{ "Index":109, "Name":"10_25", "RolfsenName":"10_25", "DTname":"10a_61", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{10, 14, 12, -18, 20, 4, 6, 2, -8, 16}", "Acode":"{6, 8, 7, -10, 1, 3, 4, 2, -5, 9}", "PDcode":[ "{1, 11, 2, 10}", "{3, 15, 4, 14}", "{5, 13, 6, 12}", "{7, 18, 8, 19}", "{9, 1, 10, 20}", "{11, 5, 12, 4}", "{13, 7, 14, 6}", "{15, 3, 16, 2}", "{17, 8, 18, 9}", "{19, 17, 20, 16}" ], "CBtype":"{2, 0}", "ParabolicReps":{ "SolvingSeq":[ "{8, 4}", [], [ "{8, 4, 7, 2}", "{4, 7, 3, 2}", "{3, 8, 2, 2}", "{8, 2, 9, 1}", "{7, 3, 6, 2}", "{2, 6, 1, 2}", "{6, 1, 5, 2}", "{1, 9, 10, 2}" ], "{4}", "{9}", 9 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + 4*u^2 + 16*u^3 + 6*u^4 - 16*u^5 - 14*u^6 - 172*u^7 - 3*u^8 + 240*u^9 + 22*u^10 + 760*u^11 - 19*u^12 - 1524*u^13 + 7*u^14 - 1479*u^15 - u^16 + 5368*u^17 - 752*u^19 - 10088*u^21 + 9936*u^23 + 6064*u^25 - 18464*u^27 + 11048*u^29 + 7462*u^31 - 18712*u^33 + 17136*u^35 - 9768*u^37 + 3804*u^39 - 1024*u^41 + 184*u^43 - 20*u^45 + u^47", "u + 3*u^2 + 4*u^3 - 2*u^4 - 10*u^5 - 12*u^6 - 54*u^7 + 12*u^8 + 125*u^9 + 17*u^10 + 250*u^11 - 36*u^12 - 719*u^13 + 25*u^14 - 449*u^15 - 8*u^16 + 2475*u^17 + u^18 - 730*u^19 - 4750*u^21 + 5422*u^23 + 2732*u^25 - 10064*u^27 + 6226*u^29 + 5256*u^31 - 13103*u^33 + 12562*u^35 - 7536*u^37 + 3092*u^39 - 877*u^41 + 166*u^43 - 19*u^45 + u^47" ], "TimingForPrimaryIdeals":9.113e-2 }, "v":{ "CheckEq":[ "-1 + v" ], "TimingForPrimaryIdeals":7.2314e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_25_0", "Generators":[ "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.9196e-2, "TimingZeroDimVars":1.7719000000000002e-2, "TimingmagmaVCompNormalize":1.8947000000000002e-2, "TimingNumberOfSols":6.0368000000000005e-2, "TimingIsRadical":1.857e-3, "TimingArcColoring":6.052e-2, "TimingObstruction":4.4439e-2, "TimingComplexVolumeN":2.747891e1, "TimingaCuspShapeN":0.143907, "TiminguValues":0.64241, "TiminguPolysN":4.9642e-2, "TiminguPolys":0.863273, "TimingaCuspShape":0.124879, "TimingRepresentationsN":6.6383e-2, "TiminguValues_ij":0.159538, "TiminguPoly_ij":2.049146, "TiminguPolys_ij_N":0.116297 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":32, "IsRadical":true, "ArcColoring":[ [ "3*u - 5*u^5 + 4*u^7 - u^9", "u - 3*u^3 - 3*u^5 + 8*u^7 - 5*u^9 + u^11" ], [ "2*u - u^3", "u - u^3" ], [ "u", "u - u^3" ], [ 0, "u" ], [ "1 - 4*u^2 - 6*u^4 + 14*u^6 + 3*u^8 - 22*u^10 + 19*u^12 - 7*u^14 + u^16", "-3*u^2 + 2*u^4 + 12*u^6 - 12*u^8 - 17*u^10 + 36*u^12 - 25*u^14 + 8*u^16 - u^18" ], [ "1 - u^2", "-2*u^2 + u^4" ], [ 1, "-u^2" ], "{1, 0}", [ "1 + 2*u^2 - 3*u^4 + u^6", "u^2 - 2*u^4 + u^6" ], [ "4*u - 2*u^3 - 22*u^5 + 19*u^7 + 44*u^9 - 64*u^11 - 20*u^13 + 100*u^15 - 92*u^17 + 42*u^19 - 10*u^21 + u^23", "u - 2*u^3 - 9*u^5 + 11*u^7 + 17*u^9 - 30*u^11 - 14*u^13 + 66*u^15 - 67*u^17 + 34*u^19 - 9*u^21 + u^23" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-3.8983 + 3.89503*I", "-3.8983 - 3.89503*I", "-1.32933 + 0.52783*I", "-1.32933 - 0.52783*I", "-1.27472 - 7.88151*I", "-1.27472 + 7.88151*I", "-4.28206 - 3.88889*I", "-4.28206 + 3.88889*I", "4.01456 + 2.24194*I", "4.01456 - 2.24194*I", "1.56622 + 3.15266*I", "1.56622 - 3.15266*I", "-2.34434 + 0.39737*I", "-2.34434 - 0.39737*I", "0.29651 + 1.65231*I", "0.29651 - 1.65231*I", "-5.00599 - 2.81562*I", "-5.00599 + 2.81562*I", "-0.06115 - 6.1751*I", "-0.06115 + 6.1751*I", "-3.13584 - 7.01747*I", "-3.13584 + 7.01747*I", -7.31963, "-7.25067 + 3.23058*I", "-7.25067 - 3.23058*I", -1.22821, "-6.10646 + 11.8758*I", "-6.10646 - 11.8758*I", "-10.8267 + 4.39858*I", "-10.8267 - 4.39858*I", "-0.501058 + 1.03498*I", "-0.501058 - 1.03498*I" ], "uPolysN":[ "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "1 - 8*u^2 - 8*u^3 + 28*u^4 + 48*u^5 - 68*u^6 - 276*u^7 - 146*u^8 + 620*u^9 + 1184*u^10 - 116*u^11 - 3166*u^12 - 4224*u^13 + 838*u^14 + 9826*u^15 + 13067*u^16 + 2940*u^17 - 14792*u^18 - 22716*u^19 - 7778*u^20 + 25004*u^21 + 56258*u^22 + 68962*u^23 + 60619*u^24 + 41064*u^25 + 21966*u^26 + 9310*u^27 + 3091*u^28 + 782*u^29 + 143*u^30 + 17*u^31 + u^32" ], "uPolys":[ "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "1 - 8*u^2 - 8*u^3 + 28*u^4 + 48*u^5 - 68*u^6 - 276*u^7 - 146*u^8 + 620*u^9 + 1184*u^10 - 116*u^11 - 3166*u^12 - 4224*u^13 + 838*u^14 + 9826*u^15 + 13067*u^16 + 2940*u^17 - 14792*u^18 - 22716*u^19 - 7778*u^20 + 25004*u^21 + 56258*u^22 + 68962*u^23 + 60619*u^24 + 41064*u^25 + 21966*u^26 + 9310*u^27 + 3091*u^28 + 782*u^29 + 143*u^30 + 17*u^31 + u^32" ], "aCuspShape":"-6 - 4*(1 + 3*u - u^2 + u^3 + 3*u^4 - 27*u^5 + 15*u^6 + u^7 - 32*u^8 + 106*u^9 - 30*u^10 - 80*u^11 + 109*u^12 - 153*u^13 - 44*u^14 + 252*u^15 - 120*u^16 - 16*u^17 + 192*u^18 - 270*u^19 - 134*u^20 + 316*u^21 + 52*u^22 - 185*u^23 - 11*u^24 + 63*u^25 + u^26 - 12*u^27 + u^29)", "RepresentationsN":[ [ "u->1.02901 + 0.281289 I" ], [ "u->1.02901 - 0.281289 I" ], [ "u->-1.13423 + 0.236397 I" ], [ "u->-1.13423 - 0.236397 I" ], [ "u->0.166316 + 0.775774 I" ], [ "u->0.166316 - 0.775774 I" ], [ "u->0.729645 + 0.240963 I" ], [ "u->0.729645 - 0.240963 I" ], [ "u->-0.028912 + 0.764004 I" ], [ "u->-0.028912 - 0.764004 I" ], [ "u->-0.140851 + 0.7482 I" ], [ "u->-0.140851 - 0.7482 I" ], [ "u->0.191682 + 0.700576 I" ], [ "u->0.191682 - 0.700576 I" ], [ "u->-1.23771 + 0.31365 I" ], [ "u->-1.23771 - 0.31365 I" ], [ "u->1.28843 + 0.161328 I" ], [ "u->1.28843 - 0.161328 I" ], [ "u->1.2812 + 0.325415 I" ], [ "u->1.2812 - 0.325415 I" ], [ "u->1.35033 + 0.317347 I" ], [ "u->1.35033 - 0.317347 I" ], [ "u->1.39424" ], [ "u->-1.36434 + 0.29382 I" ], [ "u->-1.36434 - 0.29382 I" ], [ "u->-0.599844" ], [ "u->-1.36419 + 0.328069 I" ], [ "u->-1.36419 - 0.328069 I" ], [ "u->-1.41547 + 0.02215 I" ], [ "u->-1.41547 - 0.02215 I" ], [ "u->-0.248101 + 0.323031 I" ], [ "u->-0.248101 - 0.323031 I" ] ], "Epsilon":3.42495e-2, "uPolys_ij":[ "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "1 + 16*u^2 + 104*u^3 - 216*u^4 - 1372*u^5 + 620*u^6 + 9080*u^7 + 3854*u^8 - 35260*u^9 - 41288*u^10 + 75088*u^11 + 171394*u^12 - 31000*u^13 - 380606*u^14 - 284726*u^15 + 357351*u^16 + 754784*u^17 + 271732*u^18 - 613356*u^19 - 925906*u^20 - 407196*u^21 + 353754*u^22 + 744366*u^23 + 674979*u^24 + 408324*u^25 + 180582*u^26 + 59946*u^27 + 14911*u^28 + 2714*u^29 + 343*u^30 + 27*u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "1 + 16*u + 152*u^2 + 1352*u^3 + 6868*u^4 + 24288*u^5 + 70556*u^6 + 159464*u^7 + 237954*u^8 + 168144*u^9 - 83220*u^10 - 267736*u^11 - 126826*u^12 + 176352*u^13 + 238118*u^14 + 9936*u^15 - 165969*u^16 - 97984*u^17 + 45692*u^18 + 73432*u^19 + 12086*u^20 - 26480*u^21 - 16302*u^22 + 2356*u^23 + 6027*u^24 + 1704*u^25 - 842*u^26 - 684*u^27 - 85*u^28 + 88*u^29 + 49*u^30 + 11*u^31 + u^32", "4 - 50*u + 255*u^2 + 1181*u^3 + 2016*u^4 - 4698*u^5 - 7146*u^6 + 44820*u^7 + 178533*u^8 + 115936*u^9 - 292037*u^10 - 555255*u^11 + 313721*u^12 + 729368*u^13 - 510122*u^14 - 76790*u^15 + 372936*u^16 - 288124*u^17 - 131529*u^18 + 155721*u^19 + 39186*u^20 - 37068*u^21 - 498*u^22 - 1870*u^23 + 2583*u^24 - 1436*u^25 + 466*u^26 - 214*u^27 + 143*u^28 - 28*u^29 + 13*u^30 - u^31 + u^32", "1 - 8*u^2 + 88*u^3 - 812*u^4 + 2136*u^5 + 4476*u^6 - 17220*u^7 - 125902*u^8 + 973160*u^9 - 3295780*u^10 + 7294260*u^11 - 11874714*u^12 + 14941452*u^13 - 14667530*u^14 + 10796398*u^15 - 4999057*u^16 - 108904*u^17 + 2684764*u^18 - 2703812*u^19 + 1479094*u^20 - 344932*u^21 - 168094*u^22 + 212046*u^23 - 105589*u^24 + 24940*u^25 + 3366*u^26 - 5662*u^27 + 2635*u^28 - 754*u^29 + 143*u^30 - 17*u^31 + u^32", "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "4961 - 29832*u + 77688*u^2 - 54548*u^3 - 361132*u^4 + 1074108*u^5 - 109060*u^6 - 3573654*u^7 + 3817618*u^8 + 4771652*u^9 - 10378620*u^10 - 306574*u^11 + 12107838*u^12 - 4562894*u^13 - 8203524*u^14 + 4761684*u^15 + 4087559*u^16 - 2103728*u^17 - 2925732*u^18 + 1348280*u^19 + 1677694*u^20 - 1143868*u^21 - 376230*u^22 + 550324*u^23 - 127085*u^24 - 47764*u^25 + 28054*u^26 - 2016*u^27 - 1561*u^28 + 364*u^29 + 9*u^30 - 11*u^31 + u^32", "173 + 588*u + 2018*u^2 + 3846*u^3 + 2788*u^4 - 1706*u^5 - 18640*u^6 - 7570*u^7 - 3818*u^8 + 78512*u^9 + 197482*u^10 + 16360*u^11 + 402134*u^12 + 544796*u^13 - 