{ "Index":211, "Name":"10_127", "RolfsenName":"10_127", "DTname":"10n_16", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{6, -15, 8, 2, 14, 18, 20, -3, 10, 12}", "Acode":"{4, -8, 5, 2, 8, 10, 1, -2, 6, 7}", "PDcode":[ "{1, 7, 2, 6}", "{4, 15, 5, 16}", "{5, 9, 6, 8}", "{7, 3, 8, 2}", "{9, 15, 10, 14}", "{11, 19, 12, 18}", "{13, 1, 14, 20}", "{16, 3, 17, 4}", "{17, 11, 18, 10}", "{19, 13, 20, 12}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{1, 4, 8}", [], [ "{1, 4, 2, 1}", "{4, 2, 5, 1}", "{4, 5, 3, 2}", "{8, 1, 7, 2}", "{1, 7, 10, 2}", "{7, 10, 6, 2}", "{10, 6, 9, 2}" ], "{2, 5}", "{8}", 8 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 - a*b + a^2*u^2 - u^3", "-b^2 - u + u^2 + a*b*u^2 + u^3 - u^5", "-a - 2*b + a*b^2 + b^3 - u - a^2*u - a*b*u + a^2*u^3", "-b + b^3 + u - a*b*u - b^2*u - u^3 + a*b*u^3" ], "TimingForPrimaryIdeals":0.114116 }, "v":{ "CheckEq":[ "-b^2", "1 - a*b - v", "-a - 2*b + a*b^2 + b^3 + v + a*b*v", "-b + b^3 + b^2*v" ], "TimingForPrimaryIdeals":7.528800000000001e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_127_0", "Generators":[ "-5 + 2*b - 6*u + 19*u^2 + 10*u^3 - 38*u^4 - 46*u^5 + 28*u^6 + 58*u^7 - u^8 - 50*u^9 - 15*u^10 + 28*u^11 + 23*u^12 - 2*u^13 - 8*u^14 - 3*u^15", "-7 + 2*a - 2*u + 27*u^2 + 6*u^3 - 38*u^4 - 44*u^5 + 32*u^6 + 50*u^7 + u^8 - 46*u^9 - 15*u^10 + 20*u^11 + 21*u^12 - 6*u^14 - 3*u^15", "1 + 3*u - 3*u^2 - 9*u^3 + 6*u^4 + 22*u^5 + 8*u^6 - 22*u^7 - 17*u^8 + 11*u^9 + 19*u^10 - u^11 - 13*u^12 - 7*u^13 + 2*u^14 + 3*u^15 + u^16" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.5862999999999996e-2, "TimingZeroDimVars":8.0477e-2, "TimingmagmaVCompNormalize":8.179399999999999e-2, "TimingNumberOfSols":0.157856, "TimingIsRadical":9.49e-3, "TimingArcColoring":7.102e-2, "TimingObstruction":3.0317e-2, "TimingComplexVolumeN":1.3786301000000003e1, "TimingaCuspShapeN":7.764599999999999e-2, "TiminguValues":0.680254, "TiminguPolysN":2.8046e-2, "TiminguPolys":0.853257, "TimingaCuspShape":0.118374, "TimingRepresentationsN":0.149891, "TiminguValues_ij":0.22773, "TiminguPoly_ij":1.877785, "TiminguPolys_ij_N":5.0673e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":16, "IsRadical":true, "ArcColoring":[ "{1, 0}", [ 1, "u^2" ], [ "u^3", "u - u^3 + u^5" ], [ 0, "u" ], [ "-u", "u - u^3" ], [ "(1 - 6*u + 7*u^2 - 6*u^4 - 16*u^5 + 8*u^6 + 14*u^7 + 3*u^8 - 14*u^9 - 5*u^10 + 6*u^11 + 7*u^12 - 2*u^14 - u^15)\/2", "(-1 - 2*u + 9*u^2 - 8*u^4 - 16*u^5 + 8*u^6 + 14*u^7 + 3*u^8 - 14*u^9 - 5*u^10 + 6*u^11 + 7*u^12 - 2*u^14 - u^15)\/2" ], [ "6 + 4*u - 23*u^2 - 8*u^3 + 38*u^4 + 45*u^5 - 30*u^6 - 54*u^7 + 48*u^9 + 15*u^10 - 24*u^11 - 22*u^12 + u^13 + 7*u^14 + 3*u^15", "(5 + 6*u - 19*u^2 - 10*u^3 + 38*u^4 + 46*u^5 - 28*u^6 - 58*u^7 + u^8 + 50*u^9 + 15*u^10 - 28*u^11 - 23*u^12 + 2*u^13 + 8*u^14 + 3*u^15)\/2" ], [ "(7 + 2*u - 27*u^2 - 6*u^3 + 38*u^4 + 44*u^5 - 32*u^6 - 50*u^7 - u^8 + 46*u^9 + 15*u^10 - 20*u^11 - 21*u^12 + 6*u^14 + 3*u^15)\/2", "(5 + 6*u - 19*u^2 - 10*u^3 + 38*u^4 + 46*u^5 - 28*u^6 - 58*u^7 + u^8 + 50*u^9 + 15*u^10 - 28*u^11 - 23*u^12 + 2*u^13 + 8*u^14 + 3*u^15)\/2" ], [ "(-9 - 2*u + 35*u^2 - 58*u^4 - 48*u^5 + 56*u^6 + 62*u^7 - 17*u^8 - 62*u^9 - 7*u^10 + 34*u^11 + 23*u^12 - 4*u^13 - 8*u^14 - 3*u^15)\/2", "(-3 + 11*u^2 - 8*u^3 - 18*u^4 - 8*u^5 + 24*u^6 + 10*u^7 - 11*u^8 - 16*u^9 + 5*u^10 + 10*u^11 + 5*u^12 - 2*u^13 - 2*u^14 - u^15)\/2" ], [ "1 + 4*u - 7*u^2 - 2*u^3 + 8*u^4 + 16*u^5 - 8*u^6 - 15*u^7 - 3*u^8 + 14*u^9 + 5*u^10 - 6*u^11 - 7*u^12 + 2*u^14 + u^15", "(1 + 4*u - 9*u^2 - 4*u^3 + 10*u^4 + 18*u^5 - 8*u^6 - 16*u^7 - 3*u^8 + 14*u^9 + 5*u^10 - 6*u^11 - 7*u^12 + 2*u^14 + u^15)\/2" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-6.61455 - 2.48847*I", "-6.61455 + 2.48847*I", -2.11624, "-0.88412 - 2.45544*I", "-0.88412 + 2.45544*I", "5.17546 + 0.9153*I", "5.17546 - 0.9153*I", "4.6817 + 5.57131*I", "4.6817 - 5.57131*I", -9.85589, -8.27471, "-0.629599 - 1.10238*I", "-0.629599 + 1.10238*I", "-2.44912 + 8.89682*I", "-2.44912 - 8.89682*I", -1.34177 ], "uPolysN":[ "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "1 + 15*u + 75*u^2 + 233*u^3 + 482*u^4 + 710*u^5 + 892*u^6 + 906*u^7 + 811*u^8 + 639*u^9 + 429*u^10 + 261*u^11 + 131*u^12 + 57*u^13 + 20*u^14 + 5*u^15 + u^16", "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "1 + 2*u - 4*u^2 + 15*u^3 - 50*u^4 + 40*u^5 - 86*u^6 - 94*u^7 + 9*u^8 - 148*u^9 + 74*u^10 - 81*u^11 + 45*u^12 - 20*u^13 + 11*u^14 - 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16" ], "uPolys":[ "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "1 + 15*u + 75*u^2 + 233*u^3 + 482*u^4 + 710*u^5 + 892*u^6 + 906*u^7 + 811*u^8 + 639*u^9 + 429*u^10 + 261*u^11 + 131*u^12 + 57*u^13 + 20*u^14 + 5*u^15 + u^16", "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "1 + 2*u - 4*u^2 + 15*u^3 - 50*u^4 + 40*u^5 - 86*u^6 - 94*u^7 + 9*u^8 - 148*u^9 + 74*u^10 - 81*u^11 + 45*u^12 - 20*u^13 + 11*u^14 - 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16" ], "aCuspShape":"-10 - 7*u + 19*u^2 + 26*u^3 - 18*u^4 - 40*u^5 + 4*u^6 + 44*u^7 + 10*u^8 - 29*u^9 - 19*u^10 + 10*u^11 + 12*u^12 + u^13 - 3*u^14 - u^15", "RepresentationsN":[ [ "u->0.817221 + 0.650517 I", "a->0.69329 + 1.38874 I", "b->-1.47026 - 0.07876 I" ], [ "u->0.817221 - 0.650517 I", "a->0.69329 - 1.38874 I", "b->-1.47026 + 0.07876 I" ], [ "u->1.09835", "a->-0.682687", "b->-0.347472" ], [ "u->-0.616496 + 0.976582 I", "a->-0.323356 - 0.180239 I", "b->1.4575 + 