{ "Index":124, "Name":"10_40", "RolfsenName":"10_40", "DTname":"10a_30", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-11, 17, -19, -13, -1, -9, -5, 3, 15, -7}", "Acode":"{-6, 9, -10, -7, -1, -5, -3, 2, 8, -4}", "PDcode":[ "{2, 11, 3, 12}", "{4, 18, 5, 17}", "{6, 19, 7, 20}", "{8, 13, 9, 14}", "{10, 1, 11, 2}", "{12, 9, 13, 10}", "{14, 5, 15, 6}", "{16, 4, 17, 3}", "{18, 16, 19, 15}", "{20, 7, 1, 8}" ], "CBtype":"{2, 0}", "ParabolicReps":{ "SolvingSeq":[ "{2, 9}", [], [ "{2, 9, 3, 1}", "{9, 2, 8, 2}", "{9, 8, 10, 1}", "{3, -10, 4, 1}", "{8, -3, 7, 2}", "{4, -7, 5, 1}", "{7, -5, 6, 2}", "{2, -6, 1, 2}" ], "{10}", "{5}", 5 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + u + u^2 - 2*u^3 - 2*u^4 + 2*u^5 - 2*u^6 - 2*u^7 + 16*u^8 + 3*u^9 - 54*u^10 - 2*u^11 + 146*u^12 + u^13 - 316*u^14 + 558*u^16 - 834*u^18 + 1028*u^20 - 868*u^22 - 36*u^24 + 2064*u^26 - 5496*u^28 + 10386*u^30 - 16327*u^32 + 22351*u^34 - 27182*u^36 + 29652*u^38 - 29036*u^40 + 25328*u^42 - 19418*u^44 + 12874*u^46 - 7253*u^48 + 3405*u^50 - 1300*u^52 + 390*u^54 - 87*u^56 + 13*u^58 - u^60", "u - u^2 - u^3 + 2*u^5 + 8*u^6 - 4*u^7 - 24*u^8 + 5*u^9 + 36*u^10 - 3*u^11 - 8*u^12 + u^13 - 180*u^14 + 804*u^16 - 2326*u^18 + 5400*u^20 - 10860*u^22 + 19540*u^24 - 31890*u^26 + 47612*u^28 - 65466*u^30 + 83202*u^32 - 97773*u^34 + 106072*u^36 - 105980*u^38 + 97132*u^40 - 81098*u^42 + 61036*u^44 - 40846*u^46 + 23922*u^48 - 12045*u^50 + 5108*u^52 - 1778*u^54 + 490*u^56 - 101*u^58 + 14*u^60 - u^62" ], "TimingForPrimaryIdeals":9.2801e-2 }, "v":{ "CheckEq":[ "-1 + v" ], "TimingForPrimaryIdeals":7.091800000000001e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_40_0", "Generators":[ "1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.437999999999999e-2, "TimingZeroDimVars":2.171e-2, "TimingmagmaVCompNormalize":2.2904e-2, "TimingNumberOfSols":5.6929999999999994e-2, "TimingIsRadical":1.641e-3, "TimingArcColoring":5.6246000000000004e-2, "TimingObstruction":5.0352e-2, "TimingComplexVolumeN":3.0984844e1, "TimingaCuspShapeN":0.190053, "TiminguValues":0.667083, "TiminguPolysN":6.1008e-2, "TiminguPolys":0.87439, "TimingaCuspShape":0.127371, "TimingRepresentationsN":6.6011e-2, "TiminguValues_ij":0.159389, "TiminguPoly_ij":2.280177, "TiminguPolys_ij_N":0.151818 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":32, "IsRadical":true, "ArcColoring":[ [ "u - 2*u^3 + 2*u^5 - 2*u^7 + 3*u^9 - 2*u^11 + u^13", "u - u^3 + 2*u^5 - 4*u^7 + 5*u^9 - 3*u^11 + u^13" ], "{1, 0}", [ 1, "u^2" ], [ "1 + u^4 - u^6 + u^8", "2*u^4 - 2*u^6 + u^8" ], [ "1 - u^8 + 4*u^10 - 5*u^12 + 3*u^14 - u^16", "-u^2 + 4*u^4 - 6*u^6 + 8*u^8 - 11*u^10 + 12*u^12 - 9*u^14 + 4*u^16 - u^18" ], [ "-u + 2*u^3 - 2*u^5 + 4*u^7 - 4*u^9 - 2*u^11 + 10*u^13 - 20*u^15 + 35*u^17 - 50*u^19 + 52*u^21 - 38*u^23 + 19*u^25 - 6*u^27 + u^29", "u - 4*u^5 + 12*u^7 - 26*u^9 + 52*u^11 - 86*u^13 + 118*u^15 - 143*u^17 + 156*u^19 - 146*u^21 + 110*u^23 - 63*u^25 + 26*u^27 - 7*u^29 + u^31" ], [ "u^3", "u - u^3 + u^5" ], [ "u", "u" ], [ 0, "u" ], [ "-u^3", "u - u^3" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-1.64326 + 1.19641*I", "-1.64326 - 1.19641*I", "0.109 - 4.15286*I", "0.109 + 4.15286*I", "-3.63561 - 0.05779*I", "-3.63561 + 0.05779*I", "3.03384 + 5.05352*I", "3.03384 - 5.05352*I", "-2.66422 + 5.49753*I", "-2.66422 - 5.49753*I", "6.73005 - 1.36697*I", "6.73005 + 1.36697*I", "2.26376 - 7.72193*I", "2.26376 + 7.72193*I", "0.9896 + 2.26361*I", "0.9896 - 2.26361*I", "-5.70053 + 0.95663*I", "-5.70053 - 0.95663*I", "0.08923 - 4.79464*I", "0.08923 + 4.79464*I", "-5.50827 - 6.53878*I", "-5.50827 + 6.53878*I", "4.95901 + 6.50568*I", "4.95901 - 6.50568*I", "-1.06972 - 7.30693*I", "-1.06972 + 7.30693*I", "0.19628 + 12.8887*I", "0.19628 - 12.8887*I", "1.16921 + 0.193186*I", "1.16921 - 0.193186*I", "-2.60826 + 2.66625*I", "-2.60826 - 2.66625*I" ], "uPolysN":[ "1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32", "1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32", "4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32", "1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32", "1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32", "1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32", "3 + 2*u + 28*u^2 - 9*u^3 + 80*u^4 - 143*u^5 + 40*u^6 - 359*u^7 + 200*u^8 - 189*u^9 + 471*u^10 + 341*u^11 + 671*u^12 + 636*u^13 + 1054*u^14 + 1022*u^15 + 1218*u^16 + 1053*u^17 + 1064*u^18 + 920*u^19 + 785*u^20 + 565*u^21 + 487*u^22 + 358*u^23 + 239*u^24 + 138*u^25 + 100*u^26 + 60*u^27 + 31*u^28 + 12*u^29 + 7*u^30 + 3*u^31 + u^32", "1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32", "1 + 2*u + 3*u^2 - 10*u^3 - 47*u^4 - 102*u^5 - 150*u^6 - 104*u^7 + 336*u^8 + 1759*u^9 + 5033*u^10 + 11339*u^11 + 22118*u^12 + 38599*u^13 + 61131*u^14 + 88758*u^15 + 118995*u^16 + 147717*u^17 + 169707*u^18 + 180139*u^19 + 176225*u^20 + 158120*u^21 + 129018*u^22 + 94566*u^23 + 61352*u^24 + 34666*u^25 + 16763*u^26 + 6799*u^27 + 2255*u^28 + 590*u^29 + 115*u^30 + 15*u^31 + u^32", "4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32" ], "uPolys":[ "1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32", "1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32", "4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32", "1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32", "1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32", "1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32", "3 + 2*u + 28*u^2 - 9*u^3 + 80*u^4 - 143*u^5 + 40*u^6 - 359*u^7 + 200*u^8 - 189*u^9 + 471*u^10 + 341*u^11 + 671*u^12 + 636*u^13 + 1054*u^14 + 1022*u^15 + 1218*u^16 + 1053*u^17 + 1064*u^18 + 920*u^19 + 785*u^20 + 565*u^21 + 487*u^22 + 358*u^23 + 239*u^24 + 138*u^25 + 100*u^26 + 60*u^27 + 31*u^28 + 12*u^29 + 7*u^30 + 3*u^31 + u^32", "1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32", "1 + 