{ "Index":100, "Name":"10_16", "RolfsenName":"10_16", "DTname":"10a_115", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-10, 14, 16, 18, -2, -20, 8, 6, 4, -12}", "Acode":"{-6, 8, 9, 10, -2, -1, 5, 4, 3, -7}", "PDcode":[ "{1, 10, 2, 11}", "{3, 15, 4, 14}", "{5, 17, 6, 16}", "{7, 19, 8, 18}", "{9, 2, 10, 3}", "{11, 20, 12, 1}", "{13, 9, 14, 8}", "{15, 7, 16, 6}", "{17, 5, 18, 4}", "{19, 12, 20, 13}" ], "CBtype":"{2, 0}", "ParabolicReps":{ "SolvingSeq":[ "{2, 6}", [], [ "{2, -6, 1, 2}", "{6, -1, 7, 1}", "{6, -2, 5, 2}", "{7, 5, 8, 1}", "{2, 8, 3, 1}", "{1, -7, 10, 2}", "{5, 10, 4, 2}", "{10, 3, 9, 2}" ], "{8}", "{3}", 3 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 + u - 2*u^2 - 2*u^3 + 3*u^4 + 3*u^5 + 17*u^6 - 12*u^7 + 52*u^8 - 71*u^9 + 46*u^10 - 172*u^11 - 44*u^12 - 218*u^13 - 210*u^14 - 152*u^15 - 283*u^16 - 59*u^17 - 190*u^18 - 12*u^19 - 69*u^20 - u^21 - 13*u^22 - u^24", "u - 2*u^2 + 4*u^3 - 2*u^4 - u^5 - 2*u^6 - 15*u^7 + 27*u^8 - 79*u^9 + 150*u^10 - 196*u^11 + 368*u^12 - 324*u^13 + 542*u^14 - 332*u^15 + 484*u^16 - 201*u^17 + 260*u^18 - 70*u^19 + 82*u^20 - 13*u^21 + 14*u^22 - u^23 + u^24" ], "TimingForPrimaryIdeals":8.8009e-2 }, "v":{ "CheckEq":[ "-1 + v" ], "TimingForPrimaryIdeals":7.2212e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_16_0", "Generators":[ "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23" ], "VariableOrder":[ "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.8063e-2, "TimingZeroDimVars":1.7233000000000002e-2, "TimingmagmaVCompNormalize":1.8478e-2, "TimingNumberOfSols":4.1486999999999996e-2, "TimingIsRadical":1.791e-3, "TimingArcColoring":5.7436999999999995e-2, "TimingObstruction":3.0699e-2, "TimingComplexVolumeN":1.5796558000000001e1, "TimingaCuspShapeN":0.111639, "TiminguValues":0.656552, "TiminguPolysN":2.5398999999999998e-2, "TiminguPolys":0.846111, "TimingaCuspShape":0.110428, "TimingRepresentationsN":4.2980000000000004e-2, "TiminguValues_ij":0.17147, "TiminguPoly_ij":1.54822, "TiminguPolys_ij_N":5.0595e-2 }, "ZeroDimensionalVars":[ "u" ], "NumberOfSols":23, "IsRadical":true, "ArcColoring":[ [ 1, "u^2" ], "{1, 0}", [ "1 + u^2 + u^4 - 6*u^6 - 5*u^8 - u^10", "u^2 + 6*u^4 + 11*u^6 + 6*u^8 + u^10" ], [ "4*u^3 + 4*u^5 + u^7", "u + 2*u^3 + 7*u^5 + 5*u^7 + u^9" ], [ "-u", "u" ], [ 0, "u" ], [ "u", "u + u^3" ], [ "u - 2*u^3 - u^5", "u + 3*u^3 + u^5" ], [ "u - 2*u^3 + 3*u^5 - 12*u^7 - 71*u^9 - 172*u^11 - 218*u^13 - 152*u^15 - 59*u^17 - 12*u^19 - u^21", "1 - u + 4*u^2 + 2*u^3 - u^4 - 3*u^5 - 15*u^6 + 12*u^7 - 79*u^8 + 71*u^9 - 196*u^10 + 172*u^11 - 324*u^12 + 218*u^13 - 332*u^14 + 152*u^15 - 201*u^16 + 59*u^17 - 