1266938*u^14 - 2047732*u^15 + 350457*u^16 + 2311762*u^17 + 972438*u^18 - 699668*u^19 - 808884*u^20 - 291674*u^21 + 182878*u^22 + 216882*u^23 + 7369*u^24 - 43044*u^25 - 6864*u^26 + 3978*u^27 + 907*u^28 - 174*u^29 - 49*u^30 + 3*u^31 + u^32", "-16 - 128*u - 359*u^2 - 665*u^3 - 2256*u^4 - 7582*u^5 - 20254*u^6 - 40292*u^7 - 67827*u^8 - 92286*u^9 - 60739*u^10 + 61495*u^11 + 166729*u^12 + 91420*u^13 - 102066*u^14 - 154854*u^15 - 6668*u^16 + 110226*u^17 + 54485*u^18 - 41017*u^19 - 41850*u^20 + 4956*u^21 + 17498*u^22 + 2562*u^23 - 4669*u^24 - 1596*u^25 + 774*u^26 + 450*u^27 - 53*u^28 - 70*u^29 - 5*u^30 + 5*u^31 + u^32", "-1373 + 10610*u + 27538*u^2 - 6300*u^3 - 148384*u^4 - 38928*u^5 + 480930*u^6 + 629278*u^7 - 948546*u^8 - 1636258*u^9 + 270044*u^10 + 2258410*u^11 + 1164928*u^12 - 1611332*u^13 - 1610946*u^14 + 482008*u^15 + 871369*u^16 + 63488*u^17 - 194948*u^18 - 95624*u^19 + 13092*u^20 + 33544*u^21 + 896*u^22 - 6008*u^23 - 1973*u^24 - 140*u^25 + 290*u^26 + 128*u^27 + 83*u^28 + 36*u^29 + 21*u^30 + 5*u^31 + u^32", "25 + 296*u + 484*u^2 - 4500*u^3 + 9184*u^4 + 205988*u^5 + 825944*u^6 + 1660280*u^7 + 1743254*u^8 + 327964*u^9 - 1669360*u^10 - 2170496*u^11 - 493878*u^12 + 1475336*u^13 + 1572750*u^14 + 53834*u^15 - 1063545*u^16 - 748512*u^17 + 156180*u^18 + 519200*u^19 + 254150*u^20 - 58368*u^21 - 90202*u^22 + 39610*u^23 + 125963*u^24 + 116988*u^25 + 67438*u^26 + 27338*u^27 + 8051*u^28 + 1710*u^29 + 251*u^30 + 23*u^31 + u^32", "404 + 2374*u - 50201*u^2 + 101723*u^3 + 1381478*u^4 + 4262882*u^5 + 4247070*u^6 - 4119424*u^7 - 15858969*u^8 - 10873852*u^9 + 12738527*u^10 + 25724927*u^11 + 10586157*u^12 - 11320972*u^13 - 14501274*u^14 - 3785418*u^15 + 3922960*u^16 + 3542092*u^17 + 607067*u^18 - 272549*u^19 + 327556*u^20 + 525868*u^21 + 110962*u^22 - 100346*u^23 - 16343*u^24 + 21456*u^25 + 590*u^26 - 3110*u^27 + 141*u^28 + 232*u^29 - 23*u^30 - 7*u^31 + u^32", "-19583 - 188540*u - 904568*u^2 - 3173714*u^3 - 9849820*u^4 - 27208794*u^5 - 60483954*u^6 - 97251942*u^7 - 97174678*u^8 - 27615304*u^9 + 71381752*u^10 + 98782282*u^11 + 16362350*u^12 - 81491318*u^13 - 86061932*u^14 - 16155936*u^15 + 31357935*u^16 + 22312840*u^17 - 1124036*u^18 - 6454960*u^19 - 1282242*u^20 + 1057384*u^21 + 314142*u^22 - 157450*u^23 - 43765*u^24 + 24000*u^25 + 4550*u^26 - 2880*u^27 - 261*u^28 + 228*u^29 - 3*u^30 - 9*u^31 + u^32", "1 - 8*u^2 - 8*u^3 + 28*u^4 + 48*u^5 - 68*u^6 - 276*u^7 - 146*u^8 + 620*u^9 + 1184*u^10 - 116*u^11 - 3166*u^12 - 4224*u^13 + 838*u^14 + 9826*u^15 + 13067*u^16 + 2940*u^17 - 14792*u^18 - 22716*u^19 - 7778*u^20 + 25004*u^21 + 56258*u^22 + 68962*u^23 + 60619*u^24 + 41064*u^25 + 21966*u^26 + 9310*u^27 + 3091*u^28 + 782*u^29 + 143*u^30 + 17*u^31 + u^32", "-28963 - 144374*u - 354514*u^2 - 691164*u^3 - 1113950*u^4 - 1293614*u^5 - 878706*u^6 - 301658*u^7 - 268770*u^8 - 402590*u^9 - 62602*u^10 + 553590*u^11 + 340200*u^12 - 209796*u^13 - 128514*u^14 + 68878*u^15 + 97061*u^16 - 189242*u^17 + 54920*u^18 + 29210*u^19 + 10374*u^20 - 3514*u^21 - 11836*u^22 - 548*u^23 + 3603*u^24 + 352*u^25 - 318*u^26 - 210*u^27 - 9*u^28 + 50*u^29 - u^30 - 5*u^31 + u^32", "4996 + 43266*u + 205411*u^2 + 749971*u^3 + 2223224*u^4 + 5189630*u^5 + 9408554*u^6 + 13429446*u^7 + 15513341*u^8 + 14900100*u^9 + 12017859*u^10 + 8010181*u^11 + 4362593*u^12 + 2208696*u^13 + 1448686*u^14 + 1002390*u^15 + 183804*u^16 - 612564*u^17 - 743373*u^18 - 299149*u^19 + 106878*u^20 + 158424*u^21 + 33218*u^22 - 31860*u^23 - 16909*u^24 + 2608*u^25 + 3422*u^26 + 160*u^27 - 385*u^28 - 52*u^29 + 33*u^30 + 11*u^31 + u^32", "5 - 4*u - 28*u^2 + 716*u^3 + 1978*u^4 - 4876*u^5 - 31388*u^6 - 50044*u^7 + 19558*u^8 + 322638*u^9 + 706866*u^10 + 1085832*u^11 + 1429734*u^12 + 1408968*u^13 + 1408000*u^14 + 1230674*u^15 + 936205*u^16 + 723328*u^17 + 498388*u^18 + 310222*u^19 + 224970*u^20 + 108090*u^21 + 78644*u^22 + 30446*u^23 + 19809*u^24 + 6338*u^25 + 3528*u^26 + 894*u^27 + 427*u^28 + 76*u^29 + 31*u^30 + 3*u^31 + u^32", "-2161 - 6234*u + 49836*u^2 + 332900*u^3 + 823980*u^4 + 928770*u^5 + 94240*u^6 - 1088314*u^7 - 1641286*u^8 - 1621968*u^9 - 1226906*u^10 - 572726*u^11 + 229492*u^12 + 902390*u^13 + 1126418*u^14 + 1064248*u^15 + 763607*u^16 + 480480*u^17 + 259096*u^18 + 114342*u^19 + 55716*u^20 + 7602*u^21 + 8414*u^22 - 4690*u^23 + 2529*u^24 - 1868*u^25 + 902*u^26 - 396*u^27 + 219*u^28 - 60*u^29 + 21*u^30 - 5*u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "172 - 1136*u + 4443*u^2 + 19545*u^3 - 59348*u^4 + 406668*u^5 - 1087674*u^6 + 3667322*u^7 - 6486971*u^8 + 13953292*u^9 - 19139101*u^10 + 26436495*u^11 - 21187639*u^12 + 22916360*u^13 - 10662126*u^14 + 10997038*u^15 - 987464*u^16 + 2130022*u^17 + 2273927*u^18 - 604383*u^19 + 1719442*u^20 - 546038*u^21 + 610010*u^22 - 175696*u^23 + 127695*u^24 - 28538*u^25 + 16950*u^26 - 2596*u^27 + 1339*u^28 - 136*u^29 + 57*u^30 - 3*u^31 + u^32", "1984 + 14272*u + 5728*u^2 - 138912*u^3 + 186252*u^4 + 466180*u^5 - 718335*u^6 + 2843741*u^7 + 5334699*u^8 + 5054790*u^9 + 23658927*u^10 + 30882657*u^11 + 22267795*u^12 + 31835898*u^13 + 28955736*u^14 + 20222838*u^15 + 16131300*u^16 + 10864182*u^17 + 7564271*u^18 + 3614129*u^19 + 2025391*u^20 + 1227606*u^21 + 349916*u^22 + 210126*u^23 + 66696*u^24 + 15042*u^25 + 12531*u^26 + 537*u^27 + 1291*u^28 + 34*u^29 + 59*u^30 + u^31 + u^32", "-1879 - 3036*u + 8772*u^2 + 30090*u^3 + 60670*u^4 + 92594*u^5 + 70098*u^6 - 35810*u^7 - 134810*u^8 - 112318*u^9 + 67946*u^10 + 350538*u^11 + 631318*u^12 + 887160*u^13 + 914164*u^14 + 894052*u^15 + 787313*u^16 + 569948*u^17 + 493364*u^18 + 272710*u^19 + 229644*u^20 + 102322*u^21 + 76822*u^22 + 28630*u^23 + 18413*u^24 + 5454*u^25 + 3196*u^26 + 638*u^27 + 373*u^28 + 42*u^29 + 27*u^30 + u^31 + u^32", "1 + 16*u + 120*u^2 + 648*u^3 + 2348*u^4 + 5824*u^5 + 7588*u^6 - 940*u^7 - 18486*u^8 - 7408*u^9 + 81164*u^10 + 107724*u^11 + 29102*u^12 - 193620*u^13 + 302870*u^14 + 60050*u^15 + 299503*u^16 - 32792*u^17 + 270364*u^18 + 35852*u^19 + 265358*u^20 + 89684*u^21 + 145690*u^22 + 47278*u^23 + 43891*u^24 + 11676*u^25 + 7662*u^26 + 1542*u^27 + 779*u^28 + 106*u^29 + 43*u^30 + 3*u^31 + u^32" ], "GeometricComponent":"{27, 28}", "uPolys_ij_N":[ "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "1 + 16*u^2 + 104*u^3 - 216*u^4 - 1372*u^5 + 620*u^6 + 9080*u^7 + 3854*u^8 - 35260*u^9 - 41288*u^10 + 75088*u^11 + 171394*u^12 - 31000*u^13 - 380606*u^14 - 284726*u^15 + 357351*u^16 + 754784*u^17 + 271732*u^18 - 613356*u^19 - 925906*u^20 - 407196*u^21 + 353754*u^22 + 744366*u^23 + 674979*u^24 + 408324*u^25 + 180582*u^26 + 59946*u^27 + 14911*u^28 + 2714*u^29 + 343*u^30 + 27*u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "1 + 16*u + 152*u^2 + 1352*u^3 + 6868*u^4 + 24288*u^5 + 70556*u^6 + 159464*u^7 + 237954*u^8 + 168144*u^9 - 83220*u^10 - 267736*u^11 - 126826*u^12 + 176352*u^13 + 238118*u^14 + 9936*u^15 - 165969*u^16 - 97984*u^17 + 45692*u^18 + 73432*u^19 + 12086*u^20 - 26480*u^21 - 16302*u^22 + 2356*u^23 + 6027*u^24 + 1704*u^25 - 842*u^26 - 684*u^27 - 85*u^28 + 88*u^29 + 49*u^30 + 11*u^31 + u^32", "4 - 50*u + 255*u^2 + 1181*u^3 + 2016*u^4 - 4698*u^5 - 7146*u^6 + 44820*u^7 + 178533*u^8 + 115936*u^9 - 292037*u^10 - 555255*u^11 + 313721*u^12 + 729368*u^13 - 510122*u^14 - 76790*u^15 + 372936*u^16 - 288124*u^17 - 131529*u^18 + 155721*u^19 + 39186*u^20 - 37068*u^21 - 498*u^22 - 1870*u^23 + 2583*u^24 - 1436*u^25 + 466*u^26 - 214*u^27 + 143*u^28 - 28*u^29 + 13*u^30 - u^31 + u^32", "1 - 8*u^2 + 88*u^3 - 812*u^4 + 2136*u^5 + 4476*u^6 - 17220*u^7 - 125902*u^8 + 973160*u^9 - 3295780*u^10 + 7294260*u^11 - 11874714*u^12 + 14941452*u^13 - 14667530*u^14 + 10796398*u^15 - 4999057*u^16 - 108904*u^17 + 2684764*u^18 - 2703812*u^19 + 1479094*u^20 - 344932*u^21 - 168094*u^22 + 212046*u^23 - 105589*u^24 + 24940*u^25 + 3366*u^26 - 5662*u^27 + 2635*u^28 - 754*u^29 + 143*u^30 - 17*u^31 + u^32", "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "4961 - 29832*u + 77688*u^2 - 54548*u^3 - 361132*u^4 + 1074108*u^5 - 109060*u^6 - 3573654*u^7 + 3817618*u^8 + 4771652*u^9 - 10378620*u^10 - 306574*u^11 + 12107838*u^12 - 4562894*u^13 - 8203524*u^14 + 4761684*u^15 + 4087559*u^16 - 2103728*u^17 - 2925732*u^18 + 1348280*u^19 + 1677694*u^20 - 1143868*u^21 - 376230*u^22 + 550324*u^23 - 127085*u^24 - 47764*u^25 + 28054*u^26 - 2016*u^27 - 1561*u^28 + 364*u^29 + 9*u^30 - 11*u^31 + u^32", "173 + 588*u + 2018*u^2 + 3846*u^3 + 2788*u^4 - 1706*u^5 - 18640*u^6 - 7570*u^7 - 3818*u^8 + 78512*u^9 + 197482*u^10 + 16360*u^11 + 402134*u^12 + 544796*u^13 - 1266938*u^14 - 2047732*u^15 + 350457*u^16 + 2311762*u^17 + 972438*u^18 - 699668*u^19 - 808884*u^20 - 291674*u^21 + 182878*u^22 + 216882*u^23 + 7369*u^24 - 43044*u^25 - 6864*u^26 + 3978*u^27 + 907*u^28 - 174*u^29 - 49*u^30 + 3*u^31 + u^32", "-16 - 128*u - 359*u^2 - 665*u^3 - 2256*u^4 - 7582*u^5 - 20254*u^6 - 40292*u^7 - 67827*u^8 - 92286*u^9 - 60739*u^10 + 61495*u^11 + 166729*u^12 + 91420*u^13 - 102066*u^14 - 154854*u^15 - 6668*u^16 + 110226*u^17 + 54485*u^18 - 41017*u^19 - 41850*u^20 + 4956*u^21 + 17498*u^22 + 2562*u^23 - 4669*u^24 - 1596*u^25 + 774*u^26 + 450*u^27 - 53*u^28 - 70*u^29 - 5*u^30 + 5*u^31 + u^32", "-1373 + 10610*u + 27538*u^2 - 6300*u^3 - 148384*u^4 - 38928*u^5 + 480930*u^6 + 629278*u^7 - 948546*u^8 - 1636258*u^9 + 270044*u^10 + 2258410*u^11 + 1164928*u^12 - 1611332*u^13 - 1610946*u^14 + 482008*u^15 + 871369*u^16 + 63488*u^17 - 194948*u^18 - 95624*u^19 + 13092*u^20 + 33544*u^21 + 896*u^22 - 6008*u^23 - 1973*u^24 - 140*u^25 + 290*u^26 + 128*u^27 + 83*u^28 + 36*u^29 + 21*u^30 + 5*u^31 + u^32", "25 + 296*u + 484*u^2 - 4500*u^3 + 9184*u^4 + 205988*u^5 + 825944*u^6 + 1660280*u^7 + 1743254*u^8 + 327964*u^9 - 1669360*u^10 - 2170496*u^11 - 493878*u^12 + 1475336*u^13 + 1572750*u^14 + 53834*u^15 - 1063545*u^16 - 748512*u^17 + 156180*u^18 + 519200*u^19 + 254150*u^20 - 58368*u^21 - 90202*u^22 + 39610*u^23 + 125963*u^24 + 116988*u^25 + 67438*u^26 + 27338*u^27 + 8051*u^28 + 1710*u^29 + 251*u^30 + 23*u^31 + u^32", "404 + 2374*u - 50201*u^2 + 101723*u^3 + 1381478*u^4 + 4262882*u^5 + 4247070*u^6 - 4119424*u^7 - 15858969*u^8 - 10873852*u^9 + 12738527*u^10 + 25724927*u^11 + 10586157*u^12 - 11320972*u^13 - 14501274*u^14 - 3785418*u^15 + 3922960*u^16 + 3542092*u^17 + 607067*u^18 - 272549*u^19 + 327556*u^20 + 525868*u^21 + 110962*u^22 - 100346*u^23 - 16343*u^24 + 21456*u^25 + 590*u^26 - 3110*u^27 + 141*u^28 + 232*u^29 - 23*u^30 - 7*u^31 + u^32", "-19583 - 188540*u - 904568*u^2 - 3173714*u^3 - 9849820*u^4 - 27208794*u^5 - 60483954*u^6 - 97251942*u^7 - 97174678*u^8 - 27615304*u^9 + 71381752*u^10 + 98782282*u^11 + 16362350*u^12 - 81491318*u^13 - 86061932*u^14 - 16155936*u^15 + 31357935*u^16 + 22312840*u^17 - 1124036*u^18 - 6454960*u^19 - 1282242*u^20 + 1057384*u^21 + 314142*u^22 - 157450*u^23 - 43765*u^24 + 24000*u^25 + 4550*u^26 - 2880*u^27 - 261*u^28 + 228*u^29 - 3*u^30 - 9*u^31 + u^32", "1 - 8*u^2 - 8*u^3 + 28*u^4 + 48*u^5 - 68*u^6 - 276*u^7 - 146*u^8 + 620*u^9 + 1184*u^10 - 116*u^11 - 3166*u^12 - 4224*u^13 + 838*u^14 + 9826*u^15 + 13067*u^16 + 2940*u^17 - 14792*u^18 - 22716*u^19 - 7778*u^20 + 25004*u^21 + 56258*u^22 + 68962*u^23 + 60619*u^24 + 41064*u^25 + 21966*u^26 + 9310*u^27 + 3091*u^28 + 782*u^29 + 143*u^30 + 17*u^31 + u^32", "-28963 - 144374*u - 354514*u^2 - 691164*u^3 - 1113950*u^4 - 1293614*u^5 - 878706*u^6 - 301658*u^7 - 268770*u^8 - 402590*u^9 - 62602*u^10 + 553590*u^11 + 340200*u^12 - 209796*u^13 - 128514*u^14 + 68878*u^15 + 97061*u^16 - 189242*u^17 + 54920*u^18 + 29210*u^19 + 10374*u^20 - 3514*u^21 - 11836*u^22 - 548*u^23 + 3603*u^24 + 352*u^25 - 318*u^26 - 210*u^27 - 9*u^28 + 50*u^29 - u^30 - 5*u^31 + u^32", "4996 + 43266*u + 205411*u^2 + 749971*u^3 + 2223224*u^4 + 5189630*u^5 + 9408554*u^6 + 13429446*u^7 + 15513341*u^8 + 14900100*u^9 + 12017859*u^10 + 8010181*u^11 + 4362593*u^12 + 2208696*u^13 + 1448686*u^14 + 1002390*u^15 + 183804*u^16 - 612564*u^17 - 743373*u^18 - 299149*u^19 + 106878*u^20 + 158424*u^21 + 33218*u^22 - 31860*u^23 - 16909*u^24 + 2608*u^25 + 3422*u^26 + 160*u^27 - 385*u^28 - 52*u^29 + 33*u^30 + 11*u^31 + u^32", "5 - 4*u - 28*u^2 + 716*u^3 + 1978*u^4 - 4876*u^5 - 31388*u^6 - 50044*u^7 + 19558*u^8 + 322638*u^9 + 706866*u^10 + 1085832*u^11 + 1429734*u^12 + 1408968*u^13 + 1408000*u^14 + 1230674*u^15 + 936205*u^16 + 723328*u^17 + 498388*u^18 + 310222*u^19 + 224970*u^20 + 108090*u^21 + 