0.22598 I" ], [ "u->-0.616496 - 0.976582 I", "a->-0.323356 + 0.180239 I", "b->1.4575 - 0.22598 I" ], [ "u->-0.839144 + 0.90583 I", "a->0.354184 + 0.74793 I", "b->-0.427794 - 0.712268 I" ], [ "u->-0.839144 - 0.90583 I", "a->0.354184 - 0.74793 I", "b->-0.427794 + 0.712268 I" ], [ "u->-0.99754 + 0.847971 I", "a->-0.383254 - 1.1817 I", "b->-0.593993 + 0.677497 I" ], [ "u->-0.99754 - 0.847971 I", "a->-0.383254 + 1.1817 I", "b->-0.593993 - 0.677497 I" ], [ "u->-0.688577", "a->-2.20439", "b->-1.64693" ], [ "u->1.35209", "a->1.39091", "b->1.48463" ], [ "u->0.549818 + 0.327281 I", "a->-0.426191 - 1.32282 I", "b->0.349186 + 0.338218 I" ], [ "u->0.549818 - 0.327281 I", "a->-0.426191 + 1.32282 I", "b->0.349186 - 0.338218 I" ], [ "u->-1.12772 + 0.779615 I", "a->0.38145 + 1.56857 I", "b->1.56155 - 0.22278 I" ], [ "u->-1.12772 - 0.779615 I", "a->0.38145 - 1.56857 I", "b->1.56155 + 0.22278 I" ], [ "u->-0.334148", "a->1.90392", "b->0.75741" ] ], "Epsilon":1.68029, "uPolys_ij":[ "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "1 + 15*u + 75*u^2 + 233*u^3 + 482*u^4 + 710*u^5 + 892*u^6 + 906*u^7 + 811*u^8 + 639*u^9 + 429*u^10 + 261*u^11 + 131*u^12 + 57*u^13 + 20*u^14 + 5*u^15 + u^16", "1 + 75*u - 401*u^2 + 1505*u^3 + 9706*u^4 - 36930*u^5 + 49956*u^6 - 28518*u^7 - 2857*u^8 + 15551*u^9 - 10775*u^10 + 3405*u^11 - 201*u^12 - 239*u^13 + 92*u^14 - 15*u^15 + u^16", "105511 + 197809*u + 439673*u^2 + 1680649*u^3 + 2509128*u^4 + 2272654*u^5 + 1832756*u^6 + 1204246*u^7 + 589957*u^8 + 240025*u^9 + 80419*u^10 + 21873*u^11 + 5083*u^12 + 903*u^13 + 136*u^14 + 13*u^15 + u^16", "16 - 152*u + 345*u^2 + 575*u^3 - 2636*u^4 + 876*u^5 + 4578*u^6 - 5226*u^7 + 258*u^8 + 2856*u^9 - 1779*u^10 - 57*u^11 + 582*u^12 - 336*u^13 + 97*u^14 - 15*u^15 + u^16", "433 + 171*u - 4009*u^2 - 6307*u^3 - 1422*u^4 + 10060*u^5 + 38764*u^6 + 35588*u^7 + 11029*u^8 + 1773*u^9 + 97*u^10 - 119*u^11 - 63*u^12 - 5*u^13 + 14*u^14 + 7*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "-287 - 1256*u + 1596*u^2 - 22711*u^3 - 10378*u^4 + 43218*u^5 + 13602*u^6 - 27466*u^7 - 8031*u^8 + 7696*u^9 + 2630*u^10 - 1269*u^11 - 527*u^12 + 8*u^13 + 43*u^14 + 10*u^15 + u^16", "4 - 18*u + 365*u^2 + 499*u^3 + 180*u^4 + 1072*u^5 + 1552*u^6 - 88*u^7 - 1496*u^8 - 882*u^9 + 345*u^10 + 507*u^11 + 76*u^12 - 76*u^13 - 21*u^14 + 3*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "7 - 8*u - 30*u^2 + 53*u^3 + 68*u^4 - 8*u^5 + 76*u^6 + 38*u^7 - 89*u^8 - 26*u^9 + 20*u^10 + 7*u^11 + 11*u^12 - 8*u^13 - 3*u^14 + u^16", "174641 + 146032*u + 330116*u^2 + 869557*u^3 + 328346*u^4 + 60260*u^5 + 878*u^6 - 234992*u^7 - 29009*u^8 - 64404*u^9 + 2266*u^10 - 2849*u^11 + 1073*u^12 + 228*u^13 - 47*u^14 - 6*u^15 + u^16", "-1 - 10*u - 40*u^2 - 