### C4 : Left Cell Data ## cell #0 : |C| = 1 W-rep = phi[[4],[]] special rep = phi[[4],[]] , dim = 1 orbit = [8] 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| = 7 W-rep = phi[[3, 1],[]]+phi[[3],[1]] special rep = phi[[3],[1]] , dim = 4 orbit = [6, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [49], [1,125],[6,91],[19,70] ] cell #2 : |C| = 7 W-rep = phi[[3, 1],[]]+phi[[3],[1]] special rep = phi[[3],[1]] , dim = 4 orbit = [6, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [28], [2,59],[5,86],[9,43] ] cell #3 : |C| = 7 W-rep = phi[[3, 1],[]]+phi[[3],[1]] special rep = phi[[3],[1]] , dim = 4 orbit = [6, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [13], [3,23],[7,34],[14,54] ] cell #4 : |C| = 5 W-rep = phi[[3],[1]]+phi[[],[4]] special rep = phi[[3],[1]] , dim = 4 orbit = [6, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 3 tau_infinity subcells with 1 member(s) 1 tau_infinity subcells with 2 member(s) subcells = [ [10],[17],[30], [4,29] ] cell #5 : |C| = 8 W-rep = phi[[2, 2],[]]+phi[[2],[2]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 4 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [27],[46],[67],[120], [8,42],[16,58] ] cell #6 : |C| = 10 W-rep = phi[[2],[2]]+phi[[1],[3]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [21],[33], [11,51],[25,75],[40,101],[82,163] ] cell #7 : |C| = 10 W-rep = phi[[2],[2]]+phi[[1],[3]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [39],[57], [12,110],[22,140],[24,81],[52,207] ] cell #8 : |C| = 8 W-rep = phi[[2, 2],[]]+phi[[2],[2]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 4 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [48],[74],[100],[162], [18,69],[32,90] ] cell #9 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [15],[36],[62],[78],[104],[115],[130],[145] ] cell #10 : |C| = 10 W-rep = phi[[2],[2]]+phi[[1],[3]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [65],[89], [26,151],[41,183],[44,118],[83,250] ] cell #11 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [20],[35],[50],[56],[71],[77],[103],[129] ] cell #12 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [31],[37],[61],[79],[105],[114],[144],[173] ] cell #13 : |C| = 10 W-rep = phi[[2],[2]]+phi[[1],[3]] special rep = phi[[2],[2]] , dim = 6 orbit = [4, 4] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [98],[128], [47,195],[68,227],[72,160],[121,289] ] cell #14 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [38],[60],[80],[88],[106],[113],[143],[172] ] cell #15 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [55],[63],[93],[116],[146],[155],[187],[218] ] cell #16 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [126],[135],[175],[202],[234],[242],[272],[299] ] cell #17 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [45],[66],[95],[119],[157],[189] ] cell #18 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [64],[92],[117],[127],[147],[154],[186],[217] ] cell #19 : |C| = 9 W-rep = phi[[2],[1, 1]]+phi[[],[3, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [102],[137],[171], [53,214],[76,164],[107,204] ] cell #20 : |C| = 8 W-rep = phi[[2, 1],[1]] special rep = phi[[2, 1],[1]] , dim = 8 orbit = [4, 2, 2] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [87],[96],[132],[158],[190],[199],[231],[261] ] cell #21 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [73],[99],[134],[161],[201],[233] ] cell #22 : |C| = 9 W-rep = phi[[2],[1, 1]]+phi[[],[3, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [185],[224],[259], [123,213],[153,252],[192,286] ] cell #23 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [108],[138],[177],[205],[244],[274] ] cell #24 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [194],[226],[264],[288],[317],[338] ] cell #25 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [84],[111],[141],[149],[181],[208],[248],[257] ] cell #26 : |C| = 9 W-rep = phi[[2],[1, 1]]+phi[[],[3, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [142],[180],[216], [85,168],[112,209],[148,247] ] cell #27 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [109],[139],[178],[206],[245],[275] ] cell #28 : |C| = 9 W-rep = phi[[2, 1, 1],[]]+phi[[2],[1, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [212],[246],[281], [169,330],[179,276],[219,307] ] cell #29 : |C| = 9 W-rep = phi[[2, 1, 1],[]]+phi[[2],[1, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [167],[203],[241], [136,235],[174,271],[215,298] ] cell #30 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [211],[240],[270],[277],[295],[303],[323],[345] ] cell #31 : |C| = 10 W-rep = phi[[1, 1, 1],[1]]+phi[[1, 1],[1, 1]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [255],[285], [94,262],[156,315],[188,336],[223,311] ] cell #32 : |C| = 9 W-rep = phi[[2, 1, 1],[]]+phi[[2],[1, 1]] special rep = phi[[2],[1, 1]] , dim = 6 orbit = [4, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 3 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [124],[159],[198], [97,191],[131,230],[170,260] ] cell #33 : |C| = 6 W-rep = phi[[1, 1],[2]] special rep = phi[[1, 1],[2]] , dim = 6 orbit = [3, 3, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 6 tau_infinity subcells with 1 member(s) subcells = [ [150],[182],[222],[249],[284],[310] ] cell #34 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [122],[152],[184],[193],[225],[251],[287],[296] ] cell #35 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [166],[197],[229],[236],[256],[266],[291],[319] ] cell #36 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [254],[280],[306],[312],[327],[333],[348],[363] ] cell #37 : |C| = 10 W-rep = phi[[1, 1, 1],[1]]+phi[[1, 1],[1, 1]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [294],[318], [133,300],[200,342],[232,357],[265,339] ] cell #38 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [165],[196],[228],[237],[267],[290],[320],[328] ] cell #39 : |C| = 10 W-rep = phi[[1, 1, 1],[1]]+phi[[1, 1],[1, 1]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [326],[344], [176,331],[243,361],[273,371],[302,359] ] cell #40 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [210],[239],[269],[278],[304],[322],[346],[352] ] cell #41 : |C| = 10 W-rep = phi[[1, 1, 1],[1]]+phi[[1, 1],[1, 1]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 2 tau_infinity subcells with 1 member(s) 4 tau_infinity subcells with 2 member(s) subcells = [ [350],[362], [220,301],[282,343],[308,358],[332,372] ] cell #42 : |C| = 8 W-rep = phi[[1],[2, 1]] special rep = phi[[1],[2, 1]] , dim = 8 orbit = [3, 3, 1, 1] depth of tau_infinity partitioning = 2 number of tau_infinity subcells = 8 8 tau_infinity subcells with 1 member(s) subcells = [ [238],[253],[268],[279],[305],[321],[347],[368] ] cell #43 : |C| = 8 W-rep = phi[[1, 1],[1, 1]]+phi[[],[2, 2]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 4 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [221],[283],[309],[335], [293,351],[314,365] ] cell #44 : |C| = 8 W-rep = phi[[1, 1],[1, 1]]+phi[[],[2, 2]] special rep = phi[[1, 1],[1, 1]] , dim = 6 orbit = [2, 2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 6 4 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [263],[316],[337],[356], [325,367],[341,375] ] cell #45 : |C| = 7 W-rep = phi[[1],[1, 1, 1]]+phi[[],[2, 1, 1]] special rep = phi[[1],[1, 1, 1]] , dim = 4 orbit = [2, 2, 1, 1, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [334], [258,382],[292,377],[313,364] ] cell #46 : |C| = 7 W-rep = phi[[1],[1, 1, 1]]+phi[[],[2, 1, 1]] special rep = phi[[1],[1, 1, 1]] , dim = 4 orbit = [2, 2, 1, 1, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [355], [297,378],[324,381],[340,374] ] cell #47 : |C| = 7 W-rep = phi[[1],[1, 1, 1]]+phi[[],[2, 1, 1]] special rep = phi[[1],[1, 1, 1]] , dim = 4 orbit = [2, 2, 1, 1, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 1 tau_infinity subcells with 1 member(s) 3 tau_infinity subcells with 2 member(s) subcells = [ [370], [329,369],[349,376],[360,380] ] cell #48 : |C| = 5 W-rep = phi[[1, 1, 1, 1],[]]+phi[[1],[1, 1, 1]] special rep = phi[[1],[1, 1, 1]] , dim = 4 orbit = [2, 2, 1, 1, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 4 3 tau_infinity subcells with 1 member(s) 1 tau_infinity subcells with 2 member(s) subcells = [ [353],[366],[373], [354,379] ] cell #49 : |C| = 1 W-rep = phi[[],[1, 1, 1, 1]] special rep = phi[[],[1, 1, 1, 1]] , dim = 1 orbit = [1, 1, 1, 1, 1, 1, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 1 1 tau_infinity subcells with 1 member(s) subcells = [ [383] ]