# wcell data for g = B5 , G_C = Spin11 , G_R = Spin(6,5) non-empty blocks: Spin(6,5) x PSp(5) Spin(6,5) x PSp(4,1) Spin(6,5) x PSp(3,2) Spin(6,5) x PSp(10,R) Spin(6,5) x PSp(5) block: cell #0 cell size = 1 cell W-rep = phi[[5],[]] special rep = phi[[5],[]] ; dim = 1 special orbit = [11] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {} Spin(6,5) x PSp(4,1) block: cell #0 cell size = 1 cell W-rep = phi[[5],[]] special rep = phi[[5],[]] ; dim = 1 special orbit = [11] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {} cell #1 cell size = 9 cell W-rep = phi[[4, 1],[]]+phi[[4],[1]] special rep = phi[[4],[1]] ; dim = 5 special orbit = [9, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 1], [2, 4]] intersection with blocku = {} cell #2 cell size = 15 cell W-rep = phi[[3, 1],[1]] special rep = phi[[3, 1],[1]] ; dim = 15 special orbit = [7, 2, 2] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {} Spin(6,5) x PSp(3,2) block: cell #0 cell size = 1 cell W-rep = phi[[5],[]] special rep = phi[[5],[]] ; dim = 1 special orbit = [11] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {} cell #1 cell size = 9 cell W-rep = phi[[4, 1],[]]+phi[[4],[1]] special rep = phi[[4],[1]] ; dim = 5 special orbit = [9, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 1], [2, 4]] intersection with blocku = {} cell #2 cell size = 15 cell W-rep = phi[[3, 2],[]]+phi[[3],[2]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {} cell #3 cell size = 15 cell W-rep = phi[[3, 1],[1]] special rep = phi[[3, 1],[1]] ; dim = 15 special orbit = [7, 2, 2] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {} cell #4 cell size = 30 cell W-rep = phi[[2, 2],[1]]+phi[[2, 1],[2]] special rep = phi[[2, 1],[2]] ; dim = 20 special orbit = [5, 3, 3] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {} cell #5 cell size = 15 cell W-rep = phi[[3, 1],[1]] special rep = phi[[3, 1],[1]] ; dim = 15 special orbit = [7, 2, 2] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {} cell #6 cell size = 35 cell W-rep = phi[[2, 1, 1],[1]]+phi[[2, 1],[1, 1]] special rep = phi[[2, 1],[1, 1]] ; dim = 20 special orbit = [5, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {} cell #7 cell size = 10 cell W-rep = phi[[1, 1, 1],[1, 1]] special rep = phi[[1, 1, 1],[1, 1]] ; dim = 10 special orbit = [3, 2, 2, 2, 2] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {} Spin(6,5) x PSp(10,R) block: cell #0 cell size = 1 cell W-rep = phi[[5],[]] special rep = phi[[5],[]] ; dim = 1 special orbit = [11] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {0} cell #1 cell size = 1 cell W-rep = phi[[5],[]] special rep = phi[[5],[]] ; dim = 1 special orbit = [11] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {5} cell #2 cell size = 9 cell W-rep = phi[[4, 1],[]]+phi[[4],[1]] special rep = phi[[4],[1]] ; dim = 5 special orbit = [9, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 1], [2, 4]] intersection with blocku = {1,6,8,14,20,23,33,35,48} cell #3 cell size = 6 cell W-rep = phi[[4],[1]]+phi[[],[5]] special rep = phi[[4],[1]] ; dim = 5 special orbit = [9, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 4], [2, 1]] intersection with blocku = {44} cell #4 cell size = 15 cell W-rep = phi[[3],[2]]+phi[[1],[4]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {2,4,9,26,27,38,40,54} cell #5 cell size = 15 cell W-rep = phi[[3, 2],[]]+phi[[3],[2]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {3,11,21,24,32,34,47,50,51,57,60} cell #6 cell size = 15 cell W-rep = phi[[3],[2]]+phi[[1],[4]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {45,56,61} cell #7 cell size = 10 cell W-rep = phi[[2],[3]] special rep = phi[[2],[3]] ; dim = 10 special orbit = [5, 5, 1] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {92} cell #8 cell size = 15 cell W-rep = phi[[3, 1],[1]] special rep = phi[[3, 1],[1]] ; dim = 15 special orbit = [7, 2, 2] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {62,68,74} cell #9 cell size = 30 cell W-rep = phi[[2, 1],[2]]+phi[[1, 1],[3]] special rep = phi[[2, 1],[2]] ; dim = 20 special orbit = [5, 3, 3] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {7,22,39,52,64,75,97,99} cell #10 cell size = 15 cell W-rep = phi[[3],[2]]+phi[[1],[4]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {10,12,17,28,30,41,43,55} cell #11 cell size = 14 cell W-rep = phi[[3],[1, 1]]+phi[[],[4, 1]] special rep = phi[[3],[1, 1]] ; dim = 10 special orbit = [7, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 6], [2, 4]] intersection with blocku = {84} cell #12 cell size = 25 cell W-rep = phi[[2, 2, 1],[]]+phi[[2],[2, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 15], [2, 5]] intersection with blocku = {13,18,29,31,49,59,63,66,69,72,85,106,108,110} cell #13 cell size = 15 cell W-rep = phi[[3, 1],[1]] special rep = phi[[3, 1],[1]] ; dim = 15 special orbit = [7, 2, 2] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {65,71,77} cell #14 cell size = 30 cell W-rep = phi[[2, 1],[2]]+phi[[1, 1],[3]] special rep = phi[[2, 1],[2]] ; dim = 20 special orbit = [5, 3, 3] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {15,25,42,53,67,78,98,100} cell #15 cell size = 15 cell W-rep = phi[[3],[2]]+phi[[1],[4]] special rep = phi[[3],[2]] ; dim = 10 special orbit = [7, 3, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {} cell #16 cell size = 10 cell W-rep = phi[[2],[3]] special rep = phi[[2],[3]] ; dim = 10 special orbit = [5, 5, 1] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {46,58} cell #17 cell size = 14 cell W-rep = phi[[3],[1, 1]]+phi[[],[4, 1]] special rep = phi[[3],[1, 1]] ; dim = 10 special orbit = [7, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 6], [2, 4]] intersection with blocku = {115} cell #18 cell size = 10 cell W-rep = phi[[2],[3]] special rep = phi[[2],[3]] ; dim = 10 special orbit = [5, 5, 1] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {} cell #19 cell size = 30 cell W-rep = phi[[2, 1],[2]]+phi[[1, 1],[3]] special rep = phi[[2, 1],[2]] ; dim = 20 special orbit = [5, 3, 3] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {107,109} cell #20 cell size = 35 cell W-rep = phi[[2],[2, 1]]+phi[[1],[3, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {119,149} cell #21 cell size = 35 cell W-rep = phi[[2],[2, 1]]+phi[[1],[3, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {} cell #22 cell size = 30 cell W-rep = phi[[1, 1],[2, 1]]+phi[[1],[2, 2]] special rep = phi[[1, 1],[2, 1]] ; dim = 20 special orbit = [3, 3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {16,36,70,76,123,161} cell #23 cell size = 30 cell W-rep = phi[[1, 1],[2, 1]]+phi[[1],[2, 2]] special rep = phi[[1, 1],[2, 1]] ; dim = 20 special orbit = [3, 3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {19,37,73,79,126,162} cell #24 cell size = 35 cell W-rep = phi[[2],[2, 1]]+phi[[1],[3, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {83,104} cell #25 cell size = 35 cell W-rep = phi[[2],[2, 1]]+phi[[1],[3, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {117,147} cell #26 cell size = 35 cell W-rep = phi[[2, 1, 1],[1]]+phi[[2, 1],[1, 1]] special rep = phi[[2, 1],[1, 1]] ; dim = 20 special orbit = [5, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {134,137,151,152} cell #27 cell size = 30 cell W-rep = phi[[1, 1],[2, 1]]+phi[[1],[2, 2]] special rep = phi[[1, 1],[2, 1]] ; dim = 20 special orbit = [3, 3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {168,211} cell #28 cell size = 10 cell W-rep = phi[[2],[3]] special rep = phi[[2],[3]] ; dim = 10 special orbit = [5, 5, 1] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {} cell #29 cell size = 35 cell W-rep = phi[[2],[2, 1]]+phi[[1],[3, 1]] special rep = phi[[2],[2, 1]] ; dim = 20 special orbit = [5, 3, 1, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 