123*u^3 - 270*u^4 - 438*u^5 - 626*u^6 - 616*u^7 - 581*u^8 - 534*u^9 - 374*u^10 - 179*u^11 + 41*u^12 + 6*u^13 - 5*u^14 - 2*u^15 + u^16", "1 + 2*u - 4*u^2 + 15*u^3 - 50*u^4 + 40*u^5 - 86*u^6 - 94*u^7 + 9*u^8 - 148*u^9 + 74*u^10 - 81*u^11 + 45*u^12 - 20*u^13 + 11*u^14 - 2*u^15 + u^16", "-877 - 2416*u + 8840*u^2 + 36219*u^3 + 21746*u^4 - 27938*u^5 - 1232*u^6 + 23062*u^7 - 11701*u^8 + 1048*u^9 + 2722*u^10 - 725*u^11 - 421*u^12 + 68*u^13 + 59*u^14 + 12*u^15 + u^16", "1 + 12*u + 56*u^2 + 285*u^3 + 770*u^4 + 1412*u^5 + 2590*u^6 + 4028*u^7 + 5071*u^8 + 5656*u^9 + 5362*u^10 + 3847*u^11 + 1939*u^12 + 658*u^13 + 143*u^14 + 18*u^15 + u^16", "1 + 12*u - 144*u^2 + 157*u^3 + 2382*u^4 - 10488*u^5 + 18278*u^6 + 3772*u^7 - 37969*u^8 + 42988*u^9 - 23282*u^10 + 6171*u^11 - 161*u^12 - 414*u^13 + 131*u^14 - 18*u^15 + u^16", "47 - 266*u + 768*u^2 - 901*u^3 - 524*u^4 + 3280*u^5 - 4702*u^6 + 2592*u^7 + 869*u^8 - 2178*u^9 + 1272*u^10 - 133*u^11 - 211*u^12 + 96*u^13 - 3*u^14 - 6*u^15 + u^16", "17 - 4*u - 230*u^2 + 19*u^3 + 762*u^4 - 212*u^5 - 1722*u^6 + 2068*u^7 - 281*u^8 - 956*u^9 + 600*u^10 + 43*u^11 - 169*u^12 + 54*u^13 + 5*u^14 - 6*u^15 + u^16", "-133877 - 1209374*u - 4715536*u^2 - 9654455*u^3 - 8528464*u^4 - 2859998*u^5 - 583256*u^6 - 348254*u^7 - 77157*u^8 - 17284*u^9 - 20508*u^10 - 2093*u^11 + 1743*u^12 + 120*u^13 - 45*u^14 - 4*u^15 + u^16", "1549 + 3108*u - 19718*u^2 - 42551*u^3 + 38730*u^4 + 45752*u^5 - 53720*u^6 - 15882*u^7 + 14555*u^8 - 5322*u^9 + 2436*u^10 - 873*u^11 + 319*u^12 - 56*u^13 + 19*u^14 - 4*u^15 + u^16", "11764 + 59764*u + 199107*u^2 + 461921*u^3 + 397222*u^4 - 599988*u^5 - 1376872*u^6 - 380494*u^7 + 493122*u^8 + 58108*u^9 - 30461*u^10 - 2357*u^11 + 1352*u^12 - 34*u^13 - 47*u^14 + u^15 + u^16", "-13 - 51*u - 31*u^2 + 51*u^3 - 42*u^4 - 832*u^5 - 1442*u^6 - 350*u^7 + 355*u^8 - 787*u^9 - 967*u^10 + 257*u^11 + 59*u^12 - 109*u^13 - 20*u^14 + 5*u^15 + u^16" ], "GeometricComponent":"{14, 15}", "uPolys_ij_N":[ "1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16", "1 + 15*u + 75*u^2 + 233*u^3 + 482*u^4 + 710*u^5 + 892*u^6 + 906*u^7 + 811*u^8 + 639*u^9 + 429*u^10 + 261*u^11 + 131*u^12 + 57*u^13 + 20*u^14 + 5*u^15 + u^16", "1 + 75*u - 401*u^2 + 1505*u^3 + 9706*u^4 - 36930*u^5 + 49956*u^6 - 28518*u^7 - 2857*u^8 + 15551*u^9 - 10775*u^10 + 3405*u^11 - 201*u^12 - 239*u^13 + 92*u^14 - 15*u^15 + u^16", "105511 + 197809*u + 439673*u^2 + 1680649*u^3 + 2509128*u^4 + 2272654*u^5 + 1832756*u^6 + 1204246*u^7 + 589957*u^8 + 240025*u^9 + 80419*u^10 + 21873*u^11 + 5083*u^12 + 903*u^13 + 136*u^14 + 13*u^15 + u^16", "16 - 152*u + 345*u^2 + 575*u^3 - 2636*u^4 + 876*u^5 + 4578*u^6 - 5226*u^7 + 258*u^8 + 2856*u^9 - 1779*u^10 - 57*u^11 + 582*u^12 - 336*u^13 + 97*u^14 - 