{ "Index":140, "Name":"10_56", "RolfsenName":"10_56", "DTname":"10a_28", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{15, 9, 11, -17, 5, 19, 1, 13, -7, 3}", "Acode":"{8, 5, 6, -9, 3, 10, 1, 7, -4, 2}", "PDcode":[ "{2, 16, 3, 15}", "{4, 10, 5, 9}", "{6, 12, 7, 11}", "{8, 17, 9, 18}", "{10, 6, 11, 5}", "{12, 20, 13, 19}", "{14, 2, 15, 1}", "{16, 14, 17, 13}", "{18, 7, 19, 8}", "{20, 4, 1, 3}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{1, 8, 5}", [], [ "{1, 8, 2, 1}", "{2, 5, 3, 1}", "{8, 1, 7, 2}", "{8, 7, 9, 1}", "{5, -9, 4, 2}", "{1, 2, 10, 2}", "{7, 10, 6, 2}" ], "{5, 9}", "{3}", 3 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "a - b - a*b^2 - 2*u + a*u^2 + 2*a^2*b*u^2 + 2*u^3 - a^3*u^4 - 2*u^5 + u^7", "b - b^3 - u - b*u^2 + 2*a*b^2*u^2 + a*u^4 - a^2*b*u^4 + u^5 - u^7 + u^9", "-1 + a^2*u + u^2 - u^3 - a^2*u^3 + a*b*u^3 - a^2*u^5 + 2*a^2*u^7 - 2*a*b*u^7 - a^2*u^9 + 2*a*b*u^9 - b^2*u^9", "u + a*b*u - u^3 + a^2*u^3 - a*b*u^3 + b^2*u^3 + u^4 - 3*a^2*u^5 + 2*a*b*u^5 + 3*a^2*u^7 - 4*a*b*u^7 + b^2*u^7 - a^2*u^9 + 2*a*b*u^9 - b^2*u^9" ], "TimingForPrimaryIdeals":0.131848 }, "v":{ "CheckEq":[ "b - b^3", "a - b - a*b^2 - v", "-(b^2*v)", "-1 + v - a*b*v + b^2*v^3" ], "TimingForPrimaryIdeals":7.2286e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_56_0", "Generators":[ "-2 + b - 2*u + 13*u^2 + 40*u^3 + 12*u^4 - 106*u^5 - 115*u^6 + 156*u^7 + 324*u^8 - 122*u^9 - 636*u^10 - 110*u^11 + 924*u^12 + 522*u^13 - 1056*u^14 - 996*u^15 + 962*u^16 + 1352*u^17 - 667*u^18 - 1430*u^19 + 320*u^20 + 1236*u^21 - 49*u^22 - 880*u^23 - 86*u^24 + 514*u^25 + 103*u^26 - 244*u^27 - 70*u^28 + 90*u^29 + 32*u^30 - 24*u^31 - 10*u^32 + 4*u^33 + 2*u^34", "-2 + a - 6*u + 6*u^2 + 32*u^3 + 23*u^4 - 66*u^5 - 107*u^6 + 70*u^7 + 252*u^8 + 10*u^9 - 430*u^10 - 228*u^11 + 536*u^12 + 548*u^13 - 502*u^14 - 862*u^15 + 316*u^16 + 1050*u^17 - 52*u^18 - 1028*u^19 - 169*u^20 + 834*u^21 + 275*u^22 - 562*u^23 - 262*u^24 + 312*u^25 + 182*u^26 - 142*u^27 - 97*u^28 + 50*u^29 + 39*u^30 - 13*u^31 - 11*u^32 + 2*u^33 + 2*u^34", "-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.9982e-2, "TimingZeroDimVars":0.114423, "TimingmagmaVCompNormalize":0.115555, "TimingNumberOfSols":0.364722, "TimingIsRadical":5.0831999999999995e-2, "TimingArcColoring":6.4864e-2, "TimingObstruction":0.1064, "TimingComplexVolumeN":3.219273e1, "TimingaCuspShapeN":0.210397, "TiminguValues":0.671395, "TiminguPolysN":0.143962, "TiminguPolys":1.017042, "TimingaCuspShape":0.145122, "TimingRepresentationsN":0.358889, "TiminguValues_ij":0.197707, "TiminguPoly_ij":2.580242, "TiminguPolys_ij_N":0.250606 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":35, "IsRadical":true, "ArcColoring":[ "{1, 0}", [ 1, "u^2" ], [ "-1 - 4*u + 3*u^2 + 20*u^3 + 18*u^4 - 36*u^5 - 72*u^6 + 28*u^7 + 162*u^8 + 42*u^9 - 264*u^10 - 200*u^11 + 314*u^12 + 412*u^13 - 276*u^14 - 607*u^15 + 149*u^16 + 706*u^17 + 13*u^18 - 668*u^19 - 138*u^20 + 526*u^21 + 188*u^22 - 344*u^23 - 167*u^24 + 186*u^25 + 111*u^26 - 82*u^27 - 57*u^28 + 28*u^29 + 22*u^30 - 7*u^31 - 6*u^32 + u^33 + u^34", "-1 + 9*u^2 + 20*u^3 + 2*u^4 - 56*u^5 - 52*u^6 + 84*u^7 + 156*u^8 - 71*u^9 - 316*u^10 - 44*u^11 + 466*u^12 + 251*u^13 - 538*u^14 - 491*u^15 + 495*u^16 + 673*u^17 - 347*u^18 - 714*u^19 + 170*u^20 + 618*u^21 - 30*u^22 - 440*u^23 - 41*u^24 + 257*u^25 + 51*u^26 - 122*u^27 - 35*u^28 + 45*u^29 + 16*u^30 - 12*u^31 - 5*u^32 + 2*u^33 + u^34" ], [ "1 + 4*u - 2*u^2 - 10*u^3 - 4*u^4 + 14*u^5 + 16*u^6 - 16*u^7 - 32*u^8 + 4*u^9 + 40*u^10 + 18*u^11 - 24*u^12 - 40*u^13 - 16*u^14 + 56*u^15 + 69*u^16 - 54*u^17 - 110*u^18 + 40*u^19 + 122*u^20 - 22*u^21 - 106*u^22 + 8*u^23 + 73*u^24 - 2*u^25 - 40*u^26 + 17*u^28 - 5*u^30 + u^32", "-u - 