{ "Index":200, "Name":"10_116", "RolfsenName":"10_116", "DTname":"10a_120", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{15, -17, 11, -1, 3, -19, 7, -9, -5, -13}", "Acode":"{8, -9, 6, -1, 2, -10, 4, -5, -3, -7}", "PDcode":[ "{2, 16, 3, 15}", "{4, 17, 5, 18}", "{6, 12, 7, 11}", "{8, 1, 9, 2}", "{10, 4, 11, 3}", "{12, 19, 13, 20}", "{14, 8, 15, 7}", "{16, 9, 17, 10}", "{18, 5, 19, 6}", "{20, 13, 1, 14}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{7, 4, 10}", [], [ "{7, 4, 8, 1}", "{10, -7, 1, 1}", "{1, 8, 2, 1}", "{4, -1, 5, 1}", "{7, -10, 6, 2}", "{4, 6, 3, 2}", "{10, -3, 9, 2}" ], "{5, 8}", "{2}", 2 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 - a*b + 2*a*b*u + b^2*u + a^2*b^2*u + a*b^3*u - 2*a^2*u^3 - 2*a*b*u^3 - 2*a^3*b*u^3 - 3*a^2*b^2*u^3 + b^4*u^3 - a^2*u^5 + a^4*u^5 - 2*a*b*u^5 + a^3*b*u^5 - b^2*u^5 - 3*a^2*b^2*u^5 - 5*a*b^3*u^5 - 2*b^4*u^5 + a^4*u^7 + 4*a^3*b*u^7 + 6*a^2*b^2*u^7 + 4*a*b^3*u^7 + b^4*u^7", "-b^2 + u + b^2*u + a*b^3*u + b^4*u - b^2*u^3 - 2*a^2*b^2*u^3 - 5*a*b^3*u^3 - 3*b^4*u^3 - a^2*u^5 + a^3*b*u^5 + b^2*u^5 + 6*a^2*b^2*u^5 + 9*a*b^3*u^5 + 4*b^4*u^5 - a^2*u^7 - 2*a*b*u^7 - 3*a^3*b*u^7 - b^2*u^7 - 9*a^2*b^2*u^7 - 9*a*b^3*u^7 - 3*b^4*u^7 + a^4*u^9 + 4*a^3*b*u^9 + 6*a^2*b^2*u^9 + 4*a*b^3*u^9 + b^4*u^9", "1 - a - a*u^2 - a^2*u^2 + b*u^2 - 2*a*b*u^2 - 2*a^2*b*u^2 - a^3*b*u^2 - b^2*u^2 + 3*a*b^2*u^2 - 3*a^2*b^2*u^2 - a^3*b^2*u^2 - 3*a*b^3*u^2 + 3*a^2*b^3*u^2 - b^4*u^2 + a^3*b^4*u^2 + a^4*u^4 + 4*a^3*b*u^4 + 6*a^2*b^2*u^4 + 4*a*b^3*u^4 + b^4*u^4", "-b - a*u^2 + b*u^2 - 2*a*b*u^2 - 2*b^2*u^2 - a^2*b^2*u^2 + b^3*u^2 - 2*a*b^3*u^2 - a^2*b^3*u^2 - b^4*u^2 + 2*a*b^4*u^2 + a^2*b^5*u^2 + a^2*u^4 + 2*a*b*u^4 + a^3*b*u^4 + b^2*u^4 + 3*a^2*b^2*u^4 + 3*a*b^3*u^4 + b^4*u^4" ], "TimingForPrimaryIdeals":0.188764 }, "v":{ "CheckEq":[ "-1 - a*b + v - b^2*v - a*b^3*v", "-b^2 - b^4*v", "1 - a + b*v^2 + b^2*v^2 - 2*b^3*v^2 - a*b^3*v^2 - b^4*v^2 - a*b^4*v^2 + b^5*v^2 + a*b^6*v^2", "-b - b^4*v^2 - b^5*v^2 + b^7*v^2" ], "TimingForPrimaryIdeals":9.3774e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_116_0", "Generators":[ "-4040 + 761*b + 15306*u - 29879*u^2 + 41046*u^3 - 56706*u^4 + 53980*u^5 - 27139*u^6 - 9285*u^7 + 10730*u^8 - 11660*u^9 + 12038*u^10 - 17393*u^11 + 4713*u^12 - 2292*u^13 + 828*u^14 - 3043*u^15", "653 + 761*a - 6803*u + 12246*u^2 - 18856*u^3 + 24337*u^4 - 27264*u^5 + 9004*u^6 + 3440*u^7 - 6419*u^8 + 2559*u^9 - 7790*u^10 + 6430*u^11 - 2753*u^12 - 111*u^13 - 1203*u^14 + 1027*u^15", "-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":9.4841e-2, "TimingZeroDimVars":8.164999999999999e-2, "TimingmagmaVCompNormalize":8.3093e-2, "TimingNumberOfSols":0.160033, "TimingIsRadical":9.738e-3, "TimingArcColoring":7.643e-2, "TimingObstruction":3.9942000000000005e-2, "TimingComplexVolumeN":1.0398050000000001e1, "TimingaCuspShapeN":9.7364e-2, "TiminguValues":0.675568, "TiminguPolysN":3.3868e-2, "TiminguPolys":0.86269, "TimingaCuspShape":0.131243, "TimingRepresentationsN":0.150667, "TiminguValues_ij":0.219573, "TiminguPoly_ij":1.774014, "TiminguPolys_ij_N":6.8327e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":16, "IsRadical":true, "ArcColoring":[ [ "(3387 - 8503*u + 17633*u^2 - 22190*u^3 + 32369*u^4 - 26716*u^5 + 18135*u^6 + 5845*u^7 - 4311*u^8 + 9101*u^9 - 4248*u^10 + 10963*u^11 - 1960*u^12 + 2403*u^13 + 375*u^14 + 2016*u^15)\/761", "(4040 - 15306*u + 29879*u^2 - 41046*u^3 + 56706*u^4 - 53980*u^5 + 27139*u^6 + 9285*u^7 - 10730*u^8 + 11660*u^9 - 12038*u^10 + 17393*u^11 - 4713*u^12 + 2292*u^13 - 828*u^14 + 3043*u^15)\/761" ], [ "(1738 - 3136*u + 9753*u^2 - 13275*u^3 + 17533*u^4 - 17006*u^5 + 16237*u^6 + 1491*u^7 - 3904*u^8 + 5536*u^9 - 1162*u^10 + 7687*u^11 - 2104*u^12 + 1744*u^13 + 884*u^14 + 1751*u^15)\/761", "(4284 - 16791*u + 32483*u^2 - 43739*u^3 + 60714*u^4 - 60028*u^5 + 26639*u^6 + 10927*u^7 - 12237*u^8 + 10360*u^9 - 14929*u^10 + 17635*u^11 - 5455*u^12 + 1359*u^13 - 1746*u^14 + 2893*u^15)\/761" ], [ "(6771 - 19330*u + 38777*u^2 - 49808*u^3 + 73172*u^4 - 59009*u^5 + 27980*u^6 + 14745*u^7 - 9667*u^8 + 16434*u^9 - 14589*u^10 + 20033*u^11 - 4229*u^12 + 2837*u^13 - 1503*u^14 + 3067*u^15)\/761", "(5120 - 15766*u + 35267*u^2 - 49585*u^3 + 66749*u^4 - 64432*u^5 + 38312*u^6 + 9891*u^7 - 13508*u^8 + 14988*u^9 - 12521*u^10 + 22344*u^11 - 6101*u^12 + 3402*u^13 - 213*u^14 + 4188*u^15)\/761" ], [ 0, "u" ], [ "(7449 - 23762*u + 48907*u^2 - 66554*u^3 + 92418*u^4 - 87741*u^5 + 46202*u^6 + 15303*u^7 - 17778*u^8 + 18760*u^9 - 19547*u^10 + 28540*u^11 - 8212*u^12 + 3407*u^13 - 1434*u^14 + 5033*u^15)\/761", "(5615 - 19655*u + 41161*u^2 - 58033*u^3 + 77662*u^4 - 77974*u^5 + 39406*u^6 + 11881*u^7 - 16874*u^8 + 14484*u^9 - 17784*u^10 + 24201*u^11 - 7625*u^12 + 2579*u^13 - 1358*u^14 + 4364*u^15)\/761" ], [ "(5698 - 16745*u + 31031*u^2 - 41287*u^3 + 58416*u^4 - 49242*u^5 + 21184*u^6 + 11323*u^7 - 8763*u^8 + 12158*u^9 - 12826*u^10 + 15694*u^11 - 3642*u^12 + 2009*u^13 - 1427*u^14 + 