{ "Index":131, "Name":"10_47", "RolfsenName":"10_47", "DTname":"10a_15", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-9, -11, -17, -1, -3, -5, 19, 13, -7, 15}", "Acode":"{-5, -6, -9, -1, -2, -3, 10, 7, -4, 8}", "PDcode":[ "{2, 9, 3, 10}", "{4, 11, 5, 12}", "{6, 17, 7, 18}", "{8, 1, 9, 2}", "{10, 3, 11, 4}", "{12, 5, 13, 6}", "{14, 20, 15, 19}", "{16, 14, 17, 13}", "{18, 7, 19, 8}", "{20, 16, 1, 15}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{5, 2, 9}", [], [ "{5, -2, 6, 1}", "{2, -6, 3, 1}", "{6, -3, 7, 1}", "{2, -5, 1, 2}", "{5, -1, 4, 2}", "{9, -4, 10, 1}", "{9, 7, 8, 2}" ], "{3, 7}", "{10}", 10 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + u + a^2*u - a*b*u + u^2 - a^2*u^3", "u + a*b*u - b^2*u - u^2 - u^3 - a*b*u^3", "1 - a - b + a*b + b^2 - u^2 - 2*a*u^2 + 2*a^2*u^2 + 2*b*u^2 + 3*a*b*u^2 + 3*a*u^4 - 6*a^2*u^4 - b*u^4 - 16*a*b*u^4 - 10*b^2*u^4 - a*u^6 + 10*a^2*u^6 + 28*a*b*u^6 + 21*b^2*u^6 - 9*a^2*u^8 - 26*a*b*u^8 - 18*b^2*u^8 + 5*a^2*u^10 + 12*a*b*u^10 + 7*b^2*u^10 - a^2*u^12 - 2*a*b*u^12 - b^2*u^12", "-b + b^2 - 2*u^2 + 2*b*u^2 + 2*a*b*u^2 + 3*b^2*u^2 + u^4 + 4*a*u^4 - 3*b*u^4 - 3*a*b*u^4 - 6*b^2*u^4 - 4*a*u^6 - 2*a^2*u^6 + b*u^6 - 4*a*b*u^6 - 4*b^2*u^6 + a*u^8 + 4*a^2*u^8 + 14*a*b*u^8 + 11*b^2*u^8 - 4*a^2*u^10 - 10*a*b*u^10 - 6*b^2*u^10 + a^2*u^12 + 2*a*b*u^12 + b^2*u^12" ], "TimingForPrimaryIdeals":0.119228 }, "v":{ "CheckEq":[ "-b + b^2", "1 - a - b + a*b + b^2", "-(b^2*v)", "-1 + v - a*b*v" ], "TimingForPrimaryIdeals":7.5237e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_47_0", "Generators":[ "-2 + b + u + 37*u^3 - 54*u^4 - 63*u^5 + 294*u^6 - 136*u^7 - 518*u^8 + 663*u^9 + 382*u^10 - 1191*u^11 - 86*u^12 + 1190*u^13 - 28*u^14 - 692*u^15 + 16*u^16 + 231*u^17 - 2*u^18 - 41*u^19 + 3*u^21", "1 + a - 4*u + 7*u^2 - 12*u^3 - 17*u^4 + 76*u^5 - 88*u^6 - 96*u^7 + 295*u^8 - 102*u^9 - 373*u^10 + 450*u^11 + 272*u^12 - 580*u^13 - 140*u^14 + 382*u^15 + 51*u^16 - 138*u^17 - 11*u^18 + 26*u^19 + u^20 - 2*u^21", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.4073e-2, "TimingZeroDimVars":7.3413e-2, "TimingmagmaVCompNormalize":7.480200000000001e-2, "TimingNumberOfSols":0.217476, "TimingIsRadical":1.7035e-2, "TimingArcColoring":6.0019e-2, "TimingObstruction":4.0369e-2, "TimingComplexVolumeN":1.8930744e1, "TimingaCuspShapeN":0.132633, "TiminguValues":0.669864, "TiminguPolysN":5.697e-2, "TiminguPolys":0.89149, "TimingaCuspShape":0.118761, "TimingRepresentationsN":0.200592, "TiminguValues_ij":0.178093, "TiminguPoly_ij":1.488471, "TiminguPolys_ij_N":6.449200000000001e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":22, "IsRadical":true, "ArcColoring":[ [ "-u", "u" ], [ 0, "u" ], [ "u", "u - u^3" ], [ "1 - u^2", "u^2" ], "{1, 0}", [ 1, "-u^2" ], [ "1 - u^2", "-2*u^2 + u^4" ], [ "4*u - 10*u^2 + 5*u^3 + 33*u^4 - 71*u^5 + 20*u^6 + 134*u^7 - 184*u^8 - 40*u^9 + 310*u^10 - 179*u^11 - 285*u^12 + 279*u^13 + 166*u^14 - 190*u^15 - 60*u^16 + 69*u^17 + 12*u^18 - 13*u^19 - u^20 + u^21", "1 - 3*u^2 - 15*u^3 + 28*u^4 + 17*u^5 - 126*u^6 + 74*u^7 + 201*u^8 - 278*u^9 - 123*u^10 + 465*u^11 + 5*u^12 - 