### C3 : Left Cell Data ## cell #0 : |C| = 1 W-rep = phi[[3],[]] special rep = phi[[3],[]] , dim = 1 orbit = [6] 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| = 5 W-rep = phi[[2, 1],[]]+phi[[2],[1]] special rep = phi[[2],[1]] , dim = 3 orbit = [4, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 1 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [14], [1,24],[5,19] ] cell #2 : |C| = 5 W-rep = phi[[2, 1],[]]+phi[[2],[1]] special rep = phi[[2],[1]] , dim = 3 orbit = [4, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 1 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [8], [2,12],[4,16] ] cell #3 : |C| = 4 W-rep = phi[[2],[1]]+phi[[],[3]] special rep = phi[[2],[1]] , dim = 3 orbit = [4, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 2 tau_infinity subcells with 1 member(s) 1 tau_infinity subcells with 2 member(s) subcells = [ [6],[9], [3,15] ] cell #4 : |C| = 3 W-rep = phi[[1],[2]] special rep = phi[[1],[2]] , dim = 3 orbit = [3, 3] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [7],[11],[22] ] cell #5 : |C| = 3 W-rep = phi[[1],[2]] special rep = phi[[1],[2]] , dim = 3 orbit = [3, 3] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [13],[18],[30] ] cell #6 : |C| = 3 W-rep = phi[[1, 1],[1]] special rep = phi[[1, 1],[1]] , dim = 3 orbit = [2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [10],[21],[27] ] cell #7 : |C| = 3 W-rep = phi[[1],[2]] special rep = phi[[1],[2]] , dim = 3 orbit = [3, 3] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [20],[26],[37] ] cell #8 : |C| = 3 W-rep = phi[[1, 1],[1]] special rep = phi[[1, 1],[1]] , dim = 3 orbit = [2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [17],[29],[34] ] cell #9 : |C| = 3 W-rep = phi[[1, 1],[1]] special rep = phi[[1, 1],[1]] , dim = 3 orbit = [2, 2, 2] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 3 tau_infinity subcells with 1 member(s) subcells = [ [25],[36],[40] ] cell #10 : |C| = 5 W-rep = phi[[1],[1, 1]]+phi[[],[2, 1]] special rep = phi[[1],[1, 1]] , dim = 3 orbit = [2, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 1 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [33], [23,46],[28,42] ] cell #11 : |C| = 5 W-rep = phi[[1],[1, 1]]+phi[[],[2, 1]] special rep = phi[[1],[1, 1]] , dim = 3 orbit = [2, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 1 tau_infinity subcells with 1 member(s) 2 tau_infinity subcells with 2 member(s) subcells = [ [39], [31,43],[35,45] ] cell #12 : |C| = 4 W-rep = phi[[1, 1, 1],[]]+phi[[1],[1, 1]] special rep = phi[[1],[1, 1]] , dim = 3 orbit = [2, 2, 1, 1] depth of tau_infinity partitioning = 1 number of tau_infinity subcells = 3 2 tau_infinity subcells with 1 member(s) 1 tau_infinity subcells with 2 member(s) subcells = [ [38],[41], [32,44] ] cell #13 : |C| = 1 W-rep = phi[[],[1, 1, 1]] special rep = phi[[],[1, 1, 1]] , dim = 1 orbit = [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 = [ [47] ]