{ "Index":155, "Name":"10_71", "RolfsenName":"10_71", "DTname":"10a_10", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-4, -8, 12, -2, 18, 14, 6, -20, 10, -16}", "Acode":"{-3, -5, 7, -2, 10, 8, 4, -1, 6, -9}", "PDcode":[ "{1, 4, 2, 5}", "{3, 8, 4, 9}", "{11, 15, 12, 14}", "{5, 13, 6, 12}", "{13, 7, 14, 6}", "{9, 19, 10, 18}", "{15, 20, 16, 1}", "{19, 16, 20, 17}", "{17, 11, 18, 10}", "{7, 2, 8, 3}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{9, 6, 3}", [], [ "{9, 6, 10, 1}", "{10, -9, 1, 1}", "{6, 10, 5, 2}", "{3, -5, 2, 2}", "{5, -2, 4, 2}", "{9, -1, 8, 2}", "{6, 8, 7, 1}" ], "{1, 3}", "{7}", 7 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 - a - a*b + u^2 - a*u^2 + a^2*u^2 + b*u^2 - a*b*u^2 - a*u^4", "-b - b^2 + u^2 - a*u^2 + b*u^2 + a*b*u^2 - b^2*u^2 - 2*a*u^4 + b*u^4 - a*u^6", "a - u + a^2*u - a*b*u - a*u^2 - b*u^2 + 2*a^2*u^3 - 2*a*b*u^3 + b^2*u^3 - 2*a*u^4 - 4*b*u^4 + 2*a^2*u^5 - 2*a*b*u^5 - 2*a*u^6 - 10*b*u^6 + a^2*u^7 + a*u^8 - 16*b*u^8 + 5*a*u^10 - 19*b*u^10 + 7*a*u^12 - 16*b*u^12 + 6*a*u^14 - 10*b*u^14 + 3*a*u^16 - 4*b*u^16 + a*u^18 - b*u^18", "b - u + a*b*u - b^2*u + a*u^2 + b*u^2 - u^3 + a^2*u^3 - a*b*u^3 + b^2*u^3 + 2*b*u^4 + 3*a^2*u^5 - 4*a*b*u^5 + b^2*u^5 - 2*a*u^6 + 2*b*u^6 + 3*a^2*u^7 - 2*a*b*u^7 - 2*a*u^8 - b*u^8 + a^2*u^9 - a*u^10 - 5*b*u^10 + 2*a*u^12 - 7*b*u^12 + 3*a*u^14 - 6*b*u^14 + 2*a*u^16 - 3*b*u^16 + a*u^18 - b*u^18" ], "TimingForPrimaryIdeals":0.131259 }, "v":{ "CheckEq":[ "-b - b^2", "b - b^2*v", "1 - a - a*b + b*v^2", "a - v - a*b*v - b*v^2 + b^2*v^3" ], "TimingForPrimaryIdeals":7.6048e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_71_0", "Generators":[ "b + u - 4*u^2 + 7*u^3 - 10*u^4 + 17*u^5 - 22*u^6 + 36*u^7 - 40*u^8 + 58*u^9 - 54*u^10 + 78*u^11 - 62*u^12 + 92*u^13 - 56*u^14 + 92*u^15 - 40*u^16 + 81*u^17 - 22*u^18 + 59*u^19 - 8*u^20 + 35*u^21 - 2*u^22 + 16*u^23 + 5*u^25 + u^27", "a - 4*u + 5*u^2 - 8*u^3 + 16*u^4 - 30*u^5 + 51*u^6 - 83*u^7 + 110*u^8 - 178*u^9 + 216*u^10 - 332*u^11 + 356*u^12 - 514*u^13 + 494*u^14 - 714*u^15 + 588*u^16 - 890*u^17 + 573*u^18 - 1010*u^19 + 454*u^20 - 1050*u^21 + 263*u^22 - 983*u^23 + 74*u^24 - 826*u^25 - 51*u^26 - 608*u^27 - 98*u^28 - 386*u^29 - 84*u^30 - 206*u^31 - 50*u^32 - 89*u^33 - 21*u^34 - 30*u^35 - 6*u^36 - 7*u^37 - u^38 - u^39", "1 + 4*u^2 - 11*u^3 + 19*u^4 - 34*u^5 + 61*u^6 - 82*u^7 + 155*u^8 - 160*u^9 + 304*u^10 - 258*u^11 + 512*u^12 - 352*u^13 + 768*u^14 - 372*u^15 + 1059*u^16 - 264*u^17 + 1368*u^18 - 5*u^19 + 1635*u^20 + 342*u^21 + 1785*u^22 + 650*u^23 + 1740*u^24 + 804*u^25 + 1486*u^26 + 757*u^27 + 1092*u^28 + 568*u^29 + 676*u^30 + 340*u^31 + 345*u^32 + 160*u^33 + 140*u^34 + 57*u^35 + 43*u^36 + 14*u^37 + 9*u^38 + 2*u^39 + u^40" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":8.1518e-2, "TimingZeroDimVars":0.134155, "TimingmagmaVCompNormalize":0.135513, "TimingNumberOfSols":0.437213, "TimingIsRadical":6.7613e-2, "TimingArcColoring":7.1704e-2, "TimingObstruction":0.136583, "TimingComplexVolumeN":4.2273171e1, "TimingaCuspShapeN":0.302912, "TiminguValues":0.690851, "TiminguPolysN":0.201574, "TiminguPolys":1.024993, "TimingaCuspShape":0.15402, "TimingRepresentationsN":0.436818, "TiminguValues_ij":0.20031, "TiminguPoly_ij":3.142567, "TiminguPolys_ij_N":0.38657 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":40, "IsRadical":true, "ArcColoring":[ [ "1 + u^2", "u^2" ], [ "3*u - 4*u^2 + 8*u^3 - 10*u^4 + 15*u^5 - 18*u^6 + 24*u^7 - 22*u^8 + 29*u^9 - 20*u^10 + 32*u^11 - 14*u^12 + 28*u^13 - 6*u^14 + 20*u^15 - 2*u^16 + 11*u^17 + 4*u^19 + u^21", "-1 - u + u^2 + 7*u^3 - 13*u^4 + 21*u^5 - 34*u^6 + 33*u^7 - 76*u^8 + 49*u^9 - 126*u^10 + 35*u^11 - 170*u^12 - 14*u^13 - 234*u^14 - 132*u^15 - 317*u^16 - 331*u^17 - 451*u^18 - 571*u^19 - 605*u^20 - 797*u^21 - 724*u^22 - 913*u^23 - 753*u^24 - 878*u^25 - 659*u^26 - 706*u^27 - 484*u^28 - 470*u^29 - 290*u^30 - 256*u^31 - 139*u^32 - 110*u^33 - 51*u^34 - 36*u^35 - 13*u^36 - 8*u^37 - 2*u^38 - u^39" ], [ "4*u - 5*u^2 + 8*u^3 - 16*u^4 + 30*u^5 - 51*u^6 + 83*u^7 - 110*u^8 + 178*u^9 - 216*u^10 + 332*u^11 - 356*u^12 + 514*u^13 - 494*u^14 + 714*u^15 - 588*u^16 + 890*u^17 - 573*u^18 + 1010*u^19 - 454*u^20 + 1050*u^21 - 263*u^22 + 983*u^23 - 74*u^24 + 826*u^25 + 51*u^26 + 608*u^27 + 98*u^28 + 386*u^29 + 84*u^30 + 206*u^31 + 50*u^32 + 89*u^33 + 21*u^34 + 30*u^35 + 6*u^36 + 7*u^37 + u^38 + u^39", "-u + 4*u^2 - 7*u^3 + 10*u^4 - 17*u^5 + 22*u^6 - 36*u^7 + 40*u^8 - 58*u^9 + 54*u^10 - 78*u^11 + 62*u^12 - 92*u^13 + 56*u^14 - 92*u^15 + 40*u^16 - 81*u^17 + 22*u^18 - 59*u^19 + 8*u^20 - 35*u^21 + 2*u^22 - 16*u^23 - 5*u^25 - u^27" ], [ "-1 + 3*u - 7*u^2 + 10*u^3 - 14*u^4 + 11*u^5 - 15*u^6 - 7*u^7 + 2*u^8 - 70*u^9 + 60*u^10 - 198*u^11 + 156*u^12 - 382*u^13 + 270*u^14 - 606*u^15 + 361*u^16 - 819*u^17 + 377*u^18 - 974*u^19 + 308*u^20 - 1035*u^21 + 173*u^22 - 979*u^23 + 29*u^24 - 825*u^25 - 69*u^26 - 608*u^27 - 103*u^28 - 386*u^29 - 85*u^30 - 206*u^31 - 50*u^32 - 89*u^33 - 21*u^34 - 30*u^35 - 6*u^36 - 7*u^37 - u^38 - u^39", "-2 - 4*u^2 + 20*u^3 - 38*u^4 + 60*u^5 - 102*u^6 + 116*u^7 - 228*u^8 + 194*u^9 - 392*u^10 + 220*u^11 - 564*u^12 + 162*u^13 - 764*u^14 - 66*u^15 - 972*u^16 - 488*u^17 - 1232*u^18 - 1018*u^19 - 1486*u^20 - 1522*u^21 - 1646*u^22 - 1794*u^23 - 1624*u^24 - 1746*u^25 - 1376*u^26 - 1410*u^27 - 990*u^28 - 940*u^29 - 586*u^30 - 512*u^31 - 279*u^32 - 220*u^33 - 102*u^34 - 72*u^35 - 26*u^36 - 16*u^37 - 4*u^38 - 2*u^39" ], [ "u", "u + u^3" ], [ 0, "u" ], [ "-u - 