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############################################################################# ## ## This file is part of GAP, a system for computational discrete algebra. ## This file's authors include Volkmar Felsch, Alexander Hulpke. ## ## Copyright of GAP belongs to its developers, whose names are too numerous ## to list here. Please refer to the COPYRIGHT file for details. ## ## SPDX-License-Identifier: GPL-2.0-or-later ## ## This file contains the perfect groups of sizes 190080-345600 ## All data is based on Holt/Plesken: Perfect Groups, OUP 1989 ## PERFGRP[159]:=[# 190080.1 [[1,"abd", function(a,b,d) return [[a^2,b^3,(a*b)^11*d^-1,(a^-1*b^-1*a*b)^6, (a*b*a*b*a*b^-1)^6*d^-1, (a*b*a*b*a*b^-1*a*b^-1)^5,d^2, a^-1*d*a*d^-1,b^-1*d*b*d^-1], [[a,b*a*b^-1*a*(b^-1*a*b*a)^2]]]; end, [24]], "M12 2^1",28,-2, 31,24] ]; PERFGRP[160]:=[# 192000.1 [[4,7680,4,3000,2,120,4,1], "A5 # 2^7 5^2 [1]",6,4, 1,[24,64,25]], # 192000.2 [[4,7680,5,3000,2,120,5,1], "A5 # 2^7 5^2 [2]",6,4, 1,[24,24,25]] ]; PERFGRP[161]:=[# 194472.1 [[1,"abc", function(a,b,c) return [[c^36,c*b^25*c^-1*b^-1,b^73,a^2,c*a*c*a^-1 ,(b*a)^3, c^(-1*10)*b^2*c*b*c*a*b*c^2*b*a*b^2*c*b*a], [[b,c]]]; end, [74],[0,3,5,3]], "L2(73)",22,-1, 39,74] ]; PERFGRP[162]:=[# 201720.1 [[1,"abyz", function(a,b,y,z) return [[a^4,b^3,(a*b)^5,a^2*b^-1*a^2*b,y^41,z^41,y^-1 *z^-1*y*z,a^-1*y*a*z^-1, a^-1*z*a*y, b^-1*y*b*(y^-1*z^(-1*16))^-1, b^-1*z*b*y^(-1*18)],[[a*b,a^2,y]]]; end, [492],[0,0,2,2]], "A5 2^1 41^2",[5,2,1],1, 1,492] ]; PERFGRP[163]:=[# 205200.1 [[2,60,1,3420,1], "A5 x L2(19)",40,1, [1,9],[5,20]] ]; PERFGRP[164]:=[# 205320.1 [[1,"abc", function(a,b,c) return [[c^29*a^2,c*b^4*c^-1*b^-1,b^59,a^4,a^2*b^(-1 *1)*a^2*b,a^2*c^-1*a^2*c, c*a*c*a^-1,(b*a)^3],[[b,c^2]]]; end, [120]], "L2(59) 2^1 = SL(2,59)",22,-2, 32,120] ]; PERFGRP[165]:=[# 216000.1 [[2,60,1,3600,1], "A5 x A5 x A5",40,1, [1,1,1],[5,5,5]] ]; PERFGRP[166]:=[# 221760.1 [[2,336,1,660,1], "( L3(2) x L2(11) ) 2^1 [1]",[39,1,1],2, [2,5],[16,11]], # 221760.2 [[2,168,1,1320,1], "( L3(2) x L2(11) ) 2^1 [2]",[39,1,2],2, [2,5],[7,24]], # 221760.3 [[3,336,1,1320,1,"d1","d2"], "( L3(2) x L2(11) ) 2^1 [3]",[39,1,3],2, [2,5],192] ]; PERFGRP[167]:=[# 223608.1 [[1,"abxyz", function(a,b,x,y,z) return [[a^2,b^3,(a*b)^7,(a^-1*b^-1*a*b)^4,x^11,y^11, z^11,x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z,a^-1*x*a*z^-1, a^-1*y*a*y,a^-1*z*a*x^-1, b^-1*x*b*(y^4*z^-1)^-1, b^-1*y*b*(x^5*y*z^(-1*5))^-1, b^-1*z*b*(x^(-1*5)*y^3*z^-1)^-1], [[b*a*b^-1,b^-1*a*b,z]]]; end, [231]], "L3(2) 11^3",[11,3,1],1, 2,231] ]; PERFGRP[168]:=[# 225792.1 [[2,168,1,1344,1], "( L3(2) x L3(2) ) # 2^3 [1]",[34,3,1],1, [2,2],[7,8]], # 225792.2 [[2,168,1,1344,2], "( L3(2) x L3(2) ) # 2^3 [2]",[34,3,2],1, [2,2],[7,14]] ]; PERFGRP[169]:=[# 226920.1 [[1,"abc", function(a,b,c) return [[c^30*a^2,c*b^4*c^-1*b^-1,b^61,a^4,a^2*b^(-1 *1)*a^2*b,a^2*c^-1*a^2*c, c*a*c*a^-1,(b*a)^3, c^(-1*4)*(b*c)^3*c*a*b^2*a*c*b^2*a],[[b,c^4]]]; end, [248]], "L2(61) 2^1 = SL(2,61)",22,-2, 33,248] ]; PERFGRP[170]:=[# 230400.1 [[2,1920,1,120,1], "( A5 x A5 ) # 2^6 [1]",[29,6,1],4, [1,1],[12,24]], # 230400.2 [[2,1920,2,120,1], "( A5 x A5 ) # 2^6 [2]",[29,6,2],4, [1,1],[24,24]], # 230400.3 [[2,1920,3,120,1], "( A5 x A5 ) # 2^6 [3]",[29,6,3],4, [1,1],[16,24,24]], # 230400.4 [[2,1920,4,120,1], "( A5 x A5 ) # 2^6 [4]",[29,6,4],2, [1,1],[80,24]], # 230400.5 [[2,1920,5,120,1], "( A5 x A5 ) # 2^6 [5]",[29,6,5],4, [1,1],[10,24,24]], # 230400.6 [[2,1920,6,120,1], "( A5 x A5 ) # 2^6 [6]",[29,6,6],4, [1,1],[80,24]], # 230400.7 [[2,1920,7,120,1], "( A5 x A5 ) # 2^6 [7]",[29,6,7],4, [1,1],[32,24]], # 230400.8 [[2,3840,1,60,1], "( A5 x A5 ) # 2^6 [8]",[29,6,8],4, [1,1],[64,5]], # 230400.9 [[2,3840,2,60,1], "( A5 x A5 ) # 2^6 [9]",[29,6,9],4, [1,1],[64,5]], # 230400.10 [[2,3840,3,60,1], "( A5 x A5 ) # 2^6 [10]",[29,6,10],4, [1,1],[24,5]], # 230400.11 [[2,3840,4,60,1], "( A5 x A5 ) # 2^6 [11]",[29,6,11],4, [1,1],[48,5]], # 230400.12 [[2,3840,5,60,1], "( A5 x A5 ) # 2^6 [12]",[29,6,12],4, [1,1],[24,12,5]], # 230400.13 [[2,3840,6,60,1], "( A5 x A5 ) # 2^6 [13]",[29,6,13],2, [1,1],[48,5]], # 230400.14 [[2,3840,7,60,1], "( A5 x A5 ) # 2^6 [14]",[29,6,14],4, [1,1],[32,24,5]], # 230400.15 [[3,3840,1,120,1,"e1","e1","d2"], "( A5 x A5 ) # 2^6 [15]",[29,6,15],4, [1,1],768], # 230400.16 [[3,3840,2,120,1,"e1","e1","d2"], "( A5 x A5 ) # 2^6 [16]",[29,6,16],4, [1,1],768], # 230400.17 [[3,3840,3,120,1,"e1","d2"], "( A5 x A5 ) # 2^6 [17]",[29,6,17],4, [1,1],288], # 230400.18 [[3,3840,4,120,1,"e1","d2"], "( A5 x A5 ) # 2^6 [18]",[29,6,18],4, [1,1],576], # 230400.19 [[3,3840,4,120,1,"d1","d2"], "( A5 x A5 ) # 2^6 [19]",[29,6,19],4, [1,1],576], # 230400.20 [[3,3840,5,120,1,"d1","d2"], "( A5 x A5 ) # 2^6 [20]",[29,6,20],4, [1,1],[288,144]], # 