{ "Index":135, "Name":"10_51", "RolfsenName":"10_51", "DTname":"10a_16", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{17, -11, -13, -15, -19, -7, -5, 1, -9, 3}", "Acode":"{9, -6, -7, -8, -10, -4, -3, 1, -5, 2}", "PDcode":[ "{2, 18, 3, 17}", "{4, 11, 5, 12}", "{6, 13, 7, 14}", "{8, 15, 9, 16}", "{10, 19, 11, 20}", "{12, 7, 13, 8}", "{14, 5, 15, 6}", "{16, 2, 17, 1}", "{18, 9, 19, 10}", "{20, 4, 1, 3}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{6, 4, 10}", [], [ "{6, -4, 7, 1}", "{4, -7, 3, 2}", "{7, -3, 8, 1}", "{3, -6, 2, 2}", "{6, -10, 5, 2}", "{10, -5, 9, 2}", "{2, 9, 1, 2}" ], "{4, 10}", "{8}", 8 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 - a*b + u + 2*u^3 + u^5", "-b^2 + u - 2*u^3 - 3*u^5 - u^7", "a + 2*u - a^2*u + b^2*u + 2*a^2*b^2*u + 2*a*b^3*u - 2*b^4*u - a^2*b^4*u - 2*a*b^5*u - 2*a*u^2 - 4*b*u^2 + u^3 - a^2*u^3 + a*b*u^3 + 2*a^2*b^2*u^3 - b^4*u^3 - a^2*b^4*u^3 - a*b^5*u^3 - 3*a*u^4 - 4*b*u^4 - a*u^6 - b*u^6", "b - u - a*b*u - b^2*u + 2*a*b^3*u + 3*b^4*u - a*b^5*u - 2*b^6*u + a*u^2 + 2*b*u^2 - u^3 - a*b*u^3 + 2*a*b^3*u^3 + b^4*u^3 - a*b^5*u^3 - b^6*u^3 + 2*a*u^4 + 3*b*u^4 + a*u^6 + b*u^6" ], "TimingForPrimaryIdeals":0.124401 }, "v":{ "CheckEq":[ "-b^2", "-1 - a*b + v", "b + b^2*v - 2*b^4*v + b^6*v", "a - v + a*b*v - b^2*v - 2*a*b^3*v + b^4*v + a*b^5*v - b*v^2" ], "TimingForPrimaryIdeals":7.5161e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_51_0", "Generators":[ "-1 + b - 7*u^2 + 23*u^3 - 8*u^4 - 18*u^5 + 62*u^6 - 58*u^7 + 104*u^8 + 22*u^9 - 68*u^10 + 166*u^11 - 164*u^12 + 188*u^13 - 94*u^14 - 286*u^15 - 361*u^16 - 1014*u^17 - 619*u^18 - 789*u^19 + 96*u^20 + 700*u^21 + 1378*u^22 + 2034*u^23 + 1899*u^24 + 2070*u^25 + 1387*u^26 + 1237*u^27 + 623*u^28 + 472*u^29 + 174*u^30 + 114*u^31 + 28*u^32 + 16*u^33 + 2*u^34 + u^35", "1 + a + 4*u - 2*u^2 - 24*u^3 + 38*u^4 - 46*u^5 - 2*u^6 + 50*u^7 - 220*u^8 + 210*u^9 - 212*u^10 - 40*u^11 + 218*u^12 - 608*u^13 + 682*u^14 - 164*u^15 + 861*u^16 + 1386*u^17 + 438*u^18 + 1690*u^19 - 756*u^20 - 380*u^21 - 1968*u^22 - 2690*u^23 - 2189*u^24 - 3094*u^25 - 1472*u^26 - 1974*u^27 - 637*u^28 - 794*u^29 - 175*u^30 - 202*u^31 - 28*u^32 - 30*u^33 - 2*u^34 - 2*u^35", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":7.1893e-2, "TimingZeroDimVars":0.10295, "TimingmagmaVCompNormalize":0.104389, "TimingNumberOfSols":0.391769, "TimingIsRadical":4.1329000000000005e-2, "TimingArcColoring":6.7218e-2, "TimingObstruction":0.108549, "TimingComplexVolumeN":3.7909364000000004e1, "TimingaCuspShapeN":0.25761, "TiminguValues":0.675204, "TiminguPolysN":0.157518, "TiminguPolys":0.971115, "TimingaCuspShape":0.183996, "TimingRepresentationsN":0.376815, "TiminguValues_ij":0.193951, "TiminguPoly_ij":2.481098, "TiminguPolys_ij_N":0.265777 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":36, "IsRadical":true, "ArcColoring":[ [ "-5*u + 5*u^2 + 9*u^3 - 25*u^4 + 40*u^5 - 25*u^6 - 10*u^7 + 119*u^8 - 150*u^9 + 190*u^10 - 44*u^11 - 72*u^12 + 324*u^13 - 468*u^14 + 182*u^15 - 578*u^16 - 601*u^17 - 167*u^18 - 803*u^19 + 609*u^20 + 200*u^21 + 1209*u^22 + 1346*u^23 + 1213*u^24 + 1547*u^25 + 773*u^26 + 987*u^27 + 325*u^28 + 397*u^29 + 88*u^30 + 101*u^31 + 14*u^32 + 15*u^33 + u^34 + u^35", "4*u^2 - 6*u^3 + 2*u^4 + 12*u^5 - 22*u^6 + 28*u^7 - 19*u^8 - 6*u^9 + 44*u^10 - 44*u^11 + 64*u^12 - 38*u^13 - 20*u^14 - 14*u^15 - 100*u^16 - 2*u^17 - 92*u^18 - 42*u^20 - 10*u^22 - u^24" ], [ "-2*u - u^3", "u + u^3" ], [ "-u", "u + u^3" ], [ 0, "u" ], [ "u + 2*u^3 + u^5", "u - 2*u^3 - 3*u^5 - u^7" ], "{1, 0}", [ 1, "-u^2" ], [ "1 + u^2", "-2*u^2 - u^4" ], [ "-4*u + 6*u^2 - 2*u^3 - 12*u^4 + 22*u^5 - 28*u^6 + 19*u^7 + 6*u^8 - 44*u^9 + 44*u^10 - 64*u^11 + 38*u^12 + 20*u^13 + 14*u^14 + 100*u^15 + 2*u^16 + 92*u^17 + 42*u^19 + 10*u^21 + u^23", "-1 - u + 2*u^2 + 13*u^3 - 8*u^4 + 9*u^5 + 20*u^6 - 7*u^7 + 92*u^8 - 17*u^9 + 64*u^10 + 46*u^11 - 56*u^12 + 126*u^13 - 292*u^14 - 248*u^15 - 721*u^16 - 951*u^17 - 728*u^18 - 755*u^19 + 324*u^20 + 709*u^21 + 1684*u^22 + 2035*u^23 + 2083*u^24 + 2070*u^25 + 1450*u^26 + 1237*u^27 + 635*u^28 + 472*u^29 + 175*u^30 + 114*u^31 + 28*u^32 + 16*u^33 + 2*u^34 + u^35" ], [ "-1 - 4*u + 2*u^2 + 24*u^3 - 38*u^4 + 46*u^5 + 2*u^6 - 50*u^7 + 220*u^8 - 210*u^9 + 212*u^10 + 40*u^11 - 218*u^12 + 608*u^13 - 682*u^14 + 164*u^15 - 861*u^16 - 1386*u^17 - 438*u^18 - 1690*u^19 + 756*u^20 + 380*u^21 + 1968*u^22 + 2690*u^23 + 2189*u^24 + 3094*u^25 + 1472*u^26 + 1974*u^27 + 637*u^28 + 794*u^29 + 175*u^30 + 202*u^31 + 28*u^32 + 30*u^33 + 2*u^34 + 2*u^35", "1 + 7*u^2 - 23*u^3 + 8*u^4 + 18*u^5 - 62*u^6 + 58*u^7 - 104*u^8 - 22*u^9 + 68*u^10 - 166*u^11 + 164*u^12 - 188*u^13 + 94*u^14 + 286*u^15 + 361*u^16 + 1014*u^17 + 619*u^18 + 789*u^19 - 96*u^20 - 700*u^21 - 1378*u^22 - 2034*u^23 - 1899*u^24 - 2070*u^25 - 1387*u^26 - 1237*u^27 - 623*u^28 - 472*u^29 - 174*u^30 - 114*u^31 - 28*u^32 - 16*u^33 - 2*u^34 - u^35" ] ], "Obstruction":-1, "ComplexVolumeN":[ "5.69474 - 8.30646*I", "5.69474 + 8.30646*I", "7.51295 - 2.38075*I", "7.51295 + 2.38075*I", "2.65006 + 3.86936*I", "2.65006 - 3.86936*I", "2.25781 + 2.29689*I", "2.25781 - 2.29689*I", "4.08196 - 2.0296*I", "4.08196 + 2.0296*I", 0.763718, "-1.35734 + 1.63914*I", "-1.35734 - 1.63914*I", "-3.23258 + 1.97104*I", "-3.23258 - 1.97104*I", "0.90728 + 4.09703*I", "0.90728 - 4.09703*I", "-6.4786 - 1.1661*I", "-6.4786 + 1.1661*I", "-3.22138 - 3.79621*I", "-3.22138 + 3.79621*I", "-1.97731 + 6.30262*I", "-1.97731 - 6.30262*I", "1.46636 - 0.53351*I", "1.46636 + 0.53351*I", "3.14977 - 6.72875*I", "3.14977 + 6.72875*I", "-3.87079 + 2.11524*I", "-3.87079 - 2.11524*I", "1.04241 - 12.6314*I", "1.04241 + 12.6314*I", "-5.27687 + 5.74916*I", "-5.27687 - 5.74916*I", 0.789103, "-1.65748 - 0.63628*I", "-1.65748 + 0.63628*I" ], "uPolysN":[ "-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36", "-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36", "8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36", "8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "1 + 24*u + 30*u^2 - 296*u^3 - 1571*u^4 - 2856*u^5 + 3796*u^6 + 42364*u^7 + 160242*u^8 + 426572*u^9 + 916408*u^10 + 1684116*u^11 + 2735340*u^12 + 4008896*u^13 + 5375566*u^14 + 6657410*u^15 + 7664243*u^16 + 8238586*u^17 + 8294038*u^18 + 7834644*u^19 + 6949673*u^20 + 5787912*u^21 + 4520666*u^22 + 3304558*u^23 + 2253819*u^24 + 1428042*u^25 + 835636*u^26 + 448078*u^27 + 217968*u^28 + 94988*u^29 + 36507*u^30 + 12131*u^31 + 3395*u^32 + 771*u^33 + 134*u^34 + 16*u^35 + u^36" ], "uPolys":[ "-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36", "-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36", "8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36", "-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36", "8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "1 + 24*u + 30*u^2 - 296*u^3 - 1571*u^4 - 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674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "8 - 4*u - 120*u^2 - 1429*u^3 - 8379*u^4 - 25400*u^5 - 31286*u^6 + 94640*u^7 + 531396*u^8 + 1160308*u^9 + 1769284*u^10 + 1952240*u^11 + 1734236*u^12 + 1258576*u^13 + 785900*u^14 + 481742*u^15 - 126952*u^16 - 343662*u^17 - 471314*u^18 - 497243*u^19 - 210453*u^20 - 187338*u^21 + 89604*u^22 + 29452*u^23 + 140264*u^24 + 55954*u^25 + 71758*u^26 + 24815*u^27 + 21025*u^28 + 6070*u^29 + 3904*u^30 + 