{ "Index":152, "Name":"10_68", "RolfsenName":"10_68", "DTname":"10a_67", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{10, -16, -14, -18, 12, 2, -20, -4, -8, -6}", "Acode":"{6, -9, -8, -10, 7, 2, -1, -3, -5, -4}", "PDcode":[ "{1, 11, 2, 10}", "{3, 16, 4, 17}", "{5, 14, 6, 15}", "{7, 18, 8, 19}", "{9, 13, 10, 12}", "{11, 3, 12, 2}", "{13, 20, 14, 1}", "{15, 4, 16, 5}", "{17, 8, 18, 9}", "{19, 6, 20, 7}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{2, 9, 6}", [], [ "{2, -9, 3, 1}", "{6, 2, 7, 1}", "{2, 6, 1, 2}", "{6, 7, 5, 2}", "{9, -3, 8, 2}", "{3, -8, 4, 1}", "{1, -4, 10, 2}" ], "{7, 9}", "{4}", 4 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "a - a*b^2 - b^3 + a*b^4 + u", "b - b^3 + b^5 - u - u^3", "-1 + a*b - b^2 + a^2*u - 2*a^2*b^2*u + 2*a*b^3*u + a^2*b^4*u - 2*a*b^5*u + b^6*u + 2*u^2 - 2*a*b*u^2 - 2*b^2*u^2 + 3*u^4 - 3*a*b*u^4 - b^2*u^4 + u^6 - a*b*u^6", "b^2 + u + a*b*u - 2*a*b^3*u + b^4*u + a*b^5*u - b^6*u + 2*b^2*u^2 - 4*u^4 + 4*a*b*u^4 + 3*b^2*u^4 - 4*u^6 + 4*a*b*u^6 + b^2*u^6 - u^8 + a*b*u^8" ], "TimingForPrimaryIdeals":0.128841 }, "v":{ "CheckEq":[ "b - b^3 + b^5", "a - a*b^2 - b^3 + a*b^4 - v", "b^2 - b^2*v + 2*b^4*v - b^6*v", "-1 + a*b - b^2 + v - a*b*v + 2*a*b^3*v - b^4*v - a*b^5*v + b^6*v" ], "TimingForPrimaryIdeals":7.62e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_68_0", "Generators":[ "1 + 2*b - 3*u - u^2 - 3*u^3 + 7*u^4 - 15*u^5 + 12*u^6 - 17*u^7 + 6*u^8 - 7*u^9 + u^10 - u^11", "3 + 4*a - 3*u - 2*u^2 + 10*u^3 + 20*u^4 - 22*u^5 + 43*u^6 - 54*u^7 + 30*u^8 - 36*u^9 + 9*u^10 - 10*u^11 + u^12 - u^13", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":7.4066e-2, "TimingZeroDimVars":7.0645e-2, "TimingmagmaVCompNormalize":7.2115e-2, "TimingNumberOfSols":0.151802, "TimingIsRadical":6.294e-3, "TimingArcColoring":6.6136e-2, "TimingObstruction":2.2456999999999998e-2, "TimingComplexVolumeN":1.3111052e1, "TimingaCuspShapeN":8.147800000000001e-2, "TiminguValues":0.663985, "TiminguPolysN":1.6470000000000002e-2, "TiminguPolys":0.867347, "TimingaCuspShape":0.112936, "TimingRepresentationsN":0.138544, "TiminguValues_ij":0.185642, "TiminguPoly_ij":1.279776, "TiminguPolys_ij_N":3.0041e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":14, "IsRadical":true, "ArcColoring":[ [ "2*u + u^3", "(-1 + 5*u - 12*u^3 - 6*u^4 - 8*u^5 - 19*u^6 + 20*u^7 - 18*u^8 + 22*u^9 - 7*u^10 + 8*u^11 - u^12 + u^13)\/4" ], "{1, 0}", [ 1, "-u^2" ], [ "1 + u^2", "-2*u^2 - u^4" ], [ -1, "(-1 - u + 12*u^2 + 8*u^3 + 2*u^4 - 8*u^5 - 31*u^6 - 30*u^7 - 28*u^8 - 24*u^9 - 9*u^10 - 8*u^11 - u^12 - u^13)\/4" ], [ "(-3 + 3*u + 2*u^2 - 10*u^3 - 20*u^4 + 22*u^5 - 43*u^6 + 54*u^7 - 30*u^8 + 36*u^9 - 9*u^10 + 10*u^11 - u^12 + u^13)\/4", "(-1 + 3*u + u^2 + 3*u^3 - 7*u^4 + 15*u^5 - 12*u^6 + 17*u^7 - 6*u^8 + 7*u^9 - u^10 + u^11)\/2" ], [ "(-1 - 3*u - 16*u^3 - 6*u^4 - 8*u^5 - 19*u^6 + 20*u^7 - 18*u^8 + 22*u^9 - 7*u^10 + 8*u^11 - u^12 + u^13)\/4", "(-1 + 3*u + u^2 + 3*u^3 - 7*u^4 + 15*u^5 - 12*u^6 + 17*u^7 - 6*u^8 + 7*u^9 - u^10 + u^11)\/2" ], [ "-u", "u + u^3" ], [ 0, "u" ], [ "u", "(-1 + 5*u - 4*u^3 - 6*u^4 - 4*u^5 - 19*u^6 + 20*u^7 - 18*u^8 + 22*u^9 - 7*u^10 + 8*u^11 - u^12 + u^13)\/4" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-0.78724 - 4.41668*I", "-0.78724 + 4.41668*I", "-6.78342 - 2.90589*I", "-6.78342 + 2.90589*I", "1.03552 + 0.368514*I", "1.03552 - 0.368514*I", "-1.4273 + 1.54478*I", "-1.4273 - 1.54478*I", "-10.5865 - 6.189*I", "-10.5865 + 6.189*I", "-13.5268 + 