2*u + 3*u^2 - 10*u^3 - 47*u^4 - 102*u^5 - 150*u^6 - 104*u^7 + 336*u^8 + 1759*u^9 + 5033*u^10 + 11339*u^11 + 22118*u^12 + 38599*u^13 + 61131*u^14 + 88758*u^15 + 118995*u^16 + 147717*u^17 + 169707*u^18 + 180139*u^19 + 176225*u^20 + 158120*u^21 + 129018*u^22 + 94566*u^23 + 61352*u^24 + 34666*u^25 + 16763*u^26 + 6799*u^27 + 2255*u^28 + 590*u^29 + 115*u^30 + 15*u^31 + u^32", "4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32" ], "aCuspShape":"4 - 2*(-1 - 2*u^2 - 4*u^3 + 10*u^4 + 8*u^5 - 6*u^6 - 10*u^7 - 16*u^8 - 2*u^9 + 34*u^10 + 34*u^11 - 56*u^12 - 68*u^13 + 116*u^14 + 114*u^15 - 200*u^16 - 202*u^17 + 242*u^18 + 308*u^19 - 206*u^20 - 348*u^21 + 124*u^22 + 282*u^23 - 52*u^24 - 162*u^25 + 14*u^26 + 64*u^27 - 2*u^28 - 16*u^29 + 2*u^31)", "RepresentationsN":[ [ "u->-0.961241 + 0.329628 I" ], [ "u->-0.961241 - 0.329628 I" ], [ "u->0.934575 + 0.495071 I" ], [ "u->0.934575 - 0.495071 I" ], [ "u->-1.07714 + 0.188783 I" ], [ "u->-1.07714 - 0.188783 I" ], [ "u->-0.550946 + 0.717103 I" ], [ "u->-0.550946 - 0.717103 I" ], [ "u->1.09903 + 0.150244 I" ], [ "u->1.09903 - 0.150244 I" ], [ "u->-0.473676 + 0.749403 I" ], [ "u->-0.473676 - 0.749403 I" ], [ "u->-0.40741 + 0.774508 I" ], [ "u->-0.40741 - 0.774508 I" ], [ "u->0.399421 + 0.743579 I" ], [ "u->0.399421 - 0.743579 I" ], [ "u->-1.10476 + 0.408512 I" ], [ "u->-1.10476 - 0.408512 I" ], [ "u->1.04104 + 0.566496 I" ], [ "u->1.04104 - 0.566496 I" ], [ "u->1.10835 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528*u^27 + 267*u^28 - 42*u^29 + 19*u^30 - u^31 + u^32", "16 - 184*u + 3913*u^2 - 26639*u^3 + 79441*u^4 - 144549*u^5 + 468675*u^6 - 1285715*u^7 + 1530022*u^8 + 520679*u^9 - 3790001*u^10 + 4187155*u^11 - 64090*u^12 - 4711671*u^13 + 5399943*u^14 - 2061371*u^15 - 1355242*u^16 + 2087849*u^17 - 817368*u^18 - 394632*u^19 + 610011*u^20 - 245240*u^21 - 56996*u^22 + 108658*u^23 - 42862*u^24 - 8692*u^25 + 19247*u^26 - 11751*u^27 + 4399*u^28 - 1115*u^29 + 190*u^30 - 20*u^31 + u^32", "183 + 3494*u + 11184*u^2 - 32355*u^3 + 334040*u^4 + 828559*u^5 + 2576020*u^6 + 4570447*u^7 + 7284200*u^8 + 7628029*u^9 + 7544083*u^10 + 4929071*u^11 + 3661247*u^12 + 1111820*u^13 + 1174850*u^14 - 192382*u^15 + 513146*u^16 - 287013*u^17 + 304400*u^18 - 171996*u^19 + 168573*u^20 - 85053*u^21 + 70479*u^22 - 33898*u^23 + 20479*u^24 - 8842*u^25 + 4108*u^26 - 1456*u^27 + 535*u^28 - 144*u^29 + 39*u^30 - 7*u^31 + u^32", "1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32", "1009 - 18684*u + 159897*u^2 - 642234*u^3 + 1378355*u^4 - 1546382*u^5 + 845776*u^6 - 53816*u^7 + 1363118*u^8 - 2208033*u^9 + 1506811*u^10 + 3444143*u^11 - 4646416*u^12 + 2777661*u^13 + 5634179*u^14 - 10046746*u^15 + 13442599*u^16 - 10554015*u^17 + 9087523*u^18 - 5210067*u^19 + 3776355*u^20 - 1483934*u^21 + 1013746*u^22 - 283928*u^23 + 179386*u^24 - 37044*u^25 + 20707*u^26 - 3085*u^27 + 1479*u^28 - 146*u^29 + 59*u^30 - 3*u^31 + u^32", "8244 + 21052*u - 