445*u^13 + 24*u^14 + 250*u^15 - 9*u^16 - 81*u^17 + u^18 + 14*u^19 - u^21" ], [ "-1 + 4*u - 7*u^2 + 12*u^3 + 17*u^4 - 76*u^5 + 88*u^6 + 96*u^7 - 295*u^8 + 102*u^9 + 373*u^10 - 450*u^11 - 272*u^12 + 580*u^13 + 140*u^14 - 382*u^15 - 51*u^16 + 138*u^17 + 11*u^18 - 26*u^19 - u^20 + 2*u^21", "2 - u - 37*u^3 + 54*u^4 + 63*u^5 - 294*u^6 + 136*u^7 + 518*u^8 - 663*u^9 - 382*u^10 + 1191*u^11 + 86*u^12 - 1190*u^13 + 28*u^14 + 692*u^15 - 16*u^16 - 231*u^17 + 2*u^18 + 41*u^19 - 3*u^21" ], [ "4*u - 9*u^2 - 7*u^3 + 51*u^4 - 52*u^5 - 76*u^6 + 198*u^7 - 28*u^8 - 312*u^9 + 217*u^10 + 285*u^11 - 289*u^12 - 166*u^13 + 191*u^14 + 60*u^15 - 69*u^16 - 12*u^17 + 13*u^18 + u^19 - u^20", "-4*u^2 + 6*u^3 + 4*u^4 - 26*u^5 + 20*u^6 + 32*u^7 - 58*u^8 - 14*u^9 + 68*u^10 + 2*u^11 - 38*u^12 + 10*u^14 - u^16" ] ], "Obstruction":-1, "ComplexVolumeN":[ "1.7064 + 2.06027*I", "1.7064 - 2.06027*I", 0.304299, "5.17561 - 7.52719*I", "5.17561 + 7.52719*I", "6.69355 - 1.82013*I", "6.69355 + 1.82013*I", "1.65851 - 0.5954*I", "1.65851 + 0.5954*I", "1.04219 + 4.27368*I", "1.04219 - 4.27368*I", 0.739737, 7.92361, "-1.65381 - 0.64556*I", "-1.65381 + 0.64556*I", 9.66174, "11.3356 - 2.65945*I", "11.3356 + 2.65945*I", "15.1237 + 9.3852*I", "15.1237 - 9.3852*I", "17.0458 + 3.0253*I", "17.0458 - 3.0253*I" ], "uPolysN":[ "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22", "1 + 40*u + 260*u^2 + 915*u^3 + 2312*u^4 + 4593*u^5 + 7603*u^6 + 10848*u^7 + 13643*u^8 + 15328*u^9 + 15522*u^10 + 14223*u^11 + 11853*u^12 + 8995*u^13 + 6228*u^14 + 3916*u^15 + 2213*u^16 + 1104*u^17 + 472*u^18 + 167*u^19 + 46*u^20 + 9*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22" ], "uPolys":[ "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22", "1 + 40*u + 260*u^2 + 915*u^3 + 2312*u^4 + 4593*u^5 + 7603*u^6 + 10848*u^7 + 13643*u^8 + 15328*u^9 + 15522*u^10 + 14223*u^11 + 11853*u^12 + 8995*u^13 + 6228*u^14 + 3916*u^15 + 2213*u^16 + 1104*u^17 + 472*u^18 + 167*u^19 + 46*u^20 + 9*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22" ], "aCuspShape":"7 + 14*u + 35*u^2 - 139*u^3 + 65*u^4 + 422*u^5 - 628*u^6 - 426*u^7 + 1521*u^8 - 338*u^9 - 2051*u^10 + 1295*u^11 + 1758*u^12 - 1448*u^13 - 974*u^14 + 862*u^15 + 333*u^16 - 292*u^17 - 63*u^18 + 53*u^19 + 5*u^20 - 4*u^21", "RepresentationsN":[ [ "u->0.964383 + 0.128666 I", "a->0.184838 - 0.945621 I", "b->-0.299924 + 0.888159 I" ], [ "u->0.964383 - 0.128666 I", "a->0.184838 + 0.945621 I", "b->-0.299924 - 0.888159 I" ], [ "u->-0.889732", "a->1.34588", "b->1.19747" ], [ "u->-1.05996 + 0.353222 I", "a->0.600368 + 0.550351 I", "b->0.830761 + 0.371286 I" ], [ "u->-1.05996 - 0.353222 I", "a->0.600368 - 0.550351 I", "b->0.830761 - 0.371286 I" ], [ "u->-1.12807 + 0.227245 I", "a->-0.64224 - 0.35309 I", "b->-0.804731 - 0.252365 I" ], [ "u->-1.12807 - 0.227245 I", "a->-0.64224 + 0.35309 I", "b->-0.804731 + 0.252365 I" ], [ "u->0.459979 + 0.506822 I", "a->0.614823 - 0.850759 I", "b->-0.713989 + 0.079726 I" ], [ "u->0.459979 - 0.506822 I", "a->0.614823 + 0.850759 I", "b->-0.713989 - 0.079726 I" ], [ "u->0.269941 + 0.602986 I", "a->-0.589034 + 0.985256 I", "b->0.7531 + 0.089219 I" ], [ "u->0.269941 - 0.602986 I", "a->-0.589034 - 0.985256 I", "b->0.7531 - 0.089219 I" ], [ "u->0.485575", "a->0.677603", "b->-0.329027" ], [ "u->-1.58393", "a->-0.123818", "b->-0.196119" ], [ "u->-0.138359 + 0.279214 I", "a->-0.56251 + 1.90545 I", "b->0.454198 + 0.420697 I" ], [ "u->-0.138359 - 0.279214 I", "a->-0.56251 - 1.90545 I", "b->0.454198 - 0.420697 I" ], [ "u->1.70733", "a->3.19649", "b->-5.45746" ], [ "u->-1.71885 + 0.0285 I", "a->-0.023243 - 0.195497 I", "b->-0.045523 - 0.335367 I" ], [ "u->-1.71885 - 0.0285 I", "a->-0.023243 + 0.195497 I", "b->-0.045523 + 0.335367 I" ], [ "u->1.7383 + 0.09444 I", "a->2.32463 - 0.78043 I", "b->-4.11462 + 1.13708 I" ], [ "u->1.7383 - 0.09444 I", "a->2.32463 + 0.78043 I", "b->-4.11462 - 1.13708 I" ], [ "u->1.75301 + 0.0579 I", "a->-2.45571 + 0.49075 I", "b->4.33329 - 0.71811 I" ], [ "u->1.75301 - 0.0579 I", "a->-2.45571 - 0.49075 I", "b->4.33329 + 0.71811 I" ] ], "Epsilon":0.450001, "uPolys_ij":[ "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 + 3*u + 26*u^2 - 642*u^3 + 2947*u^4 - 8892*u^5 + 25091*u^6 - 64228*u^7 + 148259*u^8 - 327319*u^9 + 655960*u^10 - 1076770*u^11 + 1370292*u^12 - 1332807*u^13 + 990972*u^14 - 563996*u^15 + 245065*u^16 - 80565*u^17 + 19678*u^18 - 3458*u^19 + 413*u^20 - 30*u^21 + u^22", "1 - u - 2*u^2 + 70*u^3 - 235*u^4 + 698*u^5 - 3429*u^6 + 8868*u^7 - 18069*u^8 + 27071*u^9 - 30784*u^10 + 27502*u^11 - 20422*u^12 + 6343*u^13 + 5340*u^14 - 8392*u^15 - 715*u^16 + 2013*u^17 + 194*u^18 - 186*u^19 - 25*u^20 + 6*u^21 + u^22", "207 + 285*u + 988*u^2 - 16720*u^3 + 25551*u^4 - 964*u^5 - 5177*u^6 - 8254*u^7 - 3517*u^8 + 3413*u^9 - 4250*u^10 + 18858*u^11 + 2616*u^12 - 17745*u^13 - 2456*u^14 + 7102*u^15 + 1841*u^16 - 1301*u^17 - 592*u^18 + 36*u^19 + 65*u^20 + 14*u^21 + u^22", "16 - 168*u + 513*u^2 - 630*u^3 + 2131*u^4 - 9663*u^5 + 18231*u^6 - 10144*u^7 - 13468*u^8 + 21756*u^9 - 517*u^10 - 22966*u^11 + 22147*u^12 - 5411*u^13 - 5620*u^14 + 5248*u^15 - 1076*u^16 - 1024*u^17 + 965*u^18 - 410*u^19 + 103*u^20 - 15*u^21 + u^22", "1 + u + 2*u^2 - 24*u^3 - 13*u^4 - 26*u^5 - 129*u^6 + 46*u^7 - 57*u^8 + 1229*u^9 + 642*u^10 + 2068*u^11 + 1092*u^12 + 1585*u^13 + 840*u^14 + 688*u^15 + 375*u^16 + 183*u^17 + 100*u^18 + 28*u^19 + 15*u^20 + 2*u^21 + u^22", "1 - 9*u + 46*u^2 - 32*u^3 + 349*u^4 - 628*u^5 + 185*u^6 - 2076*u^7 - 417*u^8 - 2063*u^9 - 342*u^10 - 484*u^11 - 140*u^12 + 357*u^13 + 32*u^14 + 242*u^15 + 67*u^16 + 57*u^17 + 22*u^18 + 8*u^19 + 5*u^20 + u^22", "607 + 1999*u + 700*u^2 - 10290*u^3 - 21559*u^4 - 8118*u^5 + 13843*u^6 + 2162*u^7 - 30271*u^8 - 25865*u^9 - 38598*u^10 - 18810*u^11 - 14868*u^12 - 6501*u^13 - 82*u^14 - 1648*u^15 + 1363*u^16 - 229*u^17 + 336*u^18 - 10*u^19 + 31*u^20 + u^22", "1 + 8*u - 12*u^2 - 407*u^3 - 214*u^4 + 1069*u^5 + 7*u^6 - 3210*u^7 + 2117*u^8 + 11666*u^9 + 12582*u^10 + 10955*u^11 + 10221*u^12 - 2983*u^13 - 10996*u^14 - 3072*u^15 + 2863*u^16 + 1434*u^17 - 162*u^18 - 179*u^19 - 12*u^20 + 7*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 + 40*u + 260*u^2 + 915*u^3 + 2312*u^4 + 4593*u^5 + 