{ "Index":125, "Name":"10_41", "RolfsenName":"10_41", "DTname":"10a_35", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-14, 16, -10, 18, -6, 20, -2, 12, 8, 4}", "Acode":"{-8, 9, -6, 10, -4, 1, -2, 7, 5, 3}", "PDcode":[ "{1, 14, 2, 15}", "{3, 17, 4, 16}", "{5, 10, 6, 11}", "{7, 19, 8, 18}", "{9, 6, 10, 7}", "{11, 1, 12, 20}", "{13, 2, 14, 3}", "{15, 13, 16, 12}", "{17, 9, 18, 8}", "{19, 5, 20, 4}" ], "CBtype":"{2, 0}", "ParabolicReps":{ "SolvingSeq":[ "{2, 8}", [], [ "{2, -8, 1, 2}", "{8, -2, 7, 2}", "{8, 7, 9, 1}", "{2, 9, 3, 1}", "{7, 1, 6, 2}", "{3, -6, 4, 1}", "{6, -4, 5, 2}", "{1, 3, 10, 2}" ], "{4}", "{9}", 9 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 + u + u^2 - 2*u^4 - 3*u^5 - 8*u^6 - 8*u^7 - 13*u^8 - 2*u^9 + 3*u^10 + 14*u^11 + 55*u^12 + 20*u^13 + 90*u^14 + 4*u^15 - 3*u^16 - 19*u^17 - 221*u^18 - 26*u^19 - 320*u^20 - 17*u^21 - 56*u^22 - 6*u^23 + 424*u^24 - u^25 + 636*u^26 + 302*u^28 - 314*u^30 - 721*u^32 - 711*u^34 - 452*u^36 - 198*u^38 - 59*u^40 - 11*u^42 - u^44", "-u - u^3 + u^4 - u^5 - 2*u^8 + 4*u^9 - 10*u^10 + 12*u^11 - u^12 + 12*u^13 + 64*u^14 - 12*u^15 + 166*u^16 - 47*u^17 + 164*u^18 - 63*u^19 - 93*u^20 - 49*u^21 - 500*u^22 - 24*u^23 - 644*u^24 - 7*u^25 - 178*u^26 - u^27 + 732*u^28 + 1488*u^30 + 1630*u^32 + 1222*u^34 + 661*u^36 + 258*u^38 + 70*u^40 + 12*u^42 + u^44" ], "TimingForPrimaryIdeals":8.8481e-2 }, "v":{ "CheckEq":[ "1 - v" ], "TimingForPrimaryIdeals":7.318100000000001e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_41_0", "Generators":[ "-1 - 2*u - 3*u^2 - 3*u^3 - 2*u^4 + 6*u^6 + 14*u^7 + 28*u^8 + 34*u^9 + 40*u^10 + 38*u^11 + 4*u^12 - 6*u^13 - 84*u^14 - 104*u^15 - 149*u^16 - 176*u^17 - 99*u^18 - 109*u^19 + 60*u^20 + 104*u^21 + 218*u^22 + 316*u^23 + 269*u^24 + 376*u^25 + 209*u^26 + 281*u^27 + 111*u^28 + 142*u^29 + 40*u^30 + 48*u^31 + 9*u^32 + 10*u^33 + u^34 + u^35" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.1069000000000005e-2, "TimingZeroDimVars":1.9427e-2, "TimingmagmaVCompNormalize":2.0653e-2, "TimingNumberOfSols":6.1718e-2, "TimingIsRadical":1.592e-3, "TimingArcColoring":5.3846e-2, "TimingObstruction":4.9857e-2, "TimingComplexVolumeN":2.7805072000000003e1, "TimingaCuspShapeN":0.172763, "TiminguValues":0.65768, "TiminguPolysN":6.368800000000001e-2, "TiminguPolys":0.853581, "TimingaCuspShape":0.114888, "TimingRepresentationsN":7.3996e-2, "TiminguValues_ij":0.161607, "TiminguPoly_ij":1.90064, "TiminguPolys_ij_N":0.126661 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":35, "IsRadical":true, "ArcColoring":[ [ 1, "u^2" ], "{1, 0}", [ "1 - u^4 - u^6", "u^2 + 2*u^4 + u^6" ], [ "1 - 2*u^4 - 2*u^6 + u^8 + 4*u^10 + 3*u^12 + u^14", "4*u^8 + 8*u^10 + 8*u^12 + 4*u^14 + u^16" ], [ "-u + 3*u^5 + 8*u^7 + 2*u^9 - 14*u^11 - 20*u^13 - 4*u^15 + 19*u^17 + 26*u^19 + 17*u^21 + 6*u^23 + u^25", "u + u^3 + u^5 - 4*u^9 - 12*u^11 - 12*u^13 + 12*u^15 + 47*u^17 + 63*u^19 + 49*u^21 + 24*u^23 + 7*u^25 + u^27" ], [ "u^3", "u + u^3 + u^5" ], [ "-u", "u" ], [ 0, "u" ], [ "-u^3", "u + u^3" ], [ "1 - 2*u^4 - 2*u^6 + u^8 + 4*u^10 + 3*u^12 + u^14", "u^2 - 2*u^6 - 6*u^8 - 7*u^10 - 4*u^12 - u^14" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-1.61985 - 2.07827*I", "-1.61985 + 2.07827*I", "-0.81872 + 7.33485*I", "-0.81872 - 7.33485*I", "-4.65111 - 2.79178*I", "-4.65111 + 2.79178*I", "3.43859 + 2.09817*I", "3.43859 - 2.09817*I", "-4.48418 + 7.52211*I", "-4.48418 - 7.52211*I", "-5.26005 - 1.67857*I", "-5.26005 + 1.67857*I", "-0.387744 - 1.21814*I", "-0.387744 + 1.21814*I", "0.04226 - 3.0044*I", "0.04226 + 3.0044*I", "-2.27261 - 1.14078*I", "-2.27261 + 1.14078*I", "-1.65334 - 7.02473*I", "-1.65334 + 7.02473*I", "-5.12537 + 4.24996*I", "-5.12537 - 4.24996*I", "-8.54235 + 3.42594*I", "-8.54235 - 3.42594*I", "1.26318 + 2.51214*I", "1.26318 - 2.51214*I", "-9.20933 + 2.50696*I", "-9.20933 - 2.50696*I", -1.80251, "-8.5239 + 6.46046*I", "-8.5239 - 6.46046*I", "-7.6692 - 12.3766*I", "-7.6692 + 12.3766*I", "-0.37526 - 1.90476*I", "-0.37526 + 1.90476*I" ], "uPolysN":[ "1 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "-1 - 2*u - u^2 + 9*u^3 + 32*u^4 + 52*u^5 - 32*u^6 - 328*u^7 - 646*u^8 - 168*u^9 + 2022*u^10 + 4934*u^11 + 3978*u^12 - 5968*u^13 - 21376*u^14 - 24584*u^15 + 3169*u^16 + 54018*u^17 + 83717*u^18 + 46523*u^19 - 50914*u^20 - 139284*u^21 - 143212*u^22 - 50168*u^23 + 80101*u^24 + 170754*u^25 + 186787*u^26 + 145981*u^27 + 88109*u^28 + 42112*u^29 + 15988*u^30 + 4764*u^31 + 1083*u^32 + 178*u^33 + 19*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "13 - 54*u + 75*u^2 - 143*u^3 + 508*u^4 - 836*u^5 + 464*u^6 - 76*u^7 + 970*u^8 - 714*u^9 - 1502*u^10 + 2410*u^11 - 658*u^12 + 1650*u^13 - 3608*u^14 + 1602*u^15 + 59*u^16 + 962*u^17 - 135*u^18 - 2577*u^19 + 1206*u^20 + 1248*u^21 + 436*u^22 - 1554*u^23 - 105*u^24 + 1080*u^25 - 193*u^26 - 317*u^27 + 23*u^28 + 176*u^29 - 72*u^30 - 10*u^31 + 5*u^32 + 8*u^33 - 5*u^34 + u^35" ], "uPolys":[ "1 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "-1 - 2*u - u^2 + 9*u^3 + 32*u^4 + 52*u^5 - 32*u^6 - 328*u^7 - 646*u^8 - 168*u^9 + 2022*u^10 + 4934*u^11 + 3978*u^12 - 5968*u^13 - 21376*u^14 - 24584*u^15 + 3169*u^16 + 54018*u^17 + 83717*u^18 + 46523*u^19 - 50914*u^20 - 139284*u^21 - 143212*u^22 - 50168*u^23 + 80101*u^24 + 170754*u^25 + 186787*u^26 + 145981*u^27 + 88109*u^28 + 42112*u^29 + 15988*u^30 + 4764*u^31 + 1083*u^32 + 178*u^33 + 19*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "13 - 54*u + 75*u^2 - 143*u^3 + 508*u^4 - 836*u^5 + 464*u^6 - 76*u^7 + 970*u^8 - 714*u^9 - 1502*u^10 + 2410*u^11 - 658*u^12 + 1650*u^13 - 3608*u^14 + 1602*u^15 + 59*u^16 + 962*u^17 - 135*u^18 - 2577*u^19 + 1206*u^20 + 1248*u^21 + 436*u^22 - 1554*u^23 - 105*u^24 + 1080*u^25 - 193*u^26 - 317*u^27 + 23*u^28 + 176*u^29 - 72*u^30 - 10*u^31 + 5*u^32 + 8*u^33 - 5*u^34 + u^35" ], "aCuspShape":"-2 - 4*(-1 - 2*u - u^2 + u^3 + 3*u^5 + 4*u^6 + 16*u^7 + 11*u^8 + 22*u^9 + 14*u^10 + 2*u^11 + 9*u^12 - 44*u^13 - 27*u^14 - 76*u^15 - 82*u^16 - 46*u^17 - 95*u^18 + 39*u^19 - 14*u^20 + 127*u^21 + 118*u^22 + 163*u^23 + 198*u^24 + 137*u^25 + 178*u^26 + 80*u^27 + 103*u^28 + 32*u^29 + 39*u^30 + 8*u^31 + 9*u^32 + u^33 + u^34)", "RepresentationsN":[ [ "u->-0.475306 + 0.917107 I" ], [ "u->-0.475306 - 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2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "-1 - 2*u - u^2 + 9*u^3 + 32*u^4 + 52*u^5 - 32*u^6 - 328*u^7 - 646*u^8 - 168*u^9 + 2022*u^10 + 4934*u^11 + 3978*u^12 - 5968*u^13 - 21376*u^14 - 24584*u^15 + 3169*u^16 + 54018*u^17 + 83717*u^18 + 46523*u^19 - 50914*u^20 - 139284*u^21 - 143212*u^22 - 50168*u^23 + 80101*u^24 + 170754*u^25 + 186787*u^26 + 145981*u^27 + 88109*u^28 + 42112*u^29 + 15988*u^30 + 4764*u^31 + 1083*u^32 + 178*u^33 + 19*u^34 + u^35", "1 + 2*u - 27*u^2 - 127*u^3 + 132*u^4 + 2272*u^5 + 4552*u^6 - 2752*u^7 - 35342*u^8 - 78884*u^9 - 32498*u^10 + 240982*u^11 + 331286*u^12 + 136632*u^13 + 725616*u^14 + 2305668*u^15 + 1859495*u^16 + 3404574*u^17 + 4198151*u^18 + 3752715*u^19 + 4077078*u^20 + 3190080*u^21 + 2546252*u^22 + 1807480*u^23 + 1049555*u^24 + 631530*u^25 + 274009*u^26 + 135277*u^27 + 44223*u^28 + 17736*u^29 + 4264*u^30 + 1380*u^31 + 225*u^32 + 58*u^33 + 5*u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 20*u + 235*u^2 - 1861*u^3 + 10588*u^4 - 44720*u^5 + 145372*u^6 - 361898*u^7 + 703138*u^8 - 1013920*u^9 + 1008850*u^10 - 403852*u^11 - 661906*u^12 + 1483976*u^13 - 1344876*u^14 + 215638*u^15 + 929599*u^16 - 1024556*u^17 + 242161*u^18 + 417727*u^19 - 446866*u^20 + 89720*u^21 + 172292*u^22 - 133780*u^23 - 13109*u^24 + 53052*u^25 - 11749*u^26 - 11061*u^27 + 4991*u^28 + 1168*u^29 - 980*u^30 - 10*u^31 + 105*u^32 - 12*u^33 - 5*u^34 + u^35", "1 - 50*u + 4149*u^2 - 8207*u^3 - 13260*u^4 + 103444*u^5 + 199028*u^6 + 37208*u^7 + 87842*u^8 + 733696*u^9 + 1035178*u^10 + 362606*u^11 - 201570*u^12 + 79948*u^13 + 648716*u^14 + 1445148*u^15 + 2647943*u^16 + 3210626*u^17 + 2385391*u^18 + 1361871*u^19 + 1526078*u^20 + 2644460*u^21 + 3759040*u^22 + 4435936*u^23 + 4580203*u^24 + 4069878*u^25 + 2996681*u^26 + 1781977*u^27 + 844479*u^28 + 316016*u^29 + 92304*u^30 + 20648*u^31 + 3425*u^32 + 398*u^33 + 29*u^34 + u^35", "2069 - 2672*u - 729*u^2 + 5215*u^3 + 8398*u^4 - 26414*u^5 + 3704*u^6 + 164514*u^7 - 659396*u^8 + 1336224*u^9 - 2231394*u^10 + 3530984*u^11 - 5032632*u^12 + 7261038*u^13 - 8913500*u^14 + 11157352*u^15 - 11236599*u^16 + 12099234*u^17 - 10025793*u^18 + 9261791*u^19 - 6165012*u^20 + 4855478*u^21 - 2488882*u^22 + 1715288*u^23 - 658549*u^24 + 419712*u^25 - 118473*u^26 + 72017*u^27 - 14809*u^28 + 8760*u^29 - 1208*u^30 + 748*u^31 - 55*u^32 + 40*u^33 - u^34 + u^35", "13 - 54*u + 75*u^2 - 143*u^3 + 508*u^4 - 836*u^5 + 464*u^6 - 76*u^7 + 970*u^8 - 714*u^9 - 1502*u^10 + 2410*u^11 - 658*u^12 + 1650*u^13 - 3608*u^14 + 1602*u^15 + 59*u^16 + 962*u^17 - 135*u^18 - 2577*u^19 + 1206*u^20 + 1248*u^21 + 436*u^22 - 1554*u^23 - 105*u^24 + 1080*u^25 - 193*u^26 - 317*u^27 + 23*u^28 + 176*u^29 - 72*u^30 - 10*u^31 + 5*u^32 + 8*u^33 - 5*u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "-2099 + 835342*u + 1925689*u^2 + 6936281*u^3 + 9441830*u^4 + 24096894*u^5 + 24296866*u^6 + 54813592*u^7 + 41073888*u^8 + 89937166*u^9 + 50994400*u^10 + 113469530*u^11 + 50500398*u^12 + 112889876*u^13 + 43683582*u^14 + 90867260*u^15 + 33801831*u^16 + 59590572*u^17 + 22740067*u^18 + 31362725*u^19 + 12187080*u^20 + 12875636*u^21 + 4797320*u^22 + 3936410*u^23 + 1312017*u^24 + 857396*u^25 + 245515*u^26 + 129731*u^27 + 30975*u^28 + 13790*u^29 + 2542*u^30 + 1030*u^31 + 127*u^32 + 48*u^33 + 3*u^34 + u^35", "2479 - 9014*u - 29297*u^2 + 70611*u^3 + 373880*u^4 + 392116*u^5 - 844454*u^6 - 2955592*u^7 - 4312848*u^8 - 1562232*u^9 + 4955738*u^10 + 11632254*u^11 + 18497252*u^12 + 29788176*u^13 + 37745386*u^14 + 43654858*u^15 + 45503261*u^16 + 40383924*u^17 + 33903209*u^18 + 24900051*u^19 + 17214796*u^20 + 10749460*u^21 + 6185510*u^22 + 3243466*u^23 + 1406645*u^24 + 730508*u^25 + 191819*u^26 + 123167*u^27 + 14167*u^28 + 14772*u^29 + 340*u^30 + 1158*u^31 - 19*u^32 + 52*u^33 - u^34 + u^35", "1 + 12*u + 79*u^2 + 271*u^3 + 136*u^4 - 2832*u^5 + 2128*u^6 + 13400*u^7 + 27794*u^8 - 12622*u^9 - 157368*u^10 + 353056*u^11 - 534790*u^12 + 2196706*u^13 - 3561806*u^14 + 8154910*u^15 - 13298693*u^16 + 19154742*u^17 - 13483477*u^18 + 8173111*u^19 - 1224010*u^20 - 1787872*u^21 + 4602632*u^22 - 1838372*u^23 + 259687*u^24 + 150590*u^25 - 223463*u^26 + 420073*u^27 + 34327*u^28 - 50666*u^29 - 986*u^30 + 2710*u^31 - 31*u^32 - 78*u^33 + u^34 + u^35", "169 + 966*u + 3389*u^2 + 22473*u^3 + 105580*u^4 + 219872*u^5 + 887412*u^6 + 1150504*u^7 + 2904758*u^8 + 4007500*u^9 + 4069950*u^10 + 7115230*u^11 + 2909774*u^12 + 1852888*u^13 + 217432*u^14 - 6643160*u^15 - 5418533*u^16 - 3087086*u^17 - 1843649*u^18 + 5307371*u^19 + 9056250*u^20 + 10188824*u^21 + 10006628*u^22 + 7683500*u^23 + 4999599*u^24 + 2776086*u^25 + 1279041*u^26 + 528001*u^27 + 178463*u^28 + 55680*u^29 + 13776*u^30 + 3232*u^31 + 553*u^32 + 94*u^33 + 9*u^34 + u^35", "85523 - 254410*u + 3137627*u^2 - 2528381*u^3 + 3959258*u^4 + 8694232*u^5 - 19633730*u^6 - 5021750*u^7 + 26336386*u^8 - 14329808*u^9 - 10119462*u^10 + 29253968*u^11 - 17624060*u^12 + 1492106*u^13 + 15503848*u^14 - 11981770*u^15 + 4382227*u^16 - 2023530*u^17 - 838919*u^18 + 1493961*u^19 - 1533802*u^20 + 1531792*u^21 - 552684*u^22 + 1119596*u^23 + 197825*u^24 + 484038*u^25 + 134223*u^26 + 112707*u^27 + 29073*u^28 + 15760*u^29 + 3380*u^30 + 1342*u^31 + 207*u^32 + 60*u^33 + 5*u^34 + u^35", "1 - 22*u + 91*u^2 + 575*u^3 - 100*u^4 - 3722*u^5 - 4438*u^6 + 12712*u^7 + 43722*u^8 + 47410*u^9 + 27588*u^10 + 12362*u^11 - 19728*u^12 - 95234*u^13 - 25568*u^14 - 89750*u^15 - 28427*u^16 + 36890*u^17 - 39655*u^18 + 125783*u^19 - 39038*u^20 + 118494*u^21 - 25866*u^22 + 67896*u^23 - 12165*u^24 + 27008*u^25 - 4147*u^26 + 7769*u^27 - 1017*u^28 + 1618*u^29 - 174*u^30 + 236*u^31 - 19*u^32 + 22*u^33 - u^34 + u^35", "-1 - 22*u + 107*u^2 + 2969*u^3 - 9100*u^4 - 62448*u^5 + 46400*u^6 + 746936*u^7 + 1761334*u^8 + 1863980*u^9 + 884754*u^10 + 427294*u^11 + 907186*u^12 + 551192*u^13 - 1004848*u^14 - 1762092*u^15 - 1197967*u^16 - 1047722*u^17 - 1667271*u^18 - 1400741*u^19 + 218418*u^20 + 1681408*u^21 + 1962292*u^22 + 1622760*u^23 + 1460269*u^24 + 1476234*u^25 + 1317911*u^26 + 922461*u^27 + 495825*u^28 + 204944*u^29 + 65040*u^30 + 15660*u^31 + 2783*u^32 + 346*u^33 + 27*u^34 + u^35", "2669 + 141046*u + 2414549*u^2 + 4996903*u^3 + 8920638*u^4 - 1200360*u^5 + 3088658*u^6 + 3724274*u^7 + 12038000*u^8 - 3889156*u^9 - 18627736*u^10 + 2191424*u^11 + 6252068*u^12 + 5065878*u^13 - 18955478*u^14 + 4783450*u^15 + 14645641*u^16 + 6154792*u^17 - 6374413*u^18 - 7448513*u^19 - 84974*u^20 + 3419824*u^21 + 1578922*u^22 - 447224*u^23 - 662741*u^24 - 85432*u^25 + 147169*u^26 + 51917*u^27 - 16025*u^28 - 9488*u^29 + 688*u^30 + 880*u^31 + 5*u^32 - 44*u^33 - u^34 + u^35", "2617 + 50474*u + 420957*u^2 + 2146509*u^3 + 7625752*u^4 + 20240516*u^5 + 42377064*u^6 + 71117174*u^7 + 94884266*u^8 + 97787936*u^9 + 69090088*u^10 + 36733752*u^11 - 3415714*u^12 - 44995398*u^13 - 87293676*u^14 - 141337920*u^15 - 162435253*u^16 - 114929788*u^17 - 39155333*u^18 + 47263251*u^19 + 70340926*u^20 + 