{ "Index":188, "Name":"10_104", "RolfsenName":"10_104", "DTname":"10a_118", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{15, 11, 1, -17, -19, 5, -7, 3, -9, -13}", "Acode":"{8, 6, 1, -9, -10, 3, -4, 2, -5, -7}", "PDcode":[ "{6, 2, 7, 1}", "{16, 4, 17, 3}", "{18, 9, 19, 10}", "{14, 7, 15, 8}", "{20, 13, 1, 14}", "{8, 17, 9, 18}", "{10, 19, 11, 20}", "{12, 6, 13, 5}", "{4, 12, 5, 11}", "{2, 16, 3, 15}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{4, 9, 2}", [], [ "{4, -9, 5, 1}", "{9, -5, 10, 1}", "{5, -10, 6, 1}", "{9, 2, 8, 2}", "{2, 8, 1, 2}", "{4, 1, 3, 2}", "{8, -4, 7, 2}" ], "{2, 10}", "{6}", 6 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + a - b + a*b - 2*a*u^2 - a^2*u^2 + 2*b*u^2 - 2*a^3*b*u^2 + 3*a*u^4 + a^4*u^4 - b*u^4 + a^5*b*u^4 - a*u^6", "b + b^2 + 2*b*u^2 - 2*a*b*u^2 - 2*a^2*b^2*u^2 + 4*a*u^4 + a^2*u^4 - 3*b*u^4 + 2*a^3*b*u^4 + a^4*b^2*u^4 - 4*a*u^6 + b*u^6 + a*u^8", "-a + u + a^3*u^2 + 2*u^3 - 3*a^2*u^3 + a^4*u^3 + 4*a*b*u^3 - 3*a^3*b*u^3 + 2*a^2*b^2*u^3 - u^5 + 2*a^2*u^5 - a^4*u^5 - 2*a*b*u^5 + 2*a^3*b*u^5 - a^2*b^2*u^5", "-b + u + a*u^2 + a^2*b*u^2 - 3*u^3 + a^2*u^3 - 4*a*b*u^3 + a^3*b*u^3 - 2*a^2*b^2*u^3 + u^5 - a^2*u^5 + 2*a*b*u^5 - a^3*b*u^5 + a^2*b^2*u^5" ], "TimingForPrimaryIdeals":0.14553 }, "v":{ "CheckEq":[ "-b + b^3*v^2 - b^4*v^3", "-a + v - b*v^2 + a*b^2*v^2 + b^2*v^3 - a*b^3*v^3 + b^4*v^3", "-1 + a - b + a*b + b^2*v^2 - 2*a*b^3*v^2 - b^4*v^4 + a*b^5*v^4", "b + b^2 - 2*b^4*v^2 + b^6*v^4" ], "TimingForPrimaryIdeals":9.9665e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_104_0", "Generators":[ "-20 + 4*b + 18*u + u^2 - 21*u^3 + u^4 - 74*u^5 - 60*u^6 - 16*u^7 - 79*u^8 - 59*u^9 - 2*u^10 - 20*u^11 - 30*u^12 - 11*u^13 - u^14", "196 + 8*a - 124*u - 83*u^2 + 219*u^3 + 83*u^4 + 710*u^5 + 920*u^6 + 446*u^7 + 825*u^8 + 875*u^9 + 246*u^10 + 200*u^11 + 380*u^12 + 221*u^13 + 41*u^14", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":8.7891e-2, "TimingZeroDimVars":7.6587e-2, "TimingmagmaVCompNormalize":7.7879e-2, "TimingNumberOfSols":0.15121, "TimingIsRadical":9.836000000000001e-3, "TimingArcColoring":7.6833e-2, "TimingObstruction":3.0263e-2, "TimingComplexVolumeN":1.2381849e1, "TimingaCuspShapeN":8.1679e-2, "TiminguValues":0.665202, "TiminguPolysN":2.7909000000000003e-2, "TiminguPolys":0.850975, "TimingaCuspShape":0.130745, "TimingRepresentationsN":0.144336, "TiminguValues_ij":0.200994, "TiminguPoly_ij":1.690929, "TiminguPolys_ij_N":5.0867e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":15, "IsRadical":true, "ArcColoring":[ [ "(-176 + 125*u + 55*u^2 - 193*u^3 - 66*u^4 - 640*u^5 - 762*u^6 - 363*u^7 - 729*u^8 - 726*u^9 - 188*u^10 - 180*u^11 - 323*u^12 - 179*u^13 - 32*u^14)\/4", "(104 - 76*u - 23*u^2 + 103*u^3 + 31*u^4 + 374*u^5 + 416*u^6 + 194*u^7 + 417*u^8 + 399*u^9 + 98*u^10 + 104*u^11 + 180*u^12 + 97*u^13 + 17*u^14)\/4" ], [ "(-196 + 124*u + 83*u^2 - 219*u^3 - 83*u^4 - 710*u^5 - 920*u^6 - 446*u^7 - 825*u^8 - 875*u^9 - 246*u^10 - 200*u^11 - 380*u^12 - 221*u^13 - 41*u^14)\/8", "(20 - 18*u - u^2 + 21*u^3 - u^4 + 74*u^5 + 60*u^6 + 16*u^7 + 79*u^8 + 59*u^9 + 2*u^10 + 20*u^11 + 30*u^12 + 11*u^13 + u^14)\/4" ], [ "(308 - 208*u - 91*u^2 + 339*u^3 + 119*u^4 + 1102*u^5 + 1296*u^6 + 618*u^7 + 1257*u^8 + 1231*u^9 + 310*u^10 + 312*u^11 + 552*u^12 + 301*u^13 + 53*u^14)\/8", "(-108 + 94*u + 7*u^2 - 107*u^3 - 21*u^4 - 390*u^5 - 396*u^6 - 180*u^7 - 421*u^8 - 377*u^9 - 86*u^10 - 108*u^11 - 174*u^12 - 89*u^13 - 15*u^14)\/4" ], "{1, 0}", [ 1, "-u^2" ], [ "1 - u^2", "-2*u^2 + u^4" ], [ "(23 - 21*u - 2*u^2 + 25*u^3 + 7*u^4 + 88*u^5 + 89*u^6 + 41*u^7 + 95*u^8 + 83*u^9 + 18*u^10 + 25*u^11 + 39*u^12 + 19*u^13 + 3*u^14)\/2", "(8 + u - 8*u^2 + 12*u^3 + 7*u^4 + 26*u^5 + 52*u^6 + 25*u^7 + 34*u^8 + 51*u^9 + 18*u^10 + 6*u^11 + 19*u^12 + 14*u^13 + 3*u^14)\/2" ], [ "(31 - 20*u - 10*u^2 + 37*u^3 + 14*u^4 + 114*u^5 + 141*u^6 + 66*u^7 + 129*u^8 + 134*u^9 + 36*u^10 + 31*u^11 + 58*u^12 + 33*u^13 + 6*u^14)\/2", "(8 + u - 8*u^2 + 12*u^3 + 7*u^4 + 26*u^5 + 52*u^6 + 25*u^7 + 34*u^8 + 51*u^9 + 18*u^10 + 6*u^11 + 19*u^12 + 14*u^13 + 3*u^14)\/2" ], [ 0, "u" ], [ "u", "u - u^3" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-5.82203 + 9.3841*I", "-5.82203 - 9.3841*I", "-1.32635 + 1.5843*I", "-1.32635 - 1.5843*I", "-4.34026 - 3.41455*I", "-4.34026 + 3.41455*I", "1.03695 + 0.848562*I", "1.03695 - 0.848562*I", "2.89422 - 6.37595*I", "2.89422 + 6.37595*I", "7.67422 - 2.17377*I", "7.67422 + 2.17377*I", "0.18522 - 14.1071*I", "0.18522 + 14.1071*I", 5.97579 ], "uPolysN":[ "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-32 + 240*u - 920*u^2 + 2280*u^3 - 4062*u^4 + 5549*u^5 - 6098*u^6 + 5583*u^7 - 4343*u^8 + 2879*u^9 - 1607*u^10 + 736*u^11 - 