2*u^3 - 3*u^5 - 2*u^7 - u^9", "u - u^5 - u^7 - u^9" ], [ "1 + u^2 + u^4", "u^4" ], "{1, 0}", [ 1, "u^2" ] ], "Obstruction":-1, "ComplexVolumeN":[ "0.63968 + 1.74616*I", "0.63968 - 1.74616*I", "-1.07354 - 2.17702*I", "-1.07354 + 2.17702*I", "2.32493 - 2.41163*I", "2.32493 + 2.41163*I", "-1.20323 - 7.65538*I", "-1.20323 + 7.65538*I", "-3.72005 - 2.44717*I", "-3.72005 + 2.44717*I", "0.74845 - 2.81821*I", "0.74845 + 2.81821*I", "6.00686 + 1.3207*I", "6.00686 - 1.3207*I", "1.25887 + 0.68759*I", "1.25887 - 0.68759*I", "5.2158 - 6.90989*I", "5.2158 + 6.90989*I", "-0.6092 - 2.86826*I", "-0.6092 + 2.86826*I", "-6.21108 + 0.22925*I", "-6.21108 - 0.22925*I", "-6.02457 + 5.56367*I", "-6.02457 - 5.56367*I", "2.21178 + 4.43619*I", "2.21178 - 4.43619*I", "2.37466 + 0.03317*I", "2.37466 - 0.03317*I", "1.68055 - 7.1239*I", "1.68055 + 7.1239*I", "0.398 - 4.72692*I", "0.398 + 4.72692*I", "-2.70648 + 8.09252*I", "-2.70648 - 8.09252*I", "0.0537 + 13.3852*I", "0.0537 - 13.3852*I", "-1.47568 - 0.52119*I", "-1.47568 + 0.52119*I", "1.75548 + 0.68997*I", "1.75548 - 0.68997*I" ], "uPolysN":[ "1 - 3*u + 13*u^2 - 41*u^3 + 115*u^4 - 285*u^5 + 660*u^6 - 1225*u^7 + 1895*u^8 - 2758*u^9 + 4190*u^10 - 8698*u^11 + 25684*u^12 - 71004*u^13 + 153928*u^14 - 265968*u^15 + 397343*u^16 - 572141*u^17 + 850927*u^18 - 1272759*u^19 + 1790879*u^20 - 2289577*u^21 + 2686320*u^22 - 3010025*u^23 + 3353656*u^24 - 3738121*u^25 + 4034521*u^26 - 4038119*u^27 + 3629864*u^28 - 2876408*u^29 + 1988656*u^30 - 1191212*u^31 + 614125*u^32 - 270275*u^33 + 100405*u^34 - 30985*u^35 + 7759*u^36 - 1521*u^37 + 220*u^38 - 21*u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40", "16 + 120*u + 513*u^2 + 1793*u^3 + 5454*u^4 + 14100*u^5 + 30521*u^6 + 55743*u^7 + 88505*u^8 + 127532*u^9 + 175618*u^10 + 241198*u^11 + 338256*u^12 + 487256*u^13 + 720860*u^14 + 1085636*u^15 + 1632164*u^16 + 2388024*u^17 + 3328155*u^18 + 4358579*u^19 + 5328190*u^20 + 6065612*u^21 + 6428001*u^22 + 6343087*u^23 + 5829289*u^24 + 4987780*u^25 + 3970311*u^26 + 2935911*u^27 + 2012336*u^28 + 1274368*u^29 + 742248*u^30 + 395144*u^31 + 190684*u^32 + 82516*u^33 + 31577*u^34 + 10493*u^35 + 2954*u^36 + 680*u^37 + 121*u^38 + 15*u^39 + u^40", "4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40", "1 - 8*u + 54*u^2 - 153*u^3 + 411*u^4 - 1206*u^5 + 3971*u^6 - 12814*u^7 + 37303*u^8 - 97064*u^9 + 227896*u^10 - 488934*u^11 + 967380*u^12 - 1774976*u^13 + 3029060*u^14 - 4814268*u^15 + 7130899*u^16 - 9847440*u^17 + 12682974*u^18 - 15239995*u^19 + 17089791*u^20 - 17887342*u^21 + 17474099*u^22 - 15927694*u^23 + 13537804*u^24 - 10718700*u^25 + 7894092*u^26 - 5397217*u^27 + 3416824*u^28 - 1996280*u^29 + 1071872*u^30 - 526116*u^31 + 234481*u^32 - 94072*u^33 + 33590*u^34 - 10513*u^35 + 2823*u^36 - 630*u^37 + 111*u^38 - 14*u^39 + u^40", "1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40", "1 - 8*u + 54*u^2 - 153*u^3 + 411*u^4 - 1206*u^5 + 3971*u^6 - 12814*u^7 + 37303*u^8 - 97064*u^9 + 227896*u^10 - 488934*u^11 + 967380*u^12 - 1774976*u^13 + 3029060*u^14 - 4814268*u^15 + 7130899*u^16 - 9847440*u^17 + 12682974*u^18 - 15239995*u^19 + 17089791*u^20 - 17887342*u^21 + 17474099*u^22 - 15927694*u^23 + 13537804*u^24 - 10718700*u^25 + 7894092*u^26 - 5397217*u^27 + 3416824*u^28 - 1996280*u^29 + 1071872*u^30 - 526116*u^31 + 234481*u^32 - 94072*u^33 + 33590*u^34 - 10513*u^35 + 2823*u^36 - 630*u^37 + 111*u^38 - 14*u^39 + u^40" ], "uPolys":[ "1 - 3*u + 13*u^2 - 41*u^3 + 115*u^4 - 285*u^5 + 660*u^6 - 1225*u^7 + 1895*u^8 - 2758*u^9 + 4190*u^10 - 8698*u^11 + 25684*u^12 - 71004*u^13 + 153928*u^14 - 265968*u^15 + 397343*u^16 - 572141*u^17 + 850927*u^18 - 1272759*u^19 + 1790879*u^20 - 2289577*u^21 + 2686320*u^22 - 3010025*u^23 + 3353656*u^24 - 3738121*u^25 + 4034521*u^26 - 4038119*u^27 + 3629864*u^28 - 2876408*u^29 + 1988656*u^30 - 1191212*u^31 + 614125*u^32 - 270275*u^33 + 100405*u^34 - 30985*u^35 + 7759*u^36 - 1521*u^37 + 220*u^38 - 21*u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40", "16 + 120*u + 513*u^2 + 1793*u^3 + 5454*u^4 + 14100*u^5 + 30521*u^6 + 55743*u^7 + 88505*u^8 + 127532*u^9 + 175618*u^10 + 241198*u^11 + 338256*u^12 + 487256*u^13 + 720860*u^14 + 1085636*u^15 + 1632164*u^16 + 2388024*u^17 + 3328155*u^18 + 4358579*u^19 + 5328190*u^20 + 6065612*u^21 + 6428001*u^22 + 6343087*u^23 + 5829289*u^24 + 4987780*u^25 + 3970311*u^26 + 2935911*u^27 + 2012336*u^28 + 1274368*u^29 + 742248*u^30 + 395144*u^31 + 190684*u^32 + 82516*u^33 + 31577*u^34 + 10493*u^35 + 2954*u^36 + 680*u^37 + 121*u^38 + 15*u^39 + u^40", "4 - 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6670*u - 20462*u^2 + 66443*u^3 - 39309*u^4 - 34476*u^5 + 17073*u^6 + 28998*u^7 + 592433*u^8 - 2753510*u^9 + 6783192*u^10 - 13033282*u^11 + 22047240*u^12 - 32525258*u^13 + 43470852*u^14 - 50587426*u^15 + 55971191*u^16 - 54741174*u^17 + 51954120*u^18 - 42729701*u^19 + 35159383*u^20 - 24998310*u^21 + 18428735*u^22 - 11452142*u^23 + 7753050*u^24 - 4239522*u^25 + 2682378*u^26 - 1285351*u^27 + 771344*u^28 - 314612*u^29 + 184040*u^30 - 60268*u^31 + 35181*u^32 - 8710*u^33 + 5086*u^34 - 899*u^35 + 517*u^36 - 60*u^37 + 33*u^38 - 2*u^39 + u^40", "5216 - 30528*u + 90192*u^2 - 173732*u^3 + 350900*u^4 - 625719*u^5 + 723657*u^6 - 665634*u^7 + 698642*u^8 - 447125*u^9 + 761340*u^10 - 949433*u^11 - 1296015*u^12 + 3817904*u^13 - 1400023*u^14 - 3107226*u^15 + 2671765*u^16 + 295376*u^17 - 388758*u^18 - 753942*u^19 - 522646*u^20 + 2099499*u^21 - 659545*u^22 - 