230400.21 [[3,3840,5,120,1,"e1","d2"], "( A5 x A5 ) # 2^6 [21]",[29,6,21],4, [1,1],[288,144]], # 230400.22 [[3,3840,5,120,1,"d1","e1","d2"], "( A5 x A5 ) # 2^6 [22]",[29,6,22],4, [1,1],[288,144]], # 230400.23 [[3,3840,6,120,1,"e1","d2"], "( A5 x A5 ) # 2^6 [23]",[29,6,23],2, [1,1],576], # 230400.24 [[3,3840,7,120,1,"d1","d2"], "( A5 x A5 ) # 2^6 [24]",[29,6,24],4, [1,1],[384,288]], # 230400.25 [[3,3840,7,120,1,"e1","d2"], "( A5 x A5 ) # 2^6 [25]",[29,6,25],4, [1,1],[384,288]], # 230400.26 [[3,3840,7,120,1,"d1","e1","d2"], "( A5 x A5 ) # 2^6 [26]",[29,6,26],4, [1,1],[384,288]] ]; PERFGRP[171]:=[# 232320.1 [[4,1920,3,14520,2,120,3,1], "A5 # 2^5 11^2 [1]",6,1, 1,[16,24,121]], # 232320.2 [[4,1920,4,14520,2,120,4,1], "A5 # 2^5 11^2 [2]",6,1, 1,[80,121]], # 232320.3 [[4,1920,5,14520,2,120,5,1], "A5 # 2^5 11^2 [3]",6,1, 1,[10,24,121]] ]; PERFGRP[172]:=[# 233280.1 [[1,"abwxyzrstuv", function(a,b,w,x,y,z,r,s,t,u,v) return [[a^2,b^3,(a*b)^5,w^2,x^2,y^2,z^2,w^-1*x^-1*w *x,w^-1*y^-1*w*y,w^-1*z^-1*w*z, x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z,a^-1*w*a*z^-1, a^-1*x*a*x^-1,a^-1*y*a*(w*x*y*z)^-1 ,a^-1*z*a*w^-1,b^-1*w*b*x^-1, b^-1*x*b*y^-1,b^-1*y*b*w^-1, b^-1*z*b*z^-1,r^3,s^3,t^3,u^3,v^3, r^-1*s^-1*r*s,r^-1*t^-1*r*t, r^-1*u^-1*r*u,r^-1*v^-1*r*v, s^-1*t^-1*s*t,s^-1*u^-1*s*u, s^-1*v^-1*s*v,t^-1*u^-1*t*u, t^-1*v^-1*t*v,u^-1*v^-1*u*v, a^-1*r*a*u^-1,a^-1*s*a*s^-1, a^-1*t*a*v^-1,a^-1*u*a*r^-1, a^-1*v*a*t^-1,b^-1*r*b*s^-1, b^-1*s*b*t^-1,b^-1*t*b*r^-1, b^-1*u*b*u^-1,b^-1*v*b*v^-1, w^-1*r*w*r^-1,w^-1*s*w*s, w^-1*t*w*t,w^-1*u*w*u,w^-1*v*w*v, x^-1*r*x*r,x^-1*s*x*s^-1, x^-1*t*x*t,x^-1*u*x*u,x^-1*v*x*v, y^-1*r*y*r,y^-1*s*y*s, y^-1*t*y*t^-1,y^-1*u*y*u, y^-1*v*y*v,z^-1*r*z*r,z^-1*s*z*s, z^-1*t*z*t,z^-1*u*z*u^-1, z^-1*v*z*v],[[b,a*b*a*b^-1*a,w,r]]]; end, [15]], "A5 2^4' 3^5",[7,5,2],1, 1,15], # 233280.2 [[4,960,1,14580,1,60], "A5 # 2^4 3^5 [1]",6,3, 1,[16,18]], # 233280.3 [[4,960,2,14580,1,60], "A5 # 2^4 3^5 [2]",6,3, 1,[10,18]] ]; PERFGRP[173]:=[# 237600.1 [[2,360,1,660,1], "A6 x L2(11)",40,1, [3,5],[6,11]] ]; PERFGRP[174]:=[# 240000.1 [[4,1920,1,7500,1,60], "A5 # 2^5 5^3 [1]",6,2, 1,[12,30]], # 240000.2 [[4,1920,2,7500,1,60], "A5 # 2^5 5^3 [2]",6,2, 1,[24,30]], # 240000.3 [[4,1920,3,7500,1,60], "A5 # 2^5 5^3 [3]",6,2, 1,[16,24,30]], # 240000.4 [[4,1920,4,7500,1,60], "A5 # 2^5 5^3 [4]",6,1, 1,[80,30]], # 240000.5 [[4,1920,5,7500,1,60], "A5 # 2^5 5^3 [5]",6,2, 1,[10,24,30]], # 240000.6 [[4,1920,6,7500,1,60], "A5 # 2^5 5^3 [6]",6,2, 1,[80,30]], # 240000.7 [[4,1920,7,7500,1,60], "A5 # 2^5 5^3 [7]",6,2, 1,[32,30]], # 240000.8 [[4,1920,1,7500,2,60], "A5 # 2^5 5^3 [8]",6,2, 1,[12,30]], # 240000.9 [[4,1920,2,7500,2,60], "A5 # 2^5 5^3 [9]",6,2, 1,[24,30]], # 240000.10 [[4,1920,3,7500,2,60], "A5 # 2^5 5^3 [10]",6,2, 1,[16,24,30]], # 240000.11 [[4,1920,4,7500,2,60], "A5 # 2^5 5^3 [11]",6,1, 1,[80,30]], # 240000.12 [[4,1920,5,7500,2,60], "A5 # 2^5 5^3 [12]",6,2, 1,[10,24,30]], # 240000.13 [[4,1920,6,7500,2,60], "A5 # 2^5 5^3 [13]",6,2, 1,[80,30]], # 240000.14 [[4,1920,7,7500,2,60], "A5 # 2^5 5^3 [14]",6,2, 1,[32,30]], # 240000.15 [[4,1920,3,15000,4,120,3,3], "A5 # 2^5 5^3 [15]",6,5, 1,[16,24,125]], # 240000.16 [[4,1920,4,15000,4,120,4,3], "A5 # 2^5 5^3 [16]",6,5, 1,[80,125]], # 240000.17 [[4,1920,5,15000,4,120,5,3], "A5 # 2^5 5^3 [17]",6,5, 1,[10,24,125]] ]; PERFGRP[175]:=[# 241920.1 [[1,"abdwxyz", function(a,b,d,w,x,y,z) return [[a^6*d^-1,b^4*d^-1,(a*b)^7,(a*b)^2*a*b^2*( a*b*a*b^-1)^2*(a*b)^2 *(a*b^-1)^2*a*b*a*b^-1*a^2*d, a^2*d*b*(a^2*d)^-1*b^-1,d^2, d^-1*a^-1*d*a,d^-1*b^-1*d*b,w^2, x^2,y^2,z^2,w*x*w*x,w*y*w*y,w*z*w*z,x*y*x*y, x*z*x*z,y*z*y*z,a^-1*w*a*y^-1, a^-1*x*a*z^-1,a^-1*y*a*w^-1, a^-1*z*a*x^-1,b^-1*w*b*(w*x*y*z)^-1 ,b^-1*x*b*y^-1,b^-1*y*b*(w*x)^-1, b^-1*z*b*(w*z)^-1], [[a^3,(b^-1*a)^2*(b*a)^2*b^2*a*b*a,w],[a,b], [a*b, b*a*b*a*b^2*a*b^-1*a*b*a*b^-1*a*b*a *b^2*d,a^2*d,w]]]; end, [45,16,240]], "A7 3^1 x 2^1 x 2^4",[23,5,1],6, 8,[45,16,240]], # 241920.2 [[1,"abdef", function(a,b,d,e,f) return [[a^2,b^4,(a*b)^7*d^-1*e,(a^-1*b^-1*a*b)^5, (a*b^2)^5*(e*f)^-1,(a*b*a*b*a*b^3)^5*f, (a*b*a*b*a*b^2*a*b^-1)^5*d^(-1*2),d^3, a^-1*d*a*d^-1,b^-1*d*b*d^-1,e^2, f^2,e^-1*f^-1*e*f,a^-1*e*a*e^-1, a^-1*f*a*f^-1,b^-1*e*b*e^-1, b^-1*f*b*f^-1], [[a*b*a,b^2*a*b^-1*a*b*a*b^2*a*b*d], [a*e,b*a*b*a*b^-1*a*b^2*f^-1]]]; end, [63,224],[[1,2]]], "L3(4) 3^1 x 2^1 x 2^1",[27,2,1],-12, 20,[63,224]], # 241920.3 [[1,"abdf", function(a,b,d,f) return [[a^2,b^4*f^(-1*2),(a*b)^7*d^-1,(a^-1*b^-1*a *b)^5*f^(-1*2),(a*b^2)^5*f^-1, (a*b*a*b*a*b^3)^5*f, (a*b*a*b*a*b^2*a*b^-1)^5*d^(-1*2),d^3, a^-1*d*a*d^-1,b^-1*d*b*d^-1,f^4, a^-1*f*a*f^-1,b^-1*f*b*f^-1], [[a*b*a,b^2*a*b^-1*a*b*a*b^2*a*b*d], [a,b*a*b*a*b^-1*a*b^2*f^-1]]]; end, [63,224],[[1,2]]], "L3(4) 3^1 x 2^1 A 2^1 I",[27,2,2],-12, 20,[63,224]], # 241920.4 [[1,"abde", function(a,b,d,e) return [[a^2,b^4*e^(-1*2),(a*b)^7*d^-1*e,(a^-1*b^-1 *a*b)^5*e^(-1*2),(a*b^2)^5*e^-1, (a*b*a*b*a*b^3)^5*e^(-1*2), (a*b*a*b*a*b^2*a*b^-1)^5*d^(-1*2),d^3, a^-1*d*a*d^-1,b^-1*d*b*d^-1, a^-1*e*a*e^-1,b^-1*e*b*e^-1], [[a*b*a,b^2*a*b^-1*a*b*a*b^2*a*b*d], [a*e^2,b^-1*a*b^-1*a*b*a*b^2]]]; end, [63,224],[[1,2]]], "L3(4) 3^1 x 2^1 A 2^1 II",[27,2,3],-12, 20,[63,224]], # 241920.5 [[2,336,1,720,1], "( L3(2) x A6 ) 2^2",[37,2,1],4, [2,3],[16,80]] ]; PERFGRP[176]:=[# 243000.1 [[4,9720,4,3000,2,120,3,1], "A5 2^1 # 3^4 5^2",6,1, 1,[45,25]], # 243000.2 [[1,"abstuvwxyz", function(a,b,s,t,u,v,w,x,y,z) return [[t^2,u^3,v^3,x^3,s^-2*t,a^3,w^3,b^-2*t,x^-1*w^-1*x*w,u*a^-1*v^-1*a, (t*y)^2,s^-1*u^-1*s*v^-1,w^-1*y*w*y^-1,u*v*u^-1*v^-1,s^-1*v*s*u, b^-1*w^-1*b*x^-1,b^-1*x^-1*b*w^-1,(t*z)^2,u*x^-1*u^-1*x,a*s^-1*a*s, t*u^-1*t*u,a^-1*x*a*x^-1,t*v^-1*t*v,u^-1*z*u*z^-1,x^-1*z*x*z^-1, v*x^-1*v^-1*x,u^-1*w*u*w^-1,a*t*a^-1*t,v^-1*y*v*y^-1,v*w^-1*v^-1*w, s^-1*x^-1*s*x^-1,u^-1*y*u*y^-1,x^-1*y*x*y^-1,y^-1*z^-1*y*z,t*w^-1*t*w, w^-1*z*w*z^-1,v^-1*z*v*z^-1,t*x^-1*t*x,x*w*s^-1*w^-1*s,s^-1*z*s*y^-1*z^-1, a*u*v*a^-1*u,a^-1*w*v*a*w^-1,s^-1*y*z*s*z,y^5,z^5,b^-1*y*b*y^-2, b^-1*z*b*z^2,a^-1*z*a*y^-1*z^-1*y^-1,a^-1*y*a*y*z^-1*y, x^-1*b^-1*u^-1*b*v^-1*w^-1,b^-1*x^-1*v^-1*b*u^-1*x,b^-1*s^-1*b*s*b*s^-1, a^-1*b^-1*(a^-1*b)^2], [[t,u,v,w,y,z,a^-1*x*u^-1,s^-1*b*s^-1],[a,b,s,t,u,v,w,x]]]; end, [15,25]], "PG243000.2",[0,0,0],1,1,[15,25]], # 243000.3 [[1,"abstuvwxyz", function(a,b,s,t,u,v,w,x,y,z) return [[t^2,u^3,v^3,x^3,w^3,t*u^-1*t*u,v*u^-1*v^-1*u,w^-1*u^-1*w*u,v*x^-1*v^-1*x, (t*z)^2,a*w^-1*a^-1*w,a*t*a^-1*t,s^-1*w*s*w,v^-1*z*v*z^-1,s^-1*t*s*t, u^-1*y*u*y^-1,t*x^-1*t*x,v^-1*y*v*y^-1,w^-1*y*w*y^-1,w*v*w^-1*v^-1, w*x^-1*w^-1*x,(t*y)^2,u^-1*z*u*z^-1,t*v^-1*t*v,b^-1*t*b*t,y^-1*z^-1*y*z, x^-1*y*x*y^-1,u*x^-1*u^-1*x,x^-1*z*x*z^-1,w^-1*z*w*z^-1,t*w^-1*t*w, a*w^-1*u*a^-1*v,b^-1*y*z*b*z,a^-1*w^-1*v*a*u,b^-1*t*u*b^-1*u, x*a^-1*x^-1*a*v^-1,b^-1*x^-1*b*v*u^-1,b^-1*u^-1*v*b*x^-1,b^-1*z*b*y^-1*z^-1, s^-1*w*v^-1*s*u,b^-1*u*b*w^-1*v^-1,s^-1*w^-1*u*s*v^-1,t*a^-3*w,z^5, a*s^-1*a*s*v,y^5,s^-1*z*s*z^2,a^-1*s^-1*a^-1*v*s,s^-1*y*s*y^-2, b^-1*x^-1*w^-1*b*w^-1*x^-1,w*a^-1*u*a*u*v^-1,a^-1*z*a*y^-1*z^2, a*w^-1*v^-1*a^-1*u*v^-1,s^-1*x*s*u^-1*v*x^-1,b^-1*x*w*b*w*x,t*s^-2*v*w*x^-1, a^-1*y*a*b^-1*y^-1*b*y,s^-1*b^-1*s^-1*b*w^-1*s*b*v,x*u^-1*a*b^-1*w*b*u*a^-1, (b^-1*a^-1)^2*b*a^-1*x*v], [[a,b,s,t,u,v,w,x],[t,v,w,x,y,z,t^-1*a*s,(u^-1*b)^a]]]; end, [25,30]], "PG243000.3",[0,0,0],1,1,[25,30]] ]; PERFGRP[177]:=[# 244800.1 [[2,60,1,4080,1], "A5 x L2(16)",40,1, [1,10],[5,17]] ]; PERFGRP[178]:=[# 244944.1 [[1,"abuvwxyz", function(a,b,u,v,w,x,y,z) return [[a^4,b^3,(a*b)^7,(a^-1*b^-1*a*b)^4*a^2,a^2*b *a^2*b^-1,u^3,v^3,w^3,x^3,y^3,z^3, u^-1*v^-1*u*v,u^-1*w^-1*u*w, u^-1*x^-1*u*x,u^-1*y^-1*u*y, u^-1*z^-1*u*z,v^-1*w^-1*v*w, v^-1*x^-1*v*x,v^-1*y^-1*v*y, v^-1*z^-1*v*z,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z, x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z, a^-1*u*a*(x*y^-1*z^-1)^-1, a^-1*v*a*(w*x^-1*y^-1)^-1, a^-1*w*a*(u*w^-1*x*y^-1*z^-1)^-1 ,a^-1*x*a*(v*w*x*y^-1)^-1, a^-1*y*a*(u*v*w*z^-1)^-1, a^-1*z*a*(u*x*y^-1*z)^-1, b^-1*u*b*(v*w^-1*x^-1)^-1, b^-1*v*b*(u*v^-1*w^-1)^-1, b^-1*w*b*(u^-1*v*w^-1*x^-1*z^-1) ^-1,b^-1*x*b*(u*v*w^-1*y^-1*z) ^-1,b^-1*y*b*(u*x^-1*y)^-1, b^-1*z*b*(v*w^-1*x*z)^-1], [[a*b,b*a*b^-1*a*b^-1*a*b*a*b^-1,u], [a,b^-1*a*b,z]]]; end, [16,63]], "L3(2) 2^1 x 3^6",[9,6,1],2, 2,[16,63]], # 244944.2 [[1,"abuvwxyz", function(a,b,u,v,w,x,y,z) return [[a^4,b^3,(a*b)^7,(a^-1*b^-1*a*b)^4*a^2,a^2*b *a^2*b^-1,u^3,v^3,w^3,x^3,y^3,z^3, u^-1*v^-1*u*v,u^-1*w^-1*u*w, u^-1*x^-1*u*x,u^-1*y^-1*u*y, u^-1*z^-1*u*z,v^-1*w^-1*v*w, v^-1*x^-1*v*x,v^-1*y^-1*v*y, v^-1*z^-1*v*z,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z, x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z,a^-1*u*a*w^-1, a^-1*v*a*v^-1,a^-1*w*a*u^-1, a^-1*x*a*z^-1,a^-1*y*a*y^-1, a^-1*z*a*x^-1,b^-1*u*b*v^-1, b^-1*v*b *(u^-1*v^-1*w^-1*x^-1*y^-1 *z^-1)^-1,b^-1*w*b*x^-1, b^-1*x*b*y^-1,b^-1*y*b*w^-1, b^-1*z*b*z^-1], [[a*b,b*a*b^-1*a*b^-1*a*b*a*b^-1,u], [b,a*b^-1*a*b*a,x*y^-1*z]]]; end, [16,21]], "L3(2) 2^1 x 3^6'",[9,6,2],2, 2,[16,21]] ]; PERFGRP[179]:=fail; PERFGRP[180]:=[# 246480.1 [[1,"abc", function(a,b,c) return [[c^39,c*b^9*c^-1*b^-1,b^79,a^2,c*a*c*a^-1, (b*a)^3],[[b,c]]]; end, [80],[0,3,3,4,0,2]], "L2(79)",22,-1, 40,80] ]; PERFGRP[181]:=[# 254016.1 [[2,504,1,504,1], "L2(8) x L2(8)",40,1, [4,4],[9,9]] ]; PERFGRP[182]:=[# 258048.1 [[1,"abcuvwxyzdef", function(a,b,c,u,v,w,x,y,z,d,e,f) return [[a^2,b^3,(a*b)^7,b^-1*(a*b)^3*c^-1,c*b^-1 *c*b*a^-1*b^-1*c^-1*b *c^-1*a,u^2,v^2,w^2,x^2,y^2,z^2,d^2,e^2, f^2,u^-1*v^-1*u*v,u^-1*w^-1*u*w, u^-1*x^-1*u*x,u^-1*y^-1*u*y, u^-1*z^-1*u*z,u^-1*d^-1*u*d, u^-1*e^-1*u*e,u^-1*f^-1*u*f, v^-1*w^-1*v*w,v^-1*x^-1*v*x, v^-1*y^-1*v*y,v^-1*z^-1*v*z, v^-1*d^-1*v*d,v^-1*e^-1*v*e, v^-1*f^-1*v*f,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z, w^-1*d^-1*w*d,w^-1*e^-1*w*e, w^-1*f^-1*w*f,x^-1*y^-1*x*y, x^-1*z^-1*x*z,x^-1*d^-1*x*d, x^-1*e^-1*x*e,x^-1*f^-1*x*f, y^-1*z^-1*y*z,y^-1*d^-1*y*d, y^-1*e^-1*y*e,y^-1*f^-1*y*f, z^-1*d^-1*z*d,z^-1*e^-1*z*e, z^-1*f^-1*z*f,d^-1*e^-1*d*e, d^-1*f^-1*d*f,e^-1*f^-1*e*f, a^-1*u*a*(u*x)^-1,a^-1*v*a*(v*y)^-1, a^-1*w*a*(w*z)^-1,a^-1*x*a*x^-1, a^-1*y*a*y^-1,a^-1*z*a*z^-1, a^-1*d*a*d^-1,a^-1*e*a*e^-1, a^-1*f*a*f^-1,b^-1*u*b*(x*y*d)^-1, b^-1*v*b*(y*z*e)^-1, b^-1*w*b*(x*y*z*f)^-1, b^-1*x*b*(v*w*x)^-1, b^-1*y*b*(u*v*w*y)^-1, b^-1*z*b*(u*w*z)^-1,b^-1*d*b*d^-1, b^-1*e*b*e^-1,b^-1*f*b*f^-1, c^-1*u*c*(v*d*f)^-1, c^-1*v*c*(w*d)^-1, c^-1*w*c*(u*v*e)^-1, c^-1*x*c*(x*z*d)^-1, c^-1*y*c*(x*e)^-1,c^-1*z*c*(y*f)^-1, c^-1*d*c*d^-1,c^-1*e*c*e^-1, c^-1*f*c*f^-1], [[b^-1*c,u*d,e,f],[b^-1*c,u*e,d,f], [b^-1*c,u*f,d,e]]]; end, [112,112,112],[[1,2]]], "L2(8) 2^6 E ( 2^1 x 2^1 x 2^1 )",[16,9,1],8, 4,[112,112,112]], # 258048.2 [[1,"abcuvwxyzdf", function(a,b,c,u,v,w,x,y,z,d,f) return [[a^2*f,b^3,(a*b)^7,b^-1*(a*b)^3*c^-1,b^-1 *c^-1*b*c^-1*a^-1*c *b^-1*c*b*a*(y*z*d*f^2)^-1,d^2,f^4, u^2,v^2*f^2,w^2,x^2*f^2,y^2,z^2*f^2, u^-1*v^-1*u*v,u^-1*w^-1*u*w, u^-1*x^-1*u*x*f^2,u^-1*y^-1*u*y *f^2,u^-1*z^-1*u*z,u^-1*d^-1*u*d, u^-1*f^-1*u*f,v^-1*w^-1*v*w, v^-1*x^-1*v*x*f^2,v^-1*y^-1*v*y, v^-1*z^-1*v*z,v^-1*d^-1*v*d, v^-1*f^-1*v*f,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z*f^2, w^-1*d^-1*w*d,w^-1*f^-1*w*f, x^-1*y^-1*x*y,x^-1*z^-1*x*z, x^-1*d^-1*x*d,x^-1*f^-1*x*f, y^-1*z^-1*y*z,y^-1*d^-1*y*d, y^-1*f^-1*y*f,z^-1*d^-1*z*d, z^-1*f^-1*z*f,a^-1*u*a*(u*x)^-1, a^-1*v*a*(v*y*f^2)^-1, a^-1*w*a*(w*z)^-1, a^-1*x*a*(x*f^2)^-1,a^-1*y*a*y^-1, a^-1*z*a*(z*f^2)^-1,a^-1*d*a*d^-1, a^-1*f*a*f^-1, b^-1*u*b*(x*y*f^-1)^-1, b^-1*v*b*(y*z*f^2)^-1, b^-1*w*b*(x*y*z*d*f^2)^-1, b^-1*x*b*(v*w*x)^-1, b^-1*y*b*(u*v*w*y*d*f^2)^-1, b^-1*z*b*(u*w*z*f^-1)^-1, b^-1*d*b*d^-1,b^-1*f*b*f^-1, c^-1*u*c*(v*d*f^-1)^-1, c^-1*v*c*(w*d*f^-1)^-1, c^-1*w*c*(u*v*f)^-1, c^-1*x*c*(x*z*d*f)^-1, c^-1*y*c*(x*d*f)^-1, c^-1*z*c*(y*f^-1)^-1, c^-1*d*c*d^-1,c^-1*f*c*f^-1], [[c^-1*x^-1*a, c*b]]]; end, [576],[[1,2],[11,11]]], "L2(8) N ( 2^6 E ( 2^1 x 2^1 A ) ) C 2^1",[16,9,2],8, 4,[576]], # 258048.3 [[1,"abcuvwxyzdef", function(a,b,c,u,v,w,x,y,z,d,e,f) return [[a^2*(e*f^-1)^-1,b^3,(a*b)^7,b^-1*(a*b)^3 *c^-1, b^-1*c^-1*b*c^-1*a^-1*c*b^-1*c *b*a*(y*z*d)^-1,d^2,e^2,f^2,u^2,v^2,w^2, x^2,y^2,z^2,u^-1*v^-1*u*v, u^-1*w^-1*u*w,u^-1*x^-1*u*x, u^-1*y^-1*u*y,u^-1*z^-1*u*z, u^-1*d^-1*u*d,u^-1*e^-1*u*e, u^-1*f^-1*u*f,v^-1*w^-1*v*w, v^-1*x^-1*v*x,v^-1*y^-1*v*y, v^-1*z^-1*v*z,v^-1*d^-1*v*d, v^-1*e^-1*v*e,v^-1*f^-1*v*f, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,w^-1*d^-1*w*d, w^-1*e^-1*w*e,w^-1*f^-1*w*f, x^-1*y^-1*x*y,x^-1*z^-1*x*z, x^-1*d^-1*x*d,x^-1*e^-1*x*e, x^-1*f^-1*x*f,y^-1*z^-1*y*z, y^-1*d^-1*y*d,y^-1*e^-1*y*e, y^-1*f^-1*y*f,z^-1*d^-1*z*d, z^-1*e^-1*z*e,z^-1*f^-1*z*f, a^-1*u*a*(u*x)^-1,a^-1*v*a*(v*y)^-1, a^-1*w*a*(w*z)^-1,a^-1*x*a*x^-1, a^-1*y*a*y^-1,a^-1*z*a*z^-1, a^-1*d*a*d^-1,a^-1*e*a*e^-1, a^-1*f*a*f^-1, b^-1*u*b*(x*y*e*f^-1)^-1, b^-1*v*b*(y*z*e)^-1, b^-1*w*b*(x*y*z*d*e)^-1, b^-1*x*b*(v*w*x*e)^-1, b^-1*y*b*(u*v*w*y*d*e)^-1, b^-1*z*b*(u*w*z*f^-1)^-1, b^-1*d*b*d^-1,b^-1*e*b*e^-1, b^-1*f*b*f^-1, c^-1*u*c*(v*d*e*f^-1)^-1, c^-1*v*c*(w*d*f^-1)^-1, c^-1*w*c*(u*v*e*f)^-1, c^-1*x*c*(x*z*d*e*f)^-1, c^-1*y*c*(x*d*f)^-1, c^-1*z*c*(y*e*f^-1)^-1, c^-1*d*c*d^-1,c^-1*e*c*e^-1, c^-1*f*c*f^-1], [[b^-1*c,u*f,d,e],[b^-1*c*d,u*d,e,f], [b^-1*c*e,u,d,f]]]; end, [112,112,112],[[1,2]]], "L2(8) N 2^6 E ( 2^1 x 2^1 x 2^1 )",[16,9,3],8, 4,[112,112,112]], # 258048.4 [[1,"abcstuvwxyzd", function(a,b,c,s,t,u,v,w,x,y,z,d) return [[a^2,b^3,(a*b)^7,b^-1*(a*b)^3*c^-1,b^-1*c ^-1*b*c^-1*a^-1*c*b^-1 *c*b*a,d^2,s^2,t^2,u^2,v^2,w^2,x^2,y^2,z^2, d^-1*s^-1*d*s,d^-1*t^-1*d*t, d^-1*u^-1*d*u,d^-1*v^-1*d*v, d^-1*w^-1*d*w,d^-1*x^-1*d*x, d^-1*y^-1*d*y,d^-1*z^-1*d*z, s^-1*t^-1*s*t*d,s^-1*u^-1*s*u*d, s^-1*v^-1*s*v*d,s^-1*w^-1*s*w*d, s^-1*x^-1*s*x*d,s^-1*y^-1*s*y*d, s^-1*z^-1*s*z*d,t^-1*u^-1*t*u*d, t^-1*v^-1*t*v*d,t^-1*w^-1*t*w*d, t^-1*x^-1*t*x*d,t^-1*y^-1*t*y*d, t^-1*z^-1*t*z*d,u^-1*v^-1*u*v*d, u^-1*w^-1*u*w*d,u^-1*x^-1*u*x*d, u^-1*y^-1*u*y*d,u^-1*z^-1*u*z*d, v^-1*w^-1*v*w*d,v^-1*x^-1*v*x*d, v^-1*y^-1*v*y*d,v^-1*z^-1*v*z*d, w^-1*x^-1*w*x*d,w^-1*y^-1*w*y*d, w^-1*z^-1*w*z*d,x^-1*y^-1*x*y*d, x^-1*z^-1*x*z*d,y^-1*z^-1*y*z*d, a^-1*s*a*s^-1,a^-1*t*a*v^-1, a^-1*u*a*y^-1,a^-1*v*a*t^-1, a^-1*w*a*x^-1,a^-1*x*a*w^-1, a^-1*y*a*u^-1, a^-1*z*a*(s*t*u*v*w*x*y*z)^-1, a^-1*d*a*d^-1,b^-1*s*b*u^-1, b^-1*t*b*s^-1,b^-1*u*b*t^-1, b^-1*v*b*x^-1,b^-1*w*b*v^-1, b^-1*x*b*w^-1,b^-1*y*b*z^-1, b^-1*z*b*(s*t*u*v*w*x*y*z)^-1, b^-1*d*b*d^-1,c^-1*s*c*s^-1, c^-1*t*c*t^-1,c^-1*u*c*y^-1, c^-1*v*c*w^-1,c^-1*w*c*u^-1, c^-1*x*c*z^-1, c^-1*y*c*(s*t*u*v*w*x*y*z)^-1, c^-1*z*c*v^-1,c^-1*d*c*d^-1], [[a,b]]]; end, [512]], "L2(8) 