265*u^12 + 70*u^13 - 12*u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15" ], "uPolys":[ "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-32 + 240*u - 920*u^2 + 2280*u^3 - 4062*u^4 + 5549*u^5 - 6098*u^6 + 5583*u^7 - 4343*u^8 + 2879*u^9 - 1607*u^10 + 736*u^11 - 265*u^12 + 70*u^13 - 12*u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15" ], "aCuspShape":"74 - 60*u - 7*u^2 + 66*u^3 + 11*u^4 + 241*u^5 + 251*u^6 + 113*u^7 + 267*u^8 + 245*u^9 + 54*u^10 + 66*u^11 + 113*u^12 + 59*u^13 + 10*u^14", "RepresentationsN":[ [ "u->0.388466 + 0.947688 I", "a->0.050943 - 1.35034 I", "b->-0.47742 - 1.71628 I" ], [ "u->0.388466 - 0.947688 I", "a->0.050943 + 1.35034 I", "b->-0.47742 + 1.71628 I" ], [ "u->-0.101121 + 0.829275 I", "a->0.46712 + 0.846136 I", "b->-0.108197 + 1.24819 I" ], [ "u->-0.101121 - 0.829275 I", "a->0.46712 - 0.846136 I", "b->-0.108197 - 1.24819 I" ], [ "u->0.922792 + 0.829091 I", "a->-0.839212 + 0.446521 I", "b->0.265387 + 1.30284 I" ], [ "u->0.922792 - 0.829091 I", "a->-0.839212 - 0.446521 I", "b->0.265387 - 1.30284 I" ], [ "u->0.52841 + 0.302526 I", "a->0.715576 + 0.595124 I", "b->0.246839 - 0.030877 I" ], [ "u->0.52841 - 0.302526 I", "a->0.715576 - 0.595124 I", "b->0.246839 + 0.030877 I" ], [ "u->-1.38123 + 0.42191 I", "a->-0.521626 - 0.558152 I", "b->1.1445 - 1.53934 I" ], [ "u->-1.38123 - 0.42191 I", "a->-0.521626 + 0.558152 I", "b->1.1445 + 1.53934 I" ], [ "u->-1.48635 + 0.07152 I", "a->0.098561 - 0.589973 I", "b->0.379744 - 0.426871 I" ], [ "u->-1.48635 - 0.07152 I", "a->0.098561 + 0.589973 I", "b->0.379744 + 0.426871 I" ], [ "u->-1.49023 + 0.36505 I", "a->0.758806 + 0.630997 I", "b->-1.13261 + 1.70886 I" ], [ "u->-1.49023 - 0.36505 I", "a->0.758806 - 0.630997 I", "b->-1.13261 - 1.70886 I" ], [ "u->-1.76149", "a->-0.460333", "b->0.3635" ] ], "Epsilon":0.96111, "uPolys_ij":[ "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "-64 + 96*u - 180*u^2 - 707*u^3 + 297*u^4 + 581*u^5 - 406*u^6 + 24*u^7 - 40*u^8 + 261*u^9 - 435*u^10 + 400*u^11 - 220*u^12 + 72*u^13 - 13*u^14 + u^15", "-2664 + 18800*u - 58050*u^2 + 108561*u^3 - 145235*u^4 + 152172*u^5 - 130588*u^6 + 93348*u^7 - 55646*u^8 + 27448*u^9 - 11041*u^10 + 3540*u^11 - 873*u^12 + 156*u^13 - 18*u^14 + u^15", "11776 + 4352*u + 9688*u^2 + 295*u^3 + 57653*u^4 + 23053*u^5 - 3462*u^6 + 4422*u^7 + 2862*u^8 - 85*u^9 + 239*u^10 + 58*u^11 + 38*u^12 - u^14 + u^15", "1 + u + 3*u^2 + 19*u^3 + 35*u^4 + 51*u^5 + 56*u^6 + 60*u^7 + 117*u^8 + 61*u^9 + 38*u^10 + 38*u^11 + u^12 + 10*u^13 - u^14 + u^15", "-1 - u + 14*u^2 + 22*u^3 - 56*u^4 - 93*u^5 + u^6 - 7*u^7 + 85*u^8 + 28*u^9 - 105*u^10 + 141*u^11 - 77*u^12 + 31*u^13 - 6*u^14 + u^15", "89 - 227*u + 1029*u^2 + 669*u^3 + 2363*u^4 + 147*u^5 + 164*u^6 - 642*u^7 - 47*u^8 + 69*u^9 + 126*u^10 + 64*u^11 + 17*u^12 + 8*u^13 + u^14 + u^15", "-89 + 440*u - 612*u^2 - 362*u^3 + 459*u^4 + 207*u^5 - 1179*u^6 + 943*u^7 - 850*u^8 + 647*u^9 - 428*u^10 + 147*u^11 - 73*u^12 + 30*u^13 - 8*u^14 + u^15", "39 + 91*u + 8*u^2 + 223*u^3 + 1075*u^4 + 1744*u^5 + 1512*u^6 + 158*u^7 - 553*u^8 - 494*u^9 + 73*u^10 + 155*u^11 - 3*u^12 - 20*u^13 + u^15", "-1024 + 8960*u - 39488*u^2 + 108928*u^3 - 210876*u^4 + 305293*u^5 - 340954*u^6 + 296559*u^7 - 200238*u^8 + 103809*u^9 - 40624*u^10 + 11712*u^11 - 2399*u^12 + 329*u^13 - 27*u^14 + u^15", "-1 + 13*u - 84*u^2 + 300*u^3 - 828*u^4 + 1567*u^5 - 2375*u^6 + 2573*u^7 - 2195*u^8 + 1448*u^9 - 775*u^10 + 329*u^11 - 115*u^12 + 31*u^13 - 6*u^14 + u^15", "1024 - 1280*u + 11968*u^2 - 2432*u^3 + 14836*u^4 - 2319*u^5 + 322*u^6 - 73*u^7 + 839*u^8 + 407*u^9 - 15*u^10 - 20*u^11 - 5*u^12 + 12*u^13 + 4*u^14 + u^15", "-1 + 13*u - 67*u^2 + 183*u^3 - 316*u^4 + 395*u^5 - 393*u^6 + 362*u^7 - 218*u^8 + 176*u^9 - 65*u^10 + 51*u^11 - 12*u^12 + 9*u^13 - u^14 + u^15", "-1 - 3*u + 5*u^2 + 16*u^3 - 35*u^4 - 39*u^5 + 76*u^6 - 60*u^7 - 308*u^8 - 111*u^9 + 156*u^10 + 78*u^11 - 29*u^12 - 15*u^13 + 2*u^14 + u^15", "1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15", "-32 + 240*u - 920*u^2 + 2280*u^3 - 4062*u^4 + 5549*u^5 - 6098*u^6 + 5583*u^7 - 4343*u^8 + 2879*u^9 - 1607*u^10 + 736*u^11 - 265*u^12 + 70*u^13 - 12*u^14 + u^15", "1 - 4*u^2 + 9*u^3 + 54*u^4 + 69*u^5 - 30*u^6 - 157*u^7 - 148*u^8 + 10*u^9 + 155*u^10 + 174*u^11 + 106*u^12 + 40*u^13 + 9*u^14 + u^15", "-3 + 17*u - 65*u^2 + 177*u^3 - 376*u^4 + 621*u^5 - 871*u^6 + 926*u^7 - 856*u^8 + 442*u^9 - 205*u^10 + 99*u^11 - 10*u^12 + 3*u^13 - u^14 + u^15", "3 - 10*u + 48*u^2 - 165*u^3 + 387*u^4 - 652*u^5 + 817*u^6 - 756*u^7 + 395*u^8 - 72*u^9 + 85*u^10 - 24*u^11 - 18*u^12 + 8*u^13 + 2*u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-3 + 8*u + 7*u^2 - 4*u^3 + 45*u^4 + 29*u^5 - 17*u^6 + 148*u^7 - 104*u^8 + 131*u^9 - 