70*u^18 + 12*u^19 - 13*u^20 + u^21 - u^22" ], [ "1 + u^2", "2*u^2 + u^4" ] ], "Obstruction":-1, "ComplexVolumeN":[ "0.1634 + 7.25342*I", "0.1634 - 7.25342*I", "-4.21185 - 3.22031*I", "-4.21185 + 3.22031*I", "-0.817157 - 0.745308*I", "-0.817157 + 0.745308*I", "4.9684 - 1.6804*I", "4.9684 + 1.6804*I", "2.00599 - 3.66457*I", "2.00599 + 3.66457*I", -2.00773, "-0.140168 + 0.925919*I", "-0.140168 - 0.925919*I", "-1.46467 - 3.53591*I", "-1.46467 + 3.53591*I", "-7.11725 + 1.68405*I", "-7.11725 - 1.68405*I", "-7.87123 + 9.54664*I", "-7.87123 - 9.54664*I", "-12.3802 - 5.22748*I", "-12.3802 + 5.22748*I", "-9.14246 + 0.83337*I", "-9.14246 - 0.83337*I" ], "uPolysN":[ "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "-17 + 40*u - 10*u^2 + 36*u^3 - 291*u^4 + 532*u^5 - 417*u^6 + 185*u^7 - 115*u^8 + 16*u^9 + 8*u^10 + 368*u^11 - 540*u^12 + 72*u^13 + 224*u^14 + 38*u^15 - 233*u^16 + 112*u^17 + 18*u^18 - 12*u^19 - 21*u^20 + 20*u^21 - 7*u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23" ], "uPolys":[ "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "-17 + 40*u - 10*u^2 + 36*u^3 - 291*u^4 + 532*u^5 - 417*u^6 + 185*u^7 - 115*u^8 + 16*u^9 + 8*u^10 + 368*u^11 - 540*u^12 + 72*u^13 + 224*u^14 + 38*u^15 - 233*u^16 + 112*u^17 + 18*u^18 - 12*u^19 - 21*u^20 + 20*u^21 - 7*u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23" ], "aCuspShape":"-2 - 4*(-1 + 4*u - u^2 - 3*u^3 - 3*u^4 - 8*u^5 + 2*u^6 - 47*u^7 + 76*u^8 - 126*u^9 + 247*u^10 - 250*u^11 + 437*u^12 - 293*u^13 + 436*u^14 - 191*u^15 + 249*u^16 - 69*u^17 + 81*u^18 - 13*u^19 + 14*u^20 - u^21 + u^22)", "RepresentationsN":[ [ "u->0.473302 + 0.738923 I" ], [ "u->0.473302 - 0.738923 I" ], [ "u->-0.413689 + 0.761868 I" ], [ "u->-0.413689 - 0.761868 I" ], [ "u->0.324148 + 0.802707 I" ], [ "u->0.324148 - 0.802707 I" ], [ "u->-0.477903 + 0.451361 I" ], [ "u->-0.477903 - 0.451361 I" ], [ "u->0.581337 + 0.108709 I" ], [ "u->0.581337 - 0.108709 I" ], [ "u->-0.546774" ], [ "u->0.228067 + 0.467269 I" ], [ "u->0.228067 - 0.467269 I" ], [ "u->-0.08584 + 1.50808 I" ], [ "u->-0.08584 - 1.50808 I" ], [ "u->0.03322 + 1.55779 I" ], [ "u->0.03322 - 1.55779 I" ], [ "u->0.13674 + 1.61894 I" ], [ "u->0.13674 - 1.61894 I" ], [ "u->-0.11785 + 1.62483 I" ], [ "u->-0.11785 - 1.62483 I" ], [ "u->0.09185 + 1.62814 I" ], [ "u->0.09185 - 1.62814 I" ] ], "Epsilon":4.5819099999999995e-2, "uPolys_ij":[ "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "-1 - 4*u - 6*u^2 + 50*u^3 + 177*u^4 + 290*u^5 - 347*u^6 - 3017*u^7 - 7187*u^8 - 2376*u^9 + 36980*u^10 + 137208*u^11 + 288768*u^12 + 426976*u^13 + 471372*u^14 + 396624*u^15 + 255475*u^16 + 125468*u^17 + 