7603*u^6 + 10848*u^7 + 13643*u^8 + 15328*u^9 + 15522*u^10 + 14223*u^11 + 11853*u^12 + 8995*u^13 + 6228*u^14 + 3916*u^15 + 2213*u^16 + 1104*u^17 + 472*u^18 + 167*u^19 + 46*u^20 + 9*u^21 + u^22", "1 + 1080*u - 976*u^2 - 12781*u^3 + 53160*u^4 - 107947*u^5 + 148179*u^6 - 175400*u^7 + 227343*u^8 - 307524*u^9 + 352990*u^10 - 305409*u^11 + 186433*u^12 - 69741*u^13 + 4452*u^14 + 12732*u^15 - 8751*u^16 + 2916*u^17 - 388*u^18 - 89*u^19 + 54*u^20 - 11*u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22", "-31 + 133*u - 94*u^2 + 1802*u^3 - 147*u^4 + 4382*u^5 - 1857*u^6 + 2150*u^7 + 1033*u^8 + 7369*u^9 - 7494*u^10 + 4452*u^11 - 1484*u^12 + 3945*u^13 + 3306*u^14 - 10382*u^15 + 7085*u^16 - 3269*u^17 + 1170*u^18 - 254*u^19 + 61*u^20 - 6*u^21 + u^22", "61 - 352*u + 966*u^2 - 1209*u^3 - 1246*u^4 + 4887*u^5 - 5925*u^6 - 5278*u^7 + 9991*u^8 - 13090*u^9 - 2478*u^10 + 7395*u^11 - 15411*u^12 + 5853*u^13 - 600*u^14 - 964*u^15 + 3121*u^16 + 36*u^17 + 600*u^18 - 11*u^19 + 42*u^20 - u^21 + u^22", "-4 + 8*u + 37*u^2 + 168*u^3 - 539*u^4 - 1583*u^5 + 1589*u^6 + 306*u^7 + 8964*u^8 + 2788*u^9 + 16847*u^10 + 2114*u^11 + 16365*u^12 + 2169*u^13 + 7784*u^14 + 1314*u^15 + 2150*u^16 + 384*u^17 + 355*u^18 + 56*u^19 + 31*u^20 + 3*u^21 + u^22", "-1 + 7*u - 10*u^2 + 4*u^3 + 35*u^4 - 230*u^5 - 281*u^6 + 962*u^7 + 1277*u^8 - 1947*u^9 - 2056*u^10 + 2520*u^11 + 212*u^12 - 2903*u^13 + 2788*u^14 + 3074*u^15 - 2829*u^16 - 1829*u^17 + 612*u^18 + 154*u^19 - 43*u^20 - 4*u^21 + u^22" ], "GeometricComponent":"{19, 20}", "uPolys_ij_N":[ "1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22", "1 + 3*u + 26*u^2 - 642*u^3 + 2947*u^4 - 8892*u^5 + 25091*u^6 - 64228*u^7 + 148259*u^8 - 327319*u^9 + 655960*u^10 - 1076770*u^11 + 1370292*u^12 - 1332807*u^13 + 990972*u^14 - 563996*u^15 + 245065*u^16 - 80565*u^17 + 19678*u^18 - 3458*u^19 + 413*u^20 - 30*u^21 + u^22", "1 - u - 2*u^2 + 70*u^3 - 235*u^4 + 698*u^5 - 3429*u^6 + 8868*u^7 - 18069*u^8 + 27071*u^9 - 30784*u^10 + 27502*u^11 - 20422*u^12 + 6343*u^13 + 5340*u^14 - 8392*u^15 - 715*u^16 + 2013*u^17 + 194*u^18 - 186*u^19 - 25*u^20 + 6*u^21 + u^22", "207 + 285*u + 988*u^2 - 16720*u^3 + 25551*u^4 - 964*u^5 - 5177*u^6 - 8254*u^7 - 3517*u^8 + 3413*u^9 - 4250*u^10 + 18858*u^11 + 2616*u^12 - 17745*u^13 - 2456*u^14 + 7102*u^15 + 1841*u^16 - 1301*u^17 - 592*u^18 + 36*u^19 + 65*u^20 + 14*u^21 + u^22", "16 - 168*u + 513*u^2 - 630*u^3 + 2131*u^4 - 9663*u^5 + 18231*u^6 - 10144*u^7 - 13468*u^8 + 21756*u^9 - 517*u^10 - 22966*u^11 + 22147*u^12 - 5411*u^13 - 5620*u^14 + 5248*u^15 - 1076*u^16 - 1024*u^17 + 965*u^18 - 410*u^19 + 103*u^20 - 15*u^21 + u^22", "1 + u + 2*u^2 - 24*u^3 - 13*u^4 - 26*u^5 - 129*u^6 + 46*u^7 - 57*u^8 + 1229*u^9 + 642*u^10 + 2068*u^11 + 1092*u^12 + 1585*u^13 + 840*u^14 + 688*u^15 + 375*u^16 + 183*u^17 + 100*u^18 + 28*u^19 + 15*u^20 + 2*u^21 + u^22", "1 - 9*u + 46*u^2 - 32*u^3 + 349*u^4 - 628*u^5 + 185*u^6 - 2076*u^7 - 417*u^8 - 2063*u^9 - 342*u^10 - 484*u^11 - 140*u^12 + 357*u^13 + 32*u^14 + 242*u^15 + 67*u^16 + 57*u^17 + 22*u^18 + 8*u^19 + 5*u^20 + u^22", "607 + 1999*u + 700*u^2 - 10290*u^3 - 21559*u^4 - 