1548076*u^23 + 1159382*u^24 + 452097*u^25 - 511276*u^26 - 146657*u^27 + 161699*u^28 + 61057*u^29 - 46140*u^30 - 20902*u^31 + 11725*u^32 + 4647*u^33 - 2250*u^34 - 665*u^35 + 303*u^36 + 54*u^37 - 25*u^38 - 2*u^39 + u^40", "28447 - 75344*u + 55268*u^2 - 233565*u^3 + 2122761*u^4 - 8909192*u^5 + 24239695*u^6 - 50330456*u^7 + 86613699*u^8 - 128608422*u^9 + 167206170*u^10 - 189499902*u^11 + 184404906*u^12 - 150874188*u^13 + 102105290*u^14 - 58150862*u^15 + 32114767*u^16 - 24071008*u^17 + 26237148*u^18 - 30368283*u^19 + 30376445*u^20 - 23615568*u^21 + 12777483*u^22 - 3847228*u^23 + 190554*u^24 - 44784*u^25 + 240340*u^26 + 84451*u^27 - 235654*u^28 + 40994*u^29 + 96726*u^30 - 50216*u^31 - 11853*u^32 + 13750*u^33 - 474*u^34 - 1853*u^35 + 277*u^36 + 128*u^37 - 27*u^38 - 4*u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "1 + 17*u + 153*u^2 + 919*u^3 + 3455*u^4 + 11227*u^5 + 55164*u^6 + 228795*u^7 + 692863*u^8 + 2588026*u^9 + 7086326*u^10 + 7601566*u^11 + 31903292*u^12 + 21952836*u^13 + 53164872*u^14 + 65210216*u^15 + 53130771*u^16 + 78934995*u^17 + 66499379*u^18 + 63661473*u^19 + 60741635*u^20 + 40282695*u^21 + 32148712*u^22 + 19470275*u^23 + 10712108*u^24 + 6778151*u^25 + 2811941*u^26 + 1595257*u^27 + 768488*u^28 + 219720*u^29 + 207616*u^30 + 7092*u^31 + 43649*u^32 - 3139*u^33 + 6353*u^34 - 577*u^35 + 611*u^36 - 41*u^37 + 36*u^38 - u^39 + u^40", "20411 - 220936*u + 1199508*u^2 - 4473339*u^3 + 13213233*u^4 - 30445010*u^5 + 57979977*u^6 - 89876398*u^7 + 119164453*u^8 - 132743326*u^9 + 132070876*u^10 - 113380780*u^11 + 93108728*u^12 - 66370478*u^13 + 49702346*u^14 - 28512398*u^15 + 19300695*u^16 - 4492724*u^17 + 2512432*u^18 + 4980307*u^19 - 1362473*u^20 + 4249734*u^21 + 161525*u^22 + 1718112*u^23 + 959998*u^24 + 615186*u^25 + 658120*u^26 + 278987*u^27 + 280330*u^28 + 116052*u^29 + 92162*u^30 + 35854*u^31 + 23193*u^32 + 8142*u^33 + 4164*u^34 + 1289*u^35 + 509*u^36 + 124*u^37 + 37*u^38 + 6*u^39 + u^40", "1 - 3*u + 13*u^2 - 41*u^3 + 115*u^4 - 285*u^5 + 660*u^6 - 1225*u^7 + 1895*u^8 - 2758*u^9 + 4190*u^10 - 8698*u^11 + 25684*u^12 - 71004*u^13 + 153928*u^14 - 265968*u^15 + 397343*u^16 - 572141*u^17 + 850927*u^18 - 1272759*u^19 + 1790879*u^20 - 2289577*u^21 + 2686320*u^22 - 3010025*u^23 + 3353656*u^24 - 3738121*u^25 + 4034521*u^26 - 4038119*u^27 + 3629864*u^28 - 2876408*u^29 + 1988656*u^30 - 1191212*u^31 + 614125*u^32 - 270275*u^33 + 100405*u^34 - 30985*u^35 + 7759*u^36 - 1521*u^37 + 220*u^38 - 21*u^39 + u^40", "1201 + 299*u - 4797*u^2 + 2179*u^3 + 5007*u^4 - 4091*u^5 + 16594*u^6 - 33041*u^7 + 47687*u^8 - 28764*u^9 + 71128*u^10 - 24918*u^11 + 95712*u^12 - 90472*u^13 + 292772*u^14 - 308110*u^15 + 621583*u^16 - 637573*u^17 + 909985*u^18 - 818425*u^19 + 967783*u^20 - 750827*u^21 + 733736*u^22 - 531607*u^23 + 431472*u^24 - 278719*u^25 + 198573*u^26 - 117819*u^27 + 73368*u^28 - 39500*u^29 + 22832*u^30 - 11760*u^31 + 6263*u^32 - 2889*u^33 + 1289*u^34 - 497*u^35 + 209*u^36 - 83*u^37 + 30*u^38 - 7*u^39 + u^40", "748 - 4248*u + 1979*u^2 + 20657*u^3 + 5296*u^4 - 145268*u^5 + 91461*u^6 + 328701*u^7 - 187527*u^8 - 761012*u^9 + 476260*u^10 + 1152814*u^11 - 718332*u^12 - 1332466*u^13 + 763210*u^14 + 1159106*u^15 - 484064*u^16 - 869252*u^17 + 202883*u^18 + 588027*u^19 - 15008*u^20 - 344338*u^21 - 29413*u^22 + 170521*u^23 + 34819*u^24 - 68678*u^25 - 22341*u^26 + 26991*u^27 + 11780*u^28 - 8562*u^29 - 3812*u^30 + 2958*u^31 + 1278*u^32 - 644*u^33 - 229*u^34 + 153*u^35 + 54*u^36 - 18*u^37 - 5*u^38 + 3*u^39 + u^40", "63584 - 347440*u + 1105952*u^2 - 2591992*u^3 + 7655892*u^4 - 15321405*u^5 + 39899255*u^6 - 78834170*u^7 + 147641345*u^8 - 256955560*u^9 + 384164843*u^10 - 573112844*u^11 + 705852590*u^12 - 862001256*u^13 + 919799953*u^14 - 893871488*u^15 + 824390239*u^16 - 593616453*u^17 + 491366055*u^18 - 248827073*u^19 + 202450137*u^20 - 72934917*u^21 + 80319066*u^22 - 38552125*u^23 + 32721925*u^24 - 9918852*u^25 + 4572442*u^26 - 2127313*u^27 + 1772493*u^28 - 528703*u^29 + 76292*u^30 + 63546*u^31 - 29950*u^32 + 6552*u^33 + 2683*u^34 - 1227*u^35 + 140*u^36 + 86*u^37 - 15*u^38 - u^39 + u^40", "5291 + 71613*u + 403673*u^2 + 1362807*u^3 + 3999987*u^4 + 5191323*u^5 + 6695374*u^6 - 9776635*u^7 - 14141713*u^8 - 13482078*u^9 + 11213072*u^10 + 9024084*u^11 + 4418286*u^12 - 2943754*u^13 + 9150168*u^14 + 3123256*u^15 - 71051*u^16 - 15466651*u^17 - 7307987*u^18 - 5870897*u^19 + 8808873*u^20 + 4125795*u^21 + 6799870*u^22 - 2499229*u^23 + 340174*u^24 - 3925381*u^25 + 513411*u^26 - 1130431*u^27 + 1052502*u^28 + 70552*u^29 + 528200*u^30 + 101444*u^31 + 129039*u^32 + 23143*u^33 + 17691*u^34 + 2517*u^35 + 1387*u^36 + 137*u^37 + 58*u^38 + 3*u^39 + u^40", "4 - 40*u + 209*u^2 - 773*u^3 + 2228*u^4 - 4232*u^5 - 7017*u^6 + 58031*u^7 - 62359*u^8 - 112164*u^9 + 378976*u^10 - 737750*u^11 - 184314*u^12 + 3939742*u^13 - 2984104*u^14 - 9343190*u^15 + 14004354*u^16 + 4116152*u^17 - 14794563*u^18 - 397129*u^19 + 10545906*u^20 + 109222*u^21 - 6471967*u^22 - 32015*u^23 + 3250239*u^24 + 12818*u^25 - 1237051*u^26 - 80257*u^27 + 386616*u^28 + 66814*u^29 - 107656*u^30 - 24264*u^31 + 25246*u^32 + 4776*u^33 - 4365*u^34 - 539*u^35 + 496*u^36 + 34*u^37 - 33*u^38 - u^39 + u^40", "4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40", "319 - 1062*u - 998*u^2 + 22739*u^3 - 38337*u^4 - 81240*u^5 + 433021*u^6 - 130044*u^7 - 594893*u^8 + 2296500*u^9 - 1381362*u^10 + 258102*u^11 + 7422184*u^12 - 8182212*u^13 + 11849870*u^14 + 552230*u^15 + 118609*u^16 + 14680190*u^17 - 3210024*u^18 + 10859739*u^19 + 7267469*u^20 + 1958454*u^21 + 11465955*u^22 + 59044*u^23 + 7544648*u^24 + 800104*u^25 + 3066848*u^26 + 609169*u^27 + 923412*u^28 + 195354*u^29 + 230192*u^30 + 31954*u^31 + 46139*u^32 + 2576*u^33 + 6644*u^34 + 45*u^35 + 635*u^36 - 4*u^37 + 37*u^38 + u^40", "10669 + 87124*u + 445466*u^2 - 996239*u^3 + 5276423*u^4 - 6362294*u^5 + 9051119*u^6 + 7086708*u^7 - 20177263*u^8 + 49085532*u^9 - 48270214*u^10 + 36605132*u^11 + 6302682*u^12 - 54827876*u^13 + 74557108*u^14 - 93721676*u^15 + 76692789*u^16 - 69779254*u^17 + 44448194*u^18 - 24661263*u^19 + 13085647*u^20 - 1268316*u^21 - 174665*u^22 + 2526746*u^23 - 605606*u^24 + 898514*u^25 + 67378*u^26 + 78563*u^27 + 83742*u^28 - 4360*u^29 + 22618*u^30 - 1500*u^31 + 3639*u^32 - 868*u^33 + 448*u^34 - 111*u^35 + 79*u^36 - 2*u^37 + 7*u^38 - 2*u^39 + u^40" ], "GeometricComponent":"{35, 36}", "uPolys_ij_N":[ "1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40", "1 - 8*u + 54*u^2 - 153*u^3 + 411*u^4 - 1206*u^5 + 3971*u^6 - 12814*u^7 + 37303*u^8 - 97064*u^9 + 227896*u^10 - 488934*u^11 + 967380*u^12 - 1774976*u^13 + 3029060*u^14 - 4814268*u^15 + 7130899*u^16 - 9847440*u^17 + 12682974*u^18 - 15239995*u^19 + 17089791*u^20 - 17887342*u^21 + 17474099*u^22 - 15927694*u^23 + 13537804*u^24 - 10718700*u^25 + 7894092*u^26 - 5397217*u^27 + 3416824*u^28 - 1996280*u^29 + 1071872*u^30 - 526116*u^31 + 234481*u^32 - 94072*u^33 + 33590*u^34 - 10513*u^35 + 2823*u^36 - 630*u^37 + 111*u^38 - 14*u^39 + u^40", "1 + 44*u + 1290*u^2 + 9625*u^3 + 98335*u^4 + 820134*u^5 + 4547539*u^6 + 17795714*u^7 + 51014535*u^8 + 106943488*u^9 + 157237912*u^10 + 139046622*u^11 + 9617236*u^12 - 176986480*u^13 - 278768468*u^14 - 192372940*u^15 + 30491695*u^16 + 217906272*u^17 + 234055346*u^18 + 93450363*u^19 - 72483757*u^20 - 143832874*u^21 - 103241637*u^22 - 18723214*u^23 + 37301584*u^24 + 43393516*u^25 + 21932696*u^26 + 1557193*u^27 - 6219064*u^28 - 4977584*u^29 - 1645848*u^30 + 285452*u^31 + 683653*u^32 + 454928*u^33 + 197186*u^34 + 62529*u^35 + 14875*u^36 + 2622*u^37 + 327*u^38 + 26*u^39 + u^40", "1 - 4*u + 36*u^2 - 793*u^3 + 5819*u^4 - 22812*u^5 + 57573*u^6 - 89452*u^7 + 100481*u^8 - 64976*u^9 + 188212*u^10 - 100734*u^11 + 442988*u^12 - 236146*u^13 + 828632*u^14 - 282382*u^15 + 1196841*u^16 - 218128*u^17 + 1334248*u^18 - 117829*u^19 + 1157697*u^20 - 29880*u^21 + 802153*u^22 + 21092*u^23 + 454514*u^24 + 33980*u^25 + 213386*u^26 + 25431*u^27 + 83236*u^28 + 12920*u^29 + 26756*u^30 + 4778*u^31 + 6955*u^32 + 1300*u^33 + 1416*u^34 + 253*u^35 + 213*u^36 + 32*u^37 + 21*u^38 + 2*u^39 + u^40", "16 + 120*u + 513*u^2 + 1793*u^3 + 5454*u^4 + 14100*u^5 + 30521*u^6 + 55743*u^7 + 88505*u^8 + 127532*u^9 + 175618*u^10 + 241198*u^11 + 338256*u^12 + 487256*u^13 + 720860*u^14 + 1085636*u^15 + 1632164*u^16 + 2388024*u^17 + 3328155*u^18 + 4358579*u^19 + 5328190*u^20 + 6065612*u^21 + 6428001*u^22 + 6343087*u^23 + 5829289*u^24 + 4987780*u^25 + 3970311*u^26 + 2935911*u^27 + 2012336*u^28 + 1274368*u^29 + 742248*u^30 + 395144*u^31 + 190684*u^32 + 82516*u^33 + 31577*u^34 + 10493*u^35 + 2954*u^36 + 680*u^37 + 121*u^38 + 15*u^39 + u^40", "1 - 4*u + 30*u^2 - 5*u^3 + 155*u^4 + 926*u^5 - 1819*u^6 + 18612*u^7 + 157335*u^8 + 104914*u^9 - 1644424*u^10 - 4194030*u^11 + 730940*u^12 + 19288096*u^13 + 37784838*u^14 + 9313074*u^15 - 79493869*u^16 - 137184510*u^17 - 51084034*u^18 + 147943883*u^19 + 280199427*u^20 + 226402798*u^21 + 66676953*u^22 - 45057224*u^23 - 57899724*u^24 - 23588850*u^25 + 2891780*u^26 + 8407415*u^27 + 3857664*u^28 - 119396*u^29 - 901132*u^30 - 334842*u^31 + 31665*u^32 + 56310*u^33 + 11518*u^34 - 2651*u^35 - 1453*u^36 - 102*u^37 + 57*u^38 + 14*u^39 + u^40", "200 - 700*u + 2510*u^2 - 345*u^3 + 3708*u^4 + 27514*u^5 + 46726*u^6 + 20221*u^7 + 218000*u^8 - 21381*u^9 + 519657*u^10 - 144656*u^11 + 807055*u^12 - 319581*u^13 + 1023966*u^14 - 475530*u^15 + 1052225*u^16 - 566531*u^17 + 945539*u^18 - 530551*u^19 + 702074*u^20 - 391880*u^21 + 438296*u^22 - 236908*u^23 + 233637*u^24 - 122859*u^25 + 107586*u^26 - 53805*u^27 + 42476*u^28 - 20293*u^29 + 14236*u^30 - 6226*u^31 + 3915*u^32 - 1562*u^33 + 862*u^34 - 303*u^35 + 149*u^36 - 46*u^37 + 19*u^38 - 4*u^39 + u^40", "261481 + 1400056*u + 4049196*u^2 + 6954467*u^3 + 13851427*u^4 + 36144760*u^5 + 28285945*u^6 - 74882688*u^7 - 189703601*u^8 - 248445804*u^9 - 254669428*u^10 - 7935538*u^11 + 461703116*u^12 + 725026660*u^13 + 767101220*u^14 + 690615084*u^15 + 463624535*u^16 + 264506604*u^17 + 169543788*u^18 + 127031141*u^19 + 115984355*u^20 + 96954860*u^21 + 64606525*u^22 + 37705652*u^23 + 20895468*u^24 + 11638392*u^25 + 7020738*u^26 + 4160613*u^27 + 2263208*u^28 + 1142922*u^29 + 526368*u^30 + 214076*u^31 + 79445*u^32 + 27232*u^33 + 8262*u^34 + 2163*u^35 + 571*u^36 + 132*u^37 + 21*u^38 + 4*u^39 + u^40", "256 - 2016*u + 7377*u^2 + 26373*u^3 - 48098*u^4 - 36896*u^5 + 782369*u^6 - 2719613*u^7 + 7068229*u^8 - 16760128*u^9 + 40349314*u^10 - 94558958*u^11 + 203451384*u^12 - 391820024*u^13 + 678488596*u^14 - 1062175804*u^15 + 1490818004*u^16 - 1837758660*u^17 + 1941188479*u^18 - 1712465405*u^19 + 1222139302*u^20 - 666961656*u^21 + 238625261*u^22 - 14369273*u^23 - 47249339*u^24 + 33496028*u^25 - 9221521*u^26 - 2392857*u^27 + 3547504*u^28 - 1579584*u^29 + 222184*u^30 + 137832*u^31 - 90840*u^32 + 15596*u^33 + 9033*u^34 - 7811*u^35 + 3158*u^36 - 832*u^37 + 149*u^38 - 17*u^39 + u^40", "10336 + 297392*u + 2566752*u^2 - 1192084*u^3 + 19589714*u^4 + 