# wcell data for g = A7 , G_C = SL8 , G_R = SU(4,4) non-empty blocks: SU(4,4) x PGL(4,H) SU(4,4) x PGL(8,R) SU(4,4) x PGL(4,H) block: cell #0 cell size = 1 cell W-rep = phi[8] special rep = phi[8] ; dim = 1 special orbit = [8] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {} cell #1 cell size = 20 cell W-rep = phi[6,2] special rep = phi[6,2] ; dim = 20 special orbit = [6, 2] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {} cell #2 cell size = 14 cell W-rep = phi[4,4] special rep = phi[4,4] ; dim = 14 special orbit = [4, 4] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {} cell #3 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {} cell #4 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {} SU(4,4) x PGL(8,R) block: cell #0 cell size = 1 cell W-rep = phi[8] special rep = phi[8] ; dim = 1 special orbit = [8] 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[8] special rep = phi[8] ; dim = 1 special orbit = [8] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {42} cell #2 cell size = 7 cell W-rep = phi[7,1] special rep = phi[7,1] ; dim = 7 special orbit = [7, 1] tau-infinity partition completed in 1 step(s) 7 parts partitioning = [[1, 7]] intersection with blocku = {1,8,24,83,115,151,190} cell #3 cell size = 20 cell W-rep = phi[6,2] special rep = phi[6,2] ; dim = 20 special orbit = [6, 2] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {2,4,6,13,20,31,90,94,97,130,132,133,170,171,176,222,253,264} cell #4 cell size = 7 cell W-rep = phi[7,1] special rep = phi[7,1] ; dim = 7 special orbit = [7, 1] tau-infinity partition completed in 1 step(s) 7 parts partitioning = [[1, 7]] intersection with blocku = {7,22,35,70,114,159,203} cell #5 cell size = 20 cell W-rep = phi[6,2] special rep = phi[6,2] ; dim = 20 special orbit = [6, 2] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {3,5,17,75,81,110,113,150,152,191,196,210,230,240,274,283,294} cell #6 cell size = 20 cell W-rep = phi[6,2] special rep = phi[6,2] ; dim = 20 special orbit = [6, 2] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {12,26,29,71,76,116,121,157,160,195,201,214,229,243,270,284,298} cell #7 cell size = 28 cell W-rep = phi[5,3] special rep = phi[5,3] ; dim = 28 special orbit = [5, 3] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {10,78,111,155,193,211,231,241,273,282,295,421,428,435,438} cell #8 cell size = 21 cell W-rep = phi[6,1,1] special rep = phi[6,1,1] ; dim = 21 special orbit = [6, 1, 1] tau-infinity partition completed in 1 step(s) 21 parts partitioning = [[1, 21]] intersection with blocku = {300,320,340,360,380,400} cell #9 cell size = 64 cell W-rep = phi[5,2,1] special rep = phi[5,2,1] ; dim = 64 special orbit = [5, 2, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {9,11,25,27,91,95,96,131,135,156,192,194,199,223,235,276,278,288,289,301,306,321,326,341,361,367,402,409,432,471,477,489,542,548,554,560,574,584} cell #10 cell size = 28 cell W-rep = phi[5,3] special rep = phi[5,3] ; dim = 28 special orbit = [5, 3] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {19,73,118,154,198,213,228,242,271,285,297,420,429,434,439} cell #11 cell size = 64 cell W-rep = phi[5,2,1] special rep = phi[5,2,1] ; dim = 64 special orbit = [5, 2, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {16,21,32,33,72,74,79,117,134,138,174,177,178,216,218,246,247,259,266,304,309,345,350,365,385,391,405,411,424,452,458,482,501,514,518,532,566,580} cell #12 cell size = 14 cell W-rep = phi[4,4] special rep = phi[4,4] ; dim = 14 special orbit = [4, 4] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {15,92,137,173,224,252,265,426} cell #13 cell size = 14 cell W-rep = phi[4,4] special rep = phi[4,4] ; dim = 14 special orbit = [4, 4] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {690} cell #14 cell size = 70 cell W-rep = phi[4,3,1] special rep = phi[4,3,1] ; dim = 70 special orbit = [4, 3, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {14,80,112,172,212,248,258,302,322,342,383,403,422,454,460,500,506,512,521,530,569,578,703,705,707,733} cell #15 cell size = 70 cell W-rep = phi[4,3,1] special rep = phi[4,3,1] ; dim = 70 special orbit = [4, 3, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {18,93,153,197,234,277,296,303,323,364,384,404,436,470,476,488,524,543,549,562,572,585,725,727,731,737} cell #16 cell size = 20 cell W-rep = phi[6,2] special rep = phi[6,2] ; dim = 20 special orbit = [6, 2] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {52,53,54,58,60,64,104,107,108,143,145,146,185,186,188,226,257,268} cell #17 cell size = 21 cell W-rep = phi[6,1,1] special rep = phi[6,1,1] ; dim = 21 special orbit = [6, 1, 1] tau-infinity partition completed in 1 step(s) 21 parts partitioning = [[1, 21]] intersection with blocku = {313,333,353,372,392,413} cell #18 cell size = 64 cell W-rep = phi[5,2,1] special rep = phi[5,2,1] ; dim = 64 special orbit = [5, 2, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {23,38,41,51,86,87,88,120,140,142,175,179,184,220,221,250,251,260,267,317,318,346,352,366,381,386,401,406,425,456,462,486,505,515,522,531,570,579} cell #19 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {28,77,136,200,217,272,290,307,348,368,410,430,453,459,483,544,557,563,568,586,719,721,729,735,788,903,916} cell #20 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {30,36,45,47,55,101,119,123,125,158,161,165,182,236,244,261,324,329,334,344,349,362,369,382,389,393,480,490,507,513,526,534,843} cell #21 cell size = 64 cell W-rep = phi[5,2,1] special rep = phi[5,2,1] ; dim = 64 special orbit = [5, 2, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {37,49,50,56,98,103,105,141,144,163,206,207,208,225,237,280,281,292,293,305,311,325,331,351,371,373,416,418,433,472,478,491,546,552,558,564,577,588} cell #22 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {34,85,139,202,219,275,291,315,343,363,412,431,455,461,485,547,555,561,571,587,720,722,730,736,790,906,914} cell #23 cell size = 35 cell W-rep = phi[5,1,1,1] special rep = phi[5,1,1,1] ; dim = 35 special orbit = [5, 1, 1, 1] tau-infinity partition completed in 1 step(s) 35 parts partitioning = [[1, 35]] intersection with blocku = {616,651,743,794,919} cell #24 cell size = 14 cell W-rep = phi[4,4] special rep = phi[4,4] ; dim = 14 special orbit = [4, 4] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {59,106,148,187,227,256,269,427} cell #25 cell size = 70 cell W-rep = phi[4,3,1] special rep = phi[4,3,1] ; dim = 70 special orbit = [4, 3, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {40,82,124,181,215,249,262,316,335,354,388,408,423,457,463,504,510,516,519,533,567,581,704,706,708,734} cell #26 cell size = 56 cell W-rep = phi[3,3,1,1] special rep = phi[3,3,1,1] ; dim = 56 special orbit = [3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {39,99,180,254,312,332,387,407,503,509,525,573,622,657,744,814,830,836,842,902,908,921,1021,1082} cell #27 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {787,835,841,901,907,913} cell #28 cell size = 90 cell W-rep = phi[4,2,1,1] special rep = phi[4,2,1,1] ; dim = 90 special orbit = [4, 2, 1, 1] tau-infinity partition completed in 2 step(s) 90 parts partitioning = [[1, 90]] intersection with blocku = {594,599,632,634,672,679,757,759,806,847,848,891,1026,1034} cell #29 cell size = 42 cell W-rep = phi[3,3,2] special rep = phi[3,3,2] ; dim = 42 special orbit = [3, 3, 2] tau-infinity partition completed in 2 step(s) 42 parts partitioning = [[1, 42]] intersection with blocku = {1062,1076,1078} cell #30 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {43,122,204,286,327,347,414,550,556,582,597,637,684,758,861,873,899,909,915,1052,1262,1268,1440} cell #31 cell size = 70 cell W-rep = phi[4,3,1] special rep = phi[4,3,1] ; dim = 70 special orbit = [4, 3, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {44,100,164,205,238,279,299,308,328,375,396,417,437,473,479,492,528,545,551,565,576,589,726,728,732,738} cell #32 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {46,84,162,232,314,370,390,474,484,520,604,640,680,773,783,789,837,849,885,1032,1190,1256,1384} cell #33 cell size = 35 cell W-rep = phi[5,1,1,1] special rep = phi[5,1,1,1] ; dim = 35 special orbit = [5, 1, 1, 1] tau-infinity partition completed in 1 step(s) 35 parts partitioning = [[1, 35]] intersection with blocku = {615,661,739,795,923} cell #34 cell size = 56 cell W-rep = phi[3,3,1,1] special rep = phi[3,3,1,1] ; dim = 56 special orbit = [3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {48,102,183,255,310,330,394,415,502,508,527,575,620,665,741,813,832,838,844,904,910,924,1020,1083} cell #35 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {63,65,66,67,68,109,127,128,129,167,168,169,189,239,245,263,337,338,339,357,358,377,378,397,398,399,481,493,511,517,529,535,846} cell #36 cell size = 56 cell W-rep = phi[4,2,2] special rep = phi[4,2,2] ; dim = 56 special orbit = [4, 2, 2] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {791,839,845,905,911,917} cell #37 cell size = 90 cell W-rep = phi[4,2,1,1] special rep = phi[4,2,1,1] ; dim = 90 special orbit = [4, 2, 1, 1] tau-infinity partition completed in 2 step(s) 90 parts partitioning = [[1, 90]] intersection with blocku = {607,608,646,647,687,688,761,762,810,851,852,894,1027,1035} cell #38 cell size = 42 cell W-rep = phi[3,3,2] special rep = phi[3,3,2] ; dim = 42 special orbit = [3, 3, 2] tau-infinity partition completed in 2 step(s) 42 parts partitioning = [[1, 42]] intersection with blocku = {1063,1077,1079} cell #39 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {57,89,166,233,319,374,395,475,487,523,609,642,683,774,786,792,840,850,888,1033,1193,1259,1385} cell #40 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {61,147,355,376,624,664,797} cell #41 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {62,126,209,287,336,356,419,553,559,583,605,645,689,760,864,876,900,912,918,1053,1265,1271,1441} cell #42 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {69,149,359,379,629,669,798} cell #43 cell size = 90 cell W-rep = phi[4,2,1,1] special rep = phi[4,2,1,1] ; dim = 90 special orbit = [4, 2, 1, 1] tau-infinity partition completed in 2 step(s) 90 parts partitioning = [[1, 90]] intersection with blocku = {613,653,742,793,826,866,920,1010,1012,1047,1064,1081,1084} cell #44 cell size = 90 cell W-rep = phi[4,2,1,1] special rep = phi[4,2,1,1] ; dim = 90 special orbit = [4, 2, 1, 1] tau-infinity partition completed in 2 step(s) 90 parts partitioning = [[1, 90]] intersection with blocku = {618,658,740,796,824,868,922,1011,1013,1046,1065,1080,1085} cell #45 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {1622} cell #46 cell size = 28 cell W-rep = phi[2,2,2,1,1] special rep = phi[2,2,2,1,1] ; dim = 28 special orbit = [2, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {939,999,1490,1550} cell #47 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {1625} cell #48 cell size = 28 cell W-rep = phi[2,2,2,1,1] special rep = phi[2,2,2,1,1] ; dim = 28 special orbit = [2, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {944,1004,1493,1553} cell #49 cell size = 35 cell W-rep = phi[4,1,1,1,1] special rep = phi[4,1,1,1,1] ; dim = 35 special orbit = [4, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 35 parts partitioning = [[1, 35]] intersection with blocku = {1452,1488,1548,1638} cell #50 cell size = 56 cell W-rep = phi[3,3,1,1] special rep = phi[3,3,1,1] ; dim = 56 special orbit = [3, 3, 1, 1] tau-infinity partition completed in 2 step(s) 56 parts partitioning = [[1, 56]] intersection with blocku = {1347,1348,1349} cell #51 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {1185,1275,1378,1434,1449,1451} cell #52 cell size = 64 cell