### F4 : Left Cell Data ## cell #0 : |C| = 1 W-rep = phi[1,0] special rep = phi[1,0] , dim = 1 orbit = F4 depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 1 1 tau_infinity subcells with 1 member(s) subcells = [ [0] ] cell #1 : |C| = 6 W-rep = phi[2,4,2]+phi[4,1] special rep = phi[4,1] , dim = 4 orbit = F4(a1) depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [20],[51], [1,56],[6,35] ] cell #2 : |C| = 6 W-rep = phi[2,4,2]+phi[4,1] special rep = phi[4,1] , dim = 4 orbit = F4(a1) depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [9],[28], [2,18],[5,31] ] cell #3 : |C| = 6 W-rep = phi[2,4,1]+phi[4,1] special rep = phi[4,1] , dim = 4 orbit = F4(a1) depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [7],[14], [3,21],[13,52] ] cell #4 : |C| = 6 W-rep = phi[2,4,1]+phi[4,1] special rep = phi[4,1] , dim = 4 orbit = F4(a1) depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [17],[30], [4,86],[10,40] ] cell #5 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [8],[16],[27],[39],[47],[73],[85],[100],[140] ] cell #6 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [11],[22],[25],[34],[43],[62],[68],[92],[131] ] cell #7 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [12],[23],[24],[36],[42],[55],[60],[107],[188] ] cell #8 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [19],[33],[50],[67],[79],[114],[130],[150],[200] ] cell #9 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [81],[116],[119],[151],[164],[199],[206],[292],[417] ] cell #10 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [15],[38],[61],[84],[124],[169],[212],[270] ] cell #11 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [26],[44],[45],[63],[71],[91],[97],[158],[256] ] cell #12 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [64],[95],[127],[156],[176],[230],[254],[282],[351] ] cell #13 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [29],[48],[74],[76],[111],[145],[219],[332] ] cell #14 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [37],[59],[83],[106],[122],[167],[187],[211],[271] ] cell #15 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [32],[66],[98],[129],[179],[233],[284],[350] ] cell #16 : |C| = 9 W-rep = phi[9,2] special rep = phi[9,2] , dim = 9 orbit = F4(a2) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [49],[75],[77],[101],[112],[139],[146],[220],[333] ] cell #17 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [58],[105],[148],[186],[246],[308],[365],[438] ] cell #18 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [141],[215],[278],[328],[403],[477],[542],[623] ] cell #19 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [90],[126],[171],[172],[226],[276],[372],[506] ] cell #20 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [195],[248],[310],[313],[382],[444],[551],[690] ] cell #21 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [201],[287],[358],[412],[492],[568],[635],[715] ] cell #22 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [265],[324],[393],[396],[470],[535],[643],[777] ] cell #23 : |C| = 72 W-rep = phi[4,8]+phi[6,6,2]+phi[9,6,1]+phi[9,6,2]+phi[12,4]+2*phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 6 tau_infinity subcells with 4 member(s) 2 tau_infinity subcells with 6 member(s) 4 tau_infinity subcells with 9 member(s) subcells = [ [177,314,487,676],[193,344,517,702],[231,383,563,750],[244,408,586,766],[283,447,632,812],[306,482,662,835], [96,353,356,537,719,883],[138,431,433,621,796,948], [41,222,236,379,554,575,737,740,901],[65,157,299,456,459,653,813,817,961],[87,182,335,499,513,693,862,865,999],[128,237,255,577,595,598,926,930,1042] ] cell #24 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [57],[104],[147],[185],[245],[307],[364],[437] ] cell #25 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [89],[125],[170],[173],[227],[277],[373],[507] ] cell #26 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [93],[154],[207],[252],[320],[389],[451],[529] ] cell #27 : |C| = 8 W-rep = phi[8,3,2] special rep = phi[8,3,2] , dim = 8 orbit = B3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [272],[368],[445],[502],[584],[660],[726],[802] ] cell #28 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [343],[407],[481],[485],[561],[628],[733],[858] ] cell #29 : |C| = 47 W-rep = phi[4,7,2]+phi[6,6,1]+phi[9,6,2]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [347,710], [135,427,790],[180,495,849],[234,571,911], [160,298,464,651],[216,366,548,729],[258,423,603,785],[329,500,687,854], [46,240,404,580,919],[72,302,478,656,973],[99,361,543,724,1017],[142,279,441,624,806] ] cell #30 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [136],[181],[235],[238],[300],[357],[460],[599] ] cell #31 : |C| = 47 W-rep = phi[4,7,1]+phi[6,6,1]+phi[9,6,1]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [275,625], [120,400,759],[165,474,828],[209,541,887], [161,295,467,649],[214,371,544,730],[259,420,606,783],[327,505,683,855], [53,263,425,613,941],[80,322,491,680,985],[115,391,567,754,1030],[196,348,525,706,879] ] cell #32 : |C| = 8 W-rep = phi[8,3,1] special rep = phi[8,3,1] , dim = 8 orbit = C3 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [54],[82],[117],[118],[163],[205],[291],[416] ] cell #33 : |C| = 72 W-rep = phi[4,8]+phi[6,6,2]+phi[9,6,1]+phi[9,6,2]+phi[12,4]+2*phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 6 tau_infinity subcells with 4 member(s) 2 tau_infinity subcells with 6 member(s) 4 tau_infinity subcells with 9 member(s) subcells = [ [242,397,578,763],[262,429,610,788],[304,471,654,832],[319,497,677,847],[363,538,722,889],[388,573,751,909], [144,439,443,627,629,953],[197,346,522,712,876,1007], [69,159,311,466,483,646,820,824,967],[103,218,381,546,550,560,732,891,1018],[132,249,257,409,605,780,933,937,1048],[184,312,331,484,685,689,857,989,1081] ] cell #34 : |C| = 72 W-rep = phi[4,8]+phi[6,6,2]+phi[9,6,1]+phi[9,6,2]+phi[12,4]+2*phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 6 tau_infinity subcells with 4 member(s) 2 tau_infinity subcells with 6 member(s) 4 tau_infinity subcells with 9 member(s) subcells = [ [241,399,579,764],[261,428,612,789],[303,473,655,833],[318,496,679,848],[362,540,723,890],[387,572,753,910], [143,274,440,630,805,954],[198,521,523,707,711,1008], [70,162,293,461,465,666,821,838,968],[102,213,217,370,547,742,894,902,1019],[133,260,418,590,600,604,769,934,1049],[183,326,330,504,668,686,840,992,1082] ] cell #35 : |C| = 47 W-rep = phi[4,7,2]+phi[6,6,1]+phi[9,6,2]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [434,797], [194,518,870],[247,587,922],[309,663,976], [223,380,555,741],[288,453,640,814],[336,514,694,866],[413,592,774,927], [78,315,493,671,983],[113,384,569,745,1028],[149,448,636,809,1063],[202,359,532,716,885] ] cell #36 : |C| = 47 W-rep = phi[4,7,1]+phi[6,6,1]+phi[9,6,1]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [355,717], [174,489,842],[228,565,904],[280,634,957], [224,376,558,739],[286,458,637,815],[337,510,697,864],[411,597,771,928], [88,341,516,704,1002],[123,405,583,768,1038],[168,479,659,837,1073],[266,435,618,793,950] ] cell #37 : |C| = 57 W-rep = phi[1,12,2]+phi[4,7,2]+phi[6,6,2]+2*phi[9,6,2]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 3 tau_infinity subcells with 2 member(s) 1 tau_infinity subcells with 3 member(s) 3 tau_infinity subcells with 5 member(s) 4 tau_infinity subcells with 6 member(s) 1 tau_infinity subcells with 9 member(s) subcells = [ [342,701],[406,765],[480,834], [267,619,947], [175,321,486,675,846],[229,390,562,749,908],[281,452,631,811,959], [108,377,394,559,736,900],[155,455,469,639,642,960],[189,325,511,698,861,998],[253,395,594,773,776,1041], [94,208,352,531,534,536,721,882,1014] ] cell #38 : |C| = 72 W-rep = phi[4,8]+phi[6,6,2]+phi[9,6,1]+phi[9,6,2]+phi[12,4]+2*phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 6 tau_infinity subcells with 4 member(s) 2 tau_infinity subcells with 6 member(s) 4 tau_infinity subcells with 9 member(s) subcells = [ [317,488,669,845],[340,520,703,868],[386,564,743,907],[402,589,767,920],[450,633,807,958],[476,665,836,974], [204,354,530,718,720,1013],[268,432,615,794,799,1055], [109,221,225,552,557,574,896,913,1023],[153,285,290,457,638,652,816,969,1064],[190,334,338,498,691,696,851,994,1086],[251,410,415,576,596,772,915,929,1110] ] cell #39 : |C| = 57 W-rep = phi[1,12,1]+phi[4,7,1]+phi[6,6,2]+2*phi[9,6,1]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 3 tau_infinity subcells with 2 member(s) 1 tau_infinity subcells with 3 member(s) 3 tau_infinity subcells with 5 member(s) 4 tau_infinity subcells with 6 member(s) 1 tau_infinity subcells with 9 member(s) subcells = [ [316,672],[385,746],[449,810], [203,533,884], [192,339,519,700,871],[243,401,588,762,923],[305,475,664,831,977], [110,374,378,556,755,899],[152,289,454,641,826,962],[191,508,512,681,695,997],[250,414,593,757,775,1043], [137,269,430,614,616,620,798,944,1058] ] cell #40 : |C| = 47 W-rep = phi[4,7,2]+phi[6,6,1]+phi[9,6,2]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [526,877], [264,611,942],[323,678,986],[392,752,1031], [296,468,647,825],[369,545,731,892],[421,607,781,938],[503,684,856,990], [121,398,585,760,1036],[166,472,661,829,1071],[210,539,727,888,1098],[273,446,626,803,955] ] cell #41 : |C| = 47 W-rep = phi[4,7,1]+phi[6,6,1]+phi[9,6,1]+phi[12,4]+phi[16,5] special rep = phi[12,4] , dim = 12 orbit = F4(a3) depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 