(1)[348]} \\ $h_{0}:$ [352], [348] \\ $h_{2}:$ [337] \\ $h_{3}:$ [321], [318] \end{gl} \end{bdl} \begin{bdl} \item[27/207] \mb{27/207} \begin{gl} \item[348] {\rm Sq(3)[344] + Sq(0,1)[344]} \item[349] {\rm Sq(3)[346] + Sq(3)[345] + Sq(0,1)[345]} \item[350] {\rm Sq(2)[351] + Sq(2)[350]} \\ $h_{1}:$ [351], [350] \item[351] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \item[352] {\rm Sq(1)[357] + Sq(1)[353]} \\ $h_{0}:$ [357], [353] \\ $h_{3}:$ [326], [325] \end{gl} \end{bdl} \begin{bdl} \item[26/207] \mb{26/207} \begin{gl} \item[353] {\rm Sq(0,1)[346]} \item[354] {\rm Sq(3)[347] + Sq(0,1)[347] + Sq(3)[346]} \item[355] {\rm Sq(2)[351] + Sq(2)[350]} \\ $h_{1}:$ [351], [350] \\ $h_{7}:$ [21] \item[356] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \item[357] {\rm Sq(1)[356] + Sq(1)[353]} \\ $h_{0}:$ [356], [353] \\ $h_{3}:$ [328], [327] \item[358] {\rm Sq(1)[358] + Sq(1)[354]} \\ $h_{0}:$ [358], [354] \\ $h_{1}:$ [352], [350] \\ $h_{7}:$ [22], [21] \end{gl} \end{bdl} \begin{bdl} \item[25/207] \mb{25/207} \begin{gl} \item[353] {\rm Sq(1,1)[344]} \item[354] {\rm Sq(0,1)[346] + Sq(0,1)[345]} \item[355] {\rm Sq(3)[346] + Sq(3)[345]} \item[356] {\rm Sq(3)[348] + Sq(3)[347]} \item[357] {\rm Sq(1)[354] + Sq(1)[353]} \\ $h_{0}:$ [354], [353] \\ $h_{3}:$ [330] \\ $h_{4}:$ [297] \item[358] {\rm Sq(1)[356] + Sq(1)[355] + Sq(1)[353]} \\ $h_{0}:$ [356], [355], [353] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[24/207] \mb{24/207} \begin{gl} \item[353] {\rm Sq(1,1)[345]} \item[354] {\rm Sq(1,1)[346] + Sq(1,1)[344]} \item[355] {\rm Sq(1,1)[348] + Sq(1,1)[347]} \item[356] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \\ $h_{7}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[23/207] \mb{23/207} \begin{gl} \item[356] {\rm Sq(3)[372] + Sq(0,1)[372] + Sq(3)[371] + Sq(0,1)[371] + Sq(3)[370] + Sq(0,1)[370] + Sq(3)[367] + Sq(0,1)[367]} \\ $h_{7}:$ [21] \item[357] {\rm Sq(2)[375]} \\ $h_{1}:$ [375] \\ $h_{7}:$ [22], [21] \item[358] {\rm Sq(1)[377]} \\ $h_{0}:$ [377] \\ $h_{3}:$ [346], [344] \\ $h_{7}:$ [21] \item[359] {\rm Sq(1)[378]} \\ $h_{0}:$ [378] \\ $h_{3}:$ [346], [345], [344] \\ $h_{5}:$ [252] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[22/207] \mb{22/207} \begin{gl} \item[376] {\rm Sq(0,1)[383] + Sq(0,1)[379] + Sq(3)[378]} \item[377] {\rm Sq(3)[383] + Sq(3)[381] + Sq(0,1)[381] + Sq(3)[380] + Sq(0,1)[380] + Sq(3)[379]} \item[378] {\rm Sq(1)[394]} \\ $h_{0}:$ [394] \end{gl} \end{bdl} \begin{bdl} \item[21/207] \mb{21/207} \begin{gl} \item[394] {\rm Sq(5)[383] + Sq(2,1)[383] + Sq(5)[380] + Sq(2,1)[380] + Sq(2,1)[379]} \end{gl} \end{bdl} \begin{bdl} \item[20/207] \mb{20/207} \begin{gl} \item[402] {\rm Sq(1,1)[403] + Sq(1,1)[401] + Sq(4)[400]} \\ $h_{2}:$ [400] \item[403] {\rm Sq(0,1)[405]} \item[404] {\rm Sq(3)[409] + Sq(3)[408] + Sq(3)[406] + Sq(0,1)[406] + Sq(3)[404] + Sq(0,1)[404]} \\ $h_{7}:$ [32] \item[405] {\rm Sq(2)[412]} \\ $h_{1}:$ [412] \\ $h_{2}:$ [400] \item[406] {\rm Sq(1)[420] + Sq(1)[419] + Sq(1)[418]} \\ $h_{0}:$ [420], [419], [418] \\ $h_{2}:$ [400] \item[407] {\rm Sq(1)[422] + Sq(1)[419]} \\ $h_{0}:$ [422], [419] \\ $h_{1}:$ [413] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[19/207] \mb{19/207} \begin{gl} \item[418] {\rm Sq(1,1)[415] + Sq(1,1)[414]} \item[419] {\rm Sq(0,1)[418]} \item[420] {\rm Sq(3)[418]} \item[421] {\rm Sq(1)[428]} \\ $h_{0}:$ [428] \item[422] {\rm Sq(1)[430] + Sq(1)[429]} \\ $h_{0}:$ [430], [429] \end{gl} \end{bdl} \begin{bdl} \item[18/207] \mb{18/207} \begin{gl} \item[428] {\rm Sq(1,1)[431]} \item[429] {\rm Sq(1,1)[432] + Sq(1,1)[430] + Sq(1,1)[429]} \item[430] {\rm Sq(3)[435] + Sq(0,1)[435] + Sq(3)[434] + Sq(0,1)[434]} \item[431] {\rm Sq(1)[442] + Sq(1)[441]} \\ $h_{0}:$ [442], [441] \\ $h_{1}:$ [438] \\ $h_{2}:$ [431] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[17/207] \mb{17/207} \begin{gl} \item[441] {\rm Sq(3)[454]} \\ $h_{2}:$ [445] \\ $h_{4}:$ [368], [367] \\ $h_{5}:$ [281] \item[442] {\rm Sq(3)[455] + Sq(0,1)[455] + Sq(0,1)[454]} \\ $h_{2}:$ [445] \\ $h_{4}:$ [368], [367] \\ $h_{5}:$ [281] \\ $h_{7}:$ [37] \end{gl} \end{bdl} \begin{bdl} \item[16/207] \mb{16/207} \begin{gl} \item[461] {\rm Sq(2)[475] + Sq(2)[472]} \\ $h_{1}:$ [475], [472] \\ $h_{4}:$ [378] \item[462] {\rm Sq(1)[477]} \\ $h_{0}:$ [477] \\ $h_{1}:$ [473] \\ $h_{2}:$ [464] \\ $h_{4}:$ [379], [377] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[15/207] \mb{15/207} \begin{gl} \item[476] {\rm Sq(3)[472] + Sq(0,1)[472] + Sq(3)[471] + Sq(0,1)[471]} \\ $h_{7}:$ [42] \item[477] {\rm Sq(1)[480]} \\ $h_{0}:$ [480] \\ $h_{2}:$ [465] \\ $h_{4}:$ [382], [381], [380] \\ $h_{7}:$ [43], [42] \item[478] {\rm Sq(1)[481]} \\ $h_{0}:$ [481] \\ $h_{1}:$ [477], [476], [474], [473] \\ $h_{3}:$ [436] \\ $h_{4}:$ [387], [386] \\ $h_{7}:$ [42] \item[479] {\rm Sq(1)[482]} \\ $h_{0}:$ [482] \\ $h_{1}:$ [478], [477], [476], [475], [474], [473] \\ $h_{2}:$ [466], [465], [462], [461] \\ $h_{3}:$ [440], [437] \\ $h_{4}:$ [387], [386], [383], [382], [381] \\ $h_{5}:$ [306], [303] \\ $h_{7}:$ [42] \end{gl} \end{bdl} \begin{bdl} \item[14/207] \mb{14/207} \begin{gl} \item[480] {\rm Sq(1,1)[452] + Sq(1,1)[451] + Sq(1,1)[448]} \\ $h_{7}:$ [43] \item[481] {\rm Sq(1)[465]} \\ $h_{0}:$ [465] \\ $h_{4}:$ [377], [376] \item[482] {\rm Sq(1)[468] + Sq(1)[467] + Sq(1)[466]} \\ $h_{0}:$ [468], [467], [466] \\ $h_{2}:$ [448] \\ $h_{4}:$ [377], [376] \\ $h_{5}:$ [313] \end{gl} \end{bdl} \begin{bdl} \item[13/207] \mb{13/207} \begin{gl} \item[465] {\rm Sq(1,1)[441] + Sq(1,1)[438] + Sq(1,1)[435]} \\ $h_{4}:$ [371], [369] \item[466] {\rm Sq(1,1)[443] + Sq(1,1)[440] + Sq(1,1)[437] + Sq(1,1)[435]} \\ $h_{4}:$ [372] \item[467] {\rm Sq(3)[445] + Sq(3)[444]} \\ $h_{4}:$ [371], [369] \\ $h_{7}:$ [44] \item[468] {\rm Sq(3)[447] + Sq(0,1)[447]} \\ $h_{4}:$ [372] \\ $h_{7}:$ [44] \item[469] {\rm Sq(2)[449]} \\ $h_{1}:$ [449] \\ $h_{3}:$ [413] \\ $h_{4}:$ [371], [369] \item[470] {\rm Sq(1)[456]} \\ $h_{0}:$ [456] \\ $h_{1}:$ [451] \\ $h_{2}:$ [441], [440], [437], [435] \\ $h_{3}:$ [417], [416], [415], [413] \\ $h_{4}:$ [375], [372], [370] \\ $h_{5}:$ [319] \\ $h_{6}:$ [199] \item[471] {\rm Sq(1)[457]} \\ $h_{0}:$ [457] \\ $h_{1}:$ [451] \\ $h_{2}:$ [441], [437], [435] \\ $h_{3}:$ [415], [414] \\ $h_{4}:$ [375], [371], [370], [369] \end{gl} \end{bdl} \begin{bdl} \item[12/207] \mb{12/207} \begin{gl} \item[456] {\rm Sq(1)[433] + Sq(1)[431]} \\ $h_{0}:$ [433], [431] \\ $h_{2}:$ [420], [419] \\ $h_{3}:$ [400] \\ $h_{4}:$ [368] \item[457] {\rm Sq(1)[435] + Sq(1)[434] + Sq(1)[431]} \\ $h_{0}:$ [435], [434], [431] \\ $h_{2}:$ [420] \\ $h_{4}:$ [368] \end{gl} \end{bdl} \begin{bdl} \item[11/207] \mb{11/207} \begin{gl} \item[431] {\rm Sq(1,1)[391] + Sq(1,1)[390] + Sq(4)[389]} \\ $h_{2}:$ [389] \\ $h_{3}:$ [376] \item[432] {\rm Sq(4)[391]} \\ $h_{2}:$ [391] \\ $h_{3}:$ [374] \\ $h_{4}:$ [348], [347] \item[433] {\rm Sq(1,1)[392] + Sq(1,1)[390] + Sq(4)[389] + Sq(1,1)[389]} \\ $h_{2}:$ [389] \item[434] {\rm Sq(1,1)[393] + Sq(4)[390] + Sq(1,1)[389]} \\ $h_{2}:$ [390] \\ $h_{3}:$ [375], [374] \\ $h_{4}:$ [347] \item[435] {\rm Sq(3)[395]} \\ $h_{2}:$ [390], [389] \\ $h_{3}:$ [376], [375], [374] \\ $h_{4}:$ [347] \item[436] {\rm Sq(3)[396] + Sq(0,1)[396] + Sq(0,1)[395]} \\ $h_{2}:$ [389] \\ $h_{3}:$ [376], [375] \\ $h_{4}:$ [347] \end{gl} \end{bdl} \begin{bdl} \item[10/207] \mb{10/207} \begin{gl} \item[400] {\rm Sq(3)[357] + Sq(0,1)[356]} \\ $h_{2}:$ [353] \\ $h_{4}:$ [316] \\ $h_{7}:$ [58] \item[401] {\rm Sq(3)[359] + Sq(0,1)[356]} \\ $h_{4}:$ [316] \end{gl} \end{bdl} \begin{bdl} \item[9/207] \mb{9/207} \begin{gl} \item[362] {\rm Sq(4)[309] + Sq(1,1)[309]} \\ $h_{2}:$ [309] \item[363] {\rm Sq(1,1)[310] + Sq(1,1)[308] + Sq(1,1)[307]} \item[364] {\rm Sq(2)[314]} \\ $h_{1}:$ [314] \end{gl} \end{bdl} \begin{bdl} \item[7/207] \mb{7/207} \begin{gl} \item[267] {\rm Sq(1)[214]} \\ $h_{0}:$ [214] \\ $h_{1}:$ [212] \\ $h_{7}:$ [61], [60] \end{gl} \end{bdl} \begin{bdl} \item[6/207] \mb{6/207} \begin{gl} \item[214] {\rm Sq(1)[150]} \\ $h_{0}:$ [150] \\ $h_{7}:$ [52], [51] \end{gl} \end{bdl} \begin{bdl} \item[5/207] \mb{5/207} \begin{gl} \item[150] {\rm Sq(1,1)[93]} \\ $h_{7}:$ [40] \end{gl} \end{bdl} \dm{208} \begin{bdl} \item[97/208] \mb{97/208} \begin{gl} \item[13] {\rm Sq(1)[12]} \\ $h_{0}:$ [12] \\ $h_{1}:$ [10] \\ $h_{2}:$ [8] \end{gl} \end{bdl} \begin{bdl} \item[96/208] \mb{96/208} \begin{gl} \item[12] {\rm Sq(1)[10]} \\ $h_{0}:$ [10] \\ $h_{2}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[95/208] \mb{95/208} \begin{gl} \item[10] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[94/208] \mb{94/208} \begin{gl} \item[12] {\rm Sq(2)[15] + Sq(2)[14]} \\ $h_{1}:$ [15], [14] \end{gl} \end{bdl} \begin{bdl} \item[92/208] \mb{92/208} \begin{gl} \item[14] {\rm Sq(0,1)[12]} \end{gl} \end{bdl} \begin{bdl} \item[89/208] \mb{89/208} \begin{gl} \item[21] {\rm Sq(0,1)[20]} \item[22] {\rm Sq(1)[22]} \\ $h_{0}:$ [22] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[88/208] \mb{88/208} \begin{gl} \item[22] {\rm Sq(1)[20]} \\ $h_{0}:$ [20] \end{gl} \end{bdl} \begin{bdl} \item[87/208] \mb{87/208} \begin{gl} \item[20] {\rm Sq(1)[21]} \\ $h_{0}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[86/208] \mb{86/208} \begin{gl} \item[21] {\rm Sq(1,1)[25]} \item[22] {\rm Sq(0,1)[26]} \end{gl} \end{bdl} \begin{bdl} \item[83/208] \mb{83/208} \begin{gl} \item[32] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[81/208] \mb{81/208} \begin{gl} \item[38] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{1}:$ [35] \\ $h_{2}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[80/208] \mb{80/208} \begin{gl} \item[36] {\rm Sq(1,1)[36]} \item[37] {\rm Sq(0,1)[37]} \end{gl} \end{bdl} \begin{bdl} \item[79/208] \mb{79/208} \begin{gl} \item[39] {\rm Sq(1)[45]} \\ $h_{0}:$ [45] \\ $h_{1}:$ [42] \\ $h_{2}:$ [40] \\ $h_{4}:$ [25] \end{gl} \end{bdl} \begin{bdl} \item[78/208] \mb{78/208} \begin{gl} \item[44] {\rm Sq(2)[46]} \\ $h_{1}:$ [46] \item[45] {\rm Sq(1)[47]} \\ $h_{0}:$ [47] \\ $h_{2}:$ [41] \\ $h_{4}:$ [28] \end{gl} \end{bdl} \begin{bdl} \item[77/208] \mb{77/208} \begin{gl} \item[47] {\rm Sq(0,1)[44]} \item[48] {\rm Sq(0,1)[45]} \end{gl} \end{bdl} \begin{bdl} \item[76/208] \mb{76/208} \begin{gl} \item[47] {\rm Sq(0,1)[50]} \end{gl} \end{bdl} \begin{bdl} \item[74/208] \mb{74/208} \begin{gl} \item[61] {\rm Sq(0,1)[60]} \item[62] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[73/208] \mb{73/208} \begin{gl} \item[63] {\rm Sq(0,1)[58]} \item[64] {\rm Sq(1)[63]} \\ $h_{0}:$ [63] \\ $h_{1}:$ [62] \end{gl} \end{bdl} \begin{bdl} \item[72/208] \mb{72/208} \begin{gl} \item[63] {\rm Sq(1)[66]} \\ $h_{0}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[71/208] \mb{71/208} \begin{gl} \item[64] {\rm Sq(0,1)[66]} \item[65] {\rm Sq(0,1)[67]} \item[66] {\rm Sq(1)[69]} \\ $h_{0}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[70/208] \mb{70/208} \begin{gl} \item[69] {\rm Sq(1,1)[67]} \item[70] {\rm Sq(0,1)[70]} \end{gl} \end{bdl} \begin{bdl} \item[69/208] \mb{69/208} \begin{gl} \item[75] {\rm Sq(1)[77]} \\ $h_{0}:$ [77] \\ $h_{2}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[68/208] \mb{68/208} \begin{gl} \item[77] {\rm Sq(0,1)[78]} \item[78] {\rm Sq(0,1)[79]} \item[79] {\rm Sq(0,1)[80]} \end{gl} \end{bdl} \begin{bdl} \item[67/208] \mb{67/208} \begin{gl} \item[85] {\rm Sq(0,1)[85]} \end{gl} \end{bdl} \begin{bdl} \item[65/208] \mb{65/208} \begin{gl} \item[91] {\rm Sq(0,1)[88]} \item[92] {\rm Sq(0,1)[89]} \item[93] {\rm Sq(0,1)[90]} \item[94] {\rm Sq(1)[94]} \\ $h_{0}:$ [94] \\ $h_{1}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[64/208] \mb{64/208} \begin{gl} \item[94] {\rm Sq(0,1)[96]} \item[95] {\rm Sq(0,1)[97]} \end{gl} \end{bdl} \begin{bdl} \item[63/208] \mb{63/208} \begin{gl} \item[102] {\rm Sq(1)[109]} \\ $h_{0}:$ [109] \\ $h_{1}:$ [103] \\ $h_{2}:$ [102] \\ $h_{4}:$ [72] \end{gl} \end{bdl} \begin{bdl} \item[62/208] \mb{62/208} \begin{gl} \item[106] {\rm Sq(0,1)[106]} \item[107] {\rm Sq(0,1)[107]} \item[108] {\rm Sq(0,1)[108]} \item[109] {\rm Sq(1)[112]} \\ $h_{0}:$ [112] \\ $h_{2}:$ [103] \end{gl} \end{bdl} \begin{bdl} \item[61/208] \mb{61/208} \begin{gl} \item[110] {\rm Sq(0,1)[113]} \item[111] {\rm Sq(0,1)[114]} \item[112] {\rm Sq(0,1)[115]} \end{gl} \end{bdl} \begin{bdl} \item[59/208] \mb{59/208} \begin{gl} \item[132] {\rm Sq(0,1)[133]} \item[133] {\rm Sq(0,1)[134]} \item[134] {\rm Sq(0,1)[135]} \item[135] {\rm Sq(1)[142]} \\ $h_{0}:$ [142] \\ $h_{1}:$ [137] \\ $h_{3}:$ [119] \\ $h_{4}:$ [92] \end{gl} \end{bdl} \begin{bdl} \item[58/208] \mb{58/208} \begin{gl} \item[139] {\rm Sq(0,1)[133]} \item[140] {\rm Sq(0,1)[134]} \item[141] {\rm Sq(0,1)[135]} \item[142] {\rm Sq(1)[141]} \\ $h_{0}:$ [141] \\ $h_{3}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[57/208] \mb{57/208} \begin{gl} \item[140] {\rm Sq(0,1)[136]} \item[141] {\rm Sq(1)[144]} \\ $h_{0}:$ [144] \\ $h_{3}:$ [121] \end{gl} \end{bdl} \begin{bdl} \item[56/208] \mb{56/208} \begin{gl} \item[141] {\rm Sq(0,1)[143]} \item[142] {\rm Sq(0,1)[144]} \item[143] {\rm Sq(0,1)[145]} \item[144] {\rm Sq(1)[152]} \\ $h_{0}:$ [152] \\ $h_{3}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[55/208] \mb{55/208} \begin{gl} \item[148] {\rm Sq(0,1)[149]} \item[149] {\rm Sq(0,1)[150]} \item[150] {\rm Sq(0,1)[151]} \item[151] {\rm Sq(2)[152]} \\ $h_{1}:$ [152] \item[152] {\rm Sq(1)[157]} \\ $h_{0}:$ [157] \end{gl} \end{bdl} \begin{bdl} \item[54/208] \mb{54/208} \begin{gl} \item[156] {\rm Sq(0,1)[153]} \item[157] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \item[158] {\rm Sq(1)[163]} \\ $h_{0}:$ [163] \\ $h_{2}:$ [152] \end{gl} \end{bdl} \begin{bdl} \item[53/208] \mb{53/208} \begin{gl} \item[159] {\rm Sq(0,1)[159]} \item[160] {\rm Sq(0,1)[160]} \item[161] {\rm Sq(0,1)[161]} \item[162] {\rm Sq(0,1)[162]} \item[163] {\rm Sq(1)[165]} \\ $h_{0}:$ [165] \\ $h_{2}:$ [154] \end{gl} \end{bdl} \begin{bdl} \item[52/208] \mb{52/208} \begin{gl} \item[165] {\rm Sq(0,1)[171]} \item[166] {\rm Sq(0,1)[172]} \item[167] {\rm Sq(0,1)[173]} \item[168] {\rm Sq(0,1)[174]} \end{gl} \end{bdl} \begin{bdl} \item[51/208] \mb{51/208} \begin{gl} \item[180] {\rm Sq(0,1)[183]} \end{gl} \end{bdl} \begin{bdl} \item[50/208] \mb{50/208} \begin{gl} \item[190] {\rm Sq(0,1)[188]} \item[191] {\rm Sq(0,1)[189]} \item[192] {\rm Sq(0,1)[190]} \item[193] {\rm Sq(0,1)[191]} \item[194] {\rm Sq(2)[194]} \\ $h_{1}:$ [194] \end{gl} \end{bdl} \begin{bdl} \item[49/208] \mb{49/208} \begin{gl} \item[197] {\rm Sq(0,1)[194]} \item[198] {\rm Sq(0,1)[195]} \item[199] {\rm Sq(0,1)[196]} \item[200] {\rm Sq(1)[203]} \\ $h_{0}:$ [203] \\ $h_{1}:$ [197] \end{gl} \end{bdl} \begin{bdl} \item[48/208] \mb{48/208} \begin{gl} \item[203] {\rm Sq(1,1)[202]} \item[204] {\rm Sq(0,1)[205]} \end{gl} \end{bdl} \begin{bdl} \item[47/208] \mb{47/208} \begin{gl} \item[212] {\rm Sq(0,1)[216]} \item[213] {\rm Sq(0,1)[217]} \item[214] {\rm Sq(0,1)[218]} \item[215] {\rm Sq(0,1)[219]} \item[216] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{1}:$ [222] \\ $h_{2}:$ [209] \end{gl} \end{bdl} \begin{bdl} \item[46/208] \mb{46/208} \begin{gl} \item[223] {\rm Sq(1,1)[227] + Sq(1,1)[225]} \item[224] {\rm Sq(0,1)[228]} \item[225] {\rm Sq(0,1)[229]} \item[226] {\rm Sq(0,1)[230]} \item[227] {\rm Sq(0,1)[231]} \item[228] {\rm Sq(2)[235]} \\ $h_{1}:$ [235] \end{gl} \end{bdl} \begin{bdl} \item[45/208] \mb{45/208} \begin{gl} \item[241] {\rm Sq(0,1)[239]} \item[242] {\rm Sq(1)[255] + Sq(1)[253] + Sq(1)[250]} \\ $h_{0}:$ [255], [253], [250] \\ $h_{1}:$ [248], [246], [244] \\ $h_{2}:$ [237], [236], [234], [230] \\ $h_{3}:$ [213], [208] \item[243] {\rm Sq(1)[256]} \\ $h_{0}:$ [256] \\ $h_{1}:$ [247], [244] \\ $h_{2}:$ [236] \\ $h_{3}:$ [212], [208] \\ $h_{4}:$ [174], [173] \end{gl} \end{bdl} \begin{bdl} \item[44/208] \mb{44/208} \begin{gl} \item[250] {\rm Sq(0,1)[249]} \item[251] {\rm Sq(0,1)[250]} \item[252] {\rm Sq(0,1)[251]} \item[253] {\rm Sq(0,1)[252]} \item[254] {\rm Sq(0,1)[253]} \item[255] {\rm Sq(1)[265]} \\ $h_{0}:$ [265] \\ $h_{2}:$ [247], [246] \\ $h_{3}:$ [224] \item[256] {\rm Sq(1)[266]} \\ $h_{0}:$ [266] \\ $h_{2}:$ [246], [243] \\ $h_{3}:$ [223] \\ $h_{4}:$ [185], [181] \end{gl} \end{bdl} \begin{bdl} \item[43/208] \mb{43/208} \begin{gl} \item[260] {\rm Sq(0,1)[260]} \item[261] {\rm Sq(0,1)[262] + Sq(0,1)[261]} \item[262] {\rm Sq(0,1)[263] + Sq(0,1)[261]} \item[263] {\rm Sq(0,1)[264] + Sq(0,1)[261]} \item[264] {\rm Sq(3)[265] + Sq(0,1)[265] + Sq(0,1)[261]} \item[265] {\rm Sq(1)[276]} \\ $h_{0}:$ [276] \\ $h_{2}:$ [258] \\ $h_{3}:$ [237] \item[266] {\rm Sq(1)[277] + Sq(1)[273]} \\ $h_{0}:$ [277], [273] \\ $h_{3}:$ [236] \\ $h_{4}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[42/208] \mb{42/208} \begin{gl} \item[273] {\rm Sq(0,1)[269]} \item[274] {\rm Sq(0,1)[270]} \item[275] {\rm Sq(0,1)[271]} \item[276] {\rm Sq(1)[284] + Sq(1)[283]} \\ $h_{0}:$ [284], [283] \\ $h_{3}:$ [244] \item[277] {\rm Sq(1)[285] + Sq(1)[283]} \\ $h_{0}:$ [285], [283] \\ $h_{3}:$ [241] \end{gl} \end{bdl} \begin{bdl} \item[41/208] \mb{41/208} \begin{gl} \item[279] {\rm Sq(0,1)[272] + Sq(0,1)[271]} \item[280] {\rm Sq(0,1)[273]} \item[281] {\rm Sq(0,1)[274] + Sq(0,1)[271]} \item[282] {\rm Sq(0,1)[275] + Sq(0,1)[271]} \item[283] {\rm Sq(1)[287]} \\ $h_{0}:$ [287] \\ $h_{1}:$ [280], [279] \item[284] {\rm Sq(1)[288]} \\ $h_{0}:$ [288] \\ $h_{1}:$ [280], [279] \item[285] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \\ $h_{1}:$ [280], [279] \end{gl} \end{bdl} \begin{bdl} \item[40/208] \mb{40/208} \begin{gl} \item[282] {\rm Sq(1,1)[270]} \item[283] {\rm Sq(0,1)[275]} \item[284] {\rm Sq(0,1)[276]} \item[285] {\rm Sq(0,1)[277]} \item[286] {\rm Sq(0,1)[279] + Sq(0,1)[278]} \item[287] {\rm Sq(1)[289]} \\ $h_{0}:$ [289] \item[288] {\rm Sq(1)[291]} \\ $h_{0}:$ [291] \item[289] {\rm Sq(1)[292]} \\ $h_{0}:$ [292] \end{gl} \end{bdl} \begin{bdl} \item[39/208] \mb{39/208} \begin{gl} \item[286] {\rm Sq(0,1)[285]} \item[287] {\rm Sq(0,1)[286]} \item[288] {\rm Sq(0,1)[287]} \item[289] {\rm Sq(3)[288] + Sq(3)[285]} \item[290] {\rm Sq(2)[290]} \\ $h_{1}:$ [290] \item[291] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \item[292] {\rm Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [299], [298] \end{gl} \end{bdl} \begin{bdl} \item[38/208] \mb{38/208} \begin{gl} \item[295] {\rm Sq(1,1)[296] + Sq(1,1)[294] + Sq(1,1)[292]} \item[296] {\rm Sq(0,1)[297]} \item[297] {\rm Sq(0,1)[298]} \item[298] {\rm Sq(0,1)[299]} \item[299] {\rm Sq(1)[308] + Sq(1)[307]} \\ $h_{0}:$ [308], [307] \end{gl} \end{bdl} \begin{bdl} \item[37/208] \mb{37/208} \begin{gl} \item[307] {\rm Sq(1,1)[304] + Sq(1,1)[303] + Sq(1,1)[299]} \item[308] {\rm Sq(0,1)[305]} \item[309] {\rm Sq(0,1)[306]} \item[310] {\rm Sq(0,1)[307]} \item[311] {\rm Sq(0,1)[308]} \item[312] {\rm Sq(1)[317] + Sq(1)[316] + Sq(1)[315]} \\ $h_{0}:$ [317], [316], [315] \\ $h_{2}:$ [299] \end{gl} \end{bdl} \begin{bdl} \item[36/208] \mb{36/208} \begin{gl} \item[315] {\rm Sq(0,1)[311]} \item[316] {\rm Sq(0,1)[312]} \item[317] {\rm Sq(0,1)[313]} \item[318] {\rm Sq(0,1)[314]} \end{gl} \end{bdl} \begin{bdl} \item[35/208] \mb{35/208} \begin{gl} \item[323] {\rm Sq(0,1)[321] + Sq(0,1)[319]} \item[324] {\rm Sq(0,1)[322] + Sq(0,1)[320] + Sq(0,1)[319] + Sq(3)[318] + Sq(0,1)[318] + Sq(3)[317]} \item[325] {\rm Sq(3)[323] + Sq(3)[320] + Sq(3)[319] + Sq(0,1)[318] + Sq(3)[317]} \end{gl} \end{bdl} \begin{bdl} \item[34/208] \mb{34/208} \begin{gl} \item[328] {\rm Sq(2,1)[321] + Sq(2,1)[320]} \item[329] {\rm Sq(0,1)[327]} \item[330] {\rm Sq(0,1)[328]} \item[331] {\rm Sq(0,1)[329]} \item[332] {\rm Sq(0,1)[330]} \item[333] {\rm Sq(3)[332] + Sq(0,1)[332] + Sq(3)[331] + Sq(0,1)[331]} \item[334] {\rm