{ "Index":221, "Name":"10_137", "RolfsenName":"10_137", "DTname":"10n_2", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{14, 7, -19, 16, -8, 2, 10, -12, 3, -5}", "Acode":"{7, 4, -10, 8, -4, 2, 5, -6, 2, -3}", "PDcode":[ "{1, 15, 2, 14}", "{4, 8, 5, 7}", "{6, 19, 7, 20}", "{9, 17, 10, 16}", "{11, 8, 12, 9}", "{13, 3, 14, 2}", "{15, 11, 16, 10}", "{17, 12, 18, 13}", "{18, 4, 19, 3}", "{20, 5, 1, 6}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{4, 8, 10}", [], [ "{4, 8, 5, 1}", "{5, -4, 6, 1}", "{4, -10, 3, 2}", "{3, 4, 2, 2}", "{8, 5, 7, 2}", "{2, 7, 1, 2}", "{10, 2, 9, 2}" ], "{6, 8}", "{10}", 10 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 + b^2 + a*b^3 + b^4 - u - 2*a*b*u^2 - b^2*u^2 - a^2*b^2*u^2 - a*b^3*u^2", "b^4 - u + u^2 - b^2*u^2 - a*b^3*u^2 - u^3", "-a - b - a*b^2 - 2*b^3 - a*b^4 - b^5 + u + 2*u^3 + u^5", "-b - b^3 - b^5 + u + u^3 + u^5" ], "TimingForPrimaryIdeals":9.4906e-2 }, "v":{ "CheckEq":[ "b^4", "-b - b^3 - b^5", "1 + b^2 + a*b^3 + b^4 - v", "-a - b - a*b^2 - 2*b^3 - a*b^4 - b^5 + v" ], "TimingForPrimaryIdeals":9.795400000000001e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_137_0", "Generators":[ "2*b - 5*u - u^2 - 12*u^3 - 10*u^4 - 16*u^5 - 27*u^6 - 22*u^7 - 32*u^8 - 25*u^9 - 23*u^10 - 18*u^11 - 10*u^12 - 7*u^13 - 2*u^14 - u^15", "3 + 2*a - u + 10*u^2 + 6*u^3 + 14*u^4 + 25*u^5 + 22*u^6 + 32*u^7 + 25*u^8 + 23*u^9 + 18*u^10 + 10*u^11 + 7*u^12 + 2*u^13 + u^14", "1 + 4*u + 12*u^2 + 17*u^3 + 34*u^4 + 47*u^5 + 63*u^6 + 79*u^7 + 79*u^8 + 80*u^9 + 66*u^10 + 51*u^11 + 35*u^12 + 19*u^13 + 10*u^14 + 3*u^15 + u^16" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.5561e-2, "TimingZeroDimVars":7.6833e-2, "TimingmagmaVCompNormalize":7.7962e-2, "TimingNumberOfSols":0.168606, "TimingIsRadical":8.005000000000003e-3, "TimingArcColoring":7.5308e-2, "TimingObstruction":3.159e-2, "TimingComplexVolumeN":1.3981429e1, "TimingaCuspShapeN":8.186600000000001e-2, "TiminguValues":0.674877, "TiminguPolysN":2.944e-2, "TiminguPolys":0.853145, "TimingaCuspShape":0.117945, "TimingRepresentationsN":0.160886, "TiminguValues_ij":0.196467, "TiminguPoly_ij":1.934372, "TiminguPolys_ij_N":5.8636e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":16, "IsRadical":true, "ArcColoring":[ [ "(-3 - 21*u - 26*u^2 - 56*u^3 - 82*u^4 - 111*u^5 - 148*u^6 - 154*u^7 - 159*u^8 - 137*u^9 - 108*u^10 - 76*u^11 - 43*u^12 - 22*u^13 - 7*u^14 - 2*u^15)\/2", "(u + 13*u^2 + 10*u^3 + 30*u^4 + 40*u^5 + 53*u^6 + 68*u^7 + 64*u^8 + 63*u^9 + 49*u^10 + 36*u^11 + 22*u^12 + 11*u^13 + 4*u^14 + u^15)\/2" ], [ "(-3 - 19*u - 20*u^2 - 48*u^3 - 70*u^4 - 89*u^5 - 124*u^6 - 120*u^7 - 127*u^8 - 107*u^9 - 82*u^10 - 60*u^11 - 31*u^12 - 18*u^13 - 5*u^14 - 2*u^15)\/2", "(-2 - 5*u - 5*u^2 - 14*u^3 - 20*u^4 - 24*u^5 - 37*u^6 - 34*u^7 - 38*u^8 - 33*u^9 - 25*u^10 - 20*u^11 - 10*u^12 - 7*u^13 - 2*u^14 - u^15)\/2" ], [ "(-1 - 14*u - 15*u^2 - 34*u^3 - 50*u^4 - 65*u^5 - 87*u^6 - 86*u^7 - 89*u^8 - 74*u^9 - 57*u^10 - 40*u^11 - 21*u^12 - 11*u^13 - 3*u^14 - u^15)\/2", "(-2 - 5*u - 5*u^2 - 14*u^3 - 20*u^4 - 24*u^5 - 37*u^6 - 34*u^7 - 38*u^8 - 33*u^9 - 25*u^10 - 20*u^11 - 10*u^12 - 7*u^13 - 2*u^14 - u^15)\/2" ], "{1, 0}", [ 1, "u^2" ], [ "1 + u^2", "u^2" ], [ "u", "u + u^3" ], [ 0, "u" ], [ "u + 2*u^3 + u^5", "u + u^3 + u^5" ], [ "(-3 + u - 10*u^2 - 6*u^3 - 14*u^4 - 25*u^5 - 22*u^6 - 32*u^7 - 25*u^8 - 23*u^9 - 18*u^10 - 10*u^11 - 