12120299*u^5 + 37738307*u^6 + 1274430*u^7 + 56144186*u^8 - 13777065*u^9 + 91402992*u^10 - 76453603*u^11 + 66413333*u^12 - 125458390*u^13 + 115171887*u^14 - 95269684*u^15 + 174428585*u^16 - 130075972*u^17 + 139731670*u^18 - 142068698*u^19 + 86802704*u^20 - 66448799*u^21 + 41259309*u^22 - 15070964*u^23 + 10529138*u^24 - 1908851*u^25 + 986816*u^26 + 30769*u^27 + 78665*u^28 + 228441*u^29 + 107584*u^30 + 95388*u^31 + 35229*u^32 + 15495*u^33 + 4262*u^34 + 1041*u^35 + 239*u^36 + 44*u^37 + 25*u^38 + 4*u^39 + u^40", "1 - 2*u + 6*u^2 + 9*u^3 + 45*u^4 - 22*u^5 + 289*u^6 - 78*u^7 + 1381*u^8 + 1142*u^9 + 9684*u^10 + 6928*u^11 + 48832*u^12 + 46754*u^13 + 196958*u^14 + 188226*u^15 + 620639*u^16 + 399390*u^17 + 1288810*u^18 + 487873*u^19 + 1759027*u^20 + 308842*u^21 + 1657061*u^22 + 24416*u^23 + 1133968*u^24 - 117474*u^25 + 587616*u^26 - 98339*u^27 + 235208*u^28 - 42056*u^29 + 72684*u^30 - 10998*u^31 + 17053*u^32 - 1808*u^33 + 2944*u^34 - 175*u^35 + 355*u^36 - 8*u^37 + 27*u^38 + u^40", "2983 - 6670*u - 20462*u^2 + 66443*u^3 - 39309*u^4 - 34476*u^5 + 17073*u^6 + 28998*u^7 + 592433*u^8 - 2753510*u^9 + 6783192*u^10 - 13033282*u^11 + 22047240*u^12 - 32525258*u^13 + 43470852*u^14 - 50587426*u^15 + 55971191*u^16 - 54741174*u^17 + 51954120*u^18 - 42729701*u^19 + 35159383*u^20 - 24998310*u^21 + 18428735*u^22 - 11452142*u^23 + 7753050*u^24 - 4239522*u^25 + 2682378*u^26 - 1285351*u^27 + 771344*u^28 - 314612*u^29 + 184040*u^30 - 60268*u^31 + 35181*u^32 - 8710*u^33 + 5086*u^34 - 899*u^35 + 517*u^36 - 60*u^37 + 33*u^38 - 2*u^39 + u^40", "5216 - 30528*u + 90192*u^2 - 173732*u^3 + 350900*u^4 - 625719*u^5 + 723657*u^6 - 665634*u^7 + 698642*u^8 - 447125*u^9 + 761340*u^10 - 949433*u^11 - 1296015*u^12 + 3817904*u^13 - 1400023*u^14 - 3107226*u^15 + 2671765*u^16 + 295376*u^17 - 388758*u^18 - 753942*u^19 - 522646*u^20 + 2099499*u^21 - 659545*u^22 - 1548076*u^23 + 1159382*u^24 + 452097*u^25 - 511276*u^26 - 146657*u^27 + 161699*u^28 + 61057*u^29 - 46140*u^30 - 20902*u^31 + 11725*u^32 + 4647*u^33 - 2250*u^34 - 665*u^35 + 303*u^36 + 54*u^37 - 25*u^38 - 2*u^39 + u^40", "28447 - 75344*u + 55268*u^2 - 233565*u^3 + 2122761*u^4 - 8909192*u^5 + 24239695*u^6 - 50330456*u^7 + 86613699*u^8 - 128608422*u^9 + 167206170*u^10 - 189499902*u^11 + 184404906*u^12 - 150874188*u^13 + 102105290*u^14 - 58150862*u^15 + 32114767*u^16 - 24071008*u^17 + 26237148*u^18 - 30368283*u^19 + 30376445*u^20 - 23615568*u^21 + 12777483*u^22 - 3847228*u^23 + 190554*u^24 - 44784*u^25 + 240340*u^26 + 84451*u^27 - 235654*u^28 + 40994*u^29 + 96726*u^30 - 50216*u^31 - 11853*u^32 + 13750*u^33 - 474*u^34 - 1853*u^35 + 277*u^36 + 128*u^37 - 27*u^38 - 4*u^39 + u^40", "1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40", "1 + 17*u + 153*u^2 + 919*u^3 + 3455*u^4 + 11227*u^5 + 55164*u^6 + 228795*u^7 + 692863*u^8 + 2588026*u^9 + 7086326*u^10 + 7601566*u^11 + 31903292*u^12 + 21952836*u^13 + 53164872*u^14 + 65210216*u^15 + 53130771*u^16 + 78934995*u^17 + 66499379*u^18 + 63661473*u^19 + 60741635*u^20 + 40282695*u^21 + 32148712*u^22 + 19470275*u^23 + 10712108*u^24 + 6778151*u^25 + 2811941*u^26 + 1595257*u^27 + 768488*u^28 + 219720*u^29 + 207616*u^30 + 7092*u^31 + 43649*u^32 - 3139*u^33 + 6353*u^34 - 577*u^35 + 611*u^36 - 41*u^37 + 36*u^38 - u^39 + u^40", "20411 - 220936*u + 1199508*u^2 - 4473339*u^3 + 13213233*u^4 - 30445010*u^5 + 57979977*u^6 - 89876398*u^7 + 119164453*u^8 - 132743326*u^9 + 132070876*u^10 - 113380780*u^11 + 93108728*u^12 - 66370478*u^13 + 49702346*u^14 - 28512398*u^15 + 19300695*u^16 - 4492724*u^17 + 2512432*u^18 + 4980307*u^19 - 1362473*u^20 + 4249734*u^21 + 161525*u^22 + 1718112*u^23 + 959998*u^24 + 615186*u^25 + 658120*u^26 + 278987*u^27 + 280330*u^28 + 116052*u^29 + 92162*u^30 + 35854*u^31 + 23193*u^32 + 8142*u^33 + 4164*u^34 + 1289*u^35 + 509*u^36 + 124*u^37 + 37*u^38 + 6*u^39 + u^40", "1 - 3*u + 13*u^2 - 41*u^3 + 115*u^4 - 285*u^5 + 660*u^6 - 1225*u^7 + 1895*u^8 - 2758*u^9 + 4190*u^10 - 8698*u^11 + 25684*u^12 - 71004*u^13 + 153928*u^14 - 265968*u^15 + 397343*u^16 - 572141*u^17 + 850927*u^18 - 1272759*u^19 + 1790879*u^20 - 2289577*u^21 + 2686320*u^22 - 3010025*u^23 + 3353656*u^24 - 3738121*u^25 + 4034521*u^26 - 4038119*u^27 + 3629864*u^28 - 2876408*u^29 + 1988656*u^30 - 1191212*u^31 + 614125*u^32 - 270275*u^33 + 100405*u^34 - 30985*u^35 + 7759*u^36 - 1521*u^37 + 220*u^38 - 21*u^39 + u^40", "1201 + 299*u - 4797*u^2 + 2179*u^3 + 5007*u^4 - 4091*u^5 + 16594*u^6 - 33041*u^7 + 47687*u^8 - 28764*u^9 + 71128*u^10 - 24918*u^11 + 95712*u^12 - 90472*u^13 + 292772*u^14 - 308110*u^15 + 621583*u^16 - 637573*u^17 + 909985*u^18 - 818425*u^19 + 967783*u^20 - 750827*u^21 + 733736*u^22 - 531607*u^23 + 431472*u^24 - 278719*u^25 + 198573*u^26 - 117819*u^27 + 73368*u^28 - 39500*u^29 + 22832*u^30 - 11760*u^31 + 6263*u^32 - 2889*u^33 + 1289*u^34 - 497*u^35 + 209*u^36 - 83*u^37 + 30*u^38 - 7*u^39 + u^40", "748 - 4248*u + 1979*u^2 + 20657*u^3 + 5296*u^4 - 145268*u^5 + 91461*u^6 + 328701*u^7 - 187527*u^8 - 761012*u^9 + 476260*u^10 + 1152814*u^11 - 718332*u^12 - 1332466*u^13 + 763210*u^14 + 1159106*u^15 - 484064*u^16 - 869252*u^17 + 202883*u^18 + 588027*u^19 - 15008*u^20 - 344338*u^21 - 29413*u^22 + 170521*u^23 + 34819*u^24 - 68678*u^25 - 22341*u^26 + 26991*u^27 + 11780*u^28 - 8562*u^29 - 3812*u^30 + 2958*u^31 + 1278*u^32 - 644*u^33 - 229*u^34 + 153*u^35 + 54*u^36 - 18*u^37 - 5*u^38 + 3*u^39 + u^40", "63584 - 347440*u + 1105952*u^2 - 2591992*u^3 + 7655892*u^4 - 15321405*u^5 + 39899255*u^6 - 78834170*u^7 + 147641345*u^8 - 256955560*u^9 + 384164843*u^10 - 573112844*u^11 + 705852590*u^12 - 862001256*u^13 + 919799953*u^14 - 893871488*u^15 + 824390239*u^16 - 593616453*u^17 + 491366055*u^18 - 248827073*u^19 + 202450137*u^20 - 72934917*u^21 + 80319066*u^22 - 38552125*u^23 + 32721925*u^24 - 9918852*u^25 + 4572442*u^26 - 2127313*u^27 + 1772493*u^28 - 528703*u^29 + 76292*u^30 + 63546*u^31 - 29950*u^32 + 6552*u^33 + 2683*u^34 - 1227*u^35 + 140*u^36 + 86*u^37 - 15*u^38 - u^39 + u^40", "5291 + 71613*u + 403673*u^2 + 1362807*u^3 + 3999987*u^4 + 5191323*u^5 + 6695374*u^6 - 9776635*u^7 - 14141713*u^8 - 13482078*u^9 + 11213072*u^10 + 9024084*u^11 + 4418286*u^12 - 2943754*u^13 + 9150168*u^14 + 3123256*u^15 - 71051*u^16 - 15466651*u^17 - 7307987*u^18 - 5870897*u^19 + 8808873*u^20 + 4125795*u^21 + 6799870*u^22 - 2499229*u^23 + 340174*u^24 - 3925381*u^25 + 513411*u^26 - 1130431*u^27 + 1052502*u^28 + 70552*u^29 + 528200*u^30 + 101444*u^31 + 129039*u^32 + 23143*u^33 + 17691*u^34 + 2517*u^35 + 1387*u^36 + 137*u^37 + 58*u^38 + 3*u^39 + u^40", "4 - 40*u + 209*u^2 - 773*u^3 + 2228*u^4 - 4232*u^5 - 7017*u^6 + 58031*u^7 - 62359*u^8 - 112164*u^9 + 378976*u^10 - 737750*u^11 - 184314*u^12 + 3939742*u^13 - 2984104*u^14 - 9343190*u^15 + 14004354*u^16 + 4116152*u^17 - 14794563*u^18 - 397129*u^19 + 10545906*u^20 + 109222*u^21 - 6471967*u^22 - 32015*u^23 + 3250239*u^24 + 12818*u^25 - 1237051*u^26 - 80257*u^27 + 386616*u^28 + 66814*u^29 - 107656*u^30 - 24264*u^31 + 25246*u^32 + 4776*u^33 - 4365*u^34 - 539*u^35 + 496*u^36 + 34*u^37 - 33*u^38 - u^39 + u^40", "4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40", "319 - 1062*u - 998*u^2 + 22739*u^3 - 38337*u^4 - 81240*u^5 + 433021*u^6 - 130044*u^7 - 594893*u^8 + 2296500*u^9 - 1381362*u^10 + 258102*u^11 + 7422184*u^12 - 8182212*u^13 + 11849870*u^14 + 552230*u^15 + 118609*u^16 + 14680190*u^17 - 3210024*u^18 + 10859739*u^19 + 7267469*u^20 + 1958454*u^21 + 11465955*u^22 + 59044*u^23 + 7544648*u^24 + 800104*u^25 + 3066848*u^26 + 609169*u^27 + 923412*u^28 + 195354*u^29 + 230192*u^30 + 31954*u^31 + 46139*u^32 + 2576*u^33 + 6644*u^34 + 45*u^35 + 635*u^36 - 4*u^37 + 37*u^38 + u^40", "10669 + 87124*u + 445466*u^2 - 996239*u^3 + 5276423*u^4 - 6362294*u^5 + 9051119*u^6 + 7086708*u^7 - 20177263*u^8 + 49085532*u^9 - 48270214*u^10 + 36605132*u^11 + 6302682*u^12 - 54827876*u^13 + 74557108*u^14 - 93721676*u^15 + 76692789*u^16 - 69779254*u^17 + 44448194*u^18 - 24661263*u^19 + 13085647*u^20 - 1268316*u^21 - 174665*u^22 + 2526746*u^23 - 605606*u^24 + 898514*u^25 + 67378*u^26 + 78563*u^27 + 83742*u^28 - 4360*u^29 + 22618*u^30 - 1500*u^31 + 3639*u^32 - 868*u^33 + 448*u^34 - 111*u^35 + 79*u^36 - 2*u^37 + 7*u^38 - 2*u^39 + u^40" ], "Multiplicity":1, "MinRepresentationVolume":[ "{27, 28}", 3.3170000000000005e-2 ], "ij_list":[ [ "{5, 10}", "{6, 9}", "{6, 10}" ], [ "{1, 8}", "{1, 9}", "{5, 6}", "{9, 10}" ], [ "{1, 10}", "{8, 9}" ], [ "{1, 6}", "{5, 9}" ], [ "{1, 5}", "{3, 4}", "{6, 8}", "{7, 8}" ], [ "{8, 10}" ], [ "{1, 7}", "{5, 8}" ], [ "{7, 9}" ], [ "{6, 7}" ], [ "{7, 10}" ], [ "{2, 7}", "{5, 7}" ], [ "{2, 8}" ], [ "{2, 6}" ], [ "{3, 9}" ], [ "{2, 4}", "{2, 5}", "{3, 5}" ], [ "{1, 2}" ], [ "{3, 10}" ], [ "{1, 3}", "{2, 3}", "{4, 5}" ], [ "{1, 4}" ], [ "{3, 8}", "{4, 6}" ], [ "{2, 9}" ], [ "{2, 10}" ], [ "{3, 6}" ], [ "{3, 7}", "{4, 7}", "{4, 8}" ], [ "{4, 10}" ], [ "{4, 9}" ] ], "SortedReprnIndices":"{35, 36, 33, 34, 8, 7, 30, 29, 18, 17, 23, 24, 32, 31, 25, 26, 20, 19, 12, 11, 10, 9, 6, 5, 4, 3, 1, 2, 13, 14, 39, 40, 15, 16, 38, 37, 21, 22, 27, 28}", "aCuspShapeN":[ "0.0443025207075528819`3.6971378361390994 - 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0.9197832052041996871`4.311335905767599*I", "4.176605697747461709`5.150176695383779 + 0.1649180011206240552`3.7466212810914548*I", "4.176605697747461709`5.150176695383779 - 0.1649180011206240552`3.7466212810914548*I" ], "Abelian":false }, { "IdealName":"J10_71_1", "Generators":[ "1 + b + u", "a", "1 + u + u^2" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":8.3743e-2, "TimingZeroDimVars":6.6816e-2, "TimingmagmaVCompNormalize":6.811e-2, "TimingNumberOfSols":2.8598e-2, "TimingIsRadical":2.079e-3, "TimingArcColoring":6.265e-2, "TimingObstruction":1.22e-3, "TimingComplexVolumeN":2.257524, "TimingaCuspShapeN":1.0109e-2, "TiminguValues":0.639483, "TiminguPolysN":3.26e-4, "TiminguPolys":0.809149, "TimingaCuspShape":0.10166, "TimingRepresentationsN":3.0402000000000002e-2, "TiminguValues_ij":0.15416, "TiminguPolys_ij_N":3.51e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ "-u", "-1 - u" ], [ "-u", "-2*(1 + u)" ], [ 0, "-1 - u" ], [ 0, "-1 - u" ], [ "u", "1 + u" ], [ 0, "u" ], [ 0, "u" ], [ 0, "u" ], "{1, 0}", [ 1, "-1 - u" ] ], "Obstruction":1, "ComplexVolumeN":[ "1.64493 + 2.02988*I", "1.64493 - 2.02988*I" ], "uPolysN":[ "1 + 2*u + u^2", "1 + 2*u + u^2", "u^2", "1 - 2*u + u^2", "1 - u + u^2", "u^2", "u^2", "1 + u + u^2", "1 + u + u^2", "1 - u + u^2" ], "uPolys":[ "(1 + u)^2", "(1 + u)^2", "u^2", "(-1 + u)^2", "1 - u + u^2", "u^2", "u^2", "1 + u + u^2", "1 + u + u^2", "1 - u + u^2" ], "aCuspShape":"1 - 4*u", "RepresentationsN":[ [ "u->-0.5 + 0.866025 I", "a->0", "b->-0.5 - 0.866025 I" ], [ "u->-0.5 - 0.866025 I", "a->0", "b->-0.5 + 0.866025 I" ] ], "Epsilon":2.44949, "uPolys_ij_N":[ "1 + 2*u + u^2", "u^2", "1 + u + u^2", "1 - u + u^2", "1 + u + u^2", "1 - u + u^2", "3 + u^2", "4 - 2*u + u^2" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{1, 2}", 2.02988 ], "ij_list":[ [ "{1, 2}", "{1, 3}", "{1, 4}", "{2, 3}", "{2, 4}", "{2, 5}", "{3, 5}", "{4, 5}" ], [ "{1, 5}", "{3, 4}", "{3, 6}", "{3, 7}", "{3, 8}", "{4, 6}", "{4, 7}", "{4, 8}", "{6, 7}", "{6, 8}", "{7, 8}" ], [ "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{9, 10}" ], [ "{5, 10}", "{6, 9}", "{6, 10}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}" ], [ "{1, 10}" ], [ "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{2, 6}", "{2, 7}", "{2, 8}", "{3, 9}", "{3, 10}", "{4, 9}", "{4, 10}" ], [ "{2, 10}" ], [ "{2, 9}" ] ], "SortedReprnIndices":"{1, 2}", "aCuspShapeN":[ "3.