28645*u^2 - 309529*u^3 + 128438*u^4 - 260383*u^5 + 700187*u^6 - 1135176*u^7 + 5915799*u^8 + 5573343*u^9 + 12520448*u^10 + 3279459*u^11 + 11704139*u^12 + 2234274*u^13 + 9104073*u^14 + 3208387*u^15 + 6285204*u^16 + 2932931*u^17 + 3181928*u^18 + 1550815*u^19 + 1184399*u^20 + 505586*u^21 + 329901*u^22 + 111095*u^23 + 65768*u^24 + 17139*u^25 + 8969*u^26 + 1776*u^27 + 797*u^28 + 109*u^29 + 42*u^30 + 3*u^31 + u^32", "26057 - 45742*u - 18923*u^2 - 217380*u^3 + 3222927*u^4 - 14320126*u^5 + 40608552*u^6 - 85549110*u^7 + 143128690*u^8 - 194197657*u^9 + 215590165*u^10 - 193046549*u^11 + 132811794*u^12 - 59710549*u^13 + 2537983*u^14 + 23277190*u^15 - 21951023*u^16 + 9055055*u^17 + 1367929*u^18 - 4306941*u^19 + 2507383*u^20 - 349046*u^21 - 379850*u^22 + 223320*u^23 - 14492*u^24 - 28304*u^25 + 9089*u^26 + 1007*u^27 - 1001*u^28 + 94*u^29 + 47*u^30 - 13*u^31 + u^32", "96053 - 375514*u + 1011053*u^2 - 1868980*u^3 + 2670205*u^4 - 2453962*u^5 + 1061602*u^6 + 1569928*u^7 - 4790604*u^8 + 7480635*u^9 - 5501075*u^10 - 2367843*u^11 + 10030254*u^12 - 8694633*u^13 + 640063*u^14 + 5987824*u^15 - 901581*u^16 - 3395831*u^17 + 3719289*u^18 - 1248317*u^19 - 467503*u^20 + 992536*u^21 - 340002*u^22 - 238148*u^23 + 128536*u^24 + 24732*u^25 - 18839*u^26 - 1011*u^27 + 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68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32" ], "Multiplicity":1, "MinRepresentationVolume":[ "{5, 6}", 5.779e-2 ], "ij_list":[ [ "{2, 8}", "{2, 9}", "{3, 9}" ], [ "{2, 3}", "{8, 9}", "{8, 10}" ], [ "{7, 9}", "{9, 10}" ], [ "{2, 10}", "{3, 7}", "{3, 8}" ], [ "{1, 4}", "{2, 7}", "{3, 10}", "{4, 10}" ], [ "{7, 8}" ], [ "{4, 8}" ], [ "{2, 4}", "{7, 10}" ], [ "{4, 9}" ], [ "{1, 10}", "{3, 4}" ], [ "{1, 8}" ], [ "{1, 2}", "{4, 7}", "{5, 6}", "{5, 7}" ], [ "{1, 9}" ], [ "{1, 3}" ], [ "{3, 5}" ], [ "{5, 9}" ], [ "{1, 7}", "{2, 5}" ], [ "{5, 8}" ], [ "{5, 10}" ], [ "{4, 5}", "{6, 7}" ], [ "{3, 6}" ], [ "{6, 9}" ], [ "{4, 6}" ], [ "{6, 10}" ], [ "{6, 8}" ], [ "{1, 5}", "{1, 6}", "{2, 6}" ] ], "SortedReprnIndices":"{27, 28, 14, 13, 26, 25, 22, 21, 23, 24, 9, 10, 7, 8, 20, 19, 4, 3, 31, 32, 15, 16, 12, 11, 1, 2, 17, 18, 29, 30, 6, 5}", "aCuspShapeN":[ "-1.5752473029241999366`5.09478279180588 - 0.8520919863400167423`4.827920528020838*I", 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u^4", "1 + u^3 + u^4", "1 + 2*u^2 + u^3 + u^4", "1 - 4*u + 6*u^2 - 4*u^3 + u^4" ], "uPolys":[ "1 + u^3 + u^4", "1 + u^3 + u^4", "(-1 + u)^4", "1 + 2*u^2 - u^3 + u^4", "1 + u^3 + u^4", "1 + 2*u^2 - u^3 + u^4", "3 - 2*u - u^2 + u^4", "1 + u^3 + u^4", "1 + 2*u^2 + u^3 + u^4", "(-1 + u)^4" ], "aCuspShape":6, "RepresentationsN":[ [ "u->0.518913 + 0.66661 I" ], [ "u->0.518913 - 0.66661 I" ], [ "u->-1.01891 + 0.602565 I" ], [ "u->-1.01891 - 0.602565 I" ] ], "Epsilon":1.20513, "uPolys_ij":[ "u^4", "(-1 + u)^4", "1 + u^3 + u^4", "1 + 2*u^2 + u^3 + u^4", "1 + 2*u^2 - u^3 + u^4", "1 + 4*u + 6*u^2 + 3*u^3 + u^4", "1 + 5*u^2 + 4*u^3 + u^4", "3 - 2*u - u^2 + u^4", "5 - 2*u - 4*u^2 + u^3 + u^4", "11 - 8*u + 6*u^2 - u^3 + u^4", "1 - 4*u + 6*u^2 - 3*u^3 + u^4", "9 - 10*u + 7*u^2 - 2*u^3 + u^4", "17 - 14*u + 10*u^2 - 5*u^3 + u^4" ], "GeometricComponent":0, "uPolys_ij_N":[ "u^4", "1 - 4*u + 6*u^2 - 4*u^3 + u^4", "1 + u^3 + u^4", "1 + 2*u^2 + u^3 + u^4", "1 + 2*u^2 - u^3 + u^4", "1 + 4*u + 6*u^2 + 3*u^3 + u^4", "1 + 5*u^2 + 4*u^3 + u^4", "3 - 2*u - u^2 + u^4", "5 - 2*u - 4*u^2 + u^3 + u^4", "11 - 8*u + 6*u^2 - u^3 + u^4", "1 - 4*u + 6*u^2 - 3*u^3 + u^4", "9 - 10*u + 7*u^2 - 2*u^3 + u^4", "17 - 14*u + 10*u^2 - 5*u^3 + u^4" ], "Multiplicity":1, "ij_list":[ [ "{1, 3}", "{6, 9}" ], [ "{1, 4}", "{1, 10}", "{2, 7}", "{3, 4}", "{3, 10}", "{4, 10}" ], [ "{1, 5}", "{1, 6}", "{1, 9}", "{2, 6}", "{2, 8}", "{2, 9}", "{3, 5}", "{3, 6}", "{3, 9}" ], [ "{2, 3}", "{8, 9}", "{8, 10}" ], [ "{1, 2}", "{4, 7}", "{5, 6}", "{5, 7}", "{5, 9}", "{6, 8}" ], [ "{4, 5}", "{6, 7}" ], [ "{4, 6}", "{4, 9}" ], [ "{1, 7}", "{1, 8}", "{2, 5}", "{2, 10}", "{3, 7}", "{3, 8}" ], [ "{2, 4}", "{7, 10}" ], [ "{4, 8}" ], [ "{6, 10}", "{7, 9}", "{9, 10}" ], [ "{5, 10}", "{7, 8}" ], [ "{5, 8}" ] ], "SortedReprnIndices":"{1, 2, 3, 4}", "aCuspShapeN":[ 6.0, 6.0, 6.0, 6.0 ], "Abelian":false }, { "IdealName":"J10_40_2", "Generators":[ "-1 + u" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.848900000000001e-2, "TimingZeroDimVars":1.9023e-2, "TimingmagmaVCompNormalize":2.0261e-2, "TimingNumberOfSols":1.7073e-2, "TimingIsRadical":1.269e-3, "TimingArcColoring":5.0395e-2, "TimingObstruction":4.93e-4, "TimingComplexVolumeN":0.64495, "TimingaCuspShapeN":5.1849999999999995e-3, "TiminguValues":0.636683, "TiminguPolysN":1.1000000000000003e-4, "TiminguPolys":0.809584, "TimingaCuspShape":0.105206, "TimingRepresentationsN":2.0878999999999998e-2, "TiminguValues_ij":0.13634, "TiminguPoly_ij":0.342478, "TiminguPolys_ij_N":6.400000000000002e-5 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{1, 1}", "{1, 0}", "{1, 1}", "{2, 1}", "{1, 0}", "{0, 1}", "{1, 1}", "{1, 1}", "{0, 1}", "{-1, 0}" ], "Obstruction":-1, "ComplexVolumeN":[ 1.64493 ], "uPolysN":[ "-1 + u", "-1 + u", "-1 + u", "-1 + u", "-1 + u", "-1 + u", "u", "-1 + u", "1 + u", "-1 + u" ], "uPolys":[ "-1 + u", "-1 + u", "-1 + u", "-1 + u", "-1 + u", "-1 + u", "u", "-1 + u", "1 + u", "-1 + u" ], "aCuspShape":6, "RepresentationsN":[ [ "u->1." ] ], "Epsilon":"Infinity", "uPolys_ij":[ "1 + u", "u", "-1 + u", "-2 + u" ], "GeometricComponent":0, "uPolys_ij_N":[ "1 + u", "u", "-1 + u", "-2 + u" ], "Multiplicity":1, "ij_list":[ [ "{2, 3}", "{2, 4}", "{6, 10}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ], [ "{1, 3}", "{1, 7}", "{1, 8}", "{2, 5}", "{2, 10}", "{3, 7}", "{3, 8}", "{5, 10}", "{6, 9}", "{7, 8}" ], [ "{1, 2}", "{1, 4}", "{1, 5}", "{1, 6}", "{1, 9}", "{1, 10}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 