Sq(2)[337]} \\ $h_{1}:$ [337] \item[335] {\rm Sq(1)[343]} \\ $h_{0}:$ [343] \\ $h_{1}:$ [338], [336], [335] \\ $h_{3}:$ [309], [307], [305], [304], [303] \end{gl} \end{bdl} \begin{bdl} \item[33/208] \mb{33/208} \begin{gl} \item[341] {\rm Sq(0,1)[333] + Sq(0,1)[332]} \item[342] {\rm Sq(1)[347] + Sq(1)[345]} \\ $h_{0}:$ [347], [345] \\ $h_{1}:$ [342], [341], [340], [339] \item[343] {\rm Sq(1)[348]} \\ $h_{0}:$ [348] \\ $h_{3}:$ [309], [306], [305] \end{gl} \end{bdl} \begin{bdl} \item[32/208] \mb{32/208} \begin{gl} \item[345] {\rm Sq(0,1)[331]} \item[346] {\rm Sq(0,1)[332]} \item[347] {\rm Sq(0,1)[333]} \item[348] {\rm Sq(3)[334] + Sq(0,1)[334] + Sq(3)[333] + Sq(3)[331]} \\ $h_{3}:$ [307] \item[349] {\rm Sq(1)[347] + Sq(1)[344]} \\ $h_{0}:$ [347], [344] \\ $h_{1}:$ [340], [338], [337] \\ $h_{2}:$ [329], [327] \\ $h_{3}:$ [307] \item[350] {\rm Sq(1)[350] + Sq(1)[348] + Sq(1)[344]} \\ $h_{0}:$ [350], [348], [344] \\ $h_{1}:$ [338] \\ $h_{2}:$ [327] \\ $h_{3}:$ [307] \end{gl} \end{bdl} \begin{bdl} \item[31/208] \mb{31/208} \begin{gl} \item[343] {\rm Sq(0,1)[336]} \item[344] {\rm Sq(3)[336]} \\ $h_{2}:$ [332], [330], [329] \item[345] {\rm Sq(0,1)[337] + Sq(0,1)[335]} \item[346] {\rm Sq(3)[338] + Sq(0,1)[338] + Sq(0,1)[335]} \\ $h_{2}:$ [332], [330], [329] \item[347] {\rm Sq(3)[339] + Sq(3)[335]} \item[348] {\rm Sq(3)[340] + Sq(0,1)[340] + Sq(0,1)[335]} \item[349] {\rm Sq(2)[342]} \\ $h_{1}:$ [342] \\ $h_{7}:$ [13] \item[350] {\rm Sq(1)[349] + Sq(1)[348] + Sq(1)[347] + Sq(1)[346]} \\ $h_{0}:$ [349], [348], [347], [346] \\ $h_{2}:$ [332], [329] \end{gl} \end{bdl} \begin{bdl} \item[30/208] \mb{30/208} \begin{gl} \item[346] {\rm Sq(3)[340]} \item[347] {\rm Sq(3)[342] + Sq(3)[341] + Sq(0,1)[341] + Sq(3)[339] + Sq(0,1)[339]} \item[348] {\rm Sq(3)[343] + Sq(0,1)[343] + Sq(0,1)[341] + Sq(3)[339]} \item[349] {\rm Sq(3)[344] + Sq(0,1)[344] + Sq(0,1)[340] + Sq(3)[339] + Sq(0,1)[339]} \end{gl} \end{bdl} \begin{bdl} \item[29/208] \mb{29/208} \begin{gl} \item[350] {\rm Sq(1,1)[337]} \item[351] {\rm Sq(1,1)[339] + Sq(1,1)[338] + Sq(4)[336] + Sq(1,1)[336]} \\ $h_{2}:$ [336] \item[352] {\rm Sq(0,1)[341]} \item[353] {\rm Sq(3)[342] + Sq(0,1)[342]} \\ $h_{2}:$ [336] \item[354] {\rm Sq(1)[353] + Sq(1)[352] + Sq(1)[350]} \\ $h_{0}:$ [353], [352], [350] \\ $h_{1}:$ [347], [346] \\ $h_{2}:$ [339], [336] \\ $h_{3}:$ [324], [322], [321] \end{gl} \end{bdl} \begin{bdl} \item[28/208] \mb{28/208} \begin{gl} \item[350] {\rm Sq(0,1)[342] + Sq(0,1)[341]} \item[351] {\rm Sq(3)[347] + Sq(0,1)[347] + Sq(3)[344] + Sq(3)[342] + Sq(3)[341]} \item[352] {\rm Sq(1)[353]} \\ $h_{0}:$ [353] \\ $h_{1}:$ [350], [349] \\ $h_{4}:$ [290], [289] \\ $h_{7}:$ [13] \item[353] {\rm Sq(1)[356] + Sq(1)[355]} \\ $h_{0}:$ [356], [355] \\ $h_{1}:$ [350], [349] \\ $h_{2}:$ [340], [339] \\ $h_{3}:$ [326] \\ $h_{4}:$ [290], [289] \\ $h_{7}:$ [13] \end{gl} \end{bdl} \begin{bdl} \item[27/208] \mb{27/208} \begin{gl} \item[353] {\rm Sq(3)[348] + Sq(0,1)[348]} \\ $h_{4}:$ [297] \item[354] {\rm Sq(3)[351] + Sq(0,1)[351] + Sq(3)[350] + Sq(0,1)[350]} \\ $h_{4}:$ [297] \item[355] {\rm Sq(1)[361] + Sq(1)[359]} \\ $h_{0}:$ [361], [359] \\ $h_{2}:$ [346], [345], [344] \item[356] {\rm Sq(1)[364] + Sq(1)[360] + Sq(1)[359]} \\ $h_{0}:$ [364], [360], [359] \\ $h_{2}:$ [346], [345] \\ $h_{3}:$ [332] \\ $h_{4}:$ [297] \end{gl} \end{bdl} \begin{bdl} \item[26/208] \mb{26/208} \begin{gl} \item[359] {\rm Sq(2,1)[343]} \item[360] {\rm Sq(0,1)[351] + Sq(0,1)[350]} \item[361] {\rm Sq(3)[351] + Sq(3)[350]} \item[362] {\rm Sq(2)[355] + Sq(2)[354]} \\ $h_{1}:$ [355], [354] \item[363] {\rm Sq(2)[356] + Sq(2)[354] + Sq(2)[353]} \\ $h_{1}:$ [356], [354], [353] \\ $h_{3}:$ [330] \item[364] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \\ $h_{3}:$ [332] \end{gl} \end{bdl} \begin{bdl} \item[25/208] \mb{25/208} \begin{gl} \item[359] {\rm Sq(1,1)[348] + Sq(1,1)[347] + Sq(1,1)[346] + Sq(1,1)[345]} \item[360] {\rm Sq(2)[355] + Sq(2)[353]} \\ $h_{1}:$ [355], [353] \\ $h_{7}:$ [23] \item[361] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \end{gl} \end{bdl} \begin{bdl} \item[24/208] \mb{24/208} \begin{gl} \item[357] {\rm Sq(2,1)[345]} \item[358] {\rm Sq(0,1)[352]} \item[359] {\rm Sq(1)[361]} \\ $h_{0}:$ [361] \item[360] {\rm Sq(1)[363]} \\ $h_{0}:$ [363] \item[361] {\rm Sq(1)[364] + Sq(1)[362]} \\ $h_{0}:$ [364], [362] \\ $h_{3}:$ [332] \\ $h_{4}:$ [306] \item[362] {\rm Sq(1)[365] + Sq(1)[362] + Sq(1)[360]} \\ $h_{0}:$ [365], [362], [360] \\ $h_{1}:$ [356] \\ $h_{3}:$ [332] \\ $h_{4}:$ [306] \\ $h_{7}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[23/208] \mb{23/208} \begin{gl} \item[360] {\rm Sq(2,1)[363] + Sq(5)[362] + Sq(2,1)[362] + Sq(2,1)[361] + Sq(5)[360]} \item[361] {\rm Sq(1,1)[367]} \item[362] {\rm Sq(1,1)[373] + Sq(1,1)[372] + Sq(1,1)[371]} \item[363] {\rm Sq(3)[375]} \item[364] {\rm Sq(1)[379]} \\ $h_{0}:$ [379] \item[365] {\rm Sq(1)[380]} \\ $h_{0}:$ [380] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[22/208] \mb{22/208} \begin{gl} \item[379] {\rm Sq(1,1)[381] + Sq(1,1)[379] + Sq(1,1)[378]} \item[380] {\rm Sq(1,1)[385] + Sq(1,1)[383] + Sq(1,1)[379]} \\ $h_{7}:$ [27] \item[381] {\rm Sq(3)[390] + Sq(0,1)[390] + Sq(3)[389] + Sq(0,1)[389] + Sq(3)[388] + Sq(3)[387] + Sq(0,1)[386]} \\ $h_{2}:$ [378] \\ $h_{5}:$ [262], [261] \\ $h_{7}:$ [28] \item[382] {\rm Sq(1)[396] + Sq(1)[395]} \\ $h_{0}:$ [396], [395] \\ $h_{2}:$ [383], [381], [380], [379] \\ $h_{5}:$ [262], [261] \\ $h_{7}:$ [28] \item[383] {\rm Sq(1)[398] + Sq(1)[397]} \\ $h_{0}:$ [398], [397] \\ $h_{1}:$ [394] \\ $h_{2}:$ [383], [381], [380], [379] \\ $h_{3}:$ [361] \\ $h_{5}:$ [262], [261] \end{gl} \end{bdl} \begin{bdl} \item[21/208] \mb{21/208} \begin{gl} \item[395] {\rm Sq(3)[396] + Sq(0,1)[396] + Sq(3)[395] + Sq(0,1)[395]} \item[396] {\rm Sq(1)[408]} \\ $h_{0}:$ [408] \item[397] {\rm Sq(1)[409]} \\ $h_{0}:$ [409] \\ $h_{1}:$ [405], [402] \item[398] {\rm Sq(1)[410]} \\ $h_{0}:$ [410] \\ $h_{1}:$ [405], [402] \\ $h_{3}:$ [370], [369] \item[399] {\rm Sq(1)[411]} \\ $h_{0}:$ [411] \\ $h_{1}:$ [405], [402] \\ $h_{2}:$ [393], [390] \\ $h_{7}:$ [30] \end{gl} \end{bdl} \begin{bdl} \item[20/208] \mb{20/208} \begin{gl} \item[408] {\rm Sq(1,1)[408] + Sq(1,1)[407] + Sq(1,1)[406] + Sq(1,1)[405]} \item[409] {\rm Sq(0,1)[412]} \item[410] {\rm Sq(3)[416] + Sq(0,1)[416] + Sq(0,1)[413] + Sq(3)[412]} \item[411] {\rm Sq(1)[423]} \\ $h_{0}:$ [423] \\ $h_{2}:$ [409], [407] \\ $h_{7}:$ [33] \end{gl} \end{bdl} \begin{bdl} \item[19/208] \mb{19/208} \begin{gl} \item[423] {\rm Sq(3)[426] + Sq(0,1)[426] + Sq(3)[425] + Sq(0,1)[425] + Sq(3)[424] + Sq(0,1)[424] + Sq(3)[423] + Sq(3)[421] + Sq(0,1)[421]} \\ $h_{7}:$ [36] \item[424] {\rm Sq(2)[428]} \\ $h_{1}:$ [428] \\ $h_{2}:$ [418] \\ $h_{5}:$ [277] \item[425] {\rm Sq(1)[433]} \\ $h_{0}:$ [433] \\ $h_{7}:$ [36] \item[426] {\rm Sq(1)[435] + Sq(1)[432]} \\ $h_{0}:$ [435], [432] \\ $h_{7}:$ [37], [36] \end{gl} \end{bdl} \begin{bdl} \item[18/208] \mb{18/208} \begin{gl} \item[432] {\rm Sq(3)[438]} \item[433] {\rm Sq(0,1)[439]} \item[434] {\rm Sq(3)[439]} \item[435] {\rm Sq(1)[443]} \\ $h_{0}:$ [443] \item[436] {\rm Sq(1)[444]} \\ $h_{0}:$ [444] \end{gl} \end{bdl} \begin{bdl} \item[17/208] \mb{17/208} \begin{gl} \item[443] {\rm Sq(1,1)[456] + Sq(1,1)[455]} \item[444] {\rm Sq(3)[460] + Sq(0,1)[460] + Sq(3)[459] + Sq(0,1)[459]} \end{gl} \end{bdl} \begin{bdl} \item[16/208] \mb{16/208} \begin{gl} \item[463] {\rm Sq(3)[472] + Sq(0,1)[472]} \\ $h_{7}:$ [39] \item[464] {\rm Sq(3)[473] + Sq(0,1)[472]} \\ $h_{2}:$ [467], [466] \\ $h_{4}:$ [384], [382] \\ $h_{5}:$ [292] \\ $h_{7}:$ [39] \item[465] {\rm Sq(3)[475] + Sq(0,1)[475]} \\ $h_{7}:$ [39] \item[466] {\rm Sq(2)[476]} \\ $h_{1}:$ [476] \\ $h_{2}:$ [467], [466] \\ $h_{4}:$ [384], [382] \\ $h_{5}:$ [292] \\ $h_{7}:$ [40], [39] \item[467] {\rm Sq(1)[481]} \\ $h_{0}:$ [481] \\ $h_{2}:$ [468], [467], [466] \\ $h_{3}:$ [442], [441] \\ $h_{4}:$ [385], [383] \\ $h_{6}:$ [179] \end{gl} \end{bdl} \begin{bdl} \item[15/208] \mb{15/208} \begin{gl} \item[480] {\rm Sq(3)[475] + Sq(3)[474] + Sq(0,1)[474] + Sq(3)[473]} \\ $h_{3}:$ [444], [443] \\ $h_{4}:$ [390] \item[481] {\rm Sq(1)[483]} \\ $h_{0}:$ [483] \\ $h_{4}:$ [391], [390], [389] \end{gl} \end{bdl} \begin{bdl} \item[14/208] \mb{14/208} \begin{gl} \item[483] {\rm Sq(3)[463] + Sq(0,1)[463]} \item[484] {\rm Sq(2)[466] + Sq(2)[465]} \\ $h_{1}:$ [466], [465] \\ $h_{2}:$ [456] \\ $h_{3}:$ [430], [429] \\ $h_{4}:$ [382], [381], [380] \item[485] {\rm Sq(1)[472]} \\ $h_{0}:$ [472] \\ $h_{1}:$ [468], [465] \\ $h_{2}:$ [456] \\ $h_{3}:$ [430], [429] \\ $h_{4}:$ [382], [381], [380] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[13/208] \mb{13/208} \begin{gl} \item[472] {\rm Sq(3)[453] + Sq(0,1)[451] + Sq(3)[449] + Sq(0,1)[449]} \\ $h_{7}:$ [45] \item[473] {\rm Sq(3)[455] + Sq(0,1)[455] + Sq(3)[452] + Sq(0,1)[452] + Sq(0,1)[451] + Sq(3)[450] + Sq(0,1)[450] + Sq(3)[449]} \\ $h_{4}:$ [376] \end{gl} \end{bdl} \begin{bdl} \item[12/208] \mb{12/208} \begin{gl} \item[458] {\rm Sq(1,1)[426] + Sq(4)[424] + Sq(1,1)[424] + Sq(4)[423]} \\ $h_{2}:$ [424], [423] \\ $h_{3}:$ [405], [402], [401] \\ $h_{4}:$ [375], [372] \\ $h_{5}:$ [331], [330] \\ $h_{6}:$ [216], [215], [214] \item[459] {\rm Sq(3)[429] + Sq(0,1)[429] + Sq(3)[428] + Sq(0,1)[428]} \\ $h_{2}:$ [424], [423] \\ $h_{3}:$ [405], [404] \\ $h_{4}:$ [374], [372] \\ $h_{5}:$ [331], [330] \\ $h_{6}:$ [216], [215], [214] \item[460] {\rm Sq(2)[435] + Sq(2)[434] + Sq(2)[431]} \\ $h_{1}:$ [435], [434], [431] \\ $h_{2}:$ [426], [424] \\ $h_{3}:$ [405], [403], [402] \\ $h_{4}:$ [372] \\ $h_{5}:$ [331], [330] \\ $h_{6}:$ [216], [215], [214] \item[461] {\rm Sq(1)[437]} \\ $h_{0}:$ [437] \\ $h_{2}:$ [425] \\ $h_{3}:$ [404], [402], [401] \\ $h_{4}:$ [375], [374], [373] \\ $h_{7}:$ [50] \item[462] {\rm Sq(1)[438]} \\ $h_{0}:$ [438] \\ $h_{1}:$ [433], [431] \\ $h_{2}:$ [425] \\ $h_{3}:$ [406], [404], [401] \\ $h_{4}:$ [374], [373] \\ $h_{7}:$ [50] \end{gl} \end{bdl} \begin{bdl} \item[11/208] \mb{11/208} \begin{gl} \item[437] {\rm Sq(1,1)[395]} \\ $h_{7}:$ [52] \item[438] {\rm Sq(1)[402]} \\ $h_{0}:$ [402] \\ $h_{7}:$ [52] \item[439] {\rm Sq(1)[404] + Sq(1)[403]} \\ $h_{0}:$ [404], [403] \\ $h_{1}:$ [401] \\ $h_{2}:$ [396], [395] \\ $h_{4}:$ [352] \\ $h_{7}:$ [52] \item[440] {\rm Sq(1)[406] + Sq(1)[405]} \\ $h_{0}:$ [406], [405] \\ $h_{2}:$ [395] \\ $h_{3}:$ [378] \\ $h_{7}:$ [53] \end{gl} \end{bdl} \begin{bdl} \item[10/208] \mb{10/208} \begin{gl} \item[402] {\rm Sq(3,1)[352] + Sq(6)[349] + Sq(6)[348] + Sq(3,1)[348]} \item[403] {\rm Sq(5)[355] + Sq(2,1)[355] + Sq(2,1)[353]} \\ $h_{3}:$ [342] \\ $h_{4}:$ [320] \item[404] {\rm Sq(4)[356] + Sq(1,1)[356]} \\ $h_{2}:$ [356] \\ $h_{3}:$ [342] \\ $h_{4}:$ [320], [319], [318] \item[405] {\rm Sq(1,1)[357]} \\ $h_{4}:$ [320], [319], [318] \item[406] {\rm Sq(3)[361] + Sq(0,1)[361]} \\ $h_{3}:$ [343] \\ $h_{4}:$ [320], [319], [318] \\ $h_{7}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[9/208] \mb{9/208} \begin{gl} \item[365] {\rm Sq(3)[314] + Sq(3)[313] + Sq(0,1)[313]} \\ $h_{4}:$ [280] \\ $h_{7}:$ [66] \item[366] {\rm Sq(1)[318]} \\ $h_{0}:$ [318] \\ $h_{3}:$ [300] \\ $h_{4}:$ [280] \\ $h_{7}:$ [66] \end{gl} \end{bdl} \begin{bdl} \item[8/208] \mb{8/208} \begin{gl} \item[316] {\rm Sq(4)[263] + Sq(4)[262] + Sq(1,1)[262]} \\ $h_{2}:$ [263], [262] \\ $h_{3}:$ [255] \\ $h_{4}:$ [242] \\ $h_{7}:$ [65] \item[317] {\rm Sq(4)[264] + Sq(4)[262]} \\ $h_{2}:$ [264], [262] \\ $h_{3}:$ [256] \\ $h_{4}:$ [242] \\ $h_{7}:$ [65] \item[318] {\rm Sq(3)[265] + Sq(0,1)[265]} \\ $h_{3}:$ [256], [255] \end{gl} \end{bdl} \dm{209} \begin{bdl} \item[100/209] \mb{100/209} \begin{gl} \item[5] {\rm Sq(1,1)[5]} \end{gl} \end{bdl} \begin{bdl} \item[95/209] \mb{95/209} \begin{gl} \item[11] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{1}:$ [12] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[94/209] \mb{94/209} \begin{gl} \item[13] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[91/209] \mb{91/209} \begin{gl} \item[13] {\rm Sq(0,1)[16]} \end{gl} \end{bdl} \begin{bdl} \item[88/209] \mb{88/209} \begin{gl} \item[23] {\rm Sq(0,1)[19]} \end{gl} \end{bdl} \begin{bdl} \item[87/209] \mb{87/209} \begin{gl} \item[21] {\rm Sq(1)[23]} \\ $h_{0}:$ [23] \\ $h_{1}:$ [21] \end{gl} \end{bdl} \begin{bdl} \item[86/209] \mb{86/209} \begin{gl} \item[23] {\rm Sq(1)[27]} \\ $h_{0}:$ [27] \end{gl} \end{bdl} \begin{bdl} \item[85/209] \mb{85/209} \begin{gl} \item[27] {\rm Sq(1,1)[28]} \item[28] {\rm Sq(0,1)[29]} \end{gl} \end{bdl} \begin{bdl} \item[84/209] \mb{84/209} \begin{gl} \item[30] {\rm Sq(1)[33]} \\ $h_{0}:$ [33] \\ $h_{2}:$ [29] \end{gl} \end{bdl} \begin{bdl} \item[83/209] \mb{83/209} \begin{gl} \item[33] {\rm Sq(1)[36]} \\ $h_{0}:$ [36] \\ $h_{2}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[82/209] \mb{82/209} \begin{gl} \item[36] {\rm Sq(0,1)[35]} \item[37] {\rm Sq(0,1)[36]} \end{gl} \end{bdl} \begin{bdl} \item[79/209] \mb{79/209} \begin{gl} \item[40] {\rm Sq(0,1)[43]} \item[41] {\rm Sq(1)[46]} \\ $h_{0}:$ [46] \\ $h_{1}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[78/209] \mb{78/209} \begin{gl} \item[46] {\rm Sq(0,1)[46]} \end{gl} \end{bdl} \begin{bdl} \item[76/209] \mb{76/209} \begin{gl} \item[48] {\rm Sq(0,1)[52]} \item[49] {\rm Sq(0,1)[53]} \end{gl} \end{bdl} \begin{bdl} \item[75/209] \mb{75/209} \begin{gl} \item[54] {\rm Sq(0,1)[60]} \end{gl} \end{bdl} \begin{bdl} \item[73/209] \mb{73/209} \begin{gl} \item[65] {\rm Sq(0,1)[60]} \item[66] {\rm Sq(0,1)[61]} \end{gl} \end{bdl} \begin{bdl} \item[72/209] \mb{72/209} \begin{gl} \item[64] {\rm Sq(0,1)[63]} \item[65] {\rm Sq(1)[68]} \\ $h_{0}:$ [68] \\ $h_{3}:$ [54] \end{gl} \end{bdl} \begin{bdl} \item[71/209] \mb{71/209} \begin{gl} \item[67] {\rm Sq(1)[71]} \\ $h_{0}:$ [71] \\ $h_{1}:$ [69] \item[68] {\rm Sq(1)[74]} \\ $h_{0}:$ [74] \\ $h_{3}:$ [57] \end{gl} \end{bdl} \begin{bdl} \item[70/209] \mb{70/209} \begin{gl} \item[71] {\rm Sq(1,1)[71]} \item[72] {\rm Sq(0,1)[73]} \item[73] {\rm Sq(0,1)[74]} \item[74] {\rm Sq(1)[78]} \\ $h_{0}:$ [78] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[69/209] \mb{69/209} \begin{gl} \item[76] {\rm Sq(0,1)[76]} \item[77] {\rm Sq(1)[80]} \\ $h_{0}:$ [80] \\ $h_{1}:$ [77] \\ $h_{2}:$ [73] \item[78] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [61] \end{gl} \end{bdl} \begin{bdl} \item[68/209] \mb{68/209} \begin{gl} \item[80] {\rm Sq(1)[86]} \\ $h_{0}:$ [86] \\ $h_{2}:$ [78] \item[81] {\rm Sq(1)[89]} \\ $h_{0}:$ [89] \item[82] {\rm Sq(1)[90]} \\ $h_{0}:$ [90] \\ $h_{2}:$ [81], [78] \end{gl} \end{bdl} \begin{bdl} \item[67/209] \mb{67/209} \begin{gl} \item[86] {\rm Sq(0,1)[88]} \item[87] {\rm Sq(0,1)[89]} \item[88] {\rm Sq(0,1)[90]} \item[89] {\rm Sq(1)[92]} \\ $h_{0}:$ [92] \item[90] {\rm Sq(1)[93]} \\ $h_{0}:$ [93] \\ $h_{2}:$ [84] \end{gl} \end{bdl} \begin{bdl} \item[66/209] \mb{66/209} \begin{gl} \item[92] {\rm Sq(2,1)[87]} \item[93] {\rm Sq(0,1)[89]} \item[94] {\rm Sq(0,1)[90]} \end{gl} \end{bdl} \begin{bdl} \item[64/209] \mb{64/209} \begin{gl} \item[96] {\rm Sq(0,1)[98]} \item[97] {\rm Sq(0,1)[99]} \item[98] {\rm Sq(0,1)[100]} \end{gl} \end{bdl} \begin{bdl} \item[63/209] \mb{63/209} \begin{gl} \item[103] {\rm Sq(0,1)[104]} \item[104] {\rm Sq(0,1)[105]} \end{gl} \end{bdl} \begin{bdl} \item[61/209] \mb{61/209} \begin{gl} \item[113] {\rm Sq(0,1)[116]} \item[114] {\rm Sq(0,1)[117]} \item[115] {\rm Sq(0,1)[118]} \item[116] {\rm Sq(3)[119] + Sq(0,1)[119]} \end{gl} \end{bdl} \begin{bdl} \item[60/209] \mb{60/209} \begin{gl} \item[120] {\rm Sq(0,1)[127]} \item[121] {\rm Sq(0,1)[128]} \item[122] {\rm Sq(0,1)[129]} \end{gl} \end{bdl} \begin{bdl} \item[58/209] \mb{58/209} \begin{gl} \item[143] {\rm Sq(0,1)[136]} \item[144] {\rm Sq(0,1)[137]} \item[145] {\rm Sq(0,1)[138]} \end{gl} \end{bdl} \begin{bdl} \item[57/209] \mb{57/209} \begin{gl} \item[142] {\rm Sq(0,1)[137]} \item[143] {\rm Sq(0,1)[138]} \item[144] {\rm Sq(0,1)[139]} \end{gl} \end{bdl} \begin{bdl} \item[56/209] \mb{56/209} \begin{gl} \item[145] {\rm Sq(0,1)[146]} \item[146] {\rm Sq(2)[151]} \\ $h_{1}:$ [151] \item[147] {\rm Sq(1)[156]} \\ $h_{0}:$ [156] \\ $h_{3}:$ [131] \end{gl} \end{bdl} \begin{bdl} \item[55/209] \mb{55/209} \begin{gl} \item[153] {\rm Sq(0,1)[153]} \item[154] {\rm Sq(0,1)[154]} \item[155] {\rm Sq(0,1)[155]} \item[156] {\rm Sq(1)[162]} \\ $h_{0}:$ [162] \\ $h_{3}:$ [136] \end{gl} \end{bdl} \begin{bdl} \item[54/209] \mb{54/209} \begin{gl} \item[159] {\rm Sq(0,1)[156]} \item[160] {\rm Sq(0,1)[157]} \item[161] {\rm Sq(0,1)[158]} \item[162] {\rm Sq(1)[166]} \\ $h_{0}:$ [166] \\ $h_{3}:$ [140] \end{gl} \end{bdl} \begin{bdl} \item[53/209] \mb{53/209} \begin{gl} \item[164] {\rm Sq(0,1)[164]} \item[165] {\rm Sq(1)[173]} \\ $h_{0}:$ [173] \\ $h_{1}:$ [165] \\ $h_{2}:$ [163] \item[166] {\rm Sq(1)[174]} \\ $h_{0}:$ [174] \\ $h_{3}:$ [147] \end{gl} \end{bdl} \begin{bdl} \item[52/209] \mb{52/209} \begin{gl} \item[169] {\rm Sq(0,1)[175]} \item[170] {\rm Sq(0,1)[176]} \item[171] {\rm Sq(0,1)[177]} \item[172] {\rm Sq(0,1)[178]} \item[173] {\rm Sq(1)[181]} \\ $h_{0}:$ [181] \\ $h_{2}:$ [171] \item[174] {\rm Sq(1)[185]} \\ $h_{0}:$ [185] \end{gl} \end{bdl} \begin{bdl} \item[51/209] \mb{51/209} \begin{gl} \item[181] {\rm Sq(1,1)[185]} \item[182] {\rm Sq(0,1)[186]} \item[183] {\rm Sq(0,1)[187]} \item[184] {\rm Sq(0,1)[188]} \item[185] {\rm Sq(1)[195]} \\ $h_{0}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[50/209] \mb{50/209} \begin{gl} \item[195] {\rm Sq(3,1)[183] + Sq(3,1)[182]} \item[196] {\rm Sq(0,1)[193]} \end{gl} \end{bdl} \begin{bdl} \item[49/209] \mb{49/209} \begin{gl} \item[201] {\rm Sq(0,1)[198]} \item[202] {\rm Sq(0,1)[199]} \item[203] {\rm Sq(0,1)[200]} \item[204] {\rm Sq(0,1)[201]} \item[205] {\rm Sq(1)[207] + Sq(1)[205]} \\ $h_{0}:$ [207], [205] \\ $h_{1}:$ [203] \\ $h_{2}:$ [193] \end{gl} \end{bdl} \begin{bdl} \item[48/209] \mb{48/209} \begin{gl} \item[205] {\rm Sq(1,1)[206]} \item[206] {\rm Sq(0,1)[207]} \item[207] {\rm Sq(0,1)[208]} \item[208] {\rm Sq(0,1)[209]} \item[209] {\rm Sq(0,1)[210]} \end{gl} \end{bdl} \begin{bdl} \item[47/209] \mb{47/209} \begin{gl} \item[217] {\rm Sq(0,1)[221]} \item[218] {\rm Sq(1)[229]} \\ $h_{0}:$ [229] \\ $h_{1}:$ [228] \end{gl} \end{bdl} \begin{bdl} \item[46/209] \mb{46/209} \begin{gl} \item[229] {\rm Sq(0,1)[235]} \item[230] {\rm Sq(0,1)[236]} \item[231] {\rm Sq(0,1)[237]} \item[232] {\rm Sq(0,1)[238]} \item[233] {\rm Sq(0,1)[239]} \end{gl} \end{bdl} \begin{bdl} \item[45/209] \mb{45/209} \begin{gl} \item[244] {\rm Sq(0,1)[243]} \item[245] {\rm Sq(0,1)[244]} \item[246] {\rm Sq(0,1)[245]} \item[247] {\rm Sq(0,1)[246]} \item[248] {\rm Sq(0,1)[247]} \end{gl} \end{bdl} \begin{bdl} \item[44/209] \mb{44/209} \begin{gl} \item[257] {\rm Sq(0,1)[257]} \item[258] {\rm Sq(0,1)[258]} \end{gl} \end{bdl} \begin{bdl} \item[43/209] \mb{43/209} \begin{gl} \item[267] {\rm Sq(0,1)[267]} \item[268] {\rm Sq(0,1)[268]} \item[269] {\rm Sq(0,1)[269]} \item[270] {\rm Sq(0,1)[270]} \item[271] {\rm Sq(0,1)[271]} \item[272] {\rm Sq(1)[283]} \\ $h_{0}:$ [283] \\ $h_{1}:$ [273] \\ $h_{2}:$ [265] \\ $h_{3}:$ [241], [239] \end{gl} \end{bdl} \begin{bdl} \item[42/209] \mb{42/209} \begin{gl} \item[278] {\rm Sq(0,1)[273]} \item[279] {\rm Sq(0,1)[274]} \item[280] {\rm Sq(0,1)[275]} \item[281] {\rm Sq(0,1)[276]} \item[282] {\rm Sq(0,1)[277]} \item[283] {\rm Sq(1)[289] + Sq(1)[288]} \\ $h_{0}:$ [289], [288] \\ $h_{2}:$ [269] \\ $h_{3}:$ [250] \end{gl} \end{bdl} \begin{bdl} \item[41/209] \mb{41/209} \begin{gl} \item[286] {\rm Sq(0,1)[277]} \item[287] {\rm Sq(0,1)[279] + Sq(0,1)[278]} \item[288] {\rm Sq(3)[281] + Sq(0,1)[281] + Sq(0,1)[278]} \item[289] {\rm Sq(1)[295]} \\ $h_{0}:$ [295] \\ $h_{3}:$ [252] \end{gl} \end{bdl} \begin{bdl} \item[40/209] \mb{40/209} \begin{gl} \item[290] {\rm Sq(0,1)[281]} \item[291] {\rm Sq(0,1)[282]} \item[292] {\rm Sq(0,1)[283]} \item[293] {\rm Sq(0,1)[284]} \item[294] {\rm Sq(2)[290]} \\ $h_{1}:$ [290] \item[295] {\rm Sq(1)[299] + Sq(1)[298]} \\ $h_{0}:$ [299], [298] \\ $h_{3}:$ [255] \item[296] {\rm Sq(1)[300] + Sq(1)[293]} \\ $h_{0}:$ [300], [293] \\ $h_{3}:$ [257], [255] \end{gl} \end{bdl} \begin{bdl} \item[39/209] \mb{39/209} \begin{gl} \item[293] {\rm Sq(3)[290] + Sq(0,1)[290]} \item[294] {\rm Sq(0,1)[291] + Sq(0,1)[290]} \item[295] {\rm Sq(0,1)[292] + Sq(0,1)[290]} \item[296] {\rm Sq(0,1)[293]} \item[297] {\rm Sq(0,1)[294]} \item[298] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{1}:$ [295] \item[299] {\rm Sq(1)[303]} \\ $h_{0}:$ [303] \\ $h_{1}:$ [295] \item[300] {\rm Sq(1)[304]} \\ $h_{0}:$ [304] \\ $h_{3}:$ [265] \end{gl} \end{bdl} \begin{bdl} \item[38/209] \mb{38/209} \begin{gl} \item[300] {\rm Sq(1,1)[301] + Sq(1,1)[300] + Sq(1,1)[299]} \item[301] {\rm Sq(0,1)[305] + Sq(0,1)[304]} \item[302] {\rm Sq(0,1)[306]} \item[303] {\rm Sq(1)[315]} \\ $h_{0}:$ [315] \item[304] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{3}:$ [278] \end{gl} \end{bdl} \begin{bdl} \item[37/209] \mb{37/209} \begin{gl} \item[313] {\rm Sq(1,1)[308] + Sq(1,1)[307] + Sq(1,1)[306] + Sq(1,1)[305]} \item[314] {\rm Sq(0,1)[312]} \item[315] {\rm Sq(3)[312]} \item[316] {\rm Sq(0,1)[313]} \item[317] {\rm Sq(0,1)[314]} \item[318] {\rm Sq(1)[324] + Sq(1)[323]} \\ $h_{0}:$ [324], [323] \\ $h_{1}:$ [317], [316], [315] \\ $h_{2}:$ [309], [305] \item[319] {\rm Sq(1)[325] + Sq(1)[323]} \\ $h_{0}:$ [325], [323] \\ $h_{3}:$ [285] \end{gl} \end{bdl} \begin{bdl} \item[36/209] \mb{36/209} \begin{gl} \item[319] {\rm Sq(0,1)[317]} \item[320] {\rm Sq(0,1)[318]} \item[321] {\rm Sq(0,1)[319]} \item[322] {\rm Sq(0,1)[320]} \item[323] {\rm Sq(3)[321] + Sq(3)[318]} \\ $h_{7}:$ [7] \item[324] {\rm Sq(1)[326]} \\ $h_{0}:$ [326] \\ $h_{2}:$ [313], [312], [311] \\ $h_{7}:$ [7] \item[325] {\rm Sq(1)[329]} \\ $h_{0}:$ [329] \\ $h_{7}:$ [7] \item[326] {\rm Sq(1)[330]} \\ $h_{0}:$ [330] \\ $h_{2}:$ [316], [311] \\ $h_{7}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[35/209] \mb{35/209} \begin{gl} \item[326] {\rm Sq(1,1)[324] + Sq(1,1)[323] + Sq(1,1)[322] + Sq(1,1)[320] + Sq(1,1)[319] + Sq(1,1)[317]} \item[327] {\rm Sq(0,1)[326] + Sq(0,1)[325]} \item[328] {\rm Sq(2)[333]} \\ $h_{1}:$ [333] \item[329] {\rm Sq(1)[337]} \\ $h_{0}:$ [337] \item[330] {\rm Sq(1)[338] + Sq(1)[336]} \\ $h_{0}:$ [338], [336] \\ $h_{2}:$ [319] \end{gl} \end{bdl} \begin{bdl} \item[34/209] \mb{34/209} \begin{gl} \item[336] {\rm Sq(1,1)[327]} \item[337] {\rm Sq(1,1)[329]} \item[338] {\rm Sq(1,1)[330]} \item[339] {\rm Sq(0,1)[335]} \item[340] {\rm Sq(0,1)[336]} \end{gl} \end{bdl} \begin{bdl} \item[33/209] \mb{33/209} \begin{gl} \item[344] {\rm Sq(2,1)[329] + Sq(2,1)[328] + Sq(2,1)[327]} \item[345] {\rm Sq(4)[335] + Sq(4)[334] + Sq(1,1)[333] + Sq(4)[332] + Sq(1,1)[332]} \\ $h_{2}:$ [335], [334], [332] \item[346] {\rm Sq(0,1)[338]} \item[347] {\rm Sq(0,1)[340] + Sq(0,1)[339]} \item[348] {\rm Sq(0,1)[341]} \item[349] {\rm Sq(3)[342] + Sq(3)[341] + Sq(3)[340] + Sq(3)[339] + Sq(0,1)[339]} \item[350] {\rm Sq(1)[353] + Sq(1)[352]} \\ $h_{0}:$ [353], [352] \\ $h_{1}:$ [347], [345] \\ $h_{2}:$ [332] \\ $h_{5}:$ [204] \\ $h_{7}:$ [13] \item[351] {\rm Sq(1)[355]} \\ $h_{0}:$ [355] \\ $h_{1}:$ [348] \\ $h_{2}:$ [334] \\ $h_{3}:$ [313], [312], [310] \end{gl} \end{bdl} \begin{bdl} \item[32/209] \mb{32/209} \begin{gl} \item[351] {\rm Sq(0,1)[337]} \item[352] {\rm Sq(0,1)[340] + Sq(0,1)[339] + Sq(0,1)[338]} \item[353] {\rm Sq(3)[340] + Sq(3)[338] + Sq(3)[337]} \item[354] {\rm Sq(2)[343]} \\ $h_{1}:$ [343] \item[355] {\rm Sq(1)[353]} \\ $h_{0}:$ [353] \\ $h_{3}:$ [314] \end{gl} \end{bdl} \begin{bdl} \item[31/209] \mb{31/209} \begin{gl} \item[351] {\rm Sq(3)[342] + Sq(0,1)[342]} \item[352] {\rm Sq(0,1)[343] + Sq(0,1)[342]} \item[353] {\rm Sq(3)[344] + Sq(3)[343] + Sq(0,1)[342]} \\ $h_{3}:$ [316] \item[354] {\rm Sq(2)[349] + Sq(2)[346]} \\ $h_{1}:$ [349], [346] \\ $h_{2}:$ [334] \\ $h_{3}:$ [316] \\ $h_{4}:$ [277] \\ $h_{5}:$ [214] \end{gl} \end{bdl} \begin{bdl} \item[30/209] \mb{30/209} \begin{gl} \item[350] {\rm Sq(1,1)[341] + Sq(4)[340] + Sq(1,1)[340] + Sq(1,1)[339]} \\ $h_{2}:$ [340] \item[351] {\rm Sq(1,1)[343] + Sq(4)[340] + Sq(1,1)[339]} \\ $h_{2}:$ [340] \item[352] {\rm Sq(0,1)[346]} \\ $h_{2}:$ [340] \item[353] {\rm Sq(0,1)[347] + Sq(0,1)[345]} \item[354] {\rm Sq(1)[358] + Sq(1)[355]} \\ $h_{0}:$ [358], [355] \\ $h_{1}:$ [350] \\ $h_{7}:$ [16] \end{gl} \end{bdl} \begin{bdl} \item[29/209] \mb{29/209} \begin{gl} \item[355] {\rm Sq(1,1)[343] + Sq(1,1)[341] + Sq(1,1)[340]} \item[356] {\rm Sq(0,1)[344]} \item[357] {\rm Sq(0,1)[345]} \item[358] {\rm Sq(3)[347] + Sq(3)[346]} \end{gl} \end{bdl} \begin{bdl} \item[28/209] \mb{28/209} \begin{gl} \item[354] {\rm Sq(1,1)[347] + Sq(1,1)[344] + Sq(1,1)[343] + Sq(1,1)[342] + Sq(1,1)[341]} \item[355] {\rm Sq(0,1)[348]} \item[356] {\rm Sq(3)[352] + Sq(0,1)[352] + Sq(3)[351] + Sq(0,1)[351] + Sq(3)[350] + Sq(0,1)[349]} \end{gl} \end{bdl} \begin{bdl} \item[27/209] \mb{27/209} \begin{gl} \item[357] {\rm Sq(3)[357] + Sq(0,1)[357] + Sq(3)[353]} \item[358] {\rm Sq(2)[361] + Sq(2)[360]} \\ $h_{1}:$ [361], [360] \\ $h_{2}:$ [351], [350], [348] \\ $h_{7}:$ [17] \item[359] {\rm Sq(2)[363] + Sq(2)[362] + Sq(2)[360]} \\ $h_{1}:$ [363], [362], [360] \\ $h_{2}:$ [351], [350], [348] \\ $h_{3}:$ [336], [335] \item[360] {\rm Sq(1)[367] + Sq(1)[366]} \\ $h_{0}:$ [367], [366] \\ $h_{1}:$ [362] \\ $h_{2}:$ [351], [350], [348] \\ $h_{7}:$ [17] \item[361] {\rm Sq(1)[368] + Sq(1)[366] + Sq(1)[365]} \\ $h_{0}:$ [368], [366], [365] \\ $h_{1}:$ [360], [359] \\ $h_{2}:$ [352] \\ $h_{3}:$ [337], [334], [333] \end{gl} \end{bdl} \begin{bdl} \item[26/209] \mb{26/209} \begin{gl} \item[365] {\rm Sq(2,1)[348] + Sq(2,1)[347]} \item[366] {\rm Sq(1,1)[351] + Sq(1,1)[350]} \item[367] {\rm Sq(0,1)[354]} \item[368] {\rm Sq(1)[362]} \\ $h_{0}:$ [362] \\ $h_{2}:$ [351], [350] \\ $h_{3}:$ [337], [334] \end{gl} \end{bdl} \begin{bdl} \item[25/209] \mb{25/209} \begin{gl} \item[362] {\rm Sq(1,1)[352] + Sq(1,1)[351] + Sq(1,1)[350]} \\ $h_{3}:$ [334] \item[363] {\rm Sq(0,1)[355] + Sq(0,1)[353]} \item[364] {\rm Sq(3)[355] + Sq(3)[354] + Sq(0,1)[353]} \item[365] {\rm Sq(3)[356] + Sq(0,1)[356] + Sq(3)[354] + Sq(3)[353] + Sq(0,1)[353]} \item[366] {\rm Sq(1)[366]} \\ $h_{0}:$ [366] \\ $h_{1}:$ [357] \end{gl} \end{bdl} \begin{bdl} \item[24/209] \mb{24/209} \begin{gl} \item[363] {\rm Sq(0,1)[356]} \item[364] {\rm Sq(3)[359] + Sq(0,1)[359] + Sq(3)[358] + Sq(0,1)[358] + Sq(3)[357] + Sq(3)[356]} \\ $h_{3}:$ [339], [338], [337] \\ $h_{7}:$ [22] \item[365] {\rm Sq(2)[363]} \\ $h_{1}:$ [363] \\ $h_{3}:$ [339] \item[366] {\rm Sq(1)[368] + Sq(1)[367] + Sq(1)[366]} \\ $h_{0}:$ [368], [367], [366] \item[367] {\rm Sq(1)[370] + Sq(1)[369] + Sq(1)[367] + Sq(1)[366]} \\ $h_{0}:$ [370], [369], [367], [366] \\ $h_{3}:$ [339], [338], [337] \\ $h_{7}:$ [22] \end{gl} \end{bdl} \begin{bdl} \item[23/209] \mb{23/209} \begin{gl} \item[366] {\rm Sq(5)[372] + Sq(2,1)[372] + Sq(5)[371] + Sq(2,1)[371] + Sq(5)[370] + Sq(2,1)[370] + Sq(5)[367] + Sq(2,1)[367]} \item[367] {\rm Sq(0,1)[377] + Sq(0,1)[376]} \item[368] {\rm Sq(3)[377] + Sq(0,1)[376]} \item[369] {\rm Sq(3)[378] + Sq(0,1)[378]} \item[370] {\rm Sq(1)[385] + Sq(1)[384]} \\ $h_{0}:$ [385], [384] \item[371] {\rm Sq(1)[386] + Sq(1)[384]} \\ $h_{0}:$ [386], [384] \\ $h_{3}:$ [353], [351] \item[372] {\rm Sq(1)[387] + Sq(1)[384]} \\ $h_{0}:$ [387], [384] \\ $h_{1}:$ [379] \\ $h_{3}:$ [354], [351] \item[373] {\rm Sq(1)[390] + Sq(1)[389]} \\ $h_{0}:$ [390], [389] \\ $h_{3}:$ [354], [353], [351] \end{gl} \end{bdl} \begin{bdl} \item[22/209] \mb{22/209} \begin{gl} \item[384] {\rm Sq(2,1)[383] + Sq(2,1)[381] + Sq(5)[380] + Sq(2,1)[379] + Sq(5)[378] + Sq(2,1)[378]} \item[385] {\rm Sq(1,1)[388] + Sq(1,1)[387] + Sq(1,1)[386]} \item[386] {\rm Sq(1,1)[391] + Sq(1,1)[386]} \\ $h_{3}:$ [363] \item[387] {\rm Sq(1,1)[392] + Sq(1,1)[390] + Sq(1,1)[387]} \\ $h_{3}:$ [364] \item[388] {\rm Sq(1,1)[393] + Sq(1,1)[390] + Sq(1,1)[389] + Sq(4)[387] + Sq(1,1)[387] + Sq(1,1)[386]} \\ $h_{2}:$ [387] \\ $h_{3}:$ [363] \item[389] {\rm Sq(3)[394]} \item[390] {\rm Sq(1)[401]} \\ $h_{0}:$ [401] \\ $h_{3}:$ [364], [363] \end{gl} \end{bdl} \begin{bdl} \item[21/209] \mb{21/209} \begin{gl} \item[400] {\rm Sq(1,1)[399] + Sq(1,1)[398] + Sq(4)[396] + Sq(1,1)[396] + Sq(4)[395] + Sq(4)[394] + Sq(1,1)[394]} \\ $h_{2}:$ [396], [395], [394] \\ $h_{5}:$ [265], [264] \item[401] {\rm Sq(3)[405] + Sq(3)[402]} \item[402] {\rm Sq(2)[408]} \\ $h_{1}:$ [408] \\ $h_{2}:$ [394] \\ $h_{5}:$ [265], [264] \item[403] {\rm Sq(2)[409]} \\ $h_{1}:$ [409] \\ $h_{2}:$ [396], [395], [394] \\ $h_{4}:$ [337] \\ $h_{5}:$ [265], [264] \\ $h_{7}:$ [31] \item[404] {\rm Sq(1)[412]} \\ $h_{0}:$ [412] \\ $h_{1}:$ [410] \\ $h_{2}:$ [396], [395] \\ $h_{3}:$ [374] \\ $h_{4}:$ [337] \\ $h_{7}:$ [31] \item[405] {\rm Sq(1)[413]} \\ $h_{0}:$ [413] \\ $h_{1}:$ [410] \\ $h_{2}:$ [397], [394] \\ $h_{3}:$ [374] \\ $h_{4}:$ [337] \\ $h_{5}:$ [264] \\ $h_{7}:$ [31] \end{gl} \end{bdl} \begin{bdl} \item[20/209] \mb{20/209} \begin{gl} \item[412] {\rm Sq(3)[419]} \\ $h_{3}:$ [387] \item[413] {\rm Sq(1)[428] + Sq(1)[427]} \\ $h_{0}:$ [428], [427] \\ $h_{3}:$ [387] \item[414] {\rm Sq(1)[429]} \\ $h_{0}:$ [429] \\ $h_{3}:$ [390], [389], [387], [386] \item[415] {\rm Sq(1)[430] + Sq(1)[427]} \\ $h_{0}:$ [430], [427] \\ $h_{1}:$ [423] \\ $h_{2}:$ [414] \\ $h_{7}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[19/209] \mb{19/209} \begin{gl} \item[427] {\rm Sq(1,1)[427] + Sq(1,1)[426] + Sq(4)[424] + Sq(1,1)[424] + Sq(4)[423] + Sq(1,1)[423] + Sq(1,1)[421]} \\ $h_{2}:$ [424], [423] \item[428] {\rm