899*u^31 + 461*u^32 + 77*u^33 + 32*u^34 + 3*u^35 + u^36", "-479 + 836*u + 6599*u^2 + 67267*u^3 + 77937*u^4 + 86098*u^5 - 476376*u^6 + 403378*u^7 + 1727642*u^8 - 2687246*u^9 + 3020580*u^10 + 24271344*u^11 + 30166444*u^12 - 1199070*u^13 - 28110702*u^14 - 27626716*u^15 + 9673841*u^16 + 67082942*u^17 + 97884525*u^18 + 86402279*u^19 + 61831033*u^20 + 42601094*u^21 + 27747890*u^22 + 15435850*u^23 + 7394823*u^24 + 3313032*u^25 + 1442171*u^26 + 545487*u^27 + 158942*u^28 + 37216*u^29 + 10142*u^30 + 3220*u^31 + 720*u^32 + 95*u^33 + 21*u^34 + 7*u^35 + u^36", "-8803 - 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503941*u^29 + 191480*u^30 - 58806*u^31 + 14101*u^32 - 2538*u^33 + 323*u^34 - 26*u^35 + u^36", "64 - 784*u + 4008*u^2 - 13337*u^3 + 39509*u^4 - 117728*u^5 + 320092*u^6 - 716612*u^7 + 1248136*u^8 - 1583204*u^9 + 1218352*u^10 + 29738*u^11 - 1572818*u^12 + 2300356*u^13 - 1496088*u^14 - 381722*u^15 + 1875222*u^16 - 1754538*u^17 + 255908*u^18 + 1117901*u^19 - 1195761*u^20 + 265696*u^21 + 543056*u^22 - 606882*u^23 + 211646*u^24 + 96490*u^25 - 123580*u^26 + 12457*u^27 + 67279*u^28 - 73774*u^29 + 45448*u^30 - 19375*u^31 + 6005*u^32 - 1351*u^33 + 212*u^34 - 21*u^35 + u^36", "1 + 3*u + 7*u^2 - 10*u^3 - 21*u^4 + 30*u^5 - 10*u^6 + 6*u^7 - 1196*u^8 - 1916*u^9 - 4014*u^10 - 10058*u^11 - 6768*u^12 - 24504*u^13 + 40654*u^14 + 17632*u^15 + 202137*u^16 + 124131*u^17 + 372763*u^18 + 204296*u^19 + 391937*u^20 + 191336*u^21 + 270834*u^22 + 118824*u^23 + 131913*u^24 + 51579*u^25 + 46861*u^26 + 15922*u^27 + 12234*u^28 + 3457*u^29 + 2312*u^30 + 508*u^31 + 303*u^32 + 46*u^33 + 25*u^34 + 2*u^35 + u^36", "1 - 3*u + 31*u^2 + 342*u^3 + 155*u^4 + 5456*u^5 + 31592*u^6 + 28894*u^7 + 11072*u^8 - 141468*u^9 - 279764*u^10 - 659650*u^11 - 666054*u^12 - 1140948*u^13 - 728680*u^14 - 1132518*u^15 - 489319*u^16 - 702395*u^17 - 218649*u^18 - 265650*u^19 - 57821*u^20 - 40846*u^21 + 614*u^22 + 16226*u^23 + 10447*u^24 + 12461*u^25 + 6811*u^26 + 3976*u^27 + 2660*u^28 + 787*u^29 + 696*u^30 + 100*u^31 + 125*u^32 + 6*u^33 + 15*u^34 + u^36", "-3559 - 34439*u - 123421*u^2 - 127138*u^3 + 319973*u^4 + 1064758*u^5 + 968772*u^6 + 22258*u^7 + 396806*u^8 + 2555388*u^9 + 3820754*u^10 + 3604294*u^11 + 3147010*u^12 + 2125972*u^13 + 1525952*u^14 + 1225900*u^15 + 797743*u^16 + 553437*u^17 + 58653*u^18 + 127314*u^19 - 137385*u^20 - 48398*u^21 + 22446*u^22 - 72900*u^23 + 95657*u^24 - 34495*u^25 + 57605*u^26 - 8248*u^27 + 17876*u^28 - 1013*u^29 + 3374*u^30 - 50*u^31 + 403*u^32 + 29*u^34 + u^36", "-2243 - 9754*u - 2511*u^2 + 134309*u^3 + 600591*u^4 + 1892580*u^5 + 4948312*u^6 + 10386964*u^7 + 17401710*u^8 + 23284404*u^9 + 26119944*u^10 + 24882222*u^11 + 21560372*u^12 + 16584436*u^13 + 12569564*u^14 + 8228126*u^15 + 6123449*u^16 + 3347492*u^17 + 2857129*u^18 + 1134633*u^19 + 1285167*u^20 + 233314*u^21 + 501768*u^22 - 23782*u^23 + 169979*u^24 - 42130*u^25 + 48371*u^26 - 18055*u^27 + 11774*u^28 - 4598*u^29 + 2172*u^30 - 746*u^31 + 292*u^32 - 77*u^33 + 23*u^34 - 5*u^35 + u^36", "1 + 516*u + 11966*u^2 + 37196*u^3 - 707939*u^4 + 4032400*u^5 - 14939364*u^6 + 41484708*u^7 - 90918806*u^8 + 163686052*u^9 - 252780856*u^10 + 351313700*u^11 - 457037276*u^12 + 564200672*u^13 - 650599522*u^14 + 681219458*u^15 - 631347113*u^16 + 508912726*u^17 - 352271910*u^18 + 206729176*u^19 - 100564975*u^20 + 38395112*u^21 - 9418326*u^22 - 560874*u^23 + 2253599*u^24 - 1479458*u^25 + 587840*u^26 - 122158*u^27 - 17980*u^28 + 26384*u^29 - 10621*u^30 + 1927*u^31 + 219*u^32 - 241*u^33 + 74*u^34 - 12*u^35 + u^36", "-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36", "1 + 24*u + 30*u^2 - 296*u^3 - 1571*u^4 - 2856*u^5 + 3796*u^6 + 42364*u^7 + 160242*u^8 + 426572*u^9 + 916408*u^10 + 1684116*u^11 + 2735340*u^12 + 4008896*u^13 + 5375566*u^14 + 6657410*u^15 + 7664243*u^16 + 8238586*u^17 + 8294038*u^18 + 7834644*u^19 + 6949673*u^20 + 5787912*u^21 + 4520666*u^22 + 3304558*u^23 + 2253819*u^24 + 1428042*u^25 + 835636*u^26 + 448078*u^27 + 217968*u^28 + 94988*u^29 + 36507*u^30 + 12131*u^31 + 3395*u^32 + 771*u^33 + 134*u^34 + 16*u^35 + u^36", "-1 + 6*u - 6*u^2 - 2*u^3 + 55*u^4 - 96*u^5 - 756*u^6 + 2210*u^7 + 4874*u^8 - 9900*u^9 - 25642*u^10 + 28946*u^11 + 86008*u^12 + 40148*u^13 - 20192*u^14 - 141124*u^15 - 495249*u^16 - 65372*u^17 + 2001896*u^18 + 3664518*u^19 + 2279349*u^20 - 675306*u^21 - 1925600*u^22 - 974974*u^23 + 288079*u^24 + 527512*u^25 + 126900*u^26 - 102264*u^27 - 59272*u^28 + 4398*u^29 + 10019*u^30 + 1381*u^31 - 737*u^32 - 219*u^33 + 10*u^34 + 10*u^35 + u^36", "-105943 + 42368*u + 107386*u^2 + 155674*u^3 + 338487*u^4 + 1859984*u^5 + 2662914*u^6 + 3516820*u^7 + 5652324*u^8 + 7348904*u^9 + 7563054*u^10 + 10776702*u^11 + 8518286*u^12 + 10610874*u^13 + 8182398*u^14 + 7522320*u^15 + 6461967*u^16 + 4499718*u^17 + 3937536*u^18 + 2481222*u^19 + 1846639*u^20 + 1156800*u^21 + 674076*u^22 + 415040*u^23 + 191399*u^24 + 107148*u^25 + 44096*u^26 + 19668*u^27 + 8558*u^28 + 2606*u^29 + 1459*u^30 + 279*u^31 + 203*u^32 + 27*u^33 + 20*u^34 + 2*u^35 + u^36", "-1213 + 6319*u - 30205*u^2 + 68002*u^3 - 23235*u^4 - 43180*u^5 + 406478*u^6 + 147750*u^7 + 129036*u^8 + 1404976*u^9 + 57974*u^10 + 213470*u^11 + 2891788*u^12 + 1008450*u^13 - 818074*u^14 + 3724226*u^15 + 7706741*u^16 + 2083843*u^17 - 2489049*u^18 + 6881276*u^19 + 7148093*u^20 - 3986688*u^21 - 1931076*u^22 + 684994*u^23 + 490819*u^24 - 29075*u^25 - 78637*u^26 - 13956*u^27 + 14922*u^28 + 1589*u^29 - 1746*u^30 - 112*u^31 + 159*u^32 + 16*u^33 + 3*u^34 + 2*u^35 + u^36", "-209 + 362*u + 1761*u^2 - 373*u^3 - 7861*u^4 + 14934*u^6 + 3722*u^7 + 83674*u^8 + 181544*u^9 - 134134*u^10 - 506672*u^11 + 146268*u^12 + 917208*u^13 + 271328*u^14 + 671028*u^15 + 2388615*u^16 + 731304*u^17 - 2541613*u^18 - 2291233*u^19 + 345063*u^20 + 1841346*u^21 + 1906390*u^22 + 1809580*u^23 + 1007707*u^24 + 296718*u^25 + 273377*u^26 + 115621*u^27 + 41184*u^28 + 7144*u^29 + 5444*u^30 + 1472*u^31 + 470*u^32 + 57*u^33 + 25*u^34 + 5*u^35 + u^36", "8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36", "8 - 4*u - 120*u^2 - 1429*u^3 - 8379*u^4 - 25400*u^5 - 31286*u^6 + 94640*u^7 + 531396*u^8 + 1160308*u^9 + 1769284*u^10 + 1952240*u^11 + 1734236*u^12 + 1258576*u^13 + 785900*u^14 + 481742*u^15 - 126952*u^16 - 343662*u^17 - 471314*u^18 - 497243*u^19 - 210453*u^20 - 187338*u^21 + 89604*u^22 + 29452*u^23 + 140264*u^24 + 55954*u^25 + 71758*u^26 + 24815*u^27 + 21025*u^28 + 6070*u^29 + 3904*u^30 + 899*u^31 + 461*u^32 + 77*u^33 + 32*u^34 + 3*u^35 + u^36", "-479 + 836*u + 6599*u^2 + 67267*u^3 + 77937*u^4 + 86098*u^5 - 476376*u^6 + 403378*u^7 + 1727642*u^8 - 2687246*u^9 + 3020580*u^10 + 24271344*u^11 + 30166444*u^12 - 1199070*u^13 - 28110702*u^14 - 27626716*u^15 + 9673841*u^16 + 67082942*u^17 + 97884525*u^18 + 86402279*u^19 + 61831033*u^20 + 42601094*u^21 + 27747890*u^22 + 15435850*u^23 + 7394823*u^24 + 3313032*u^25 + 1442171*u^26 + 545487*u^27 + 158942*u^28 + 37216*u^29 + 10142*u^30 + 3220*u^31 + 720*u^32 + 95*u^33 + 21*u^34 + 7*u^35 + u^36", "-8803 - 827*u + 59191*u^2 + 94308*u^3 - 37171*u^4 - 150792*u^5 - 79594*u^6 - 174504*u^7 - 129322*u^8 + 540968*u^9 + 817630*u^10 - 242904*u^11 - 823600*u^12 + 496392*u^13 + 882792*u^14 - 554614*u^15 - 669729*u^16 + 598179*u^17 + 423553*u^18 - 718228*u^19 - 271255*u^20 + 641256*u^21 + 162544*u^22 - 368752*u^23 - 80139*u^24 + 146849*u^25 + 24833*u^26 - 42136*u^27 - 3462*u^28 + 8475*u^29 - 138*u^30 - 1140*u^31 + 117*u^32 + 96*u^33 - 17*u^34 - 4*u^35 + u^36" ], "Multiplicity":1, "ij_list":[ [ "{3, 7}", "{3, 8}", "{4, 6}", "{4, 7}" ], [ "{3, 4}", "{6, 7}", "{7, 8}" ], [ "{2, 6}", "{3, 6}", "{4, 8}", "{5, 8}" ], [ "{2, 4}", "{3, 5}", "{6, 8}" ], [ "{2, 7}", "{5, 7}" ], [ "{2, 3}", "{4, 5}" ], [ "{2, 8}", "{5, 6}", "{9, 10}" ], [ "{2, 5}" ], [ "{1, 5}" ], [ "{1, 6}", "{4, 9}" ], [ "{1, 3}" ], [ "{1, 10}" ], [ "{1, 8}", "{1, 9}", "{2, 9}" ], [ "{1, 2}", "{2, 10}", "{8, 9}" ], [ "{3, 10}", "{8, 10}" ], [ "{3, 9}" ], [ "{1, 7}" ], [ "{7, 10}" ], [ "{5, 9}", "{5, 10}", "{6, 10}" ], [ "{1, 4}", "{6, 9}" ], [ "{7, 9}" ], [ "{4, 10}" ] ], "SortedReprnIndices":"{31, 30, 2, 1, 27, 26, 22, 23, 32, 33, 16, 17, 5, 6, 21, 20, 4, 3, 7, 8, 28, 29, 10, 9, 14, 15, 12, 13, 19, 18, 36, 35, 25, 24, 34, 11}", "aCuspShapeN":[ "7.9015559763360010329`5.050064824613086 + 6.0599437057881206513`4.934820793305756*I", "7.9015559763360010329`5.050064824613086 - 6.0599437057881206513`4.934820793305756*I", "10.4843708931812686619`5.147385760687611 + 1.2631384465941765968`4.22829433873502*I", "10.4843708931812686619`5.147385760687611 - 1.2631384465941765968`4.22829433873502*I", "5.2455263509644782987`5.111632332641478 - 2.3228506238245748636`4.757864541994497*I", "5.2455263509644782987`5.111632332641478 + 2.3228506238245748636`4.757864541994497*I", "7.2165737056525532873`5.110830768688365 - 3.2315217389795002563`4.761906798929404*I", "7.2165737056525532873`5.110830768688365 + 3.2315217389795002563`4.761906798929404*I", "7.1623973450664377316`5.123321774175198 + 2.6160743617554166758`4.685913448295195*I", "7.1623973450664377316`5.123321774175198 - 2.6160743617554166758`4.685913448295195*I", 8.8655, "3.477937481429260271`5.1478894990037745 - 0.3835876354084498024`4.1904323276849915*I", "3.477937481429260271`5.1478894990037745 + 0.3835876354084498024`4.1904323276849915*I", "3.3734440148576025682`4.98663272844777 - 3.5812338451788617547`5.012591901607668*I", "3.3734440148576025682`4.98663272844777 + 3.5812338451788617547`5.012591901607668*I", "5.3064377334068544235`4.940605101682835 - 6.7730952282015711305`5.046589210900872*I", "5.3064377334068544235`4.940605101682835 + 6.7730952282015711305`5.046589210900872*I", "-2.7468485391080850824`5.148756776109683 + 0.2476703854354495051`4.103796142991366*I", "-2.7468485391080850824`5.148756776109683 - 0.2476703854354495051`4.103796142991366*I", "3.5241983581228926666`4.966854708491249 + 4.0640141022288596866`5.028749570259663*I", "3.5241983581228926666`4.966854708491249 - 4.0640141022288596866`5.028749570259663*I", "2.3005717717306014178`4.725888599571844 - 5.6667375068026365743`5.117385908752076*I", "2.3005717717306014178`4.725888599571844 + 5.6667375068026365743`5.117385908752076*I", "7.6481898665776582308`5.150232128418144 - 0.2761314975862352253`3.7077894159232265*I", "7.6481898665776582308`5.150232128418144 + 0.2761314975862352253`3.7077894159232265*I", "6.2184015757582924531`5.077121782193497 + 3.9432905309089176396`4.879301793331653*I", "6.2184015757582924531`5.077121782193497 - 3.9432905309089176396`4.879301793331653*I", "4.2914033667852969342`5.136164816084509 + 1.1216709797517869915`4.55343096230182*I", "4.2914033667852969342`5.136164816084509 - 1.1216709797517869915`4.55343096230182*I", "3.4212502229270928648`4.743690519489685 + 8.031576296713724222`5.114306470109271*I", "3.4212502229270928648`4.743690519489685 - 8.031576296713724222`5.114306470109271*I", "0``4.3425468329716415 - 6.4049123937635714638`5.149060026823577*I", "0``4.3425468329716415 + 6.4049123937635714638`5.149060026823577*I", 