W-rep = phi[3,2,1,1,1] special rep = phi[3,2,1,1,1] ; dim = 64 special orbit = [3, 2, 1, 1, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {955,1454,1551,1641,1715,1729,1807} cell #53 cell size = 35 cell W-rep = phi[4,1,1,1,1] special rep = phi[4,1,1,1,1] ; dim = 35 special orbit = [4, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 35 parts partitioning = [[1, 35]] intersection with blocku = {1456,1492,1552,1642} cell #54 cell size = 70 cell W-rep = phi[3,2,2,1] special rep = phi[3,2,2,1] ; dim = 70 special orbit = [3, 2, 2, 1] tau-infinity partition completed in 2 step(s) 70 parts partitioning = [[1, 70]] intersection with blocku = {1183,1273,1379,1435,1448,1450} cell #55 cell size = 64 cell W-rep = phi[3,2,1,1,1] special rep = phi[3,2,1,1,1] ; dim = 64 special orbit = [3, 2, 1, 1, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {957,1457,1549,1639,1716,1730,1808} cell #56 cell size = 64 cell W-rep = phi[3,2,1,1,1] special rep = phi[3,2,1,1,1] ; dim = 64 special orbit = [3, 2, 1, 1, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {972,1453,1489,1640,1751,1765,1809} cell #57 cell size = 64 cell W-rep = phi[3,2,1,1,1] special rep = phi[3,2,1,1,1] ; dim = 64 special orbit = [3, 2, 1, 1, 1] tau-infinity partition completed in 3 step(s) 64 parts partitioning = [[1, 64]] intersection with blocku = {980,1455,1491,1643,1752,1766,1810} cell #58 cell size = 14 cell W-rep = phi[2,2,2,2] special rep = phi[2,2,2,2] ; dim = 14 special orbit = [2, 2, 2, 2] tau-infinity partition completed in 1 step(s) 14 parts partitioning = [[1, 14]] intersection with blocku = {2010} cell #59 cell size = 28 cell W-rep = phi[2,2,2,1,1] special rep = phi[2,2,2,1,1] ; dim = 28 special orbit = [2, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {2113,2131} cell #60 cell size = 28 cell W-rep = phi[2,2,2,1,1] special rep = phi[2,2,2,1,1] ; dim = 28 special orbit = [2, 2, 2, 1, 1] tau-infinity partition completed in 2 step(s) 28 parts partitioning = [[1, 28]] intersection with blocku = {2114,2132} cell #61 cell size = 20 cell W-rep = phi[2,2,1,1,1,1] special rep = phi[2,2,1,1,1,1] ; dim = 20 special orbit = [2, 2, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {2135,2255,2307} cell #62 cell size = 20 cell W-rep = phi[2,2,1,1,1,1] special rep = phi[2,2,1,1,1,1] ; dim = 20 special orbit = [2, 2, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {2138,2258,2308} cell #63 cell size = 21 cell W-rep = phi[3,1,1,1,1,1] special rep = phi[3,1,1,1,1,1] ; dim = 21 special orbit = [3, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 21 parts partitioning = [[1, 21]] intersection with blocku = {2164,2282,2393} cell #64 cell size = 21 cell W-rep = phi[3,1,1,1,1,1] special rep = phi[3,1,1,1,1,1] ; dim = 21 special orbit = [3, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 21 parts partitioning = [[1, 21]] intersection with blocku = {2166,2281,2394} cell #65 cell size = 20 cell W-rep = phi[2,2,1,1,1,1] special rep = phi[2,2,1,1,1,1] ; dim = 20 special orbit = [2, 2, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 20 parts partitioning = [[1, 20]] intersection with blocku = {2480,2487} cell #66 cell size = 7 cell W-rep = phi[2,1,1,1,1,1,1] special rep = phi[2,1,1,1,1,1,1] ; dim = 7 special orbit = [2, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 7 parts partitioning = [[1, 7]] intersection with blocku = {2738,2776} cell #67 cell size = 7 cell W-rep = phi[2,1,1,1,1,1,1] special rep = phi[2,1,1,1,1,1,1] ; dim = 7 special orbit = [2, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 7 parts partitioning = [[1, 7]] intersection with blocku = {2739,2777} cell #68 cell size = 1 cell W-rep = phi[1,1,1,1,1,1,1,1] special rep = phi[1,1,1,1,1,1,1,1] ; dim = 1 special orbit = [1, 1, 1, 1, 1, 1, 1, 1] tau-infinity partition completed in 1 step(s) 1 parts partitioning = [[1, 1]] intersection with blocku = {2834}