62*u^10 + 59*u^11 - 10*u^12 + 13*u^13 + u^15" ], "GeometricComponent":"{13, 14}", "uPolys_ij_N":[ "8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15", "-64 + 96*u - 180*u^2 - 707*u^3 + 297*u^4 + 581*u^5 - 406*u^6 + 24*u^7 - 40*u^8 + 261*u^9 - 435*u^10 + 400*u^11 - 220*u^12 + 72*u^13 - 13*u^14 + u^15", "-2664 + 18800*u - 58050*u^2 + 108561*u^3 - 145235*u^4 + 152172*u^5 - 130588*u^6 + 93348*u^7 - 55646*u^8 + 27448*u^9 - 11041*u^10 + 3540*u^11 - 873*u^12 + 156*u^13 - 18*u^14 + u^15", "11776 + 4352*u + 9688*u^2 + 295*u^3 + 57653*u^4 + 23053*u^5 - 3462*u^6 + 4422*u^7 + 2862*u^8 - 85*u^9 + 239*u^10 + 58*u^11 + 38*u^12 - u^14 + u^15", "1 + u + 3*u^2 + 19*u^3 + 35*u^4 + 51*u^5 + 56*u^6 + 60*u^7 + 117*u^8 + 61*u^9 + 38*u^10 + 38*u^11 + u^12 + 10*u^13 - u^14 + u^15", "-1 - u + 14*u^2 + 22*u^3 - 56*u^4 - 93*u^5 + u^6 - 7*u^7 + 85*u^8 + 28*u^9 - 105*u^10 + 141*u^11 - 77*u^12 + 31*u^13 - 6*u^14 + u^15", "89 - 227*u + 1029*u^2 + 669*u^3 + 2363*u^4 + 147*u^5 + 164*u^6 - 642*u^7 - 47*u^8 + 69*u^9 + 126*u^10 + 64*u^11 + 17*u^12 + 8*u^13 + u^14 + u^15", "-89 + 440*u - 612*u^2 - 362*u^3 + 459*u^4 + 207*u^5 - 1179*u^6 + 943*u^7 - 850*u^8 + 647*u^9 - 428*u^10 + 147*u^11 - 73*u^12 + 30*u^13 - 8*u^14 + u^15", "39 + 91*u + 8*u^2 + 223*u^3 + 1075*u^4 + 1744*u^5 + 1512*u^6 + 158*u^7 - 553*u^8 - 494*u^9 + 73*u^10 + 155*u^11 - 3*u^12 - 20*u^13 + u^15", "-1024 + 8960*u - 39488*u^2 + 108928*u^3 - 210876*u^4 + 305293*u^5 - 340954*u^6 + 296559*u^7 - 200238*u^8 + 103809*u^9 - 40624*u^10 + 11712*u^11 - 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65*u^2 + 177*u^3 - 376*u^4 + 621*u^5 - 871*u^6 + 926*u^7 - 856*u^8 + 442*u^9 - 205*u^10 + 99*u^11 - 10*u^12 + 3*u^13 - u^14 + u^15", "3 - 10*u + 48*u^2 - 165*u^3 + 387*u^4 - 652*u^5 + 817*u^6 - 756*u^7 + 395*u^8 - 72*u^9 + 85*u^10 - 24*u^11 - 18*u^12 + 8*u^13 + 2*u^14 + u^15", "-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15", "-3 + 8*u + 7*u^2 - 4*u^3 + 45*u^4 + 29*u^5 - 17*u^6 + 148*u^7 - 104*u^8 + 131*u^9 - 62*u^10 + 59*u^11 - 10*u^12 + 13*u^13 + u^15" ], "Multiplicity":1, "ij_list":[ [ "{4, 9}", "{5, 9}", "{5, 10}", "{6, 10}" ], [ "{4, 5}", "{5, 6}", "{9, 10}" ], [ "{4, 10}", "{6, 9}" ], [ "{4, 6}" ], [ "{2, 5}", "{2, 10}" ], [ "{1, 5}" ], [ "{3, 9}" ], [ "{8, 10}" ], [ "{1, 6}", "{3, 8}" ], [ "{6, 8}" ], [ "{1, 10}", "{7, 8}" ], [ "{3, 4}" ], [ "{2, 4}", "{3, 10}" ], [ "{5, 7}", "{7, 9}" ], [ "{1, 7}", "{4, 7}", "{4, 8}", "{7, 10}" ], [ "{1, 3}", "{1, 4}" ], [ "{1, 2}", "{2, 3}", "{6, 7}", "{8, 9}" ], [ "{3, 5}" ], [ "{5, 8}" ], [ "{1, 8}", "{2, 6}", "{2, 8}", "{2, 9}", "{3, 6}", "{3, 7}" ], [ "{1, 9}", "{2, 7}" ] ], "SortedReprnIndices":"{14, 13, 1, 2, 10, 9, 6, 5, 12, 11, 3, 4, 7, 8, 15}", "aCuspShapeN":[ "-3.9795235112669302482`4.836294313165827 - 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7.7733306804205608965`5.150356008024185*I", -5.9362 ], "Abelian":false }, { "IdealName":"J10_104_1", "Generators":[ "145 - 83*a - 83*a^2 - 174*a^3 + 89*a^4 + 60*a^5 + 115*b - 61*u - 154*a*u + 30*a^2*u - 143*a^3*u + 36*a^4*u + 16*a^5*u + 156*u^2 - 105*a*u^2 - 59*a^2*u^2 - 339*a^3*u^2 + 81*a^4*u^2 + 59*a^5*u^2 - 179*u^3 + 105*a*u^3 + 381*a^2*u^3 + 316*a^3*u^3 - 219*a^4*u^3 - 151*a^5*u^3 + 66*u^4 + 52*a*u^4 - 247*a^2*u^4 + 22*a^3*u^4 + 90*a^4*u^4 + 109*a^5*u^4", "-1 - 18*a - 6*a^2 - 4*a^3 + a^4 + a^6 + 8*u - 8*a*u - 7*a^2*u - 9*a^3*u - 7*a^4*u - 2*a^5*u - 4*u^2 + 22*a*u^2 + 10*a^2*u^2 + 9*a^3*u^2 + a^4*u^2 - 5*u^3 + 4*a*u^3 + 4*a^2*u^3 + 6*a^3*u^3 + 5*a^4*u^3 + a^5*u^3 + 3*u^4 - 7*a*u^4 - 4*a^2*u^4 - 5*a^3*u^4 - 2*a^4*u^4", "1 + u + u^2 - 2*u^3 - u^4 + u^5" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":8.7282e-2, "TimingZeroDimVars":9.839200000000002e-2, "TimingmagmaVCompNormalize":9.9896e-2, "TimingNumberOfSols":0.204593, "TimingIsRadical":3.2984e-2, "TimingArcColoring":8.385400000000001e-2, "TimingObstruction":7.6421e-2, "TimingComplexVolumeN":2.4610515999999997e1, "TimingaCuspShapeN":0.17399, "TiminguValues":0.689662, "TiminguPolysN":7.7039e-2, "TiminguPolys":1.052861, "TimingaCuspShape":0.213672, "TimingRepresentationsN":0.2357, "TiminguValues_ij":0.232218, "TiminguPolys_ij_N":0.27662 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":30, "IsRadical":true, "ArcColoring":[ [ "a - a^3*u^2", "(-32 + 64*a - 28*a^2 + 20*a^3 + 86*a^4 - 18*a^5 + 154*u + 129*a*u - 32*a^2*u + 36*a^3*u + 187*a^4*u - 14*a^5*u - 10*u^2 - 72*a*u^2 - 72*a^2*u^2 + 104*a^3*u^2 + 231*a^4*u^2 - 20*a^5*u^2 + 10*u^3 - 112*a*u^3 - 112*a^2*u^3 - 81*a^3*u^3 - 24*a^4*u^3 + 20*a^5*u^3 - 52*u^4 + 12*a*u^4 + 150*a^2*u^4 + 44*a^3*u^4 - 188*a^4*u^4 - 58*a^5*u^4)\/115" ], [ "a", "(-145 + 83*a + 83*a^2 + 174*a^3 - 89*a^4 - 60*a^5 + 61*u + 154*a*u - 