9}", "{3, 10}", "{4, 5}", "{4, 7}", "{4, 8}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{6, 7}", "{6, 8}" ], [ "{4, 6}", "{4, 9}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":[ 6.0 ], "Abelian":false }, { "IdealName":"abJ10_40_3", "Generators":[ "-1 + v" ], "VariableOrder":[ "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.0655e-2, "TimingZeroDimVars":1.8757e-2, "TimingmagmaVCompNormalize":1.9804e-2, "TimingNumberOfSols":1.7123e-2, "TimingIsRadical":1.398e-3, "TimingArcColoring":4.7288e-2, "TimingObstruction":5.250000000000001e-4, "TimingComplexVolumeN":0.377676, "TimingaCuspShapeN":4.736e-3, "TiminguValues":0.633631, "TiminguPolysN":1.09e-4, "TiminguPolys":0.810948, "TimingaCuspShape":9.573100000000001e-2, "TimingRepresentationsN":2.108e-2, "TiminguValues_ij":0.137403, "TiminguPoly_ij":0.14035, "TiminguPolys_ij_N":2.7000000000000002e-5 }, "ZeroDimensionalVars":[ "v" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}" ], "Obstruction":1, "ComplexVolumeN":"{0}", "uPolysN":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "uPolys":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "aCuspShape":0, "RepresentationsN":[ [ "v->1." ] ], "Epsilon":"Infinity", "uPolys_ij":[ "u" ], "GeometricComponent":0, "uPolys_ij_N":[ "u" ], "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 3}", "{1, 4}", "{1, 5}", "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{1, 10}", "{2, 3}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{3, 10}", "{4, 5}", "{4, 6}", "{4, 7}", "{4, 8}", "{4, 9}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{5, 10}", "{6, 7}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":"{0}", "Abelian":true } ] }, "uPolyC":[ "(-1 + u)*(1 + u^3 + u^4)*(1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32)", "(-1 + u)*(1 + u^3 + u^4)*(1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32)", "(-1 + u)^5*(4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32)", "(-1 + u)*(1 + 2*u^2 - u^3 + u^4)*(1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32)", "(-1 + u)*(1 + u^3 + u^4)*(1 + 2*u + u^2 - 8*u^3 - 15*u^4 + 6*u^5 + 46*u^6 + 20*u^7 - 82*u^8 - 77*u^9 + 115*u^10 + 169*u^11 - 116*u^12 - 267*u^13 + 81*u^14 + 338*u^15 - 19*u^16 - 353*u^17 - 47*u^18 + 305*u^19 + 85*u^20 - 220*u^21 - 90*u^22 + 130*u^23 + 68*u^24 - 62*u^25 - 39*u^26 + 23*u^27 + 17*u^28 - 6*u^29 - 5*u^30 + u^31 + u^32)", "(-1 + u)*(1 + 2*u^2 - u^3 + u^4)*(1 - 2*u + 3*u^2 - 26*u^3 + 169*u^4 - 722*u^5 + 2426*u^6 - 6768*u^7 + 16336*u^8 - 34759*u^9 + 66129*u^10 - 113515*u^11 + 177002*u^12 - 252003*u^13 + 328787*u^14 - 394194*u^15 + 435051*u^16 - 442401*u^17 + 414571*u^18 - 357755*u^19 + 283881*u^20 - 206628*u^21 + 137486*u^22 - 83238*u^23 + 45572*u^24 - 22382*u^25 + 9755*u^26 - 3719*u^27 + 1215*u^28 - 330*u^29 + 71*u^30 - 11*u^31 + u^32)", "u*(3 - 2*u - u^2 + u^4)*(3 + 2*u + 28*u^2 - 9*u^3 + 80*u^4 - 143*u^5 + 40*u^6 - 359*u^7 + 