15*u^15 + u^16", "433 + 171*u - 4009*u^2 - 6307*u^3 - 1422*u^4 + 10060*u^5 + 38764*u^6 + 35588*u^7 + 11029*u^8 + 1773*u^9 + 97*u^10 - 119*u^11 - 63*u^12 - 5*u^13 + 14*u^14 + 7*u^15 + u^16", "4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16", "-287 - 1256*u + 1596*u^2 - 22711*u^3 - 10378*u^4 + 43218*u^5 + 13602*u^6 - 27466*u^7 - 8031*u^8 + 7696*u^9 + 2630*u^10 - 1269*u^11 - 527*u^12 + 8*u^13 + 43*u^14 + 10*u^15 + u^16", "4 - 18*u + 365*u^2 + 499*u^3 + 180*u^4 + 1072*u^5 + 1552*u^6 - 88*u^7 - 1496*u^8 - 882*u^9 + 345*u^10 + 507*u^11 + 76*u^12 - 76*u^13 - 21*u^14 + 3*u^15 + u^16", "1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16", "7 - 8*u - 30*u^2 + 53*u^3 + 68*u^4 - 8*u^5 + 76*u^6 + 38*u^7 - 89*u^8 - 26*u^9 + 20*u^10 + 7*u^11 + 11*u^12 - 8*u^13 - 3*u^14 + u^16", "174641 + 146032*u + 330116*u^2 + 869557*u^3 + 328346*u^4 + 60260*u^5 + 878*u^6 - 234992*u^7 - 29009*u^8 - 64404*u^9 + 2266*u^10 - 2849*u^11 + 1073*u^12 + 228*u^13 - 47*u^14 - 6*u^15 + u^16", "-1 - 10*u - 40*u^2 - 123*u^3 - 270*u^4 - 438*u^5 - 626*u^6 - 616*u^7 - 581*u^8 - 534*u^9 - 374*u^10 - 179*u^11 + 41*u^12 + 6*u^13 - 5*u^14 - 2*u^15 + u^16", "1 + 2*u - 4*u^2 + 15*u^3 - 50*u^4 + 40*u^5 - 86*u^6 - 94*u^7 + 9*u^8 - 148*u^9 + 74*u^10 - 81*u^11 + 45*u^12 - 20*u^13 + 11*u^14 - 2*u^15 + u^16", "-877 - 2416*u + 8840*u^2 + 36219*u^3 + 21746*u^4 - 27938*u^5 - 1232*u^6 + 23062*u^7 - 11701*u^8 + 1048*u^9 + 2722*u^10 - 725*u^11 - 421*u^12 + 68*u^13 + 59*u^14 + 12*u^15 + u^16", "1 + 12*u + 56*u^2 + 285*u^3 + 770*u^4 + 1412*u^5 + 2590*u^6 + 4028*u^7 + 5071*u^8 + 5656*u^9 + 5362*u^10 + 3847*u^11 + 1939*u^12 + 658*u^13 + 143*u^14 + 18*u^15 + u^16", "1 + 12*u - 144*u^2 + 157*u^3 + 2382*u^4 - 10488*u^5 + 18278*u^6 + 3772*u^7 - 37969*u^8 + 42988*u^9 - 23282*u^10 + 6171*u^11 - 161*u^12 - 414*u^13 + 131*u^14 - 18*u^15 + u^16", "47 - 266*u + 768*u^2 - 901*u^3 - 524*u^4 + 3280*u^5 - 4702*u^6 + 2592*u^7 + 869*u^8 - 2178*u^9 + 1272*u^10 - 133*u^11 - 211*u^12 + 96*u^13 - 3*u^14 - 6*u^15 + u^16", "17 - 4*u - 230*u^2 + 19*u^3 + 762*u^4 - 212*u^5 - 1722*u^6 + 2068*u^7 - 281*u^8 - 956*u^9 + 600*u^10 + 43*u^11 - 169*u^12 + 54*u^13 + 5*u^14 - 6*u^15 + u^16", "-133877 - 1209374*u - 4715536*u^2 - 9654455*u^3 - 8528464*u^4 - 2859998*u^5 - 583256*u^6 - 348254*u^7 - 77157*u^8 - 17284*u^9 - 20508*u^10 - 2093*u^11 + 1743*u^12 + 120*u^13 - 45*u^14 - 4*u^15 + u^16", "1549 + 3108*u - 19718*u^2 - 42551*u^3 + 38730*u^4 + 45752*u^5 - 53720*u^6 - 15882*u^7 + 14555*u^8 - 5322*u^9 + 2436*u^10 - 873*u^11 + 319*u^12 - 56*u^13 + 19*u^14 - 4*u^15 + u^16", "11764 + 59764*u + 199107*u^2 + 461921*u^3 + 397222*u^4 - 599988*u^5 - 1376872*u^6 - 380494*u^7 + 493122*u^8 + 58108*u^9 - 30461*u^10 - 2357*u^11 + 1352*u^12 - 