7*u^12 - 2*u^13 - u^14)\/2", "(5*u + u^2 + 12*u^3 + 10*u^4 + 16*u^5 + 27*u^6 + 22*u^7 + 32*u^8 + 25*u^9 + 23*u^10 + 18*u^11 + 10*u^12 + 7*u^13 + 2*u^14 + u^15)\/2" ] ], "Obstruction":-1, "ComplexVolumeN":[ "8.77898 - 3.44428*I", "8.77898 + 3.44428*I", "1.80445 + 3.62763*I", "1.80445 - 3.62763*I", "0.15035 - 2.79885*I", "0.15035 + 2.79885*I", "3.73547 - 1.61832*I", "3.73547 + 1.61832*I", "-0.82216 - 1.37285*I", "-0.82216 + 1.37285*I", "12.7882 + 9.2506*I", "12.7882 - 9.2506*I", "13.3552 + 2.10741*I", "13.3552 - 2.10741*I", "-0.31203 - 1.54541*I", "-0.31203 + 1.54541*I" ], "uPolysN":[ "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "1 + 8*u + 36*u^2 + 117*u^3 + 252*u^4 + 385*u^5 + 497*u^6 + 543*u^7 + 547*u^8 + 428*u^9 + 322*u^10 + 179*u^11 + 101*u^12 + 37*u^13 + 16*u^14 + 3*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16", "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 - 8*u + 76*u^2 - 277*u^3 + 596*u^4 - 777*u^5 + 441*u^6 + 345*u^7 - 925*u^8 + 804*u^9 - 230*u^10 - 211*u^11 + 285*u^12 - 165*u^13 + 56*u^14 - 11*u^15 + u^16", "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 + 4*u^2 + 23*u^3 + 10*u^4 + 59*u^5 + 133*u^6 - 7*u^7 + 153*u^8 + 6*u^9 - 56*u^10 + 83*u^11 + 31*u^12 - 31*u^13 - 10*u^14 + 3*u^15 + u^16", "73 + 202*u + 1066*u^2 + 2043*u^3 + 4634*u^4 + 4815*u^5 + 5567*u^6 + 2449*u^7 + 2265*u^8 + 1152*u^9 + 582*u^10 + 67*u^11 + 191*u^12 - 33*u^13 + 26*u^14 - 3*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16" ], "uPolys":[ "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "1 + 8*u + 36*u^2 + 117*u^3 + 252*u^4 + 385*u^5 + 497*u^6 + 543*u^7 + 547*u^8 + 428*u^9 + 322*u^10 + 179*u^11 + 101*u^12 + 37*u^13 + 16*u^14 + 3*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16", "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 - 8*u + 76*u^2 - 277*u^3 + 596*u^4 - 777*u^5 + 441*u^6 + 345*u^7 - 925*u^8 + 804*u^9 - 230*u^10 - 211*u^11 + 285*u^12 - 165*u^13 + 56*u^14 - 11*u^15 + u^16", "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 + 4*u^2 + 23*u^3 + 10*u^4 + 59*u^5 + 133*u^6 - 7*u^7 + 153*u^8 + 6*u^9 - 56*u^10 + 83*u^11 + 31*u^12 - 31*u^13 - 10*u^14 + 3*u^15 + u^16", "73 + 202*u + 1066*u^2 + 2043*u^3 + 4634*u^4 + 4815*u^5 + 5567*u^6 + 2449*u^7 + 2265*u^8 + 1152*u^9 + 582*u^10 + 67*u^11 + 191*u^12 - 33*u^13 + 26*u^14 - 3*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16" ], "aCuspShape":"-2 + (6 + 37*u + 25*u^2 + 86*u^3 + 98*u^4 + 112*u^5 + 173*u^6 + 142*u^7 + 174*u^8 + 141*u^9 + 113*u^10 + 92*u^11 + 48*u^12 + 35*u^13 + 10*u^14 + 5*u^15)\/2", "RepresentationsN":[ [ "u->-1.07348 + 0.057122 I", "a->-0.540627 - 0.419792 I", "b->0.935752 - 0.958508 I" ], [ "u->-1.07348 - 0.057122 I", "a->-0.540627 + 0.419792 I", "b->0.935752 + 0.958508 I" ], [ "u->-0.186461 + 1.08815 I", "a->1.79112 - 0.2965 I", "b->-0.537019 - 1.08835 I" ], [ "u->-0.186461 - 1.08815 I", "a->1.79112 + 0.2965 I", "b->-0.537019 + 1.08835 I" ], [ "u->0.531252 + 0.974365 I", "a->-1.28358 - 0.440428 I", "b->0.361572 - 0.440175 I" ], [ "u->0.531252 - 0.974365 I", "a->-1.28358 + 0.440428 I", "b->0.361572 + 0.440175 I" ], [ "u->0.044881 + 1.18925 I", "a->1.25145 - 0.74047 I", "b->-0.84922 + 0.545637 I" ], [ "u->0.044881 - 1.18925 I", "a->1.25145 + 0.74047 I", "b->-0.84922 - 0.545637 I" ], [ "u->0.460182 + 0.643087 I", "a->-0.627874 + 0.508017 I", "b->-0.003649 + 0.625754 I" ], [ "u->0.460182 - 0.643087 I", "a->-0.627874 - 0.508017 I", "b->-0.003649 - 0.625754 I" ], [ "u->-0.5566 + 1.34475 I", "a->-1.82052 + 0.34354 I", "b->0.923344 + 1.05702 I" ], [ "u->-0.5566 - 1.34475 I", "a->-1.82052 - 0.34354 I", "b->0.923344 - 1.05702 I" ], [ "u->-0.48833 + 1.38689 I", "a->-0.783578 + 0.870931 I", "b->1.03144 - 0.889735 I" ], [ "u->-0.48833 - 1.38689 I", "a->-0.783578 - 0.870931 I", "b->1.03144 + 0.889735 I" ], [ "u->-0.231448 + 0.2976 I", "a->-1.48639 + 0.77777 I", "b->-0.362224 + 0.81755 I" ], [ "u->-0.231448 - 0.2976 I", "a->-1.48639 - 0.77777 I", "b->-0.362224 - 0.81755 I" ] ], "Epsilon":1.25415, "uPolys_ij":[ "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 - 8*u + 76*u^2 - 277*u^3 + 596*u^4 - 777*u^5 + 441*u^6 + 345*u^7 - 925*u^8 + 804*u^9 - 230*u^10 - 211*u^11 + 285*u^12 - 165*u^13 + 56*u^14 - 11*u^15 + u^16", "1 + 88*u + 2536*u^2 + 2313*u^3 - 4540*u^4 - 15123*u^5 + 35661*u^6 - 35721*u^7 + 26759*u^8 - 19556*u^9 + 12278*u^10 - 5429*u^11 + 1673*u^12 - 407*u^13 + 76*u^14 - 9*u^15 + u^16", "1 + 4*u^2 + 23*u^3 + 10*u^4 + 59*u^5 + 133*u^6 - 7*u^7 + 153*u^8 + 6*u^9 - 56*u^10 + 83*u^11 + 31*u^12 - 31*u^13 - 10*u^14 + 3*u^15 + u^16", "256 - 896*u + 4496*u^2 - 9536*u^3 + 28616*u^4 - 45580*u^5 + 83301*u^6 - 108945*u^7 + 108303*u^8 - 77642*u^9 + 43833*u^10 - 20263*u^11 + 7133*u^12 - 1746*u^13 + 275*u^14 - 25*u^15 + u^16", "1 + 8*u + 36*u^2 - 183*u^3 - 1244*u^4 + 613*u^5 + 20913*u^6 + 35231*u^7 + 771*u^8 - 4436*u^9 + 8198*u^10 - 12741*u^11 + 7497*u^12 - 2191*u^13 + 348*u^14 - 29*u^15 + u^16", "33589 - 147720*u + 401852*u^2 - 463977*u^3 + 480972*u^4 - 480113*u^5 + 308967*u^6 - 32385*u^7 - 36077*u^8 - 16962*u^9 + 9494*u^10 + 3893*u^11 + 6733*u^12 - 507*u^13 + 160*u^14 - 7*u^15 + u^16", "121837 - 117840*u + 261078*u^2 + 36099*u^3 + 88170*u^4 + 159013*u^5 + 67275*u^6 + 21531*u^7 + 31567*u^8 + 13878*u^9 - 262*u^10 - 1435*u^11 - 47*u^12 + 39*u^13 - 8*u^14 - 3*u^15 + u^16", "1669 + 64652*u + 931162*u^2 - 2460439*u^3 + 4577542*u^4 - 8417053*u^5 + 11741515*u^6 - 9974369*u^7 + 4684315*u^8 - 787446*u^9 - 169228*u^10 + 53045*u^11 + 5783*u^12 - 1051*u^13 - 114*u^14 + 9*u^15 + u^16", "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "108431 + 104843*u + 131927*u^2 - 430485*u^3 + 116364*u^4 - 312787*u^5 + 604078*u^6 - 410659*u^7 + 298355*u^8 - 94945*u^9 + 40025*u^10 - 6091*u^11 + 2163*u^12 - 190*u^13 + 50*u^14 - 4*u^15 + u^16", "23 + u + 61*u^2 - 15*u^3 - 10*u^4 - 45*u^5 + 18*u^6 - 43*u^7 - u^8 - 51*u^9 + 107*u^10 - 17*u^11 + 67*u^12 - 2*u^13 + 14*u^14 + u^16", "1 - 5*u + 21*u^2 + 65*u^3 + 118*u^4 + 209*u^5 + 328*u^6 + 305*u^7 + 181*u^8 - 457*u^9 - 293*u^10 + 209*u^11 + 119*u^12 - 34*u^13 - 18*u^14 + 2*u^15 + u^16", "173 - 177*u + 13*u^2 + 167*u^3 + 76*u^4 - 155*u^5 + 10*u^6 - 19*u^7 + 71*u^8 + 97*u^9 - 75*u^10 - 63*u^11 + 37*u^12 + 18*u^13 - 8*u^14 - 2*u^15 + u^16", "60229 + 269172*u - 910902*u^2 + 1127031*u^3 + 39879478*u^4 + 106113341*u^5 + 171268219*u^6 + 113286417*u^7 + 15998443*u^8 - 35274362*u^9 + 1490004*u^10 + 474811*u^11 + 98167*u^12 + 7867*u^13 + 542*u^14 + 23*u^15 + u^16", "185296 - 192624*u + 1070420*u^2 - 1463192*u^3 + 2623412*u^4 - 2720622*u^5 + 3366203*u^6 - 2388703*u^7 + 1347191*u^8 - 221256*u^9 + 140175*u^10 - 81*u^11 + 3257*u^12 + 432*u^13 + 57*u^14 + u^15 + u^16", "1 + 8*u + 36*u^2 + 117*u^3 + 252*u^4 + 385*u^5 + 497*u^6 + 543*u^7 + 547*u^8 + 428*u^9 + 322*u^10 + 