200*u^8 - 189*u^9 + 471*u^10 + 341*u^11 + 671*u^12 + 636*u^13 + 1054*u^14 + 1022*u^15 + 1218*u^16 + 1053*u^17 + 1064*u^18 + 920*u^19 + 785*u^20 + 565*u^21 + 487*u^22 + 358*u^23 + 239*u^24 + 138*u^25 + 100*u^26 + 60*u^27 + 31*u^28 + 12*u^29 + 7*u^30 + 3*u^31 + u^32)", "(-1 + u)*(1 + u^3 + u^4)*(1 - u^2 + u^4 + 2*u^5 + 6*u^6 + 4*u^7 - 18*u^8 - 23*u^9 + 29*u^10 + 49*u^11 - 38*u^12 - 79*u^13 + 55*u^14 + 126*u^15 - 69*u^16 - 191*u^17 + 49*u^18 + 239*u^19 + 9*u^20 - 230*u^21 - 64*u^22 + 166*u^23 + 78*u^24 - 88*u^25 - 55*u^26 + 33*u^27 + 25*u^28 - 8*u^29 - 7*u^30 + u^31 + u^32)", "(1 + u)*(1 + 2*u^2 + u^3 + u^4)*(1 + 2*u + 3*u^2 - 10*u^3 - 47*u^4 - 102*u^5 - 150*u^6 - 104*u^7 + 336*u^8 + 1759*u^9 + 5033*u^10 + 11339*u^11 + 22118*u^12 + 38599*u^13 + 61131*u^14 + 88758*u^15 + 118995*u^16 + 147717*u^17 + 169707*u^18 + 180139*u^19 + 176225*u^20 + 158120*u^21 + 129018*u^22 + 94566*u^23 + 61352*u^24 + 34666*u^25 + 16763*u^26 + 6799*u^27 + 2255*u^28 + 590*u^29 + 115*u^30 + 15*u^31 + u^32)", "(-1 + u)^5*(4 + 28*u + 75*u^2 - 33*u^3 - 445*u^4 - 711*u^5 + 173*u^6 + 2179*u^7 + 3052*u^8 + 1373*u^9 - 1223*u^10 - 3099*u^11 - 3028*u^12 + 35*u^13 + 3269*u^14 + 2831*u^15 - 32*u^16 - 1853*u^17 - 1616*u^18 - 220*u^19 + 875*u^20 + 820*u^21 + 136*u^22 - 338*u^23 - 334*u^24 - 40*u^25 + 149*u^26 + 83*u^27 - 23*u^28 - 29*u^29 - 2*u^30 + 4*u^31 + u^32)" ], "RileyPolyC":[ "(-1 + y)*(1 + 2*y^2 - y^3 + y^4)*(1 - 2*y + 3*y^2 - 26*y^3 + 169*y^4 - 722*y^5 + 2426*y^6 - 6768*y^7 + 16336*y^8 - 34759*y^9 + 66129*y^10 - 113515*y^11 + 177002*y^12 - 252003*y^13 + 328787*y^14 - 394194*y^15 + 435051*y^16 - 442401*y^17 + 414571*y^18 - 357755*y^19 + 283881*y^20 - 206628*y^21 + 137486*y^22 - 83238*y^23 + 45572*y^24 - 22382*y^25 + 9755*y^26 - 3719*y^27 + 1215*y^28 - 330*y^29 + 71*y^30 - 11*y^31 + y^32)", "(-1 + y)*(1 + 2*y^2 - y^3 + y^4)*(1 - 2*y + 3*y^2 + 10*y^3 - 47*y^4 + 102*y^5 - 150*y^6 + 104*y^7 + 336*y^8 - 1759*y^9 + 5033*y^10 - 11339*y^11 + 22118*y^12 - 38599*y^13 + 61131*y^14 - 88758*y^15 + 118995*y^16 - 147717*y^17 + 169707*y^18 - 180139*y^19 + 176225*y^20 - 158120*y^21 + 129018*y^22 - 94566*y^23 + 61352*y^24 - 34666*y^25 + 16763*y^26 - 6799*y^27 + 2255*y^28 - 590*y^29 + 115*y^30 - 15*y^31 + y^32)", "(-1 + y)^5*(16 - 184*y + 3913*y^2 - 26639*y^3 + 79441*y^4 - 144549*y^5 + 468675*y^6 - 1285715*y^7 + 1530022*y^8 + 520679*y^9 - 3790001*y^10 + 4187155*y^11 - 64090*y^12 - 4711671*y^13 + 5399943*y^14 - 2061371*y^15 - 1355242*y^16 + 2087849*y^17 - 817368*y^18 - 394632*y^19 + 610011*y^20 - 245240*y^21 - 56996*y^22 + 108658*y^23 - 42862*y^24 - 8692*y^25 + 19247*y^26 - 11751*y^27 + 4399*y^28 - 1115*y^29 + 190*y^30 - 20*y^31 + y^32)", "(-1 + y)*(1 + 4*y + 6*y^2 + 3*y^3 + y^4)*(1 + 2*y + 243*y^2 + 2302*y^3 + 11173*y^4 + 38006*y^5 + 123302*y^6 + 424848*y^7 + 1297888*y^8 + 3062701*y^9 + 5330549*y^10 + 6563509*y^11 + 4936306*y^12 + 336877*y^13 - 4620013*y^14 - 6460466*y^15 - 4163425*y^16 - 