1.2773000000000001e1, "-3.1250351749288014774`5.098952385303187 + 1.617843220448497151`4.813033908591555*I", "-3.1250351749288014774`5.098952385303187 - 1.617843220448497151`4.813033908591555*I" ], "Abelian":false }, { "IdealName":"J10_51_1", "Generators":[ "b", "-1 + a - 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":7.2757e-2, "TimingZeroDimVars":6.6617e-2, "TimingmagmaVCompNormalize":6.7927e-2, "TimingNumberOfSols":3.7278e-2, "TimingIsRadical":2.0440000000000002e-3, "TimingArcColoring":5.9657999999999996e-2, "TimingObstruction":1.786e-3, "TimingComplexVolumeN":2.724767, "TimingaCuspShapeN":1.3434e-2, "TiminguValues":0.633312, "TiminguPolysN":5.1e-4, "TiminguPolys":0.813119, "TimingaCuspShape":9.356e-2, "TimingRepresentationsN":3.5932e-2, "TiminguValues_ij":0.147647, "TiminguPoly_ij":0.555166, "TiminguPolys_ij_N":3.970000000000001e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":3, "IsRadical":true, "ArcColoring":[ [ 0, "1 - u + u^2" ], [ "-1 - u^2", "1 - u + u^2" ], [ "-u", "1 - u + u^2" ], [ 0, "u" ], "{1, 0}", "{1, 0}", [ 1, "-u^2" ], [ "1 + u^2", "-1 + u - u^2" ], [ "1 + u^2", 0 ], [ "1 + u^2", 0 ] ], "Obstruction":1, "ComplexVolumeN":[ "-4.66906 + 2.82812*I", "-4.66906 - 2.82812*I", -0.53148 ], "uPolysN":[ "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", "u^3", "-1 + 3*u - 3*u^2 + u^3" ], "uPolys":[ "(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", "u^3", "(-1 + u)^3" ], "aCuspShape":"4 - 4*u + 3*u^2", "RepresentationsN":[ [ "u->0.21508 + 1.30714 I", "a->-0.662359 + 0.56228 I", "b->0" ], [ "u->0.21508 - 1.30714 I", "a->-0.662359 - 0.56228 I", "b->0" ], [ "u->0.56984", "a->1.32472", "b->0" ] ], "Epsilon":2.46964, "uPolys_ij":[ "(1 + u)^3", "u^3", "(-1 + 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", "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", "-1 + 3*u - 2*u^2 + u^3", "1 + 2*u + u^2 + u^3", "1 + 2*u - 3*u^2 + u^3", "1 - u^2 + u^3" ], "Multiplicity":1, "ij_list":[ [ "{1, 8}", "{1, 9}", "{1, 10}", "{2, 9}", "{2, 10}", "{3, 9}", "{3, 10}" ], [ "{1, 4}", "{2, 8}", "{5, 6}", "{5, 9}", "{5, 10}", "{6, 9}", "{6, 10}", "{9, 10}" ], [ "{1, 2}", "{8, 9}", "{8, 10}" ], [ "{1, 3}", "{7, 9}", "{7, 10}" ], [ "{2, 3}", "{3, 7}", "{3, 8}", "{4, 5}", "{4, 6}", "{4, 7}" ], [ "{2, 7}", "{3, 4}", "{5, 7}", "{6, 7}", "{7, 8}" ], [ "{1, 5}", "{1, 6}", "{1, 7}", "{2, 4}", "{2, 5}", "{2, 6}", "{3, 5}", "{3, 6}", "{4, 8}", "{4, 9}", "{4, 10}", "{5, 8}", "{6, 8}" ] ], "SortedReprnIndices":"{1, 2, 3}", "aCuspShapeN":[ "-1.8473963538710125071`4.815603533909695 - 3.5417265785412781903`5.09825848236457*I", "-1.8473963538710125071`4.815603533909695 + 3.5417265785412781903`5.09825848236457*I", 2.6948 ], "Abelian":false }, { "IdealName":"abJ10_51_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":6.638e-2, "TimingZeroDimVars":6.5535e-2, "TimingmagmaVCompNormalize":6.682400000000001e-2, "TimingNumberOfSols":2.4621e-2, "TimingIsRadical":1.6619999999999996e-3, "TimingArcColoring":5.685e-2, "TimingObstruction":4.26e-4, "TimingComplexVolumeN":0.521908, "TimingaCuspShapeN":4.706e-3, "TiminguValues":0.648531, "TiminguPolysN":7.000000000000002e-5, "TiminguPolys":0.816654, "TimingaCuspShape":0.107258, "TimingRepresentationsN":2.4361999999999998e-2, "TiminguValues_ij":0.144803, "TiminguPoly_ij":0.140885, "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)^3*(-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36)", "(1 - u^2 + u^3)*(-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36)", "(1 + 2*u + u^2 + u^3)*(-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36)", "(1 - u^2 + u^3)*(-17 + 19*u - 83*u^2 + 490*u^3 - 695*u^4 + 82*u^5 + 922*u^6 - 