179*u^11 + 101*u^12 + 37*u^13 + 16*u^14 + 3*u^15 + u^16", "5329 - 114832*u + 987548*u^2 - 4573361*u^3 + 13010004*u^4 - 22852661*u^5 + 24934209*u^6 - 13671703*u^7 + 7284323*u^8 - 3680932*u^9 + 1538862*u^10 - 437475*u^11 + 82609*u^12 - 10409*u^13 + 860*u^14 - 43*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16", "1 - 8*u - 72*u^2 + 711*u^3 + 1604*u^4 - 8381*u^5 + 24957*u^6 - 46423*u^7 + 59991*u^8 - 54028*u^9 + 34870*u^10 - 16571*u^11 + 5785*u^12 - 1433*u^13 + 236*u^14 - 23*u^15 + u^16", "52 + 12*u + 38*u^2 + 188*u^3 - 77*u^4 + 85*u^5 + 478*u^6 - 19*u^7 + 606*u^8 - 75*u^9 + 320*u^10 - 37*u^11 + 98*u^12 - 9*u^13 + 16*u^14 - u^15 + u^16", "131 + 306*u + 192*u^2 + 293*u^3 + 1410*u^4 + 2811*u^5 + 2619*u^6 + 777*u^7 - 583*u^8 - 900*u^9 - 562*u^10 + 127*u^11 + 237*u^12 - 5*u^13 - 24*u^14 - u^15 + u^16", "73 + 202*u + 1066*u^2 + 2043*u^3 + 4634*u^4 + 4815*u^5 + 5567*u^6 + 2449*u^7 + 2265*u^8 + 1152*u^9 + 582*u^10 + 67*u^11 + 191*u^12 - 33*u^13 + 26*u^14 - 3*u^15 + u^16", "2522669 + 5364202*u + 21040774*u^2 + 28886543*u^3 + 55084000*u^4 + 36712927*u^5 + 40659853*u^6 - 4151941*u^7 - 8358765*u^8 - 541864*u^9 + 1526680*u^10 - 190347*u^11 + 39329*u^12 - 2741*u^13 + 312*u^14 - 13*u^15 + u^16" ], "GeometricComponent":"{11, 12}", "uPolys_ij_N":[ "1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16", "1 - 8*u + 76*u^2 - 277*u^3 + 596*u^4 - 777*u^5 + 441*u^6 + 345*u^7 - 925*u^8 + 804*u^9 - 230*u^10 - 211*u^11 + 285*u^12 - 165*u^13 + 56*u^14 - 11*u^15 + u^16", "1 + 88*u + 2536*u^2 + 2313*u^3 - 4540*u^4 - 15123*u^5 + 35661*u^6 - 35721*u^7 + 26759*u^8 - 19556*u^9 + 12278*u^10 - 5429*u^11 + 1673*u^12 - 407*u^13 + 76*u^14 - 9*u^15 + u^16", "1 + 4*u^2 + 23*u^3 + 10*u^4 + 59*u^5 + 133*u^6 - 7*u^7 + 153*u^8 + 6*u^9 - 56*u^10 + 83*u^11 + 31*u^12 - 31*u^13 - 10*u^14 + 3*u^15 + u^16", "256 - 896*u + 4496*u^2 - 9536*u^3 + 28616*u^4 - 45580*u^5 + 83301*u^6 - 108945*u^7 + 108303*u^8 - 77642*u^9 + 43833*u^10 - 20263*u^11 + 7133*u^12 - 1746*u^13 + 275*u^14 - 25*u^15 + u^16", "1 + 8*u + 36*u^2 - 183*u^3 - 1244*u^4 + 613*u^5 + 20913*u^6 + 35231*u^7 + 771*u^8 - 4436*u^9 + 8198*u^10 - 12741*u^11 + 7497*u^12 - 2191*u^13 + 348*u^14 - 29*u^15 + u^16", "33589 - 147720*u + 401852*u^2 - 463977*u^3 + 480972*u^4 - 480113*u^5 + 308967*u^6 - 32385*u^7 - 36077*u^8 - 16962*u^9 + 9494*u^10 + 3893*u^11 + 6733*u^12 - 507*u^13 + 160*u^14 - 7*u^15 + u^16", "121837 - 117840*u + 261078*u^2 + 36099*u^3 + 88170*u^4 + 159013*u^5 + 67275*u^6 + 21531*u^7 + 31567*u^8 + 13878*u^9 - 262*u^10 - 1435*u^11 - 47*u^12 + 39*u^13 - 8*u^14 - 3*u^15 + u^16", "1669 + 64652*u + 931162*u^2 - 2460439*u^3 + 4577542*u^4 - 8417053*u^5 + 11741515*u^6 - 9974369*u^7 + 4684315*u^8 - 787446*u^9 - 169228*u^10 + 53045*u^11 + 5783*u^12 - 1051*u^13 - 114*u^14 + 9*u^15 + u^16", "16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16", "108431 + 104843*u + 131927*u^2 - 430485*u^3 + 116364*u^4 - 312787*u^5 + 604078*u^6 - 410659*u^7 + 298355*u^8 - 94945*u^9 + 40025*u^10 - 6091*u^11 + 2163*u^12 - 190*u^13 + 50*u^14 - 4*u^15 + u^16", "23 + u + 61*u^2 - 15*u^3 - 10*u^4 - 45*u^5 + 18*u^6 - 43*u^7 - u^8 - 51*u^9 + 107*u^10 - 17*u^11 + 67*u^12 - 2*u^13 + 14*u^14 + u^16", "1 - 5*u + 21*u^2 + 65*u^3 + 118*u^4 + 209*u^5 + 328*u^6 + 305*u^7 + 181*u^8 - 457*u^9 - 293*u^10 + 209*u^11 + 119*u^12 - 34*u^13 - 18*u^14 + 2*u^15 + u^16", "173 - 177*u + 13*u^2 + 167*u^3 + 76*u^4 - 155*u^5 + 10*u^6 - 19*u^7 + 71*u^8 + 97*u^9 - 75*u^10 - 63*u^11 + 37*u^12 + 18*u^13 - 8*u^14 - 2*u^15 + u^16", "60229 + 269172*u - 910902*u^2 + 1127031*u^3 + 39879478*u^4 + 106113341*u^5 + 171268219*u^6 + 113286417*u^7 + 15998443*u^8 - 35274362*u^9 + 1490004*u^10 + 474811*u^11 + 98167*u^12 + 7867*u^13 + 542*u^14 + 23*u^15 + u^16", "185296 - 192624*u + 1070420*u^2 - 1463192*u^3 + 2623412*u^4 - 2720622*u^5 + 3366203*u^6 - 2388703*u^7 + 1347191*u^8 - 221256*u^9 + 140175*u^10 - 81*u^11 + 3257*u^12 + 432*u^13 + 57*u^14 + u^15 + u^16", "1 + 8*u + 36*u^2 + 117*u^3 + 252*u^4 + 385*u^5 + 497*u^6 + 543*u^7 + 547*u^8 + 428*u^9 + 322*u^10 + 179*u^11 + 101*u^12 + 37*u^13 + 16*u^14 + 3*u^15 + u^16", "5329 - 114832*u + 987548*u^2 - 4573361*u^3 + 13010004*u^4 - 22852661*u^5 + 24934209*u^6 - 13671703*u^7 + 7284323*u^8 - 3680932*u^9 + 1538862*u^10 - 437475*u^11 + 82609*u^12 - 10409*u^13 + 860*u^14 - 43*u^15 + u^16", "1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16", "1 - 8*u - 72*u^2 + 711*u^3 + 1604*u^4 - 8381*u^5 + 24957*u^6 - 46423*u^7 + 59991*u^8 - 54028*u^9 + 34870*u^10 - 16571*u^11 + 5785*u^12 - 1433*u^13 + 236*u^14 - 23*u^15 + u^16", "52 + 12*u + 38*u^2 + 188*u^3 - 77*u^4 + 85*u^5 + 478*u^6 - 19*u^7 + 606*u^8 - 75*u^9 + 320*u^10 - 37*u^11 + 98*u^12 - 9*u^13 + 16*u^14 - u^15 + u^16", "131 + 306*u + 192*u^2 + 293*u^3 + 1410*u^4 + 2811*u^5 + 2619*u^6 + 777*u^7 - 583*u^8 - 900*u^9 - 562*u^10 + 127*u^11 + 237*u^12 - 5*u^13 - 24*u^14 - u^15 + u^16", "73 + 202*u + 1066*u^2 + 2043*u^3 + 4634*u^4 + 4815*u^5 + 5567*u^6 + 2449*u^7 + 2265*u^8 + 1152*u^9 + 582*u^10 + 67*u^11 + 191*u^12 - 33*u^13 + 26*u^14 - 3*u^15 + u^16", "2522669 + 5364202*u + 21040774*u^2 + 28886543*u^3 + 55084000*u^4 + 36712927*u^5 + 40659853*u^6 - 4151941*u^7 - 8358765*u^8 - 541864*u^9 + 1526680*u^10 - 190347*u^11 + 39329*u^12 - 2741*u^13 + 312*u^14 - 13*u^15 + u^16" ], "Multiplicity":1, "MinRepresentationVolume":[ "{9, 10}", 1.37285 ], "ij_list":[ [ "{4, 8}", "{5, 7}", "{5, 8}" ], [ "{4, 5}", "{4, 6}", "{7, 8}" ], [ "{5, 6}" ], [ "{4, 7}", "{6, 8}", "{6, 9}", "{7, 10}" ], [ "{1, 2}", "{4, 9}", "{6, 7}" ], [ "{8, 9}" ], [ "{5, 9}" ], [ "{6, 10}" ], [ "{7, 9}" ], [ "{1, 7}", "{2, 6}", "{2, 7}", "{3, 5}" ], [ "{3, 6}" ], [ "{1, 5}", "{3, 7}" ], [ "{2, 5}", "{3, 8}" ], [ "{5, 10}" ], [ "{1, 9}" ], [ "{1, 6}" ], [ "{1, 10}", "{2, 4}", "{2, 8}", "{3, 4}" ], [ "{9, 10}" ], [ "{1, 3}", "{3, 10}", "{4, 10}" ], [ "{2, 3}" ], [ "{8, 10}" ], [ "{1, 8}" ], [ "{1, 4}", "{2, 9}", "{2, 10}" ], [ "{3, 9}" ] ], "SortedReprnIndices":"{11, 12, 3, 4, 2, 1, 6, 5, 13, 14, 8, 7, 16, 15, 10, 9}", "aCuspShapeN":[ "-0.7147762149852784691`4.6384160205675755 + 2.2115357718752920084`5.12893989668195*I", "-0.7147762149852784691`4.6384160205675755 - 2.2115357718752920084`5.12893989668195*I", "1.6698881673772688714`4.816611081583076 - 3.1919776937936546693`5.097983541967073*I", "1.6698881673772688714`4.816611081583076 + 3.1919776937936546693`5.097983541967073*I", "-1.5226782522706814804`5.000409652703518 + 1.5198056869531803602`4.999589573017372*I", "-1.5226782522706814804`5.000409652703518 - 1.5198056869531803602`4.999589573017372*I", "3.4177837925046970617`5.068938373372768 + 2.3078843058346526189`4.898407821257581*I", "3.4177837925046970617`5.068938373372768 - 2.3078843058346526189`4.898407821257581*I", "-5.2326655474232408995`5.034513393664969 + 