127001*y^17 + 2414987*y^18 + 2368333*y^19 + 967453*y^20 - 174892*y^21 - 492534*y^22 - 314414*y^23 - 86960*y^24 + 17686*y^25 + 30547*y^26 + 16529*y^27 + 5635*y^28 + 1322*y^29 + 211*y^30 + 21*y^31 + y^32)", "(-1 + y)*(1 + 2*y^2 - y^3 + y^4)*(1 - 2*y + 3*y^2 - 26*y^3 + 169*y^4 - 722*y^5 + 2426*y^6 - 6768*y^7 + 16336*y^8 - 34759*y^9 + 66129*y^10 - 113515*y^11 + 177002*y^12 - 252003*y^13 + 328787*y^14 - 394194*y^15 + 435051*y^16 - 442401*y^17 + 414571*y^18 - 357755*y^19 + 283881*y^20 - 206628*y^21 + 137486*y^22 - 83238*y^23 + 45572*y^24 - 22382*y^25 + 9755*y^26 - 3719*y^27 + 1215*y^28 - 330*y^29 + 71*y^30 - 11*y^31 + y^32)", "(-1 + y)*(1 + 4*y + 6*y^2 + 3*y^3 + y^4)*(1 + 2*y + 243*y^2 + 2302*y^3 + 11173*y^4 + 38006*y^5 + 123302*y^6 + 424848*y^7 + 1297888*y^8 + 3062701*y^9 + 5330549*y^10 + 6563509*y^11 + 4936306*y^12 + 336877*y^13 - 4620013*y^14 - 6460466*y^15 - 4163425*y^16 - 127001*y^17 + 2414987*y^18 + 2368333*y^19 + 967453*y^20 - 174892*y^21 - 492534*y^22 - 314414*y^23 - 86960*y^24 + 17686*y^25 + 30547*y^26 + 16529*y^27 + 5635*y^28 + 1322*y^29 + 211*y^30 + 21*y^31 + y^32)", "y*(9 - 10*y + 7*y^2 - 2*y^3 + y^4)*(9 + 164*y + 1300*y^2 + 5211*y^3 + 8702*y^4 - 5729*y^5 - 43438*y^6 - 44081*y^7 + 220556*y^8 + 890509*y^9 + 1726847*y^10 + 2541625*y^11 + 3150211*y^12 + 3266704*y^13 + 2984678*y^14 + 2466374*y^15 + 1891488*y^16 + 1315637*y^17 + 889292*y^18 + 549098*y^19 + 335171*y^20 + 183943*y^21 + 103649*y^22 + 49006*y^23 + 25517*y^24 + 10028*y^25 + 4664*y^26 + 1460*y^27 + 571*y^28 + 130*y^29 + 39*y^30 + 5*y^31 + y^32)", "(-1 + y)*(1 + 2*y^2 - y^3 + y^4)*(1 - 2*y + 3*y^2 + 10*y^3 - 47*y^4 + 102*y^5 - 150*y^6 + 104*y^7 + 336*y^8 - 1759*y^9 + 5033*y^10 - 11339*y^11 + 22118*y^12 - 38599*y^13 + 61131*y^14 - 88758*y^15 + 118995*y^16 - 147717*y^17 + 169707*y^18 - 180139*y^19 + 176225*y^20 - 158120*y^21 + 129018*y^22 - 94566*y^23 + 61352*y^24 - 34666*y^25 + 16763*y^26 - 6799*y^27 + 2255*y^28 - 590*y^29 + 115*y^30 - 15*y^31 + y^32)", "(-1 + y)*(1 + 4*y + 6*y^2 + 3*y^3 + y^4)*(1 + 2*y - 45*y^2 - 274*y^3 + 357*y^4 + 6662*y^5 + 33958*y^6 + 101472*y^7 + 224656*y^8 + 376765*y^9 + 518653*y^10 + 586277*y^11 + 593634*y^12 + 517053*y^13 + 439779*y^14 + 316206*y^15 + 279135*y^16 + 174335*y^17 + 166547*y^18 + 80525*y^19 + 76253*y^20 + 29148*y^21 + 28258*y^22 + 10586*y^23 + 9520*y^24 + 3702*y^25 + 2531*y^26 + 865*y^27 + 419*y^28 + 106*y^29 + 35*y^30 + 5*y^31 + y^32)", "(-1 + y)^5*(16 - 184*y + 3913*y^2 - 26639*y^3 + 79441*y^4 - 144549*y^5 + 468675*y^6 - 1285715*y^7 + 1530022*y^8 + 520679*y^9 - 3790001*y^10 + 4187155*y^11 - 64090*y^12 - 4711671*y^13 + 5399943*y^14 - 2061371*y^15 - 1355242*y^16 + 2087849*y^17 - 817368*y^18 - 394632*y^19 + 610011*y^20 - 245240*y^21 - 56996*y^22 + 108658*y^23 - 42862*y^24 - 8692*y^25 + 19247*y^26 - 11751*y^27 + 4399*y^28 - 1115*y^29 + 190*y^30 - 20*y^31 + y^32)" ] }, "GeometricRepresentation":[ 1.28887e1, [ "J10_40_0", 1, "{27, 28}" ] ] } }