{ "Index":136, "Name":"10_52", "RolfsenName":"10_52", "DTname":"10a_80", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{12, 18, -10, -14, -16, 20, -8, -6, 2, 4}", "Acode":"{7, 10, -6, -8, -9, 1, -5, -4, 2, 3}", "PDcode":[ "{1, 13, 2, 12}", "{3, 19, 4, 18}", "{5, 10, 6, 11}", "{7, 14, 8, 15}", "{9, 16, 10, 17}", "{11, 1, 12, 20}", "{13, 8, 14, 9}", "{15, 6, 16, 7}", "{17, 3, 18, 2}", "{19, 5, 20, 4}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{9, 4, 1}", [], [ "{9, -4, 8, 2}", "{4, -8, 5, 1}", "{5, -9, 6, 1}", "{4, -6, 3, 2}", "{8, -5, 7, 2}", "{1, 7, 2, 1}", "{1, 3, 10, 2}" ], "{6, 9}", "{2}", 2 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + 2*u - a^2*u + 2*a*b*u - u^2 + u^3 - a^2*u^3 + a*b*u^3", "u - a*b*u + 2*b^2*u - 2*u^2 + u^3 - a*b*u^3 + b^2*u^3 - u^4", "1 - a + a*b - b^2 - 4*a*u^4 + 4*a^2*u^4 - 8*a*b*u^4 + 6*b^2*u^4 + 4*a*u^6 + 12*a^2*u^6 - 16*b*u^6 - 24*a*b*u^6 + 9*b^2*u^6 + 19*a*u^8 + 21*a^2*u^8 - 32*b*u^8 - 26*a*b*u^8 + 5*b^2*u^8 + 18*a*u^10 + 18*a^2*u^10 - 24*b*u^10 - 12*a*b*u^10 + b^2*u^10 + 7*a*u^12 + 7*a^2*u^12 - 8*b*u^12 - 2*a*b*u^12 + a*u^14 + a^2*u^14 - b*u^14", "-b + b^2 + a*u^2 - 4*b^2*u^2 - 4*a*u^4 + 4*b*u^4 + 8*a*b*u^4 - 2*b^2*u^4 - 2*a*u^6 - 4*b*u^6 - 8*a*b*u^6 + 10*b^2*u^6 + 10*a*u^8 + 16*a^2*u^8 - 19*b*u^8 - 38*a*b*u^8 + 13*b^2*u^8 + 13*a*u^10 + 32*a^2*u^10 - 18*b*u^10 - 36*a*b*u^10 + 6*b^2*u^10 + 6*a*u^12 + 24*a^2*u^12 - 7*b*u^12 - 14*a*b*u^12 + b^2*u^12 + a*u^14 + 8*a^2*u^14 - b*u^14 - 2*a*b*u^14 + a^2*u^16" ], "TimingForPrimaryIdeals":0.131199 }, "v":{ "CheckEq":[ "-b + b^2", "b^2*v", "-1 + v + a*b*v", "1 - a + a*b - b^2 - b*v^2" ], "TimingForPrimaryIdeals":7.440400000000001e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_52_0", "Generators":[ "-1 + b - 2*u - 3*u^2 + 15*u^3 + 12*u^4 - 42*u^6 - 4*u^7 - 48*u^8 + 84*u^9 - 24*u^10 + 82*u^11 - 274*u^12 - 100*u^13 - 484*u^14 + 20*u^15 - 189*u^16 + 670*u^17 + 265*u^18 + 1179*u^19 + 380*u^20 + 1020*u^21 + 224*u^22 + 518*u^23 + 73*u^24 + 158*u^25 + 13*u^26 + 27*u^27 + u^28 + 2*u^29", "-3 + a - u - 5*u^2 + 18*u^3 + 15*u^4 + 22*u^5 - 68*u^6 - 18*u^7 - 114*u^8 + 108*u^9 - 54*u^10 + 184*u^11 - 388*u^12 - 202*u^13 - 912*u^14 - 214*u^15 - 543*u^16 + 975*u^17 + 679*u^18 + 2280*u^19 + 1457*u^20 + 2330*u^21 + 1222*u^22 + 1404*u^23 + 589*u^24 + 533*u^25 + 171*u^26 + 126*u^27 + 28*u^28 + 17*u^29 + 2*u^30 + u^31", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.6832e-2, "TimingZeroDimVars":8.1205e-2, "TimingmagmaVCompNormalize":8.248799999999999e-2, "TimingNumberOfSols":0.329864, "TimingIsRadical":2.7041e-2, "TimingArcColoring":6.855699999999999e-2, "TimingObstruction":9.1532e-2, "TimingComplexVolumeN":3.0590627e1, "TimingaCuspShapeN":0.22127, "TiminguValues":0.67376, "TiminguPolysN":0.115606, "TiminguPolys":0.969067, "TimingaCuspShape":0.142898, "TimingRepresentationsN":0.317791, "TiminguValues_ij":0.189326, "TiminguPoly_ij":2.576196, "TiminguPolys_ij_N":0.223054 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":32, "IsRadical":true, "ArcColoring":[ [ "3 + u + 5*u^2 - 18*u^3 - 15*u^4 - 22*u^5 + 68*u^6 + 18*u^7 + 114*u^8 - 108*u^9 + 54*u^10 - 184*u^11 + 388*u^12 + 202*u^13 + 912*u^14 + 214*u^15 + 543*u^16 - 975*u^17 - 679*u^18 - 2280*u^19 - 1457*u^20 - 2330*u^21 - 1222*u^22 - 1404*u^23 - 589*u^24 - 533*u^25 - 171*u^26 - 126*u^27 - 28*u^28 - 17*u^29 - 2*u^30 - u^31", "1 + 2*u + 3*u^2 - 15*u^3 - 12*u^4 + 42*u^6 + 4*u^7 + 48*u^8 - 84*u^9 + 24*u^10 - 82*u^11 + 274*u^12 + 100*u^13 + 484*u^14 - 20*u^15 + 189*u^16 - 670*u^17 - 265*u^18 - 1179*u^19 - 380*u^20 - 1020*u^21 - 224*u^22 - 518*u^23 - 73*u^24 - 158*u^25 - 13*u^26 - 27*u^27 - u^28 - 2*u^29" ], [ "4 + 6*u + u^2 - 30*u^3 - 28*u^4 + 85*u^6 + 72*u^7 + 101*u^8 - 104*u^9 - 18*u^10 - 84*u^11 + 470*u^12 + 512*u^13 + 1050*u^14 + 376*u^15 + 220*u^16 - 1342*u^17 - 1523*u^18 - 2992*u^19 - 2290*u^20 - 2926*u^21 - 1677*u^22 - 1694*u^23 - 735*u^24 - 618*u^25 - 197*u^26 - 140*u^27 - 30*u^28 - 18*u^29 - 2*u^30 - u^31", "1 + u - 8*u^3 - 6*u^4 + 4*u^5 + 21*u^6 + 12*u^7 + 18*u^8 - 28*u^9 + 15*u^10 + 8*u^11 + 154*u^12 + 124*u^13 + 208*u^14 - 10*u^15 - 69*u^16 - 449*u^17 - 388*u^18 - 732*u^19 - 410*u^20 - 598*u^21 - 227*u^22 - 290*u^23 - 73*u^24 - 85*u^25 - 13*u^26 - 14*u^27 - u^28 - u^29" ], [ "-4*u^3 - 4*u^5 - u^7", "u - 2*u^3 - 3*u^5 - u^7" ], [ 0, "u" ], [ "u", "u + u^3" ], [ "2*u + u^3", "u + u^3" ], [ "1 + u^2", "2*u^2 + u^4" ], [ 1, "u^2" ], "{1, 0}", [ "4 + 4*u + 2*u^2 - 26*u^3 - 21*u^4 - 10*u^5 + 70*u^6 + 48*u^7 + 96*u^8 - 89*u^9 - 98*u^11 + 378*u^12 + 387*u^13 + 904*u^14 + 386*u^15 + 322*u^16 - 893*u^17 - 1126*u^18 - 2260*u^19 - 1879*u^20 - 2328*u^21 - 1450*u^22 - 1404*u^23 - 662*u^24 - 533*u^25 - 184*u^26 - 126*u^27 - 29*u^28 - 17*u^29 - 2*u^30 - u^31", "1 + 2*u + u^2 - 12*u^3 - 8*u^4 + 2*u^5 + 28*u^6 + 6*u^7 + 28*u^8 - 47*u^9 + 18*u^10 - 10*u^11 + 194*u^12 + 117*u^13 + 300*u^14 - 11*u^15 + 17*u^16 - 449*u^17 - 347*u^18 - 732*u^19 - 400*u^20 - 598*u^21 - 226*u^22 - 290*u^23 - 73*u^24 - 85*u^25 - 13*u^26 - 14*u^27 - u^28 - u^29" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-8.33717 + 3.47045*I", "-8.33717 - 3.47045*I", "-7.36935 - 7.82848*I", "-7.36935 + 7.82848*I", "-1.84659 + 2.03195*I", "-1.84659 - 2.03195*I", -2.56303, "-6.26853 + 3.9649*I", "-6.26853 - 3.9649*I", "-4.89788 - 1.11555*I", "-4.89788 + 1.11555*I", "-1.10997 - 4.05552*I", "-1.10997 + 4.05552*I", "-3.4828 + 1.78898*I", "-3.4828 - 1.78898*I", "-3.45767 + 3.36417*I", "-3.45767 - 3.36417*I", "-1.72217 + 0.51232*I", "-1.72217 - 0.51232*I", "1.24444 + 0.519638*I", "1.24444 - 0.519638*I", "-7.59173 - 1.96238*I", "-7.59173 + 1.96238*I", "-6.78693 - 7.28997*I", "-6.78693 + 7.28997*I", "-9.32026 + 4.72345*I", "-9.32026 - 4.72345*I", "-13.2076 - 11.5375*I", "-13.2076 + 11.5375*I", "-15.248 + 1.1861*I", "-15.248 - 1.1861*I", -1.22025 ], "uPolysN":[ "8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32", "-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32", "19 - 29*u - 362*u^2 - 1190*u^3 - 2800*u^4 - 5053*u^5 - 7484*u^6 - 10012*u^7 - 12402*u^8 - 15642*u^9 - 20548*u^10 - 27736*u^11 - 36814*u^12 - 45792*u^13 - 52342*u^14 - 54198*u^15 - 50435*u^16 - 42011*u^17 - 30716*u^18 - 19394*u^19 - 9770*u^20 - 3167*u^21 + 582*u^22 + 2010*u^23 + 2089*u^24 + 1569*u^25 + 970*u^26 + 508*u^27 + 229*u^28 + 86*u^29 + 27*u^30 + 6*u^31 + u^32", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32", "-17 - 91*u - 184*u^2 - 274*u^3 - 154*u^4 - 169*u^5 + 140*u^6 - 62*u^7 + 208*u^8 - 556*u^9 - 746*u^10 - 1382*u^11 - 1922*u^12 - 2508*u^13 - 2478*u^14 - 1618*u^15 - 855*u^16 + 371*u^17 + 610*u^18 + 242*u^19 + 212*u^20 + 397*u^21 + 450*u^22 + 30*u^23 + 105*u^24 + 47*u^25 + 80*u^26 - 20*u^27 + 19*u^28 + 5*u^30 - 2*u^31 + u^32", "8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32", "-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32", "-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32" ], "uPolys":[ "8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32", "-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32", "19 - 29*u - 362*u^2 - 1190*u^3 - 2800*u^4 - 5053*u^5 - 7484*u^6 - 10012*u^7 - 12402*u^8 - 15642*u^9 - 20548*u^10 - 27736*u^11 - 36814*u^12 - 45792*u^13 - 52342*u^14 - 54198*u^15 - 50435*u^16 - 42011*u^17 - 30716*u^18 - 19394*u^19 - 9770*u^20 - 3167*u^21 + 582*u^22 + 2010*u^23 + 2089*u^24 + 1569*u^25 + 970*u^26 + 508*u^27 + 229*u^28 + 86*u^29 + 27*u^30 + 6*u^31 + u^32", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32", "-17 - 91*u - 184*u^2 - 274*u^3 - 154*u^4 - 169*u^5 + 140*u^6 - 62*u^7 + 208*u^8 - 556*u^9 - 746*u^10 - 1382*u^11 - 1922*u^12 - 2508*u^13 - 2478*u^14 - 1618*u^15 - 855*u^16 + 371*u^17 + 610*u^18 + 242*u^19 + 212*u^20 + 397*u^21 + 450*u^22 + 30*u^23 + 105*u^24 + 47*u^25 + 80*u^26 - 20*u^27 + 19*u^28 + 5*u^30 - 2*u^31 + u^32", "8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32", "-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 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2254*u + 7297*u^2 - 11351*u^3 + 14870*u^4 - 1049*u^5 - 470*u^6 + 48028*u^7 - 14062*u^8 + 76610*u^9 + 25652*u^10 + 26048*u^11 + 14298*u^12 - 15452*u^13 - 3566*u^14 - 21348*u^15 - 9699*u^16 + 7022*u^17 + 7745*u^18 + 10257*u^19 + 6496*u^20 + 3187*u^21 + 1658*u^22 + 510*u^23 + 751*u^24 + 636*u^25 + 111*u^26 - 67*u^27 + 9*u^28 + 25*u^29 - 2*u^30 - 2*u^31 + u^32", "-1129 - 329*u + 14656*u^2 - 4564*u^3 - 156420*u^4 + 12139*u^5 + 820014*u^6 - 161362*u^7 - 2745692*u^8 + 1428258*u^9 + 10883024*u^10 + 847870*u^11 - 30096058*u^12 - 19399288*u^13 + 54711184*u^14 + 85682560*u^15 + 7510897*u^16 - 74449087*u^17 - 58775400*u^18 + 9532126*u^19 + 47417862*u^20 + 42495377*u^21 + 23849086*u^22 + 10180298*u^23 + 3604479*u^24 + 1096279*u^25 + 286092*u^26 + 62686*u^27 + 11285*u^28 + 1662*u^29 + 199*u^30 + 18*u^31 + u^32", "1721 + 4796*u + 2706*u^2 + 23394*u^3 + 116833*u^4 + 206863*u^5 + 126264*u^6 - 69200*u^7 - 30386*u^8 + 312810*u^9 + 371046*u^10 + 114902*u^11 + 199194*u^12 + 166298*u^13 - 143162*u^14 + 183838*u^15 + 434625*u^16 - 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3.1343813206656277222`4.746776538757761*I", "-7.2965415126761062455`5.113741765948161 + 3.1343813206656277222`4.746776538757761*I", "-7.7934737892983113068`5.0425857202739275 + 6.2534372176271545062`4.946973435167397*I", "-7.7934737892983113068`5.0425857202739275 - 6.2534372176271545062`4.946973435167397*I", "-9.6699376567141849215`5.148214089362292 + 0``4.162790415220581*I", "-9.6699376567141849215`5.148214089362292 + 0``4.162790415220581*I", -1.0018e1 ], "Abelian":false }, { "IdealName":"J10_52_1", "Generators":[ "-1 + b", "-2 + a + u - u^2", "-1 + 2*u - u^2 + u^3" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.7359e-2, "TimingZeroDimVars":6.154e-2, "TimingmagmaVCompNormalize":6.285400000000001e-2, "TimingNumberOfSols":3.6619000000000006e-2, "TimingIsRadical":1.961e-3, "TimingArcColoring":5.9505999999999996e-2, "TimingObstruction":1.74e-3, "TimingComplexVolumeN":2.906216, "TimingaCuspShapeN":1.3532e-2, "TiminguValues":0.638325, "TiminguPolysN":5.420000000000001e-4, "TiminguPolys":0.785765, "TimingaCuspShape":9.608499999999999e-2, "TimingRepresentationsN":3.6437e-2, "TiminguValues_ij":0.151543, "TiminguPoly_ij":0.845636, "TiminguPolys_ij_N":8.67e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":3, "IsRadical":true, "ArcColoring":[ [ "2 - u + u^2", 1 ], [ "2 - u + u^2", 1 ], "{-1, 0}", [ 0, "u" ], [ "u", "1 - u + u^2" ], [ "1 + u^2", "1 - u + u^2" ], [ "1 + u^2", "1 - u + u^2" ], [ 1, "u^2" ], "{1, 0}", [ "3 - u + u^2", 1 ] ], "Obstruction":1, "ComplexVolumeN":[ "-4.66906 + 2.82812*I", "-4.66906 - 2.82812*I", -0.53148 ], "uPolysN":[ "u^3", "1 + 3*u + 3*u^2 + u^3", "1 - u^2 + u^3", "1 + 2*u + u^2 + u^3", "1 - u^2 + u^3", "u^3", "-1 + 2*u - u^2 + u^3", "-1 + 2*u - u^2 + u^3", "-1 + 3*u - 3*u^2 + u^3", "-1 + 3*u - 3*u^2 + u^3" ], "uPolys":[ "u^3", "(1 + u)^3", "1 - u^2 + u^3", "1 + 2*u + u^2 + u^3", "1 - u^2 + u^3", "u^3", "-1 + 2*u - u^2 + u^3", "-1 + 2*u - u^2 + u^3", "(-1 + u)^3", "(-1 + u)^3" ], "aCuspShape":"4 - 4*u + 5*u^2", "RepresentationsN":[ [ "u->0.21508 + 1.30714 I", "a->0.122561 - 0.744862 I", "b->1." ], [ "u->0.21508 - 1.30714 I", "a->0.122561 + 0.744862 I", "b->1." ], [ "u->0.56984", "a->1.75488", "b->1." ] ], "Epsilon":2.24805, "uPolys_ij":[ "(1 + u)^3", "u^3", "(-1 + u)^3", "5 + 7*u + 4*u^2 + u^3", "1 + 3*u + 2*u^2 + u^3", "1 + 2*u + u^2 + u^3", "1 + 2*u - 3*u^2 + u^3", "8 - 2*u^2 + u^3", "-1 + 10*u - 5*u^2 + u^3", "1 - u^2 + u^3", "-1 + u^2 + u^3" ], "GeometricComponent":0, "uPolys_ij_N":[ "1 + 3*u + 3*u^2 + u^3", "u^3", "-1 + 3*u - 3*u^2 + u^3", "5 + 7*u + 4*u^2 + u^3", "1 + 3*u + 2*u^2 + u^3", "1 + 2*u + u^2 + u^3", "1 + 2*u - 3*u^2 + u^3", "8 - 2*u^2 + u^3", "-1 + 10*u - 5*u^2 + u^3", "1 - u^2 + u^3", "-1 + u^2 + u^3" ], "Multiplicity":1, "ij_list":[ [ "{1, 9}", "{1, 10}", "{2, 9}", "{2, 10}", "{3, 10}" ], [ "{1, 2}", "{1, 6}", "{1, 7}", "{2, 6}", "{2, 7}", "{3, 9}", "{6, 7}" ], [ "{1, 3}", "{1, 4}", "{2, 3}", "{2, 4}", "{9, 10}" ], [ "{4, 10}" ], [ "{1, 8}", "{2, 8}" ], [ "{3, 4}", "{4, 8}", "{4, 9}", "{5, 6}", "{5, 7}", "{5, 8}" ], [ "{3, 8}", "{4, 5}", "{6, 8}", "{7, 8}", "{8, 9}" ], [ "{5, 10}" ], [ "{8, 10}" ], [ "{3, 5}", "{3, 6}", "{3, 7}", "{4, 6}", "{4, 7}", "{5, 9}", "{6, 9}", "{6, 10}", "{7, 9}", "{7, 10}" ], [ "{1, 5}", "{2, 5}" ] ], "SortedReprnIndices":"{1, 2, 3}", "aCuspShapeN":[ "-5.172114311115758533`5.107617843479823 - 2.4171675544166757025`4.777256484727772*I", "-5.172114311115758533`5.107617843479823 + 2.4171675544166757025`4.777256484727772*I", 3.3442 ], "Abelian":false }, { "IdealName":"abJ10_52_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":6.454900000000001e-2, "TimingZeroDimVars":5.7785e-2, "TimingmagmaVCompNormalize":5.9019e-2, "TimingNumberOfSols":2.5039e-2, "TimingIsRadical":1.5960000000000004e-3, "TimingArcColoring":5.7557000000000004e-2, "TimingObstruction":4.5300000000000006e-4, "TimingComplexVolumeN":0.348006, "TimingaCuspShapeN":4.625e-3, "TiminguValues":0.633446, "TiminguPolysN":7.400000000000002e-5, "TiminguPolys":0.795762, "TimingaCuspShape":9.199299999999999e-2, "TimingRepresentationsN":2.4723000000000002e-2, "TiminguValues_ij":0.144995, "TiminguPoly_ij":0.141878, "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":[ "u^3*(8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32)", "(1 + u)^3*(-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32)", "(1 - u^2 + u^3)*(19 - 29*u - 362*u^2 - 1190*u^3 - 2800*u^4 - 5053*u^5 - 7484*u^6 - 10012*u^7 - 12402*u^8 - 15642*u^9 - 20548*u^10 - 27736*u^11 - 36814*u^12 - 45792*u^13 - 52342*u^14 - 54198*u^15 - 50435*u^16 - 42011*u^17 - 30716*u^18 - 19394*u^19 - 9770*u^20 - 3167*u^21 + 582*u^22 + 2010*u^23 + 2089*u^24 + 1569*u^25 + 970*u^26 + 508*u^27 + 229*u^28 + 86*u^29 + 27*u^30 + 6*u^31 + u^32)", "(1 + 2*u + u^2 + u^3)*(-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32)", "(1 - u^2 + u^3)*(-17 - 91*u - 184*u^2 - 274*u^3 - 154*u^4 - 169*u^5 + 140*u^6 - 62*u^7 + 208*u^8 - 556*u^9 - 746*u^10 - 1382*u^11 - 1922*u^12 - 2508*u^13 - 2478*u^14 - 1618*u^15 - 855*u^16 + 371*u^17 + 610*u^18 + 242*u^19 + 212*u^20 + 397*u^21 + 450*u^22 + 30*u^23 + 105*u^24 + 47*u^25 + 80*u^26 - 20*u^27 + 19*u^28 + 5*u^30 - 2*u^31 + u^32)", "u^3*(8 + 4*u - 24*u^2 + 25*u^3 + 21*u^4 - 33*u^5 - 32*u^6 - 130*u^7 + 144*u^8 + 482*u^9 - 398*u^10 - 854*u^11 + 726*u^12 + 840*u^13 - 742*u^14 - 250*u^15 + 154*u^16 - 338*u^17 + 516*u^18 + 351*u^19 - 601*u^20 - 21*u^21 + 242*u^22 - 168*u^23 + 42*u^24 + 136*u^25 - 90*u^26 - 53*u^27 + 43*u^28 + 11*u^29 - 10*u^30 - u^31 + u^32)", "(-1 + 2*u - u^2 + u^3)*(-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32)", "(-1 + 2*u - u^2 + u^3)*(-1 - 5*u - 4*u^2 + 10*u^3 + 30*u^4 + 15*u^5 - 20*u^6 - 72*u^7 - 66*u^8 - 30*u^9 + 84*u^10 + 28*u^11 - 90*u^12 - 488*u^13 - 686*u^14 - 892*u^15 - 403*u^16 + 127*u^17 + 1240*u^18 + 1858*u^19 + 2660*u^20 + 2477*u^21 + 2554*u^22 + 1740*u^23 + 1477*u^24 + 747*u^25 + 546*u^26 + 