11.637*I", "-13.5268 - 11.637*I", "-15.6273 + 2.2414*I", "-15.6273 - 2.2414*I" ], "uPolysN":[ "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "4 + 5*u + 27*u^2 + 51*u^3 + 57*u^4 + 24*u^5 + 4*u^6 + 20*u^7 + 63*u^8 + 91*u^9 + 86*u^10 + 56*u^11 + 25*u^12 + 7*u^13 + u^14", "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "26 - 115*u + 253*u^2 - 367*u^3 + 451*u^4 - 558*u^5 + 718*u^6 - 826*u^7 + 775*u^8 - 569*u^9 + 322*u^10 - 138*u^11 + 43*u^12 - 9*u^13 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14" ], "uPolys":[ "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "4 + 5*u + 27*u^2 + 51*u^3 + 57*u^4 + 24*u^5 + 4*u^6 + 20*u^7 + 63*u^8 + 91*u^9 + 86*u^10 + 56*u^11 + 25*u^12 + 7*u^13 + u^14", "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "26 - 115*u + 253*u^2 - 367*u^3 + 451*u^4 - 558*u^5 + 718*u^6 - 826*u^7 + 775*u^8 - 569*u^9 + 322*u^10 - 138*u^11 + 43*u^12 - 9*u^13 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14" ], "aCuspShape":"3 + 7*u + 9*u^2 + 9*u^3 - 33*u^4 - 39*u^5 - 46*u^6 - 79*u^7 - 20*u^8 - 55*u^9 - 3*u^10 - 17*u^11 - 2*u^13", "RepresentationsN":[ [ "u->-0.552436 + 0.381452 I", "a->1.22078 - 1.57866 I", "b->1.04184 + 0.481714 I" ], [ "u->-0.552436 - 0.381452 I", "a->1.22078 + 1.57866 I", "b->1.04184 - 0.481714 I" ], [ "u->-0.04509 + 1.43706 I", "a->0.567049 - 0.433483 I", "b->0.830389 + 0.784414 I" ], [ "u->-0.04509 - 1.43706 I", "a->0.567049 + 0.433483 I", "b->0.830389 - 0.784414 I" ], [ "u->0.498731 + 0.15732 I", "a->-0.611249 - 0.332083 I", "b->0.400528 + 0.482833 I" ], [ "u->0.498731 - 0.15732 I", "a->-0.611249 + 0.332083 I", "b->0.400528 - 0.482833 I" ], [ "u->-0.16479 + 0.46668 I", "a->-1.43454 + 0.30361 I", "b->-0.941064 + 0.407114 I" ], [ "u->-0.16479 - 0.46668 I", "a->-1.43454 - 0.30361 I", "b->-0.941064 - 0.407114 I" ], [ "u->-0.2655 + 1.53094 I", "a->-0.292054 - 0.268287 I", "b->0.243278 - 0.91702 I" ], [ "u->-0.2655 - 1.53094 I", "a->-0.292054 + 0.268287 I", "b->0.243278 + 0.91702 I" ], [ "u->0.33038 + 1.55103 I", "a->1.76709 + 0.94504 I", "b->1.21121 - 0.579083 I" ], [ "u->0.33038 - 1.55103 I", "a->1.76709 - 0.94504 I", "b->1.21121 + 0.579083 I" ], [ "u->0.1987 + 1.61232 I", "a->-1.71708 - 0.22802 I", "b->-1.28617 - 0.280982 I" ], [ "u->0.1987 - 1.61232 I", "a->-1.71708 + 0.22802 I", "b->-1.28617 + 0.280982 I" ] ], "Epsilon":1.21352, "uPolys_ij":[ "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + 2*u - 3*u^2 - 14*u^3 + 186*u^4 + 222*u^5 + 669*u^6 + 2359*u^7 + 3808*u^8 + 3400*u^9 + 1867*u^10 + 653*u^11 + 143*u^12 + 18*u^13 + u^14", "32 - 16*u + 168*u^2 - 276*u^3 + 102*u^4 - 165*u^5 + 669*u^6 + 78*u^7 + 316*u^8 + 95*u^9 + 55*u^10 + 9*u^11 + 10*u^12 + 3*u^13 + u^14", "1 - 2*u + 9*u^2 + 8*u^3 + 4*u^4 - 48*u^5 + 193*u^6 - 197*u^7 + 288*u^8 - 130*u^9 + 111*u^10 - 29*u^11 + 17*u^12 - 2*u^13 + u^14", "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "676 - 69*u + 3051*u^2 + 2513*u^3 + 7457*u^4 + 8012*u^5 + 8540*u^6 + 4512*u^7 + 1707*u^8 - 31*u^9 - 142*u^10 - 44*u^11 + 9*u^12 + 5*u^13 + u^14", "512 - 3072*u + 7936*u^2 - 11904*u^3 + 18272*u^4 - 37120*u^5 + 66360*u^6 - 78260*u^7 + 59412*u^8 - 29793*u^9 + 10023*u^10 - 2247*u^11 + 323*u^12 - 27*u^13 + u^14", "26 - 115*u + 253*u^2 - 367*u^3 + 451*u^4 - 558*u^5 + 718*u^6 - 826*u^7 + 775*u^8 - 569*u^9 + 322*u^10 - 138*u^11 + 43*u^12 - 9*u^13 + u^14", "4 - 48*u + 206*u^2 - 312*u^3 + 49*u^4 - 234*u^5 + 831*u^6 + 1282*u^7 + 813*u^8 - 378*u^9 + 258*u^10 - 41*u^11 + 21*u^12 - 2*u^13 + u^14", "4 + 5*u + 27*u^2 + 51*u^3 + 57*u^4 + 24*u^5 + 4*u^6 + 20*u^7 + 63*u^8 + 91*u^9 + 86*u^10 + 56*u^11 + 25*u^12 + 7*u^13 + u^14", "416 - 199*u - 4765*u^2 - 4035*u^3 + 12591*u^4 + 31110*u^5 + 30136*u^6 + 8878*u^7 + 8593*u^8 + 981*u^9 + 982*u^10 + 50*u^11 + 51*u^12 + u^13 + u^14", "7 - 20*u - 32*u^2 + 86*u^3 + 365*u^4 + 384*u^5 + 108*u^6 - 215*u^7 - 140*u^8 - 17*u^9 + 68*u^10 + 19*u^11 - 14*u^12 - 2*u^13 + u^14", "13 - 90*u + 266*u^2 - 376*u^3 + 205*u^4 - 112*u^5 + 546*u^6 - 813*u^7 + 386*u^8 - 121*u^9 + 136*u^10 + 9*u^11 - 22*u^12 + u^14", "4 + 10*u^2 + 32*u^3 + 133*u^4 + 228*u^5 + 401*u^6 + 352*u^7 + 347*u^8 + 160*u^9 + 126*u^10 + 15*u^11 + 19*u^12 + u^14", "1 + 2*u + 12*u^2 - 18*u^3 + 67*u^4 - 46*u^5 + 62*u^6 + 15*u^7 + 6*u^8 + 5*u^9 + 4*u^10 + 11*u^11 - 2*u^12 - 2*u^13 + u^14", "16 - 191*u + 675*u^2 - 269*u^3 + 1321*u^4 - 1020*u^5 + 1240*u^6 - 1116*u^7 + 519*u^8 - 293*u^9 + 82*u^10 - 16*u^11 + 13*u^12 - u^13 + u^14" ], "GeometricComponent":"{11, 12}", "uPolys_ij_N":[ "1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14", "1 + 2*u - 3*u^2 - 14*u^3 + 186*u^4 + 222*u^5 + 669*u^6 + 2359*u^7 + 3808*u^8 + 3400*u^9 + 1867*u^10 + 653*u^11 + 143*u^12 + 18*u^13 + u^14", "32 - 16*u + 168*u^2 - 276*u^3 + 102*u^4 - 165*u^5 + 669*u^6 + 78*u^7 + 316*u^8 + 95*u^9 + 55*u^10 + 9*u^11 + 10*u^12 + 3*u^13 + u^14", "1 - 2*u + 9*u^2 + 8*u^3 + 4*u^4 - 48*u^5 + 193*u^6 - 197*u^7 + 288*u^8 - 130*u^9 + 111*u^10 - 29*u^11 + 17*u^12 - 2*u^13 + u^14", "2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14", "676 - 69*u + 3051*u^2 + 2513*u^3 + 7457*u^4 + 8012*u^5 + 8540*u^6 + 4512*u^7 + 1707*u^8 - 31*u^9 - 142*u^10 - 44*u^11 + 9*u^12 + 5*u^13 + u^14", "512 - 3072*u + 7936*u^2 - 11904*u^3 + 18272*u^4 - 37120*u^5 + 66360*u^6 - 78260*u^7 + 59412*u^8 - 29793*u^9 + 10023*u^10 - 2247*u^11 + 323*u^12 - 27*u^13 + u^14", "26 - 115*u + 253*u^2 - 367*u^3 + 451*u^4 - 558*u^5 + 718*u^6 - 826*u^7 + 775*u^8 - 569*u^9 + 322*u^10 - 138*u^11 + 43*u^12 - 9*u^13 + u^14", "4 - 48*u + 206*u^2 - 312*u^3 + 49*u^4 - 234*u^5 + 831*u^6 + 1282*u^7 + 813*u^8 - 378*u^9 + 258*u^10 - 41*u^11 + 21*u^12 - 2*u^13 + u^14", "4 + 5*u + 27*u^2 + 51*u^3 + 57*u^4 + 24*u^5 + 4*u^6 + 20*u^7 + 63*u^8 + 91*u^9 + 86*u^10 + 56*u^11 + 25*u^12 + 7*u^13 + u^14", "416 - 199*u - 4765*u^2 - 4035*u^3 + 12591*u^4 + 31110*u^5 + 30136*u^6 + 8878*u^7 + 8593*u^8 + 981*u^9 + 982*u^10 + 50*u^11 + 51*u^12 + u^13 + u^14", "7 - 20*u - 32*u^2 + 86*u^3 + 365*u^4 + 384*u^5 + 108*u^6 - 215*u^7 - 140*u^8 - 17*u^9 + 68*u^10 + 19*u^11 - 14*u^12 - 2*u^13 + u^14", "13 - 90*u + 266*u^2 - 376*u^3 + 205*u^4 - 112*u^5 + 546*u^6 - 813*u^7 + 386*u^8 - 121*u^9 + 136*u^10 + 9*u^11 - 22*u^12 + u^14", "4 + 10*u^2 + 32*u^3 + 133*u^4 + 228*u^5 + 401*u^6 + 352*u^7 + 347*u^8 + 160*u^9 + 126*u^10 + 15*u^11 + 19*u^12 + u^14", "1 + 2*u + 12*u^2 - 18*u^3 + 67*u^4 - 46*u^5 + 62*u^6 + 15*u^7 + 6*u^8 + 5*u^9 + 4*u^10 + 11*u^11 - 2*u^12 - 2*u^13 + u^14", "16 - 191*u + 675*u^2 - 269*u^3 + 1321*u^4 - 1020*u^5 + 1240*u^6 - 1116*u^7 + 519*u^8 - 293*u^9 + 82*u^10 - 16*u^11 + 13*u^12 - u^13 + u^14" ], "Multiplicity":1, "MinRepresentationVolume":[ "{5, 6}", 0.368514 ], "ij_list":[ [ "{1, 4}", "{2, 9}", "{3, 8}", "{3, 9}", "{4, 8}", "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{1, 10}", "{2, 3}", "{3, 4}", "{4, 5}", "{8, 9}", "{9, 10}" ], [ "{1, 5}", "{2, 8}", "{4, 9}" ], [ "{1, 9}", "{2, 4}", "{7, 10}" ], [ "{1, 6}", "{2, 6}", "{2, 7}" ], [ "{7, 8}" ], [ "{3, 5}", "{8, 10}" ], [ "{1, 