50256992*u^21 + 33578112*u^22 + 16357480*u^23 + 6941097*u^24 + 3012372*u^25 + 766179*u^26 + 293197*u^27 + 44277*u^28 + 27458*u^29 + 2084*u^30 + 1762*u^31 + 21*u^32 + 68*u^33 - u^34 + u^35", "205619 - 1200960*u + 3789349*u^2 - 7016611*u^3 + 5757536*u^4 + 3709696*u^5 - 13169580*u^6 + 2334170*u^7 + 26429752*u^8 - 16946434*u^9 - 41440830*u^10 + 41249624*u^11 + 35350636*u^12 - 41657468*u^13 - 30517024*u^14 + 33401958*u^15 + 22822249*u^16 - 23777980*u^17 - 11431745*u^18 + 13224891*u^19 + 3445182*u^20 - 5232428*u^21 - 641360*u^22 + 1587452*u^23 + 4955*u^24 - 358974*u^25 + 35717*u^26 + 57381*u^27 - 10257*u^28 - 6340*u^29 + 1476*u^30 + 488*u^31 - 119*u^32 - 26*u^33 + 5*u^34 + u^35", "3433 + 21082*u + 497421*u^2 + 813533*u^3 + 7872572*u^4 + 35480268*u^5 + 89992944*u^6 + 139894308*u^7 + 115975490*u^8 + 10490704*u^9 - 82774818*u^10 - 76161892*u^11 + 13187030*u^12 + 77793984*u^13 + 34737212*u^14 - 42398874*u^15 - 34427529*u^16 + 17761156*u^17 + 19418509*u^18 - 6239847*u^19 - 7529666*u^20 + 2121488*u^21 + 2149804*u^22 - 696006*u^23 - 444809*u^24 + 201172*u^25 + 59555*u^26 - 44689*u^27 - 2353*u^28 + 6704*u^29 - 800*u^30 - 554*u^31 + 153*u^32 + 12*u^33 - 9*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "1 + 14*u + 173*u^2 + 1057*u^3 + 4716*u^4 + 16500*u^5 + 34988*u^6 + 41186*u^7 + 69614*u^8 + 213202*u^9 + 330304*u^10 + 216916*u^11 + 313738*u^12 + 851712*u^13 + 881280*u^14 + 385766*u^15 + 651591*u^16 + 1200600*u^17 + 663973*u^18 - 132181*u^19 - 64742*u^20 + 174448*u^21 + 30748*u^22 - 76990*u^23 - 9713*u^24 + 20664*u^25 - 2681*u^26 - 7661*u^27 + 7*u^28 + 1512*u^29 + 136*u^30 - 142*u^31 + 21*u^32 + 40*u^33 + 11*u^34 + u^35" ], "Multiplicity":1, "ij_list":[ [ "{1, 8}", "{2, 7}", "{2, 8}" ], [ "{1, 2}", "{7, 8}", "{7, 9}" ], [ "{6, 8}", "{8, 9}" ], [ "{1, 6}", "{1, 7}", "{2, 9}", "{3, 9}" ], [ "{1, 9}", "{2, 6}", "{3, 7}" ], [ "{2, 3}", "{6, 7}" ], [ "{3, 8}" ], [ "{1, 3}", "{3, 10}", "{6, 9}" ], [ "{3, 6}", "{4, 5}", "{4, 6}", "{9, 10}" ], [ "{7, 10}" ], [ "{1, 4}", "{2, 10}" ], [ "{4, 8}", "{8, 10}" ], [ "{1, 10}", "{2, 4}" ], [ "{4, 7}" ], [ "{4, 9}", "{6, 10}" ], [ "{3, 4}", "{5, 6}" ], [ "{1, 5}" ], [ "{5, 8}" ], [ "{2, 5}" ], [ "{5, 7}" ], [ "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{3, 5}" ] ], "SortedReprnIndices":"{33, 32, 9, 10, 3, 4, 20, 19, 30, 31, 21, 22, 23, 24, 16, 15, 6, 5, 25, 26, 27, 28, 7, 8, 2, 1, 35, 34, 12, 11, 14, 13, 18, 17, 29}", "aCuspShapeN":[ "-4.189596590820495275`5.040476859788579 + 3.4033308236246610106`4.950208819398093*I", "-4.189596590820495275`5.040476859788579 - 3.4033308236246610106`4.950208819398093*I", "-2.0359107084452572022`4.5075032850567425 - 8.7142508613949514354`5.1389746164130905*I", "-2.0359107084452572022`4.5075032850567425 + 8.7142508613949514354`5.1389746164130905*I", "-9.4344547807967032436`5.127861318894449 + 3.1284867671677248555`4.64847883398565*I", "-9.4344547807967032436`5.127861318894449 - 3.1284867671677248555`4.64847883398565*I", "4.6146133588071094826`5.019408948668274 - 4.2015623365346922967`4.978684441035058*I", "4.6146133588071094826`5.019408948668274 + 4.2015623365346922967`4.978684441035058*I", "-3.6260669493690011285`4.893866803274191 - 5.4518871965256941459`5.070977846296412*I", "-3.6260669493690011285`4.893866803274191 + 