198*u^27 + 127*u^28 + 30*u^29 + 17*u^30 + 2*u^31 + u^32)", "(-1 + u)^3*(-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32)", "(-1 + u)^3*(-1 + 2*u - 7*u^2 - 5*u^3 - u^5 - 48*u^6 - 208*u^7 - 322*u^8 + 148*u^9 + 1378*u^10 + 1486*u^11 - 1238*u^12 - 3946*u^13 - 1520*u^14 + 4244*u^15 + 4693*u^16 - 1670*u^17 - 5347*u^18 - 1129*u^19 + 3606*u^20 + 2067*u^21 - 1560*u^22 - 1532*u^23 + 445*u^24 + 726*u^25 - 101*u^26 - 231*u^27 + 29*u^28 + 45*u^29 - 8*u^30 - 4*u^31 + u^32)" ], "RileyPolyC":[ "y^3*(64 - 400*y + 712*y^2 - 1881*y^3 + 6971*y^4 - 13069*y^5 + 11944*y^6 - 21760*y^7 + 143736*y^8 - 575108*y^9 + 1426312*y^10 - 2390822*y^11 + 2706250*y^12 - 1715770*y^13 - 336960*y^14 + 2153046*y^15 - 2388430*y^16 + 1005108*y^17 + 662900*y^18 - 1327141*y^19 + 906091*y^20 - 191645*y^21 - 186440*y^22 + 189950*y^23 - 68422*y^24 - 8836*y^25 + 23740*y^26 - 14233*y^27 + 5171*y^28 - 1267*y^29 + 208*y^30 - 21*y^31 + y^32)", "(-1 + y)^3*(1 + 10*y + 69*y^2 + 75*y^3 + 2138*y^4 - 921*y^5 - 19392*y^6 + 38960*y^7 - 8606*y^8 - 186092*y^9 + 824634*y^10 - 2228514*y^11 + 4656602*y^12 - 8384826*y^13 + 13439116*y^14 - 19213852*y^15 + 24651799*y^16 - 28648978*y^17 + 30303957*y^18 - 29188573*y^19 + 25507700*y^20 - 20002281*y^21 + 13804600*y^22 - 8190720*y^23 + 4084899*y^24 - 1678682*y^25 + 558011*y^26 - 147055*y^27 + 29945*y^28 - 4539*y^29 + 482*y^30 - 32*y^31 + y^32)", "(-1 + 2*y - y^2 + y^3)*(361 - 14597*y - 44376*y^2 + 33634*y^3 + 180304*y^4 - 159981*y^5 - 1078644*y^6 - 1619536*y^7 - 2134322*y^8 - 5092182*y^9 - 10355112*y^10 - 12792560*y^11 - 8914694*y^12 - 3231416*y^13 - 3515378*y^14 - 11038184*y^15 - 19092673*y^16 - 20818685*y^17 - 15733816*y^18 - 8378706*y^19 - 2957726*y^20 - 510583*y^21 + 75746*y^22 + 60212*y^23 + 8999*y^24 + 3735*y^25 + 7730*y^26 + 6178*y^27 + 2795*y^28 + 814*y^29 + 155*y^30 + 18*y^31 + y^32)", "(-1 + 2*y + 3*y^2 + y^3)*(1 - 17*y + 56*y^2 - 150*y^3 + 172*y^4 + 75*y^5 - 1012*y^6 + 48*y^7 - 2430*y^8 - 11022*y^9 - 18836*y^10 - 35148*y^11 - 63122*y^12 - 88632*y^13 - 92522*y^14 + 9448*y^15 + 308791*y^16 + 754363*y^17 + 1317620*y^18 + 2175514*y^19 + 3327654*y^20 + 4224321*y^21 + 4218138*y^22 + 3281064*y^23 + 1995051*y^24 + 951419*y^25 + 355310*y^26 + 103026*y^27 + 22779*y^28 + 3718*y^29 + 423*y^30 + 30*y^31 + y^32)", "(-1 + 2*y - y^2 + y^3)*(289 - 2025*y - 10776*y^2 - 53922*y^3 - 138772*y^4 - 258029*y^5 - 281756*y^6 - 326008*y^7 - 837586*y^8 - 1938722*y^9 - 3052532*y^10 - 3253004*y^11 - 1408598*y^12 + 773776*y^13 + 1928894*y^14 + 2123044*y^15 - 176309*y^16 - 1175109*y^17 - 1372004*y^18 - 1440582*y^19 - 227026*y^20 - 210027*y^21 + 241746*y^22 + 103084*y^23 + 110015*y^24 + 37199*y^25 + 18782*y^26 + 4710*y^27 + 1559*y^28 + 270*y^29 + 63*y^30 + 6*y^31 + y^32)", "y^3*(64 - 400*y + 712*y^2 - 1881*y^3 + 6971*y^4 - 13069*y^5 + 11944*y^6 - 21760*y^7 + 143736*y^8 - 575108*y^9 + 1426312*y^10 - 2390822*y^11 + 2706250*y^12 - 1715770*y^13 - 336960*y^14 + 2153046*y^15 - 2388430*y^16 + 1005108*y^17 + 662900*y^18 - 1327141*y^19 + 906091*y^20 - 191645*y^21 - 186440*y^22 + 189950*y^23 - 68422*y^24 - 8836*y^25 + 23740*y^26 - 14233*y^27 + 5171*y^28 - 1267*y^29 + 208*y^30 - 21*y^31 + y^32)", "(-1 + 2*y + 3*y^2 + y^3)*(1 - 17*y + 56*y^2 - 150*y^3 + 172*y^4 + 75*y^5 - 1012*y^6 + 48*y^7 - 2430*y^8 - 11022*y^9 - 18836*y^10 - 35148*y^11 - 63122*y^12 - 88632*y^13 - 92522*y^14 + 9448*y^15 + 308791*y^16 + 754363*y^17 + 1317620*y^18 + 2175514*y^19 + 3327654*y^20 + 4224321*y^21 + 4218138*y^22 + 3281064*y^23 + 1995051*y^24 + 951419*y^25 + 355310*y^26 + 103026*y^27 + 22779*y^28 + 3718*y^29 + 423*y^30 + 30*y^31 + y^32)", "(-1 + 2*y + 3*y^2 + y^3)*(1 - 17*y + 56*y^2 - 150*y^3 + 172*y^4 + 75*y^5 - 1012*y^6 + 48*y^7 - 2430*y^8 - 11022*y^9 - 18836*y^10 - 35148*y^11 - 63122*y^12 - 88632*y^13 - 92522*y^14 + 9448*y^15 + 308791*y^16 + 754363*y^17 + 1317620*y^18 + 2175514*y^19 + 3327654*y^20 + 4224321*y^21 + 4218138*y^22 + 3281064*y^23 + 1995051*y^24 + 951419*y^25 + 355310*y^26 + 103026*y^27 + 22779*y^28 + 3718*y^29 + 423*y^30 + 30*y^31 + y^32)", "(-1 + y)^3*(1 + 10*y + 69*y^2 + 75*y^3 + 2138*y^4 - 921*y^5 - 19392*y^6 + 38960*y^7 - 8606*y^8 - 186092*y^9 + 824634*y^10 - 2228514*y^11 + 4656602*y^12 - 8384826*y^13 + 13439116*y^14 - 19213852*y^15 + 24651799*y^16 - 28648978*y^17 + 30303957*y^18 - 29188573*y^19 + 25507700*y^20 - 20002281*y^21 + 13804600*y^22 - 8190720*y^23 + 4084899*y^24 - 1678682*y^25 + 558011*y^26 - 147055*y^27 + 29945*y^28 - 4539*y^29 + 482*y^30 - 32*y^31 + y^32)", "(-1 + y)^3*(1 + 10*y + 69*y^2 + 75*y^3 + 2138*y^4 - 921*y^5 - 19392*y^6 + 38960*y^7 - 8606*y^8 - 186092*y^9 + 824634*y^10 - 2228514*y^11 + 4656602*y^12 - 8384826*y^13 + 13439116*y^14 - 19213852*y^15 + 24651799*y^16 - 28648978*y^17 + 30303957*y^18 - 29188573*y^19 + 25507700*y^20 - 20002281*y^21 + 13804600*y^22 - 8190720*y^23 + 4084899*y^24 - 1678682*y^25 + 558011*y^26 - 147055*y^27 + 29945*y^28 - 4539*y^29 + 482*y^30 - 32*y^31 + y^32)" ] }, "GeometricRepresentation":[ 1.1537500000000001e1, [ "J10_52_0", 1, "{28, 29}" ] ] } }