46486*u^18 + 12750*u^19 + 2507*u^20 + 334*u^21 + 27*u^22 + u^23", "53 + 20*u + 458*u^2 + 188*u^3 + 1457*u^4 - 42*u^5 + 1145*u^6 - 945*u^7 - 2175*u^8 + 950*u^9 - 5062*u^10 + 9130*u^11 - 2270*u^12 + 14078*u^13 + 102*u^14 + 7818*u^15 + 449*u^16 + 2192*u^17 + 146*u^18 + 338*u^19 + 19*u^20 + 28*u^21 + u^22 + u^23", "-17 + 40*u - 10*u^2 + 36*u^3 - 291*u^4 + 532*u^5 - 417*u^6 + 185*u^7 - 115*u^8 + 16*u^9 + 8*u^10 + 368*u^11 - 540*u^12 + 72*u^13 + 224*u^14 + 38*u^15 - 233*u^16 + 112*u^17 + 18*u^18 - 12*u^19 - 21*u^20 + 20*u^21 - 7*u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "-7 + 148*u - 1074*u^2 + 3478*u^3 - 6857*u^4 + 35038*u^5 - 36053*u^6 + 105493*u^7 - 39233*u^8 + 166236*u^9 + 55576*u^10 + 190360*u^11 + 85420*u^12 + 108868*u^13 + 36872*u^14 + 31874*u^15 + 6773*u^16 + 5424*u^17 + 538*u^18 + 616*u^19 + u^20 + 40*u^21 - u^22 + u^23", "1 + 2*u + 16*u^2 - 56*u^3 + 163*u^4 - 1014*u^5 + 2267*u^6 - 5319*u^7 + 15667*u^8 - 5240*u^9 + 4196*u^10 + 21552*u^11 - 16816*u^12 - 26056*u^13 + 19360*u^14 + 23934*u^15 - 17103*u^16 - 2800*u^17 + 3322*u^18 + 556*u^19 - 203*u^20 - 38*u^21 + 5*u^22 + u^23", "289 + 1260*u + 7114*u^2 + 23858*u^3 + 43827*u^4 + 52902*u^5 + 31587*u^6 - 10933*u^7 - 81421*u^8 - 97480*u^9 - 12544*u^10 + 147348*u^11 + 261724*u^12 + 281848*u^13 + 216788*u^14 + 132300*u^15 + 63385*u^16 + 25484*u^17 + 7998*u^18 + 2194*u^19 + 445*u^20 + 82*u^21 + 9*u^22 + u^23", "17 - 192*u + 1114*u^2 - 4100*u^3 + 10163*u^4 - 17076*u^5 + 18297*u^6 - 8095*u^7 - 9557*u^8 + 21368*u^9 - 17056*u^10 + 1208*u^11 + 10428*u^12 - 8944*u^13 + 1000*u^14 + 3166*u^15 - 2087*u^16 + 88*u^17 + 470*u^18 - 204*u^19 - 3*u^20 + 28*u^21 - 9*u^22 + u^23", "25 - 144*u + 442*u^2 + 3018*u^3 + 3007*u^4 + 382*u^5 + 13343*u^6 + 43815*u^7 + 50743*u^8 + 11744*u^9 - 29336*u^10 - 27396*u^11 + 1288*u^12 + 17844*u^13 + 15300*u^14 + 9192*u^15 + 7177*u^16 + 6324*u^17 + 4270*u^18 + 1998*u^19 + 637*u^20 + 134*u^21 + 17*u^22 + u^23", "7979 - 31994*u + 103116*u^2 - 163874*u^3 + 111089*u^4 + 35280*u^5 - 367139*u^6 + 713447*u^7 - 877537*u^8 + 998312*u^9 - 929430*u^10 + 730910*u^11 - 527656*u^12 + 333826*u^13 - 184136*u^14 + 90894*u^15 - 38827*u^16 + 14734*u^17 - 4362*u^18 + 1192*u^19 - 243*u^20 + 48*u^21 - 5*u^22 + u^23", "337 + 2596*u + 15386*u^2 + 59530*u^3 + 162491*u^4 + 314722*u^5 + 445763*u^6 + 487031*u^7 + 463195*u^8 + 466824*u^9 + 512180*u^10 + 453404*u^11 + 231416*u^12 + 30540*u^13 - 31316*u^14 - 4792*u^15 + 8049*u^16 - 204*u^17 - 1654*u^18 + 56*u^19 + 149*u^20 - 9*u^22 + u^23", "799 + 1894*u - 2014*u^2 + 27082*u^3 - 62315*u^4 + 117042*u^5 - 136859*u^6 + 158567*u^7 - 133459*u^8 + 107050*u^9 - 59500*u^10 + 