Sq(3)[428]} \\ $h_{2}:$ [424], [423] \item[429] {\rm Sq(0,1)[430] + Sq(0,1)[429] + Sq(0,1)[428]} \item[430] {\rm Sq(1)[437]} \\ $h_{0}:$ [437] \\ $h_{2}:$ [424] \\ $h_{7}:$ [38] \item[431] {\rm Sq(1)[439]} \\ $h_{0}:$ [439] \\ $h_{1}:$ [432] \\ $h_{2}:$ [426], [425] \\ $h_{7}:$ [39] \item[432] {\rm Sq(1)[440]} \\ $h_{0}:$ [440] \\ $h_{2}:$ [426], [425], [424], [423], [421] \\ $h_{7}:$ [39] \end{gl} \end{bdl} \begin{bdl} \item[18/209] \mb{18/209} \begin{gl} \item[437] {\rm Sq(3)[442] + Sq(3)[441]} \\ $h_{7}:$ [40] \item[438] {\rm Sq(1)[445]} \\ $h_{0}:$ [445] \\ $h_{1}:$ [443] \\ $h_{7}:$ [39] \item[439] {\rm Sq(1)[446]} \\ $h_{0}:$ [446] \\ $h_{2}:$ [438] \\ $h_{7}:$ [41] \item[440] {\rm Sq(1)[447]} \\ $h_{0}:$ [447] \\ $h_{2}:$ [438] \\ $h_{7}:$ [41] \item[441] {\rm Sq(1)[450]} \\ $h_{0}:$ [450] \\ $h_{1}:$ [443] \\ $h_{2}:$ [438] \\ $h_{3}:$ [421], [419] \\ $h_{4}:$ [382], [380], [379] \\ $h_{7}:$ [41], [39] \end{gl} \end{bdl} \begin{bdl} \item[17/209] \mb{17/209} \begin{gl} \item[445] {\rm Sq(5)[456] + Sq(2,1)[456] + Sq(5)[454]} \item[446] {\rm Sq(1,1)[459]} \\ $h_{7}:$ [38] \item[447] {\rm Sq(1,1)[460]} \\ $h_{7}:$ [38] \item[448] {\rm Sq(3)[461]} \item[449] {\rm Sq(2)[465] + Sq(2)[463]} \\ $h_{1}:$ [465], [463] \\ $h_{4}:$ [384], [382] \\ $h_{7}:$ [38] \item[450] {\rm Sq(1)[469]} \\ $h_{0}:$ [469] \\ $h_{3}:$ [437] \\ $h_{4}:$ [388], [386], [384], [381] \\ $h_{7}:$ [38] \end{gl} \end{bdl} \begin{bdl} \item[16/209] \mb{16/209} \begin{gl} \item[468] {\rm Sq(1)[485]} \\ $h_{0}:$ [485] \\ $h_{3}:$ [449], [448] \\ $h_{4}:$ [390], [386] \\ $h_{5}:$ [297] \item[469] {\rm Sq(1)[488] + Sq(1)[486]} \\ $h_{0}:$ [488], [486] \\ $h_{4}:$ [390], [386] \end{gl} \end{bdl} \begin{bdl} \item[15/209] \mb{15/209} \begin{gl} \item[482] {\rm Sq(4)[477] + Sq(1,1)[476] + Sq(4)[475] + Sq(1,1)[475] + Sq(4)[474] + Sq(4)[473]} \\ $h_{2}:$ [477], [475], [474], [473] \\ $h_{5}:$ [310] \item[483] {\rm Sq(0,1)[480]} \\ $h_{4}:$ [393], [392] \\ $h_{5}:$ [310] \\ $h_{7}:$ [45] \item[484] {\rm Sq(3)[480]} \\ $h_{2}:$ [475], [474] \\ $h_{4}:$ [393], [392] \\ $h_{5}:$ [310] \\ $h_{7}:$ [45], [44] \item[485] {\rm Sq(3)[481] + Sq(0,1)[481]} \\ $h_{4}:$ [393], [392] \\ $h_{5}:$ [310] \item[486] {\rm Sq(3)[482] + Sq(0,1)[482]} \\ $h_{2}:$ [475], [474] \\ $h_{4}:$ [394], [392] \\ $h_{5}:$ [310] \\ $h_{7}:$ [44] \item[487] {\rm Sq(2)[483]} \\ $h_{1}:$ [483] \\ $h_{4}:$ [394], [393] \\ $h_{5}:$ [310] \item[488] {\rm Sq(1)[488] + Sq(1)[486]} \\ $h_{0}:$ [488], [486] \\ $h_{2}:$ [475], [474] \\ $h_{4}:$ [394], [393] \\ $h_{5}:$ [310] \\ $h_{7}:$ [44] \end{gl} \end{bdl} \begin{bdl} \item[14/209] \mb{14/209} \begin{gl} \item[486] {\rm Sq(3)[469] + Sq(3)[468] + Sq(0,1)[468] + Sq(3)[467] + Sq(0,1)[467] + Sq(3)[466] + Sq(0,1)[465]} \\ $h_{3}:$ [436] \\ $h_{4}:$ [387], [386] \item[487] {\rm Sq(2)[473]} \\ $h_{1}:$ [473] \\ $h_{3}:$ [436] \\ $h_{4}:$ [388], [386] \item[488] {\rm Sq(1)[475] + Sq(1)[474]} \\ $h_{0}:$ [475], [474] \\ $h_{3}:$ [436] \\ $h_{4}:$ [387], [386] \item[489] {\rm Sq(1)[476]} \\ $h_{0}:$ [476] \\ $h_{2}:$ [463] \\ $h_{3}:$ [438], [437] \\ $h_{4}:$ [390], [389], [387], [385] \end{gl} \end{bdl} \begin{bdl} \item[13/209] \mb{13/209} \begin{gl} \item[474] {\rm Sq(1,1)[454] + Sq(1,1)[452] + Sq(1,1)[451] + Sq(1,1)[449]} \\ $h_{7}:$ [46] \item[475] {\rm Sq(1,1)[455] + Sq(1,1)[452] + Sq(1,1)[450]} \\ $h_{7}:$ [46] \item[476] {\rm Sq(1)[465]} \\ $h_{0}:$ [465] \\ $h_{2}:$ [451], [449] \\ $h_{3}:$ [425], [424] \\ $h_{4}:$ [385], [384] \end{gl} \end{bdl} \begin{bdl} \item[12/209] \mb{12/209} \begin{gl} \item[463] {\rm Sq(3)[435] + Sq(0,1)[435] + Sq(3)[434] + Sq(0,1)[434] + Sq(3)[431] + Sq(0,1)[431]} \item[464] {\rm Sq(1)[441]} \\ $h_{0}:$ [441] \\ $h_{2}:$ [428] \\ $h_{4}:$ [376] \item[465] {\rm Sq(1)[444]} \\ $h_{0}:$ [444] \\ $h_{4}:$ [378], [377] \end{gl} \end{bdl} \begin{bdl} \item[11/209] \mb{11/209} \begin{gl} \item[441] {\rm Sq(5)[396] + Sq(2,1)[396]} \\ $h_{4}:$ [354], [353] \item[442] {\rm Sq(2)[402]} \\ $h_{1}:$ [402] \\ $h_{3}:$ [384], [383], [382], [381], [380], [379] \\ $h_{4}:$ [356], [355], [354] \item[443] {\rm Sq(2)[405]} \\ $h_{1}:$ [405] \\ $h_{2}:$ [397] \\ $h_{3}:$ [384], [382], [381], [380], [379] \\ $h_{4}:$ [358], [355], [354] \item[444] {\rm Sq(1)[409] + Sq(1)[408] + Sq(1)[407]} \\ $h_{0}:$ [409], [408], [407] \\ $h_{4}:$ [356], [355], [353] \end{gl} \end{bdl} \begin{bdl} \item[10/209] \mb{10/209} \begin{gl} \item[407] {\rm Sq(1,1)[361]} \\ $h_{7}:$ [61] \item[408] {\rm Sq(3)[363] + Sq(0,1)[363]} \\ $h_{7}:$ [61] \item[409] {\rm Sq(1)[367]} \\ $h_{0}:$ [367] \end{gl} \end{bdl} \begin{bdl} \item[9/209] \mb{9/209} \begin{gl} \item[367] {\rm Sq(3,1)[310] + Sq(3,1)[309] + Sq(3,1)[307]} \item[368] {\rm Sq(1,1)[313]} \\ $h_{3}:$ [301] \\ $h_{7}:$ [67] \item[369] {\rm Sq(1,1)[314]} \\ $h_{4}:$ [283], [282] \item[370] {\rm Sq(1)[319]} \\ $h_{0}:$ [319] \\ $h_{2}:$ [313] \\ $h_{3}:$ [301] \\ $h_{4}:$ [284], [283] \\ $h_{7}:$ [68], [67] \end{gl} \end{bdl} \begin{bdl} \item[8/209] \mb{8/209} \begin{gl} \item[319] {\rm Sq(1)[268]} \\ $h_{0}:$ [268] \\ $h_{4}:$ [243] \\ $h_{7}:$ [67] \item[320] {\rm Sq(1)[269]} \\ $h_{0}:$ [269] \\ $h_{2}:$ [266], [265] \\ $h_{3}:$ [257] \\ $h_{4}:$ [244], [243] \\ $h_{5}:$ [221] \\ $h_{6}:$ [158], [157] \\ $h_{7}:$ [66] \item[321] {\rm Sq(1)[270]} \\ $h_{0}:$ [270] \\ $h_{2}:$ [265] \\ $h_{4}:$ [243] \\ $h_{6}:$ [157] \\ $h_{7}:$ [67] \end{gl} \end{bdl} \begin{bdl} \item[7/209] \mb{7/209} \begin{gl} \item[268] {\rm Sq(1,1)[212]} \\ $h_{4}:$ [198] \\ $h_{7}:$ [64] \item[269] {\rm Sq(4)[212]} \\ $h_{2}:$ [212] \\ $h_{3}:$ [207] \\ $h_{4}:$ [200], [198] \\ $h_{5}:$ [184] \\ $h_{6}:$ [135] \\ $h_{7}:$ [63] \item[270] {\rm Sq(3)[214] + Sq(0,1)[214]} \\ $h_{4}:$ [198] \\ $h_{7}:$ [64] \end{gl} \end{bdl} \dm{210} \begin{bdl} \item[100/210] \mb{100/210} \begin{gl} \item[6] {\rm Sq(1)[7]} \\ $h_{0}:$ [7] \end{gl} \end{bdl} \begin{bdl} \item[99/210] \mb{99/210} \begin{gl} \item[7] {\rm Sq(1,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[98/210] \mb{98/210} \begin{gl} \item[11] {\rm Sq(1)[14]} \\ $h_{0}:$ [14] \\ $h_{2}:$ [11] \\ $h_{4}:$ [2] \end{gl} \end{bdl} \begin{bdl} \item[97/210] \mb{97/210} \begin{gl} \item[14] {\rm Sq(1)[13]} \\ $h_{0}:$ [13] \\ $h_{2}:$ [10] \end{gl} \end{bdl} \begin{bdl} \item[96/210] \mb{96/210} \begin{gl} \item[13] {\rm Sq(0,1)[10]} \end{gl} \end{bdl} \begin{bdl} \item[93/210] \mb{93/210} \begin{gl} \item[16] {\rm Sq(0,1)[14]} \end{gl} \end{bdl} \begin{bdl} \item[90/210] \mb{90/210} \begin{gl} \item[17] {\rm Sq(0,1)[21]} \end{gl} \end{bdl} \begin{bdl} \item[87/210] \mb{87/210} \begin{gl} \item[22] {\rm Sq(0,1)[22]} \end{gl} \end{bdl} \begin{bdl} \item[84/210] \mb{84/210} \begin{gl} \item[31] {\rm Sq(0,1)[32]} \end{gl} \end{bdl} \begin{bdl} \item[83/210] \mb{83/210} \begin{gl} \item[34] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{1}:$ [36] \\ $h_{2}:$ [34] \end{gl} \end{bdl} \begin{bdl} \item[82/210] \mb{82/210} \begin{gl} \item[38] {\rm Sq(1)[39]} \\ $h_{0}:$ [39] \\ $h_{2}:$ [35] \item[39] {\rm Sq(1)[41]} \\ $h_{0}:$ [41] \\ $h_{2}:$ [37], [35] \end{gl} \end{bdl} \begin{bdl} \item[81/210] \mb{81/210} \begin{gl} \item[39] {\rm Sq(0,1)[36]} \item[40] {\rm Sq(0,1)[37]} \item[41] {\rm Sq(1)[38]} \\ $h_{0}:$ [38] \\ $h_{2}:$ [35] \end{gl} \end{bdl} \begin{bdl} \item[80/210] \mb{80/210} \begin{gl} \item[38] {\rm Sq(1,1)[38]} \end{gl} \end{bdl} \begin{bdl} \item[78/210] \mb{78/210} \begin{gl} \item[47] {\rm Sq(0,1)[47]} \item[48] {\rm Sq(0,1)[48]} \end{gl} \end{bdl} \begin{bdl} \item[77/210] \mb{77/210} \begin{gl} \item[49] {\rm Sq(0,1)[47]} \end{gl} \end{bdl} \begin{bdl} \item[75/210] \mb{75/210} \begin{gl} \item[55] {\rm Sq(0,1)[61]} \item[56] {\rm Sq(0,1)[62]} \end{gl} \end{bdl} \begin{bdl} \item[74/210] \mb{74/210} \begin{gl} \item[63] {\rm Sq(0,1)[63]} \end{gl} \end{bdl} \begin{bdl} \item[72/210] \mb{72/210} \begin{gl} \item[66] {\rm Sq(0,1)[64]} \item[67] {\rm Sq(0,1)[65]} \end{gl} \end{bdl} \begin{bdl} \item[71/210] \mb{71/210} \begin{gl} \item[69] {\rm Sq(0,1)[70]} \item[70] {\rm Sq(1)[75]} \\ $h_{0}:$ [75] \\ $h_{1}:$ [71] \\ $h_{3}:$ [60] \end{gl} \end{bdl} \begin{bdl} \item[70/210] \mb{70/210} \begin{gl} \item[75] {\rm Sq(1)[81]} \\ $h_{0}:$ [81] \\ $h_{3}:$ [63] \end{gl} \end{bdl} \begin{bdl} \item[69/210] \mb{69/210} \begin{gl} \item[79] {\rm Sq(0,1)[78]} \item[80] {\rm Sq(0,1)[79]} \item[81] {\rm Sq(1)[84]} \\ $h_{0}:$ [84] \\ $h_{3}:$ [64] \end{gl} \end{bdl} \begin{bdl} \item[68/210] \mb{68/210} \begin{gl} \item[83] {\rm Sq(0,1)[85]} \item[84] {\rm Sq(1)[93] + Sq(1)[92]} \\ $h_{0}:$ [93], [92] \\ $h_{3}:$ [69] \end{gl} \end{bdl} \begin{bdl} \item[67/210] \mb{67/210} \begin{gl} \item[91] {\rm Sq(2)[92]} \\ $h_{1}:$ [92] \item[92] {\rm Sq(1)[98]} \\ $h_{0}:$ [98] \\ $h_{1}:$ [93] \\ $h_{2}:$ [91] \item[93] {\rm Sq(1)[99]} \\ $h_{0}:$ [99] \\ $h_{1}:$ [93] \\ $h_{2}:$ [91] \end{gl} \end{bdl} \begin{bdl} \item[66/210] \mb{66/210} \begin{gl} \item[95] {\rm Sq(0,1)[91]} \item[96] {\rm Sq(0,1)[92]} \item[97] {\rm Sq(0,1)[93]} \item[98] {\rm Sq(1)[95]} \\ $h_{0}:$ [95] \\ $h_{2}:$ [89] \item[99] {\rm Sq(1)[96]} \\ $h_{0}:$ [96] \\ $h_{2}:$ [89] \end{gl} \end{bdl} \begin{bdl} \item[65/210] \mb{65/210} \begin{gl} \item[95] {\rm Sq(1,1)[93]} \item[96] {\rm Sq(0,1)[94]} \item[97] {\rm Sq(0,1)[95]} \end{gl} \end{bdl} \begin{bdl} \item[63/210] \mb{63/210} \begin{gl} \item[105] {\rm Sq(0,1)[106]} \item[106] {\rm Sq(0,1)[107]} \item[107] {\rm Sq(0,1)[108]} \end{gl} \end{bdl} \begin{bdl} \item[62/210] \mb{62/210} \begin{gl} \item[110] {\rm Sq(0,1)[110]} \item[111] {\rm Sq(0,1)[111]} \item[112] {\rm Sq(0,1)[112]} \item[113] {\rm Sq(2)[116]} \\ $h_{1}:$ [116] \end{gl} \end{bdl} \begin{bdl} \item[60/210] \mb{60/210} \begin{gl} \item[123] {\rm Sq(0,1)[132]} \item[124] {\rm Sq(0,1)[133]} \item[125] {\rm