78644*u^22 + 30446*u^23 + 19809*u^24 + 6338*u^25 + 3528*u^26 + 894*u^27 + 427*u^28 + 76*u^29 + 31*u^30 + 3*u^31 + u^32", "-2161 - 6234*u + 49836*u^2 + 332900*u^3 + 823980*u^4 + 928770*u^5 + 94240*u^6 - 1088314*u^7 - 1641286*u^8 - 1621968*u^9 - 1226906*u^10 - 572726*u^11 + 229492*u^12 + 902390*u^13 + 1126418*u^14 + 1064248*u^15 + 763607*u^16 + 480480*u^17 + 259096*u^18 + 114342*u^19 + 55716*u^20 + 7602*u^21 + 8414*u^22 - 4690*u^23 + 2529*u^24 - 1868*u^25 + 902*u^26 - 396*u^27 + 219*u^28 - 60*u^29 + 21*u^30 - 5*u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "172 - 1136*u + 4443*u^2 + 19545*u^3 - 59348*u^4 + 406668*u^5 - 1087674*u^6 + 3667322*u^7 - 6486971*u^8 + 13953292*u^9 - 19139101*u^10 + 26436495*u^11 - 21187639*u^12 + 22916360*u^13 - 10662126*u^14 + 10997038*u^15 - 987464*u^16 + 2130022*u^17 + 2273927*u^18 - 604383*u^19 + 1719442*u^20 - 546038*u^21 + 610010*u^22 - 175696*u^23 + 127695*u^24 - 28538*u^25 + 16950*u^26 - 2596*u^27 + 1339*u^28 - 136*u^29 + 57*u^30 - 3*u^31 + u^32", "1984 + 14272*u + 5728*u^2 - 138912*u^3 + 186252*u^4 + 466180*u^5 - 718335*u^6 + 2843741*u^7 + 5334699*u^8 + 5054790*u^9 + 23658927*u^10 + 30882657*u^11 + 22267795*u^12 + 31835898*u^13 + 28955736*u^14 + 20222838*u^15 + 16131300*u^16 + 10864182*u^17 + 7564271*u^18 + 3614129*u^19 + 2025391*u^20 + 1227606*u^21 + 349916*u^22 + 210126*u^23 + 66696*u^24 + 15042*u^25 + 12531*u^26 + 537*u^27 + 1291*u^28 + 34*u^29 + 59*u^30 + u^31 + u^32", "-1879 - 3036*u + 8772*u^2 + 30090*u^3 + 60670*u^4 + 92594*u^5 + 70098*u^6 - 35810*u^7 - 134810*u^8 - 112318*u^9 + 67946*u^10 + 350538*u^11 + 631318*u^12 + 887160*u^13 + 914164*u^14 + 894052*u^15 + 787313*u^16 + 569948*u^17 + 493364*u^18 + 272710*u^19 + 229644*u^20 + 102322*u^21 + 76822*u^22 + 28630*u^23 + 18413*u^24 + 5454*u^25 + 3196*u^26 + 638*u^27 + 373*u^28 + 42*u^29 + 27*u^30 + u^31 + u^32", "1 + 16*u + 120*u^2 + 648*u^3 + 2348*u^4 + 5824*u^5 + 7588*u^6 - 940*u^7 - 18486*u^8 - 7408*u^9 + 81164*u^10 + 107724*u^11 + 29102*u^12 - 193620*u^13 + 302870*u^14 + 60050*u^15 + 299503*u^16 - 32792*u^17 + 270364*u^18 + 35852*u^19 + 265358*u^20 + 89684*u^21 + 145690*u^22 + 47278*u^23 + 43891*u^24 + 11676*u^25 + 7662*u^26 + 1542*u^27 + 779*u^28 + 106*u^29 + 43*u^30 + 3*u^31 + u^32" ], "Multiplicity":1, "ij_list":[ [ "{3, 6}", "{3, 7}", "{4, 7}", "{4, 8}" ], [ "{3, 4}", "{6, 7}", "{7, 8}" ], [ "{2, 8}", "{2, 9}", "{3, 8}", "{4, 6}" ], [ "{2, 4}", "{6, 8}" ], [ "{2, 7}" ], [ "{2, 3}", "{8, 9}" ], [ "{1, 5}", "{1, 6}", "{2, 6}", "{4, 9}" ], [ "{1, 3}", "{7, 9}" ], [ "{1, 7}", "{3, 9}" ], [ "{1, 4}", "{6, 9}" ], [ "{1, 8}" ], [ "{1, 2}", "{5, 6}" ], [ "{3, 5}" ], [ "{5, 7}" ], [ "{1, 9}", "{4, 5}", "{9, 10}" ], [ "{5, 8}" ], [ "{2, 10}" ], [ "{2, 5}" ], [ "{8, 10}" ], [ "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{7, 10}" ], [ "{3, 10}" ], [ "{6, 10}" ], [ "{1, 10}" ] ], "SortedReprnIndices":"{27, 28, 6, 5, 22, 21, 20, 19, 29, 30, 1, 2, 8, 7, 24, 25, 11, 12, 18, 17, 9, 10, 15, 16, 31, 32, 3, 4, 13, 14, 23, 26}", "aCuspShapeN":[ "-9.3506140425138001414`5.130560768880319 - 2.9009080288795788542`4.622254597563519*I", "-9.3506140425138001414`5.130560768880319 + 2.9009080288795788542`4.622254597563519*I", "-5.5944842020737174357`5.147622179906113 - 0.6478753533190617548`4.211353586788237*I", "-5.5944842020737174357`5.147622179906113 + 0.6478753533190617548`4.211353586788237*I", "-6.1955558104940850815`4.982719200542469 + 6.6890962652652466601`5.016006373111794*I", "-6.1955558104940850815`4.982719200542469 - 6.6890962652652466601`5.016006373111794*I", "-10.891283545023074653`5.1104188728396345 + 4.9046675139090066566`4.763949380181378*I", "-10.891283545023074653`5.1104188728396345 - 4.9046675139090066566`4.763949380181378*I", "-0.6569003082983796396`4.382139338308446 - 3.7972747727463076069`5.144111896664142*I", "-0.6569003082983796396`4.382139338308446 + 3.7972747727463076069`5.144111896664142*I", "-2.6772756033194408731`4.940798641237842 - 3.4147960371648766677`5.046470329490261*I", "-2.6772756033194408731`4.940798641237842 + 