34*u^13 - 47*u^14 + u^15 + u^16", "-13 - 51*u - 31*u^2 + 51*u^3 - 42*u^4 - 832*u^5 - 1442*u^6 - 350*u^7 + 355*u^8 - 787*u^9 - 967*u^10 + 257*u^11 + 59*u^12 - 109*u^13 - 20*u^14 + 5*u^15 + u^16" ], "Multiplicity":1, "ij_list":[ [ "{1, 4}", "{2, 4}", "{2, 5}" ], [ "{1, 2}", "{2, 6}", "{3, 5}", "{4, 5}" ], [ "{3, 4}" ], [ "{3, 6}" ], [ "{1, 5}", "{2, 3}", "{8, 9}" ], [ "{1, 3}" ], [ "{2, 8}", "{2, 9}", "{3, 8}" ], [ "{5, 7}" ], [ "{4, 7}" ], [ "{1, 7}", "{1, 8}", "{6, 9}", "{6, 10}", "{7, 10}" ], [ "{4, 8}" ], [ "{3, 7}" ], [ "{2, 7}", "{2, 10}" ], [ "{1, 9}", "{4, 9}", "{5, 8}", "{6, 8}" ], [ "{5, 10}" ], [ "{1, 10}", "{6, 7}", "{7, 8}", "{9, 10}" ], [ "{5, 6}" ], [ "{4, 6}" ], [ "{1, 6}", "{7, 9}", "{8, 10}" ], [ "{3, 10}" ], [ "{5, 9}" ], [ "{3, 9}" ], [ "{4, 10}" ] ], "SortedReprnIndices":"{14, 15, 8, 9, 2, 1, 5, 4, 13, 12, 6, 7, 10, 11, 3, 16}", "aCuspShapeN":[ "-10.7386628254330146999`5.135705877530915 + 2.8528853539886410112`4.560039990454575*I", "-10.7386628254330146999`5.135705877530915 - 2.8528853539886410112`4.560039990454575*I", -0.21282, "-7.4192836664657463719`5.146942891910248 + 0.9555105438612842204`4.2568163996059205*I", "-7.4192836664657463719`5.146942891910248 - 0.9555105438612842204`4.2568163996059205*I", "-4.3288664612248526082`5.150065038049312 + 0.1971555008271205419`3.808499748146454*I", "-4.3288664612248526082`5.150065038049312 - 0.1971555008271205419`3.808499748146454*I", "-5.6907250407728418904`5.008125366310386 - 5.4777343938469814141`4.991558734254609*I", "-5.6907250407728418904`5.008125366310386 + 5.4777343938469814141`4.991558734254609*I", -4.3072, -1.0175e1, "-6.9512251362640882166`5.023350677031514 + 6.202161284946941387`4.97383237808348*I", "-6.9512251362640882166`5.023350677031514 - 6.202161284946941387`4.97383237808348*I", "-9.2338460686214576238`5.090352584618075 - 5.2172708087977146044`4.842413334072105*I", "-9.2338460686214576238`5.090352584618075 + 5.2172708087977146044`4.842413334072105*I", -6.5795 ], "Abelian":false }, { "IdealName":"J10_127_1", "Generators":[ "-a + b", "-1 - a + a^2", "-1 + u" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.3855000000000014e-2, "TimingZeroDimVars":7.5667e-2, "TimingmagmaVCompNormalize":7.717500000000001e-2, "TimingNumberOfSols":3.3732000000000005e-2, "TimingIsRadical":2.142e-3, "TimingArcColoring":7.323800000000001e-2, "TimingObstruction":1.02e-3, "TimingComplexVolumeN":1.436933, "TimingaCuspShapeN":7.804e-3, "TiminguValues":0.630994, "TiminguPolysN":3.140000000000001e-4, "TiminguPolys":0.823161, "TimingaCuspShape":9.0461e-2, "TimingRepresentationsN":3.2094e-2, "TiminguValues_ij":0.159247, "TiminguPoly_ij":0.704886, "TiminguPolys_ij_N":3.3e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ "{1, 0}", "{1, 1}", "{1, 1}", "{0, 1}", "{-1, 0}", [ "-2 - a", "-1 - a" ], [ "2*a", "a" ], [ "a", "a" ], [ "a", "a" ], [ "-1 - 2*a", "-1 - a" ] ], "Obstruction":1, "ComplexVolumeN":[ -2.63189, -1.05276e1 ], "uPolysN":[ "1 - 2*u + u^2", "u^2", "1 - 2*u + u^2", "1 + 2*u + u^2", "-1 + u + u^2", "-1 + u + u^2", "-1 + u + u^2", "u^2", "-1 - u + u^2", "-1 - u + u^2" ], "uPolys":[ "(-1 + u)^2", "u^2", "(-1 + u)^2", "(1 + u)^2", "-1 + u + u^2", "-1 + u + u^2", "-1 + u + u^2", "u^2", "-1 - u + u^2", "-1 - u + u^2" ], "aCuspShape":-17, "RepresentationsN":[ [ "u->1.", "a->-0.618034", "b->-0.618034" ], [ "u->1.", "a->1.61803", "b->1.61803" ] ], "Epsilon":3.16228, "uPolys_ij":[ "u^2", "(-1 + u)^2", "1 + 3*u + u^2", "-4 + 2*u + u^2", "-1 + u + u^2", "-1 - u + u^2", "1 - 3*u + u^2", "5 - 5*u + u^2", "-1 - 4*u + u^2" ], "GeometricComponent":0, "uPolys_ij_N":[ "u^2", "1 - 2*u + u^2", "1 + 3*u + u^2", "-4 + 2*u + u^2", "-1 + u + u^2", "-1 - u + u^2", "1 - 3*u + u^2", "5 - 5*u + u^2", "-1 - 4*u + u^2" ], "Multiplicity":1, "ij_list":[ [ "{1, 5}", "{2, 3}", "{2, 8}", "{2, 9}", "{3, 8}", "{3, 9}", "{8, 9}" ], [ "{1, 2}", "{1, 3}", "{1, 4}", "{2, 4}", "{2, 5}", "{2, 6}", "{3, 4}", "{3, 5}", "{3, 6}", "{4, 5}" ], [ "{1, 6}", "{1, 10}" ], [ "{4, 7}" ], [ "{2, 7}", "{3, 7}", "{4, 8}", "{4, 9}", "{5, 7}", "{5, 8}", "{5, 9}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 10}" ], [ "{1, 7}", "{1, 8}", "{1, 9}", "{2, 10}", "{3, 10}" ], [ "{5, 6}", "{5, 10}", "{6, 7}", "{7, 8}", "{7, 9}", "{8, 10}", "{9, 10}" ], [ "{4, 6}" ], [ "{4, 10}" ] ], "SortedReprnIndices":"{2, 1}", "aCuspShapeN":[ -1.7e1, -1.7e1 ], "Abelian":false }, { "IdealName":"abJ10_127_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":5.3674e-2, "TimingZeroDimVars":7.6777e-2, "TimingmagmaVCompNormalize":7.809300000000001e-2, "TimingNumberOfSols":2.9325e-2, "TimingIsRadical":1.807e-3, "TimingArcColoring":6.8325e-2, "TimingObstruction":4.0800000000000005e-4, "TimingComplexVolumeN":0.675836, "TimingaCuspShapeN":4.4690000000000025e-3, "TiminguValues":0.636245, "TiminguPolysN":7.3e-5, "TiminguPolys":0.805672, "TimingaCuspShape":8.433e-2, "TimingRepresentationsN":2.8855e-2, "TiminguValues_ij":0.153882, "TiminguPoly_ij":0.153435, "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)^2*(1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16)", "u^2*(4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16)", "(-1 + u)^2*(1 + 15*u + 75*u^2 + 233*u^3 + 482*u^4 + 710*u^5 + 892*u^6 + 906*u^7 + 811*u^8 + 639*u^9 + 429*u^10 + 261*u^11 + 131*u^12 + 57*u^13 + 20*u^14 + 5*u^15 + u^16)", "(1 + u)^2*(1 - 3*u - 3*u^2 + 9*u^3 + 6*u^4 - 22*u^5 + 8*u^6 + 22*u^7 - 17*u^8 - 11*u^9 + 