5], [2, 15]] intersection with blocku = {} cell #30 cell size = 16 cell W-rep = phi[[2],[1, 1, 1]]+phi[[],[3, 1, 1]] special rep = phi[[2],[1, 1, 1]] ; dim = 10 special orbit = [5, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 4], [2, 6]] intersection with blocku = {303} cell #31 cell size = 15 cell W-rep = phi[[1],[2, 1, 1]] special rep = phi[[1],[2, 1, 1]] ; dim = 15 special orbit = [3, 3, 1, 1, 1, 1, 1] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {132} cell #32 cell size = 25 cell W-rep = phi[[2, 1],[1, 1]]+phi[[],[3, 2]] special rep = phi[[2, 1],[1, 1]] ; dim = 20 special orbit = [5, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 15], [2, 5]] intersection with blocku = {} cell #33 cell size = 30 cell W-rep = phi[[1, 1],[2, 1]]+phi[[1],[2, 2]] special rep = phi[[1, 1],[2, 1]] ; dim = 20 special orbit = [3, 3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {217} cell #34 cell size = 16 cell W-rep = phi[[2],[1, 1, 1]]+phi[[],[3, 1, 1]] special rep = phi[[2],[1, 1, 1]] ; dim = 10 special orbit = [5, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 4], [2, 6]] intersection with blocku = {299} cell #35 cell size = 15 cell W-rep = phi[[1],[2, 1, 1]] special rep = phi[[1],[2, 1, 1]] ; dim = 15 special orbit = [3, 3, 1, 1, 1, 1, 1] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {245} cell #36 cell size = 10 cell W-rep = phi[[1, 1, 1],[1, 1]] special rep = phi[[1, 1, 1],[1, 1]] ; dim = 10 special orbit = [3, 2, 2, 2, 2] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {315} cell #37 cell size = 10 cell W-rep = phi[[1, 1, 1],[1, 1]] special rep = phi[[1, 1, 1],[1, 1]] ; dim = 10 special orbit = [3, 2, 2, 2, 2] tau-infinity partition completed in 2 step(s) 10 parts partitioning = [[1, 10]] intersection with blocku = {316} cell #38 cell size = 15 cell W-rep = phi[[1],[2, 1, 1]] special rep = phi[[1],[2, 1, 1]] ; dim = 15 special orbit = [3, 3, 1, 1, 1, 1, 1] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {367} cell #39 cell size = 30 cell W-rep = phi[[1, 1],[2, 1]]+phi[[1],[2, 2]] special rep = phi[[1, 1],[2, 1]] ; dim = 20 special orbit = [3, 3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 20 parts partitioning = [[1, 10], [2, 10]] intersection with blocku = {} cell #40 cell size = 15 cell W-rep = phi[[1],[2, 1, 1]] special rep = phi[[1],[2, 1, 1]] ; dim = 15 special orbit = [3, 3, 1, 1, 1, 1, 1] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {} cell #41 cell size = 15 cell W-rep = phi[[1, 1],[1, 1, 1]]+phi[[],[2, 2, 1]] special rep = phi[[1, 1],[1, 1, 1]] ; dim = 10 special orbit = [3, 2, 2, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {} cell #42 cell size = 15 cell W-rep = phi[[1],[2, 1, 1]] special rep = phi[[1],[2, 1, 1]] ; dim = 15 special orbit = [3, 3, 1, 1, 1, 1, 1] tau-infinity partition completed in 3 step(s) 15 parts partitioning = [[1, 15]] intersection with blocku = {} cell #43 cell size = 9 cell W-rep = phi[[1],[1, 1, 1, 1]]+phi[[],[2, 1, 1, 1]] special rep = phi[[1],[1, 1, 1, 1]] ; dim = 5 special orbit = [3, 1, 1, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 1], [2, 4]] intersection with blocku = {562} cell #44 cell size = 15 cell W-rep = phi[[1, 1],[1, 1, 1]]+phi[[],[2, 2, 1]] special rep = phi[[1, 1],[1, 1, 1]] ; dim = 10 special orbit = [3, 2, 2, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 10 parts partitioning = [[1, 5], [2, 5]] intersection with blocku = {} cell #45 cell size = 9 cell W-rep = phi[[1],[1, 1, 1, 1]]+phi[[],[2, 1, 1, 1]] special rep = phi[[1],[1, 1, 1, 1]] ; dim = 5 special orbit = [3, 1, 1, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 5 parts partitioning = [[1, 1], [2, 4]] intersection with blocku = {626} cell #46 cell size = 1 cell W-rep = phi[[],[1, 1, 1, 1, 1]] special rep = phi[[],[1, 1, 1, 1, 1]] ; dim = 1 special orbit = [1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {850}