54264*u^11 - 472*u^12 + 27420*u^13 + 10922*u^14 + 10752*u^15 + 4419*u^16 + 2506*u^17 + 736*u^18 + 330*u^19 + 55*u^20 + 26*u^21 + u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 - 4*u + 30*u^2 + 38*u^3 - 81*u^4 + 226*u^5 - 557*u^6 - 969*u^7 + 4023*u^8 - 1432*u^9 - 8228*u^10 + 11388*u^11 + 840*u^12 - 15344*u^13 + 14956*u^14 - 1760*u^15 - 9543*u^16 + 11364*u^17 - 7274*u^18 + 3058*u^19 - 875*u^20 + 166*u^21 - 19*u^22 + u^23", "425 + 3120*u + 12786*u^2 + 39060*u^3 + 96803*u^4 + 184188*u^5 + 225109*u^6 + 122221*u^7 - 96805*u^8 - 174888*u^9 - 113852*u^10 + 84312*u^11 + 31288*u^12 + 16936*u^13 - 30544*u^14 + 17368*u^15 + 3153*u^16 - 3528*u^17 - 486*u^18 + 482*u^19 + 13*u^20 - 6*u^21 + 5*u^22 + u^23", "43 + 314*u + 1324*u^2 + 3418*u^3 + 3969*u^4 + 2444*u^5 + 1837*u^6 + 27353*u^7 + 7115*u^8 - 56826*u^9 + 25586*u^10 + 120428*u^11 - 130704*u^12 - 11638*u^13 + 76502*u^14 - 4260*u^15 - 13687*u^16 + 6218*u^17 + 4*u^18 + 756*u^19 + 369*u^20 + 92*u^21 + 11*u^22 + u^23", "695 + 884*u + 3452*u^2 + 10450*u^3 - 58501*u^4 + 168770*u^5 - 453475*u^6 + 965721*u^7 - 1236273*u^8 + 965772*u^9 - 342802*u^10 - 18546*u^11 + 125540*u^12 - 28912*u^13 + 3622*u^14 + 36144*u^15 + 10463*u^16 + 4062*u^17 + 2942*u^18 + 696*u^19 - 55*u^20 - 24*u^21 - u^22 + u^23", "1 + 2*u + 8*u^2 + 154*u^3 - 181*u^4 + 1226*u^5 - 1181*u^6 + 3441*u^7 - 8829*u^8 + 19752*u^9 - 14420*u^10 - 7860*u^11 + 12976*u^12 + 8696*u^13 - 2752*u^14 + 1002*u^15 - 39*u^16 + 548*u^17 - 194*u^18 + 64*u^19 + 13*u^20 + 2*u^21 - 3*u^22 + u^23" ], "GeometricComponent":"{18, 19}", "uPolys_ij_N":[ "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "-1 - 4*u - 6*u^2 + 50*u^3 + 177*u^4 + 290*u^5 - 347*u^6 - 3017*u^7 - 7187*u^8 - 2376*u^9 + 36980*u^10 + 137208*u^11 + 288768*u^12 + 426976*u^13 + 471372*u^14 + 396624*u^15 + 255475*u^16 + 125468*u^17 + 46486*u^18 + 12750*u^19 + 2507*u^20 + 334*u^21 + 27*u^22 + u^23", "53 + 20*u + 458*u^2 + 188*u^3 + 1457*u^4 - 42*u^5 + 1145*u^6 - 945*u^7 - 2175*u^8 + 950*u^9 - 5062*u^10 + 9130*u^11 - 2270*u^12 + 14078*u^13 + 102*u^14 + 7818*u^15 + 449*u^16 + 2192*u^17 + 146*u^18 + 338*u^19 + 19*u^20 + 28*u^21 + u^22 + u^23", "-17 + 40*u - 10*u^2 + 36*u^3 - 291*u^4 + 532*u^5 - 417*u^6 + 185*u^7 - 115*u^8 + 16*u^9 + 8*u^10 + 368*u^11 - 540*u^12 + 72*u^13 + 224*u^14 + 38*u^15 - 233*u^16 + 112*u^17 + 18*u^18 - 12*u^19 - 21*u^20 + 20*u^21 - 7*u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "-7 + 148*u - 1074*u^2 + 3478*u^3 - 6857*u^4 + 35038*u^5 - 36053*u^6 + 105493*u^7 - 39233*u^8 + 166236*u^9 + 55576*u^10 + 190360*u^11 + 85420*u^12 + 108868*u^13 + 36872*u^14 + 31874*u^15 + 6773*u^16 + 5424*u^17 + 538*u^18 + 616*u^19 + u^20 + 40*u^21 - u^22 + u^23", "1 + 2*u + 16*u^2 - 56*u^3 + 163*u^4 - 1014*u^5 + 2267*u^6 - 5319*u^7 + 15667*u^8 - 5240*u^9 + 4196*u^10 + 21552*u^11 - 16816*u^12 - 26056*u^13 + 19360*u^14 + 23934*u^15 - 17103*u^16 - 2800*u^17 + 3322*u^18 + 556*u^19 - 203*u^20 - 38*u^21 + 5*u^22 + u^23", "289 + 1260*u + 7114*u^2 + 23858*u^3 + 43827*u^4 + 52902*u^5 + 31587*u^6 - 10933*u^7 - 81421*u^8 - 97480*u^9 - 12544*u^10 + 147348*u^11 + 261724*u^12 + 281848*u^13 + 216788*u^14 + 132300*u^15 + 63385*u^16 + 25484*u^17 + 7998*u^18 + 2194*u^19 + 445*u^20 + 82*u^21 + 9*u^22 + u^23", "17 - 192*u + 1114*u^2 - 4100*u^3 + 10163*u^4 - 17076*u^5 + 18297*u^6 - 8095*u^7 - 9557*u^8 + 21368*u^9 - 17056*u^10 + 1208*u^11 + 10428*u^12 - 8944*u^13 + 1000*u^14 + 3166*u^15 - 2087*u^16 + 88*u^17 + 470*u^18 - 204*u^19 - 3*u^20 + 28*u^21 - 9*u^22 + u^23", "25 - 144*u + 442*u^2 + 3018*u^3 + 3007*u^4 + 382*u^5 + 13343*u^6 + 43815*u^7 + 50743*u^8 + 11744*u^9 - 29336*u^10 - 27396*u^11 + 1288*u^12 + 17844*u^13 + 15300*u^14 + 9192*u^15 + 7177*u^16 + 6324*u^17 + 4270*u^18 + 1998*u^19 + 637*u^20 + 134*u^21 + 17*u^22 + u^23", "7979 - 31994*u + 103116*u^2 - 163874*u^3 + 111089*u^4 + 35280*u^5 - 367139*u^6 + 713447*u^7 - 877537*u^8 + 998312*u^9 - 929430*u^10 + 730910*u^11 - 527656*u^12 + 333826*u^13 - 184136*u^14 + 90894*u^15 - 38827*u^16 + 14734*u^17 - 4362*u^18 + 1192*u^19 - 243*u^20 + 48*u^21 - 5*u^22 + u^23", "337 + 2596*u + 15386*u^2 + 59530*u^3 + 162491*u^4 + 314722*u^5 + 445763*u^6 + 487031*u^7 + 463195*u^8 + 466824*u^9 + 512180*u^10 + 453404*u^11 + 231416*u^12 + 30540*u^13 - 31316*u^14 - 4792*u^15 + 8049*u^16 - 204*u^17 - 1654*u^18 + 56*u^19 + 149*u^20 - 9*u^22 + u^23", "799 + 1894*u - 2014*u^2 + 27082*u^3 - 62315*u^4 + 117042*u^5 - 136859*u^6 + 158567*u^7 - 133459*u^8 + 107050*u^9 - 59500*u^10 + 54264*u^11 - 472*u^12 + 27420*u^13 + 10922*u^14 + 10752*u^15 + 4419*u^16 + 2506*u^17 + 736*u^18 + 330*u^19 + 55*u^20 + 26*u^21 + u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 - 4*u + 30*u^2 + 38*u^3 - 81*u^4 + 226*u^5 - 557*u^6 - 969*u^7 + 4023*u^8 - 1432*u^9 - 8228*u^10 + 11388*u^11 + 840*u^12 - 15344*u^13 + 14956*u^14 - 1760*u^15 - 9543*u^16 + 11364*u^17 - 7274*u^18 + 3058*u^19 - 875*u^20 + 166*u^21 - 19*u^22 + u^23", "425 + 3120*u + 12786*u^2 + 39060*u^3 + 96803*u^4 + 184188*u^5 + 225109*u^6 + 122221*u^7 - 96805*u^8 - 174888*u^9 - 113852*u^10 + 84312*u^11 + 31288*u^12 + 16936*u^13 - 30544*u^14 + 17368*u^15 + 3153*u^16 - 3528*u^17 - 486*u^18 + 482*u^19 + 13*u^20 - 6*u^21 + 5*u^22 + u^23", "43 + 314*u + 1324*u^2 + 3418*u^3 + 3969*u^4 + 2444*u^5 + 1837*u^6 + 27353*u^7 + 7115*u^8 - 56826*u^9 + 25586*u^10 + 120428*u^11 - 130704*u^12 - 11638*u^13 + 76502*u^14 - 4260*u^15 - 13687*u^16 + 6218*u^17 + 4*u^18 + 756*u^19 + 369*u^20 + 92*u^21 + 11*u^22 + u^23", "695 + 884*u + 3452*u^2 + 10450*u^3 - 58501*u^4 + 168770*u^5 - 453475*u^6 + 965721*u^7 - 1236273*u^8 + 965772*u^9 - 342802*u^10 - 18546*u^11 + 125540*u^12 - 28912*u^13 + 3622*u^14 + 36144*u^15 + 10463*u^16 + 4062*u^17 + 2942*u^18 + 696*u^19 - 55*u^20 - 24*u^21 - u^22 + u^23", "1 + 2*u + 8*u^2 + 154*u^3 - 181*u^4 + 1226*u^5 - 1181*u^6 + 3441*u^7 - 8829*u^8 + 19752*u^9 - 14420*u^10 - 7860*u^11 + 12976*u^12 + 8696*u^13 - 2752*u^14 + 1002*u^15 - 39*u^16 + 548*u^17 - 194*u^18 + 64*u^19 + 13*u^20 + 2*u^21 - 3*u^22 + u^23" ], "Multiplicity":1, "ij_list":[ [ "{1, 6}", "{1, 7}", "{2, 5}", "{2, 6}", "{7, 10}" ], [ "{1, 2}", "{1, 10}", "{5, 6}", "{6, 7}" ], [ "{1, 5}", "{2, 7}", "{6, 10}" ], [ "{2, 10}", "{5, 7}", "{5, 8}" ], [ "{2, 8}", "{3, 8}", "{4, 10}", "{5, 10}" ], [ "{4, 7}", "{6, 8}" ], [ "{1, 4}", "{1, 8}" ], [ "{4, 6}", "{7, 8}" ], [ "{2, 4}", "{3, 5}", "{8, 10}" ], [ "{2, 3}", "{4, 5}" ], [ "{3, 6}" ], [ "{1, 3}" ], [ "{3, 7}" ], [ "{3, 9}", "{3, 10}", "{4, 8}", "{4, 9}" ], [ "{3, 4}", "{8, 9}", "{9, 10}" ], [ "{7, 9}" ], [ "{1, 9}" ], [ "{6, 9}" ], [ "{2, 9}", "{5, 9}" ] ], "SortedReprnIndices":"{18, 19, 1, 2, 21, 20, 10, 9, 15, 14, 4, 3, 16, 17, 8, 7, 12, 13, 22, 23, 6, 5, 11}", "aCuspShapeN":[ "-3.0973427676479076442`4.744356685048858 - 7.2580165824337158631`5.114185371905027*I", "-3.0973427676479076442`4.744356685048858 + 7.2580165824337158631`5.114185371905027*I", "-8.2207915266816562582`5.084398281328964 + 4.9044309483224067313`4.860073270664402*I", "-8.2207915266816562582`5.084398281328964 - 4.9044309483224067313`4.860073270664402*I", "-5.0800869850894332218`5.146013713346676 - 0.7352190505778117`4.306559316396103*I", "-5.0800869850894332218`5.146013713346676 + 0.7352190505778117`4.306559316396103*I", "2.8227207586253049161`4.889912633353429 + 4.2999122595220121317`5.072704310049581*I", "2.8227207586253049161`4.889912633353429 - 4.2999122595220121317`5.072704310049581*I", "0.824340888422758235`4.620141552697385 + 2.6713349858115840081`5.130763062755966*I", "0.824340888422758235`4.620141552697385 - 2.6713349858115840081`5.130763062755966*I", -4.0117, "-2.9424881353548869806`4.715991594498724 - 7.4421394056230967197`5.118974675068617*I", "-2.9424881353548869806`4.715991594498724 + 7.4421394056230967197`5.118974675068617*I", "-1.365073005466720291`4.739573921712917 + 3.2406125453697450967`5.115045152163194*I", "-1.365073005466720291`4.739573921712917 - 