5.4518871965256941459`5.070977846296412*I", "-5.1773363417067475463`5.149428135963052 + 0.3667414987629768414`3.999681811940615*I", "-5.1773363417067475463`5.149428135963052 - 0.3667414987629768414`3.999681811940615*I", "-4.4321425527169439555`4.951106909475018 + 5.4373714140727931992`5.039882188799599*I", "-4.4321425527169439555`4.951106909475018 - 5.4373714140727931992`5.039882188799599*I", "0.2024106201011990395`4.05226035001246 + 2.529894254640326075`5.149129423409719*I", "0.2024106201011990395`4.05226035001246 - 2.529894254640326075`5.149129423409719*I", "-3.0603816838754864442`5.147657376279711 - 0.3522339153313362393`4.208712952487046*I", "-3.0603816838754864442`5.147657376279711 + 0.3522339153313362393`4.208712952487046*I", "-1.6015810150365064985`4.502464370912688 + 6.9395428206983088195`5.139246318763328*I", "-1.6015810150365064985`4.502464370912688 - 6.9395428206983088195`5.139246318763328*I", "-8.864583229099664307`5.114351642109975 - 3.7735324311782090022`4.743441407007602*I", "-8.864583229099664307`5.114351642109975 + 3.7735324311782090022`4.743441407007602*I", "-8.1097164424811668173`5.134711991913667 - 2.2281672334427738819`4.573654105988249*I", "-8.1097164424811668173`5.134711991913667 + 2.2281672334427738819`4.573654105988249*I", "2.039694275926728305`4.818392091724184 - 3.8785244196143256622`5.097493544760586*I", "2.039694275926728305`4.818392091724184 + 3.8785244196143256622`5.097493544760586*I", "-9.2611048816981401904`5.129538494183798 - 2.9493402094229246447`4.632600563339912*I", "-9.2611048816981401904`5.129538494183798 + 2.9493402094229246447`4.632600563339912*I", -5.7768, "-8.1965053111130733209`5.11309371693094 - 3.5545953449033431805`4.75025516010432*I", "-8.1965053111130733209`5.11309371693094 + 3.5545953449033431805`4.75025516010432*I", "-6.5965563016122780269`4.938360813028593 + 8.4900809364546801783`5.04795536995428*I", "-6.5965563016122780269`4.938360813028593 - 8.4900809364546801783`5.04795536995428*I", "-0.3823962567045186518`4.21643417002573 + 3.2631173464401423113`5.147553229659758*I", "-0.3823962567045186518`4.21643417002573 - 3.2631173464401423113`5.147553229659758*I" ], "Abelian":false }, { "IdealName":"abJ10_41_1", "Generators":[ "-1 + v" ], "VariableOrder":[ "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.7325999999999995e-2, "TimingZeroDimVars":1.802e-2, "TimingmagmaVCompNormalize":1.9147e-2, "TimingNumberOfSols":1.7734e-2, "TimingIsRadical":1.492e-3, "TimingArcColoring":4.7617000000000013e-2, "TimingObstruction":4.42e-4, "TimingComplexVolumeN":0.313786, "TimingaCuspShapeN":4.764e-3, "TiminguValues":0.642832, "TiminguPolysN":1.1100000000000001e-4, "TiminguPolys":0.807018, "TimingaCuspShape":8.644600000000001e-2, "TimingRepresentationsN":2.1232e-2, "TiminguValues_ij":0.140314, "TiminguPoly_ij":0.139147, "TiminguPolys_ij_N":2.9e-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 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "1 - 2*u + 13*u^2 - 11*u^3 - 116*u^4 + 496*u^5 - 908*u^6 + 188*u^7 + 3794*u^8 - 12384*u^9 + 22282*u^10 - 21218*u^11 - 13086*u^12 + 107156*u^13 - 279392*u^14 + 526268*u^15 - 815281*u^16 + 1090638*u^17 - 1290909*u^18 + 1370919*u^19 - 1317458*u^20 + 1151728*u^21 - 918660*u^22 + 669436*u^23 - 445585*u^24 + 270482*u^25 - 