3.4147960371648766677`5.046470329490261*I", "-7.8359811785573558534`5.149322877726105 + 0.5813967041057087556`4.019702059003679*I", "-7.8359811785573558534`5.149322877726105 - 0.5813967041057087556`4.019702059003679*I", "-4.5930286856525752545`5.150273901012609 - 0.1530869956608123853`3.6731130432969987*I", "-4.5930286856525752545`5.150273901012609 + 0.1530869956608123853`3.6731130432969987*I", "-13.5163796910357766508`5.133782511831822 + 3.8254578680459730337`4.585605551906714*I", "-13.5163796910357766508`5.133782511831822 - 3.8254578680459730337`4.585605551906714*I", "-5.7306674734769606892`4.955755167245746 + 6.905384055438062243`5.036737795998848*I", "-5.7306674734769606892`4.955755167245746 - 6.905384055438062243`5.036737795998848*I", "-7.662230883618768972`5.076496861292527 + 4.8832219467627229871`4.880848090789415*I", "-7.662230883618768972`5.076496861292527 - 4.8832219467627229871`4.880848090789415*I", -1.1483e1, "-12.6479126165997313904`5.145888104882017 - 1.8561111459805105259`4.3124732271463735*I", "-12.6479126165997313904`5.145888104882017 + 1.8561111459805105259`4.3124732271463735*I", -8.2617, "-10.7795421416949052417`5.055330139252721 - 7.9953085308614575877`4.925565051947666*I", "-10.7795421416949052417`5.055330139252721 + 7.9953085308614575877`4.925565051947666*I", "-14.8084683423711348095`5.138477653302595 - 3.5354508474303527115`4.516412315781771*I", "-14.8084683423711348095`5.138477653302595 + 3.5354508474303527115`4.516412315781771*I", "-7.1875892030580720152`5.02332169552233 - 6.414020289864154072`4.973868777314959*I", "-7.1875892030580720152`5.02332169552233 + 6.414020289864154072`4.973868777314959*I" ], "Abelian":false }, { "IdealName":"abJ10_25_1", "Generators":[ "-1 + v" ], "VariableOrder":[ "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.4806999999999995e-2, "TimingZeroDimVars":1.7204e-2, "TimingmagmaVCompNormalize":1.8261e-2, "TimingNumberOfSols":2.0724999999999997e-2, "TimingIsRadical":1.8000000000000008e-3, "TimingArcColoring":5.5183e-2, "TimingObstruction":4.2100000000000004e-4, "TimingComplexVolumeN":0.385988, "TimingaCuspShapeN":4.511e-3, "TiminguValues":0.639362, "TiminguPolysN":1.24e-4, "TiminguPolys":0.808864, "TimingaCuspShape":9.7959e-2, "TimingRepresentationsN":1.9515e-2, "TiminguValues_ij":0.135497, "TiminguPoly_ij":0.134837, "TiminguPolys_ij_N":4.4000000000000006e-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":[ "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "-5 + 14*u + 10*u^2 + 22*u^3 - 100*u^4 - 358*u^5 + 304*u^6 + 906*u^7 - 272*u^8 - 960*u^9 - 140*u^10 + 166*u^11 + 436*u^12 + 668*u^13 - 258*u^14 - 592*u^15 - 119*u^16 - 68*u^17 + 228*u^18 + 382*u^19 - 198*u^21 - 242*u^22 - 34*u^23 + 271*u^24 + 84*u^25 - 158*u^26 - 42*u^27 + 55*u^28 + 10*u^29 - 11*u^30 - u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "-1 - 2*u - 2*u^2 + 6*u^3 + 6*u^4 + 2*u^5 + 26*u^6 - 50*u^7 - 38*u^8 + 32*u^9 - 92*u^10 + 144*u^11 + 180*u^12 - 194*u^13 + 74*u^14 - 108*u^15 - 405*u^16 + 372*u^17 + 268*u^18 - 208*u^19 + 254*u^20 - 136*u^21 - 586*u^22 + 264*u^23 + 501*u^24 - 174*u^25 - 248*u^26 + 62*u^27 + 75*u^28 - 12*u^29 - 13*u^30 + u^31 + u^32", "1 - 4*u^4 - 8*u^5 - 44*u^6 + 204*u^7 - 414*u^8 + 1112*u^9 - 1212*u^10 + 2420*u^11 - 2018*u^12 + 3308*u^13 - 2542*u^14 + 3326*u^15 - 2561*u^16 + 2464*u^17 - 1820*u^18 + 1104*u^19 - 642*u^20 - 8*u^21 + 190*u^22 - 412*u^23 + 371*u^24 - 312*u^25 + 218*u^26 - 124*u^27 + 71*u^28 - 28*u^29 + 13*u^30 - 3*u^31 + u^32", "-1 - 2*u - 2*u^2 - 4*u^3 - 2*u^4 + 2*u^5 + 4*u^6 + 12*u^7 + 12*u^8 + 10*u^9 + 10*u^10 - 16*u^11 - 18*u^12 - 48*u^13 - 50*u^14 - 38*u^15 - 35*u^16 + 30*u^17 + 54*u^18 + 116*u^19 + 168*u^20 + 158*u^21 + 222*u^22 + 136*u^23 + 185*u^24 + 80*u^25 + 104*u^26 + 32*u^27 + 39*u^28 + 8*u^29 + 9*u^30 + u^31 + u^32", "1 - 8*u^2 - 8*u^3 + 28*u^4 + 48*u^5 - 68*u^6 - 276*u^7 - 146*u^8 + 620*u^9 + 1184*u^10 - 116*u^11 - 3166*u^12 - 4224*u^13 + 838*u^14 + 9826*u^15 + 13067*u^16 + 2940*u^17 - 14792*u^18 - 22716*u^19 - 7778*u^20 + 25004*u^21 + 56258*u^22 + 68962*u^23 + 60619*u^24 + 41064*u^25 + 21966*u^26 + 9310*u^27 + 3091*u^28 + 