{ "Index":95, "Name":"10_11", "RolfsenName":"10_11", "DTname":"10a_116", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-15, -13, 1, 17, 19, -5, -3, 11, 9, 7}", "Acode":"{-8, -7, 1, 9, 10, -3, -2, 6, 5, 4}", "PDcode":[ "{2, 15, 3, 16}", "{4, 13, 5, 14}", "{6, 2, 7, 1}", "{8, 18, 9, 17}", "{10, 20, 11, 19}", "{12, 5, 13, 6}", "{14, 3, 15, 4}", "{16, 12, 17, 11}", "{18, 10, 19, 9}", "{20, 8, 1, 7}" ], "CBtype":"{2, 0}", "ParabolicReps":{ "SolvingSeq":[ "{4, 9}", [], [ "{4, 9, 5, 1}", "{9, 5, 10, 1}", "{5, 10, 6, 1}", "{10, 4, 1, 1}", "{4, 1, 3, 2}", "{6, -3, 7, 1}", "{3, -7, 2, 2}", "{9, 6, 8, 2}" ], "{1}", "{7}", 7 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 - 2*u - 5*u^2 + 4*u^3 - 3*u^4 - 6*u^5 - 14*u^6 - 2*u^7 + 48*u^8 + 14*u^9 + 32*u^10 - 14*u^11 - 158*u^12 + 6*u^13 + 104*u^14 - u^15 + 87*u^16 - 183*u^18 + 133*u^20 - 52*u^22 + 11*u^24 - u^26", "u + u^2 + 2*u^3 - 8*u^4 + 6*u^5 + 13*u^6 - 14*u^7 - 8*u^8 - 3*u^9 - 34*u^10 + 22*u^11 + 90*u^12 - 19*u^13 - 60*u^14 + 7*u^15 - 54*u^16 - u^17 + 125*u^18 - 100*u^20 + 43*u^22 - 10*u^24 + u^26" ], "TimingForPrimaryIdeals":9.107900000000001e-2 }, "v":{ "CheckEq":[ "-1 + v" ], "TimingForPrimaryIdeals":7.2647e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_11_0", "Generators":[ "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.5105000000000006e-2, "TimingZeroDimVars":1.5418000000000001e-2, "TimingmagmaVCompNormalize":1.6588000000000002e-2, "TimingNumberOfSols":3.8794e-2, "TimingIsRadical":1.897e-3, "TimingArcColoring":6.2813e-2, "TimingObstruction":2.4828000000000003e-2, "TimingComplexVolumeN":1.8764381999999998e1, "TimingaCuspShapeN":0.103583, "TiminguValues":0.651534, "TiminguPolysN":2.0005000000000002e-2, "TiminguPolys":0.841864, "TimingaCuspShape":0.102539, "TimingRepresentationsN":4.0531e-2, "TiminguValues_ij":0.15641, "TiminguPoly_ij":1.452678, "TiminguPolys_ij_N":3.8508e-2 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":21, "IsRadical":true, "ArcColoring":[ [ "-2*u + u^3", "u - u^3" ], [ "-2*u + 4*u^3 - 6*u^5 - 2*u^7 + 14*u^9 - 14*u^11 + 6*u^13 - u^15", "u + 2*u^3 + 6*u^5 - 14*u^7 - 3*u^9 + 22*u^11 - 19*u^13 + 7*u^15 - u^17" ], [ "1 + 2*u^2 - 3*u^4 + u^6", "-u^2 + 2*u^4 - u^6" ], "{1, 0}", [ 1, "u^2" ], [ "1 - u^2", "2*u^2 - u^4" ], [ "1 + 2*u^2 + 6*u^4 - 14*u^6 - 3*u^8 + 22*u^10 - 19*u^12 + 7*u^14 - u^16", "2*u^2 - 4*u^4 + 6*u^6 + 2*u^8 - 14*u^10 + 14*u^12 - 6*u^14 + u^16" ], [ "u - 2*u^3 + u^5", "u + 2*u^3 - 3*u^5 + u^7" ], [ 0, "u" ], [ "-u", "u - u^3" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-1.10589 - 5.0046*I", "-1.10589 + 5.0046*I", "5.5022 + 2.1104*I", "5.5022 - 2.1104*I", -2.46649, "-4.45765 + 0.58948*I", "-4.45765 - 0.58948*I", "-4.56809 - 2.45481*I", "-4.56809 + 2.45481*I", "1.73723 + 2.23968*I", "1.73723 - 2.23968*I", "1.3923 - 6.4577*I", "1.3923 + 6.4577*I", "-6.58253 - 1.66521*I", "-6.58253 + 1.66521*I", "-12.1955 + 3.59224*I", "-12.1955 - 3.59224*I", "-5.53903 + 9.37044*I", "-5.53903 - 9.37044*I", "-0.091241 + 0.864455*I", "-0.091241 - 0.864455*I" ], "uPolysN":[ "1 - 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3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21" ], "uPolys":[ "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21" ], "aCuspShape":"-2 + 4*(-3*u + 6*u^2 - 3*u^3 - 3*u^4 + 11*u^5 - 19*u^6 - 2*u^7 + 22*u^8 - 13*u^9 + 6*u^10 + 14*u^11 - 26*u^12 - 6*u^13 + 20*u^14 + u^15 - 7*u^16 + u^18)", "RepresentationsN":[ [ "u->0.086113 + 0.839589 I" ], [ "u->0.086113 - 0.839589 I" ], [ "u->-0.027961 + 0.833462 I" ], [ "u->-0.027961 - 0.833462 I" ], [ "u->-1.18427" ], [ "u->1.17889 + 0.386444 I" ], [ "u->1.17889 - 0.386444 I" ], [ "u->1.28113 + 0.111157 I" ], [ "u->1.28113 - 0.111157 I" ], [ "u->-1.24584 + 0.377074 I" ], [ "u->-1.24584 - 0.377074 I" ], [ "u->1.29106 + 0.376139 I" ], [ "u->1.29106 - 0.376139 I" ], [ "u->0.430693 + 0.459647 I" ], [ "u->0.430693 - 0.459647 I" ], [ "u->-1.36793 + 0.126822 I" ], [ "u->-1.36793 - 0.126822 I" ], [ "u->-1.32851 + 0.374285 I" ], [ "u->-1.32851 - 0.374285 I" ], [ "u->-0.2055 + 0.333164 I" ], [ "u->-0.2055 - 0.333164 I" ] ], "Epsilon":8.271250000000001e-2, "uPolys_ij":[ "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 - 5*u + 39*u^2 + 28*u^3 + 39*u^4 + 91*u^5 - 728*u^6 - 1628*u^7 + 583*u^8 + 4601*u^9 + 3815*u^10 - 2724*u^11 - 7272*u^12 - 4760*u^13 + 964*u^14 + 4084*u^15 + 3589*u^16 + 1835*u^17 + 611*u^18 + 132*u^19 + 17*u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "41 + 185*u + 677*u^2 + 2526*u^3 + 7519*u^4 + 16031*u^5 + 23984*u^6 + 24074*u^7 + 12891*u^8 - 3525*u^9 - 13435*u^10 - 10640*u^11 - 1492*u^12 + 3652*u^13 + 2684*u^14 + 286*u^15 - 519*u^16 - 263*u^17 - 15*u^18 + 26*u^19 + 9*u^20 + u^21", "1 + u + 11*u^2 + 142*u^3 + 609*u^4 + 1643*u^5 + 3084*u^6 + 3140*u^7 + 7275*u^8 + 6859*u^9 - 417*u^10 + 13406*u^11 - 7330*u^12 + 5004*u^13 - 764*u^14 - 210*u^15 - 117*u^16 + 147*u^17 - 13*u^18 - 2*u^19 - u^20 + u^21", "9 + 7*u + 179*u^2 + 956*u^3 - 1337*u^4 + 103*u^5 - 6924*u^6 + 19488*u^7 - 24629*u^8 + 30473*u^9 - 46993*u^10 + 58112*u^11 - 50292*u^12 + 33660*u^13 - 20872*u^14 + 12872*u^15 - 6971*u^16 + 2887*u^17 - 845*u^18 + 164*u^19 - 19*u^20 + u^21", "61 - u + 297*u^2 - 586*u^3 - 467*u^4 - 387*u^5 + 154*u^6 + 596*u^7 + 1139*u^8 + 2697*u^9 + 337*u^10 + 2716*u^11 - 198*u^12 + 1414*u^13 - 178*u^14 + 466*u^15 - 61*u^16 + 101*u^17 - 11*u^18 + 14*u^19 - u^20 + u^21", "307 - 2617*u + 11801*u^2 - 31732*u^3 + 49293*u^4 - 42597*u^5 + 17920*u^6 + 7768*u^7 - 24279*u^8 + 15945*u^9 + 1165*u^10 + 4392*u^11 - 4452*u^12 + 4784*u^13 - 3272*u^14 + 1914*u^15 - 793*u^16 + 253*u^17 - 85*u^18 + 34*u^19 - 9*u^20 + u^21", "-87 - 251*u - 795*u^2 - 26*u^3 + 527*u^4 + 4173*u^5 + 580*u^6 + 2172*u^7 + 1165*u^8 + 5531*u^9 + 3349*u^10 + 3296*u^11 + 1640*u^12 + 1398*u^13 + 356*u^14 + 140*u^15 + 83*u^16 + 99*u^17 + 25*u^18 + 4*u^19 + 3*u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "53 - 29*u + 501*u^2 + 330*u^3 + 1285*u^4 + 3023*u^5 + 1384*u^6 + 6934*u^7 + 1167*u^8 + 8541*u^9 + 1009*u^10 + 6268*u^11 + 908*u^12 + 2864*u^13 + 396*u^14 + 832*u^15 + 99*u^16 + 157*u^17 + 15*u^18 + 18*u^19 + u^20 + u^21", "-919 + 6571*u - 16425*u^2 + 89530*u^3 - 167889*u^4 + 235611*u^5 - 157008*u^6 + 43038*u^7 + 19127*u^8 - 26605*u^9 + 41741*u^10 - 31448*u^11 + 4584*u^12 + 6804*u^13 - 4736*u^14 + 2106*u^15 - 643*u^16 + 237*u^17 - 123*u^18 + 50*u^19 - 11*u^20 + u^21", "373 - 701*u + 2567*u^2 + 2228*u^3 + 5965*u^4 + 63983*u^5 + 184850*u^6 + 206060*u^7 + 122327*u^8 + 19327*u^9 - 69279*u^10 - 23668*u^11 - 23618*u^12 + 16394*u^13 - 1088*u^14 + 5042*u^15 - 2009*u^16 - 69*u^17 + 27*u^18 - 8*u^19 + 5*u^20 + u^21", "121 + 723*u + 3907*u^2 + 12208*u^3 + 33263*u^4 + 70067*u^5 + 91520*u^6 + 69210*u^7 + 37133*u^8 + 30881*u^9 + 28749*u^10 + 16474*u^11 + 1004*u^12 - 3866*u^13 - 1450*u^14 + 1974*u^15 + 849*u^16 + 171*u^17 - 13*u^18 + 8*u^19 + 5*u^20 + u^21", "-113 + 913*u - 149*u^2 + 10392*u^3 - 17087*u^4 - 1003*u^5 - 2270*u^6 + 23474*u^7 - 10939*u^8 - 2381*u^9 - 5937*u^10 + 8316*u^11 - 4312*u^12 + 3404*u^13 - 212*u^14 - 738*u^15 - 185*u^16 + 313*u^17 + 203*u^18 + 66*u^19 + 11*u^20 + u^21", "453 - 451*u + 4817*u^2 - 9178*u^3 - 19047*u^4 + 28795*u^5 + 110510*u^6 + 248732*u^7 + 430317*u^8 + 525663*u^9 + 449833*u^10 + 309050*u^11 + 210982*u^12 + 135822*u^13 + 63644*u^14 + 20022*u^15 + 5651*u^16 + 1903*u^17 + 451*u^18 + 64*u^19 + 9*u^20 + u^21", "361 - 433*u + 3471*u^2 - 3300*u^3 + 5475*u^4 + 8017*u^5 + 13434*u^6 - 19328*u^7 - 51013*u^8 + 19249*u^9 + 35067*u^10 + 7296*u^11 - 5424*u^12 - 6016*u^13 - 1176*u^14 + 2746*u^15 - 591*u^16 + 189*u^17 - 71*u^18 + 28*u^19 - 5*u^20 + u^21", "-1 - 5*u - 15*u^2 + 56*u^3 + 365*u^4 + 1423*u^5 + 4144*u^6 + 10156*u^7 + 20349*u^8 + 35733*u^9 + 54917*u^10 + 72192*u^11 + 82056*u^12 + 79972*u^13 + 63804*u^14 + 39612*u^15 + 18451*u^16 + 6267*u^17 + 1501*u^18 + 240*u^19 + 23*u^20 + u^21" ], "GeometricComponent":"{18, 19}", "uPolys_ij_N":[ "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 - 5*u + 39*u^2 + 28*u^3 + 39*u^4 + 91*u^5 - 728*u^6 - 1628*u^7 + 583*u^8 + 4601*u^9 + 3815*u^10 - 2724*u^11 - 7272*u^12 - 4760*u^13 + 964*u^14 + 4084*u^15 + 3589*u^16 + 1835*u^17 + 611*u^18 + 132*u^19 + 17*u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "41 + 185*u + 677*u^2 + 2526*u^3 + 7519*u^4 + 16031*u^5 + 23984*u^6 + 24074*u^7 + 12891*u^8 - 3525*u^9 - 13435*u^10 - 10640*u^11 - 1492*u^12 + 3652*u^13 + 2684*u^14 + 286*u^15 - 519*u^16 - 263*u^17 - 15*u^18 + 26*u^19 + 9*u^20 + u^21", "1 + u + 11*u^2 + 142*u^3 + 609*u^4 + 1643*u^5 + 3084*u^6 + 3140*u^7 + 7275*u^8 + 6859*u^9 - 417*u^10 + 13406*u^11 - 7330*u^12 + 5004*u^13 - 764*u^14 - 210*u^15 - 117*u^16 + 147*u^17 - 13*u^18 - 2*u^19 - u^20 + u^21", "9 + 7*u + 179*u^2 + 956*u^3 - 1337*u^4 + 103*u^5 - 6924*u^6 + 19488*u^7 - 24629*u^8 + 30473*u^9 - 46993*u^10 + 58112*u^11 - 50292*u^12 + 33660*u^13 - 20872*u^14 + 12872*u^15 - 6971*u^16 + 2887*u^17 - 845*u^18 + 164*u^19 - 19*u^20 + u^21", "61 - u + 297*u^2 - 586*u^3 - 467*u^4 - 387*u^5 + 154*u^6 + 596*u^7 + 1139*u^8 + 2697*u^9 + 337*u^10 + 2716*u^11 - 198*u^12 + 1414*u^13 - 178*u^14 + 466*u^15 - 61*u^16 + 101*u^17 - 11*u^18 + 14*u^19 - u^20 + u^21", "307 - 2617*u + 11801*u^2 - 31732*u^3 + 49293*u^4 - 42597*u^5 + 17920*u^6 + 7768*u^7 - 24279*u^8 + 15945*u^9 + 1165*u^10 + 4392*u^11 - 4452*u^12 + 4784*u^13 - 3272*u^14 + 1914*u^15 - 793*u^16 + 253*u^17 - 85*u^18 + 34*u^19 - 9*u^20 + u^21", "-87 - 251*u - 795*u^2 - 26*u^3 + 527*u^4 + 4173*u^5 + 580*u^6 + 2172*u^7 + 1165*u^8 + 5531*u^9 + 3349*u^10 + 3296*u^11 + 1640*u^12 + 1398*u^13 + 356*u^14 + 140*u^15 + 83*u^16 + 99*u^17 + 25*u^18 + 4*u^19 + 3*u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "53 - 29*u + 501*u^2 + 330*u^3 + 1285*u^4 + 3023*u^5 + 1384*u^6 + 6934*u^7 + 1167*u^8 + 8541*u^9 + 1009*u^10 + 6268*u^11 + 908*u^12 + 2864*u^13 + 396*u^14 + 832*u^15 + 99*u^16 + 157*u^17 + 15*u^18 + 18*u^19 + u^20 + u^21", "-919 + 6571*u - 16425*u^2 + 89530*u^3 - 167889*u^4 + 235611*u^5 - 157008*u^6 + 43038*u^7 + 19127*u^8 - 26605*u^9 + 41741*u^10 - 31448*u^11 + 4584*u^12 + 6804*u^13 - 4736*u^14 + 2106*u^15 - 643*u^16 + 237*u^17 - 123*u^18 + 50*u^19 - 11*u^20 + u^21", "373 - 701*u + 2567*u^2 + 2228*u^3 + 5965*u^4 + 63983*u^5 + 184850*u^6 + 206060*u^7 + 122327*u^8 + 19327*u^9 - 69279*u^10 - 23668*u^11 - 23618*u^12 + 16394*u^13 - 1088*u^14 + 5042*u^15 - 2009*u^16 - 69*u^17 + 27*u^18 - 8*u^19 + 5*u^20 + u^21", "121 + 723*u + 3907*u^2 + 12208*u^3 + 33263*u^4 + 70067*u^5 + 91520*u^6 + 69210*u^7 + 37133*u^8 + 30881*u^9 + 28749*u^10 + 16474*u^11 + 1004*u^12 - 3866*u^13 - 1450*u^14 + 1974*u^15 + 849*u^16 + 171*u^17 - 13*u^18 + 8*u^19 + 5*u^20 + u^21", "-113 + 913*u - 149*u^2 + 10392*u^3 - 17087*u^4 - 1003*u^5 - 2270*u^6 + 23474*u^7 - 10939*u^8 - 2381*u^9 - 5937*u^10 + 8316*u^11 - 4312*u^12 + 3404*u^13 - 212*u^14 - 738*u^15 - 185*u^16 + 313*u^17 + 203*u^18 + 66*u^19 + 11*u^20 + u^21", "453 - 451*u + 4817*u^2 - 9178*u^3 - 19047*u^4 + 28795*u^5 + 110510*u^6 + 248732*u^7 + 430317*u^8 + 525663*u^9 + 449833*u^10 + 309050*u^11 + 210982*u^12 + 135822*u^13 + 63644*u^14 + 20022*u^15 + 5651*u^16 + 1903*u^17 + 451*u^18 + 64*u^19 + 9*u^20 + u^21", "361 - 433*u + 3471*u^2 - 3300*u^3 + 5475*u^4 + 8017*u^5 + 13434*u^6 - 19328*u^7 - 51013*u^8 + 19249*u^9 + 35067*u^10 + 7296*u^11 - 5424*u^12 - 6016*u^13 - 1176*u^14 + 2746*u^15 - 591*u^16 + 189*u^17 - 71*u^18 + 28*u^19 - 5*u^20 + u^21", "-1 - 5*u - 15*u^2 + 56*u^3 + 365*u^4 + 1423*u^5 + 4144*u^6 + 10156*u^7 + 20349*u^8 + 35733*u^9 + 54917*u^10 + 72192*u^11 + 82056*u^12 + 79972*u^13 + 63804*u^14 + 39612*u^15 + 18451*u^16 + 6267*u^17 + 1501*u^18 + 240*u^19 + 23*u^20 + u^21" ], "Multiplicity":1, "ij_list":[ [ "{4, 9}", "{5, 9}", "{5, 10}", "{6, 10}" ], [ "{4, 5}", "{5, 6}", "{9, 10}" ], [ "{1, 3}", "{1, 4}", "{4, 10}", "{6, 8}", "{6, 9}" ], [ "{1, 9}", "{4, 6}", "{8, 10}" ], [ "{1, 5}", "{5, 8}" ], [ "{1, 10}", "{3, 4}", "{8, 9}" ], [ "{1, 6}", "{3, 9}", "{4, 8}" ], [ "{3, 5}" ], [ "{3, 10}" ], [ "{1, 8}", "{2, 7}", "{2, 8}", "{3, 6}", "{3, 7}" ], [ "{1, 7}", "{2, 6}", "{3, 8}" ], [ "{2, 10}" ], [ "{2, 5}" ], [ "{2, 9}", "{4, 7}" ], [ "{2, 4}", "{7, 9}" ], [ "{5, 7}" ], [ "{7, 10}" ], [ "{1, 2}", "{2, 3}", "{6, 7}", "{7, 8}" ] ], "SortedReprnIndices":"{18, 19, 13, 12, 2, 1, 16, 17, 9, 8, 10, 11, 3, 4, 15, 14, 20, 21, 6, 7, 5}", "aCuspShapeN":[ "-1.8465239647102860865`4.834475064378641 + 3.3473936872849221807`5.092826908734741*I", "-1.8465239647102860865`4.834475064378641 - 3.3473936872849221807`5.092826908734741*I", "1.91244810247681048`4.841924644229624 - 3.3897945616219695647`5.090508364160588*I", "1.91244810247681048`4.841924644229624 + 3.3897945616219695647`5.090508364160588*I", -1.7406, "-5.0455378210483064279`5.149877206203013 + 0.2736457386195525596`3.884158429665034*I", "-5.0455378210483064279`5.149877206203013 - 0.2736457386195525596`3.884158429665034*I", "-8.8260823494669579312`5.08715703014351 + 5.1373615835947460183`4.852129188747289*I", "-8.8260823494669579312`5.08715703014351 - 5.1373615835947460183`4.852129188747289*I", "-1.5023393088978690651`5.147586404575524 - 0.1750597662693447432`4.214004718096152*I", "-1.5023393088978690651`5.147586404575524 + 0.1750597662693447432`4.214004718096152*I", "-2.5464362810613349949`4.71890185672294 + 6.3906809059078283236`5.118516176598035*I", "-2.5464362810613349949`4.71890185672294 - 6.3906809059078283236`5.118516176598035*I", "-5.5576698021879808642`5.063202767103835 + 3.9099398214497550373`4.910480099779094*I", "-5.5576698021879808642`5.063202767103835 - 3.9099398214497550373`4.910480099779094*I", "-10.4260607788042608528`5.130855113917649 - 3.2095021467174181162`4.619172532100062*I", "-10.4260607788042608528`5.130855113917649 + 3.2095021467174181162`4.619172532100062*I", "-6.1194273517936750332`5.01662963583165 - 5.650300770186434966`4.981990418797795*I", "-6.1194273517936750332`5.01662963583165 + 5.650300770186434966`4.981990418797795*I", "-2.1720671448894404883`4.566067750762776 - 8.0552599173733820462`5.135274062607372*I", "-2.1720671448894404883`4.566067750762776 + 8.0552599173733820462`5.135274062607372*I" ], "Abelian":false }, { "IdealName":"abJ10_11_1", "Generators":[ "-1 + v" ], "VariableOrder":[ "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.1697e-2, "TimingZeroDimVars":1.5472999999999999e-2, "TimingmagmaVCompNormalize":1.6505000000000002e-2, "TimingNumberOfSols":2.0122e-2, "TimingIsRadical":1.608e-3, "TimingArcColoring":5.302e-2, "TimingObstruction":4.1e-4, "TimingComplexVolumeN":0.336559, "TimingaCuspShapeN":4.644000000000001e-3, "TiminguValues":0.627949, "TiminguPolysN":9.400000000000001e-5, "TiminguPolys":0.802853, "TimingaCuspShape":8.681e-2, "TimingRepresentationsN":1.9743e-2, "TiminguValues_ij":0.137346, "TiminguPoly_ij":0.131394, "TiminguPolys_ij_N":4.1e-5 }, "ZeroDimensionalVars":[ "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." ] ], "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 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "1 - u + 3*u^2 + 6*u^3 - 3*u^4 + 23*u^5 - 24*u^6 + 68*u^7 - 45*u^8 + 117*u^9 - 93*u^10 + 188*u^11 - 138*u^12 + 220*u^13 - 112*u^14 + 152*u^15 - 49*u^16 + 59*u^17 - 11*u^18 + 12*u^19 - u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21", "1 + u + 3*u^2 - 6*u^3 + 9*u^4 + 9*u^5 - 14*u^6 + 16*u^7 - 17*u^8 - 41*u^9 + 35*u^10 + 16*u^11 - 8*u^12 + 32*u^13 - 20*u^14 - 46*u^15 + 19*u^16 + 27*u^17 - 7*u^18 - 8*u^19 + u^20 + u^21", "-3 + 5*u - 3*u^2 + 34*u^3 - 85*u^4 + 127*u^5 - 160*u^6 + 166*u^7 - 129*u^8 + 183*u^9 - 195*u^10 + 296*u^11 - 324*u^12 + 340*u^13 - 284*u^14 + 218*u^15 - 131*u^16 + 77*u^17 - 31*u^18 + 14*u^19 - 3*u^20 + u^21" ], "RileyPolyC":[ "-1 - 5*y - 15*y^2 + 56*y^3 + 365*y^4 + 1423*y^5 + 4144*y^6 + 10156*y^7 + 20349*y^8 + 35733*y^9 + 54917*y^10 + 72192*y^11 + 82056*y^12 + 79972*y^13 + 63804*y^14 + 39612*y^15 + 18451*y^16 + 6267*y^17 + 1501*y^18 + 240*y^19 + 23*y^20 + y^21", "-1 - 5*y - 15*y^2 + 56*y^3 + 365*y^4 + 1423*y^5 + 4144*y^6 + 10156*y^7 + 20349*y^8 + 35733*y^9 + 54917*y^10 + 72192*y^11 + 82056*y^12 + 79972*y^13 + 63804*y^14 + 39612*y^15 + 18451*y^16 + 6267*y^17 + 1501*y^18 + 240*y^19 + 23*y^20 + y^21", "-9 + 7*y - 179*y^2 + 956*y^3 + 1337*y^4 + 103*y^5 + 6924*y^6 + 19488*y^7 + 24629*y^8 + 30473*y^9 + 46993*y^10 + 58112*y^11 + 50292*y^12 + 33660*y^13 + 20872*y^14 + 12872*y^15 + 6971*y^16 + 2887*y^17 + 845*y^18 + 164*y^19 + 19*y^20 + y^21", "-1 - 5*y - 39*y^2 + 28*y^3 - 39*y^4 + 91*y^5 + 728*y^6 - 1628*y^7 - 583*y^8 + 4601*y^9 - 3815*y^10 - 2724*y^11 + 7272*y^12 - 4760*y^13 - 964*y^14 + 4084*y^15 - 3589*y^16 + 1835*y^17 - 611*y^18 + 132*y^19 - 17*y^20 + y^21", "-1 - 5*y - 39*y^2 + 28*y^3 - 39*y^4 + 91*y^5 + 728*y^6 - 1628*y^7 - 583*y^8 + 4601*y^9 - 3815*y^10 - 2724*y^11 + 7272*y^12 - 4760*y^13 - 964*y^14 + 4084*y^15 - 3589*y^16 + 1835*y^17 - 611*y^18 + 132*y^19 - 17*y^20 + y^21", "-1 - 5*y - 15*y^2 + 56*y^3 + 365*y^4 + 1423*y^5 + 4144*y^6 + 10156*y^7 + 20349*y^8 + 35733*y^9 + 54917*y^10 + 72192*y^11 + 82056*y^12 + 79972*y^13 + 63804*y^14 + 39612*y^15 + 18451*y^16 + 6267*y^17 + 1501*y^18 + 240*y^19 + 23*y^20 + y^21", "-1 - 5*y - 15*y^2 + 56*y^3 + 365*y^4 + 1423*y^5 + 4144*y^6 + 10156*y^7 + 20349*y^8 + 35733*y^9 + 54917*y^10 + 72192*y^11 + 82056*y^12 + 79972*y^13 + 63804*y^14 + 39612*y^15 + 18451*y^16 + 6267*y^17 + 1501*y^18 + 240*y^19 + 23*y^20 + y^21", "-9 + 7*y - 179*y^2 + 956*y^3 + 1337*y^4 + 103*y^5 + 6924*y^6 + 19488*y^7 + 24629*y^8 + 30473*y^9 + 46993*y^10 + 58112*y^11 + 50292*y^12 + 33660*y^13 + 20872*y^14 + 12872*y^15 + 6971*y^16 + 2887*y^17 + 845*y^18 + 164*y^19 + 19*y^20 + y^21", "-1 - 5*y - 39*y^2 + 28*y^3 - 39*y^4 + 91*y^5 + 728*y^6 - 1628*y^7 - 583*y^8 + 4601*y^9 - 3815*y^10 - 2724*y^11 + 7272*y^12 - 4760*y^13 - 964*y^14 + 4084*y^15 - 3589*y^16 + 1835*y^17 - 611*y^18 + 132*y^19 - 17*y^20 + y^21", "-9 + 7*y - 179*y^2 + 956*y^3 + 1337*y^4 + 103*y^5 + 6924*y^6 + 19488*y^7 + 24629*y^8 + 30473*y^9 + 46993*y^10 + 58112*y^11 + 50292*y^12 + 33660*y^13 + 20872*y^14 + 12872*y^15 + 6971*y^16 + 2887*y^17 + 845*y^18 + 164*y^19 + 19*y^20 + y^21" ] }, "GeometricRepresentation":[ 9.37044, [ "J10_11_0", 1, "{18, 19}" ] ] } }