2^8 C 2^1",[16,9,4],2, 4,512] ]; PERFGRP[183]:=[# 259200.1 [[2,120,1,2160,1], "( A5 x A6 3^1 ) 2^2",[33,2,1],12, [1,3],[24,18,80]], # 259200.2 [[2,360,1,720,1], "( A6 x A6 ) 2^1 [1]",40,2, [3,3],[6,80]], # 259200.3 [[3,720,1,720,1,"d1","d2"], "( A6 x A6 ) 2^1 [2]",40,2, [3,3],3200] ]; PERFGRP[184]:=[# 262080.1 [[1,"abc", function(a,b,c) return [[c^63,b^2,c^(-1*7)*b*c^2*b*c^2*b*c^3*b,c^(-1*6)*b*c *b*c^3*b*c*b*c*b,a^2,c*a*c*a^-1, (a*b)^3, c^3*a*(b*c*b*c^2)^2*b*c^-1*b*c^(-1*2)*b*a], [[b,c]]]; end, [65]], "L2(64)",22,-1, 41,65], # 262080.2 [[2,120,1,2184,1], "( A5 x L2(13) ) 2^2",40,4, [1,6],[24,56]] ]; PERFGRP[185]:=[# 262440.1 [[1,"abuvwxyzd", function(a,b,u,v,w,x,y,z,d) return [[a^4,b^3,(a*b)^5,a^2*b^-1*a^2*b,d^3,a^-1*d*a *d^-1,b^-1*d*b*d^-1, u^-1*d*u*d^-1,v^-1*d*v*d^-1, w^-1*d*w*d^-1,x^-1*d*x*d^-1, y^-1*d*y*d^-1,z^-1*d*z*d^-1,u^3, v^3,w^3,x^3,y^3,z^3,u^-1*v^-1*u*v*d^-1, u^-1*w^-1*u*w*d,u^-1*x^-1*u*x, u^-1*y^-1*u*y*d^-1, u^-1*z^-1*u*z*d,v^-1*w^-1*v*w, v^-1*x^-1*v*x*d^-1, v^-1*y^-1*v*y*d,v^-1*z^-1*v*z *d^-1,w^-1*x^-1*w*x, w^-1*y^-1*w*y*d,w^-1*z^-1*w*z *d^-1,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z*d, a^-1*u*a*(v*d^-1)^-1, a^-1*v*a*(u^-1*d)^-1, a^-1*w*a*(u^-1*x*d^-1)^-1, a^-1*x*a*(v*w^-1)^-1, a^-1*y*a*(u*w^-1*x^-1*y^-1*z^-1) ^-1, a^-1*z*a*(w^-1*y^-1*z*d^-1)^-1, b^-1*u*b*(u^-1*v^-1*w)^-1, b^-1*v*b*(u^-1*v*w)^-1, b^-1*w*b*u^-1,b^-1*x*b*(w*y)^-1, b^-1*y*b*(u^-1*w*x*y*z)^-1, b^-1*z*b*(w*y*z^-1)^-1],[[a,b]]]; end, [2187]], "A5 2^1 3^6' C 3^1",[2,7,1],3, 1,2187], # 262440.2 [[1,"abcuvwxyz", function(a,b,c,u,v,w,x,y,z) return [[a^2,b^3,c^3,(b*c)^4,(b*c^-1)^5,a^-1*b^-1*c *b*c*b^-1*c*b*c^-1,u^3,v^3,w^3, x^3,y^3,z^3,u^-1*v^-1*u*v, u^-1*w^-1*u*w,u^-1*x^-1*u*x, u^-1*y^-1*u*y,u^-1*z^-1*u*z, v^-1*w^-1*v*w,v^-1*x^-1*v*x, v^-1*y^-1*v*y,v^-1*z^-1*v*z, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*u*a*(u^2*v*w^2*x^2*y)^-1, a^-1*v*a*(u*v*w^2*z)^-1, a^-1*w*a*(u^2*w*x*y^2*z^2)^-1, a^-1*x*a*(v^2*w*y^2)^-1, a^-1*y*a*(u*v^2*w^2*y^2*z)^-1, a^-1*z*a*(u^2*v^2*x^2*y*z)^-1, b^-1*u*b*(u*w^2*y)^-1, b^-1*v*b*(v*x^2*z)^-1, b^-1*w*b*(w*y)^-1,b^-1*x*b*(x*z)^-1, b^-1*y*b*y^-1,b^-1*z*b*z^-1, c^-1*u*c*u^-1,c^-1*v*c*v^-1, c^-1*w*c*(v*w)^-1, c^-1*x*c*(u*v^2*x)^-1, c^-1*y*c*(u*v^2*x^2*y)^-1, c^-1*z*c*(u^2*v^2*w^2*x*z)^-1], [[b,c*a*b*c,y,z,w,x]]]; end, [90]], "A6 3^6",[14,6,1],1, 3,90], # 262440.3 [[1,"abcuvwxyz", function(a,b,c,u,v,w,x,y,z) return [[a^2*(v^-1*w*x*y^-1)^-1,b^3*z^-1,c^3*v ,(b*c)^4*(v*x^-1*y^-1)^-1, (b*c^-1)^5*(v*x^-1*y)^-1, a^-1*b^-1*c*b*c*b^-1*c*b*c^-1,u^3, v^3,w^3,x^3,y^3,z^3,u^-1*v^-1*u*v, u^-1*w^-1*u*w,u^-1*x^-1*u*x, u^-1*y^-1*u*y,u^-1*z^-1*u*z, v^-1*w^-1*v*w,v^-1*x^-1*v*x, v^-1*y^-1*v*y,v^-1*z^-1*v*z, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*u*a*(u^-1*v*w^-1*x^-1*y)^-1 ,a^-1*v*a*(u*v*w^-1*z)^-1, a^-1*w*a*(u^-1*w*x*y^-1*z^-1)^-1 ,a^-1*x*a*(v^-1*w*y^-1)^-1, a^-1*y*a*(u*v^-1*w^-1*y^-1*z)^-1 ,a^-1*z*a*(u^-1*v^-1*x^-1*y*z) ^-1,b^-1*u*b*(u*w^-1*y)^-1, b^-1*v*b*(v*x^-1*z)^-1, b^-1*w*b*(w*y)^-1,b^-1*x*b*(x*z)^-1, b^-1*y*b*y^-1,b^-1*z*b*z^-1, c^-1*u*c*u^-1,c^-1*v*c*v^-1, c^-1*w*c*(v*w)^-1, c^-1*x*c*(u*v^-1*x)^-1, c^-1*y*c*(u*v^-1*x^-1*y)^-1, c^-1*z*c*(u^-1*v^-1*w^-1*x*z)^-1 ],[[b,c*a*b*c,y,z,w,x]]]; end, [90]], "A6 N 3^6",[14,6,2],1, 3,90], # 262440.4 [[1,"abcdwxyze", function(a,b,c,d,w,x,y,z,e) return [[a^2*d^-1,b^3,c^3*(w*x*y^-1)^-1,(b*c)^4, (b*c^-1)^5,a^-1*b^-1*c*b*c*b^-1*c*b *c^-1,e^3,a^-1*e*a*e^-1, b^-1*e*b*e^-1,c^-1*e*c*e^-1, d^-1*e*d*e^-1,w^-1*e*w*e^-1, x^-1*e*x*e^-1,y^-1*e*y*e^-1, z^-1*e*z*e^-1,d^3*e^-1,w^3,x^3,y^3, z^3,d^-1*w^-1*d*w,d^-1*x^-1*d*x, d^-1*y^-1*d*y,d^-1*z^-1*d*z, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*d*a*d^-1,a^-1*w*a*z^-1, a^-1*x*a*x^-1, a^-1*y*a*(w^-1*x^-1*y^-1*z^-1) ^-1,a^-1*z*a*w^-1, b^-1*d*b*(d*w*y^-1*z*e)^-1, b^-1*w*b*(x*e)^-1, b^-1*x*b*(y*e^-1)^-1, b^-1*y*b*w^-1, b^-1*z*b*(z*e^-1)^-1, c^-1*d*c*(d*x^-1*z^-1*e)^-1, c^-1*w*c*(w^-1*x*y^-1*z^-1*e^-1) ^-1,c^-1*x*c*(x^-1*z*e^-1)^-1, c^-1*y*c*(w*x^-1*e)^-1, c^-1*z*c*(x^-1*e)^-1], [[a*b,b*a*b*a*b^-1*a*b^-1,w*e]]]; end, [324]], "A6 ( 3^1 E 3^4' E 3^1 ) A",[14,6,3],3, 3,324], # 262440.5 [[1,"abcwxyzef", function(a,b,c,w,x,y,z,e,f) return [[a^2,b^3,c^3,(b*c)^4,(b*c^-1)^5,a^-1*b^-1*c *b*c*b^-1*c*b*c^-1,w^3,x^3,y^3, z^3,e^3,f^3,w^-1*e^-1*w*e, x^-1*e^-1*x*e,y^-1*e^-1*y*e, z^-1*e^-1*z*e,w^-1*f^-1*w*f, x^-1*f^-1*x*f,y^-1*f^-1*y*f, z^-1*f^-1*z*f,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z, x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z,a^-1*w*a*z^-1, a^-1*x*a*x^-1, a^-1*y*a*(w^-1*x^-1*y^-1*z^-1) ^-1,a^-1*z*a*w^-1, a^-1*e*a*e^-1,a^-1*f*a*f^-1, b^-1*w*b*x^-1, b^-1*x*b*(y*e^-1)^-1, b^-1*y*b*(w*e)^-1,b^-1*z*b*(z*e)^-1, b^-1*e*b*e^-1,b^-1*f*b*f^-1, c^-1*w*c*(w^-1*x*y^-1*z^-1*f)^-1 ,c^-1*x*c*(x^-1*z*f)^-1, c^-1*y*c*(w*x^-1*f)^-1, c^-1*z*c*(x^-1*f^-1)^-1, c^-1*e*c*e^-1,c^-1*f*c*f^-1], [[a,b,w],[a,c,w]]]; end, [18,18]], "A6 3^4' E ( 3^1 x 3^1 )",[14,6,4],9, 3,[18,18]], # 262440.6 [[1,"abcwxyzdf", function(a,b,c,w,x,y,z,d,f) return [[a^2*d^-1,b^3,c^3,(b*c)^4,(b*c^-1)^5,a^-1 *b^-1*c*b*c*b^-1*c*b*c^-1, b^-1*d^-1*b*d,c^-1*d^-1*c*d,w^3, x^3,y^3,z^3,d^3,f^3,w^-1*d^-1*w*d, x^-1*d^-1*x*d,y^-1*d^-1*y*d, z^-1*d^-1*z*d,d^-1*f^-1*d*f, w^-1*f^-1*w*f,x^-1*f^-1*x*f, y^-1*f^-1*y*f,z^-1*f^-1*z*f, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*z^-1,a^-1*x*a*x^-1, a^-1*y*a*(w^-1*x^-1*y^-1*z^-1) ^-1,a^-1*z*a*w^-1, a^-1*f*a*f^-1,b^-1*w*b*x^-1, b^-1*x*b*y^-1,b^-1*y*b*w^-1, b^-1*z*b*z^-1,b^-1*f*b*f^-1, c^-1*w*c*(w^-1*x*y^-1*z^-1*f)^-1 ,c^-1*x*c*(x^-1*z*f)^-1, c^-1*y*c*(w*x^-1*f)^-1, c^-1*z*c*(x^-1*f^-1)^-1, c^-1*f*c*f^-1],[[a,b,w],[a*d,c*d,w]]]; end, [18,18]], "A6 3^1 x ( 3^4' E 3^1 ) I",[14,6,5],9, 3,[18,18]], # 262440.7 [[1,"abcwxyzde", function(a,b,c,w,x,y,z,d,e) return [[a^2*d^-1,b^3,c^3,(b*c)^4,(b*c^-1)^5,a^-1 *b^-1*c*b*c*b^-1*c*b*c^-1, b^-1*d^-1*b*d,c^-1*d^-1*c*d,d^3, w^3,x^3,y^3,z^3,e^3,w^-1*d^-1*w*d, x^-1*d^-1*x*d,y^-1*d^-1*y*d, z^-1*d^-1*z*d,e^-1*d^-1*e*d, w^-1*e^-1*w*e,x^-1*e^-1*x*e, y^-1*e^-1*y*e,z^-1*e^-1*z*e, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*z^-1,a^-1*x*a*x^-1, a^-1*y*a*(w^-1*x^-1*y^-1*z^-1) ^-1,a^-1*z*a*w^-1, a^-1*e*a*e^-1,b^-1*w*b*x^-1, b^-1*x*b*(y*e^-1)^-1, b^-1*y*b*(w*e)^-1,b^-1*z*b*(z*e)^-1, b^-1*e*b*e^-1, c^-1*w*c*(w^-1*x*y^-1*z^-1*e^-1) ^-1,c^-1*x*c*(x^-1*z*e^-1)^-1, c^-1*y*c*(w*x^-1*e^-1)^-1, c^-1*z*c*(x^-1*e)^-1, c^-1*e*c*e^-1], [[a*b,b*a*b*a*b^-1*a*b^-1,w*e,d], [a*d,c*d,w]]]; end, [108,18]], "A6 3^1 x ( 3^4' E 3^1 ) II",[14,6,6],9, 3,[108,18]] ]; PERFGRP[186]:=[# 263424.1 [[4,5376,1,16464,2,336,1,1], "L3(2) # 2^5 7^2",12,2, 2,[16,16,49]] ]; PERFGRP[187]:=[# 265680.1 [[1,"abc", function(a,b,c) return [[c^40,b^3,c^(-1*12)*b*c*b*c^11*b^-1,c^20*b*c^20 *b^(-1*2),a^2,c*a*c*a^-1,(b*a)^3, c^2*b^2*c^2*b*c*a*b*a*c^3*b*c*a*b^(-1*2) *c^(-1*2)*b^-1*a],[[b,c]]]; end, [82],[0,0,3,2]], "L2(81)",22,-1, 42,82] ]; PERFGRP[188]:=[# 276480.1 [[4,92160,1,1080,2,360,1,1], "A6 3^1 x 2^4 x 2^4",[13,8,1],3, 3,[16,16,18]], # 276480.2 [[4,92160,2,1080,2,360,2,1], "A6 3^1 x 2^4 x 2^4'",[13,8,2],3, 3,[16,16,18]] ]; PERFGRP[189]:=[# 285852.1 [[1,"abc", function(a,b,c) return [[c^41,c*b^4*c^-1*b^-1,b^83,a^2,c*a*c*a^-1, (b*a)^3],[[b,c]]]; end, [84]], "L2(83)",22,-1, 43,84] ]; PERFGRP[190]:=[# 288120.1 [[1,"abwxyz", function(a,b,w,x,y,z) return [[a^4,b^3,(a*b)^5,a^2*b*a^2*b^-1,w^7,x^7,y^7,z^7, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*z^-1,a^-1*x*a*x^-1, a^-1*y*a*w*x*y*z,a^-1*z*a*w^-1, b^-1*w*b*x^-1,b^-1*x*b*y^-1, b^-1*y*b*w^-1,b^-1*z*b*z^-1], [[a*b,w],[b,a*b*a*b^-1*a,w*x^-1]]]; end, [24,35]], "A5 2^1 x 7^4",[4,4,1],2, 1,[24,35]], # 288120.2 [[1,"abwxyz", function(a,b,w,x,y,z) return [[a^4,b^3,(a*b)^5,a^2*b^-1*a^2*b,w^7,x^7,y^7,z^7, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*(w^(-1*3)*x)^-1, a^-1*x*a*(w^(-1*3)*x^3)^-1, a^-1*y*a*(w^(-1*2)*x*y^(-1*2)*z^3)^-1, a^-1*z*a*(x^(-1*2)*y^3*z^2)^-1, b^-1*w*b*(w^(-1*3)*y^2)^-1, b^-1*x*b*(w^(-1*3)*x^-1*y^(-1*3))^-1, b^-1*y*b*(w^2*x*y^(-1*3))^-1, b^-1*z*b*(w^2*x*y^3*z)^-1], [[b,a*b*a*b^-1*a,y*z^-1]]]; end, [245]], "A5 2^1 7^4'",[4,4,2],1, 1,245], # 288120.3 [[1,"abwxyz", function(a,b,w,x,y,z) return [[a^4,b^3,(a*b)^5,a^2*b^-1*a^2*b,w^7,x^7,y^7,z^7, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*y,a^-1*x*a*z, a^-1*y*a*w^-1,a^-1*z*a*x^-1, b^-1*w*b*w^(-1*2),b^-1*x*b*x^(-1*2), b^-1*y*b*(w^3*x^(-1*2)*y^(-1*3))^-1, b^-1*z*b*(w^-1*x^(-1*2)*z^(-1*3))^-1], [[b,a*b*a*b^-1*a,w]]]; end, [245]], "A5 2^1 7^4''",[4,4,3],1, 1,245] ]; PERFGRP[191]:=[# 291600.1 [[2,60,1,4860,1], "( A5 x A5 ) # 3^4 [1]",[30,4,1],1, [1,1],[5,15]], # 291600.2 [[2,60,1,4860,2], "( A5 x A5 ) # 3^4 [2]",[30,4,2],1, [1,1],[5,60]] ]; PERFGRP[192]:=[# 293760.1 [[2,60,1,4896,1], "( A5 x L2(17) ) 2^1 [1]",40,2, [1,7],[5,288]], # 293760.2 [[2,120,1,2448,1], "( A5 x L2(17) ) 2^1 [2]",40,2, [1,7],[24,18]], # 293760.3 [[3,120,1,4896,1,"d1","d2"], "( A5 x L2(17) ) 2^1 [3]",40,2, [1,7],3456] ]; PERFGRP[193]:=[# 300696.1 [[1,"abc", function(a,b,c) return [[c^33*a^2,c*b^4*c^-1*b^-1,b^67,a^4,a^2*b^(-1 *1)*a^2*b,a^2*c^-1*a^2*c, c*a*c*a^-1,(b*a)^3],[[b,c^2]]]; end, [136]], "L2(67) 2^1 = SL(2,67)",22,-2, 35,136] ]; PERFGRP[194]:=[# 302400.1 [[2,60,1,5040,1], "( A5 x A7 ) 2^1 [1]",40,2, [1,8],[5,240]], # 302400.2 [[2,120,1,2520,1], "( A5 x A7 ) 2^1 [2]",40,2, [1,8],[24,7]], # 302400.3 [[3,120,1,5040,1,"d1","d2"], "( A5 x A7 ) 2^1 [3]",40,2, [1,8],2880] ]; PERFGRP[195]:=[# 311040.1 [[1,"abdwxyzstuv", function(a,b,d,w,x,y,z,s,t,u,v) return [[a^4,b^3,(a*b)^5,a^2*b*a^2*b^-1,d^2,a^-1*d ^-1*a*d,b^-1*d^-1*b*d, d^-1*w^-1*d*w,d^-1*x^-1*d*x, d^-1*y^-1*d*y,d^-1*z^-1*d*z,w^2, x^2,y^2,z^2,(w*x)^2*d,(w*y)^2*d,(w*z)^2*d, (x*y)^2*d,(x*z)^2*d,(y*z)^2*d,a^-1*w*a*z^-1 ,a^-1*x*a*x^-1, a^-1*y*a*(w*x*y*z)^-1,a^-1*z*a*w^-1 ,b^-1*w*b*x^-1,b^-1*x*b*y^-1, b^-1*y*b*w^-1,b^-1*z*b*z^-1,s^3, t^3,u^3,v^3,s^-1*t^-1*s*t, s^-1*u^-1*s*u,s^-1*v^-1*s*v, t^-1*u^-1*t*u,t^-1*v^-1*t*v, u^-1*v^-1*u*v,a^-1*s*a*(s*t*u*v)^-1 ,a^-1*t*a*(s^-1*t*u*v^-1)^-1, a^-1*u*a*(s^-1*u^-1*v)^-1, a^-1*v*a*(t*u^-1*v^-1)^-1, b^-1*s*b*(s^-1*t^-1*u*v^-1)^-1, b^-1*t*b*(s^-1*v^-1)^-1, b^-1*u*b*(s*t^-1*u^-1*v^-1)^-1, b^-1*v*b*(t^-1*u^-1)^-1, d^-1*s*d*s,d^-1*t*d*t,d^-1*u*d*u, d^-1*v*d*v,w^-1*s*w*s^-1, w^-1*t*w*(s^-1*t*v)^-1, w^-1*u*w*(s*t*u^-1*v^-1)^-1, w^-1*v*w*(s^-1*v^-1)^-1, x^-1*s*x*(s*t*u*v^-1)^-1, x^-1*t*x*t^-1, x^-1*u*x*(s^-1*v^-1)^-1, x^-1*v*x*(s^-1*t^-1*u*v)^-1, y^-1*s*y*(s*v^-1)^-1, y^-1*t*y*(t*u*v^-1)^-1,y^-1*u*y*u, y^-1*v*y*v, z^-1*s*z*(s*t^-1*u^-1*v^-1)^-1, z^-1*t*z*(s*u*v)^-1, z^-1*u*z*(t*u^-1*v)^-1, z^-1*v*z*(s^-1*t*u^-1)^-1], [[a*b,w,s],[a,b,w]]]; end, [24,81]], "A5 2^1 x ( 2^4' C 2^1 ) 3^4",[7,4,1],2, 1,[24,81]], # 311040.2 [[4,3840,1,4860,1,60], "A5 # 2^6 3^4 [1]",6,4, 1,[64,15]], # 311040.3 [[4,3840,2,4860,1,60], "A5 # 2^6 3^4 [2]",6,4, 1,[64,15]], # 311040.4 [[4,3840,3,4860,1,60], "A5 # 2^6 3^4 [3]",6,4, 1,[24,15]], # 311040.5 [[4,3840,4,4860,1,60], "A5 # 2^6 3^4 [4]",6,4, 1,[48,15]], # 311040.6 [[4,3840,5,4860,1,60], "A5 # 2^6 3^4 [5]",6,4, 1,[24,12,15]], # 311040.7 [[4,3840,6,4860,1,60], "A5 # 2^6 3^4 [6]",6,2, 1,[48,15]], # 311040.8 [[4,3840,7,4860,1,60], "A5 # 2^6 3^4 [7]",6,4, 1,[32,24,15]], # 311040.9 [[4,3840,1,4860,2,60], "A5 # 2^6 3^4 [8]",6,4, 1,[64,60]], # 311040.10 [[4,3840,2,4860,2,60], "A5 # 2^6 3^4 [9]",6,4, 1,[64,60]], # 311040.11 [[4,3840,3,4860,2,60], "A5 # 2^6 3^4 [10]",6,4, 1,[24,60]], # 311040.12 [[4,3840,4,4860,2,60], "A5 # 2^6 3^4 [11]",6,4, 1,[48,60]], # 311040.13 [[4,3840,5,4860,2,60], "A5 # 2^6 3^4 [12]",6,4, 1,[24,12,60]], # 311040.14 [[4,3840,6,4860,2,60], "A5 # 2^6 3^4 [13]",6,2, 1,[48,60]], # 311040.15 [[4,3840,7,4860,2,60], "A5 # 2^6 3^4 [14]",6,4, 1,[32,24,60]], # 311040.16 [[4,3840,5,9720,4,120,5,3], "A5 # 2^6 3^4 [15]",6,2, 1,[24,12,45]], # 311040.17 [[4,3840,6,9720,4,120,6,3], "A5 # 2^6 3^4 [16]",6,2, 1,[48,45]], # 311040.18 [[4,3840,7,9720,4,120,7,3], "A5 # 2^6 3^4 [17]",6,2, 1,[32,24,45]] ]; PERFGRP[196]:=[# 320760.1 [[1,"abvwxyz", function(a,b,v,w,x,y,z) return [[a^4,b^3,(a*b)^11,(a*b)^4*(a*b^-1)^5*(a*b)^4*(a *b^-1)^5*a^2,a^2*b*a^2*b^-1,v^3,w^3, x^3,y^3,z^3,v^-1*w^-1*v*w, v^-1*x^-1*v*x,v^-1*y^-1*v*y, v^-1*z^-1*v*z,w^-1*x^-1*w*x, w^-1*y^-1*w*y,w^-1*z^-1*w*z, x^-1*y^-1*x*y,x^-1*z^-1*x*z, y^-1*z^-1*y*z,a^-1*v*a*v^-1, a^-1*w*a*w^-1, a^-1*x*a*(v^2*x^2*y)^-1, a^-1*y*a*y^-1,a^-1*z*a*(w*y*z^2)^-1 ,b^-1*v*b*w^-1,b^-1*w*b*x^-1, b^-1*x*b*v^-1,b^-1*y*b*(y^2*z)^-1, b^-1*z*b*y^(-1*2)], [[a*b,(b*a)^2*(b^-1*a)^4*b^-1*a^2,v], [b,a*b*a*b^-1*a,y*z]]]; end, [24,33]], "L2(11) 2^1 3^5",[18,5,1],2, 5,[24,33]] ]; PERFGRP[197]:=[# 322560.1 [[1,"abduvwxyz", function(a,b,d,u,v,w,x,y,z) return [[a^2*d^-1,b^4*d^-1,(a*b)^7,(a*b)^2*a*b^2*( a*b*a*b^-1)^2*(a*b)^2 *(a*b^-1)^2*a*b*a*b^-1,d^2, a^-1*d*a*d^-1,b^-1*d*b*d^-1, u^-1*d*u*d^-1,v^-1*d*v*d^-1, w^-1*d*w*d^-1,x^-1*d*x*d^-1, y^-1*d*y*d^-1,z^-1*d*z*d^-1,u^2, v^2,w^2,x^2,y^2,z^2,u^-1*v^-1*u*v, u^-1*w^-1*u*w,u^-1*x^-1*u*x, u^-1*y^-1*u*y,u^-1*z^-1*u*z, v^-1*w^-1*v*w,v^-1*x^-1*v*x, v^-1*y^-1*v*y,v^-1*z^-1*v*z, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*u*a*u^-1,a^-1*v*a*v^-1, a^-1*w*a*y^-1,a^-1*x*a*x^-1, a^-1*y*a*w^-1, a^-1*z*a*(u*v*w*x*y*z)^-1, b^-1*u*b*w^-1,b^-1*v*b*z^-1, b^-1*w*b*v^-1,b^-1*x*b*y^-1, b^-1*y*b*x^-1,b^-1*z*b*u^-1], [[b^2*a*b^-1*(a*b*a*b*b)^2*(a*b)^2, b*(a*b^-1)^2*a*b^2*(a*b)^2,y*z], [a*b,b*a*b*a*b^2*a*b^-1*a*b*a*b^-1*a*b *a*b^2*d,u]]]; end, [14,240],[[1,-2]]], "A7 2^1 x 2^6",[23,7,1],2, 8,[14,240]], # 322560.2 [[1,"abuvwxyze", function(a,b,u,v,w,x,y,z,e) return [[a^2,b^4,(a*b)^7,(a*b)^2*a*b^2*(a*b*a*b^-1)^2 *(a*b)^2*(a*b^-1)^2*a*b*a*b^-1,e^2, u^-1*e*u*e^-1,v^-1*e*v*e^-1, w^-1*e*w*e^-1,x^-1*e*x*e^-1, y^-1*e*y*e^-1,z^-1*e*z*e^-1, u^2*e^-1,v^2*e^-1,w^2*e^-1, x^2*e^-1,y^2*e^-1,z^2*e^-1, u^-1*v^-1*u*v*e^-1, u^-1*w^-1*u*w*e^-1, u^-1*x^-1*u*x*e^-1, u^-1*y^-1*u*y*e^-1, u^-1*z^-1*u*z*e^-1, v^-1*w^-1*v*w*e^-1, v^-1*x^-1*v*x*e^-1, v^-1*y^-1*v*y*e^-1, v^-1*z^-1*v*z*e^-1, w^-1*x^-1*w*x*e^-1, w^-1*y^-1*w*y*e^-1, w^-1*z^-1*w*z*e^-1, x^-1*y^-1*x*y*e^-1, x^-1*z^-1*x*z*e^-1, y^-1*z^-1*y*z*e^-1, a^-1*u*a*u^-1,a^-1*v*a*v^-1, a^-1*w*a*(y*e)^-1,a^-1*x*a*x^-1, a^-1*y*a*(w*e)^-1, a^-1*z*a*(u*v*w*x*y*z*e)^-1, a^-1*e*a*e^-1,b^-1*u*b*w^-1, b^-1*v*b*z^-1,b^-1*w*b*v^-1, b^-1*x*b*(y*e)^-1,b^-1*y*b*(x*e)^-1, b^-1*z*b*u^-1,b^-1*e*b*e^-1], [[a,b]]]; end, [128]], "A7 2^6 C 2^1",[23,7,2],2, 8,128], # 322560.3 [[1,"abduvwxyz", function(a,b,d,u,v,w,x,y,z) return [[a^2*d^-1,b^4*d^-1,(a*b)^7,(a*b)^2*a*b^2*( a*b*a*b^-1)^2*(a*b)^2 *(a*b^-1)^2*a*b*a*b^-1,d^2, a^-1*d*a*d^-1,b^-1*d*b*d^-1, u^-1*d*u*d^-1,v^-1*d*v*d^-1, w^-1*d*w*d^-1,x^-1*d*x*d^-1, y^-1*d*y*d^-1,z^-1*d*z*d^-1, u^2*d^-1,v^2*d^-1,w^2*d^-1, x^2*d^-1,y^2*d^-1,z^2*d^-1, u^-1*v^-1*u*v*d^-1, u^-1*w^-1*u*w*d^-1, u^-1*x^-1*u*x*d^-1, u^-1*y^-1*u*y*d^-1, u^-1*z^-1*u*z*d^-1, v^-1*w^-1*v*w*d^-1, v^-1*x^-1*v*x*d^-1, v^-1*y^-1*v*y*d^-1, v^-1*z^-1*v*z*d^-1, w^-1*x^-1*w*x*d^-1, w^-1*y^-1*w*y*d^-1, w^-1*z^-1*w*z*d^-1, x^-1*y^-1*x*y*d^-1, x^-1*z^-1*x*z*d^-1, y^-1*z^-1*y*z*d^-1, a^-1*u*a*u^-1,a^-1*v*a*v^-1, a^-1*w*a*(y*d)^-1,a^-1*x*a*x^-1, a^-1*y*a*(w*d)^-1, a^-1*z*a*(u*v*w*x*y*z*d)^-1, b^-1*u*b*w^-1,b^-1*v*b*z^-1, b^-1*w*b*v^-1,b^-1*x*b*(y*d)^-1, b^-1*y*b*(x*d)^-1,b^-1*z*b*u^-1], [[a*b, b*a*b*a*b^2*a*b^-1*a*b*a*b^-1*a*b*a *b^2*d,x*y*z*d]]]; end, [1920]], "A7 2^6 C N 2^1",[23,7,3],2, 8,1920], # 322560.4 [[1,"abwxyz", function(a,b,w,x,y,z) return [[a^2,b^4,(a*b)^15,(a*b^2)^6,(a*b)^2*(a*b^-1*a*b^2) ^2*a*b^-1*(a*b)^2*(a*b^-1)^7, a*b*a*b^-1*a*b*a*b^2*(a*b^-1)^5*a*b^2 *(a*b^-1)^5*a*b^2,w^2,x^2,y^2,z^2, w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*y^-1,a^-1*x*a*z^-1, a^-1*y*a*w^-1,a^-1*z*a*x^-1, b^-1*w*b*(w*x)^-1,b^-1*x*b*(w*z)^-1, b^-1*y*b*(w*x*y*z)^-1, b^-1*z*b*w^-1],[[a,b]]]; end, [16]], "A8 2^4",[26,4,1],1, 19,16], # 322560.5 [[1,"abwxyz", function(a,b,w,x,y,z) return [[a^2*(x*z)^-1,b^4*(w*x*z)^-1,(a*b)^15,(a*b^2)^6 ,(a*b)^2*(a*b^-1*a*b^2)^2*a*b^-1*(a*b)^2 *(a*b^-1)^7*(y*z)^-1, a*b*a*b^-1*a*b*a*b^2*(a*b^-1)^5*a*b^2 *(a*b^-1)^5*a*b^2*y^-1,w^2,x^2,y^2, z^2,w^-1*x^-1*w*x,w^-1*y^-1*w*y, w^-1*z^-1*w*z,x^-1*y^-1*x*y, x^-1*z^-1*x*z,y^-1*z^-1*y*z, a^-1*w*a*y^-1,a^-1*x*a*z^-1, a^-1*y*a*w^-1,a^-1*z*a*x^-1, b^-1*w*b*(w*x)^-1,b^-1*x*b*(w*z)^-1, b^-1*y*b*(w*x*y*z)^-1, b^-1*z*b*w^-1], [[b*z,(a*b)^2*(a*b^-1)^2*a*z,y*z]]]; end, [30],[[1,2],[7,7]]], "A8 N 2^4",[26,4,2],1, 19,30], # 322560.6 [[1,"abef", function(a,b,e,f) return [[a^2,b^4*(e^2*f^2)^-1,(a*b)^7*e,(a*b^2)^5*(e*f) ^-1,(a^-1*b^-1*a*b)^5*(e^2*f^2)^-1 ,(a*b*a*b*a*b^3)^5*(e^2*f^-1)^-1, (a*b*a*b*a*b^2*a*b^-1)^5,e^4,f^4, e^-1*f^-1*e*f,a^-1*e*a*e^-1, a^-1*f*a*f^-1,b^-1*e*b*e^-1, b^-1*f*b*f^-1], [[a,b*a*b*a*b^-1*a*b^2*f^-1], [a*e^2,b^-1*a*b^-1*a*b*a*b^2]]]; end, [224,224],[[1,2]]], "L3(4) ( 2^1 A 2^1 ) x ( 2^1 A 2^1 )",[27,4,1],-16, 20,[224,224]], # 322560.7 [[2,60,1,5376,1], "( A5 x L3(2) ) # 2^5 [1]",[31,5,1],4, [1,2],[5,16,16]], # 322560.8 [[2,120,1,2688,1], "( A5 x L3(2) ) # 2^5 [2]",[31,5,2],4, [1,2],[24,8,16]], # 322560.9 [[2,120,1,2688,2], "( A5 x L3(2) ) # 2^5 [3]",[31,5,3],4, [1,2],[24,16]], # 322560.10 [[2,120,1,2688,3], "( A5 x L3(2) ) # 2^5 [4]",[31,5,4],4, [1,2],[24,16,14]], # 322560.11 [[3,120,1,5376,1,"d1","d2"], "( A5 x L3(2) ) # 2^5 [5]",[31,5,5],4, [1,2],[192,192]], # 322560.12 [[3,120,1,5376,1,"d1","e2"], "( A5 x L3(2) ) # 2^5 [6]",[31,5,6],4, [1,2],[192,192]], # 322560.13 [[2,1920,1,168,1], "( A5 x L3(2) ) # 2^5 [7]",[31,5,7],2, [1,2],[12,7]], # 322560.14 [[2,1920,2,168,1], "( A5 x L3(2) ) # 2^5 [8]",[31,5,8],2, [1,2],[24,7]], # 322560.15 [[2,1920,3,168,1], "( A5 x L3(2) ) # 2^5 [9]",[31,5,9],2, [1,2],[16,24,7]], # 322560.16 [[2,1920,4,168,1], "( A5 x L3(2) ) # 2^5 [10]",[31,5,10],1, [1,2],[80,7]], # 322560.17 [[2,1920,5,168,1], "( A5 x L3(2) ) # 2^5 [11]",[31,5,11],2, [1,2],[10,24,7]], # 322560.18 [[2,1920,6,168,1], "( A5 x L3(2) ) # 2^5 [12]",[31,5,12],2, [1,2],[80,7]], # 322560.19 [[2,1920,7,168,1], "( A5 x L3(2) ) # 2^5 [13]",[31,5,13],2, [1,2],[32,7]], # 322560.20 [[2,960,1,336,1], "( A5 x L3(2) ) # 2^5 [14]",[31,5,14],2, [1,2],[16,16]], # 322560.21 [[2,960,2,336,1], "( A5 x L3(2) ) # 2^5 [15]",[31,5,16],2, [1,2],[10,16]], # 322560.22 [[3,1920,1,336,1,"e1","d2"], "( A5 x L3(2) ) # 2^5 [16]",[31,5,16],2, [1,2],96], # 322560.23 [[3,1920,2,336,1,"d1","d2"], "( A5 x L3(2) ) # 2^5 [17]",[31,5,17],2, [1,2],192], # 322560.24 [[3,1920,3,336,1,"d1","d2"], "( A5 x L3(2) ) # 2^5 [18]",[31,5,18],2, [1,2],[128,192]], # 322560.25 [[3,1920,5,336,1,"d1","d2"], "( A5 x L3(2) ) # 2^5 [19]",[31,5,19],2, [1,2],[80,192]], # 322560.26 [[3,1920,6,336,1,"d1","d2"], "( A5 x L3(2) ) # 2^5 [20]",[31,5,20],2, [1,2],640], # 322560.27 [[3,1920,7,336,1,"e1","d2"], "( A5 x L3(2) ) # 2^5 [21]",[31,5,21],2, [1,2],256] ]; PERFGRP[198]:=[# 332640.1 [[2,504,1,660,1], "L2(8) x L2(11)",40,1, [4,5],[9,11]] ]; PERFGRP[199]:=[# 336960.1 [[2,60,1,5616,1], "A5 x L3(3)",40,1, [1,11],[5,13]] ]; PERFGRP[200]:=fail; PERFGRP[201]:=[# 345600.1 [[2,60,1,5760,1], "( A5 x A6 ) # 2^4 [1]",[33,4,1],1, [1,3],[5,16]], # 345600.2 [[2,960,1,360,1], "( A5 x A6 ) # 2^4 [2]",[33,4,2],1, [1,3],[16,6]], # 345600.3 [[2,960,2,360,1], "( A5 x A6 ) # 2^4 [3]",[33,4,3],1, [1,3],[10,6]] ];
¤ Dauer der Verarbeitung: 0.22 Sekunden (vorverarbeitet am 2026-06-10) ¤*© Formatika GbR, Deutschland |
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2026-06-09