782*u^29 + 143*u^30 + 17*u^31 + u^32" ], "RileyPolyC":[ "25 - 296*y + 484*y^2 + 4500*y^3 + 9184*y^4 - 205988*y^5 + 825944*y^6 - 1660280*y^7 + 1743254*y^8 - 327964*y^9 - 1669360*y^10 + 2170496*y^11 - 493878*y^12 - 1475336*y^13 + 1572750*y^14 - 53834*y^15 - 1063545*y^16 + 748512*y^17 + 156180*y^18 - 519200*y^19 + 254150*y^20 + 58368*y^21 - 90202*y^22 - 39610*y^23 + 125963*y^24 - 116988*y^25 + 67438*y^26 - 27338*y^27 + 8051*y^28 - 1710*y^29 + 251*y^30 - 23*y^31 + y^32", "1 - 8*y^2 - 88*y^3 - 812*y^4 - 2136*y^5 + 4476*y^6 + 17220*y^7 - 125902*y^8 - 973160*y^9 - 3295780*y^10 - 7294260*y^11 - 11874714*y^12 - 14941452*y^13 - 14667530*y^14 - 10796398*y^15 - 4999057*y^16 + 108904*y^17 + 2684764*y^18 + 2703812*y^19 + 1479094*y^20 + 344932*y^21 - 168094*y^22 - 212046*y^23 - 105589*y^24 - 24940*y^25 + 3366*y^26 + 5662*y^27 + 2635*y^28 + 754*y^29 + 143*y^30 + 17*y^31 + y^32", "1 + 16*y^2 - 104*y^3 - 216*y^4 + 1372*y^5 + 620*y^6 - 9080*y^7 + 3854*y^8 + 35260*y^9 - 41288*y^10 - 75088*y^11 + 171394*y^12 + 31000*y^13 - 380606*y^14 + 284726*y^15 + 357351*y^16 - 754784*y^17 + 271732*y^18 + 613356*y^19 - 925906*y^20 + 407196*y^21 + 353754*y^22 - 744366*y^23 + 674979*y^24 - 408324*y^25 + 180582*y^26 - 59946*y^27 + 14911*y^28 - 2714*y^29 + 343*y^30 - 27*y^31 + y^32", "1 - 8*y^2 - 8*y^3 + 28*y^4 + 48*y^5 - 68*y^6 - 276*y^7 - 146*y^8 + 620*y^9 + 1184*y^10 - 116*y^11 - 3166*y^12 - 4224*y^13 + 838*y^14 + 9826*y^15 + 13067*y^16 + 2940*y^17 - 14792*y^18 - 22716*y^19 - 7778*y^20 + 25004*y^21 + 56258*y^22 + 68962*y^23 + 60619*y^24 + 41064*y^25 + 21966*y^26 + 9310*y^27 + 3091*y^28 + 782*y^29 + 143*y^30 + 17*y^31 + y^32", "25 - 296*y + 484*y^2 + 4500*y^3 + 9184*y^4 - 205988*y^5 + 825944*y^6 - 1660280*y^7 + 1743254*y^8 - 327964*y^9 - 1669360*y^10 + 2170496*y^11 - 493878*y^12 - 1475336*y^13 + 1572750*y^14 - 53834*y^15 - 1063545*y^16 + 748512*y^17 + 156180*y^18 - 519200*y^19 + 254150*y^20 + 58368*y^21 - 90202*y^22 - 39610*y^23 + 125963*y^24 - 116988*y^25 + 67438*y^26 - 27338*y^27 + 8051*y^28 - 1710*y^29 + 251*y^30 - 23*y^31 + y^32", "1 + 16*y^2 - 104*y^3 - 216*y^4 + 1372*y^5 + 620*y^6 - 9080*y^7 + 3854*y^8 + 35260*y^9 - 41288*y^10 - 75088*y^11 + 171394*y^12 + 31000*y^13 - 380606*y^14 + 284726*y^15 + 357351*y^16 - 754784*y^17 + 271732*y^18 + 613356*y^19 - 925906*y^20 + 407196*y^21 + 353754*y^22 - 744366*y^23 + 674979*y^24 - 408324*y^25 + 180582*y^26 - 59946*y^27 + 14911*y^28 - 2714*y^29 + 343*y^30 - 27*y^31 + y^32", "1 + 16*y^2 - 104*y^3 - 216*y^4 + 1372*y^5 + 620*y^6 - 9080*y^7 + 3854*y^8 + 35260*y^9 - 41288*y^10 - 75088*y^11 + 171394*y^12 + 31000*y^13 - 380606*y^14 + 284726*y^15 + 357351*y^16 - 754784*y^17 + 271732*y^18 + 613356*y^19 - 925906*y^20 + 407196*y^21 + 353754*y^22 - 744366*y^23 + 674979*y^24 - 408324*y^25 + 180582*y^26 - 59946*y^27 + 14911*y^28 - 2714*y^29 + 343*y^30 - 27*y^31 + y^32", "1 - 8*y^2 - 88*y^3 - 812*y^4 - 2136*y^5 + 4476*y^6 + 17220*y^7 - 125902*y^8 - 973160*y^9 - 3295780*y^10 - 7294260*y^11 - 11874714*y^12 - 14941452*y^13 - 14667530*y^14 - 10796398*y^15 - 4999057*y^16 + 108904*y^17 + 2684764*y^18 + 2703812*y^19 + 1479094*y^20 + 344932*y^21 - 168094*y^22 - 212046*y^23 - 105589*y^24 - 24940*y^25 + 3366*y^26 + 5662*y^27 + 2635*y^28 + 754*y^29 + 143*y^30 + 17*y^31 + y^32", "1 - 8*y^2 - 8*y^3 + 28*y^4 + 48*y^5 - 68*y^6 - 276*y^7 - 146*y^8 + 620*y^9 + 1184*y^10 - 116*y^11 - 3166*y^12 - 4224*y^13 + 838*y^14 + 9826*y^15 + 13067*y^16 + 2940*y^17 - 14792*y^18 - 22716*y^19 - 7778*y^20 + 25004*y^21 + 56258*y^22 + 68962*y^23 + 60619*y^24 + 41064*y^25 + 21966*y^26 + 9310*y^27 + 3091*y^28 + 782*y^29 + 143*y^30 + 17*y^31 + y^32", "1 - 16*y + 120*y^2 - 648*y^3 + 2348*y^4 - 5824*y^5 + 7588*y^6 + 940*y^7 - 18486*y^8 + 7408*y^9 + 81164*y^10 - 107724*y^11 + 29102*y^12 + 193620*y^13 + 302870*y^14 - 60050*y^15 + 299503*y^16 + 32792*y^17 + 270364*y^18 - 35852*y^19 + 265358*y^20 - 89684*y^21 + 145690*y^22 - 47278*y^23 + 43891*y^24 - 11676*y^25 + 7662*y^26 - 1542*y^27 + 779*y^28 - 106*y^29 + 43*y^30 - 3*y^31 + y^32" ] }, "GeometricRepresentation":[ 1.1875800000000002e1, [ "J10_25_0", 1, "{27, 28}" ] ] } }