Sq(0,1)[134]} \end{gl} \end{bdl} \begin{bdl} \item[59/210] \mb{59/210} \begin{gl} \item[136] {\rm Sq(0,1)[139]} \item[137] {\rm Sq(0,1)[140]} \item[138] {\rm Sq(0,1)[141]} \end{gl} \end{bdl} \begin{bdl} \item[58/210] \mb{58/210} \begin{gl} \item[146] {\rm Sq(0,1)[140]} \end{gl} \end{bdl} \begin{bdl} \item[57/210] \mb{57/210} \begin{gl} \item[145] {\rm Sq(0,1)[141]} \item[146] {\rm Sq(0,1)[142]} \item[147] {\rm Sq(0,1)[143]} \item[148] {\rm Sq(1)[151]} \\ $h_{0}:$ [151] \\ $h_{1}:$ [146] \\ $h_{2}:$ [140] \\ $h_{3}:$ [127] \end{gl} \end{bdl} \begin{bdl} \item[56/210] \mb{56/210} \begin{gl} \item[148] {\rm Sq(0,1)[148]} \item[149] {\rm Sq(0,1)[149]} \item[150] {\rm Sq(0,1)[150]} \item[151] {\rm Sq(1)[158]} \\ $h_{0}:$ [158] \\ $h_{2}:$ [147] \\ $h_{3}:$ [135] \end{gl} \end{bdl} \begin{bdl} \item[55/210] \mb{55/210} \begin{gl} \item[157] {\rm Sq(0,1)[156]} \item[158] {\rm Sq(1)[167] + Sq(1)[166]} \\ $h_{0}:$ [167], [166] \\ $h_{2}:$ [152] \\ $h_{3}:$ [140] \item[159] {\rm Sq(1)[168] + Sq(1)[166]} \\ $h_{0}:$ [168], [166] \\ $h_{3}:$ [141], [140] \end{gl} \end{bdl} \begin{bdl} \item[54/210] \mb{54/210} \begin{gl} \item[163] {\rm Sq(0,1)[159]} \item[164] {\rm Sq(0,1)[160]} \item[165] {\rm Sq(0,1)[161]} \item[166] {\rm Sq(0,1)[162]} \item[167] {\rm Sq(1)[170]} \\ $h_{0}:$ [170] \\ $h_{3}:$ [142] \item[168] {\rm Sq(1)[171]} \\ $h_{0}:$ [171] \\ $h_{3}:$ [144], [142] \end{gl} \end{bdl} \begin{bdl} \item[53/210] \mb{53/210} \begin{gl} \item[167] {\rm Sq(0,1)[166]} \item[168] {\rm Sq(0,1)[167]} \item[169] {\rm Sq(0,1)[168]} \item[170] {\rm Sq(1)[176]} \\ $h_{0}:$ [176] \item[171] {\rm Sq(1)[177]} \\ $h_{0}:$ [177] \\ $h_{3}:$ [151] \end{gl} \end{bdl} \begin{bdl} \item[52/210] \mb{52/210} \begin{gl} \item[175] {\rm Sq(0,1)[180]} \item[176] {\rm Sq(1)[190]} \\ $h_{0}:$ [190] \item[177] {\rm Sq(1)[192]} \\ $h_{0}:$ [192] \\ $h_{3}:$ [161] \end{gl} \end{bdl} \begin{bdl} \item[51/210] \mb{51/210} \begin{gl} \item[186] {\rm Sq(0,1)[190]} \item[187] {\rm Sq(0,1)[191]} \item[188] {\rm Sq(0,1)[192]} \item[189] {\rm Sq(0,1)[193]} \item[190] {\rm Sq(3)[194]} \item[191] {\rm Sq(2)[195]} \\ $h_{1}:$ [195] \item[192] {\rm Sq(1)[197]} \\ $h_{0}:$ [197] \end{gl} \end{bdl} \begin{bdl} \item[50/210] \mb{50/210} \begin{gl} \item[197] {\rm Sq(1,1)[196] + Sq(1,1)[195]} \item[198] {\rm Sq(0,1)[197]} \item[199] {\rm Sq(0,1)[198]} \item[200] {\rm Sq(0,1)[199]} \item[201] {\rm Sq(1)[207]} \\ $h_{0}:$ [207] \\ $h_{2}:$ [195] \end{gl} \end{bdl} \begin{bdl} \item[49/210] \mb{49/210} \begin{gl} \item[206] {\rm Sq(0,1)[204]} \item[207] {\rm Sq(1)[210]} \\ $h_{0}:$ [210] \\ $h_{2}:$ [197] \item[208] {\rm Sq(1)[215]} \\ $h_{0}:$ [215] \\ $h_{1}:$ [207], [205] \\ $h_{2}:$ [202], [197] \end{gl} \end{bdl} \begin{bdl} \item[48/210] \mb{48/210} \begin{gl} \item[210] {\rm Sq(1,1)[211]} \item[211] {\rm Sq(0,1)[212]} \item[212] {\rm Sq(0,1)[213]} \item[213] {\rm Sq(0,1)[214]} \item[214] {\rm Sq(0,1)[215]} \item[215] {\rm Sq(1)[223]} \\ $h_{0}:$ [223] \\ $h_{2}:$ [208] \end{gl} \end{bdl} \begin{bdl} \item[47/210] \mb{47/210} \begin{gl} \item[219] {\rm Sq(0,1)[224]} \item[220] {\rm Sq(0,1)[225]} \item[221] {\rm Sq(0,1)[226]} \item[222] {\rm Sq(0,1)[227]} \item[223] {\rm Sq(3)[228] + Sq(0,1)[223]} \end{gl} \end{bdl} \begin{bdl} \item[46/210] \mb{46/210} \begin{gl} \item[234] {\rm Sq(1,1)[240]} \item[235] {\rm Sq(0,1)[241]} \item[236] {\rm Sq(2)[248] + Sq(2)[245]} \\ $h_{1}:$ [248], [245] \end{gl} \end{bdl} \begin{bdl} \item[45/210] \mb{45/210} \begin{gl} \item[249] {\rm Sq(0,1)[250]} \item[250] {\rm Sq(0,1)[251]} \item[251] {\rm Sq(0,1)[252]} \item[252] {\rm Sq(0,1)[253]} \item[253] {\rm Sq(0,1)[254]} \end{gl} \end{bdl} \begin{bdl} \item[44/210] \mb{44/210} \begin{gl} \item[259] {\rm Sq(0,1)[260]} \item[260] {\rm Sq(0,1)[261]} \item[261] {\rm Sq(0,1)[262]} \item[262] {\rm Sq(0,1)[263]} \item[263] {\rm Sq(0,1)[264]} \end{gl} \end{bdl} \begin{bdl} \item[43/210] \mb{43/210} \begin{gl} \item[273] {\rm Sq(0,1)[273]} \item[274] {\rm Sq(0,1)[274]} \item[275] {\rm Sq(0,1)[275]} \end{gl} \end{bdl} \begin{bdl} \item[42/210] \mb{42/210} \begin{gl} \item[284] {\rm Sq(1,1)[277] + Sq(1,1)[275] + Sq(1,1)[273]} \item[285] {\rm Sq(0,1)[279]} \item[286] {\rm Sq(0,1)[280]} \item[287] {\rm Sq(0,1)[281]} \item[288] {\rm Sq(0,1)[282]} \end{gl} \end{bdl} \begin{bdl} \item[41/210] \mb{41/210} \begin{gl} \item[290] {\rm Sq(0,1)[283]} \item[291] {\rm Sq(0,1)[284] + Sq(0,1)[282]} \item[292] {\rm Sq(0,1)[285]} \item[293] {\rm Sq(0,1)[286]} \item[294] {\rm Sq(3)[287] + Sq(0,1)[287] + Sq(0,1)[282]} \item[295] {\rm Sq(1)[300]} \\ $h_{0}:$ [300] \\ $h_{1}:$ [294] \\ $h_{2}:$ [281] \\ $h_{3}:$ [259] \end{gl} \end{bdl} \begin{bdl} \item[40/210] \mb{40/210} \begin{gl} \item[297] {\rm Sq(0,1)[286]} \item[298] {\rm Sq(0,1)[287]} \item[299] {\rm Sq(0,1)[288]} \item[300] {\rm Sq(1)[305] + Sq(1)[304]} \\ $h_{0}:$ [305], [304] \\ $h_{2}:$ [285] \\ $h_{3}:$ [263] \end{gl} \end{bdl} \begin{bdl} \item[39/210] \mb{39/210} \begin{gl} \item[301] {\rm Sq(3)[295]} \item[302] {\rm Sq(0,1)[296]} \item[303] {\rm Sq(0,1)[297] + Sq(0,1)[295]} \item[304] {\rm Sq(0,1)[298]} \item[305] {\rm Sq(1)[311] + Sq(1)[306]} \\ $h_{0}:$ [311], [306] \\ $h_{2}:$ [290] \\ $h_{3}:$ [269] \item[306] {\rm Sq(1)[312] + Sq(1)[306]} \\ $h_{0}:$ [312], [306] \\ $h_{1}:$ [300] \\ $h_{3}:$ [270] \end{gl} \end{bdl} \begin{bdl} \item[38/210] \mb{38/210} \begin{gl} \item[305] {\rm Sq(0,1)[308] + Sq(0,1)[307]} \item[306] {\rm Sq(3)[308] + Sq(3)[307] + Sq(0,1)[307]} \item[307] {\rm Sq(0,1)[309] + Sq(0,1)[307]} \item[308] {\rm Sq(0,1)[310]} \item[309] {\rm Sq(0,1)[311] + Sq(0,1)[307]} \item[310] {\rm Sq(2)[315] + Sq(2)[314] + Sq(2)[313]} \\ $h_{1}:$ [315], [314], [313] \item[311] {\rm Sq(1)[322]} \\ $h_{0}:$ [322] \\ $h_{3}:$ [282] \item[312] {\rm Sq(1)[323]} \\ $h_{0}:$ [323] \\ $h_{3}:$ [284] \end{gl} \end{bdl} \begin{bdl} \item[37/210] \mb{37/210} \begin{gl} \item[320] {\rm Sq(0,1)[317]} \item[321] {\rm Sq(0,1)[318] + Sq(0,1)[316]} \item[322] {\rm Sq(1)[332] + Sq(1)[328] + Sq(1)[327]} \\ $h_{0}:$ [332], [328], [327] \item[323] {\rm Sq(1)[333] + Sq(1)[328] + Sq(1)[327]} \\ $h_{0}:$ [333], [328], [327] \\ $h_{3}:$ [292] \end{gl} \end{bdl} \begin{bdl} \item[36/210] \mb{36/210} \begin{gl} \item[327] {\rm Sq(1,1)[318]} \item[328] {\rm Sq(1,1)[320] + Sq(1,1)[319]} \item[329] {\rm Sq(0,1)[323]} \item[330] {\rm Sq(0,1)[324]} \item[331] {\rm Sq(0,1)[325]} \item[332] {\rm Sq(1)[335]} \\ $h_{0}:$ [335] \item[333] {\rm Sq(1)[338]} \\ $h_{0}:$ [338] \\ $h_{3}:$ [293] \item[334] {\rm Sq(1)[339] + Sq(1)[337]} \\ $h_{0}:$ [339], [337] \\ $h_{1}:$ [328] \end{gl} \end{bdl} \begin{bdl} \item[35/210] \mb{35/210} \begin{gl} \item[331] {\rm Sq(0,1)[329] + Sq(0,1)[328]} \item[332] {\rm Sq(0,1)[330] + Sq(0,1)[328]} \item[333] {\rm Sq(0,1)[331] + Sq(0,1)[328]} \item[334] {\rm Sq(0,1)[332]} \item[335] {\rm Sq(3)[334] + Sq(3)[333] + Sq(3)[332] + Sq(3)[329]} \item[336] {\rm Sq(2)[337]} \\ $h_{1}:$ [337] \item[337] {\rm Sq(1)[341]} \\ $h_{0}:$ [341] \\ $h_{1}:$ [338], [336] \\ $h_{2}:$ [327], [325] \item[338] {\rm Sq(1)[342]} \\ $h_{0}:$ [342] \item[339] {\rm Sq(1)[344]} \\ $h_{0}:$ [344] \\ $h_{1}:$ [338], [336] \\ $h_{2}:$ [327], [325] \end{gl} \end{bdl} \begin{bdl} \item[34/210] \mb{34/210} \begin{gl} \item[341] {\rm Sq(1,1)[339] + Sq(1,1)[336] + Sq(1,1)[334]} \item[342] {\rm Sq(1,1)[340] + Sq(1,1)[337] + Sq(1,1)[336] + Sq(1,1)[335]} \item[343] {\rm Sq(0,1)[341]} \item[344] {\rm Sq(3)[343] + Sq(0,1)[343]} \end{gl} \end{bdl} \begin{bdl} \item[33/210] \mb{33/210} \begin{gl} \item[352] {\rm Sq(0,1)[346] + Sq(0,1)[345]} \item[353] {\rm Sq(0,1)[347]} \item[354] {\rm Sq(3)[347] + Sq(3)[345] + Sq(0,1)[345]} \item[355] {\rm Sq(1)[359]} \\ $h_{0}:$ [359] \\ $h_{1}:$ [353], [352] \\ $h_{2}:$ [344], [343], [338] \\ $h_{5}:$ [209] \\ $h_{7}:$ [14] \item[356] {\rm Sq(1)[360] + Sq(1)[358]} \\ $h_{0}:$ [360], [358] \\ $h_{1}:$ [354], [353], [352] \item[357] {\rm Sq(1)[362] + Sq(1)[358]} \\ $h_{0}:$ [362], [358] \\ $h_{1}:$ [354], [353] \\ $h_{2}:$ [344] \\ $h_{3}:$ [317], [314] \\ $h_{4}:$ [276], [274] \\ $h_{5}:$ [208] \\ $h_{6}:$ [99] \end{gl} \end{bdl} \begin{bdl} \item[32/210] \mb{32/210} \begin{gl} \item[356] {\rm Sq(3)[343] + Sq(0,1)[343]} \item[357] {\rm Sq(0,1)[346] + Sq(0,1)[345] + Sq(0,1)[344]} \item[358] {\rm Sq(3)[347] + Sq(0,1)[347] + Sq(0,1)[345] + Sq(3)[344] + Sq(0,1)[344]} \item[359] {\rm Sq(3)[349] + Sq(0,1)[347] + Sq(3)[344] + Sq(0,1)[344]} \\ $h_{2}:$ [340], [339], [338] \\ $h_{5}:$ [212] \\ $h_{7}:$ [12] \item[360] {\rm Sq(3)[350] + Sq(0,1)[350] + Sq(3)[348] + Sq(0,1)[348] + Sq(0,1)[345] + Sq(3)[344] + Sq(0,1)[344] + Sq(0,1)[343]} \item[361] {\rm Sq(1)[357] + Sq(1)[355]} \\ $h_{0}:$ [357], [355] \\ $h_{2}:$ [339], [337] \\ $h_{5}:$ [212] \\ $h_{7}:$ [12] \item[362] {\rm Sq(1)[359] + Sq(1)[356]} \\ $h_{0}:$ [359], [356] \\ $h_{2}:$ [340], [339] \\ $h_{3}:$ [317] \end{gl} \end{bdl} \begin{bdl} \item[31/210] \mb{31/210} \begin{gl} \item[355] {\rm Sq(1,1)[342]} \item[356] {\rm Sq(0,1)[348]} \item[357] {\rm Sq(3)[349] + Sq(3)[346]} \item[358] {\rm Sq(1)[356]} \\ $h_{0}:$ [356] \item[359] {\rm Sq(1)[360]} \\ $h_{0}:$ [360] \\ $h_{3}:$ [319] \end{gl} \end{bdl} \begin{bdl} \item[30/210] \mb{30/210} \begin{gl} \item[355] {\rm Sq(0,1)[350]} \item[356] {\rm Sq(3)[350]} \item[357] {\rm Sq(0,1)[352]} \item[358] {\rm Sq(0,1)[353] + Sq(0,1)[351]} \item[359] {\rm Sq(2)[358] + Sq(2)[355]} \\ $h_{1}:$ [358], [355] \item[360] {\rm Sq(1)[360] + Sq(1)[359]} \\ $h_{0}:$ [360], [359] \end{gl} \end{bdl} \begin{bdl} \item[29/210] \mb{29/210} \begin{gl} \item[359] {\rm Sq(0,1)[350]} \item[360] {\rm Sq(1)[359] + Sq(1)[358]} \\ $h_{0}:$ [359], [358] \end{gl} \end{bdl} \begin{bdl} \item[28/210] \mb{28/210} \begin{gl} \item[357] {\rm Sq(1,1)[352] + Sq(1,1)[351] + Sq(1,1)[349]} \item[358] {\rm Sq(0,1)[353]} \item[359] {\rm Sq(3)[353]} \item[360] {\rm