30*a^2*u + 143*a^3*u - 36*a^4*u - 16*a^5*u - 156*u^2 + 105*a*u^2 + 59*a^2*u^2 + 339*a^3*u^2 - 81*a^4*u^2 - 59*a^5*u^2 + 179*u^3 - 105*a*u^3 - 381*a^2*u^3 - 316*a^3*u^3 + 219*a^4*u^3 + 151*a^5*u^3 - 66*u^4 - 52*a*u^4 + 247*a^2*u^4 - 22*a^3*u^4 - 90*a^4*u^4 - 109*a^5*u^4)\/115" ], [ "(97 + 197*a + 59*a^2 - 52*a^3 + 11*a^4 - 82*a^5 - 152*u + 74*a*u + 97*a^2*u - 20*a^3*u + 6*a^4*u - 143*a^5*u - 112*u^2 - 98*a*u^2 + 40*a^2*u^2 - 206*a^3*u^2 + 2*a^4*u^2 - 178*a^5*u^2 + 43*u^3 - 63*a*u^3 + 75*a^2*u^3 - a^3*u^3 - 48*a^4*u^3 + 17*a^5*u^3 + 80*u^4 + 24*a*u^4 - 91*a^2*u^4 + 42*a^3*u^4 + 38*a^4*u^4 + 160*a^5*u^4)\/115", "(43 + 52*a + 75*a^2 - a^3 - 48*a^4 + 17*a^5 + 220*u + 158*a*u + 43*a^2*u - 11*a^3*u + a^4*u + 95*a^5*u - 126*u^2 - 47*a*u^2 + 22*a^2*u^2 + 73*a^3*u^2 - 15*a^4*u^2 + 116*a^5*u^2 + 34*u^3 - 137*a*u^3 - 298*a^2*u^3 - 142*a^3*u^3 + 130*a^4*u^3 + 91*a^5*u^3 - 48*u^4 + 50*a*u^4 + 142*a^2*u^4 + 122*a^3*u^4 - 78*a^4*u^4 - 142*a^5*u^4)\/115" ], "{1, 0}", [ 1, "-u^2" ], [ "1 - u^2", "-2*u^2 + u^4" ], [ "(-112 + 63*a + 86*a^2 + 47*a^3 - 136*a^4 + 52*a^5 - 128*u + 26*a*u + 3*a^2*u - 35*a^3*u - 116*a^4*u + 158*a^5*u - 58*u^2 + 93*a*u^2 - 45*a^2*u^2 - 4*a^3*u^2 - 192*a^4*u^2 + 183*a^5*u^2 + 242*u^3 - 47*a*u^3 - 300*a^2*u^3 - 134*a^3*u^3 + 238*a^4*u^3 + 93*a^5*u^3 - 90*u^4 - 4*a*u^4 + 226*a^2*u^4 + 108*a^3*u^4 + 32*a^4*u^4 - 180*a^5*u^4)\/115", "(112 - 63*a - 86*a^2 - 47*a^3 + 136*a^4 - 52*a^5 + 128*u - 26*a*u + 112*a^2*u + 35*a^3*u + 116*a^4*u - 158*a^5*u + 58*u^2 - 93*a*u^2 + 45*a^2*u^2 + 4*a^3*u^2 + 192*a^4*u^2 - 183*a^5*u^2 - 242*u^3 + 47*a*u^3 + 300*a^2*u^3 + 134*a^3*u^3 - 238*a^4*u^3 - 93*a^5*u^3 + 90*u^4 + 4*a*u^4 - 226*a^2*u^4 - 108*a^3*u^4 - 32*a^4*u^4 + 180*a^5*u^4)\/115" ], [ "a^2*u", "(112 - 63*a - 86*a^2 - 47*a^3 + 136*a^4 - 52*a^5 + 128*u - 26*a*u + 112*a^2*u + 35*a^3*u + 116*a^4*u - 158*a^5*u + 58*u^2 - 93*a*u^2 + 45*a^2*u^2 + 4*a^3*u^2 + 192*a^4*u^2 - 183*a^5*u^2 - 242*u^3 + 47*a*u^3 + 300*a^2*u^3 + 134*a^3*u^3 - 238*a^4*u^3 - 93*a^5*u^3 + 90*u^4 + 4*a*u^4 - 226*a^2*u^4 - 108*a^3*u^4 - 32*a^4*u^4 + 180*a^5*u^4)\/115" ], [ 0, "u" ], [ "u", "u - u^3" ] ], "Obstruction":-1, "ComplexVolumeN":[ "0.49041 + 2.82812*I", "0.49041 - 2.82812*I", -3.64718, "0.49041 + 2.82812*I", "0.49041 - 2.82812*I", -3.64718, "-1.58157 - 4.3587*I", "-1.58157 + 1.29754*I", "-1.58157 + 1.29754*I", "-1.58157 - 4.3587*I", "-5.71916 - 1.53058*I", "-5.71916 - 1.53058*I", "-1.58157 + 4.3587*I", "-1.58157 - 1.29754*I", "-1.58157 - 1.29754*I", "-1.58157 + 4.3587*I", "-5.71916 + 1.53058*I", "-5.71916 + 1.53058*I", "3.96189 + 7.22895*I", "3.96189 + 7.22895*I", "-0.17569 + 4.40083*I", "3.96189 + 1.57271*I", "-0.17569 + 4.40083*I", "3.96189 + 1.57271*I", "3.96189 - 7.22895*I", "3.96189 - 7.22895*I", "-0.17569 - 4.40083*I", "3.96189 - 1.57271*I", "-0.17569 - 4.40083*I", "3.96189 - 1.57271*I" ], "uPolysN":[ "-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30", "-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30", "1 - 10*u^2 - 10*u^3 + 45*u^4 + 90*u^5 - 75*u^6 - 360*u^7 - 150*u^8 + 720*u^9 + 1008*u^10 - 420*u^11 - 2100*u^12 - 1260*u^13 + 1770*u^14 + 3108*u^15 + 675*u^16 - 2580*u^17 - 2740*u^18 - 90*u^19 + 1951*u^20 + 1570*u^21 + 45*u^22 - 780*u^23 - 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503*u^7 + 528*u^8 - 1023*u^9 + 1578*u^10 - 2272*u^11 + 2863*u^12 - 3316*u^13 + 3795*u^14 - 3769*u^15 + 3793*u^16 - 3225*u^17 + 2623*u^18 - 1898*u^19 + 1230*u^20 - 853*u^21 + 507*u^22 - 323*u^23 + 162*u^24 - 87*u^25 + 37*u^26 - 15*u^27 + 8*u^28 - 3*u^29 + u^30" ], "uPolys":[ "-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30", "-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30", "(-1 + u^2 + u^3)^10", "(1 + u + u^2 - 2*u^3 - u^4 + u^5)^6", "(1 + u + u^2 - 2*u^3 - u^4 + u^5)^6", "-7 - 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108*u^3 - 126*u^4 - 225*u^5 + 51*u^6 - 503*u^7 + 528*u^8 - 1023*u^9 + 1578*u^10 - 2272*u^11 + 2863*u^12 - 3316*u^13 + 3795*u^14 - 3769*u^15 + 3793*u^16 - 3225*u^17 + 2623*u^18 - 1898*u^19 + 1230*u^20 - 853*u^21 + 507*u^22 - 323*u^23 + 162*u^24 - 87*u^25 + 37*u^26 - 15*u^27 + 8*u^28 - 3*u^29 + u^30" ], "aCuspShape":"(2*(-51 - 128*a + 56*a^2 - 40*a^3 - 172*a^4 + 36*a^5 + 152*u - 258*a*u + 64*a^2*u - 72*a^3*u - 374*a^4*u + 28*a^5*u + 20*u^2 + 144*a*u^2 + 144*a^2*u^2 - 208*a^3*u^2 - 462*a^4*u^2 + 40*a^5*u^2 - 250*u^3 + 224*a*u^3 + 224*a^2*u^3 + 162*a^3*u^3 + 48*a^4*u^3 - 40*a^5*u^3 + 104*u^4 - 24*a*u^4 - 300*a^2*u^4 - 88*a^3*u^4 + 376*a^4*u^4 + 116*a^5*u^4))\/115", "RepresentationsN":[ [ "u->-1.21774", "a->-0.806664 + 0.705849 I", "b->0.4117 + 1.41665 I" ], [ "u->-1.21774", "a->-0.806664 - 0.705849 I", "b->0.4117 - 1.41665 I" ], [ "u->-1.21774", "a->1.23353", "b->-2.05678" ], [ "u->-1.21774", "a->0.671225 + 0.117277 I", "b->-0.96834 + 1.96626 I" ], [ "u->-1.21774", "a->0.671225 - 0.117277 I", "b->-0.96834 - 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0.549911 I", "a->0.4735 - 2.32765 I", "b->-0.145272 - 1.01182 I" ], [ "u->1.41878 + 0.21917 I", "a->-0.837994 + 0.477676 I", "b->1.48326 + 1.70876 I" ], [ "u->1.41878 + 0.21917 I", "a->-0.265271 - 0.909026 I", "b->-0.218527 - 0.470543 I" ], [ "u->1.41878 + 0.21917 I", "a->0.772271 - 0.730462 I", "b->-0.335807 - 1.27897 I" ], [ "u->1.41878 + 0.21917 I", "a->0.696565 - 0.364337 I", "b->-1.33013 - 0.90847 I" ], [ "u->1.41878 + 0.21917 I", "a->-0.666236 + 0.232053 I", "b->-0.10143 + 1.90226 I" ], [ "u->1.41878 + 0.21917 I", "a->0.486743 + 0.419449 I", "b->-0.264664 + 0.14076 I" ], [ "u->1.41878 - 0.21917 I", "a->-0.837994 - 0.477676 I", "b->1.48326 - 1.70876 I" ], [ "u->1.41878 - 0.21917 I", "a->-0.265271 + 0.909026 I", "b->-0.218527 + 0.470543 I" ], [ "u->1.41878 - 0.21917 I", "a->0.772271 + 0.730462 I", "b->-0.335807 + 1.27897 I" ], [ "u->1.41878 - 0.21917 I", "a->0.696565 + 0.364337 I", "b->-1.33013 + 0.90847 I" ], [ "u->1.41878 - 0.21917 I", "a->-0.666236 - 0.232053 I", "b->-0.10143 - 1.90226 I" ], [ "u->1.41878 - 0.21917 I", "a->0.486743 - 0.419449 I", "b->-0.264664 - 0.14076 I" ] ], "Epsilon":0.98749, "uPolys_ij_N":[ "1 + 6*u + 21*u^2 + 38*u^3 + 24*u^4 - 78*u^5 - 219*u^6 - 204*u^7 + 183*u^8 + 664*u^9 + 522*u^10 - 504*u^11 - 1334*u^12 - 522*u^13 + 1239*u^14 + 1574*u^15 - 312*u^16 - 1752*u^17 - 566*u^18 + 1182*u^19 + 882*u^20 - 606*u^21 - 681*u^22 + 312*u^23 + 306*u^24 - 150*u^25 - 69*u^26 + 46*u^27 + 3*u^28 - 6*u^29 + u^30", "-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30", "1 + 6*u + 33*u^2 + 62*u^3 + 120*u^4 - 330*u^5 - 239*u^6 - 2112*u^7 + 5307*u^8 - 5980*u^9 + 25422*u^10 - 68532*u^11 + 116574*u^12 - 238254*u^13 + 529335*u^14 - 938566*u^15 + 1443612*u^16 - 2242944*u^17 + 3355094*u^18 - 4232610*u^19 + 4219938*u^20 - 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377377*u^15 - 339945*u^16 + 557159*u^17 - 686317*u^18 + 606332*u^19 - 389702*u^20 + 214995*u^21 - 95849*u^22 + 34637*u^23 - 10124*u^24 + 2207*u^25 - 285*u^26 + 19*u^27 + 10*u^28 - 3*u^29 + u^30", "1 - 6*u + 21*u^2 - 62*u^3 + 156*u^4 - 342*u^5 + 681*u^6 - 1236*u^7 + 2067*u^8 - 3216*u^9 + 4662*u^10 - 6336*u^11 + 8086*u^12 - 9702*u^13 + 10971*u^14 - 11678*u^15 + 11712*u^16 - 11052*u^17 + 9794*u^18 - 8142*u^19 + 6318*u^20 - 4566*u^21 + 3051*u^22 - 1872*u^23 + 1046*u^24 - 522*u^25 + 231*u^26 - 86*u^27 + 27*u^28 - 6*u^29 + u^30", "49 + 1884*u + 34660*u^2 + 238262*u^3 + 899192*u^4 + 2178477*u^5 + 3614173*u^6 + 4057149*u^7 + 2432784*u^8 - 1199883*u^9 - 5168420*u^10 - 6893872*u^11 - 4753629*u^12 + 256968*u^13 + 5011085*u^14 + 6809069*u^15 + 5420105*u^16 + 2662171*u^17 + 457415*u^18 - 476770*u^19 - 495108*u^20 - 223095*u^21 - 24117*u^22 + 40663*u^23 + 35220*u^24 + 16773*u^25 + 5503*u^26 + 1287*u^27 + 208*u^28 + 21*u^29 + u^30", "-119 - 1984*u - 14602*u^2 - 63412*u^3 - 185916*u^4 - 382877*u^5 - 543279*u^6 - 542175*u^7 - 480044*u^8 - 243341*u^9 + 205804*u^10 + 381090*u^11 + 289357*u^12 + 28474*u^13 + 277779*u^14 - 377377*u^15 - 339945*u^16 + 557159*u^17 - 686317*u^18 + 606332*u^19 - 389702*u^20 + 214995*u^21 - 95849*u^22 + 34637*u^23 - 10124*u^24 + 2207*u^25 - 285*u^26 + 19*u^27 + 10*u^28 - 3*u^29 + u^30", "1 + 20*u + 190*u^2 + 1150*u^3 + 5025*u^4 + 17034*u^5 + 46965*u^6 + 108840*u^7 + 217050*u^8 + 378920*u^9 + 586576*u^10 + 813020*u^11 + 1016420*u^12 + 1152540*u^13 + 1190250*u^14 + 1122756*u^15 + 969195*u^16 + 766320*u^17 + 554980*u^18 + 367790*u^19 + 222595*u^20 + 122650*u^21 + 61245*u^22 + 27540*u^23 + 11055*u^24 + 3912*u^25 + 1200*u^26 + 310*u^27 + 65*u^28 + 10*u^29 + u^30", "-25 - 310*u - 2038*u^2 - 8684*u^3 - 25984*u^4 - 54795*u^5 - 80127*u^6 - 57113*u^7 + 62690*u^8 + 317055*u^9 + 672386*u^10 + 1053554*u^11 + 1343543*u^12 + 1471674*u^13 + 1409355*u^14 + 1205373*u^15 + 925133*u^16 + 645139*u^17 + 409001*u^18 + 237872*u^19 + 126810*u^20 + 62453*u^21 + 28341*u^22 + 11927*u^23 + 4622*u^24 + 1651*u^25 + 535*u^26 + 153*u^27 + 38*u^28 + 7*u^29 + u^30", "-25 - 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2636253*u^15 - 1989783*u^16 - 503587*u^17 + 199755*u^18 + 207238*u^19 + 80664*u^20 + 33947*u^21 + 23391*u^22 + 8739*u^23 - 1788*u^24 - 2737*u^25 - 749*u^26 + 67*u^27 + 76*u^28 + 15*u^29 + u^30", "-2525 - 10880*u - 18732*u^2 - 11910*u^3 - 30614*u^4 - 122463*u^5 - 120865*u^6 + 295937*u^7 + 769858*u^8 + 225389*u^9 - 1253196*u^10 - 1362556*u^11 + 954087*u^12 + 2679458*u^13 + 697197*u^14 - 2529027*u^15 - 2493119*u^16 + 418553*u^17 + 2025859*u^18 + 1075922*u^19 - 