`4.9665266051846935 - 3.464101615137754587`5.028995973488844*I", "3.`4.9665266051846935 + 3.464101615137754587`5.028995973488844*I" ], "Abelian":false }, { "IdealName":"abJ10_71_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":7.5394e-2, "TimingZeroDimVars":6.5924e-2, "TimingmagmaVCompNormalize":6.7121e-2, "TimingNumberOfSols":2.6976e-2, "TimingIsRadical":1.7230000000000001e-3, "TimingArcColoring":6.2905e-2, "TimingObstruction":4.4000000000000007e-4, "TimingComplexVolumeN":0.437944, "TimingaCuspShapeN":4.88e-3, "TiminguValues":0.627497, "TiminguPolysN":7.3e-5, "TiminguPolys":0.802064, "TimingaCuspShape":8.5983e-2, "TimingRepresentationsN":2.6863e-2, "TiminguValues_ij":0.146617, "TiminguPoly_ij":0.144571, "TiminguPolys_ij_N":2.9e-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*(1 - 3*u + 13*u^2 - 41*u^3 + 115*u^4 - 285*u^5 + 660*u^6 - 1225*u^7 + 1895*u^8 - 2758*u^9 + 4190*u^10 - 8698*u^11 + 25684*u^12 - 71004*u^13 + 153928*u^14 - 265968*u^15 + 397343*u^16 - 572141*u^17 + 850927*u^18 - 1272759*u^19 + 1790879*u^20 - 2289577*u^21 + 2686320*u^22 - 3010025*u^23 + 3353656*u^24 - 3738121*u^25 + 4034521*u^26 - 4038119*u^27 + 3629864*u^28 - 2876408*u^29 + 1988656*u^30 - 1191212*u^31 + 614125*u^32 - 270275*u^33 + 100405*u^34 - 30985*u^35 + 7759*u^36 - 1521*u^37 + 220*u^38 - 21*u^39 + u^40)", "(1 + u)^2*(1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40)", "u^2*(4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40)", "(-1 + u)^2*(1 + 3*u + 3*u^2 - u^3 - u^4 + 9*u^5 + 10*u^6 - 21*u^7 - 45*u^8 + 6*u^9 + 82*u^10 - 18*u^11 - 260*u^12 - 124*u^13 + 620*u^14 + 948*u^15 - 325*u^16 - 2103*u^17 - 1471*u^18 + 1861*u^19 + 3635*u^20 + 585*u^21 - 3778*u^22 - 3349*u^23 + 1456*u^24 + 3989*u^25 + 1163*u^26 - 2455*u^27 - 2104*u^28 + 600*u^29 + 1512*u^30 + 284*u^31 - 619*u^32 - 325*u^33 + 131*u^34 + 139*u^35 - u^36 - 31*u^37 - 6*u^38 + 3*u^39 + u^40)", "(1 - u + u^2)*(1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40)", "u^2*(16 + 120*u + 513*u^2 + 1793*u^3 + 5454*u^4 + 14100*u^5 + 30521*u^6 + 55743*u^7 + 88505*u^8 + 127532*u^9 + 175618*u^10 + 241198*u^11 + 338256*u^12 + 487256*u^13 + 720860*u^14 + 1085636*u^15 + 1632164*u^16 + 2388024*u^17 + 3328155*u^18 + 4358579*u^19 + 5328190*u^20 + 6065612*u^21 + 6428001*u^22 + 6343087*u^23 + 5829289*u^24 + 4987780*u^25 + 3970311*u^26 + 2935911*u^27 + 2012336*u^28 + 1274368*u^29 + 742248*u^30 + 395144*u^31 + 190684*u^32 + 82516*u^33 + 31577*u^34 + 10493*u^35 + 2954*u^36 + 680*u^37 + 121*u^38 + 15*u^39 + u^40)", "u^2*(4 - 8*u - 7*u^2 + 31*u^3 - 4*u^4 - 74*u^5 + 37*u^6 + 119*u^7 - 67*u^8 - 146*u^9 + 56*u^10 + 154*u^11 + 34*u^12 - 190*u^13 - 188*u^14 + 312*u^15 + 400*u^16 - 512*u^17 - 603*u^18 + 725*u^19 + 750*u^20 - 856*u^21 - 781*u^22 + 871*u^23 + 707*u^24 - 776*u^25 - 571*u^26 + 609*u^27 + 420*u^28 - 412*u^29 - 280*u^30 + 232*u^31 + 162*u^32 - 104*u^33 - 77*u^34 + 35*u^35 + 28*u^36 - 8*u^37 - 7*u^38 + u^39 + u^40)", "(1 + u + u^2)*(1 - 8*u + 54*u^2 - 153*u^3 + 411*u^4 - 1206*u^5 + 3971*u^6 - 12814*u^7 + 37303*u^8 - 97064*u^9 + 227896*u^10 - 488934*u^11 + 967380*u^12 - 1774976*u^13 + 3029060*u^14 - 4814268*u^15 + 7130899*u^16 - 9847440*u^17 + 12682974*u^18 - 15239995*u^19 + 17089791*u^20 - 17887342*u^21 + 17474099*u^22 - 15927694*u^23 + 13537804*u^24 - 10718700*u^25 + 7894092*u^26 - 5397217*u^27 + 3416824*u^28 - 1996280*u^29 + 1071872*u^30 - 526116*u^31 + 234481*u^32 - 94072*u^33 + 33590*u^34 - 10513*u^35 + 2823*u^36 - 630*u^37 + 111*u^38 - 14*u^39 + u^40)", "(1 + u + u^2)*(1 + 4*u^2 + 11*u^3 + 19*u^4 + 34*u^5 + 61*u^6 + 82*u^7 + 155*u^8 + 160*u^9 + 304*u^10 + 258*u^11 + 512*u^12 + 352*u^13 + 768*u^14 + 372*u^15 + 1059*u^16 + 264*u^17 + 1368*u^18 + 5*u^19 + 1635*u^20 - 342*u^21 + 1785*u^22 - 650*u^23 + 1740*u^24 - 804*u^25 + 1486*u^26 - 757*u^27 + 1092*u^28 - 568*u^29 + 676*u^30 - 340*u^31 + 345*u^32 - 160*u^33 + 140*u^34 - 57*u^35 + 43*u^36 - 14*u^37 + 9*u^38 - 2*u^39 + u^40)", "(1 - u + u^2)*(1 - 8*u + 54*u^2 - 153*u^3 + 411*u^4 - 1206*u^5 + 3971*u^6 - 12814*u^7 + 37303*u^8 - 97064*u^9 + 227896*u^10 - 488934*u^11 + 967380*u^12 - 1774976*u^13 + 3029060*u^14 - 4814268*u^15 + 7130899*u^16 - 9847440*u^17 + 12682974*u^18 - 15239995*u^19 + 17089791*u^20 - 17887342*u^21 + 17474099*u^22 - 15927694*u^23 + 13537804*u^24 - 10718700*u^25 + 7894092*u^26 - 5397217*u^27 + 3416824*u^28 - 1996280*u^29 + 1071872*u^30 - 526116*u^31 + 234481*u^32 - 94072*u^33 + 33590*u^34 - 10513*u^35 + 2823*u^36 - 630*u^37 + 111*u^38 - 14*u^39 + u^40)" ], "RileyPolyC":[ "(-1 + y)^2*(1 + 17*y + 153*y^2 + 919*y^3 + 3455*y^4 + 11227*y^5 + 55164*y^6 + 228795*y^7 + 692863*y^8 + 2588026*y^9 + 7086326*y^10 + 7601566*y^11 + 31903292*y^12 + 21952836*y^13 + 53164872*y^14 + 65210216*y^15 + 53130771*y^16 + 78934995*y^17 + 66499379*y^18 + 