7}", "{1, 8}", "{2, 5}" ], [ "{3, 7}" ], [ "{1, 2}", "{5, 7}", "{6, 7}" ], [ "{3, 10}", "{5, 8}" ], [ "{1, 3}", "{2, 10}", "{4, 7}" ], [ "{3, 6}", "{6, 10}" ], [ "{4, 6}", "{6, 9}" ], [ "{7, 9}" ], [ "{5, 6}", "{6, 8}" ] ], "SortedReprnIndices":"{11, 12, 10, 9, 2, 1, 4, 3, 13, 14, 7, 8, 5, 6}", "aCuspShapeN":[ "3.4941738813249350989`4.758066499069945 + 7.8862532978804036195`5.111592708023476*I", "3.4941738813249350989`4.758066499069945 - 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2722*u^2 + 267401*u^3 - 166818*u^4 + 379564*u^5 - 198704*u^6 + 476192*u^7 - 313943*u^8 + 609342*u^9 - 465830*u^10 + 589228*u^11 - 346669*u^12 + 337762*u^13 - 119581*u^14 + 100344*u^15 - 15644*u^16 + 11956*u^17)\/12107", "(-18766 - 53545*u + 17375*u^2 - 142391*u^3 + 93484*u^4 - 186533*u^5 + 125038*u^6 - 250612*u^7 + 176592*u^8 - 318576*u^9 + 237719*u^10 - 292654*u^11 + 173424*u^12 - 169138*u^13 + 59041*u^14 - 53684*u^15 + 7468*u^16 - 7020*u^17)\/12107" ], "{1, 0}", [ 1, "-u^2" ], [ "1 + u^2", "-2*u^2 - u^4" ], [ "(-41151 - 221163*u + 155814*u^2 - 553580*u^3 + 433028*u^4 - 733678*u^5 + 525030*u^6 - 947822*u^7 + 766772*u^8 - 1181549*u^9 + 942252*u^10 - 1040766*u^11 + 625470*u^12 - 551321*u^13 + 200130*u^14 - 156838*u^15 + 24580*u^16 - 18417*u^17)\/12107", "(-5944 + 18561*u - 7721*u^2 + 43156*u^3 - 32482*u^4 + 62196*u^5 - 39388*u^6 + 82632*u^7 - 45252*u^8 + 93973*u^9 - 65774*u^10 + 94154*u^11 - 57156*u^12 + 64089*u^13 - 23224*u^14 + 23175*u^15 - 3490*u^16 + 3339*u^17)\/12107" ], [ "(35011 + 2506*u + 85349*u^2 - 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320142*u^6 + 757782*u^7 - 495913*u^8 + 942734*u^9 - 697064*u^10 + 879306*u^11 - 502569*u^12 + 498244*u^13 - 169335*u^14 + 149650*u^15 - 21609*u^16 + 18270*u^17)\/12107", "(-21756 - 59008*u + 22164*u^2 - 173184*u^3 + 96348*u^4 - 226194*u^5 + 121438*u^6 - 281590*u^7 + 181970*u^8 - 333392*u^9 + 231234*u^10 - 290078*u^11 + 155900*u^12 - 160482*u^13 + 49754*u^14 - 49306*u^15 + 5965*u^16 - 6314*u^17)\/12107" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-6.88799 + 7.08493*I", "-6.88799 - 7.08493*I", "-1.50643 + 2.09337*I", "-1.50643 - 2.09337*I", "-7.66122 - 1.33617*I", "-7.66122 + 1.33617*I", "-3.90681 - 2.45442*I", "-3.90681 + 2.45442*I", -4.48831, -4.48831, "-3.90681 + 2.45442*I", "-3.90681 - 2.45442*I", "-7.66122 + 1.33617*I", "-7.66122 - 1.33617*I", "-6.88799 - 7.08493*I", "-6.88799 + 7.08493*I", "-1.50643 - 2.09337*I", "-1.50643 + 2.09337*I" ], "uPolysN":[ "1 + 2*u + u^2 - 4*u^3 - 10*u^4 - 8*u^5 + 8*u^6 + 22*u^7 + 15*u^8 - 10*u^9 - 27*u^10 - 14*u^11 + 15*u^12 + 20*u^13 - 10*u^15 - 3*u^16 + 2*u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 2*u - 3*u^2 - 12*u^3 - 6*u^4 + 32*u^5 + 68*u^6 + 26*u^7 - 97*u^8 - 174*u^9 - 63*u^10 + 202*u^11 + 423*u^12 + 448*u^13 + 312*u^14 + 150*u^15 + 49*u^16 + 10*u^17 + u^18", "1 + 2*u + u^2 - 4*u^3 - 10*u^4 - 8*u^5 + 8*u^6 + 22*u^7 + 15*u^8 - 10*u^9 - 27*u^10 - 14*u^11 + 15*u^12 + 20*u^13 - 10*u^15 - 3*u^16 + 2*u^17 + u^18", "1 - 2*u - 11*u^2 - 12*u^3 + 26*u^4 + 144*u^5 + 356*u^6 + 622*u^7 + 863*u^8 + 990*u^9 + 961*u^10 + 798*u^11 + 567*u^12 + 344*u^13 + 176*u^14 + 74*u^15 + 25*u^16 + 6*u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18" ], "uPolys":[ "(-1 - u + 2*u^3 + 3*u^4 + u^5 - 3*u^6 - 2*u^7 + u^8 + u^9)^2", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "(1 + u - 2*u^2 - 4*u^3 - u^4 + 9*u^5 + 15*u^6 + 12*u^7 + 5*u^8 + u^9)^2", "(-1 - u + 2*u^3 + 3*u^4 + u^5 - 3*u^6 - 2*u^7 + u^8 + u^9)^2", "(-1 + u + 6*u^2 + 12*u^3 + 17*u^4 + 17*u^5 + 13*u^6 + 8*u^7 + 3*u^8 + u^9)^2", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18" ], "aCuspShape":"4 + (2*(32221 + 84182*u - 129728*u^2 + 420190*u^3 - 396940*u^4 + 601094*u^5 - 472048*u^6 + 716902*u^7 - 672966*u^8 + 990598*u^9 - 892582*u^10 + 959054*u^11 - 651488*u^12 + 517610*u^13 - 229122*u^14 + 142946*u^15 - 30972*u^16 + 15950*u^17))\/12107", "RepresentationsN":[ [ "u->0.912264 + 0.491243 I", "a->-0.78567 - 1.24878 I", "b->-1.17247 + 0.500383 I" ], [ "u->0.912264 - 0.491243 I", "a->-0.78567 + 1.24878 I", "b->-1.17247 - 0.500383 I" ], [ "u->0.103396 + 1.06976 I", "a->-0.757195 - 0.604613 I", "b->-0.77292 + 0.510351 I" ], [ "u->0.103396 - 1.06976 I", "a->-0.757195 + 0.604613 I", "b->-0.77292 - 0.510351 I" ], [ "u->0.792965 + 0.741615 I", "a->0.617829 - 0.01431 I", "b->1.17391 + 0.391555 I" ], [ "u->0.792965 - 0.741615 I", "a->0.617829 + 0.01431 I", "b->1.17391 - 0.391555 I" ], [ "u->-0.746849 + 0.515863 I", "a->0.408531 - 0.59722 I", "b->-0.141484 + 0.739668 I" ], [ "u->-0.746849 - 0.515863 I", "a->0.408531 + 0.59722 I", "b->-0.141484 - 0.739668 I" ], [ "u->-0.256179 + 1.09402 I", "a->1.0465 - 1.39689 I", "b->0.825933" ], [ "u->-0.256179 - 1.09402 I", "a->1.0465 + 1.39689 I", "b->0.825933" ], [ "u->0.1184 + 1.39098 I", "a->0.194324 - 0.537825 I", "b->-0.141484 - 0.739668 I" ], [ "u->0.1184 - 1.39098 I", "a->0.194324 + 0.537825 I", "b->-0.141484 + 0.739668 I" ], [ "u->0.00304 + 1.47476 I", "a->2.29745 + 0.06492 I", "b->1.17391 - 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142*u^4 - 148*u^5 + 120*u^6 - 134*u^7 + 447*u^8 - 166*u^9 + 421*u^10 - 142*u^11 + 223*u^12 - 68*u^13 + 72*u^14 - 18*u^15 + 13*u^16 - 2*u^17 + u^18", "1 - 10*u + 48*u^2 + 17*u^3 - 175*u^4 - 449*u^5 - 313*u^6 + 1021*u^7 + 2607*u^8 + 3446*u^9 + 3532*u^10 + 2701*u^11 + 1577*u^12 + 790*u^13 + 314*u^14 + 98*u^15 + 28*u^16 + 5*u^17 + u^18", "127 + 1034*u + 4140*u^2 + 10277*u^3 + 17643*u^4 + 22385*u^5 + 22419*u^6 + 18101*u^7 + 11971*u^8 + 6060*u^9 + 2702*u^10 + 1465*u^11 + 1235*u^12 + 640*u^13 + 100*u^14 - 82*u^15 - 24*u^16 + 3*u^17 + u^18", "431 + 454*u - 708*u^2 - 1913*u^3 - 881*u^4 + 2069*u^5 + 3585*u^6 + 2663*u^7 + 553*u^8 - 794*u^9 - 864*u^10 - 397*u^11 + 13*u^12 + 80*u^13 + 60*u^14 + 14*u^15 + 6*u^16 + u^17 + u^18", "1 + 2*u - 3*u^2 - 12*u^3 - 6*u^4 + 32*u^5 + 68*u^6 + 26*u^7 - 97*u^8 - 174*u^9 - 63*u^10 + 202*u^11 + 423*u^12 + 448*u^13 + 312*u^14 + 150*u^15 + 49*u^16 + 10*u^17 + u^18", "49 + 182*u + 202*u^2 + 243*u^3 + 703*u^4 + 1519*u^5 + 2725*u^6 + 3061*u^7 + 2419*u^8 + 944*u^9 - 136*u^10 - 473*u^11 - 195*u^12 - 18*u^13 + 64*u^14 + 28*u^15 - 12*u^16 - 3*u^17 + u^18", "127 + 1034*u + 4140*u^2 + 10277*u^3 + 17643*u^4 + 22385*u^5 + 22419*u^6 + 18101*u^7 + 11971*u^8 + 6060*u^9 + 2702*u^10 + 1465*u^11 + 1235*u^12 + 640*u^13 + 100*u^14 - 82*u^15 - 24*u^16 + 3*u^17 + u^18", "1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18", "1 + 2*u + u^2 + 4*u^3 + 2*u^4 + 4*u^5 + 8*u^6 - 2*u^7 + 15*u^8 - 10*u^9 + 21*u^10 - 14*u^11 + 19*u^12 - 12*u^13 + 12*u^14 - 6*u^15 + 5*u^16 - 2*u^17 + u^18", "49 + 182*u + 202*u^2 + 243*u^3 + 703*u^4 + 1519*u^5 + 2725*u^6 + 3061*u^7 + 2419*u^8 + 944*u^9 - 136*u^10 - 473*u^11 - 195*u^12 - 18*u^13 + 64*u^14 + 28*u^15 - 12*u^16 - 3*u^17 + u^18", "121 + 498*u + 1150*u^2 + 1803*u^3 + 2063*u^4 + 1535*u^5 + 915*u^6 + 1669*u^7 + 3577*u^8 + 4964*u^9 + 4912*u^10 + 3561*u^11 + 2215*u^12 + 950*u^13 + 370*u^14 + 94*u^15 + 