# wcell data for g = A5 , G_C = SL6 , G_R = SU(4,2)

non-empty blocks:
  SU(4,2) x PGL(6,R)


SU(4,2) x PGL(6,R) block:
cell #0
  cell size = 5
  cell W-rep = phi[5,1]
  special rep = phi[5,1] ; dim = 5
  special orbit = [5, 1]
  tau-infinity partition completed in 1 step(s)
     5 parts
     partitioning = [[1, 5]]
  intersection with blocku = {0,1,6,20,27}
cell #1
  cell size = 10
  cell W-rep = phi[4,1,1]
  special rep = phi[4,1,1] ; dim = 10
  special orbit = [4, 1, 1]
  tau-infinity partition completed in 1 step(s)
     10 parts
     partitioning = [[1, 10]]
  intersection with blocku = {4,7,8,15,16,24,29,36,42,51}
cell #2
  cell size = 5
  cell W-rep = phi[3,3]
  special rep = phi[3,3] ; dim = 5
  special orbit = [3, 3]
  tau-infinity partition completed in 1 step(s)
     5 parts
     partitioning = [[1, 5]]
  intersection with blocku = {3,19,28,37}
cell #3
  cell size = 16
  cell W-rep = phi[3,2,1]
  special rep = phi[3,2,1] ; dim = 16
  special orbit = [3, 2, 1]
  tau-infinity partition completed in 2 step(s)
     16 parts
     partitioning = [[1, 16]]
  intersection with blocku = {2,17,23,35,41,45,49,59,60}
cell #4
  cell size = 10
  cell W-rep = phi[4,1,1]
  special rep = phi[4,1,1] ; dim = 10
  special orbit = [4, 1, 1]
  tau-infinity partition completed in 1 step(s)
     10 parts
     partitioning = [[1, 10]]
  intersection with blocku = {5,9,13,21,26,31,32,39,48,53}
cell #5
  cell size = 10
  cell W-rep = phi[3,1,1,1]
  special rep = phi[3,1,1,1] ; dim = 10
  special orbit = [3, 1, 1, 1]
  tau-infinity partition completed in 1 step(s)
     10 parts
     partitioning = [[1, 10]]
  intersection with blocku = {10,18,33,38,44,55,62,64,69,76}
cell #6
  cell size = 16
  cell W-rep = phi[3,2,1]
  special rep = phi[3,2,1] ; dim = 16
  special orbit = [3, 2, 1]
  tau-infinity partition completed in 2 step(s)
     16 parts
     partitioning = [[1, 16]]
  intersection with blocku = {11,25,34,40,46,50,54,63,65}
cell #7
  cell size = 9
  cell W-rep = phi[2,2,1,1]
  special rep = phi[2,2,1,1] ; dim = 9
  special orbit = [2, 2, 1, 1]
  tau-infinity partition completed in 1 step(s)
     9 parts
     partitioning = [[1, 9]]
  intersection with blocku = {12,22,43,47,72,78}
cell #8
  cell size = 9
  cell W-rep = phi[2,2,1,1]
  special rep = phi[2,2,1,1] ; dim = 9
  special orbit = [2, 2, 1, 1]
  tau-infinity partition completed in 1 step(s)
     9 parts
     partitioning = [[1, 9]]
  intersection with blocku = {14,30,52,56,73,87}
cell #9
  cell size = 10
  cell W-rep = phi[3,1,1,1]
  special rep = phi[3,1,1,1] ; dim = 10
  special orbit = [3, 1, 1, 1]
  tau-infinity partition completed in 1 step(s)
     10 parts
     partitioning = [[1, 10]]
  intersection with blocku = {67,74,81}
cell #10
  cell size = 9
  cell W-rep = phi[2,2,1,1]
  special rep = phi[2,2,1,1] ; dim = 9
  special orbit = [2, 2, 1, 1]
  tau-infinity partition completed in 1 step(s)
     9 parts
     partitioning = [[1, 9]]
  intersection with blocku = {83,85,86}
cell #11
  cell size = 5
  cell W-rep = phi[2,1,1,1,1]
  special rep = phi[2,1,1,1,1] ; dim = 5
  special orbit = [2, 1, 1, 1, 1]
  tau-infinity partition completed in 1 step(s)
     5 parts
     partitioning = [[1, 5]]
  intersection with blocku = {91,115}
cell #12
  cell size = 5
  cell W-rep = phi[2,1,1,1,1]
  special rep = phi[2,1,1,1,1] ; dim = 5
  special orbit = [2, 1, 1, 1, 1]
  tau-infinity partition completed in 1 step(s)
     5 parts
     partitioning = [[1, 5]]
  intersection with blocku = {94,109}
cell #13
  cell size = 1
  cell W-rep = phi[1,1,1,1,1,1]
  special rep = phi[1,1,1,1,1,1] ; dim = 1
  special orbit = [1, 1, 1, 1, 1, 1]
  tau-infinity partition completed in 1 step(s)
     1 parts
     partitioning = [[1, 1]]
  intersection with blocku = {119}