12 1 tau_infinity subcells with 2 member(s) 3 tau_infinity subcells with 3 member(s) 4 tau_infinity subcells with 4 member(s) 4 tau_infinity subcells with 5 member(s) subcells = [ [442,804], [239,581,917],[301,657,971],[360,725,1016], [297,463,650,823],[367,549,728,893],[422,602,784,936],[501,688,853,991], [134,426,609,791,1052],[178,494,674,850,1079],[232,570,748,912,1105],[345,527,709,873,1010] ] cell #42 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [294],[419],[524],[591],[667],[670],[744],[808] ] cell #43 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [349],[424],[490],[566],[648],[705],[782],[878] ] cell #44 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [375],[509],[617],[682],[756],[758],[827],[886] ] cell #45 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [436],[515],[582],[658],[738],[792],[863],[949] ] cell #46 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [462],[601],[708],[770],[839],[841],[903],[956] ] cell #47 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [528],[608],[673],[747],[822],[872],[935],[1009] ] cell #48 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [553],[692],[795],[852],[914],[916],[970],[1015] ] cell #49 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [622],[699],[761],[830],[898],[943],[996],[1057] ] cell #50 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [644],[778],[874],[924],[978],[980],[1025],[1061] ] cell #51 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [645],[779],[875],[925],[979],[981],[1026],[1062] ] cell #52 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [713],[786],[843],[905],[965],[1003],[1046],[1093] ] cell #53 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [714],[787],[844],[906],[966],[1004],[1047],[1094] ] cell #54 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [734],[859],[945],[987],[1032],[1034],[1069],[1097] ] cell #55 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [880],[939],[982],[1027],[1067],[1090],[1113],[1136] ] cell #56 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [735],[860],[946],[951],[988],[1000],[1033],[1035],[1070] ] cell #57 : |C| = 8 W-rep = phi[8,9,1] special rep = phi[8,9,1] , dim = 8 orbit = A2s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [800],[867],[918],[972],[1022],[1053],[1085],[1119] ] cell #58 : |C| = 8 W-rep = phi[8,9,2] special rep = phi[8,9,2] , dim = 8 orbit = A2 depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [819],[932],[1006],[1040],[1075],[1077],[1103],[1122] ] cell #59 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [801],[869],[897],[921],[975],[995],[1024],[1056],[1087] ] cell #60 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [818],[931],[1005],[1011],[1039],[1050],[1074],[1076],[1102] ] cell #61 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [881],[940],[964],[984],[1029],[1045],[1068],[1092],[1114] ] cell #62 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [895],[993],[1054],[1059],[1080],[1088],[1106],[1107],[1125] ] cell #63 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [952],[1001],[1021],[1037],[1072],[1084],[1101],[1118],[1132] ] cell #64 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [963],[1044],[1091],[1095],[1109],[1115],[1127],[1128],[1139] ] cell #65 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [1012],[1051],[1066],[1078],[1104],[1112],[1124],[1135],[1143] ] cell #66 : |C| = 9 W-rep = phi[9,10] special rep = phi[9,10] , dim = 9 orbit = A1+A1s depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 9 9 tau_infinity subcells with 1 member(s) subcells = [ [1020],[1060],[1083],[1089],[1108],[1117],[1126],[1129],[1140] ] cell #67 : |C| = 6 W-rep = phi[2,16,2]+phi[4,13] special rep = phi[4,13] , dim = 4 orbit = A1s depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [1121],[1134], [1065,1147],[1111,1141] ] cell #68 : |C| = 6 W-rep = phi[2,16,1]+phi[4,13] special rep = phi[4,13] , dim = 4 orbit = A1s depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [1100],[1131], [1096,1150],[1116,1145] ] cell #69 : |C| = 6 W-rep = phi[2,16,2]+phi[4,13] special rep = phi[4,13] , dim = 4 orbit = A1s depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [1137],[1144], [1099,1138],[1130,1148] ] cell #70 : |C| = 6 W-rep = phi[2,16,1]+phi[4,13] special rep = phi[4,13] , dim = 4 orbit = A1s depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 2 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [1123],[1142], [1120,1146],[1133,1149] ] cell #71 : |C| = 1 W-rep = phi[1,24] special rep = phi[1,24] , dim = 1 orbit = 0 depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 1 1 tau_infinity subcells with 1 member(s) subcells = [ [1151] ]