1482*u^7 + 426*u^8 + 1124*u^9 - 454*u^10 - 1178*u^11 - 508*u^12 + 3684*u^13 - 592*u^14 - 4466*u^15 + 2277*u^16 + 1213*u^17 - 2353*u^18 + 2482*u^19 + 2037*u^20 - 3494*u^21 - 2200*u^22 + 2318*u^23 + 2065*u^24 - 803*u^25 - 1371*u^26 - 12*u^27 + 650*u^28 + 165*u^29 - 230*u^30 - 84*u^31 + 61*u^32 + 20*u^33 - 11*u^34 - 2*u^35 + u^36)", "u^3*(8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36)", "(-1 + 2*u - u^2 + u^3)*(-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36)", "(-1 + 2*u - u^2 + u^3)*(-1 - u - 3*u^2 + 18*u^3 + u^4 - 16*u^5 + 60*u^6 - 32*u^7 + 82*u^8 + 102*u^9 - 86*u^10 + 236*u^11 - 100*u^12 + 54*u^13 + 32*u^14 - 716*u^15 - 539*u^16 - 1529*u^17 - 1329*u^18 - 922*u^19 - 479*u^20 + 1318*u^21 + 1884*u^22 + 3244*u^23 + 3429*u^24 + 3283*u^25 + 2997*u^26 + 2010*u^27 + 1622*u^28 + 797*u^29 + 572*u^30 + 202*u^31 + 129*u^32 + 30*u^33 + 17*u^34 + 2*u^35 + u^36)", "(-1 + u)^3*(-1 + 8*u - 20*u^2 + 20*u^3 + 25*u^4 - 124*u^5 + 144*u^6 + 160*u^7 - 582*u^8 + 240*u^9 + 1004*u^10 - 1300*u^11 - 720*u^12 + 2568*u^13 - 710*u^14 - 2954*u^15 + 2689*u^16 + 1790*u^17 - 3860*u^18 + 336*u^19 + 3365*u^20 - 1992*u^21 - 1690*u^22 + 2266*u^23 + 113*u^24 - 1474*u^25 + 566*u^26 + 546*u^27 - 490*u^28 - 48*u^29 + 207*u^30 - 57*u^31 - 41*u^32 + 27*u^33 - 4*u^35 + u^36)", "u^3*(8 + 12*u - 40*u^2 - 117*u^3 - 25*u^4 + 306*u^5 + 356*u^6 - 346*u^7 - 784*u^8 + 146*u^9 + 966*u^10 + 154*u^11 - 674*u^12 - 438*u^13 - 94*u^14 + 530*u^15 + 806*u^16 - 252*u^17 - 764*u^18 - 197*u^19 + 71*u^20 + 342*u^21 + 454*u^22 - 80*u^23 - 382*u^24 - 214*u^25 + 50*u^26 + 267*u^27 + 127*u^28 - 158*u^29 - 110*u^30 + 55*u^31 + 45*u^32 - 11*u^33 - 10*u^34 + u^35 + u^36)", "(-1 + u)^3*(1 + 24*u + 30*u^2 - 296*u^3 - 1571*u^4 - 2856*u^5 + 3796*u^6 + 42364*u^7 + 160242*u^8 + 426572*u^9 + 916408*u^10 + 1684116*u^11 + 2735340*u^12 + 4008896*u^13 + 5375566*u^14 + 6657410*u^15 + 7664243*u^16 + 8238586*u^17 + 8294038*u^18 + 7834644*u^19 + 6949673*u^20 + 5787912*u^21 + 4520666*u^22 + 3304558*u^23 + 2253819*u^24 + 1428042*u^25 + 835636*u^26 + 448078*u^27 + 217968*u^28 + 94988*u^29 + 36507*u^30 + 12131*u^31 + 3395*u^32 + 771*u^33 + 134*u^34 + 16*u^35 + u^36)" ], "RileyPolyC":[ "(-1 + y)^3*(1 - 24*y + 30*y^2 + 296*y^3 - 1571*y^4 + 2856*y^5 + 3796*y^6 - 42364*y^7 + 160242*y^8 - 426572*y^9 + 916408*y^10 - 1684116*y^11 + 2735340*y^12 - 4008896*y^13 + 5375566*y^14 - 6657410*y^15 + 7664243*y^16 - 8238586*y^17 + 8294038*y^18 - 7834644*y^19 + 6949673*y^20 - 5787912*y^21 + 4520666*y^22 - 3304558*y^23 + 2253819*y^24 - 1428042*y^25 + 835636*y^26 - 448078*y^27 + 217968*y^28 - 94988*y^29 + 36507*y^30 - 12131*y^31 + 3395*y^32 - 771*y^33 + 134*y^34 - 16*y^35 + y^36)", "(-1 + 2*y - y^2 + y^3)*(289 + 2461*y + 11899*y^2 - 159194*y^3 + 291445*y^4 + 66064*y^5 - 463128*y^6 + 154848*y^7 + 155390*y^8 - 1827218*y^9 + 8854850*y^10 - 18242064*y^11 + 21103624*y^12 - 18084786*y^13 + 15422224*y^14 - 6588548*y^15 - 17169669*y^16 + 41300197*y^17 - 39078927*y^18 + 6972014*y^19 + 30382529*y^20 - 48861266*y^21 + 45243716*y^22 - 31067300*y^23 + 17533859*y^24 - 8883159*y^25 + 4415343*y^26 - 2246162*y^27 + 1119924*y^28 - 503941*y^29 + 191480*y^30 - 58806*y^31 + 14101*y^32 - 2538*y^33 + 323*y^34 - 26*y^35 + y^36)", "(-1 + 2*y + 3*y^2 + y^3)*(1 + 5*y + 43*y^2 - 482*y^3 - 11*y^4 + 900*y^5 + 256*y^6 + 4056*y^7 + 7794*y^8 + 8998*y^9 - 11710*y^10 - 171420*y^11 - 310244*y^12 + 307974*y^13 + 1531664*y^14 + 1089960*y^15 - 2228913*y^16 - 4732555*y^17 - 1648975*y^18 + 5066330*y^19 + 7736841*y^20 + 2795342*y^21 - 4687852*y^22 - 7622640*y^23 - 4630025*y^24 + 303233*y^25 + 3251503*y^26 + 3453002*y^27 + 2277048*y^28 + 1091943*y^29 + 398696*y^30 + 112054*y^31 + 24025*y^32 + 