TII subcells for the PSO(7,7) x Spin(12,2) block of PSO14
#
cell#0 , |C| = 1
special orbit = [13, 1]
special rep = [[], [7]] , dim = 1
cell rep = phi[[],[7]]
TII depth = 1
TII multiplicity polynomial = X
TII subcells:
  tii[35,1] := {0}

cell#1 , |C| = 7
special orbit = [11, 3]
special rep = [[1], [6]] , dim = 7
cell rep = phi[[1],[6]]
TII depth = 1
TII multiplicity polynomial = 7*X
TII subcells:
  tii[34,1] := {0}
  tii[34,2] := {1}
  tii[34,3] := {2}
  tii[34,4] := {3}
  tii[34,5] := {4}
  tii[34,6] := {5}
  tii[34,7] := {6}

cell#2 , |C| = 7
special orbit = [11, 3]
special rep = [[1], [6]] , dim = 7
cell rep = phi[[1],[6]]
TII depth = 1
TII multiplicity polynomial = 7*X
TII subcells:
  tii[34,1] := {0}
  tii[34,2] := {1}
  tii[34,3] := {2}
  tii[34,4] := {3}
  tii[34,5] := {4}
  tii[34,6] := {5}
  tii[34,7] := {6}

cell#3 , |C| = 6
special orbit = [11, 1, 1, 1]
special rep = [[], [6, 1]] , dim = 6
cell rep = phi[[],[6, 1]]
TII depth = 1
TII multiplicity polynomial = 6*X
TII subcells:
  tii[33,1] := {2}
  tii[33,2] := {0}
  tii[33,3] := {1}
  tii[33,4] := {3}
  tii[33,5] := {4}
  tii[33,6] := {5}

cell#4 , |C| = 56
special orbit = [9, 3, 1, 1]
special rep = [[1], [5, 1]] , dim = 35
cell rep = phi[[1],[5, 1]]+phi[[1, 1],[5]]
TII depth = 3
TII multiplicity polynomial = 21*X^2+14*X
TII subcells:
  tii[31,1] := {6}
  tii[31,2] := {18}
  tii[31,3] := {36}
  tii[31,4] := {49}
  tii[31,5] := {0, 1}
  tii[31,6] := {2}
  tii[31,7] := {3, 4}
  tii[31,8] := {5}
  tii[31,9] := {7, 8}
  tii[31,10] := {11}
  tii[31,11] := {13, 14}
  tii[31,12] := {22, 23}
  tii[31,13] := {24, 25}
  tii[31,14] := {9, 10}
  tii[31,15] := {15, 16}
  tii[31,16] := {12}
  tii[31,17] := {17}
  tii[31,18] := {20, 21}
  tii[31,19] := {32, 33}
  tii[31,20] := {34, 35}
  tii[31,21] := {26, 27}
  tii[31,22] := {28}
  tii[31,23] := {30, 31}
  tii[31,24] := {40, 41}
  tii[31,25] := {42, 43}
  tii[31,26] := {38, 39}
  tii[31,27] := {45, 46}
  tii[31,28] := {47, 48}
  tii[31,29] := {50, 51}
  tii[31,30] := {52, 53}
  tii[31,31] := {54, 55}
  tii[31,32] := {19}
  tii[31,33] := {29}
  tii[31,34] := {37}
  tii[31,35] := {44}

cell#5 , |C| = 6
special orbit = [11, 1, 1, 1]
special rep = [[], [6, 1]] , dim = 6
cell rep = phi[[],[6, 1]]
TII depth = 1
TII multiplicity polynomial = 6*X
TII subcells:
  tii[33,1] := {5}
  tii[33,2] := {4}
  tii[33,3] := {3}
  tii[33,4] := {2}
  tii[33,5] := {1}
  tii[33,6] := {0}

cell#6 , |C| = 6
special orbit = [11, 1, 1, 1]
special rep = [[], [6, 1]] , dim = 6
cell rep = phi[[],[6, 1]]
TII depth = 1
TII multiplicity polynomial = 6*X
TII subcells:
  tii[33,1] := {5}
  tii[33,2] := {4}
  tii[33,3] := {3}
  tii[33,4] := {2}
  tii[33,5] := {1}
  tii[33,6] := {0}

cell#7 , |C| = 15
special orbit = [9, 1, 1, 1, 1, 1]
special rep = [[], [5, 1, 1]] , dim = 15
cell rep = phi[[],[5, 1, 1]]
TII depth = 1
TII multiplicity polynomial = 15*X
TII subcells:
  tii[30,1] := {14}
  tii[30,2] := {9}
  tii[30,3] := {5}
  tii[30,4] := {2}
  tii[30,5] := {13}
  tii[30,6] := {8}
  tii[30,7] := {4}
  tii[30,8] := {12}
  tii[30,9] := {7}
  tii[30,10] := {11}
  tii[30,11] := {0}
  tii[30,12] := {1}
  tii[30,13] := {3}
  tii[30,14] := {6}
  tii[30,15] := {10}

cell#8 , |C| = 15
special orbit = [9, 1, 1, 1, 1, 1]
special rep = [[], [5, 1, 1]] , dim = 15
cell rep = phi[[],[5, 1, 1]]
TII depth = 1
TII multiplicity polynomial = 15*X
TII subcells:
  tii[30,1] := {14}
  tii[30,2] := {9}
  tii[30,3] := {5}
  tii[30,4] := {2}
  tii[30,5] := {13}
  tii[30,6] := {8}
  tii[30,7] := {4}
  tii[30,8] := {12}
  tii[30,9] := {7}
  tii[30,10] := {11}
  tii[30,11] := {0}
  tii[30,12] := {1}
  tii[30,13] := {3}
  tii[30,14] := {6}
  tii[30,15] := {10}