8118*u^5 + 13843*u^6 + 2162*u^7 - 30271*u^8 - 25865*u^9 - 38598*u^10 - 18810*u^11 - 14868*u^12 - 6501*u^13 - 82*u^14 - 1648*u^15 + 1363*u^16 - 229*u^17 + 336*u^18 - 10*u^19 + 31*u^20 + u^22", "1 + 8*u - 12*u^2 - 407*u^3 - 214*u^4 + 1069*u^5 + 7*u^6 - 3210*u^7 + 2117*u^8 + 11666*u^9 + 12582*u^10 + 10955*u^11 + 10221*u^12 - 2983*u^13 - 10996*u^14 - 3072*u^15 + 2863*u^16 + 1434*u^17 - 162*u^18 - 179*u^19 - 12*u^20 + 7*u^21 + u^22", "4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22", "1 + 40*u + 260*u^2 + 915*u^3 + 2312*u^4 + 4593*u^5 + 7603*u^6 + 10848*u^7 + 13643*u^8 + 15328*u^9 + 15522*u^10 + 14223*u^11 + 11853*u^12 + 8995*u^13 + 6228*u^14 + 3916*u^15 + 2213*u^16 + 1104*u^17 + 472*u^18 + 167*u^19 + 46*u^20 + 9*u^21 + u^22", "1 + 1080*u - 976*u^2 - 12781*u^3 + 53160*u^4 - 107947*u^5 + 148179*u^6 - 175400*u^7 + 227343*u^8 - 307524*u^9 + 352990*u^10 - 305409*u^11 + 186433*u^12 - 69741*u^13 + 4452*u^14 + 12732*u^15 - 8751*u^16 + 2916*u^17 - 388*u^18 - 89*u^19 + 54*u^20 - 11*u^21 + u^22", "1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22", "-31 + 133*u - 94*u^2 + 1802*u^3 - 147*u^4 + 4382*u^5 - 1857*u^6 + 2150*u^7 + 1033*u^8 + 7369*u^9 - 7494*u^10 + 4452*u^11 - 1484*u^12 + 3945*u^13 + 3306*u^14 - 10382*u^15 + 7085*u^16 - 3269*u^17 + 1170*u^18 - 254*u^19 + 61*u^20 - 6*u^21 + u^22", "61 - 352*u + 966*u^2 - 1209*u^3 - 1246*u^4 + 4887*u^5 - 5925*u^6 - 5278*u^7 + 9991*u^8 - 13090*u^9 - 2478*u^10 + 7395*u^11 - 15411*u^12 + 5853*u^13 - 600*u^14 - 964*u^15 + 3121*u^16 + 36*u^17 + 600*u^18 - 11*u^19 + 42*u^20 - u^21 + u^22", "-4 + 8*u + 37*u^2 + 168*u^3 - 539*u^4 - 1583*u^5 + 1589*u^6 + 306*u^7 + 8964*u^8 + 2788*u^9 + 16847*u^10 + 2114*u^11 + 16365*u^12 + 2169*u^13 + 7784*u^14 + 1314*u^15 + 2150*u^16 + 384*u^17 + 355*u^18 + 56*u^19 + 31*u^20 + 3*u^21 + u^22", "-1 + 7*u - 10*u^2 + 4*u^3 + 35*u^4 - 230*u^5 - 281*u^6 + 962*u^7 + 1277*u^8 - 1947*u^9 - 2056*u^10 + 2520*u^11 + 212*u^12 - 2903*u^13 + 2788*u^14 + 3074*u^15 - 2829*u^16 - 1829*u^17 + 612*u^18 + 154*u^19 - 43*u^20 - 4*u^21 + u^22" ], "Multiplicity":1, "ij_list":[ [ "{1, 4}", "{1, 5}", "{2, 5}", "{2, 6}", "{3, 6}", "{3, 7}" ], [ "{1, 2}", "{2, 3}", "{4, 5}", "{5, 6}", "{6, 7}" ], [ "{1, 6}", "{2, 4}", "{2, 7}", "{3, 5}" ], [ "{1, 3}", "{4, 6}", "{5, 7}" ], [ "{1, 7}", "{3, 4}", "{9, 10}" ], [ "{4, 7}" ], [ "{4, 8}" ], [ "{3, 8}", "{5, 10}" ], [ "{1, 9}", "{6, 9}" ], [ "{3, 9}", "{4, 9}", "{4, 10}" ], [ "{1, 10}", "{7, 8}", "{7, 9}" ], [ "{8, 9}" ], [ "{1, 8}", "{7, 10}", "{8, 10}" ], [ "{2, 10}", "{6, 8}" ], [ "{2, 8}", "{6, 10}" ], [ "{3, 10}", "{5, 8}" ], [ "{2, 9}", "{5, 9}" ] ], "SortedReprnIndices":"{19, 20, 5, 4, 10, 11, 21, 22, 18, 17, 1, 2, 7, 6, 15, 14, 9, 8, 16, 13, 12, 3}", "aCuspShapeN":[ "8.3501578115395630219`5.110299855296286 - 3.7664320533590217258`4.764535309047502*I", "8.3501578115395630219`5.110299855296286 + 3.7664320533590217258`4.764535309047502*I", 1.1020000000000001e1, "9.4069257121962981806`5.064221675856921 + 6.5710200599927508628`4.908406754508101*I", "9.4069257121962981806`5.064221675856921 - 