30*u^16 + 3*u^17 + u^18", "121 + 498*u + 1150*u^2 + 1803*u^3 + 2063*u^4 + 1535*u^5 + 915*u^6 + 1669*u^7 + 3577*u^8 + 4964*u^9 + 4912*u^10 + 3561*u^11 + 2215*u^12 + 950*u^13 + 370*u^14 + 94*u^15 + 30*u^16 + 3*u^17 + u^18", "1 + 2*u + u^2 - 4*u^3 - 10*u^4 - 8*u^5 + 8*u^6 + 22*u^7 + 15*u^8 - 10*u^9 - 27*u^10 - 14*u^11 + 15*u^12 + 20*u^13 - 10*u^15 - 3*u^16 + 2*u^17 + u^18", "1 - 10*u + 48*u^2 + 17*u^3 - 175*u^4 - 449*u^5 - 313*u^6 + 1021*u^7 + 2607*u^8 + 3446*u^9 + 3532*u^10 + 2701*u^11 + 1577*u^12 + 790*u^13 + 314*u^14 + 98*u^15 + 28*u^16 + 5*u^17 + u^18", "1 - 16*u + 134*u^2 + 653*u^3 + 1405*u^4 + 2471*u^5 + 3959*u^6 + 5279*u^7 + 5949*u^8 + 6050*u^9 + 5564*u^10 + 4515*u^11 + 3245*u^12 + 2038*u^13 + 1042*u^14 + 394*u^15 + 100*u^16 + 15*u^17 + u^18", "1 - 26*u + 125*u^2 + 572*u^3 + 514*u^4 - 400*u^5 - 580*u^6 + 830*u^7 + 1831*u^8 + 910*u^9 - 391*u^10 - 306*u^11 + 615*u^12 + 1040*u^13 + 760*u^14 + 330*u^15 + 89*u^16 + 14*u^17 + u^18", "1 + 10*u + 45*u^2 + 100*u^3 + 98*u^4 + 64*u^5 + 364*u^6 + 834*u^7 + 263*u^8 + 178*u^9 + 1385*u^10 + 514*u^11 + 935*u^12 + 240*u^13 + 232*u^14 + 38*u^15 + 25*u^16 + 2*u^17 + u^18", "73 - 74*u + 248*u^2 + 133*u^3 + 45*u^4 + 349*u^5 - 23*u^6 - 147*u^7 - 21*u^8 + 36*u^9 + 162*u^10 + 147*u^11 + 73*u^12 + 46*u^13 + 30*u^14 + 10*u^15 + 2*u^16 + u^17 + u^18", "1 - 2*u - 11*u^2 - 12*u^3 + 26*u^4 + 144*u^5 + 356*u^6 + 622*u^7 + 863*u^8 + 990*u^9 + 961*u^10 + 798*u^11 + 567*u^12 + 344*u^13 + 176*u^14 + 74*u^15 + 25*u^16 + 6*u^17 + u^18" ], "GeometricComponent":0, "Multiplicity":1, "ij_list":[ [ "{3, 5}", "{8, 10}" ], [ "{2, 9}", "{3, 8}", "{3, 9}", "{4, 8}" ], [ "{2, 3}", "{3, 4}", "{8, 9}" ], [ "{1, 5}", "{2, 8}", "{4, 9}" ], [ "{2, 4}", "{7, 10}" ], [ "{6, 10}" ], [ "{3, 7}" ], [ "{1, 2}", "{5, 7}", "{6, 7}" ], [ "{2, 10}", "{4, 7}" ], [ "{3, 6}" ], [ "{1, 4}", "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{3, 10}", "{5, 8}" ], [ "{1, 3}" ], [ "{6, 9}" ], [ "{4, 6}" ], [ "{1, 6}", "{2, 6}", "{2, 7}" ], [ "{1, 9}" ], [ "{1, 10}", "{4, 5}", "{9, 10}" ], [ "{7, 8}" ], [ "{5, 6}", "{6, 8}" ], [ "{7, 9}" ], [ "{1, 7}", "{1, 8}", "{2, 5}" ] ], "SortedReprnIndices":"{1, 16, 2, 15, 8, 11, 7, 12, 3, 18, 4, 17, 6, 13, 5, 14, 9, 10}", "aCuspShapeN":[ "-1.5768014361791761265`4.561542927367929 - 5.9133486946718837578`5.135599409494491*I", "-1.5768014361791761265`4.561542927367929 + 5.9133486946718837578`5.135599409494491*I", "4.5149915077014887838`5.016918837813524 - 4.1628312734295379962`4.9816507085885116*I", "4.5149915077014887838`5.016918837813524 + 4.1628312734295379962`4.9816507085885116*I", "-3.2840934311056142506`5.140819796564661 + 0.7017499616665639565`4.470586690025274*I", "-3.2840934311056142506`5.140819796564661 - 0.7017499616665639565`4.470586690025274*I", "1.672077746207640242`4.847592404869477 + 2.9129760189197737256`5.088672847320411*I", "1.672077746207640242`4.847592404869477 - 2.9129760189197737256`5.088672847320411*I", "-4.6523487732486773204`5.150514997830847 + 0``4.482842732741859*I", "-4.6523487732486773204`5.150514997830847 + 0``4.482842732741859*I", "1.6720777462076401816`4.847592404869477 - 2.9129760189197735053`5.088672847320411*I", "1.6720777462076401816`4.847592404869477 + 2.9129760189197735053`5.088672847320411*I", "-3.284093431105614644`5.140819796564661 - 0.7017499616665641083`4.470586690025274*I", "-3.284093431105614644`5.140819796564661 + 0.7017499616665641083`4.470586690025274*I", "-1.5768014361791762276`4.561542927367929 + 