3822*y^33 + 427*y^34 + 30*y^35 + y^36)", "(-1 + 2*y - y^2 + y^3)*(289 + 2461*y + 11899*y^2 - 159194*y^3 + 291445*y^4 + 66064*y^5 - 463128*y^6 + 154848*y^7 + 155390*y^8 - 1827218*y^9 + 8854850*y^10 - 18242064*y^11 + 21103624*y^12 - 18084786*y^13 + 15422224*y^14 - 6588548*y^15 - 17169669*y^16 + 41300197*y^17 - 39078927*y^18 + 6972014*y^19 + 30382529*y^20 - 48861266*y^21 + 45243716*y^22 - 31067300*y^23 + 17533859*y^24 - 8883159*y^25 + 4415343*y^26 - 2246162*y^27 + 1119924*y^28 - 503941*y^29 + 191480*y^30 - 58806*y^31 + 14101*y^32 - 2538*y^33 + 323*y^34 - 26*y^35 + y^36)", "y^3*(64 - 784*y + 4008*y^2 - 13337*y^3 + 39509*y^4 - 117728*y^5 + 320092*y^6 - 716612*y^7 + 1248136*y^8 - 1583204*y^9 + 1218352*y^10 + 29738*y^11 - 1572818*y^12 + 2300356*y^13 - 1496088*y^14 - 381722*y^15 + 1875222*y^16 - 1754538*y^17 + 255908*y^18 + 1117901*y^19 - 1195761*y^20 + 265696*y^21 + 543056*y^22 - 606882*y^23 + 211646*y^24 + 96490*y^25 - 123580*y^26 + 12457*y^27 + 67279*y^28 - 73774*y^29 + 45448*y^30 - 19375*y^31 + 6005*y^32 - 1351*y^33 + 212*y^34 - 21*y^35 + y^36)", "(-1 + 2*y + 3*y^2 + y^3)*(1 + 5*y + 43*y^2 - 482*y^3 - 11*y^4 + 900*y^5 + 256*y^6 + 4056*y^7 + 7794*y^8 + 8998*y^9 - 11710*y^10 - 171420*y^11 - 310244*y^12 + 307974*y^13 + 1531664*y^14 + 1089960*y^15 - 2228913*y^16 - 4732555*y^17 - 1648975*y^18 + 5066330*y^19 + 7736841*y^20 + 2795342*y^21 - 4687852*y^22 - 7622640*y^23 - 4630025*y^24 + 303233*y^25 + 3251503*y^26 + 3453002*y^27 + 2277048*y^28 + 1091943*y^29 + 398696*y^30 + 112054*y^31 + 24025*y^32 + 3822*y^33 + 427*y^34 + 30*y^35 + y^36)", "(-1 + 2*y + 3*y^2 + y^3)*(1 + 5*y + 43*y^2 - 482*y^3 - 11*y^4 + 900*y^5 + 256*y^6 + 4056*y^7 + 7794*y^8 + 8998*y^9 - 11710*y^10 - 171420*y^11 - 310244*y^12 + 307974*y^13 + 1531664*y^14 + 1089960*y^15 - 2228913*y^16 - 4732555*y^17 - 1648975*y^18 + 5066330*y^19 + 7736841*y^20 + 2795342*y^21 - 4687852*y^22 - 7622640*y^23 - 4630025*y^24 + 303233*y^25 + 3251503*y^26 + 3453002*y^27 + 2277048*y^28 + 1091943*y^29 + 398696*y^30 + 112054*y^31 + 24025*y^32 + 3822*y^33 + 427*y^34 + 30*y^35 + y^36)", "(-1 + y)^3*(1 - 24*y + 30*y^2 + 296*y^3 - 1571*y^4 + 2856*y^5 + 3796*y^6 - 42364*y^7 + 160242*y^8 - 426572*y^9 + 916408*y^10 - 1684116*y^11 + 2735340*y^12 - 4008896*y^13 + 5375566*y^14 - 6657410*y^15 + 7664243*y^16 - 8238586*y^17 + 8294038*y^18 - 7834644*y^19 + 6949673*y^20 - 5787912*y^21 + 4520666*y^22 - 3304558*y^23 + 2253819*y^24 - 1428042*y^25 + 835636*y^26 - 448078*y^27 + 217968*y^28 - 94988*y^29 + 36507*y^30 - 12131*y^31 + 3395*y^32 - 771*y^33 + 134*y^34 - 16*y^35 + y^36)", "y^3*(64 - 784*y + 4008*y^2 - 13337*y^3 + 39509*y^4 - 117728*y^5 + 320092*y^6 - 716612*y^7 + 1248136*y^8 - 1583204*y^9 + 1218352*y^10 + 29738*y^11 - 1572818*y^12 + 2300356*y^13 - 1496088*y^14 - 381722*y^15 + 1875222*y^16 - 1754538*y^17 + 255908*y^18 + 1117901*y^19 - 1195761*y^20 + 265696*y^21 + 543056*y^22 - 606882*y^23 + 211646*y^24 + 96490*y^25 - 123580*y^26 + 12457*y^27 + 67279*y^28 - 73774*y^29 + 45448*y^30 - 19375*y^31 + 6005*y^32 - 1351*y^33 + 212*y^34 - 21*y^35 + y^36)", "(-1 + y)^3*(1 - 516*y + 11966*y^2 - 37196*y^3 - 707939*y^4 - 4032400*y^5 - 14939364*y^6 - 41484708*y^7 - 90918806*y^8 - 163686052*y^9 - 252780856*y^10 - 351313700*y^11 - 457037276*y^12 - 564200672*y^13 - 650599522*y^14 - 681219458*y^15 - 631347113*y^16 - 508912726*y^17 - 352271910*y^18 - 206729176*y^19 - 100564975*y^20 - 38395112*y^21 - 9418326*y^22 + 560874*y^23 + 2253599*y^24 + 1479458*y^25 + 587840*y^26 + 122158*y^27 - 17980*y^28 - 26384*y^29 - 10621*y^30 - 1927*y^31 + 219*y^32 + 241*y^33 + 74*y^34 + 12*y^35 + y^36)" ] }, "GeometricRepresentation":[ 1.26314e1, [ "J10_51_0", 1, "{30, 31}" ] ] } }