6.5710200599927508628`4.908406754508101*I", "11.9917894533564764613`5.147660374522069 + 1.3794631899068191766`4.208486495868517*I", "11.9917894533564764613`5.147660374522069 - 1.3794631899068191766`4.208486495868517*I", "8.0570010698963570596`5.149978895894018 - 0.4005788894545126808`3.8464935327798235*I", "8.0570010698963570596`5.149978895894018 + 0.4005788894545126808`3.8464935327798235*I", "5.6603013358900418264`4.981293429551237 - 6.1484864096177766629`5.017222094757928*I", "5.6603013358900418264`4.981293429551237 + 6.1484864096177766629`5.017222094757928*I", 1.3515999999999998e1, 1.5435e1, "-2.8652569087963205288`5.08004261278391 + 1.7741249682236404682`4.87186325239423*I", "-2.8652569087963205288`5.08004261278391 - 1.7741249682236404682`4.87186325239423*I", 9.6586, "9.2248513477498941065`5.135165515141283 + 2.4966004162193602716`4.567555177195865*I", "9.2248513477498941065`5.135165515141283 - 2.4966004162193602716`4.567555177195865*I", "10.1177078514091662484`5.1013132078632415 - 5.1022370990603318739`4.8039917090989706*I", "10.1177078514091662484`5.1013132078632415 + 5.1022370990603318739`4.8039917090989706*I", "12.2416082674968844483`5.14951644695905 - 0.8310858434827298378`3.9813238537389397*I", "12.2416082674968844483`5.14951644695905 + 0.8310858434827298378`3.9813238537389397*I" ], "Abelian":false }, { "IdealName":"J10_47_1", "Generators":[ "b - u", "-1 + a", "-1 + u + u^2" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.5453e-2, "TimingZeroDimVars":6.2076000000000006e-2, "TimingmagmaVCompNormalize":6.3424e-2, "TimingNumberOfSols":2.6509e-2, "TimingIsRadical":1.766e-3, "TimingArcColoring":5.923000000000001e-2, "TimingObstruction":1.115e-3, "TimingComplexVolumeN":3.867635, "TimingaCuspShapeN":8.696e-3, "TiminguValues":0.644706, "TiminguPolysN":3.37e-4, "TiminguPolys":0.82404, "TimingaCuspShape":0.102083, "TimingRepresentationsN":2.8319e-2, "TiminguValues_ij":0.148872, "TiminguPoly_ij":0.495005, "TiminguPolys_ij_N":2.13e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ "-u", "u" ], [ 0, "u" ], [ "u", "1 - u" ], [ "u", "1 - u" ], "{1, 0}", [ 1, "-1 + u" ], [ "u", "-u" ], [ "1 + u", 0 ], [ 1, "u" ], [ 1, "u" ] ], "Obstruction":1, "ComplexVolumeN":[ -0.657974, 7.23771 ], "uPolysN":[ "-1 - u + u^2", "-1 - u + u^2", "u^2", "-1 + u + u^2", "-1 + u + u^2", "-1 + u + u^2", "1 - 2*u + u^2", "1 + 2*u + u^2", "u^2", "1 + 2*u + u^2" ], "uPolys":[ "-1 - u + u^2", "-1 - u + u^2", "u^2", "-1 + u + u^2", "-1 + u + u^2", "-1 + u + u^2", "(-1 + u)^2", "(1 + u)^2", "u^2", "(1 + u)^2" ], "aCuspShape":3, "RepresentationsN":[ [ "u->0.618034", "a->1.", "b->0.618034" ], [ "u->-1.61803", "a->1.", "b->-1.61803" ] ], "Epsilon":3.16228, "uPolys_ij":[ "(1 + u)^2", "u^2", "(-1 + u)^2", "1 + 3*u + u^2", "-1 - u + u^2", "-1 + u + u^2" ], "GeometricComponent":0, "uPolys_ij_N":[ "1 + 2*u + u^2", "u^2", "1 - 2*u + u^2", "1 + 3*u + u^2", "-1 - u + u^2", "-1 + u + u^2" ], "Multiplicity":1, "ij_list":[ [ "{1, 8}", "{1, 9}", "{1, 10}", "{2, 8}" ], [ "{1, 7}", "{3, 4}", "{3, 9}", "{3, 10}", "{4, 9}", "{4, 10}", "{5, 8}", "{9, 10}" ], [ "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}" ], [ "{1, 2}", "{1, 6}", "{2, 3}", "{2, 4}", "{2, 7}", "{3, 5}", "{4, 5}", "{5, 6}", "{6, 7}" ], [ "{1, 3}", "{1, 4}", "{1, 5}", "{2, 5}", "{2, 6}", "{2, 9}", "{2, 10}", "{3, 6}", "{3, 7}", "{3, 8}", "{4, 6}", "{4, 7}", "{4, 8}", "{5, 7}" ], [ "{5, 9}", "{5, 10}", "{6, 8}" ] ], "SortedReprnIndices":"{2, 1}", "aCuspShapeN":[ 3.0, 3.0 ], "Abelian":false }, { "IdealName":"abJ10_47_2", "Generators":[ "b", "-1 + a", "-1 + v" ], "VariableOrder":[ "b", "a", "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.5092e-2, "TimingZeroDimVars":6.208100000000001e-2, "TimingmagmaVCompNormalize":6.3297e-2, "TimingNumberOfSols":2.4876000000000002e-2, "TimingIsRadical":1.461e-3, "TimingArcColoring":5.3617e-2, "TimingObstruction":4.35e-4, "TimingComplexVolumeN":0.43052, "TimingaCuspShapeN":4.766e-3, "TiminguValues":0.632154, "TiminguPolysN":7.500000000000002e-5, "TiminguPolys":0.803661, "TimingaCuspShape":0.101915, "TimingRepresentationsN":2.4948e-2, "TiminguValues_ij":0.143598, "TiminguPoly_ij":0.13542, "TiminguPolys_ij_N":3.000000000000001e-5 }, "ZeroDimensionalVars":[ "b", "a", "v" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}" ], "Obstruction":1, "ComplexVolumeN":"{0}", "uPolysN":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "uPolys":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "aCuspShape":0, "RepresentationsN":[ [ "v->1.", "a->1.", "b->0" ] ], "Epsilon":"Infinity", "uPolys_ij":[ "u" ], "GeometricComponent":0, "uPolys_ij_N":[ "u" ], "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 3}", "{1, 4}", "{1, 5}", "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{1, 10}", "{2, 3}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{3, 10}", "{4, 5}", "{4, 6}", "{4, 7}", "{4, 8}", "{4, 9}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{5, 10}", "{6, 7}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":"{0}", "Abelian":true } ] }, "uPolyC":[ "(-1 - u + u^2)*(1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22)", "(-1 - u + u^2)*(1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22)", "u^2*(4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22)", "(-1 + u + u^2)*(1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22)", "(-1 + u + u^2)*(1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22)", "(-1 + u + u^2)*(1 - u + 2*u^2 - 22*u^3 + 33*u^4 + 40*u^5 - 185*u^6 + 112*u^7 + 307*u^8 - 479*u^9 - 140*u^10 + 782*u^11 - 182*u^12 - 731*u^13 + 304*u^14 + 416*u^15 - 199*u^16 - 141*u^17 + 70*u^18 + 26*u^19 - 13*u^20 - 2*u^21 + u^22)", "(-1 + u)^2*(1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22)", "(1 + u)^2*(1 + 40*u + 260*u^2 + 915*u^3 + 2312*u^4 + 4593*u^5 + 7603*u^6 + 10848*u^7 + 13643*u^8 + 15328*u^9 + 15522*u^10 + 14223*u^11 + 11853*u^12 + 8995*u^13 + 6228*u^14 + 3916*u^15 + 2213*u^16 + 1104*u^17 + 472*u^18 + 167*u^19 + 46*u^20 + 9*u^21 + u^22)", "u^2*(4 - 21*u^2 - 26*u^3 + 9*u^4 + 89*u^5 + 53*u^6 - 78*u^7 - 44*u^8 - 20*u^9 - 61*u^10 + 52*u^11 + 101*u^12 + u^13 - 40*u^14 - 36*u^15 - 14*u^16 + 26*u^17 + 19*u^18 - 8*u^19 - 7*u^20 + u^21 + u^22)", "(1 + u)^2*(1 - 8*u + 12*u^2 + 13*u^3 - 46*u^4 + 13*u^5 + 75*u^6 - 72*u^7 - 57*u^8 + 124*u^9 - 6*u^10 - 119*u^11 + 67*u^12 + 63*u^13 - 76*u^14 - 8*u^15 + 49*u^16 - 16*u^17 - 16*u^18 + 13*u^19 - 3*u^21 + u^22)" ], "RileyPolyC":[ "(1 - 3*y + y^2)*(1 + 3*y + 26*y^2 - 642*y^3 + 2947*y^4 - 8892*y^5 + 25091*y^6 - 64228*y^7 + 148259*y^8 - 327319*y^9 + 655960*y^10 - 1076770*y^11 + 1370292*y^12 - 1332807*y^13 + 990972*y^14 - 563996*y^15 + 245065*y^16 - 80565*y^17 + 19678*y^18 - 3458*y^19 + 413*y^20 - 30*y^21 + y^22)", "(1 - 3*y + y^2)*(1 + 3*y + 26*y^2 - 642*y^3 + 2947*y^4 - 8892*y^5 + 25091*y^6 - 64228*y^7 + 148259*y^8 - 327319*y^9 + 655960*y^10 - 1076770*y^11 + 1370292*y^12 - 1332807*y^13 + 990972*y^14 - 563996*y^15 + 245065*y^16 - 80565*y^17 + 19678*y^18 - 3458*y^19 + 413*y^20 - 30*y^21 + y^22)", "y^2*(16 - 168*y + 513*y^2 - 630*y^3 + 2131*y^4 - 9663*y^5 + 18231*y^6 - 10144*y^7 - 13468*y^8 + 21756*y^9 - 517*y^10 - 22966*y^11 + 22147*y^12 - 5411*y^13 - 5620*y^14 + 5248*y^15 - 1076*y^16 - 1024*y^17 + 965*y^18 - 410*y^19 + 103*y^20 - 15*y^21 + y^22)", "(1 - 3*y + y^2)*(1 + 3*y + 26*y^2 - 642*y^3 + 2947*y^4 - 8892*y^5 + 25091*y^6 - 64228*y^7 + 148259*y^8 - 327319*y^9 + 655960*y^10 - 1076770*y^11 + 1370292*y^12 - 1332807*y^13 + 990972*y^14 - 563996*y^15 + 245065*y^16 - 80565*y^17 + 19678*y^18 - 3458*y^19 + 413*y^20 - 30*y^21 + y^22)", "(1 - 3*y + y^2)*(1 + 3*y + 26*y^2 - 642*y^3 + 2947*y^4 - 8892*y^5 + 25091*y^6 - 64228*y^7 + 148259*y^8 - 327319*y^9 + 655960*y^10 - 1076770*y^11 + 1370292*y^12 - 1332807*y^13 + 990972*y^14 - 563996*y^15 + 245065*y^16 - 80565*y^17 + 19678*y^18 - 3458*y^19 + 413*y^20 - 30*y^21 + y^22)", "(1 - 3*y + y^2)*(1 + 3*y + 26*y^2 - 642*y^3 + 2947*y^4 - 8892*y^5 + 25091*y^6 - 64228*y^7 + 148259*y^8 - 327319*y^9 + 655960*y^10 - 1076770*y^11 + 1370292*y^12 - 1332807*y^13 + 990972*y^14 - 563996*y^15 + 245065*y^16 - 80565*y^17 + 19678*y^18 - 3458*y^19 + 413*y^20 - 30*y^21 + y^22)", "(-1 + y)^2*(1 - 40*y + 260*y^2 - 915*y^3 + 2312*y^4 - 4593*y^5 + 7603*y^6 - 10848*y^7 + 13643*y^8 - 15328*y^9 + 15522*y^10 - 14223*y^11 + 11853*y^12 - 8995*y^13 + 6228*y^14 - 3916*y^15 + 2213*y^16 - 1104*y^17 + 472*y^18 - 167*y^19 + 46*y^20 - 9*y^21 + y^22)", "(-1 + y)^2*(1 - 1080*y - 976*y^2 + 12781*y^3 + 53160*y^4 + 107947*y^5 + 148179*y^6 + 175400*y^7 + 227343*y^8 + 307524*y^9 + 352990*y^10 + 305409*y^11 + 186433*y^12 + 69741*y^13 + 4452*y^14 - 12732*y^15 - 8751*y^16 - 2916*y^17 - 388*y^18 + 89*y^19 + 54*y^20 + 11*y^21 + y^22)", "y^2*(16 - 168*y + 513*y^2 - 630*y^3 + 2131*y^4 - 9663*y^5 + 18231*y^6 - 10144*y^7 - 13468*y^8 + 21756*y^9 - 517*y^10 - 22966*y^11 + 22147*y^12 - 5411*y^13 - 5620*y^14 + 5248*y^15 - 1076*y^16 - 1024*y^17 + 965*y^18 - 410*y^19 + 103*y^20 - 15*y^21 + y^22)", "(-1 + y)^2*(1 - 40*y + 260*y^2 - 915*y^3 + 2312*y^4 - 4593*y^5 + 7603*y^6 - 10848*y^7 + 13643*y^8 - 15328*y^9 + 15522*y^10 - 14223*y^11 + 11853*y^12 - 8995*y^13 + 6228*y^14 - 3916*y^15 + 2213*y^16 - 1104*y^17 + 472*y^18 - 167*y^19 + 46*y^20 - 9*y^21 + y^22)" ] }, "GeometricRepresentation":[ 9.3852, [ "J10_47_0", 1, "{19, 20}" ] ] } }