4.3969805342319132962`4.958944959500133*I", "-5.2326655474232408995`5.034513393664969 - 4.3969805342319132962`4.958944959500133*I", "1.4463648421337561226`4.5919340082848805 - 5.0305024585606829086`5.133267517333486*I", "1.4463648421337561226`4.5919340082848805 + 5.0305024585606829086`5.133267517333486*I", "2.2320219236882545603`5.1336904845460385 - 0.6335182377099250739`4.586751150329521*I", "2.2320219236882545603`5.1336904845460385 + 0.6335182377099250739`4.586751150329521*I", "-2.295938711024775943`4.776269395312038 + 4.9263326660889565663`5.107832840305371*I", "-2.295938711024775943`4.776269395312038 - 4.9263326660889565663`5.107832840305371*I" ], "Abelian":false }, { "IdealName":"J10_137_1", "Generators":[ "-1 + b + u", "1 + a + u", "1 - u + u^2" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":5.9634e-2, "TimingZeroDimVars":6.8148e-2, "TimingmagmaVCompNormalize":6.9376e-2, "TimingNumberOfSols":3.6046999999999996e-2, "TimingIsRadical":2.222e-3, "TimingArcColoring":7.2899e-2, "TimingObstruction":1.4950000000000002e-3, "TimingComplexVolumeN":1.156901, "TimingaCuspShapeN":1.0029999999999999e-2, "TiminguValues":0.638938, "TiminguPolysN":4.2699999999999997e-4, "TiminguPolys":0.81034, "TimingaCuspShape":9.924200000000001e-2, "TimingRepresentationsN":3.2891e-2, "TiminguValues_ij":0.167958, "TiminguPolys_ij_N":3.4e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ -1, "-u" ], [ -1, "-u" ], [ "-1 + u", "-u" ], "{1, 0}", [ 1, "-1 + u" ], [ "u", "-1 + u" ], [ "u", "-1 + u" ], [ 0, "u" ], "{-1, 0}", [ "-1 - u", "1 - u" ] ], "Obstruction":1, "ComplexVolumeN":[ "0. - 4.05977*I", "0. + 4.05977*I" ], "uPolysN":[ "u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "u^2", "1 + u + u^2", "1 - u + u^2", "1 - u + u^2", "1 + u + u^2" ], "uPolys":[ "u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "u^2", "1 + u + u^2", "1 - u + u^2", "1 - u + u^2", "1 + u + u^2" ], "aCuspShape":"-7 + 8*u", "RepresentationsN":[ [ "u->0.5 + 0.866025 I", "a->-1.5 - 0.86603 I", "b->0.5 - 0.866025 I" ], [ "u->0.5 - 0.866025 I", "a->-1.5 + 0.86603 I", "b->0.5 + 0.866025 I" ] ], "Epsilon":3.0, "uPolys_ij_N":[ "1 + 2*u + u^2", "u^2", "1 - 2*u + u^2", "1 - u + u^2", "1 + u + u^2", "1 + u + u^2", "1 - u + u^2", "3 + u^2" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{1, 2}", 4.05977 ], "ij_list":[ [ "{3, 6}", "{3, 7}", "{3, 8}", "{5, 10}" ], [ "{1, 2}", "{1, 6}", "{1, 7}", "{2, 6}", "{2, 7}", "{3, 5}", "{4, 9}", "{6, 7}" ], [ "{1, 5}", "{2, 5}" ], [ "{3, 10}", "{4, 10}" ], [ "{1, 3}", "{2, 3}", "{4, 5}", "{4, 6}", "{4, 7}", "{5, 9}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{9, 10}" ], [ "{1, 8}", "{1, 9}", "{1, 10}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 9}" ], [ "{1, 4}", "{2, 4}", "{3, 4}", "{4, 8}", "{5, 6}", "{5, 7}", "{5, 8}", "{8, 9}" ], [ "{8, 10}" ] ], "SortedReprnIndices":"{2, 1}", "aCuspShapeN":[ "-2.9999999999999999999`4.749698824715407 + 6.9282032302755091741`5.113198188683539*I", "-2.9999999999999999999`4.749698824715407 - 6.9282032302755091741`5.113198188683539*I" ], "Abelian":false }, { "IdealName":"J10_137_2", "Generators":[ "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":5.4089e-2, "TimingZeroDimVars":7.3871e-2, "TimingmagmaVCompNormalize":7.4993e-2, "TimingNumberOfSols":3.5391e-2, "TimingIsRadical":2.236e-3, "TimingArcColoring":7.4352e-2, "TimingObstruction":1.327e-3, "TimingComplexVolumeN":2.097711, "TimingaCuspShapeN":8.969e-3, "TiminguValues":0.649716, "TiminguPolysN":4.09e-4, "TiminguPolys":0.814463, "TimingaCuspShape":9.293100000000001e-2, "TimingRepresentationsN":3.332e-2, "TiminguValues_ij":0.166545, "TiminguPolys_ij_N":2.82e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ "u", "-1 + u" ], [ "u", "-1 + u" ], [ 1, "-1 + u" ], "{1, 0}", [ 1, "-1 + u" ], [ "u", "-1 + u" ], [ "u", "-1 + u" ], [ 0, "u" ], "{-1, 0}", [ 0, "u" ] ], "Obstruction":1, "ComplexVolumeN":"{0, 0}", "uPolysN":[ "u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "u^2", "1 + u + u^2", "1 - u + u^2", "1 - u + u^2", "1 + u + u^2" ], "uPolys":[ "u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "1 - u + u^2", "u^2", "1 + u + u^2", "1 - u + u^2", "1 - u + u^2", "1 + u + u^2" ], "aCuspShape":0, "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":[ "u^2", "1 - u + u^2", "1 + u + u^2", "1 + u + u^2", "1 - u + u^2" ], "GeometricComponent":0, "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 6}", "{1, 7}", "{2, 6}", "{2, 7}", "{3, 5}", "{4, 9}", "{6, 7}", "{8, 10}" ], [ "{1, 4}", "{2, 4}", "{3, 4}" ], [ "{1, 8}", "{1, 9}", "{1, 10}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 9}", "{4, 5}", "{4, 6}", "{4, 7}", "{5, 9}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}" ], [ "{1, 3}", "{1, 5}", "{2, 3}", "{2, 5}", "{9, 10}" ], [ "{3, 6}", "{3, 7}", "{3, 8}", "{3, 10}", "{4, 8}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 10}", "{8, 9}" ] ], "SortedReprnIndices":"{1, 2}", "aCuspShapeN":"{0, 0}", "Abelian":false }, { "IdealName":"abJ10_137_3", "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":5.4545e-2, "TimingZeroDimVars":7.375e-2, "TimingmagmaVCompNormalize":7.4949e-2, "TimingNumberOfSols":3.2013e-2, "TimingIsRadical":2.155e-3, "TimingArcColoring":7.5502e-2, "TimingObstruction":3.84e-4, "TimingComplexVolumeN":0.38666, "TimingaCuspShapeN":4.395e-3, "TiminguValues":0.632803, "TiminguPolysN":6.900000000000002e-5, "TiminguPolys":0.812506, "TimingaCuspShape":9.0229e-2, "TimingRepresentationsN":2.9127999999999998e-2, "TiminguValues_ij":0.163352, "TiminguPoly_ij":0.148523, "TiminguPolys_ij_N":2.8e-5 }, "ZeroDimensionalVars":[ "b", "a", "v" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}", "{1, 0}" ], "Obstruction":1, "ComplexVolumeN":"{0}", "uPolysN":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "uPolys":[ "u", "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "aCuspShape":0, "RepresentationsN":[ [ "v->1.", "a->1.", "b->0" ] ], "Epsilon":"Infinity", "uPolys_ij":[ "u" ], "GeometricComponent":0, "uPolys_ij_N":[ "u" ], "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 3}", "{1, 4}", "{1, 5}", "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{1, 10}", "{2, 3}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{2, 10}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{3, 10}", "{4, 5}", "{4, 6}", "{4, 7}", "{4, 8}", "{4, 9}", "{4, 10}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{5, 10}", "{6, 7}", "{6, 8}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 9}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":"{0}", "Abelian":true } ] }, "uPolyC":[ "u^4*(16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16)", "(1 - u + u^2)^2*(1 + 8*u + 36*u^2 + 117*u^3 + 252*u^4 + 385*u^5 + 497*u^6 + 543*u^7 + 547*u^8 + 428*u^9 + 322*u^10 + 179*u^11 + 101*u^12 + 37*u^13 + 16*u^14 + 3*u^15 + u^16)", "(1 - u + u^2)^2*(1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16)", "(1 - u + u^2)^2*(1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16)", "(1 - u + u^2)^2*(1 - 8*u + 76*u^2 - 277*u^3 + 596*u^4 - 777*u^5 + 441*u^6 + 345*u^7 - 925*u^8 + 804*u^9 - 230*u^10 - 211*u^11 + 285*u^12 - 165*u^13 + 56*u^14 - 11*u^15 + u^16)", "u^4*(16 + 16*u + 36*u^2 - 40*u^3 + 60*u^4 + 14*u^5 + 227*u^6 - 41*u^7 + 195*u^8 - 92*u^9 + 151*u^10 - 51*u^11 + 65*u^12 - 12*u^13 + 13*u^14 - u^15 + u^16)", "(1 + u + u^2)^2*(1 - 4*u + 12*u^2 - 17*u^3 + 34*u^4 - 47*u^5 + 63*u^6 - 79*u^7 + 79*u^8 - 80*u^9 + 66*u^10 - 51*u^11 + 35*u^12 - 19*u^13 + 10*u^14 - 3*u^15 + u^16)", "(1 - u + u^2)^2*(1 + 4*u^2 + 23*u^3 + 10*u^4 + 59*u^5 + 133*u^6 - 7*u^7 + 153*u^8 + 6*u^9 - 56*u^10 + 83*u^11 + 31*u^12 - 31*u^13 - 10*u^14 + 3*u^15 + u^16)", "(1 - u + u^2)^2*(73 + 202*u + 1066*u^2 + 2043*u^3 + 4634*u^4 + 4815*u^5 + 5567*u^6 + 2449*u^7 + 2265*u^8 + 1152*u^9 + 582*u^10 + 67*u^11 + 191*u^12 - 33*u^13 + 26*u^14 - 3*u^15 + u^16)", "(1 + u + u^2)^2*(1 + 2*u + 6*u^2 + 7*u^3 + 14*u^4 + 9*u^5 + 17*u^6 + 13*u^7 + 15*u^8 + 10*u^9 + 16*u^10 + 13*u^11 + 11*u^12 + 7*u^13 + 6*u^14 + 3*u^15 + u^16)" ], "RileyPolyC":[ "y^4*(256 + 896*y + 4496*y^2 + 9536*y^3 + 28616*y^4 + 45580*y^5 + 83301*y^6 + 108945*y^7 + 108303*y^8 + 77642*y^9 + 43833*y^10 + 20263*y^11 + 7133*y^12 + 1746*y^13 + 275*y^14 + 25*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y - 72*y^2 - 711*y^3 + 1604*y^4 + 8381*y^5 + 24957*y^6 + 46423*y^7 + 59991*y^8 + 54028*y^9 + 34870*y^10 + 16571*y^11 + 5785*y^12 + 1433*y^13 + 236*y^14 + 23*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y + 36*y^2 + 117*y^3 + 252*y^4 + 385*y^5 + 497*y^6 + 543*y^7 + 547*y^8 + 428*y^9 + 322*y^10 + 179*y^11 + 101*y^12 + 37*y^13 + 16*y^14 + 3*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y + 76*y^2 + 277*y^3 + 596*y^4 + 777*y^5 + 441*y^6 - 345*y^7 - 925*y^8 - 804*y^9 - 230*y^10 + 211*y^11 + 285*y^12 + 165*y^13 + 56*y^14 + 11*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 88*y + 2536*y^2 + 2313*y^3 - 4540*y^4 - 15123*y^5 + 35661*y^6 - 35721*y^7 + 26759*y^8 - 19556*y^9 + 12278*y^10 - 5429*y^11 + 1673*y^12 - 407*y^13 + 76*y^14 - 9*y^15 + y^16)", "y^4*(256 + 896*y + 4496*y^2 + 9536*y^3 + 28616*y^4 + 45580*y^5 + 83301*y^6 + 108945*y^7 + 108303*y^8 + 77642*y^9 + 43833*y^10 + 20263*y^11 + 7133*y^12 + 1746*y^13 + 275*y^14 + 25*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y + 76*y^2 + 277*y^3 + 596*y^4 + 777*y^5 + 441*y^6 - 345*y^7 - 925*y^8 - 804*y^9 - 230*y^10 + 211*y^11 + 285*y^12 + 165*y^13 + 56*y^14 + 11*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y + 36*y^2 - 183*y^3 - 1244*y^4 + 613*y^5 + 20913*y^6 + 35231*y^7 + 771*y^8 - 4436*y^9 + 8198*y^10 - 12741*y^11 + 7497*y^12 - 2191*y^13 + 348*y^14 - 29*y^15 + y^16)", "(1 + y + y^2)^2*(5329 + 114832*y + 987548*y^2 + 4573361*y^3 + 13010004*y^4 + 22852661*y^5 + 24934209*y^6 + 13671703*y^7 + 7284323*y^8 + 3680932*y^9 + 1538862*y^10 + 437475*y^11 + 82609*y^12 + 10409*y^13 + 860*y^14 + 43*y^15 + y^16)", "(1 + y + y^2)^2*(1 + 8*y + 36*y^2 + 117*y^3 + 252*y^4 + 385*y^5 + 497*y^6 + 543*y^7 + 547*y^8 + 428*y^9 + 322*y^10 + 179*y^11 + 101*y^12 + 37*y^13 + 16*y^14 + 3*y^15 + y^16)" ] }, "GeometricRepresentation":[ 9.2506, [ "J10_137_0", 1, "{11, 12}" ] ] } }