Sq(3)[356] + Sq(0,1)[356] + Sq(3)[355] + Sq(0,1)[355]} \end{gl} \end{bdl} \begin{bdl} \item[27/210] \mb{27/210} \begin{gl} \item[362] {\rm Sq(0,1)[360] + Sq(0,1)[359]} \item[363] {\rm Sq(3)[363] + Sq(3)[359]} \end{gl} \end{bdl} \begin{bdl} \item[26/210] \mb{26/210} \begin{gl} \item[369] {\rm Sq(3)[361] + Sq(0,1)[361] + Sq(0,1)[359]} \item[370] {\rm Sq(2)[363]} \\ $h_{1}:$ [363] \\ $h_{4}:$ [309], [308] \\ $h_{7}:$ [23] \item[371] {\rm Sq(2)[365] + Sq(2)[364]} \\ $h_{1}:$ [365], [364] \\ $h_{2}:$ [356], [355] \\ $h_{4}:$ [309] \\ $h_{7}:$ [23] \item[372] {\rm Sq(1)[372] + Sq(1)[370] + Sq(1)[367]} \\ $h_{0}:$ [372], [370], [367] \\ $h_{1}:$ [362] \\ $h_{3}:$ [342], [341], [340], [339] \\ $h_{7}:$ [23] \end{gl} \end{bdl} \begin{bdl} \item[25/210] \mb{25/210} \begin{gl} \item[367] {\rm Sq(3)[357]} \item[368] {\rm Sq(0,1)[358] + Sq(0,1)[357]} \item[369] {\rm Sq(3)[360] + Sq(0,1)[360]} \item[370] {\rm Sq(3)[361] + Sq(0,1)[361] + Sq(3)[359] + Sq(0,1)[359]} \item[371] {\rm Sq(2)[365]} \\ $h_{1}:$ [365] \\ $h_{2}:$ [355], [354] \\ $h_{3}:$ [339] \\ $h_{4}:$ [308] \item[372] {\rm Sq(1)[369] + Sq(1)[368]} \\ $h_{0}:$ [369], [368] \\ $h_{3}:$ [341], [340], [337], [336] \item[373] {\rm Sq(1)[370]} \\ $h_{0}:$ [370] \\ $h_{2}:$ [356], [355], [353] \\ $h_{3}:$ [341], [340], [337], [336] \\ $h_{7}:$ [24] \end{gl} \end{bdl} \begin{bdl} \item[24/210] \mb{24/210} \begin{gl} \item[368] {\rm Sq(0,1)[363] + Sq(3)[361] + Sq(0,1)[361]} \item[369] {\rm Sq(3)[365] + Sq(0,1)[365] + Sq(3)[364] + Sq(0,1)[364] + Sq(3)[363] + Sq(3)[361] + Sq(0,1)[361] + Sq(3)[360] + Sq(0,1)[360]} \\ $h_{3}:$ [342], [341] \item[370] {\rm Sq(1)[374]} \\ $h_{0}:$ [374] \\ $h_{2}:$ [356] \\ $h_{3}:$ [342], [341] \\ $h_{7}:$ [23] \item[371] {\rm Sq(1)[377] + Sq(1)[376]} \\ $h_{0}:$ [377], [376] \\ $h_{1}:$ [368], [367], [366] \end{gl} \end{bdl} \begin{bdl} \item[23/210] \mb{23/210} \begin{gl} \item[374] {\rm Sq(3)[380] + Sq(0,1)[379]} \\ $h_{7}:$ [24] \item[375] {\rm Sq(2)[385] + Sq(2)[384]} \\ $h_{1}:$ [385], [384] \item[376] {\rm Sq(1)[392]} \\ $h_{0}:$ [392] \\ $h_{2}:$ [377], [376] \\ $h_{5}:$ [267] \\ $h_{7}:$ [25], [24] \item[377] {\rm Sq(1)[394] + Sq(1)[391]} \\ $h_{0}:$ [394], [391] \\ $h_{2}:$ [377], [376] \\ $h_{5}:$ [267] \\ $h_{7}:$ [25], [24] \item[378] {\rm Sq(1)[396] + Sq(1)[391]} \\ $h_{0}:$ [396], [391] \\ $h_{2}:$ [377], [376] \\ $h_{5}:$ [267] \\ $h_{7}:$ [25], [24] \item[379] {\rm Sq(1)[397] + Sq(1)[395]} \\ $h_{0}:$ [397], [395] \\ $h_{1}:$ [389], [386], [384] \\ $h_{2}:$ [378], [376] \\ $h_{3}:$ [358], [357], [356] \end{gl} \end{bdl} \begin{bdl} \item[22/210] \mb{22/210} \begin{gl} \item[391] {\rm Sq(6)[378]} \item[392] {\rm Sq(1,1)[394]} \item[393] {\rm Sq(0,1)[395]} \item[394] {\rm Sq(3)[395]} \item[395] {\rm Sq(3)[398] + Sq(0,1)[398] + Sq(3)[397] + Sq(0,1)[397] + Sq(3)[396] + Sq(0,1)[396]} \item[396] {\rm Sq(1)[409]} \\ $h_{0}:$ [409] \item[397] {\rm Sq(1)[410] + Sq(1)[407]} \\ $h_{0}:$ [410], [407] \\ $h_{2}:$ [394] \\ $h_{3}:$ [372], [371], [370] \item[398] {\rm Sq(1)[411] + Sq(1)[408]} \\ $h_{0}:$ [411], [408] \\ $h_{1}:$ [401] \\ $h_{3}:$ [371] \end{gl} \end{bdl} \begin{bdl} \item[21/210] \mb{21/210} \begin{gl} \item[406] {\rm Sq(0,1)[409] + Sq(3)[408] + Sq(0,1)[408]} \\ $h_{2}:$ [402] \\ $h_{3}:$ [377] \item[407] {\rm Sq(0,1)[410] + Sq(3)[409]} \\ $h_{2}:$ [402] \\ $h_{3}:$ [377] \item[408] {\rm Sq(3)[410] + Sq(3)[408] + Sq(0,1)[408]} \\ $h_{3}:$ [377] \item[409] {\rm Sq(3)[411] + Sq(0,1)[411] + Sq(3)[409] + Sq(3)[408]} \item[410] {\rm Sq(1)[418] + Sq(1)[416]} \\ $h_{0}:$ [418], [416] \\ $h_{2}:$ [402] \\ $h_{3}:$ [380] \item[411] {\rm Sq(1)[419] + Sq(1)[416]} \\ $h_{0}:$ [419], [416] \item[412] {\rm Sq(1)[423] + Sq(1)[421] + Sq(1)[420] + Sq(1)[416]} \\ $h_{0}:$ [423], [421], [420], [416] \\ $h_{2}:$ [402] \\ $h_{3}:$ [383], [380], [377] \\ $h_{7}:$ [32] \end{gl} \end{bdl} \begin{bdl} \item[20/210] \mb{20/210} \begin{gl} \item[416] {\rm Sq(1,1)[421] + Sq(1,1)[419] + Sq(1,1)[418]} \\ $h_{3}:$ [395] \item[417] {\rm Sq(1,1)[422] + Sq(4)[420] + Sq(1,1)[420] + Sq(4)[419]} \\ $h_{2}:$ [420], [419] \\ $h_{3}:$ [395] \item[418] {\rm Sq(0,1)[423]} \item[419] {\rm Sq(3)[423]} \\ $h_{3}:$ [395] \item[420] {\rm Sq(1)[433]} \\ $h_{0}:$ [433] \\ $h_{1}:$ [428], [427] \\ $h_{2}:$ [420], [418] \\ $h_{3}:$ [395] \\ $h_{5}:$ [278], [277], [276] \item[421] {\rm Sq(1)[434]} \\ $h_{0}:$ [434] \\ $h_{1}:$ [428], [427] \\ $h_{2}:$ [419], [418] \\ $h_{4}:$ [358] \\ $h_{5}:$ [278], [277], [276] \\ $h_{7}:$ [35] \item[422] {\rm Sq(1)[435]} \\ $h_{0}:$ [435] \\ $h_{1}:$ [428], [427] \\ $h_{2}:$ [420], [419] \\ $h_{4}:$ [358] \\ $h_{5}:$ [278], [277] \\ $h_{7}:$ [35] \item[423] {\rm Sq(1)[437] + Sq(1)[436]} \\ $h_{0}:$ [437], [436] \\ $h_{2}:$ [420], [419] \\ $h_{3}:$ [398], [395] \\ $h_{4}:$ [358] \\ $h_{7}:$ [36], [35] \end{gl} \end{bdl} \begin{bdl} \item[19/210] \mb{19/210} \begin{gl} \item[433] {\rm Sq(5)[426] + Sq(2,1)[426] + Sq(5)[425] + Sq(2,1)[425] + Sq(5)[424] + Sq(2,1)[424] + Sq(5)[421] + Sq(2,1)[421]} \item[434] {\rm Sq(3)[435] + Sq(0,1)[435] + Sq(3)[433] + Sq(0,1)[433] + Sq(3)[432] + Sq(0,1)[432]} \item[435] {\rm Sq(1)[442]} \\ $h_{0}:$ [442] \item[436] {\rm Sq(1)[444] + Sq(1)[443]} \\ $h_{0}:$ [444], [443] \\ $h_{3}:$ [410], [409] \item[437] {\rm Sq(1)[447] + Sq(1)[446]} \\ $h_{0}:$ [447], [446] \\ $h_{3}:$ [412], [409] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[18/210] \mb{18/210} \begin{gl} \item[442] {\rm Sq(5)[438]} \item[443] {\rm Sq(3)[443]} \item[444] {\rm Sq(0,1)[444] + Sq(0,1)[443]} \item[445] {\rm Sq(2)[445]} \\ $h_{1}:$ [445] \item[446] {\rm Sq(1)[451]} \\ $h_{0}:$ [451] \\ $h_{1}:$ [447] \\ $h_{2}:$ [442], [441] \\ $h_{3}:$ [426], [425] \\ $h_{7}:$ [42] \item[447] {\rm Sq(1)[453]} \\ $h_{0}:$ [453] \\ $h_{1}:$ [447] \\ $h_{2}:$ [442], [441] \\ $h_{7}:$ [43] \end{gl} \end{bdl} \begin{bdl} \item[17/210] \mb{17/210} \begin{gl} \item[451] {\rm Sq(1,1)[462]} \\ $h_{7}:$ [39] \item[452] {\rm Sq(3)[467] + Sq(0,1)[467] + Sq(3)[465] + Sq(3)[463]} \\ $h_{4}:$ [390] \item[453] {\rm Sq(1)[470]} \\ $h_{0}:$ [470] \\ $h_{7}:$ [40] \item[454] {\rm Sq(1)[471]} \\ $h_{0}:$ [471] \\ $h_{7}:$ [39] \item[455] {\rm Sq(1)[473]} \\ $h_{0}:$ [473] \\ $h_{4}:$ [394], [393], [392], [391] \\ $h_{5}:$ [295], [294] \\ $h_{7}:$ [40] \end{gl} \end{bdl} \begin{bdl} \item[16/210] \mb{16/210} \begin{gl} \item[470] {\rm Sq(2,1)[475] + Sq(2,1)[472]} \\ $h_{7}:$ [41] \item[471] {\rm Sq(1,1)[477]} \item[472] {\rm Sq(2)[487] + Sq(2)[486] + Sq(2)[484] + Sq(2)[483]} \\ $h_{1}:$ [487], [486], [484], [483] \\ $h_{4}:$ [400], [398], [397], [396] \item[473] {\rm Sq(1)[489]} \\ $h_{0}:$ [489] \\ $h_{4}:$ [398], [397], [395], [394] \\ $h_{5}:$ [303], [302], [300] \\ $h_{7}:$ [41] \end{gl} \end{bdl} \begin{bdl} \item[15/210] \mb{15/210} \begin{gl} \item[489] {\rm Sq(1)[494] + Sq(1)[491] + Sq(1)[490]} \\ $h_{0}:$ [494], [491], [490] \\ $h_{5}:$ [314], [312] \end{gl} \end{bdl} \begin{bdl} \item[14/210] \mb{14/210} \begin{gl} \item[490] {\rm Sq(1,1)[470] + Sq(1,1)[469] + Sq(1,1)[466] + Sq(4)[465] + Sq(1,1)[465]} \\ $h_{2}:$ [465] \\ $h_{3}:$ [442], [441] \\ $h_{4}:$ [393], [391] \item[491] {\rm Sq(3)[472] + Sq(0,1)[472]} \\ $h_{2}:$ [467], [465] \\ $h_{7}:$ [45] \item[492] {\rm Sq(3)[473]} \\ $h_{2}:$ [468], [467], [466], [465] \\ $h_{5}:$ [320] \item[493] {\rm Sq(2)[475] + Sq(2)[474]} \\ $h_{1}:$ [475], [474] \\ $h_{2}:$ [465] \\ $h_{3}:$ [442], [441] \\ $h_{4}:$ [393], [392], [391] \\ $h_{5}:$ [320] \item[494] {\rm Sq(1)[478]} \\ $h_{0}:$ [478] \\ $h_{2}:$ [467] \\ $h_{3}:$ [442], [441] \\ $h_{4}:$ [393], [391] \\ $h_{5}:$ [320] \\ $h_{7}:$ [45] \end{gl} \end{bdl} \begin{bdl} \item[13/210] \mb{13/210} \begin{gl} \item[477] {\rm Sq(2)[463]} \\ $h_{1}:$ [463] \\ $h_{4}:$ [389], [387] \item[478] {\rm Sq(1)[466]} \\ $h_{0}:$ [466] \item[479] {\rm Sq(1)[469]} \\ $h_{0}:$ [469] \\ $h_{2}:$ [457] \\ $h_{3}:$ [433] \\ $h_{4}:$ [390], [388], [387] \end{gl} \end{bdl} \begin{bdl} \item[12/210] \mb{12/210} \begin{gl} \item[466] {\rm Sq(3)[437] + Sq(0,1)[437]} \item[467] {\rm Sq(3)[438] + Sq(0,1)[438] + Sq(0,1)[437]} \\ $h_{7}:$ [52] \item[468] {\rm Sq(1)[445]} \\ $h_{0}:$ [445] \\ $h_{1}:$ [442], [441] \\ $h_{2}:$ [435], [434], [433], [431] \\ $h_{3}:$ [416], [415], [414], [412] \\ $h_{4}:$ [382] \\ $h_{5}:$ [333] \\ $h_{7}:$ [52] \item[469] {\rm Sq(1)[448]} \\ $h_{0}:$ [448] \\ $h_{2}:$ [435], [434], [431] \\ $h_{3}:$ [414] \\ $h_{4}:$ [383], [380] \end{gl} \end{bdl} \begin{bdl} \item[11/210] \mb{11/210} \begin{gl} \item[445] {\rm Sq(3)[406] + Sq(0,1)[406] + Sq(3)[405] + Sq(0,1)[405]} \item[446] {\rm Sq(2)[407]} \\ $h_{1}:$ [407] \\ $h_{2}:$ [401], [400] \\ $h_{3}:$ [386] \\ $h_{7}:$ [55] \item[447] {\rm Sq(2)[408]} \\ $h_{1}:$ [408] \\ $h_{2}:$ [401], [400] \\ $h_{3}:$ [386] \\ $h_{7}:$ [55] \item[448] {\rm Sq(1)[410]} \\ $h_{0}:$ [410] \\ $h_{4}:$ [359] \end{gl} \end{bdl} \begin{bdl} \item[10/210] \mb{10/210} \begin{gl} \item[410] {\rm Sq(3,1)[360] + Sq(3,1)[359] + Sq(3,1)[356]} \\ $h_{4}:$ [325], [324] \item[411] {\rm Sq(4)[363] + Sq(1,1)[363] + Sq(4)[362] + Sq(1,1)[362]} \\ $h_{2}:$ [363], [362] \\ $h_{3}:$ [349] \\ $h_{4}:$ [327], [325] \item[412] {\rm Sq(3)[366] + Sq(0,1)[366] + Sq(3)[365] + Sq(0,1)[365]} \\ $h_{4}:$ [327], [326], [325] \item[413] {\rm Sq(2)[367]} \\ $h_{1}:$ [367] \\ $h_{2}:$ [362] \\ $h_{3}:$ [349] \\ $h_{4}:$ [325], [324] \end{gl} \end{bdl} \begin{bdl} \item[8/210] \mb{8/210} \begin{gl} \item[322] {\rm Sq(1,1)[267]} \item[323] {\rm Sq(2)[268]} \\ $h_{1}:$ [268] \\ $h_{3}:$ [258] \\ $h_{4}:$ [245] \\ $h_{7}:$ [68] \end{gl} \end{bdl} \begin{bdl} \item[7/210] \mb{7/210} \begin{gl} \item[271] {\rm Sq(1,1)[214]} \end{gl} \end{bdl} \begin{bdl} \item[6/210] \mb{6/210} \begin{gl} \item[215] {\rm Sq(4)[150] + Sq(1,1)[150]} \\ $h_{2}:$ [150] \\ $h_{4}:$ [143] \\ $h_{7}:$ [56], [55] \end{gl} \end{bdl}