###     A3 : Left Cell Data     ##

cell #0 :
  |C| = 1
  W-rep = phi[4]
  special rep = phi[4] , dim = 1
  orbit = [4]
  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| = 3
  W-rep = phi[3,1]
  special rep = phi[3,1] , dim = 3
  orbit = [3, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [1],[5],[13]
   ]
cell #2 :
  |C| = 3
  W-rep = phi[3,1]
  special rep = phi[3,1] , dim = 3
  orbit = [3, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [2],[4],[8]
   ]
cell #3 :
  |C| = 3
  W-rep = phi[3,1]
  special rep = phi[3,1] , dim = 3
  orbit = [3, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [3],[6],[9]
   ]
cell #4 :
  |C| = 2
  W-rep = phi[2,2]
  special rep = phi[2,2] , dim = 2
  orbit = [2, 2]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 2
     2 tau_infinity subcells with 1 member(s)
  subcells = [
     [7],[11]
   ]
cell #5 :
  |C| = 2
  W-rep = phi[2,2]
  special rep = phi[2,2] , dim = 2
  orbit = [2, 2]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 2
     2 tau_infinity subcells with 1 member(s)
  subcells = [
     [12],[16]
   ]
cell #6 :
  |C| = 3
  W-rep = phi[2,1,1]
  special rep = phi[2,1,1] , dim = 3
  orbit = [2, 1, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [10],[18],[22]
   ]
cell #7 :
  |C| = 3
  W-rep = phi[2,1,1]
  special rep = phi[2,1,1] , dim = 3
  orbit = [2, 1, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [14],[17],[20]
   ]
cell #8 :
  |C| = 3
  W-rep = phi[2,1,1]
  special rep = phi[2,1,1] , dim = 3
  orbit = [2, 1, 1]
  depth of tau_infinity partitioning = 1
  number of tau_infinity subcells = 3
     3 tau_infinity subcells with 1 member(s)
  subcells = [
     [15],[19],[21]
   ]
cell #9 :
  |C| = 1
  W-rep = phi[1,1,1,1]
  special rep = phi[1,1,1,1] , dim = 1
  orbit = [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 = [
     [23]
   ]