19*u^10 + u^11 - 13*u^12 + 7*u^13 + 2*u^14 - 3*u^15 + u^16)", "(-1 + u + u^2)*(1 + 2*u - 4*u^2 + 15*u^3 - 50*u^4 + 40*u^5 - 86*u^6 - 94*u^7 + 9*u^8 - 148*u^9 + 74*u^10 - 81*u^11 + 45*u^12 - 20*u^13 + 11*u^14 - 2*u^15 + u^16)", "(-1 + u + u^2)*(1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16)", "(-1 + u + u^2)*(1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16)", "u^2*(4 + 4*u - 17*u^2 - 3*u^3 + 4*u^4 - 34*u^5 + 56*u^6 + 20*u^7 - 48*u^8 + 20*u^9 - u^10 - 23*u^11 + 16*u^12 + 8*u^13 - 7*u^14 - u^15 + u^16)", "(-1 - u + u^2)*(1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16)", "(-1 - u + u^2)*(1 - 6*u^2 - 9*u^3 + 10*u^4 + 4*u^5 - 42*u^6 + 4*u^7 + 47*u^8 - 28*u^9 - 32*u^10 + 33*u^11 + 19*u^12 - 14*u^13 - 7*u^14 + 2*u^15 + u^16)" ], "RileyPolyC":[ "(-1 + y)^2*(1 - 15*y + 75*y^2 - 233*y^3 + 482*y^4 - 710*y^5 + 892*y^6 - 906*y^7 + 811*y^8 - 639*y^9 + 429*y^10 - 261*y^11 + 131*y^12 - 57*y^13 + 20*y^14 - 5*y^15 + y^16)", "y^2*(16 - 152*y + 345*y^2 + 575*y^3 - 2636*y^4 + 876*y^5 + 4578*y^6 - 5226*y^7 + 258*y^8 + 2856*y^9 - 1779*y^10 - 57*y^11 + 582*y^12 - 336*y^13 + 97*y^14 - 15*y^15 + y^16)", "(-1 + y)^2*(1 - 75*y - 401*y^2 - 1505*y^3 + 9706*y^4 + 36930*y^5 + 49956*y^6 + 28518*y^7 - 2857*y^8 - 15551*y^9 - 10775*y^10 - 3405*y^11 - 201*y^12 + 239*y^13 + 92*y^14 + 15*y^15 + y^16)", "(-1 + y)^2*(1 - 15*y + 75*y^2 - 233*y^3 + 482*y^4 - 710*y^5 + 892*y^6 - 906*y^7 + 811*y^8 - 639*y^9 + 429*y^10 - 261*y^11 + 131*y^12 - 57*y^13 + 20*y^14 - 5*y^15 + y^16)", "(1 - 3*y + y^2)*(1 - 12*y - 144*y^2 - 157*y^3 + 2382*y^4 + 10488*y^5 + 18278*y^6 - 3772*y^7 - 37969*y^8 - 42988*y^9 - 23282*y^10 - 6171*y^11 - 161*y^12 + 414*y^13 + 131*y^14 + 18*y^15 + y^16)", "(1 - 3*y + y^2)*(1 - 12*y + 56*y^2 - 285*y^3 + 770*y^4 - 1412*y^5 + 2590*y^6 - 4028*y^7 + 5071*y^8 - 5656*y^9 + 5362*y^10 - 3847*y^11 + 1939*y^12 - 658*y^13 + 143*y^14 - 18*y^15 + y^16)", "(1 - 3*y + y^2)*(1 - 12*y + 56*y^2 - 285*y^3 + 770*y^4 - 1412*y^5 + 2590*y^6 - 4028*y^7 + 5071*y^8 - 5656*y^9 + 5362*y^10 - 3847*y^11 + 1939*y^12 - 658*y^13 + 143*y^14 - 18*y^15 + y^16)", "y^2*(16 - 152*y + 345*y^2 + 575*y^3 - 2636*y^4 + 876*y^5 + 4578*y^6 - 5226*y^7 + 258*y^8 + 2856*y^9 - 1779*y^10 - 57*y^11 + 582*y^12 - 336*y^13 + 97*y^14 - 15*y^15 + y^16)", "(1 - 3*y + y^2)*(1 - 12*y + 56*y^2 - 285*y^3 + 770*y^4 - 1412*y^5 + 2590*y^6 - 4028*y^7 + 5071*y^8 - 5656*y^9 + 5362*y^10 - 3847*y^11 + 1939*y^12 - 658*y^13 + 143*y^14 - 18*y^15 + y^16)", "(1 - 3*y + y^2)*(1 - 12*y + 56*y^2 - 285*y^3 + 770*y^4 - 1412*y^5 + 2590*y^6 - 4028*y^7 + 5071*y^8 - 5656*y^9 + 5362*y^10 - 3847*y^11 + 1939*y^12 - 658*y^13 + 143*y^14 - 18*y^15 + y^16)" ] }, "GeometricRepresentation":[ 8.89682, [ "J10_127_0", 1, "{14, 15}" ] ] } }