332672*u^20 - 707097*u^21 - 437783*u^22 - 150971*u^23 - 23774*u^24 - 1781*u^25 - 533*u^26 - 101*u^27 - 12*u^28 + u^29 + u^30", "1 - 10*u^2 - 10*u^3 + 45*u^4 + 90*u^5 - 75*u^6 - 360*u^7 - 150*u^8 + 720*u^9 + 1008*u^10 - 420*u^11 - 2100*u^12 - 1260*u^13 + 1770*u^14 + 3108*u^15 + 675*u^16 - 2580*u^17 - 2740*u^18 - 90*u^19 + 1951*u^20 + 1570*u^21 + 45*u^22 - 780*u^23 - 585*u^24 - 108*u^25 + 120*u^26 + 110*u^27 + 45*u^28 + 10*u^29 + u^30", "1759 + 2976*u - 15528*u^2 + 1882*u^3 - 70778*u^4 + 107937*u^5 + 33307*u^6 + 100223*u^7 - 68380*u^8 + 147187*u^9 + 102272*u^10 + 652028*u^11 + 974113*u^12 + 1434252*u^13 + 1585143*u^14 + 1608705*u^15 + 1329531*u^16 + 1036343*u^17 + 680373*u^18 + 413008*u^19 + 220630*u^20 + 104951*u^21 + 46351*u^22 + 17451*u^23 + 6526*u^24 + 1949*u^25 + 629*u^26 + 141*u^27 + 38*u^28 + 5*u^29 + u^30", "1 - 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u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7", "-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7", "1 - 2*u^2 - 4*u^3 - u^4 + 3*u^5 + 3*u^6 + u^7", "-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7", "-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7", "1 - u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7", "-1 - 2*u^3 + u^4 + u^7", "-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7", "1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7", "-1 - 2*u^3 + u^4 + u^7" ], "aCuspShape":"-8 - 5*u + 7*u^2 + 3*u^3 + 3*u^4 + u^5 - 2*u^6", "RepresentationsN":[ [ "u->1.2592", "a->1.35619", "b->-1.39446" ], [ "u->-0.401963 + 0.54643 I", "a->1.01958 + 0.650467 I", "b->-0.59726 + 1.44367 I" ], [ "u->-0.401963 - 0.54643 I", "a->1.01958 - 0.650467 I", "b->-0.59726 - 1.44367 I" ], [ "u->-1.34646 + 0.204423 I", "a->-0.556014 - 0.539828 I", "b->0.21748 - 1.74792 I" ], [ "u->-1.34646 - 0.204423 I", "a->-0.556014 + 0.539828 I", "b->0.21748 + 1.74792 I" ], [ "u->0.55201", "a->-2.60549", "b->-0.132774" ], [ "u->1.68564", "a->0.322173", "b->-0.713207" ] ], "Epsilon":1.30964, "uPolys_ij":[ "1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7", "-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7", "1 + 4*u + 6*u^2 + 20*u^3 + 33*u^4 + 24*u^5 + 8*u^6 + u^7", "-1 + 5*u^2 + 5*u^3 - u^4 - u^5 + 3*u^6 + u^7", "-1 + 2*u^2 - 4*u^3 + u^4 + 3*u^5 - 3*u^6 + u^7", "-1 + 7*u - 19*u^2 + 30*u^3 - 29*u^4 + 19*u^5 - 7*u^6 + u^7", "1 + 8*u + 6*u^2 - 39*u^3 + 31*u^4 - 3*u^5 - 4*u^6 + u^7", "-1 + 10*u - 21*u^2 + 20*u^3 - 15*u^4 + 8*u^5 - 3*u^6 + u^7", "-1 - 4*u - 6*u^2 - 6*u^3 - 5*u^4 - 2*u^5 + u^7", "1 + 10*u + 21*u^2 + 20*u^3 + 15*u^4 + 8*u^5 + 3*u^6 + u^7", "1 + 7*u^2 - u^3 + 11*u^4 - 4*u^5 - 4*u^6 + u^7", "1 - 4*u - 5*u^2 + 6*u^4 + 9*u^5 + 3*u^6 + u^7", "-1 - 4*u + 5*u^2 - 6*u^4 + 9*u^5 - 3*u^6 + u^7", "-1 - 2*u^3 + u^4 + u^7", "11 + 28*u + 31*u^2 + 14*u^3 - 6*u^4 - 7*u^5 - u^6 + u^7", "1 - u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7", "23 - 76*u + 96*u^2 - 50*u^3 - 7*u^4 + 20*u^5 - 8*u^6 + u^7", "-1 + 4*u - 12*u^2 + 11*u^3 + 3*u^4 - 7*u^5 + u^7", "-1 - u + 6*u^2 + 2*u^3 - 10*u^4 - 8*u^5 + u^7", "-1 + 4*u - 2*u^2 + 6*u^3 - 13*u^4 + 7*u^5 - 3*u^6 + u^7", "-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7", "1 - 2*u^3 - u^4 + u^7", "-1 - u + 3*u^2 - 17*u^3 + 3*u^4 + 7*u^5 + 4*u^6 + u^7", "-11 - 25*u - 17*u^2 + 56*u^3 - 26*u^4 + 7*u^5 - 4*u^6 + u^7", "-47 - 12*u - 17*u^2 - 6*u^3 + 9*u^4 + 8*u^5 + 5*u^6 + u^7", "1 - u - 6*u^2 + 2*u^3 + 10*u^4 - 8*u^5 + u^7", "1 + 4*u + 12*u^2 + 11*u^3 - 3*u^4 - 7*u^5 + u^7" ], "GeometricComponent":0, "uPolys_ij_N":[ "1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7", "-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7", "1 + 4*u + 6*u^2 + 20*u^3 + 33*u^4 + 24*u^5 + 8*u^6 + u^7", "-1 + 5*u^2 + 5*u^3 - u^4 - u^5 + 3*u^6 + u^7", "-1 + 2*u^2 - 4*u^3 + u^4 + 3*u^5 - 3*u^6 + u^7", "-1 + 7*u - 19*u^2 + 30*u^3 - 29*u^4 + 19*u^5 - 7*u^6 + u^7", "1 + 8*u + 6*u^2 - 39*u^3 + 31*u^4 - 3*u^5 - 4*u^6 + u^7", "-1 + 10*u - 21*u^2 + 20*u^3 - 15*u^4 + 8*u^5 - 3*u^6 + u^7", "-1 - 4*u - 6*u^2 - 6*u^3 - 5*u^4 - 2*u^5 + u^7", "1 + 10*u + 21*u^2 + 20*u^3 + 15*u^4 + 8*u^5 + 3*u^6 + u^7", "1 + 7*u^2 - u^3 + 11*u^4 - 4*u^5 - 4*u^6 + u^7", "1 - 4*u - 5*u^2 + 6*u^4 + 9*u^5 + 3*u^6 + u^7", "-1 - 4*u + 5*u^2 - 6*u^4 + 9*u^5 - 3*u^6 + u^7", "-1 - 2*u^3 + u^4 + u^7", "11 + 28*u + 31*u^2 + 14*u^3 - 6*u^4 - 7*u^5 - u^6 + u^7", "1 - u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7", "23 - 76*u + 96*u^2 - 50*u^3 - 7*u^4 + 20*u^5 - 8*u^6 + u^7", "-1 + 4*u - 12*u^2 + 11*u^3 + 3*u^4 - 7*u^5 + u^7", "-1 - u + 6*u^2 + 2*u^3 - 10*u^4 - 8*u^5 + u^7", "-1 + 4*u - 2*u^2 + 6*u^3 - 13*u^4 + 7*u^5 - 3*u^6 + u^7", "-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7", "1 - 2*u^3 - u^4 + u^7", "-1 - u + 3*u^2 - 17*u^3 + 3*u^4 + 7*u^5 + 4*u^6 + u^7", "-11 - 25*u - 17*u^2 + 56*u^3 - 26*u^4 + 7*u^5 - 4*u^6 + u^7", "-47 - 12*u - 17*u^2 - 6*u^3 + 9*u^4 + 8*u^5 + 5*u^6 + u^7", "1 - u - 6*u^2 + 2*u^3 + 10*u^4 - 8*u^5 + u^7", "1 + 4*u + 12*u^2 + 11*u^3 - 3*u^4 - 7*u^5 + u^7" ], "Multiplicity":1, "ij_list":[ [ "{7, 8}" ], [ "{1, 10}", "{4, 9}", "{5, 9}", "{5, 10}", "{6, 10}" ], [ "{4, 5}", "{5, 6}", "{9, 10}" ], [ "{4, 10}", "{6, 9}" ], [ "{1, 3}", "{1, 4}" ], [ "{1, 2}", "{2, 3}", "{6, 7}", "{8, 9}" ], [ "{6, 8}" ], [ "{2, 4}" ], [ "{4, 6}" ], [ "{3, 10}" ], [ "{5, 7}", "{7, 9}" ], [ "{2, 10}" ], [ "{2, 5}" ], [ "{1, 7}" ], [ "{3, 9}" ], [ "{1, 8}", "{2, 8}", "{2, 9}" ], [ "{1, 5}" ], [ "{1, 6}" ], [ "{2, 7}" ], [ "{3, 4}" ], [ "{2, 6}", "{3, 6}", "{3, 7}" ], [ "{4, 7}", "{4, 8}", "{7, 10}" ], [ "{8, 10}" ], [ "{5, 8}" ], [ "{3, 5}" ], [ "{1, 9}" ], [ "{3, 8}" ] ], "SortedReprnIndices":"{5, 4, 2, 3, 7, 6, 1}", "aCuspShapeN":[ 5.5281, "-6.7357815505330672032`5.042591734023459 - 5.4045601458502755315`4.9469640943418565*I", "-6.7357815505330672032`5.042591734023459 + 5.4045601458502755315`4.9469640943418565*I", "1.5064129179396730811`4.549659654335756 + 5.8170723443011823962`5.1364200880628355*I", "1.5064129179396730811`4.549659654335756 - 5.8170723443011823962`5.1364200880628355*I", -7.8492, 9.7798 ], "Abelian":false }, { "IdealName":"abJ10_104_3", "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":8.2555e-2, "TimingZeroDimVars":6.8202e-2, "TimingmagmaVCompNormalize":6.9519e-2, "TimingNumberOfSols":2.8561000000000003e-2, "TimingIsRadical":1.892e-3, "TimingArcColoring":6.9443e-2, "TimingObstruction":3.8700000000000003e-4, "TimingComplexVolumeN":0.425991, "TimingaCuspShapeN":4.455e-3, "TiminguValues":0.64514, "TiminguPolysN":7.6e-5, "TiminguPolys":0.807229, "TimingaCuspShape":8.8815e-2, "TimingRepresentationsN":2.5447e-2, "TiminguValues_ij":0.150433, "TiminguPoly_ij":0.148094, "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 - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7)*(-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15)*(-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30)", "(-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7)*(-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15)*(-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30)", "(-1 + u^2 + u^3)^10*(1 - 2*u^2 - 4*u^3 - u^4 + 3*u^5 + 3*u^6 + u^7)*(-32 + 240*u - 920*u^2 + 2280*u^3 - 4062*u^4 + 5549*u^5 - 6098*u^6 + 5583*u^7 - 4343*u^8 + 2879*u^9 - 1607*u^10 + 736*u^11 - 265*u^12 + 70*u^13 - 12*u^14 + u^15)", "(1 + u + u^2 - 2*u^3 - u^4 + u^5)^6*(-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7)*(8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15)", "(1 + u + u^2 - 2*u^3 - u^4 + u^5)^6*(-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7)*(8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15)", "(1 - u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7)*(-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15)*(-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30)", "(-1 - 2*u^3 + u^4 + u^7)*(1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15)*(-1 - 14*u - 40*u^2 - 108*u^3 - 126*u^4 - 225*u^5 + 51*u^6 - 503*u^7 + 528*u^8 - 1023*u^9 + 1578*u^10 - 2272*u^11 + 2863*u^12 - 3316*u^13 + 3795*u^14 - 3769*u^15 + 3793*u^16 - 3225*u^17 + 2623*u^18 - 1898*u^19 + 1230*u^20 - 853*u^21 + 507*u^22 - 323*u^23 + 162*u^24 - 87*u^25 + 37*u^26 - 15*u^27 + 8*u^28 - 3*u^29 + u^30)", "(-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7)*(-1 - 3*u^3 + 2*u^4 + 7*u^5 - u^7 - 4*u^8 - 6*u^9 + 7*u^10 + 8*u^11 - 4*u^12 - 4*u^13 + u^14 + u^15)*(-7 - 64*u - 158*u^2 + 144*u^3 + 624*u^4 - 287*u^5 - 1171*u^6 + 583*u^7 + 1250*u^8 - 625*u^9 - 586*u^10 - 162*u^11 - 275*u^12 + 1362*u^13 + 541*u^14 - 1835*u^15 - 243*u^16 + 1253*u^17 + 3*u^18 - 382*u^19 - 40*u^20 - 77*u^21 + 119*u^22 + 125*u^23 - 100*u^24 - 53*u^25 + 43*u^26 + 11*u^27 - 10*u^28 - u^29 + u^30)", "(1 + u + u^2 - 2*u^3 - u^4 + u^5)^6*(1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7)*(8 - 6*u^2 + 7*u^3 + 9*u^4 + 31*u^5 + 54*u^6 + 40*u^7 + 44*u^8 + 55*u^9 + 31*u^10 + 14*u^11 + 20*u^12 + 18*u^13 + 7*u^14 + u^15)", "(-1 - 2*u^3 + u^4 + u^7)*(1 + u - 6*u^2 + 24*u^4 - 17*u^5 - 23*u^6 + 29*u^7 + 17*u^8 - 20*u^9 - 5*u^10 + 11*u^11 + 3*u^12 - 3*u^13 + u^15)*(-1 - 14*u - 40*u^2 - 108*u^3 - 126*u^4 - 225*u^5 + 51*u^6 - 503*u^7 + 528*u^8 - 1023*u^9 + 1578*u^10 - 2272*u^11 + 2863*u^12 - 3316*u^13 + 3795*u^14 - 3769*u^15 + 3793*u^16 - 3225*u^17 + 2623*u^18 - 1898*u^19 + 1230*u^20 - 853*u^21 + 507*u^22 - 323*u^23 + 162*u^24 - 87*u^25 + 37*u^26 - 15*u^27 + 