5.9133486946718836973`5.135599409494491*I", "-1.5768014361791762276`4.561542927367929 - 5.9133486946718836973`5.135599409494491*I", "4.5149915077014887474`5.016918837813524 + 4.1628312734295379932`4.9816507085885116*I", "4.5149915077014887474`5.016918837813524 - 4.1628312734295379932`4.9816507085885116*I" ], "Abelian":false }, { "IdealName":"J10_68_2", "Generators":[ "-a + 2*b - 2*u - a*u", "a + a^2 + 2*u + a*u", "1 + u^2" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":7.4078e-2, "TimingZeroDimVars":6.8078e-2, "TimingmagmaVCompNormalize":6.951800000000001e-2, "TimingNumberOfSols":3.7627e-2, "TimingIsRadical":2.336e-3, "TimingArcColoring":6.3863e-2, "TimingObstruction":2.638e-3, "TimingComplexVolumeN":3.253798, "TimingaCuspShapeN":1.8942e-2, "TiminguValues":0.644457, "TiminguPolysN":9.670000000000002e-4, "TiminguPolys":0.836953, "TimingaCuspShape":9.606999999999999e-2, "TimingRepresentationsN":4.0922e-2, "TiminguValues_ij":0.137638, "TiminguPolys_ij_N":1.777e-3 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":4, "IsRadical":true, "ArcColoring":[ [ "u", "(a - a*u)\/2" ], "{1, 0}", "{1, 1}", "{0, 1}", [ -1, "(a + a*u)\/2" ], [ "a", "(a + 2*u + a*u)\/2" ], [ "(a - 2*u - a*u)\/2", "(a + 2*u + a*u)\/2" ], [ "-u", 0 ], [ 0, "u" ], [ "u", "(a + 2*u - a*u)\/2" ] ], "Obstruction":1, "ComplexVolumeN":[ "-3.28987 - 2.02988*I", "-3.28987 + 2.02988*I", "-3.28987 + 2.02988*I", "-3.28987 - 2.02988*I" ], "uPolysN":[ "1 - u^2 + u^4", "1 + 2*u^2 + u^4", "1 + 2*u^2 + u^4", "1 + 2*u^2 + u^4", "1 - 2*u + 3*u^2 - 2*u^3 + u^4", "1 - u^2 + u^4", "1 - u^2 + u^4", "1 + 2*u^2 + u^4", "1 + 2*u^2 + u^4", "1 + 2*u^2 + u^4" ], "uPolys":[ "1 - u^2 + u^4", "(1 + u^2)^2", "(1 + u^2)^2", "(1 + u^2)^2", "(1 - u + u^2)^2", "1 - u^2 + u^4", "1 - u^2 + u^4", "(1 + u^2)^2", "(1 + u^2)^2", "(1 + u^2)^2" ], "aCuspShape":"4 + 2*(-4 - a + a*u)", "RepresentationsN":[ [ "u->0. + 1. I", "a->0.36603 - 1.36603 I", "b->0.866025 + 0.5 I" ], [ "u->0. + 1. I", "a->-1.36603 + 0.36603 I", "b->-0.866025 + 0.5 I" ], [ "u->0. - 1. I", "a->0.36603 + 1.36603 I", "b->0.866025 - 0.5 I" ], [ "u->0. - 1. I", "a->-1.36603 - 0.36603 I", "b->-0.866025 - 0.5 I" ] ], "Epsilon":2.35285, "uPolys_ij_N":[ "1 + 4*u + 6*u^2 + 4*u^3 + u^4", "u^4", "1 - 4*u + 6*u^2 - 4*u^3 + u^4", "4 - 4*u + 2*u^2 - 2*u^3 + u^4", "1 + 2*u^2 + u^4", "1 + 2*u^2 + u^4", "4 - 4*u + 2*u^2 - 2*u^3 + u^4", "1 - 2*u + 5*u^2 - 4*u^3 + u^4", "1 + 2*u + 3*u^2 + 2*u^3 + u^4", "1 + 4*u + 5*u^2 + 2*u^3 + u^4", "1 + 2*u + 3*u^2 + 2*u^3 + u^4", "1 - 2*u + 3*u^2 - 2*u^3 + u^4", "1 - u^2 + u^4", "1 - 2*u + 5*u^2 - 4*u^3 + u^4", "1 - 4*u + 5*u^2 - 2*u^3 + u^4", "1 - 4*u + 5*u^2 - 2*u^3 + u^4", "1 - u^2 + u^4", "4 + 4*u + 6*u^2 - 2*u^3 + u^4" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{1, 2, 3, 4}", 2.02988 ], "ij_list":[ [ "{1, 9}", "{1, 10}" ], [ "{1, 5}", "{2, 8}", "{4, 9}" ], [ "{2, 3}", "{2, 4}", "{3, 4}", "{4, 5}", "{7, 10}", "{8, 9}", "{9, 10}" ], [ "{4, 6}" ], [ "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{1, 4}", "{2, 9}", "{3, 8}", "{3, 9}", "{4, 8}" ], [ "{6, 9}" ], [ "{8, 10}" ], [ "{3, 10}" ], [ "{2, 10}" ], [ "{5, 6}", "{6, 8}", "{7, 8}" ], [ "{1, 2}", "{5, 7}", "{5, 8}", "{6, 7}" ], [ "{1, 7}", "{1, 8}", "{2, 5}" ], [ "{3, 5}", "{7, 9}" ], [ "{6, 10}" ], [ "{1, 3}", "{3, 6}", "{4, 7}" ], [ "{1, 6}", "{2, 6}", "{2, 7}" ], [ "{3, 7}" ] ], "SortedReprnIndices":"{2, 3, 1, 4}", "aCuspShapeN":[ "-2.`4.8494850021680085 + 3.464101615137754587`5.088045629527841*I", "-2.