3.2406125453697450967`5.115045152163194*I", "-6.3551649304972959919`5.083227935071183 - 3.8302493391543618686`4.863328155455583*I", "-6.3551649304972959919`5.083227935071183 + 3.8302493391543618686`4.863328155455583*I", "-5.2874826203197097592`4.988034194753209 - 5.5789887733872064088`5.011340729350529*I", "-5.2874826203197097592`4.988034194753209 + 5.5789887733872064088`5.011340729350529*I", "-9.6663114089707055238`5.126102809603923 + 3.3343210523607211921`4.66384944188079*I", "-9.6663114089707055238`5.126102809603923 - 3.3343210523607211921`4.66384944188079*I", "-6.6264690551019080501`5.149564529100053 + 0.4388835884530632551`3.9706316961050603*I", "-6.6264690551019080501`5.149564529100053 - 0.4388835884530632551`3.9706316961050603*I" ], "Abelian":false }, { "IdealName":"abJ10_16_1", "Generators":[ "-1 + v" ], "VariableOrder":[ "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.4328000000000006e-2, "TimingZeroDimVars":1.5719e-2, "TimingmagmaVCompNormalize":1.6946000000000003e-2, "TimingNumberOfSols":2.1246e-2, "TimingIsRadical":1.7620000000000001e-3, "TimingArcColoring":5.3715000000000006e-2, "TimingObstruction":4.33e-4, "TimingComplexVolumeN":0.334999, "TimingaCuspShapeN":4.797e-3, "TiminguValues":0.618259, "TiminguPolysN":1.3600000000000003e-4, "TiminguPolys":0.814725, "TimingaCuspShape":0.103413, "TimingRepresentationsN":1.9688e-2, "TiminguValues_ij":0.139384, "TiminguPoly_ij":0.132918, "TiminguPolys_ij_N":2.8e-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 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "5 + 4*u + 16*u^2 - 32*u^3 - 7*u^4 + 70*u^5 - 121*u^6 - 45*u^7 + 199*u^8 - 22*u^9 - 84*u^10 + 42*u^11 - 38*u^12 - 40*u^13 + 32*u^14 + 54*u^15 + 11*u^16 - 52*u^17 - 18*u^18 + 28*u^19 + 7*u^20 - 8*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23", "-17 + 40*u - 10*u^2 + 36*u^3 - 291*u^4 + 532*u^5 - 417*u^6 + 185*u^7 - 115*u^8 + 16*u^9 + 8*u^10 + 368*u^11 - 540*u^12 + 72*u^13 + 224*u^14 + 38*u^15 - 233*u^16 + 112*u^17 + 18*u^18 - 12*u^19 - 21*u^20 + 20*u^21 - 7*u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 + 2*u + 4*u^2 - 2*u^3 + 3*u^4 + 12*u^5 - 5*u^6 + 11*u^7 - 27*u^8 - 46*u^9 - 32*u^10 - 64*u^11 + 14*u^12 + 20*u^13 + 66*u^14 + 100*u^15 + 67*u^16 + 92*u^17 + 34*u^18 + 42*u^19 + 9*u^20 + 10*u^21 + u^22 + u^23", "1 - 2*u + 4*u^2 - 2*u^3 - u^4 - 2*u^5 - 15*u^6 + 27*u^7 - 79*u^8 + 150*u^9 - 196*u^10 + 368*u^11 - 324*u^12 + 542*u^13 - 332*u^14 + 484*u^15 - 201*u^16 + 260*u^17 - 70*u^18 + 82*u^19 - 13*u^20 + 14*u^21 - u^22 + u^23" ], "RileyPolyC":[ "-1 - 4*y - 6*y^2 + 50*y^3 + 177*y^4 + 290*y^5 - 347*y^6 - 3017*y^7 - 7187*y^8 - 2376*y^9 + 36980*y^10 + 137208*y^11 + 