8*u^28 - 3*u^29 + u^30)" ], "RileyPolyC":[ "(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 4*y^2 + 9*y^3 - 54*y^4 + 69*y^5 + 30*y^6 - 157*y^7 + 148*y^8 + 10*y^9 - 155*y^10 + 174*y^11 - 106*y^12 + 40*y^13 - 9*y^14 + y^15)*(49 - 1884*y + 34660*y^2 - 238262*y^3 + 899192*y^4 - 2178477*y^5 + 3614173*y^6 - 4057149*y^7 + 2432784*y^8 + 1199883*y^9 - 5168420*y^10 + 6893872*y^11 - 4753629*y^12 - 256968*y^13 + 5011085*y^14 - 6809069*y^15 + 5420105*y^16 - 2662171*y^17 + 457415*y^18 + 476770*y^19 - 495108*y^20 + 223095*y^21 - 24117*y^22 - 40663*y^23 + 35220*y^24 - 16773*y^25 + 5503*y^26 - 1287*y^27 + 208*y^28 - 21*y^29 + y^30)", "(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 4*y^2 + 9*y^3 - 54*y^4 + 69*y^5 + 30*y^6 - 157*y^7 + 148*y^8 + 10*y^9 - 155*y^10 + 174*y^11 - 106*y^12 + 40*y^13 - 9*y^14 + y^15)*(49 - 1884*y + 34660*y^2 - 238262*y^3 + 899192*y^4 - 2178477*y^5 + 3614173*y^6 - 4057149*y^7 + 2432784*y^8 + 1199883*y^9 - 5168420*y^10 + 6893872*y^11 - 4753629*y^12 - 256968*y^13 + 5011085*y^14 - 6809069*y^15 + 5420105*y^16 - 2662171*y^17 + 457415*y^18 + 476770*y^19 - 495108*y^20 + 223095*y^21 - 24117*y^22 - 40663*y^23 + 35220*y^24 - 16773*y^25 + 5503*y^26 - 1287*y^27 + 208*y^28 - 21*y^29 + y^30)", "(-1 + 2*y - y^2 + y^3)^10*(-1 + 4*y - 2*y^2 + 6*y^3 - 13*y^4 + 7*y^5 - 3*y^6 + y^7)*(-1024 - 1280*y - 11968*y^2 - 2432*y^3 - 14836*y^4 - 2319*y^5 - 322*y^6 - 73*y^7 - 839*y^8 + 407*y^9 + 15*y^10 - 20*y^11 + 5*y^12 + 12*y^13 - 4*y^14 + y^15)", "(-1 - y - 3*y^2 + 8*y^3 - 5*y^4 + y^5)^6*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-64 + 96*y - 180*y^2 - 707*y^3 + 297*y^4 + 581*y^5 - 406*y^6 + 24*y^7 - 40*y^8 + 261*y^9 - 435*y^10 + 400*y^11 - 220*y^12 + 72*y^13 - 13*y^14 + y^15)", "(-1 - y - 3*y^2 + 8*y^3 - 5*y^4 + y^5)^6*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-64 + 96*y - 180*y^2 - 707*y^3 + 297*y^4 + 581*y^5 - 406*y^6 + 24*y^7 - 40*y^8 + 261*y^9 - 435*y^10 + 400*y^11 - 220*y^12 + 72*y^13 - 13*y^14 + y^15)", "(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 4*y^2 + 9*y^3 - 54*y^4 + 69*y^5 + 30*y^6 - 157*y^7 + 148*y^8 + 10*y^9 - 155*y^10 + 174*y^11 - 106*y^12 + 40*y^13 - 9*y^14 + y^15)*(49 - 1884*y + 34660*y^2 - 238262*y^3 + 899192*y^4 - 2178477*y^5 + 3614173*y^6 - 4057149*y^7 + 2432784*y^8 + 1199883*y^9 - 5168420*y^10 + 6893872*y^11 - 4753629*y^12 - 256968*y^13 + 5011085*y^14 - 6809069*y^15 + 5420105*y^16 - 2662171*y^17 + 457415*y^18 + 476770*y^19 - 495108*y^20 + 223095*y^21 - 24117*y^22 - 40663*y^23 + 35220*y^24 - 16773*y^25 + 5503*y^26 - 1287*y^27 + 208*y^28 - 21*y^29 + y^30)", "(-1 + 2*y^2 + 4*y^3 - y^4 - 4*y^5 + y^7)*(-1 + 13*y - 84*y^2 + 300*y^3 - 828*y^4 + 1567*y^5 - 2375*y^6 + 2573*y^7 - 2195*y^8 + 1448*y^9 - 775*y^10 + 329*y^11 - 115*y^12 + 31*y^13 - 6*y^14 + y^15)*(1 - 116*y - 1172*y^2 - 7986*y^3 - 51944*y^4 - 246165*y^5 - 773355*y^6 - 1877389*y^7 - 3466248*y^8 - 5035397*y^9 - 5697836*y^10 - 4953612*y^11 - 2975121*y^12 - 630556*y^13 + 1149329*y^14 + 1901275*y^15 + 1581845*y^16 + 660769*y^17 - 131213*y^18 - 423882*y^19 - 358908*y^20 - 203633*y^21 - 82705*y^22 - 24199*y^23 - 4492*y^24 + 183*y^25 + 427*y^26 + 169*y^27 + 48*y^28 + 7*y^29 + y^30)", "(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 4*y^2 + 9*y^3 - 54*y^4 + 69*y^5 + 30*y^6 - 157*y^7 + 148*y^8 + 10*y^9 - 155*y^10 + 174*y^11 - 106*y^12 + 40*y^13 - 9*y^14 + y^15)*(49 - 1884*y + 34660*y^2 - 238262*y^3 + 899192*y^4 - 2178477*y^5 + 3614173*y^6 - 4057149*y^7 + 2432784*y^8 + 1199883*y^9 - 5168420*y^10 + 6893872*y^11 - 4753629*y^12 - 256968*y^13 + 5011085*y^14 - 6809069*y^15 + 5420105*y^16 - 2662171*y^17 + 457415*y^18 + 476770*y^19 - 495108*y^20 + 223095*y^21 - 24117*y^22 - 40663*y^23 + 35220*y^24 - 16773*y^25 + 5503*y^26 - 1287*y^27 + 208*y^28 - 21*y^29 + y^30)", "(-1 - y - 3*y^2 + 8*y^3 - 5*y^4 + y^5)^6*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-64 + 96*y - 180*y^2 - 707*y^3 + 297*y^4 + 581*y^5 - 406*y^6 + 24*y^7 - 40*y^8 + 261*y^9 - 435*y^10 + 400*y^11 - 220*y^12 + 72*y^13 - 13*y^14 + y^15)", "(-1 + 2*y^2 + 4*y^3 - y^4 - 4*y^5 + y^7)*(-1 + 13*y - 84*y^2 + 300*y^3 - 828*y^4 + 1567*y^5 - 2375*y^6 + 2573*y^7 - 2195*y^8 + 1448*y^9 - 775*y^10 + 329*y^11 - 115*y^12 + 31*y^13 - 6*y^14 + y^15)*(1 - 116*y - 1172*y^2 - 7986*y^3 - 51944*y^4 - 246165*y^5 - 773355*y^6 - 1877389*y^7 - 3466248*y^8 - 5035397*y^9 - 5697836*y^10 - 4953612*y^11 - 2975121*y^12 - 630556*y^13 + 1149329*y^14 + 1901275*y^15 + 1581845*y^16 + 660769*y^17 - 131213*y^18 - 423882*y^19 - 358908*y^20 - 203633*y^21 - 82705*y^22 - 24199*y^23 - 4492*y^24 + 183*y^25 + 427*y^26 + 169*y^27 + 48*y^28 + 7*y^29 + y^30)" ] }, "GeometricRepresentation":[ 1.4107099999999999e1, [ "J10_104_0", 1, "{13, 14}" ] ] } }