`4.8494850021680085 - 3.464101615137754587`5.088045629527841*I", "-2.`4.8494850021680085 - 3.464101615137754587`5.088045629527841*I", "-2.`4.8494850021680085 + 3.464101615137754587`5.088045629527841*I" ], "Abelian":false }, { "IdealName":"abJ10_68_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":7.1619e-2, "TimingZeroDimVars":6.6641e-2, "TimingmagmaVCompNormalize":6.7967e-2, "TimingNumberOfSols":2.6008e-2, "TimingIsRadical":1.721e-3, "TimingArcColoring":6.1752e-2, "TimingObstruction":4.2500000000000003e-4, "TimingComplexVolumeN":0.332748, "TimingaCuspShapeN":4.915e-3, "TiminguValues":0.635031, "TiminguPolysN":7.3e-5, "TiminguPolys":0.806423, "TimingaCuspShape":8.5213e-2, "TimingRepresentationsN":2.6193e-2, "TiminguValues_ij":0.150713, "TiminguPoly_ij":0.150669, "TiminguPolys_ij_N":2.8e-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 + u^4)*(-1 - u + 2*u^3 + 3*u^4 + u^5 - 3*u^6 - 2*u^7 + u^8 + u^9)^2*(2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)", "(1 - u + u^2)^2*(1 + u - 2*u^2 - 4*u^3 - u^4 + 9*u^5 + 15*u^6 + 12*u^7 + 5*u^8 + u^9)^2*(4 + 5*u + 27*u^2 + 51*u^3 + 57*u^4 + 24*u^5 + 4*u^6 + 20*u^7 + 63*u^8 + 91*u^9 + 86*u^10 + 56*u^11 + 25*u^12 + 7*u^13 + u^14)", "(1 - u^2 + u^4)*(-1 - u + 2*u^3 + 3*u^4 + u^5 - 3*u^6 - 2*u^7 + u^8 + u^9)^2*(2 - 7*u + 11*u^2 - 3*u^3 - 13*u^4 + 18*u^5 - 2*u^6 - 18*u^7 + 19*u^8 - u^9 - 12*u^10 + 8*u^11 + u^12 - 3*u^13 + u^14)", "(1 - u^2 + u^4)*(-1 + u + 6*u^2 + 12*u^3 + 17*u^4 + 17*u^5 + 13*u^6 + 8*u^7 + 3*u^8 + u^9)^2*(26 - 115*u + 253*u^2 - 367*u^3 + 451*u^4 - 558*u^5 + 718*u^6 - 826*u^7 + 775*u^8 - 569*u^9 + 322*u^10 - 138*u^11 + 43*u^12 - 9*u^13 + u^14)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)", "(1 + u^2)^2*(1 + u^2 - 8*u^3 - 2*u^4 + 2*u^5 + 27*u^6 + 11*u^7 + 48*u^8 + 6*u^9 + 31*u^10 + u^11 + 9*u^12 + u^14)*(1 + 6*u + 10*u^2 + u^3 + 23*u^4 - 11*u^5 + 31*u^6 - 13*u^7 + 39*u^8 - 22*u^9 + 48*u^10 - 33*u^11 + 45*u^12 - 24*u^13 + 26*u^14 - 8*u^15 + 8*u^16 - u^17 + u^18)" ], "RileyPolyC":[ "(1 - y + y^2)^2*(-1 + y + 2*y^2 - 4*y^3 + y^4 + 9*y^5 - 15*y^6 + 12*y^7 - 5*y^8 + y^9)^2*(4 - 5*y + 27*y^2 - 51*y^3 + 57*y^4 - 24*y^5 + 4*y^6 - 20*y^7 + 63*y^8 - 91*y^9 + 86*y^10 - 56*y^11 + 25*y^12 - 7*y^13 + y^14)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)", "(1 + y + y^2)^2*(-1 + 5*y - 10*y^2 + y^4 + 37*y^5 - 7*y^6 + 12*y^7 - y^8 + y^9)^2*(16 + 191*y + 675*y^2 + 269*y^3 + 1321*y^4 + 1020*y^5 + 1240*y^6 + 1116*y^7 + 519*y^8 + 293*y^9 + 82*y^10 + 16*y^11 + 13*y^12 + y^13 + y^14)", "(1 - y + y^2)^2*(-1 + y + 2*y^2 - 4*y^3 + y^4 + 9*y^5 - 15*y^6 + 12*y^7 - 5*y^8 + y^9)^2*(4 - 5*y + 27*y^2 - 51*y^3 + 57*y^4 - 24*y^5 + 4*y^6 - 20*y^7 + 63*y^8 - 91*y^9 + 86*y^10 - 56*y^11 + 25*y^12 - 7*y^13 + y^14)", "(1 - y + y^2)^2*(-1 + 13*y + 22*y^2 - 15*y^4 + 5*y^5 + 25*y^6 + 20*y^7 + 7*y^8 + y^9)^2*(676 - 69*y + 3051*y^2 + 2513*y^3 + 7457*y^4 + 8012*y^5 + 8540*y^6 + 4512*y^7 + 1707*y^8 - 31*y^9 - 142*y^10 - 44*y^11 + 9*y^12 + 5*y^13 + y^14)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)", "(1 + y)^4*(1 + 2*y - 3*y^2 - 14*y^3 + 186*y^4 + 222*y^5 + 669*y^6 + 2359*y^7 + 3808*y^8 + 3400*y^9 + 1867*y^10 + 653*y^11 + 143*y^12 + 18*y^13 + y^14)*(1 - 16*y + 134*y^2 + 653*y^3 + 1405*y^4 + 2471*y^5 + 3959*y^6 + 5279*y^7 + 5949*y^8 + 6050*y^9 + 5564*y^10 + 4515*y^11 + 3245*y^12 + 2038*y^13 + 1042*y^14 + 394*y^15 + 100*y^16 + 15*y^17 + y^18)" ] }, "GeometricRepresentation":[ 1.1637e1, [ "J10_68_0", 1, "{11, 12}" ] ] } }