149287*u^26 + 74569*u^27 - 33485*u^28 + 13392*u^29 - 4708*u^30 + 1428*u^31 - 363*u^32 + 74*u^33 - 11*u^34 + u^35", "1 + 10*u + 75*u^2 + 83*u^3 + 92*u^4 - 86*u^5 - 212*u^6 + 184*u^7 - 260*u^8 - 566*u^9 + 592*u^10 + 608*u^11 - 160*u^12 - 2*u^13 - 140*u^14 - 418*u^15 + 67*u^16 + 106*u^17 - 405*u^18 + 529*u^19 + 828*u^20 - 1078*u^21 - 556*u^22 + 1366*u^23 - 53*u^24 - 1230*u^25 + 309*u^26 + 769*u^27 - 211*u^28 - 324*u^29 + 72*u^30 + 88*u^31 - 13*u^32 - 14*u^33 + u^34 + u^35", "1 - 2*u + 3*u^2 - 3*u^3 + 2*u^4 - 6*u^6 + 14*u^7 - 28*u^8 + 34*u^9 - 40*u^10 + 38*u^11 - 4*u^12 - 6*u^13 + 84*u^14 - 104*u^15 + 149*u^16 - 176*u^17 + 99*u^18 - 109*u^19 - 60*u^20 + 104*u^21 - 218*u^22 + 316*u^23 - 269*u^24 + 376*u^25 - 209*u^26 + 281*u^27 - 111*u^28 + 142*u^29 - 40*u^30 + 48*u^31 - 9*u^32 + 10*u^33 - u^34 + u^35", "-1 - 2*u - u^2 + 9*u^3 + 32*u^4 + 52*u^5 - 32*u^6 - 328*u^7 - 646*u^8 - 168*u^9 + 2022*u^10 + 4934*u^11 + 3978*u^12 - 5968*u^13 - 21376*u^14 - 24584*u^15 + 3169*u^16 + 54018*u^17 + 83717*u^18 + 46523*u^19 - 50914*u^20 - 139284*u^21 - 143212*u^22 - 50168*u^23 + 80101*u^24 + 170754*u^25 + 186787*u^26 + 145981*u^27 + 88109*u^28 + 42112*u^29 + 15988*u^30 + 4764*u^31 + 1083*u^32 + 178*u^33 + 19*u^34 + u^35", "1 + 2*u + 3*u^2 - u^3 - 10*u^5 - 14*u^6 - 16*u^7 - 38*u^8 + 4*u^9 - 60*u^10 + 80*u^11 - 56*u^12 + 220*u^13 - 10*u^14 + 392*u^15 + 65*u^16 + 536*u^17 + 141*u^18 + 595*u^19 + 184*u^20 + 550*u^21 + 180*u^22 + 428*u^23 + 141*u^24 + 280*u^25 + 89*u^26 + 153*u^27 + 45*u^28 + 68*u^29 + 18*u^30 + 24*u^31 + 5*u^32 + 6*u^33 + u^34 + u^35", "13 - 54*u + 75*u^2 - 143*u^3 + 508*u^4 - 836*u^5 + 464*u^6 - 76*u^7 + 970*u^8 - 714*u^9 - 1502*u^10 + 2410*u^11 - 658*u^12 + 1650*u^13 - 3608*u^14 + 1602*u^15 + 59*u^16 + 962*u^17 - 135*u^18 - 2577*u^19 + 1206*u^20 + 1248*u^21 + 436*u^22 - 1554*u^23 - 105*u^24 + 1080*u^25 - 193*u^26 - 317*u^27 + 23*u^28 + 176*u^29 - 72*u^30 - 10*u^31 + 5*u^32 + 8*u^33 - 5*u^34 + u^35" ], "RileyPolyC":[ "-1 - 2*y - y^2 + 9*y^3 + 32*y^4 + 52*y^5 - 32*y^6 - 328*y^7 - 646*y^8 - 168*y^9 + 2022*y^10 + 4934*y^11 + 3978*y^12 - 5968*y^13 - 21376*y^14 - 24584*y^15 + 3169*y^16 + 54018*y^17 + 83717*y^18 + 46523*y^19 - 50914*y^20 - 139284*y^21 - 143212*y^22 - 50168*y^23 + 80101*y^24 + 170754*y^25 + 186787*y^26 + 145981*y^27 + 88109*y^28 + 42112*y^29 + 15988*y^30 + 4764*y^31 + 1083*y^32 + 178*y^33 + 19*y^34 + y^35", "-1 - 50*y - 4149*y^2 - 8207*y^3 + 13260*y^4 + 103444*y^5 - 199028*y^6 + 37208*y^7 - 87842*y^8 + 733696*y^9 - 1035178*y^10 + 362606*y^11 + 201570*y^12 + 79948*y^13 - 648716*y^14 + 1445148*y^15 - 2647943*y^16 + 3210626*y^17 - 2385391*y^18 + 1361871*y^19 - 1526078*y^20 + 2644460*y^21 - 3759040*y^22 + 4435936*y^23 - 4580203*y^24 + 4069878*y^25 - 2996681*y^26 + 1781977*y^27 - 844479*y^28 + 316016*y^29 - 92304*y^30 + 20648*y^31 - 3425*y^32 + 398*y^33 - 29*y^34 + y^35", "-1 - 22*y + 107*y^2 + 2969*y^3 - 9100*y^4 - 62448*y^5 + 46400*y^6 + 746936*y^7 + 1761334*y^8 + 1863980*y^9 + 884754*y^10 + 427294*y^11 + 907186*y^12 + 551192*y^13 - 1004848*y^14 - 1762092*y^15 - 1197967*y^16 - 1047722*y^17 - 1667271*y^18 - 1400741*y^19 + 218418*y^20 + 1681408*y^21 + 1962292*y^22 + 1622760*y^23 + 1460269*y^24 + 1476234*y^25 + 1317911*y^26 + 922461*y^27 + 495825*y^28 + 204944*y^29 + 65040*y^30 + 15660*y^31 + 2783*y^32 + 346*y^33 + 27*y^34 + y^35", "-1 - 2*y - 13*y^2 - 11*y^3 + 116*y^4 + 496*y^5 + 908*y^6 + 188*y^7 - 3794*y^8 - 12384*y^9 - 22282*y^10 - 21218*y^11 + 13086*y^12 + 107156*y^13 + 279392*y^14 + 526268*y^15 + 815281*y^16 + 1090638*y^17 + 1290909*y^18 + 1370919*y^19 + 1317458*y^20 + 1151728*y^21 + 918660*y^22 + 669436*y^23 + 445585*y^24 + 270482*y^25 + 149287*y^26 + 74569*y^27 + 33485*y^28 + 13392*y^29 + 4708*y^30 + 1428*y^31 + 363*y^32 + 74*y^33 + 11*y^34 + y^35", "-1 - 22*y + 107*y^2 + 2969*y^3 - 9100*y^4 - 62448*y^5 + 46400*y^6 + 746936*y^7 + 1761334*y^8 + 1863980*y^9 + 884754*y^10 + 427294*y^11 + 907186*y^12 + 551192*y^13 - 1004848*y^14 - 1762092*y^15 - 1197967*y^16 - 1047722*y^17 - 1667271*y^18 - 1400741*y^19 + 218418*y^20 + 1681408*y^21 + 1962292*y^22 + 1622760*y^23 + 1460269*y^24 + 1476234*y^25 + 1317911*y^26 + 922461*y^27 + 495825*y^28 + 204944*y^29 + 65040*y^30 + 15660*y^31 + 2783*y^32 + 346*y^33 + 27*y^34 + y^35", "-1 - 50*y - 4149*y^2 - 8207*y^3 + 13260*y^4 + 103444*y^5 - 199028*y^6 + 37208*y^7 - 87842*y^8 + 733696*y^9 - 1035178*y^10 + 362606*y^11 + 201570*y^12 + 79948*y^13 - 648716*y^14 + 1445148*y^15 - 2647943*y^16 + 3210626*y^17 - 2385391*y^18 + 1361871*y^19 - 1526078*y^20 + 2644460*y^21 - 3759040*y^22 + 4435936*y^23 - 4580203*y^24 + 4069878*y^25 - 2996681*y^26 + 1781977*y^27 - 844479*y^28 + 316016*y^29 - 92304*y^30 + 20648*y^31 - 3425*y^32 + 398*y^33 - 29*y^34 + y^35", "-1 - 2*y - y^2 + 9*y^3 + 32*y^4 + 52*y^5 - 32*y^6 - 328*y^7 - 646*y^8 - 168*y^9 + 2022*y^10 + 4934*y^11 + 3978*y^12 - 5968*y^13 - 21376*y^14 - 24584*y^15 + 3169*y^16 + 54018*y^17 + 83717*y^18 + 46523*y^19 - 50914*y^20 - 139284*y^21 - 143212*y^22 - 50168*y^23 + 80101*y^24 + 170754*y^25 + 186787*y^26 + 145981*y^27 + 88109*y^28 + 42112*y^29 + 15988*y^30 + 4764*y^31 + 1083*y^32 + 178*y^33 + 19*y^34 + y^35", "-1 + 2*y + 27*y^2 - 127*y^3 - 132*y^4 + 2272*y^5 - 4552*y^6 - 2752*y^7 + 35342*y^8 - 78884*y^9 + 32498*y^10 + 240982*y^11 - 331286*y^12 + 136632*y^13 - 725616*y^14 + 2305668*y^15 - 1859495*y^16 + 3404574*y^17 - 4198151*y^18 + 3752715*y^19 - 4077078*y^20 + 3190080*y^21 - 2546252*y^22 + 1807480*y^23 - 1049555*y^24 + 631530*y^25 - 274009*y^26 + 135277*y^27 - 44223*y^28 + 17736*y^29 - 4264*y^30 + 1380*y^31 - 225*y^32 + 58*y^33 - 5*y^34 + y^35", "-1 - 2*y - 13*y^2 - 11*y^3 + 116*y^4 + 496*y^5 + 908*y^6 + 188*y^7 - 3794*y^8 - 12384*y^9 - 22282*y^10 - 21218*y^11 + 13086*y^12 + 107156*y^13 + 279392*y^14 + 526268*y^15 + 815281*y^16 + 1090638*y^17 + 1290909*y^18 + 1370919*y^19 + 1317458*y^20 + 1151728*y^21 + 918660*y^22 + 669436*y^23 + 445585*y^24 + 270482*y^25 + 149287*y^26 + 74569*y^27 + 33485*y^28 + 13392*y^29 + 4708*y^30 + 1428*y^31 + 363*y^32 + 74*y^33 + 11*y^34 + y^35", "-169 + 966*y - 3389*y^2 + 22473*y^3 - 105580*y^4 + 219872*y^5 - 887412*y^6 + 1150504*y^7 - 2904758*y^8 + 4007500*y^9 - 4069950*y^10 + 7115230*y^11 - 2909774*y^12 + 1852888*y^13 - 217432*y^14 - 6643160*y^15 + 5418533*y^16 - 3087086*y^17 + 1843649*y^18 + 5307371*y^19 - 9056250*y^20 + 10188824*y^21 - 10006628*y^22 + 7683500*y^23 - 4999599*y^24 + 2776086*y^25 - 1279041*y^26 + 528001*y^27 - 178463*y^28 + 55680*y^29 - 13776*y^30 + 3232*y^31 - 553*y^32 + 94*y^33 - 9*y^34 + y^35" ] }, "GeometricRepresentation":[ 1.23766e1, [ "J10_41_0", 1, "{32, 33}" ] ] } }