288768*y^12 + 426976*y^13 + 471372*y^14 + 396624*y^15 + 255475*y^16 + 125468*y^17 + 46486*y^18 + 12750*y^19 + 2507*y^20 + 334*y^21 + 27*y^22 + y^23", "-25 - 144*y - 442*y^2 + 3018*y^3 - 3007*y^4 + 382*y^5 - 13343*y^6 + 43815*y^7 - 50743*y^8 + 11744*y^9 + 29336*y^10 - 27396*y^11 - 1288*y^12 + 17844*y^13 - 15300*y^14 + 9192*y^15 - 7177*y^16 + 6324*y^17 - 4270*y^18 + 1998*y^19 - 637*y^20 + 134*y^21 - 17*y^22 + y^23", "-1 - 4*y - 30*y^2 + 38*y^3 + 81*y^4 + 226*y^5 + 557*y^6 - 969*y^7 - 4023*y^8 - 1432*y^9 + 8228*y^10 + 11388*y^11 - 840*y^12 - 15344*y^13 - 14956*y^14 - 1760*y^15 + 9543*y^16 + 11364*y^17 + 7274*y^18 + 3058*y^19 + 875*y^20 + 166*y^21 + 19*y^22 + y^23", "-25 - 144*y - 442*y^2 + 3018*y^3 - 3007*y^4 + 382*y^5 - 13343*y^6 + 43815*y^7 - 50743*y^8 + 11744*y^9 + 29336*y^10 - 27396*y^11 - 1288*y^12 + 17844*y^13 - 15300*y^14 + 9192*y^15 - 7177*y^16 + 6324*y^17 - 4270*y^18 + 1998*y^19 - 637*y^20 + 134*y^21 - 17*y^22 + y^23", "-1 - 4*y - 6*y^2 + 50*y^3 + 177*y^4 + 290*y^5 - 347*y^6 - 3017*y^7 - 7187*y^8 - 2376*y^9 + 36980*y^10 + 137208*y^11 + 288768*y^12 + 426976*y^13 + 471372*y^14 + 396624*y^15 + 255475*y^16 + 125468*y^17 + 46486*y^18 + 12750*y^19 + 2507*y^20 + 334*y^21 + 27*y^22 + y^23", "-1 - 4*y - 6*y^2 + 50*y^3 + 177*y^4 + 290*y^5 - 347*y^6 - 3017*y^7 - 7187*y^8 - 2376*y^9 + 36980*y^10 + 137208*y^11 + 288768*y^12 + 426976*y^13 + 471372*y^14 + 396624*y^15 + 255475*y^16 + 125468*y^17 + 46486*y^18 + 12750*y^19 + 2507*y^20 + 334*y^21 + 27*y^22 + y^23", "-289 + 1260*y - 7114*y^2 + 23858*y^3 - 43827*y^4 + 52902*y^5 - 31587*y^6 - 10933*y^7 + 81421*y^8 - 97480*y^9 + 12544*y^10 + 147348*y^11 - 261724*y^12 + 281848*y^13 - 216788*y^14 + 132300*y^15 - 63385*y^16 + 25484*y^17 - 7998*y^18 + 2194*y^19 - 445*y^20 + 82*y^21 - 9*y^22 + y^23", "-1 - 4*y - 30*y^2 + 38*y^3 + 81*y^4 + 226*y^5 + 557*y^6 - 969*y^7 - 4023*y^8 - 1432*y^9 + 8228*y^10 + 11388*y^11 - 840*y^12 - 15344*y^13 - 14956*y^14 - 1760*y^15 + 9543*y^16 + 11364*y^17 + 7274*y^18 + 3058*y^19 + 875*y^20 + 166*y^21 + 19*y^22 + y^23", "-1 - 4*y - 30*y^2 + 38*y^3 + 81*y^4 + 226*y^5 + 557*y^6 - 969*y^7 - 4023*y^8 - 1432*y^9 + 8228*y^10 + 11388*y^11 - 840*y^12 - 15344*y^13 - 14956*y^14 - 1760*y^15 + 9543*y^16 + 11364*y^17 + 7274*y^18 + 3058*y^19 + 875*y^20 + 166*y^21 + 19*y^22 + y^23", "-1 - 4*y - 6*y^2 + 50*y^3 + 177*y^4 + 290*y^5 - 347*y^6 - 3017*y^7 - 7187*y^8 - 2376*y^9 + 36980*y^10 + 137208*y^11 + 288768*y^12 + 426976*y^13 + 471372*y^14 + 396624*y^15 + 255475*y^16 + 125468*y^17 + 46486*y^18 + 12750*y^19 + 2507*y^20 + 334*y^21 + 27*y^22 + y^23" ] }, "GeometricRepresentation":[ 9.54664, [ "J10_16_0", 1, "{18, 19}" ] ] } }