{ "Index":235, "Name":"10_151", "RolfsenName":"10_151", "DTname":"10n_8", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-15, -19, -3, 13, 7, -18, 9, -1, -12, -5}", "Acode":"{-8, -10, -2, 7, 4, -10, 5, -1, -7, -3}", "PDcode":[ "{2, 15, 3, 16}", "{4, 19, 5, 20}", "{6, 3, 7, 4}", "{8, 14, 9, 13}", "{10, 8, 11, 7}", "{11, 18, 12, 19}", "{14, 10, 15, 9}", "{16, 1, 17, 2}", "{17, 12, 18, 13}", "{20, 5, 1, 6}" ], "CBtype":"{2, 2}", "ParabolicReps":{ "SolvingSeq":[ "{10, 3, 7}", [], [ "{10, -3, 1, 1}", "{3, -10, 2, 2}", "{3, -2, 4, 1}", "{7, -10, 6, 2}", "{6, 4, 5, 2}", "{10, -7, 9, 2}", "{9, -1, 8, 2}" ], "{1, 4}", "{7}", 7 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 - b^2 - a*b^3 + b^4 + u - u^2 - 2*a*b*u^2 + 2*b^2*u^2 - a^2*b^2*u^2 + 2*a*b^3*u^2 + u^4 + 2*a*b*u^4 + a^2*b^2*u^4", "-b^4 - u - u^2 - b^2*u^2 - a*b^3*u^2 - b^4*u^2 - 2*b^2*u^4 - 2*a*b^3*u^4 - u^6 - 2*a*b*u^6 - a^2*b^2*u^6", "-a + b - a^2*u + u^3 + a^2*u^3 + a*b*u^3 + a*u^4 - 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2336004*u^14 - 1660630*u^15 - 496347*u^16 - 8615*u^17 + 47894*u^18 + 11006*u^19 - 1019*u^20 - 582*u^21 - 25*u^22 + 10*u^23 + u^24", "-1 + 13*u - 80*u^2 + 218*u^3 + 483*u^4 - 2942*u^5 - 6355*u^6 + 20510*u^7 + 24614*u^8 - 21965*u^9 - 21774*u^10 + 22692*u^11 - 354*u^12 - 24903*u^13 + 9344*u^14 + 18288*u^15 - 3629*u^16 - 6907*u^17 + 344*u^18 + 1392*u^19 + 69*u^20 - 144*u^21 - 17*u^22 + 6*u^23 + u^24", "-119 + 161*u - 20*u^2 - 324*u^3 + 913*u^4 - 260*u^5 - 645*u^6 + 2322*u^7 - 1936*u^8 + 1051*u^9 + 1322*u^10 - 1564*u^11 + 1716*u^12 - 123*u^13 - 200*u^14 + 820*u^15 - 451*u^16 + 445*u^17 - 166*u^18 + 126*u^19 - 23*u^20 + 18*u^21 + u^22 + 2*u^23 + u^24", "-29 + 30*u + 34*u^2 + 184*u^3 + 94*u^4 + 681*u^5 - 547*u^6 + 1153*u^7 - 1210*u^8 + 914*u^9 - 740*u^10 + 570*u^11 - 301*u^12 + 691*u^13 - 606*u^14 + 662*u^15 - 583*u^16 + 376*u^17 - 208*u^18 + 100*u^19 - 44*u^20 + 17*u^21 - u^22 - u^23 + u^24", "-904 + 6688*u + 1334*u^2 - 27457*u^3 + 33451*u^4 + 46823*u^5 - 106584*u^6 + 23281*u^7 + 57905*u^8 + 65920*u^9 - 110994*u^10 - 28215*u^11 + 79229*u^12 - 6899*u^13 - 21208*u^14 + 2766*u^15 + 2660*u^16 + 670*u^17 - 418*u^18 - 307*u^19 + 145*u^20 + 45*u^21 - 20*u^22 - u^23 + u^24", "-1 - 12*u - 46*u^2 - 64*u^3 - 242*u^4 + 633*u^5 + 1187*u^6 + 757*u^7 - 3172*u^8 - 684*u^9 + 2328*u^10 - 968*u^11 + 