63661473*y^19 + 60741635*y^20 + 40282695*y^21 + 32148712*y^22 + 19470275*y^23 + 10712108*y^24 + 6778151*y^25 + 2811941*y^26 + 1595257*y^27 + 768488*y^28 + 219720*y^29 + 207616*y^30 + 7092*y^31 + 43649*y^32 - 3139*y^33 + 6353*y^34 - 577*y^35 + 611*y^36 - 41*y^37 + 36*y^38 - y^39 + y^40)", "(-1 + y)^2*(1 - 3*y + 13*y^2 - 41*y^3 + 115*y^4 - 285*y^5 + 660*y^6 - 1225*y^7 + 1895*y^8 - 2758*y^9 + 4190*y^10 - 8698*y^11 + 25684*y^12 - 71004*y^13 + 153928*y^14 - 265968*y^15 + 397343*y^16 - 572141*y^17 + 850927*y^18 - 1272759*y^19 + 1790879*y^20 - 2289577*y^21 + 2686320*y^22 - 3010025*y^23 + 3353656*y^24 - 3738121*y^25 + 4034521*y^26 - 4038119*y^27 + 3629864*y^28 - 2876408*y^29 + 1988656*y^30 - 1191212*y^31 + 614125*y^32 - 270275*y^33 + 100405*y^34 - 30985*y^35 + 7759*y^36 - 1521*y^37 + 220*y^38 - 21*y^39 + y^40)", "y^2*(16 - 120*y + 513*y^2 - 1793*y^3 + 5454*y^4 - 14100*y^5 + 30521*y^6 - 55743*y^7 + 88505*y^8 - 127532*y^9 + 175618*y^10 - 241198*y^11 + 338256*y^12 - 487256*y^13 + 720860*y^14 - 1085636*y^15 + 1632164*y^16 - 2388024*y^17 + 3328155*y^18 - 4358579*y^19 + 5328190*y^20 - 6065612*y^21 + 6428001*y^22 - 6343087*y^23 + 5829289*y^24 - 4987780*y^25 + 3970311*y^26 - 2935911*y^27 + 2012336*y^28 - 1274368*y^29 + 742248*y^30 - 395144*y^31 + 190684*y^32 - 82516*y^33 + 31577*y^34 - 10493*y^35 + 2954*y^36 - 680*y^37 + 121*y^38 - 15*y^39 + y^40)", "(-1 + y)^2*(1 - 3*y + 13*y^2 - 41*y^3 + 115*y^4 - 285*y^5 + 660*y^6 - 1225*y^7 + 1895*y^8 - 2758*y^9 + 4190*y^10 - 8698*y^11 + 25684*y^12 - 71004*y^13 + 153928*y^14 - 265968*y^15 + 397343*y^16 - 572141*y^17 + 850927*y^18 - 1272759*y^19 + 1790879*y^20 - 2289577*y^21 + 2686320*y^22 - 3010025*y^23 + 3353656*y^24 - 3738121*y^25 + 4034521*y^26 - 4038119*y^27 + 3629864*y^28 - 2876408*y^29 + 1988656*y^30 - 1191212*y^31 + 614125*y^32 - 270275*y^33 + 100405*y^34 - 30985*y^35 + 7759*y^36 - 1521*y^37 + 220*y^38 - 21*y^39 + y^40)", "(1 + y + y^2)*(1 + 8*y + 54*y^2 + 153*y^3 + 411*y^4 + 1206*y^5 + 3971*y^6 + 12814*y^7 + 37303*y^8 + 97064*y^9 + 227896*y^10 + 488934*y^11 + 967380*y^12 + 1774976*y^13 + 3029060*y^14 + 4814268*y^15 + 7130899*y^16 + 9847440*y^17 + 12682974*y^18 + 15239995*y^19 + 17089791*y^20 + 17887342*y^21 + 17474099*y^22 + 15927694*y^23 + 13537804*y^24 + 10718700*y^25 + 7894092*y^26 + 5397217*y^27 + 3416824*y^28 + 1996280*y^29 + 1071872*y^30 + 526116*y^31 + 234481*y^32 + 94072*y^33 + 33590*y^34 + 10513*y^35 + 2823*y^36 + 630*y^37 + 111*y^38 + 14*y^39 + y^40)", "y^2*(256 + 2016*y + 7377*y^2 - 26373*y^3 - 48098*y^4 + 36896*y^5 + 782369*y^6 + 2719613*y^7 + 7068229*y^8 + 16760128*y^9 + 40349314*y^10 + 94558958*y^11 + 203451384*y^12 + 391820024*y^13 + 678488596*y^14 + 1062175804*y^15 + 1490818004*y^16 + 1837758660*y^17 + 1941188479*y^18 + 1712465405*y^19 + 1222139302*y^20 + 666961656*y^21 + 238625261*y^22 + 14369273*y^23 - 47249339*y^24 - 33496028*y^25 - 9221521*y^26 + 2392857*y^27 + 3547504*y^28 + 1579584*y^29 + 222184*y^30 - 137832*y^31 - 90840*y^32 - 15596*y^33 + 9033*y^34 + 7811*y^35 + 3158*y^36 + 832*y^37 + 149*y^38 + 17*y^39 + y^40)", "y^2*(16 - 120*y + 513*y^2 - 1793*y^3 + 5454*y^4 - 14100*y^5 + 30521*y^6 - 55743*y^7 + 88505*y^8 - 127532*y^9 + 175618*y^10 - 241198*y^11 + 338256*y^12 - 487256*y^13 + 720860*y^14 - 1085636*y^15 + 1632164*y^16 - 2388024*y^17 + 3328155*y^18 - 4358579*y^19 + 5328190*y^20 - 6065612*y^21 + 6428001*y^22 - 6343087*y^23 + 5829289*y^24 - 4987780*y^25 + 3970311*y^26 - 2935911*y^27 + 2012336*y^28 - 1274368*y^29 + 742248*y^30 - 395144*y^31 + 190684*y^32 - 82516*y^33 + 31577*y^34 - 10493*y^35 + 2954*y^36 - 680*y^37 + 121*y^38 - 15*y^39 + y^40)", "(1 + y + y^2)*(1 + 44*y + 1290*y^2 + 9625*y^3 + 98335*y^4 + 820134*y^5 + 4547539*y^6 + 17795714*y^7 + 51014535*y^8 + 106943488*y^9 + 157237912*y^10 + 139046622*y^11 + 9617236*y^12 - 176986480*y^13 - 278768468*y^14 - 192372940*y^15 + 30491695*y^16 + 217906272*y^17 + 234055346*y^18 + 93450363*y^19 - 72483757*y^20 - 143832874*y^21 - 103241637*y^22 - 18723214*y^23 + 37301584*y^24 + 43393516*y^25 + 21932696*y^26 + 1557193*y^27 - 6219064*y^28 - 4977584*y^29 - 1645848*y^30 + 285452*y^31 + 683653*y^32 + 454928*y^33 + 197186*y^34 + 62529*y^35 + 14875*y^36 + 2622*y^37 + 327*y^38 + 26*y^39 + y^40)", "(1 + y + y^2)*(1 + 8*y + 54*y^2 + 153*y^3 + 411*y^4 + 1206*y^5 + 3971*y^6 + 12814*y^7 + 37303*y^8 + 97064*y^9 + 227896*y^10 + 488934*y^11 + 967380*y^12 + 1774976*y^13 + 3029060*y^14 + 4814268*y^15 + 7130899*y^16 + 9847440*y^17 + 12682974*y^18 + 15239995*y^19 + 17089791*y^20 + 17887342*y^21 + 17474099*y^22 + 15927694*y^23 + 13537804*y^24 + 10718700*y^25 + 7894092*y^26 + 5397217*y^27 + 3416824*y^28 + 1996280*y^29 + 1071872*y^30 + 526116*y^31 + 234481*y^32 + 94072*y^33 + 33590*y^34 + 10513*y^35 + 2823*y^36 + 630*y^37 + 111*y^38 + 14*y^39 + y^40)", "(1 + y + y^2)*(1 + 44*y + 1290*y^2 + 9625*y^3 + 98335*y^4 + 820134*y^5 + 4547539*y^6 + 17795714*y^7 + 51014535*y^8 + 106943488*y^9 + 157237912*y^10 + 139046622*y^11 + 9617236*y^12 - 176986480*y^13 - 278768468*y^14 - 192372940*y^15 + 30491695*y^16 + 217906272*y^17 + 234055346*y^18 + 93450363*y^19 - 72483757*y^20 - 143832874*y^21 - 103241637*y^22 - 18723214*y^23 + 37301584*y^24 + 43393516*y^25 + 21932696*y^26 + 1557193*y^27 - 6219064*y^28 - 4977584*y^29 - 1645848*y^30 + 285452*y^31 + 683653*y^32 + 454928*y^33 + 197186*y^34 + 62529*y^35 + 14875*y^36 + 2622*y^37 + 327*y^38 + 26*y^39 + y^40)" ] }, "GeometricRepresentation":[ 1.33852e1, [ "J10_71_0", 1, "{35, 36}" ] ] } }