4*u^2 + 2*u^3 + 10*u^4 + 4*u^5 - 14*u^6 - 16*u^7 + 16*u^8 + 32*u^9 - 4*u^10 - 40*u^11 - 18*u^12 + 24*u^13 + 40*u^14 + 16*u^15 - 56*u^16 - 69*u^17 + 54*u^18 + 110*u^19 - 40*u^20 - 122*u^21 + 22*u^22 + 106*u^23 - 8*u^24 - 73*u^25 + 2*u^26 + 40*u^27 - 17*u^29 + 5*u^31 - u^33" ], [ "2 + 6*u - 6*u^2 - 32*u^3 - 23*u^4 + 66*u^5 + 107*u^6 - 70*u^7 - 252*u^8 - 10*u^9 + 430*u^10 + 228*u^11 - 536*u^12 - 548*u^13 + 502*u^14 + 862*u^15 - 316*u^16 - 1050*u^17 + 52*u^18 + 1028*u^19 + 169*u^20 - 834*u^21 - 275*u^22 + 562*u^23 + 262*u^24 - 312*u^25 - 182*u^26 + 142*u^27 + 97*u^28 - 50*u^29 - 39*u^30 + 13*u^31 + 11*u^32 - 2*u^33 - 2*u^34", "2 + 2*u - 13*u^2 - 40*u^3 - 12*u^4 + 106*u^5 + 115*u^6 - 156*u^7 - 324*u^8 + 122*u^9 + 636*u^10 + 110*u^11 - 924*u^12 - 522*u^13 + 1056*u^14 + 996*u^15 - 962*u^16 - 1352*u^17 + 667*u^18 + 1430*u^19 - 320*u^20 - 1236*u^21 + 49*u^22 + 880*u^23 + 86*u^24 - 514*u^25 - 103*u^26 + 244*u^27 + 70*u^28 - 90*u^29 - 32*u^30 + 24*u^31 + 10*u^32 - 4*u^33 - 2*u^34" ], [ "2*u - 2*u^3 + 2*u^5 - u^7", "u - u^5 + u^7 - u^9" ], [ "u", "u" ], [ 0, "u" ], [ "-u^3", "u - u^3" ], [ "1 - u^2", "-u^4" ] ], "Obstruction":-1, "ComplexVolumeN":[ "1.24148 - 2.67684*I", "1.24148 + 2.67684*I", "-0.35079 + 1.76625*I", "-0.35079 - 1.76625*I", "-4.46867 - 2.44036*I", "-4.46867 + 2.44036*I", -6.56245, "-1.45204 + 0.58793*I", "-1.45204 - 0.58793*I", "-4.54695 - 6.58963*I", "-4.54695 + 6.58963*I", "3.23509 - 1.72545*I", "3.23509 + 1.72545*I", "-11.1806 - 5.9201*I", "-11.1806 + 5.9201*I", "-1.09066 + 3.19486*I", "-1.09066 - 3.19486*I", "2.8542 - 3.77887*I", "2.8542 + 3.77887*I", "-8.72011 + 1.04091*I", "-8.72011 - 1.04091*I", -1.36456, "-2.4939 - 5.84473*I", "-2.4939 + 5.84473*I", "0.09589 - 3.04539*I", "0.09589 + 3.04539*I", "-6.48734 + 3.48149*I", "-6.48734 - 3.48149*I", "0.21056 + 8.20034*I", "0.21056 - 8.20034*I", "-5.78918 + 12.3988*I", "-5.78918 - 12.3988*I", "-0.429568 + 1.17044*I", "-0.429568 - 1.17044*I", -2.15415 ], "uPolysN":[ "-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-36 + 36*u + 293*u^2 + 137*u^3 - 1299*u^4 - 816*u^5 + 3407*u^6 + 2710*u^7 - 6555*u^8 - 5930*u^9 + 11548*u^10 + 5524*u^11 - 12276*u^12 - 4088*u^13 + 10546*u^14 + 1267*u^15 - 7522*u^16 + 1006*u^17 + 5431*u^18 - 2125*u^19 - 4095*u^20 + 2006*u^21 + 2705*u^22 - 1096*u^23 - 1483*u^24 + 454*u^25 + 513*u^26 - 67*u^27 - 123*u^28 - 6*u^30 + 16*u^31 + 6*u^32 - 4*u^33 - 2*u^34 + u^35", "-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35", "1 + 10*u + 45*u^2 + 249*u^3 + 1044*u^4 + 3384*u^5 + 9136*u^6 + 21328*u^7 + 44878*u^8 + 87332*u^9 + 159594*u^10 + 275558*u^11 + 448826*u^12 + 686664*u^13 + 981984*u^14 + 1307704*u^15 + 1617653*u^16 + 1856002*u^17 + 1973429*u^18 + 1943307*u^19 + 1771122*u^20 + 1492584*u^21 + 1161484*u^22 + 832964*u^23 + 549045*u^24 + 331438*u^25 + 182375*u^26 + 90913*u^27 + 40729*u^28 + 16224*u^29 + 5664*u^30 + 1698*u^31 + 424*u^32 + 84*u^33 + 12*u^34 + u^35", "-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35", "1 + 10*u + 45*u^2 + 249*u^3 + 1044*u^4 + 3384*u^5 + 9136*u^6 + 21328*u^7 + 44878*u^8 + 87332*u^9 + 159594*u^10 + 275558*u^11 + 448826*u^12 + 686664*u^13 + 981984*u^14 + 1307704*u^15 + 1617653*u^16 + 1856002*u^17 + 1973429*u^18 + 1943307*u^19 + 1771122*u^20 + 1492584*u^21 + 1161484*u^22 + 832964*u^23 + 549045*u^24 + 331438*u^25 + 182375*u^26 + 90913*u^27 + 40729*u^28 + 16224*u^29 + 5664*u^30 + 1698*u^31 + 424*u^32 + 84*u^33 + 12*u^34 + u^35" ], "uPolys":[ "-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 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28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35" ], "GeometricComponent":"{31, 32}", "uPolys_ij_N":[ "-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35", "1 + 10*u + 45*u^2 + 249*u^3 + 1044*u^4 + 3384*u^5 + 9136*u^6 + 21328*u^7 + 44878*u^8 + 87332*u^9 + 159594*u^10 + 275558*u^11 + 448826*u^12 + 686664*u^13 + 981984*u^14 + 1307704*u^15 + 1617653*u^16 + 1856002*u^17 + 1973429*u^18 + 1943307*u^19 + 1771122*u^20 + 1492584*u^21 + 1161484*u^22 + 832964*u^23 + 549045*u^24 + 331438*u^25 + 182375*u^26 + 90913*u^27 + 40729*u^28 + 16224*u^29 + 5664*u^30 + 1698*u^31 + 424*u^32 + 84*u^33 + 12*u^34 + u^35", "1 + 10*u - 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6*u^33 + u^35", "107257 + 249146*u - 309499*u^2 - 3309557*u^3 - 8197404*u^4 - 3648912*u^5 + 24160284*u^6 + 72762710*u^7 + 102656560*u^8 + 88876026*u^9 + 70125682*u^10 + 53510470*u^11 + 26431364*u^12 + 20301732*u^13 + 23240188*u^14 + 9479180*u^15 + 1328215*u^16 + 2722330*u^17 + 1047133*u^18 - 647207*u^19 - 534746*u^20 + 970304*u^21 + 1881304*u^22 + 1350762*u^23 + 469667*u^24 + 40076*u^25 - 10401*u^26 + 12793*u^27 + 11827*u^28 + 4408*u^29 + 854*u^30 + 56*u^31 - 18*u^32 + 4*u^34 + u^35", "1296 + 22392*u + 169513*u^2 + 966535*u^3 + 4184327*u^4 + 14505508*u^5 + 41938351*u^6 + 100861622*u^7 + 202455341*u^8 + 339436562*u^9 + 478791370*u^10 + 573529418*u^11 + 593021154*u^12 + 543410300*u^13 + 458873704*u^14 + 372958655*u^15 + 299744346*u^16 + 237658674*u^17 + 182416675*u^18 + 133180425*u^19 + 91315711*u^20 + 57917410*u^21 + 33213681*u^22 + 16686316*u^23 + 7034461*u^24 + 2322054*u^25 + 502295*u^26 + 8681*u^27 - 46951*u^28 - 21532*u^29 - 4936*u^30 - 298*u^31 + 188*u^32 + 72*u^33 + 12*u^34 + u^35", "-1 - 4*u - 3*u^2 - 11*u^3 + 22*u^4 + 76*u^5 + 138*u^6 + 452*u^7 - 42*u^8 + 82*u^9 - 1526*u^10 - 7298*u^11 - 814*u^12 - 21202*u^13 + 8636*u^14 + 12314*u^15 + 29233*u^16 + 172458*u^17 + 67283*u^18 + 423341*u^19 + 94852*u^20 + 589586*u^21 + 61932*u^22 + 498756*u^23 + 19315*u^24 + 229656*u^25 + 3097*u^26 + 60687*u^27 + 249*u^28 + 9576*u^29 + 8*u^30 + 896*u^31 + 46*u^33 + u^35", "-313 + 28*u + 6283*u^2 + 10595*u^3 - 23080*u^4 - 76942*u^5 - 193894*u^6 - 713694*u^7 - 1630542*u^8 - 2443042*u^9 - 3043704*u^10 - 3089346*u^11 - 1946800*u^12 + 75812*u^13 + 1714582*u^14 + 1460964*u^15 + 277815*u^16 - 376020*u^17 - 773431*u^18 - 720941*u^19 - 221712*u^20 + 305764*u^21 + 304338*u^22 + 24526*u^23 - 65455*u^24 - 43654*u^25 - 7463*u^26 + 14127*u^27 + 5589*u^28 - 2614*u^29 - 1088*u^30 + 326*u^31 + 102*u^32 - 26*u^33 - 4*u^34 + u^35", "-1 - 6*u - 23*u^2 - 53*u^3 + 48*u^4 + 878*u^5 + 968*u^6 - 6112*u^7 - 38094*u^8 - 146938*u^9 - 350896*u^10 - 560474*u^11 - 819524*u^12 - 1048068*u^13 - 877764*u^14 - 696530*u^15 - 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711*u^26 - 1927*u^27 - 919*u^28 + 464*u^29 + 218*u^30 - 8*u^31 - 44*u^32 - 4*u^33 + 2*u^34 + u^35", "-9991 - 63907*u - 210463*u^2 - 514557*u^3 - 991390*u^4 - 1538872*u^5 - 1672288*u^6 - 1120086*u^7 + 148450*u^8 + 1407212*u^9 + 2107528*u^10 + 1812030*u^11 + 841266*u^12 - 275376*u^13 - 915970*u^14 - 1113694*u^15 - 986465*u^16 - 651951*u^17 - 383973*u^18 - 70985*u^19 + 43540*u^20 + 154824*u^21 + 149738*u^22 + 128450*u^23 + 88869*u^24 + 51125*u^25 + 28467*u^26 + 12519*u^27 + 5701*u^28 + 2087*u^29 + 724*u^30 + 247*u^31 + 55*u^32 + 21*u^33 + 2*u^34 + u^35", "-48352 - 146272*u - 489640*u^2 - 990548*u^3 - 1990252*u^4 - 2741261*u^5 - 3102915*u^6 - 1368102*u^7 + 8481942*u^8 + 26565742*u^9 + 54363660*u^10 + 56745167*u^11 + 25533786*u^12 - 44606837*u^13 - 93962999*u^14 - 70435247*u^15 + 13544704*u^16 + 100392130*u^17 + 125301054*u^18 + 104754896*u^19 + 69503338*u^20 + 39087179*u^21 + 19729241*u^22 + 8931708*u^23 + 3515528*u^24 + 1227090*u^25 + 426178*u^26 + 170001*u^27 + 64948*u^28 + 18286*u^29 + 3918*u^30 + 813*u^31 + 162*u^32 + 33*u^33 + 7*u^34 + u^35", "-83297 + 562421*u - 1271296*u^2 - 796141*u^3 + 10946270*u^4 - 26797574*u^5 + 26565178*u^6 + 15623160*u^7 - 76224406*u^8 + 66057820*u^9 + 32275686*u^10 - 54448724*u^11 - 101789852*u^12 + 218885868*u^13 - 118956516*u^14 - 26102626*u^15 + 45879799*u^16 - 21071203*u^17 + 135190*u^18 + 12134149*u^19 - 1962896*u^20 - 1211872*u^21 + 197664*u^22 - 979442*u^23 - 436021*u^24 - 40987*u^25 - 44568*u^26 - 607*u^27 + 9089*u^28 + 2663*u^29 + 765*u^30 + 339*u^31 + 92*u^32 + 14*u^33 + u^34 + u^35", "-8 + 20*u - 112*u^2 - 1373*u^3 - 1430*u^4 + 4732*u^5 + 5316*u^6 - 8654*u^7 - 46580*u^8 + 2700*u^9 + 314926*u^10 + 49766*u^11 - 959094*u^12 - 321468*u^13 + 1407048*u^14 + 490302*u^15 - 1540850*u^16 - 395950*u^17 + 1385622*u^18 + 321899*u^19 - 982120*u^20 - 271558*u^21 + 485994*u^22 + 177892*u^23 - 162088*u^24 - 75354*u^25 + 35470*u^26 + 20301*u^27 - 5088*u^28 - 3570*u^29 + 480*u^30 + 409*u^31 - 30*u^32 - 29*u^33 + u^34 + u^35", "1 + 35*u + 363*u^2 + 1337*u^3 + 4236*u^4 + 12164*u^5 + 28920*u^6 + 64072*u^7 + 130726*u^8 + 249298*u^9 + 453250*u^10 + 764982*u^11 + 1197402*u^12 + 1701142*u^13 + 2203000*u^14 + 2592984*u^15 + 2797233*u^16 + 2774267*u^17 + 2528601*u^18 + 2134539*u^19 + 1656386*u^20 + 1192214*u^21 + 791548*u^22 + 488464*u^23 + 278637*u^24 + 148047*u^25 + 72403*u^26 + 32985*u^27 + 13649*u^28 + 5259*u^29 + 1790*u^30 + 569*u^31 + 149*u^32 + 37*u^33 + 6*u^34 + u^35", "-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35", "-2791 - 7823*u + 7696*u^2 - 108875*u^3 + 399864*u^4 - 1150084*u^5 + 1953244*u^6 - 4981000*u^7 + 4833266*u^8 - 5154174*u^9 + 3582968*u^10 + 7706646*u^11 - 12633454*u^12 + 17635162*u^13 - 16939766*u^14 + 7001164*u^15 - 5532455*u^16 + 6250667*u^17 - 121052*u^18 + 1991637*u^19 - 2677332*u^20 - 1562616*u^21 - 1601330*u^22 - 391958*u^23 - 18665*u^24 + 167097*u^25 + 89022*u^26 + 52309*u^27 + 8903*u^28 + 3453*u^29 - 13*u^30 - 223*u^31 - 136*u^32 - 8*u^33 + 3*u^34 + u^35", "1 + 19*u - 69*u^2 + 625*u^3 - 140*u^4 + 3588*u^5 + 16424*u^6 + 44196*u^7 + 188266*u^8 + 664390*u^9 + 1687822*u^10 + 3499218*u^11 + 6565366*u^12 + 11527022*u^13 + 18819272*u^14 + 28492870*u^15 + 40249503*u^16 + 53191993*u^17 + 65556543*u^18 + 75184863*u^19 + 80480654*u^20 + 80649318*u^21 + 75120308*u^22 + 63690014*u^23 + 47798699*u^24 + 30938737*u^25 + 16925365*u^26 + 7706191*u^27 + 2881855*u^28 + 872987*u^29 + 210520*u^30 + 39441*u^31 + 5533*u^32 + 547*u^33 + 34*u^34 + u^35", "-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35" ], "Multiplicity":1, "ij_list":[ [ "{1, 7}", "{1, 8}", "{2, 8}" ], [ "{1, 2}", "{2, 10}", "{7, 8}", "{7, 9}" ], [ "{1, 10}", "{8, 9}" ], [ "{1, 9}", "{2, 7}", "{8, 10}" ], [ "{2, 9}", "{6, 10}", "{7, 10}" ], [ "{2, 6}", "{4, 5}", "{9, 10}" ], [ "{6, 8}" ], [ "{1, 6}" ], [ "{6, 7}" ], [ "{3, 9}", "{6, 9}" ], [ "{3, 10}" ], [ "{1, 4}", "{4, 8}" ], [ "{1, 5}" ], [ "{5, 8}" ], [ "{5, 7}" ], [ "{1, 3}" ], [ "{3, 8}" ], [ "{5, 10}" ], [ "{2, 4}", "{4, 7}" ], [ "{2, 5}", "{3, 5}", "{3, 6}", "{4, 6}" ], [ "{3, 7}" ], [ "{2, 3}", "{3, 4}", "{5, 6}" ], [ "{4, 9}", "{4, 10}", "{5, 9}" ] ], "SortedReprnIndices":"{31, 32, 29, 30, 11, 10, 15, 14, 24, 23, 19, 18, 27, 28, 16, 17, 26, 25, 2, 1, 6, 5, 3, 4, 13, 12, 33, 34, 20, 21, 8, 9, 7, 35, 22}", "aCuspShapeN":[ "-4.7842613786298870252`5.081094392705696 + 2.9364064981588843553`4.869095670737763*I", "-4.7842613786298870252`5.081094392705696 - 2.9364064981588843553`4.869095670737763*I", "-8.7304397366376954088`5.1327028699508155 - 2.5526060993369477189`4.598650553687134*I", "-8.7304397366376954088`5.1327028699508155 + 2.5526060993369477189`4.598650553687134*I", "-13.2039437128269345606`5.132271869352236 + 3.9089632364944165352`4.603629790991117*I", "-13.2039437128269345606`5.132271869352236 - 3.9089632364944165352`4.603629790991117*I", -1.3921e1, "-6.802792973027451727`5.149852530755085 + 0.3760309260307459674`3.8923888405378757*I", "-6.802792973027451727`5.149852530755085 - 0.3760309260307459674`3.8923888405378757*I", "-8.166463809941550553`5.119220269803281 + 3.2153461050784108278`4.714413955933202*I", "-8.166463809941550553`5.119220269803281 - 3.2153461050784108278`4.714413955933202*I", "-0.6360764029635124117`4.538834105274634 + 2.5223323088985437044`5.137127123631024*I", "-0.6360764029635124117`4.538834105274634 - 2.5223323088985437044`5.137127123631024*I", "-14.7077824486129529928`5.134066754457467 + 4.1257777848699645379`4.582025390204574*I", "-14.7077824486129529928`5.134066754457467 - 4.1257777848699645379`4.582025390204574*I", "-9.7131926767102522828`5.133526982275797 - 2.7708023777504051985`4.588770530181607*I", "-9.7131926767102522828`5.133526982275797 + 2.7708023777504051985`4.588770530181607*I", "-1.2981418316013033259`4.650339369759505 + 3.8961756984171283259`5.127655758016454*I", "-1.2981418316013033259`4.650339369759505 - 3.8961756984171283259`5.127655758016454*I", "-12.8414249264734807421`5.145073495560841 - 2.0456055788038204584`4.347282177853004*I", "-12.8414249264734807421`5.145073495560841 + 2.0456055788038204584`4.347282177853004*I", -6.4972, "-8.9683499524637826596`5.092753596160018 + 4.9507929708227744982`4.834715815366093*I", "-8.9683499524637826596`5.092753596160018 - 4.9507929708227744982`4.834715815366093*I", "-10.4985587620206663245`5.132659469386675 + 3.0734617751379575553`4.599157602138094*I", "-10.4985587620206663245`5.132659469386675 - 3.0734617751379575553`4.599157602138094*I", "-9.0151424188156903411`5.125801084354957 - 3.1299711639636586471`4.666368828837592*I", "-9.0151424188156903411`5.125801084354957 + 3.1299711639636586471`4.666368828837592*I", "-6.9362251526931331629`4.976832073670296 - 7.6775696950147962551`5.020932659144862*I", "-6.9362251526931331629`4.976832073670296 + 7.6775696950147962551`5.020932659144862*I", "-9.8533281128348044375`5.046821715148827 - 7.7088040578901134466`4.94022577717346*I", "-9.8533281128348044375`5.046821715148827 + 7.7088040578901134466`4.94022577717346*I", "-5.166781571202848028`4.98005857430698 - 5.641891105773203525`5.018263172009338*I", "-5.166781571202848028`4.98005857430698 + 5.641891105773203525`5.018263172009338*I", -1.9357 ], "Abelian":false }, { "IdealName":"J10_56_1", "Generators":[ "b - u^2", "a - u", "1 - u^2 + u^3" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.933600000000001e-2, "TimingZeroDimVars":6.530999999999999e-2, "TimingmagmaVCompNormalize":6.6514e-2, "TimingNumberOfSols":4.4212e-2, "TimingIsRadical":2.143e-3, "TimingArcColoring":6.0187e-2, "TimingObstruction":2.146e-3, "TimingComplexVolumeN":2.097347, "TimingaCuspShapeN":1.1606000000000003e-2, "TiminguValues":0.629145, "TiminguPolysN":5.14e-4, "TiminguPolys":0.813085, "TimingaCuspShape":0.101685, "TimingRepresentationsN":4.3075e-2, "TiminguValues_ij":0.149922, "TiminguPoly_ij":0.847473, "TiminguPolys_ij_N":7.52e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":3, "IsRadical":true, "ArcColoring":[ "{1, 0}", [ 1, "u^2" ], [ "1 + u", "2*u^2" ], [ "u", "u^2" ], [ "u", "u^2" ], [ -1, "-u^2" ], [ "u", "u" ], [ 0, "u" ], [ "1 - u^2", "1 + u - u^2" ], [ "1 - u^2", "1 + u - u^2" ] ], "Obstruction":1, "ComplexVolumeN":[ "1.37919 - 2.82812*I", "1.37919 + 2.82812*I", -2.75839 ], "uPolysN":[ "1 - u^2 + u^3", "-1 + 3*u - 3*u^2 + u^3", "-1 + 3*u - 3*u^2 + u^3", "u^3", "1 + 3*u + 3*u^2 + u^3", "-1 + 2*u - u^2 + u^3", "-1 + u^2 + u^3", "1 + 2*u + u^2 + u^3", "u^3", "-1 + 2*u - u^2 + u^3" ], "uPolys":[ "1 - u^2 + u^3", "(-1 + u)^3", "(-1 + u)^3", "u^3", "(1 + u)^3", "-1 + 2*u - u^2 + u^3", "-1 + u^2 + u^3", "1 + 2*u + u^2 + u^3", "u^3", "-1 + 2*u - u^2 + u^3" ], "aCuspShape":"-10 + 7*u - 2*u^2", "RepresentationsN":[ [ "u->0.877439 + 0.744862 I", "a->0.877439 + 0.744862 I", "b->0.21508 + 1.30714 I" ], [ "u->0.877439 - 0.744862 I", "a->0.877439 - 0.744862 I", "b->0.21508 - 1.30714 I" ], [ "u->-0.754878", "a->-0.754878", "b->0.56984" ] ], "Epsilon":2.87629, "uPolys_ij":[ "u^3", "(-1 + u)^3", "-1 + u^2 + u^3", "1 - u^2 + u^3", "1 + 2*u + u^2 + u^3", "-1 + 2*u - u^2 + u^3", "-8 + 8*u - 2*u^2 + u^3", "1 + 2*u - 3*u^2 + u^3", "-5 + 11*u - 6*u^2 + u^3", "-1 + 2*u + 3*u^2 + u^3", "1 + 5*u - 2*u^2 + u^3" ], "GeometricComponent":0, "uPolys_ij_N":[ "u^3", "-1 + 3*u - 3*u^2 + u^3", "-1 + u^2 + u^3", "1 - u^2 + u^3", "1 + 2*u + u^2 + u^3", "-1 + 2*u - u^2 + u^3", "-8 + 8*u - 2*u^2 + u^3", "1 + 2*u - 3*u^2 + u^3", "-5 + 11*u - 6*u^2 + u^3", "-1 + 2*u + 3*u^2 + u^3", "1 + 5*u - 2*u^2 + u^3" ], "Multiplicity":1, "ij_list":[ [ "{2, 6}", "{4, 5}", "{4, 9}", "{4, 10}", "{5, 9}", "{5, 10}", "{9, 10}" ], [ "{2, 3}", "{2, 4}", "{2, 5}", "{3, 4}", "{3, 5}", "{3, 6}", "{4, 6}", "{4, 7}", "{5, 6}", "{5, 7}" ], [ "{6, 8}" ], [ "{1, 7}", "{1, 8}", "{2, 8}" ], [ "{1, 6}", "{2, 9}", "{2, 10}", "{3, 9}", "{3, 10}" ], [ "{1, 2}", "{1, 4}", "{1, 5}", "{4, 8}", "{5, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}" ], [ "{1, 3}" ], [ "{1, 9}", "{1, 10}", "{2, 7}" ], [ "{3, 7}" ], [ "{6, 7}", "{8, 9}", "{8, 10}" ], [ "{3, 8}" ] ], "SortedReprnIndices":"{2, 1, 3}", "aCuspShapeN":[ "-4.2880878771385220739`5.0825407933759035 + 2.5997498089741186951`4.8652086714329865*I", "-4.2880878771385220739`5.0825407933759035 - 2.5997498089741186951`4.8652086714329865*I", -1.6424e1 ], "Abelian":false }, { "IdealName":"abJ10_56_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":6.4049e-2, "TimingZeroDimVars":6.890500000000001e-2, "TimingmagmaVCompNormalize":7.0007e-2, "TimingNumberOfSols":2.5441e-2, "TimingIsRadical":1.621e-3, "TimingArcColoring":5.5857000000000004e-2, "TimingObstruction":4.26e-4, "TimingComplexVolumeN":0.360573, "TimingaCuspShapeN":4.362e-3, "TiminguValues":0.633678, "TiminguPolysN":8.5e-5, "TiminguPolys":0.809193, "TimingaCuspShape":0.101421, "TimingRepresentationsN":2.5374e-2, "TiminguValues_ij":0.142437, "TiminguPoly_ij":0.13663, "TiminguPolys_ij_N":2.8e-5 }, "ZeroDimensionalVars":[ "b", "a", "v" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}" ], "Obstruction":1, "ComplexVolumeN":"{0}", "uPolysN":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "uPolys":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "aCuspShape":0, "RepresentationsN":[ [ "v->1.", "a->1.", "b->0" ] ], "Epsilon":"Infinity", "uPolys_ij":[ "u" ], "GeometricComponent":0, "uPolys_ij_N":[ "u" ], "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 3}", "{1, 4}", "{1, 5}", "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{1, 10}", "{2, 3}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{3, 10}", "{4, 5}", "{4, 6}", "{4, 7}", "{4, 8}", "{4, 9}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{5, 10}", "{6, 7}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":"{0}", "Abelian":true } ] }, "uPolyC":[ "(1 - u^2 + u^3)*(-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35)", "(-1 + u)^3*(-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35)", "(-1 + u)^3*(-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35)", "u^3*(-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35)", "(1 + u)^3*(-1 + 3*u + 5*u^2 + 9*u^3 + 20*u^4 + 92*u^5 + 96*u^6 - 20*u^7 - 18*u^8 + 54*u^9 - 590*u^10 - 1678*u^11 - 526*u^12 + 3630*u^13 + 4984*u^14 - 1554*u^15 - 8763*u^16 - 4635*u^17 + 7097*u^18 + 9255*u^19 - 1574*u^20 - 8706*u^21 - 2640*u^22 + 5102*u^23 + 3405*u^24 - 1983*u^25 - 2217*u^26 + 539*u^27 + 953*u^28 - 129*u^29 - 276*u^30 + 37*u^31 + 49*u^32 - 9*u^33 - 4*u^34 + u^35)", "(-1 + 2*u - u^2 + u^3)*(-36 + 36*u + 293*u^2 + 137*u^3 - 1299*u^4 - 816*u^5 + 3407*u^6 + 2710*u^7 - 6555*u^8 - 5930*u^9 + 11548*u^10 + 5524*u^11 - 12276*u^12 - 4088*u^13 + 10546*u^14 + 1267*u^15 - 7522*u^16 + 1006*u^17 + 5431*u^18 - 2125*u^19 - 4095*u^20 + 2006*u^21 + 2705*u^22 - 1096*u^23 - 1483*u^24 + 454*u^25 + 513*u^26 - 67*u^27 - 123*u^28 - 6*u^30 + 16*u^31 + 6*u^32 - 4*u^33 - 2*u^34 + u^35)", "(-1 + u^2 + u^3)*(-1 - 2*u + 3*u^2 + 21*u^3 + 24*u^4 - 32*u^5 - 88*u^6 + 4*u^7 + 182*u^8 + 100*u^9 - 270*u^10 - 314*u^11 + 262*u^12 + 568*u^13 - 124*u^14 - 768*u^15 - 113*u^16 + 822*u^17 + 359*u^18 - 701*u^19 - 498*u^20 + 480*u^21 + 496*u^22 - 252*u^23 - 385*u^24 + 90*u^25 + 237*u^26 - 11*u^27 - 117*u^28 - 12*u^29 + 44*u^30 + 10*u^31 - 12*u^32 - 4*u^33 + 2*u^34 + u^35)", "(1 + 2*u + u^2 + u^3)*(1 + 10*u + 45*u^2 + 249*u^3 + 1044*u^4 + 3384*u^5 + 9136*u^6 + 21328*u^7 + 44878*u^8 + 87332*u^9 + 159594*u^10 + 275558*u^11 + 448826*u^12 + 686664*u^13 + 981984*u^14 + 1307704*u^15 + 1617653*u^16 + 1856002*u^17 + 1973429*u^18 + 1943307*u^19 + 1771122*u^20 + 1492584*u^21 + 1161484*u^22 + 832964*u^23 + 549045*u^24 + 331438*u^25 + 182375*u^26 + 90913*u^27 + 40729*u^28 + 16224*u^29 + 5664*u^30 + 1698*u^31 + 424*u^32 + 84*u^33 + 12*u^34 + u^35)", "u^3*(-8 - 28*u - 48*u^2 - 109*u^3 - 148*u^4 - 174*u^5 - 282*u^6 - 234*u^7 - 414*u^8 - 502*u^9 - 584*u^10 - 750*u^11 - 732*u^12 - 298*u^13 - 644*u^14 + 630*u^15 - 284*u^16 + 944*u^17 + 36*u^18 + 427*u^19 + 36*u^20 - 54*u^21 - 176*u^22 - 8*u^23 - 310*u^24 + 222*u^25 - 264*u^26 + 267*u^27 - 140*u^28 + 158*u^29 - 48*u^30 + 55*u^31 - 10*u^32 + 11*u^33 - u^34 + u^35)", "(-1 + 2*u - u^2 + u^3)*(1 + 10*u + 45*u^2 + 249*u^3 + 1044*u^4 + 3384*u^5 + 9136*u^6 + 21328*u^7 + 44878*u^8 + 87332*u^9 + 159594*u^10 + 275558*u^11 + 448826*u^12 + 686664*u^13 + 981984*u^14 + 1307704*u^15 + 1617653*u^16 + 1856002*u^17 + 1973429*u^18 + 1943307*u^19 + 1771122*u^20 + 1492584*u^21 + 1161484*u^22 + 832964*u^23 + 549045*u^24 + 331438*u^25 + 182375*u^26 + 90913*u^27 + 40729*u^28 + 16224*u^29 + 5664*u^30 + 1698*u^31 + 424*u^32 + 84*u^33 + 12*u^34 + u^35)" ], "RileyPolyC":[ "(-1 + 2*y - y^2 + y^3)*(-1 + 10*y - 45*y^2 + 249*y^3 - 1044*y^4 + 3384*y^5 - 9136*y^6 + 21328*y^7 - 44878*y^8 + 87332*y^9 - 159594*y^10 + 275558*y^11 - 448826*y^12 + 686664*y^13 - 981984*y^14 + 1307704*y^15 - 1617653*y^16 + 1856002*y^17 - 1973429*y^18 + 1943307*y^19 - 1771122*y^20 + 1492584*y^21 - 1161484*y^22 + 832964*y^23 - 549045*y^24 + 331438*y^25 - 182375*y^26 + 90913*y^27 - 40729*y^28 + 16224*y^29 - 5664*y^30 + 1698*y^31 - 424*y^32 + 84*y^33 - 12*y^34 + y^35)", "(-1 + y)^3*(-1 + 19*y + 69*y^2 + 625*y^3 + 140*y^4 + 3588*y^5 - 16424*y^6 + 44196*y^7 - 188266*y^8 + 664390*y^9 - 1687822*y^10 + 3499218*y^11 - 6565366*y^12 + 11527022*y^13 - 18819272*y^14 + 28492870*y^15 - 40249503*y^16 + 53191993*y^17 - 65556543*y^18 + 75184863*y^19 - 80480654*y^20 + 80649318*y^21 - 75120308*y^22 + 63690014*y^23 - 47798699*y^24 + 30938737*y^25 - 16925365*y^26 + 7706191*y^27 - 2881855*y^28 + 872987*y^29 - 210520*y^30 + 39441*y^31 - 5533*y^32 + 547*y^33 - 34*y^34 + y^35)", "(-1 + y)^3*(-1 + 19*y + 69*y^2 + 625*y^3 + 140*y^4 + 3588*y^5 - 16424*y^6 + 44196*y^7 - 188266*y^8 + 664390*y^9 - 1687822*y^10 + 3499218*y^11 - 6565366*y^12 + 11527022*y^13 - 18819272*y^14 + 28492870*y^15 - 40249503*y^16 + 53191993*y^17 - 65556543*y^18 + 75184863*y^19 - 80480654*y^20 + 80649318*y^21 - 75120308*y^22 + 63690014*y^23 - 47798699*y^24 + 30938737*y^25 - 16925365*y^26 + 7706191*y^27 - 2881855*y^28 + 872987*y^29 - 210520*y^30 + 39441*y^31 - 5533*y^32 + 547*y^33 - 34*y^34 + y^35)", "y^3*(-64 + 16*y + 1432*y^2 + 2905*y^3 - 4564*y^4 - 23160*y^5 - 36976*y^6 - 77296*y^7 - 258192*y^8 - 597208*y^9 - 946880*y^10 - 1388810*y^11 - 2277752*y^12 - 3306200*y^13 - 3232744*y^14 - 1576534*y^15 + 150708*y^16 + 192242*y^17 - 1069478*y^18 - 1748469*y^19 - 1012952*y^20 + 185400*y^21 + 696544*y^22 + 442014*y^23 + 37188*y^24 - 112406*y^25 - 51238*y^26 + 33099*y^27 + 57012*y^28 + 39862*y^29 + 18066*y^30 + 5795*y^31 + 1330*y^32 + 211*y^33 + 21*y^34 + y^35)", "(-1 + y)^3*(-1 + 19*y + 69*y^2 + 625*y^3 + 140*y^4 + 3588*y^5 - 16424*y^6 + 44196*y^7 - 188266*y^8 + 664390*y^9 - 1687822*y^10 + 3499218*y^11 - 6565366*y^12 + 11527022*y^13 - 18819272*y^14 + 28492870*y^15 - 40249503*y^16 + 53191993*y^17 - 65556543*y^18 + 75184863*y^19 - 80480654*y^20 + 80649318*y^21 - 75120308*y^22 + 63690014*y^23 - 47798699*y^24 + 30938737*y^25 - 16925365*y^26 + 7706191*y^27 - 2881855*y^28 + 872987*y^29 - 210520*y^30 + 39441*y^31 - 5533*y^32 + 547*y^33 - 34*y^34 + y^35)", "(-1 + 2*y + 3*y^2 + y^3)*(-1296 + 22392*y - 169513*y^2 + 966535*y^3 - 4184327*y^4 + 14505508*y^5 - 41938351*y^6 + 100861622*y^7 - 202455341*y^8 + 339436562*y^9 - 478791370*y^10 + 573529418*y^11 - 593021154*y^12 + 543410300*y^13 - 458873704*y^14 + 372958655*y^15 - 299744346*y^16 + 237658674*y^17 - 182416675*y^18 + 133180425*y^19 - 91315711*y^20 + 57917410*y^21 - 33213681*y^22 + 16686316*y^23 - 7034461*y^24 + 2322054*y^25 - 502295*y^26 + 8681*y^27 + 46951*y^28 - 21532*y^29 + 4936*y^30 - 298*y^31 - 188*y^32 + 72*y^33 - 12*y^34 + y^35)", "(-1 + 2*y - y^2 + y^3)*(-1 + 10*y - 45*y^2 + 249*y^3 - 1044*y^4 + 3384*y^5 - 9136*y^6 + 21328*y^7 - 44878*y^8 + 87332*y^9 - 159594*y^10 + 275558*y^11 - 448826*y^12 + 686664*y^13 - 981984*y^14 + 1307704*y^15 - 1617653*y^16 + 1856002*y^17 - 1973429*y^18 + 1943307*y^19 - 1771122*y^20 + 1492584*y^21 - 1161484*y^22 + 832964*y^23 - 549045*y^24 + 331438*y^25 - 182375*y^26 + 90913*y^27 - 40729*y^28 + 16224*y^29 - 5664*y^30 + 1698*y^31 - 424*y^32 + 84*y^33 - 12*y^34 + y^35)", "(-1 + 2*y + 3*y^2 + y^3)*(-1 + 10*y + 867*y^2 + 17449*y^3 + 109860*y^4 + 385264*y^5 + 917528*y^6 + 1306328*y^7 - 575918*y^8 - 8607100*y^9 - 22595354*y^10 - 30674322*y^11 - 16361330*y^12 + 18417392*y^13 + 45483120*y^14 + 38333752*y^15 + 3787379*y^16 - 25734090*y^17 - 28491257*y^18 - 11615157*y^19 + 4583054*y^20 + 9214240*y^21 + 5432764*y^22 + 739828*y^23 - 1199197*y^24 - 968846*y^25 - 248235*y^26 + 130393*y^27 + 170375*y^28 + 97044*y^29 + 36876*y^30 + 10094*y^31 + 2000*y^32 + 276*y^33 + 24*y^34 + y^35)", "y^3*(-64 + 16*y + 1432*y^2 + 2905*y^3 - 4564*y^4 - 23160*y^5 - 36976*y^6 - 77296*y^7 - 258192*y^8 - 597208*y^9 - 946880*y^10 - 1388810*y^11 - 2277752*y^12 - 3306200*y^13 - 3232744*y^14 - 1576534*y^15 + 150708*y^16 + 192242*y^17 - 1069478*y^18 - 1748469*y^19 - 1012952*y^20 + 185400*y^21 + 696544*y^22 + 442014*y^23 + 37188*y^24 - 112406*y^25 - 51238*y^26 + 33099*y^27 + 57012*y^28 + 39862*y^29 + 18066*y^30 + 5795*y^31 + 1330*y^32 + 211*y^33 + 21*y^34 + y^35)", "(-1 + 2*y + 3*y^2 + y^3)*(-1 + 10*y + 867*y^2 + 17449*y^3 + 109860*y^4 + 385264*y^5 + 917528*y^6 + 1306328*y^7 - 575918*y^8 - 8607100*y^9 - 22595354*y^10 - 30674322*y^11 - 16361330*y^12 + 18417392*y^13 + 45483120*y^14 + 38333752*y^15 + 3787379*y^16 - 25734090*y^17 - 28491257*y^18 - 11615157*y^19 + 4583054*y^20 + 9214240*y^21 + 5432764*y^22 + 739828*y^23 - 1199197*y^24 - 968846*y^25 - 248235*y^26 + 130393*y^27 + 170375*y^28 + 97044*y^29 + 36876*y^30 + 10094*y^31 + 2000*y^32 + 276*y^33 + 24*y^34 + y^35)" ] }, "GeometricRepresentation":[ 1.2398800000000001e1, [ "J10_56_0", 1, "{31, 32}" ] ] } }