709*u^12 + 1463*u^13 - 2178*u^14 - 790*u^15 + 1597*u^16 + 202*u^17 - 634*u^18 - 14*u^19 + 148*u^20 - 5*u^21 - 19*u^22 + u^23 + u^24", "-19604249 + 69246548*u - 60937306*u^2 + 48780774*u^3 - 140082922*u^4 + 232353665*u^5 - 304982933*u^6 + 354348189*u^7 - 294941210*u^8 + 132466534*u^9 + 6783088*u^10 - 33668362*u^11 + 7929609*u^12 + 5620409*u^13 - 2512248*u^14 - 563562*u^15 + 278195*u^16 + 51088*u^17 - 18100*u^18 - 2148*u^19 + 916*u^20 + 39*u^21 - 31*u^22 - u^23 + u^24", "-17 + 73*u - 336*u^2 + 936*u^3 - 2221*u^4 + 4638*u^5 - 6965*u^6 + 11974*u^7 - 12276*u^8 + 18047*u^9 - 14150*u^10 + 15600*u^11 - 12072*u^12 + 7455*u^13 - 6422*u^14 + 2232*u^15 - 1627*u^16 + 593*u^17 - 80*u^18 + 146*u^19 + 55*u^20 + 24*u^21 + 13*u^22 + 2*u^23 + u^24", "1 + 6310*u + 27827*u^2 + 331727*u^3 + 551167*u^4 - 1211861*u^5 - 4353730*u^6 + 15858548*u^7 - 25528694*u^8 + 26404198*u^9 - 16428849*u^10 + 1204395*u^11 + 9342610*u^12 - 10870981*u^13 + 7084688*u^14 - 3140612*u^15 + 1008953*u^16 - 250358*u^17 + 56651*u^18 - 15069*u^19 + 4469*u^20 - 1105*u^21 + 190*u^22 - 20*u^23 + u^24", "28259656 - 112165876*u + 239603820*u^2 - 606194145*u^3 - 84852811*u^4 + 1778114375*u^5 - 1159294068*u^6 + 1204584361*u^7 + 5108961017*u^8 + 2806838162*u^9 + 1644881474*u^10 - 162027147*u^11 - 235746977*u^12 - 76926447*u^13 + 12583476*u^14 + 8016700*u^15 + 342898*u^16 - 372098*u^17 - 54664*u^18 + 10429*u^19 + 2333*u^20 - 41*u^21 - 32*u^22 - 3*u^23 + u^24", "-34729 + 177326*u + 1089891*u^2 + 1584831*u^3 - 1349393*u^4 - 13607935*u^5 - 21200260*u^6 + 14202560*u^7 + 48040090*u^8 + 39913254*u^9 + 19856177*u^10 + 8371689*u^11 + 5100532*u^12 + 3969193*u^13 + 2754560*u^14 + 1503438*u^15 + 628705*u^16 + 183496*u^17 + 29451*u^18 - 1567*u^19 - 1827*u^20 - 311*u^21 + 10*u^22 + 10*u^23 + u^24" ], "Multiplicity":1, "ij_list":[ [ "{1, 3}", "{2, 10}", "{3, 10}" ], [ "{1, 10}", "{2, 3}", "{2, 4}" ], [ "{3, 4}" ], [ "{1, 2}", "{4, 10}", "{5, 9}", "{8, 9}" ], [ "{1, 4}" ], [ "{3, 8}", "{8, 10}" ], [ "{4, 8}", "{6, 7}", "{9, 10}" ], [ "{1, 8}", "{1, 9}", "{2, 8}" ], [ "{3, 9}" ], [ "{4, 9}" ], [ "{2, 9}" ], [ "{6, 10}", "{7, 9}", "{7, 10}" ], [ "{4, 7}", "{5, 7}", "{5, 8}" ], [ "{5, 10}" ], [ "{4, 5}", "{4, 6}", "{7, 8}" ], [ "{3, 6}" ], [ "{2, 6}", "{3, 7}" ], [ "{2, 7}" ], [ "{2, 5}" ], [ "{3, 5}" ], [ "{1, 7}" ], [ "{1, 6}" ], [ "{1, 5}" ], [ "{5, 6}" ], [ "{6, 9}" ], [ "{6, 8}" ] ], "SortedReprnIndices":"{21, 22, 2, 1, 14, 15, 17, 16, 5, 6, 12, 13, 19, 20, 10, 11, 24, 23, 4, 3, 9, 8, 18, 7}", "aCuspShapeN":[ "2.3512248443229452687`4.800723360125914 + 4.7066010196420210104`5.102136582603536*I", "2.3512248443229452687`4.800723360125914 - 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3.5896625017724417597`4.845626659093538*I", 1.0172e1, "6.6046304057272125238`5.128506216456899 - 2.157082163520619869`4.642524384637011*I", "6.6046304057272125238`5.128506216456899 + 2.157082163520619869`4.642524384637011*I", "4.8742751943478498566`4.897596828427024 - 7.2380299816305476836`5.069307160990103*I", "4.8742751943478498566`4.897596828427024 + 7.2380299816305476836`5.069307160990103*I", "-2.517660058000165274`5.0695576617949465 + 1.6923214678974738101`4.8970434355167045*I", "-2.517660058000165274`5.0695576617949465 - 1.6923214678974738101`4.8970434355167045*I" ], "Abelian":false }, { "IdealName":"J10_151_1", "Generators":[ "b", "-1 + a + 2*u - u^2", "1 - u^2 + u^3" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":6.1305e-2, "TimingZeroDimVars":7.3792e-2, "TimingmagmaVCompNormalize":7.5001e-2, "TimingNumberOfSols":4.3103999999999996e-2, "TimingIsRadical":2.5800000000000007e-3, "TimingArcColoring":8.0994e-2, "TimingObstruction":1.8759999999999998e-3, "TimingComplexVolumeN":2.422415, "TimingaCuspShapeN":1.4593e-2, "TiminguValues":0.639513, "TiminguPolysN":4.92e-4, "TiminguPolys":0.817738, "TimingaCuspShape":0.102561, "TimingRepresentationsN":4.0938e-2, "TiminguValues_ij":0.171566, "TiminguPoly_ij":0.911238, "TiminguPolys_ij_N":8.050000000000003e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":3, "IsRadical":true, "ArcColoring":[ [ 1, "-u^2" ], [ "-u", "u" ], [ 0, "u" ], [ "-1 + u^2", "1 + u - u^2" ], [ "2*(-u + u^2)", "1 + u - u^2" ], [ "1 - 2*u + u^2", 0 ], [ "1 - 2*u + u^2", 0 ], [ "1 - u^2", "-1 - u + u^2" ], "{1, 0}", "{1, 0}" ], "Obstruction":1, "ComplexVolumeN":[ "-4.66906 + 2.82812*I", "-4.66906 - 2.82812*I", -0.53148 ], "uPolysN":[ "-1 + 2*u - u^2 + u^3", "-1 + u^2 + u^3", "-1 + 2*u - 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", "u^3", "1 - u^2 + u^3" ], "uPolys":[ "-1 + 2*u - u^2 + u^3", "-1 + u^2 + u^3", "-1 + 2*u - u^2 + u^3", "(-1 + u)^3", "(1 + u)^3", "u^3", "(1 + u)^3", "1 + 2*u + u^2 + u^3", "u^3", "1 - u^2 + u^3" ], "aCuspShape":"-4 - u^2", "RepresentationsN":[ [ "u->0.877439 + 0.744862 I", "a->-0.539798 - 0.182582 I", "b->0" ], [ "u->0.877439 - 0.744862 I", "a->-0.539798 + 0.182582 I", "b->0" ], [ "u->-0.754878", "a->3.0796", "b->0" ] ], "Epsilon":1.53383, "uPolys_ij":[ "u^3", "(-1 + u)^3", "(-2 + u)^3", "-1 + u - 2*u^2 + u^3", "-1 + u^2 + u^3", "1 - u^2 + u^3", "1 + 2*u + u^2 + u^3", "-1 + 2*u - 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1.3071412786820454805`4.622093035322414*I", "-4.2150798545009733671`5.130576312438043 + 1.3071412786820454805`4.622093035322414*I", -4.5698 ], "Abelian":false }, { "IdealName":"abJ10_151_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":5.8322000000000006e-2, "TimingZeroDimVars":7.1595e-2, "TimingmagmaVCompNormalize":7.2691e-2, "TimingNumberOfSols":2.9858e-2, "TimingIsRadical":1.936e-3, "TimingArcColoring":6.8683e-2, "TimingObstruction":3.88e-4, "TimingComplexVolumeN":0.415283, "TimingaCuspShapeN":4.3890000000000005e-3, "TiminguValues":0.633922, "TiminguPolysN":7.500000000000002e-5, "TiminguPolys":0.804977, "TimingaCuspShape":8.8545e-2, "TimingRepresentationsN":2.9333e-2, "TiminguValues_ij":0.15729, "TiminguPoly_ij":0.165367, "TiminguPolys_ij_N":5.8e-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 + 2*u - u^2 + u^3)*(-1 - u - 2*u^3 + 5*u^4 - 14*u^5 + 17*u^6 - 14*u^7 + 50*u^8 + 3*u^9 + 64*u^10 + 30*u^11 + 102*u^12 + 47*u^13 + 70*u^14 + 34*u^15 + 57*u^16 + 29*u^17 + 32*u^18 + 16*u^19 + 15*u^20 + 6*u^21 + 5*u^22 + 2*u^23 + u^24)", "(-1 + u^2 + u^3)*(1 + 3*u + 4*u^2 - 8*u^3 - 29*u^4 - 14*u^5 + 31*u^6 + 44*u^7 + 36*u^8 + 3*u^9 - 72*u^10 - 86*u^11 + 73*u^13 + 74*u^14 + 14*u^15 - 61*u^16 - 59*u^17 + 14*u^18 + 42*u^19 + 7*u^20 - 14*u^21 - 5*u^22 + 2*u^23 + u^24)", "(-1 + 2*u - u^2 + u^3)*(1 - u + 6*u^2 - 150*u^3 + 673*u^4 - 1164*u^5 + 93*u^6 + 2890*u^7 - 4286*u^8 + 245*u^9 + 6724*u^10 - 9182*u^11 + 3980*u^12 + 3901*u^13 - 7560*u^14 + 5216*u^15 - 315*u^16 - 3085*u^17 + 3658*u^18 - 2518*u^19 + 1199*u^20 - 406*u^21 + 95*u^22 - 14*u^23 + u^24)", "(-1 + u)^3*(-1 + 10*u - 5*u^2 - 49*u^3 + 55*u^4 + 95*u^5 - 200*u^6 - 12*u^7 + 292*u^8 - 158*u^9 - 213*u^10 + 243*u^11 + 72*u^12 - 197*u^13 + 8*u^14 + 132*u^15 - 41*u^16 - 74*u^17 + 59*u^18 + 11*u^19 - 31*u^20 + 11*u^21 + 4*u^22 - 4*u^23 + u^24)", "(1 + u)^3*(1 + 90*u + 895*u^2 + 4451*u^3 + 13991*u^4 + 31535*u^5 + 56042*u^6 + 83336*u^7 + 106478*u^8 + 119306*u^9 + 118687*u^10 + 106023*u^11 + 85526*u^12 + 62659*u^13 + 41904*u^14 + 25564*u^15 + 14301*u^16 + 7286*u^17 + 3379*u^18 + 1407*u^19 + 517*u^20 + 163*u^21 + 42*u^22 + 8*u^23 + u^24)", "u^3*(8 - 4*u - 84*u^2 - 81*u^3 + 147*u^4 + 565*u^5 + 1020*u^6 + 725*u^7 - 621*u^8 - 1816*u^9 - 1434*u^10 + 391*u^11 + 1573*u^12 + 849*u^13 - 296*u^14 - 508*u^15 - 244*u^16 - 18*u^17 + 118*u^18 + 93*u^19 - 5*u^20 - 29*u^21 - 6*u^22 + 3*u^23 + u^24)", "(1 + u)^3*(-1 + 10*u - 5*u^2 - 49*u^3 + 55*u^4 + 95*u^5 - 200*u^6 - 12*u^7 + 292*u^8 - 158*u^9 - 213*u^10 + 243*u^11 + 72*u^12 - 197*u^13 + 8*u^14 + 132*u^15 - 41*u^16 - 74*u^17 + 59*u^18 + 11*u^19 - 31*u^20 + 11*u^21 + 4*u^22 - 4*u^23 + u^24)", "(1 + 2*u + u^2 + u^3)*(-1 - u - 2*u^3 + 5*u^4 - 14*u^5 + 17*u^6 - 14*u^7 + 50*u^8 + 3*u^9 + 64*u^10 + 30*u^11 + 102*u^12 + 47*u^13 + 70*u^14 + 34*u^15 + 57*u^16 + 29*u^17 + 32*u^18 + 16*u^19 + 15*u^20 + 6*u^21 + 5*u^22 + 2*u^23 + u^24)", "u^3*(8 - 4*u - 84*u^2 - 81*u^3 + 147*u^4 + 565*u^5 + 1020*u^6 + 725*u^7 - 621*u^8 - 1816*u^9 - 1434*u^10 + 391*u^11 + 1573*u^12 + 849*u^13 - 296*u^14 - 508*u^15 - 244*u^16 - 18*u^17 + 118*u^18 + 93*u^19 - 5*u^20 - 29*u^21 - 6*u^22 + 3*u^23 + u^24)", "(1 - u^2 + u^3)*(1 + 3*u + 4*u^2 - 8*u^3 - 29*u^4 - 14*u^5 + 31*u^6 + 44*u^7 + 36*u^8 + 3*u^9 - 72*u^10 - 86*u^11 + 73*u^13 + 74*u^14 + 14*u^15 - 61*u^16 - 59*u^17 + 14*u^18 + 42*u^19 + 7*u^20 - 14*u^21 - 5*u^22 + 2*u^23 + u^24)" ], "RileyPolyC":[ "(-1 + 2*y + 3*y^2 + y^3)*(1 - y - 14*y^2 - 66*y^3 - 159*y^4 - 204*y^5 + 265*y^6 + 2302*y^7 + 6762*y^8 + 12845*y^9 + 19452*y^10 + 22962*y^11 + 24564*y^12 + 21537*y^13 + 17496*y^14 + 12140*y^15 + 7681*y^16 + 4283*y^17 + 2114*y^18 + 930*y^19 + 351*y^20 + 114*y^21 + 31*y^22 + 6*y^23 + y^24)", "(-1 + 2*y - y^2 + y^3)*(1 - y + 6*y^2 - 150*y^3 + 673*y^4 - 1164*y^5 + 93*y^6 + 2890*y^7 - 4286*y^8 + 245*y^9 + 6724*y^10 - 9182*y^11 + 3980*y^12 + 3901*y^13 - 7560*y^14 + 5216*y^15 - 315*y^16 - 3085*y^17 + 3658*y^18 - 2518*y^19 + 1199*y^20 - 406*y^21 + 95*y^22 - 14*y^23 + y^24)", "(-1 + 2*y + 3*y^2 + y^3)*(1 + 11*y + 1082*y^2 - 16566*y^3 + 102053*y^4 - 400212*y^5 + 1111397*y^6 - 2242590*y^7 + 3275126*y^8 - 3417979*y^9 + 2475472*y^10 - 1100170*y^11 + 98776*y^12 + 265945*y^13 - 220092*y^14 + 92300*y^15 - 17475*y^16 - 2705*y^17 + 5714*y^18 - 2382*y^19 + 995*y^20 - 214*y^21 + 55*y^22 - 6*y^23 + y^24)", "(-1 + y)^3*(1 - 90*y + 895*y^2 - 4451*y^3 + 13991*y^4 - 31535*y^5 + 56042*y^6 - 83336*y^7 + 106478*y^8 - 119306*y^9 + 118687*y^10 - 106023*y^11 + 85526*y^12 - 62659*y^13 + 41904*y^14 - 25564*y^15 + 14301*y^16 - 7286*y^17 + 3379*y^18 - 1407*y^19 + 517*y^20 - 163*y^21 + 42*y^22 - 8*y^23 + y^24)", "(-1 + y)^3*(1 - 6310*y + 27827*y^2 - 331727*y^3 + 551167*y^4 + 1211861*y^5 - 4353730*y^6 - 15858548*y^7 - 25528694*y^8 - 26404198*y^9 - 16428849*y^10 - 1204395*y^11 + 9342610*y^12 + 10870981*y^13 + 7084688*y^14 + 3140612*y^15 + 1008953*y^16 + 250358*y^17 + 56651*y^18 + 15069*y^19 + 4469*y^20 + 1105*y^21 + 190*y^22 + 20*y^23 + y^24)", "y^3*(64 - 1360*y + 8760*y^2 - 10417*y^3 - 62357*y^4 + 164961*y^5 + 13592*y^6 - 360847*y^7 + 293411*y^8 + 39188*y^9 + 168140*y^10 - 903595*y^11 + 1273941*y^12 - 880627*y^13 + 228928*y^14 + 129604*y^15 - 152712*y^16 + 64692*y^17 - 8148*y^18 - 5489*y^19 + 3623*y^20 - 1103*y^21 + 200*y^22 - 21*y^23 + y^24)", "(-1 + y)^3*(1 - 90*y + 895*y^2 - 4451*y^3 + 13991*y^4 - 31535*y^5 + 56042*y^6 - 83336*y^7 + 106478*y^8 - 119306*y^9 + 118687*y^10 - 106023*y^11 + 85526*y^12 - 62659*y^13 + 41904*y^14 - 25564*y^15 + 14301*y^16 - 7286*y^17 + 3379*y^18 - 1407*y^19 + 517*y^20 - 163*y^21 + 42*y^22 - 8*y^23 + y^24)", "(-1 + 2*y + 3*y^2 + y^3)*(1 - y - 14*y^2 - 66*y^3 - 159*y^4 - 204*y^5 + 265*y^6 + 2302*y^7 + 6762*y^8 + 12845*y^9 + 19452*y^10 + 22962*y^11 + 24564*y^12 + 21537*y^13 + 17496*y^14 + 12140*y^15 + 7681*y^16 + 4283*y^17 + 2114*y^18 + 930*y^19 + 351*y^20 + 114*y^21 + 31*y^22 + 6*y^23 + y^24)", "y^3*(64 - 1360*y + 8760*y^2 - 10417*y^3 - 62357*y^4 + 164961*y^5 + 13592*y^6 - 360847*y^7 + 293411*y^8 + 39188*y^9 + 168140*y^10 - 903595*y^11 + 1273941*y^12 - 880627*y^13 + 228928*y^14 + 129604*y^15 - 152712*y^16 + 64692*y^17 - 8148*y^18 - 5489*y^19 + 3623*y^20 - 1103*y^21 + 200*y^22 - 21*y^23 + y^24)", "(-1 + 2*y - y^2 + y^3)*(1 - y + 6*y^2 - 150*y^3 + 673*y^4 - 1164*y^5 + 93*y^6 + 2890*y^7 - 4286*y^8 + 245*y^9 + 6724*y^10 - 9182*y^11 + 3980*y^12 + 3901*y^13 - 7560*y^14 + 5216*y^15 - 315*y^16 - 3085*y^17 + 3658*y^18 - 2518*y^19 + 1199*y^20 - 406*y^21 + 95*y^22 - 14*y^23 + y^24)" ] }, "GeometricRepresentation":[ 1.1843e1, [ "J10_151_0", 1, "{21, 22}" ] ] } }