2398*u^15)\/761", "(2722 - 9474*u + 23236*u^2 - 32656*u^3 + 43290*u^4 - 46112*u^5 + 30002*u^6 + 5493*u^7 - 10443*u^8 + 9363*u^9 - 7893*u^10 + 15986*u^11 - 5009*u^12 + 2248*u^13 + 176*u^14 + 3217*u^15)\/761" ], "{1, 0}", [ 1, "u^2" ], [ "(-7851 + 24356*u - 49492*u^2 + 64435*u^3 - 93108*u^4 + 78593*u^5 - 38392*u^6 - 18395*u^7 + 13206*u^8 - 20523*u^9 + 18877*u^10 - 26506*u^11 + 5617*u^12 - 3947*u^13 + 1649*u^14 - 4212*u^15)\/761", "(-7596 + 26319*u - 54181*u^2 + 76825*u^3 - 103790*u^4 + 101365*u^5 - 52887*u^6 - 15525*u^7 + 21365*u^8 - 20921*u^9 + 22346*u^10 - 32260*u^11 + 9813*u^12 - 4002*u^13 + 1382*u^14 - 5897*u^15)\/761" ], [ "(-653 + 6803*u - 12246*u^2 + 18856*u^3 - 24337*u^4 + 27264*u^5 - 9004*u^6 - 3440*u^7 + 6419*u^8 - 2559*u^9 + 7790*u^10 - 6430*u^11 + 2753*u^12 + 111*u^13 + 1203*u^14 - 1027*u^15)\/761", "(4040 - 15306*u + 29879*u^2 - 41046*u^3 + 56706*u^4 - 53980*u^5 + 27139*u^6 + 9285*u^7 - 10730*u^8 + 11660*u^9 - 12038*u^10 + 17393*u^11 - 4713*u^12 + 2292*u^13 - 828*u^14 + 3043*u^15)\/761" ] ], "Obstruction":-1, "ComplexVolumeN":[ "7.97491 + 0.206*I", "7.97491 - 0.206*I", "-2.23601 - 4.9557*I", "-2.23601 + 4.9557*I", "6.88399 - 4.31481*I", "6.88399 + 4.31481*I", -2.54477, "0.24918 + 1.55875*I", "0.24918 - 1.55875*I", "8.92084 + 7.21911*I", "8.92084 - 7.21911*I", "1.82506 + 0.80819*I", "1.82506 - 0.80819*I", 7.98963, "7.3807 + 15.4239*I", "7.3807 - 15.4239*I" ], "uPolysN":[ "-4 - 22*u - 55*u^2 - 66*u^3 + 8*u^4 + 161*u^5 + 272*u^6 + 226*u^7 + 76*u^8 - 18*u^9 + 11*u^10 + 82*u^11 + 104*u^12 + 72*u^13 + 31*u^14 + 8*u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "-16 + 112*u - 443*u^2 + 1205*u^3 - 2431*u^4 + 3722*u^5 - 4241*u^6 + 3329*u^7 - 1321*u^8 - 584*u^9 + 1434*u^10 - 1262*u^11 + 707*u^12 - 273*u^13 + 72*u^14 - 12*u^15 + u^16", "-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16", "-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16", "-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16" ], "uPolys":[ "-4 - 22*u - 55*u^2 - 66*u^3 + 8*u^4 + 161*u^5 + 272*u^6 + 226*u^7 + 76*u^8 - 18*u^9 + 11*u^10 + 82*u^11 + 104*u^12 + 72*u^13 + 31*u^14 + 8*u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "-16 + 112*u - 443*u^2 + 1205*u^3 - 2431*u^4 + 3722*u^5 - 4241*u^6 + 3329*u^7 - 1321*u^8 - 584*u^9 + 1434*u^10 - 1262*u^11 + 707*u^12 - 273*u^13 + 72*u^14 - 12*u^15 + u^16", "-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16", "-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16", "-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16", "1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16" ], "aCuspShape":"2 + (16392 - 54502*u + 112573*u^2 - 154344*u^3 + 210537*u^4 - 199377*u^5 + 119795*u^6 + 31977*u^7 - 40236*u^8 + 50444*u^9 - 37365*u^10 + 71374*u^11 - 17786*u^12 + 12535*u^13 + 456*u^14 + 13489*u^15)\/761", "RepresentationsN":[ [ "u->0.848485 + 0.598766 I", "a->-0.483988 - 0.792063 I", "b->1.3621 + 0.075359 I" ], [ "u->0.848485 - 0.598766 I", "a->-0.483988 + 0.792063 I", "b->1.3621 - 0.075359 I" ], [ "u->0.846121 + 0.652012 I", "a->-0.284195 + 0.129063 I", "b->0.014022 + 0.906951 I" ], [ "u->0.846121 - 0.652012 I", "a->-0.284195 - 0.129063 I", "b->0.014022 - 0.906951 I" ], [ "u->0.664815 + 0.98933 I", "a->1.38574 + 1.59724 I", "b->-1.2279 - 0.015479 I" ], [ "u->0.664815 - 0.98933 I", "a->1.38574 - 1.59724 I", "b->-1.2279 + 0.015479 I" ], [ "u->-1.20069", "a->0.395416", "b->0.206535" ], [ "u->-0.207234 + 0.684921 I", "a->0.548174 - 0.525931 I", "b->0.03486 - 0.480524 I" ], [ "u->-0.207234 - 0.684921 I", "a->0.548174 + 0.525931 I", "b->0.03486 + 0.480524 I" ], [ "u->-0.539685 + 1.17522 I", "a->-1.35188 + 0.225032 I", "b->1.48126 + 0.46974 I" ], [ "u->-0.539685 - 1.17522 I", "a->-1.35188 - 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4241*u^6 + 3329*u^7 - 1321*u^8 - 584*u^9 + 1434*u^10 - 1262*u^11 + 707*u^12 - 273*u^13 + 72*u^14 - 12*u^15 + u^16)*(1 - 2*u + u^2 + 2*u^3 + 22*u^4 + 74*u^5 + 154*u^6 + 232*u^7 + 277*u^8 + 302*u^9 + 305*u^10 + 288*u^11 + 243*u^12 + 180*u^13 + 114*u^14 + 58*u^15 + 23*u^16 + 6*u^17 + u^18)^2", "(1 - u - 2*u^2 + u^3 + u^4 + u^5)*(-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16)*(11 + 48*u + 6*u^2 - 281*u^3 - 447*u^4 + 234*u^5 + 1078*u^6 + 244*u^7 - 1200*u^8 + 25*u^9 + 1809*u^10 - 753*u^11 - 3550*u^12 + 42*u^13 + 3826*u^14 + 586*u^15 - 2838*u^16 - 309*u^17 + 2140*u^18 + 482*u^19 - 1088*u^20 - 518*u^21 + 515*u^22 + 255*u^23 - 232*u^24 - 281*u^25 + 142*u^26 + 61*u^27 - 49*u^28 - 24*u^29 + 29*u^30 - 9*u^31 + 2*u^32 + 3*u^33 - u^35 + u^36)", "(1 + u + 2*u^2 + u^3 + u^4 + u^5)*(-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16)*(-1 + 10*u - 42*u^2 + 89*u^3 - 121*u^4 + 324*u^5 - 1082*u^6 + 1332*u^7 + 2254*u^8 - 9025*u^9 + 8497*u^10 + 5675*u^11 - 18922*u^12 + 13024*u^13 + 6306*u^14 - 16056*u^15 + 6184*u^16 + 8573*u^17 - 9464*u^18 - 1424*u^19 + 7520*u^20 - 3224*u^21 - 1741*u^22 + 1669*u^23 + 88*u^24 + 23*u^25 - 496*u^26 + 395*u^27 - 39*u^28 + 22*u^29 - 21*u^30 + 11*u^31 + 14*u^32 - 3*u^33 + 2*u^34 - u^35 + u^36)", "(1 + 2*u - u^2 - 2*u^3 + u^5)*(1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16)*(-1 + 8*u - 32*u^2 + 63*u^3 - 83*u^4 + 316*u^5 - 540*u^6 - 764*u^7 + 2666*u^8 - 1869*u^9 - 2321*u^10 + 7167*u^11 - 4272*u^12 - 7304*u^13 + 10960*u^14 - 248*u^15 - 9816*u^16 + 6191*u^17 + 4156*u^18 - 4072*u^19 - 1530*u^20 - 1044*u^21 + 2159*u^22 + 2837*u^23 - 2294*u^24 - 1615*u^25 + 1178*u^26 + 311*u^27 - 207*u^28 + 86*u^29 - 81*u^30 - 61*u^31 + 54*u^32 + 13*u^33 - 12*u^34 - u^35 + u^36)", "(1 + u + 2*u^2 + u^3 + u^4 + u^5)*(-1 + 5*u - 12*u^2 + 20*u^3 - 27*u^4 + 32*u^5 - 24*u^6 + 7*u^7 + 6*u^8 - 6*u^9 + 7*u^10 - 8*u^11 + 7*u^12 - 2*u^13 + u^14 - u^15 + u^16)*(-1 + 10*u - 42*u^2 + 89*u^3 - 121*u^4 + 324*u^5 - 1082*u^6 + 1332*u^7 + 2254*u^8 - 9025*u^9 + 8497*u^10 + 5675*u^11 - 18922*u^12 + 13024*u^13 + 6306*u^14 - 16056*u^15 + 6184*u^16 + 8573*u^17 - 9464*u^18 - 1424*u^19 + 7520*u^20 - 3224*u^21 - 1741*u^22 + 1669*u^23 + 88*u^24 + 23*u^25 - 496*u^26 + 395*u^27 - 39*u^28 + 22*u^29 - 21*u^30 + 11*u^31 + 14*u^32 - 3*u^33 + 2*u^34 - u^35 + u^36)", "(1 - u - 2*u^2 + u^3 + u^4 + u^5)*(-1 + 5*u - 4*u^2 - 24*u^3 + 25*u^4 + 36*u^5 - 56*u^6 - 31*u^7 + 68*u^8 + 22*u^9 - 49*u^10 - 12*u^11 + 23*u^12 + 2*u^13 - 5*u^14 - u^15 + u^16)*(11 + 48*u + 6*u^2 - 281*u^3 - 447*u^4 + 234*u^5 + 1078*u^6 + 244*u^7 - 1200*u^8 + 25*u^9 + 1809*u^10 - 753*u^11 - 3550*u^12 + 42*u^13 + 3826*u^14 + 586*u^15 - 2838*u^16 - 309*u^17 + 2140*u^18 + 482*u^19 - 1088*u^20 - 518*u^21 + 515*u^22 + 255*u^23 - 232*u^24 - 281*u^25 + 142*u^26 + 61*u^27 - 49*u^28 - 24*u^29 + 29*u^30 - 9*u^31 + 2*u^32 + 3*u^33 - u^35 + u^36)", "(1 + 2*u - u^2 - 2*u^3 + u^5)*(1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16)*(-1 + 8*u - 32*u^2 + 63*u^3 - 83*u^4 + 316*u^5 - 540*u^6 - 764*u^7 + 2666*u^8 - 1869*u^9 - 2321*u^10 + 7167*u^11 - 4272*u^12 - 7304*u^13 + 10960*u^14 - 248*u^15 - 9816*u^16 + 6191*u^17 + 4156*u^18 - 4072*u^19 - 1530*u^20 - 1044*u^21 + 2159*u^22 + 2837*u^23 - 2294*u^24 - 1615*u^25 + 1178*u^26 + 311*u^27 - 207*u^28 + 86*u^29 - 81*u^30 - 61*u^31 + 54*u^32 + 13*u^33 - 12*u^34 - u^35 + u^36)", "(-1 + 2*u + u^2 - 2*u^3 + u^5)*(1 + 4*u - u^2 + 11*u^3 - 23*u^4 - 14*u^5 + 28*u^6 - 6*u^7 + 12*u^8 + 13*u^9 - 38*u^10 - 6*u^11 + 26*u^12 + u^13 - 8*u^14 + u^16)*(-1 + 8*u - 32*u^2 + 63*u^3 - 83*u^4 + 316*u^5 - 540*u^6 - 764*u^7 + 2666*u^8 - 1869*u^9 - 2321*u^10 + 7167*u^11 - 4272*u^12 - 7304*u^13 + 10960*u^14 - 248*u^15 - 9816*u^16 + 6191*u^17 + 4156*u^18 - 4072*u^19 - 1530*u^20 - 1044*u^21 + 2159*u^22 + 2837*u^23 - 2294*u^24 - 1615*u^25 + 1178*u^26 + 311*u^27 - 207*u^28 + 86*u^29 - 81*u^30 - 61*u^31 + 54*u^32 + 13*u^33 - 12*u^34 - u^35 + u^36)" ], "RileyPolyC":[ "(-1 + 3*y - 3*y^2 + 8*y^3 - y^4 + y^5)*(16 - 44*y + 57*y^2 - 328*y^3 + 732*y^4 - 977*y^5 + 1618*y^6 - 1456*y^7 + 1594*y^8 - 882*y^9 + 641*y^10 - 204*y^11 + 130*y^12 - 26*y^13 + 17*y^14 - 2*y^15 + y^16)*(1 - 14*y + 117*y^2 - 544*y^3 + 1518*y^4 - 2788*y^5 + 3616*y^6 - 3686*y^7 + 3171*y^8 - 2366*y^9 + 1433*y^10 - 854*y^11 + 327*y^12 - 4*y^13 - 44*y^14 + 14*y^15 - 3*y^16 - 2*y^17 + y^18)^2", "(-1 + 6*y - 9*y^2 + 8*y^3 - 4*y^4 + y^5)*(1 - 18*y - 133*y^2 + 93*y^3 + 853*y^4 - 1556*y^5 - 46*y^6 + 2804*y^7 - 3196*y^8 + 697*y^9 + 1742*y^10 - 2174*y^11 + 1320*y^12 - 493*y^13 + 116*y^14 - 16*y^15 + y^16)*(1 + 182*y^2 - 2633*y^3 + 8525*y^4 - 50030*y^5 + 609802*y^6 - 2431172*y^7 + 3180476*y^8 + 3045075*y^9 - 12789975*y^10 + 5844209*y^11 + 26554680*y^12 - 57023566*y^13 + 63738082*y^14 - 79608900*y^15 + 143521438*y^16 - 218284309*y^17 + 223566636*y^18 - 145056398*y^19 + 52261140*y^20 - 8618366*y^21 + 11242203*y^22 - 22137773*y^23 + 20237880*y^24 - 10195795*y^25 + 2210478*y^26 + 708313*y^27 - 776987*y^28 + 298342*y^29 - 49479*y^30 - 6759*y^31 + 6204*y^32 - 1749*y^33 + 278*y^34 - 25*y^35 + y^36)", "(-1 - 2*y - 31*y^2 + 3*y^3 + 5*y^4 + y^5)*(256 + 1632*y + 4121*y^2 + 3825*y^3 - 6157*y^4 - 1098*y^5 + 24687*y^6 - 28465*y^7 + 23813*y^8 - 13880*y^9 + 5842*y^10 - 2642*y^11 + 635*y^12 - 141*y^13 + 46*y^14 + y^16)*(1 - 2*y + 53*y^2 + 644*y^3 + 1978*y^4 + 2744*y^5 + 2608*y^6 + 498*y^7 - 1605*y^8 - 2806*y^9 - 2307*y^10 - 950*y^11 + 143*y^12 + 556*y^13 + 448*y^14 + 206*y^15 + 61*y^16 + 10*y^17 + y^18)^2", "(-1 + 5*y - 8*y^2 + 3*y^3 + y^4 + y^5)*(1 - 17*y + 206*y^2 - 1024*y^3 + 2975*y^4 - 6250*y^5 + 10290*y^6 - 13381*y^7 + 13634*y^8 - 10918*y^9 + 6863*y^10 - 3340*y^11 + 1247*y^12 - 356*y^13 + 75*y^14 - 11*y^15 + y^16)*(121 - 2172*y + 17178*y^2 - 83073*y^3 + 294429*y^4 - 858362*y^5 + 2150638*y^6 - 4661328*y^7 + 8804932*y^8 - 14696641*y^9 + 22103229*y^10 - 30449767*y^11 + 38487328*y^12 - 44300586*y^13 + 45891158*y^14 - 42231844*y^15 + 34549502*y^16 - 25682913*y^17 + 17510204*y^18 - 11338014*y^19 + 7182948*y^20 - 4261542*y^21 + 2467463*y^22 - 1324341*y^23 + 633024*y^24 - 286483*y^25 + 96430*y^26 - 29579*y^27 + 2837*y^28 + 1474*y^29 - 1179*y^30 + 585*y^31 - 88*y^32 + 31*y^33 + 10*y^34 - y^35 + y^36)", "(-1 - 3*y - 4*y^2 - y^3 + y^4 + y^5)*(1 - y - 2*y^2 - 24*y^3 - 57*y^4 - 106*y^5 - 58*y^6 - 161*y^7 - 18*y^8 - 86*y^9 + 27*y^10 - 12*y^11 + 31*y^12 + 8*y^13 + 11*y^14 + y^15 + y^16)*(1 - 16*y + 226*y^2 - 2073*y^3 + 16709*y^4 - 106058*y^5 + 579166*y^6 - 2553748*y^7 + 9098108*y^8 - 25096765*y^9 + 49180445*y^10 - 64439699*y^11 + 52881616*y^12 - 19136618*y^13 - 14689578*y^14 + 28360284*y^15 - 15025314*y^16 - 11815805*y^17 + 32940164*y^18 - 42645646*y^19 + 38122944*y^20 - 27537582*y^21 + 16994847*y^22 - 8616701*y^23 + 3980224*y^24 - 1621511*y^25 + 485270*y^26 - 218551*y^27 + 18573*y^28 - 21078*y^29 - 527*y^30 - 935*y^31 + 144*y^32 + 27*y^33 + 26*y^34 + 3*y^35 + y^36)", "(-1 + 6*y - 9*y^2 + 8*y^3 - 4*y^4 + y^5)*(1 - 18*y - 133*y^2 + 93*y^3 + 853*y^4 - 1556*y^5 - 46*y^6 + 2804*y^7 - 3196*y^8 + 697*y^9 + 1742*y^10 - 2174*y^11 + 1320*y^12 - 493*y^13 + 116*y^14 - 16*y^15 + y^16)*(1 + 182*y^2 - 2633*y^3 + 8525*y^4 - 50030*y^5 + 609802*y^6 - 2431172*y^7 + 3180476*y^8 + 3045075*y^9 - 12789975*y^10 + 5844209*y^11 + 26554680*y^12 - 57023566*y^13 + 63738082*y^14 - 79608900*y^15 + 143521438*y^16 - 218284309*y^17 + 223566636*y^18 - 145056398*y^19 + 52261140*y^20 - 8618366*y^21 + 11242203*y^22 - 22137773*y^23 + 20237880*y^24 - 10195795*y^25 + 2210478*y^26 + 708313*y^27 - 776987*y^28 + 298342*y^29 - 49479*y^30 - 6759*y^31 + 6204*y^32 - 1749*y^33 + 278*y^34 - 25*y^35 + y^36)", "(-1 - 3*y - 4*y^2 - y^3 + y^4 + y^5)*(1 - y - 2*y^2 - 24*y^3 - 57*y^4 - 106*y^5 - 58*y^6 - 161*y^7 - 18*y^8 - 86*y^9 + 27*y^10 - 12*y^11 + 31*y^12 + 8*y^13 + 11*y^14 + y^15 + y^16)*(1 - 16*y + 226*y^2 - 2073*y^3 + 16709*y^4 - 106058*y^5 + 579166*y^6 - 2553748*y^7 + 9098108*y^8 - 25096765*y^9 + 49180445*y^10 - 64439699*y^11 + 52881616*y^12 - 19136618*y^13 - 14689578*y^14 + 28360284*y^15 - 15025314*y^16 - 11815805*y^17 + 32940164*y^18 - 42645646*y^19 + 38122944*y^20 - 27537582*y^21 + 16994847*y^22 - 8616701*y^23 + 3980224*y^24 - 1621511*y^25 + 485270*y^26 - 218551*y^27 + 18573*y^28 - 21078*y^29 - 527*y^30 - 935*y^31 + 144*y^32 + 27*y^33 + 26*y^34 + 3*y^35 + y^36)", "(-1 + 5*y - 8*y^2 + 3*y^3 + y^4 + y^5)*(1 - 17*y + 206*y^2 - 1024*y^3 + 2975*y^4 - 6250*y^5 + 10290*y^6 - 13381*y^7 + 13634*y^8 - 10918*y^9 + 6863*y^10 - 3340*y^11 + 1247*y^12 - 356*y^13 + 75*y^14 - 11*y^15 + y^16)*(121 - 2172*y + 17178*y^2 - 83073*y^3 + 294429*y^4 - 858362*y^5 + 2150638*y^6 - 4661328*y^7 + 8804932*y^8 - 14696641*y^9 + 22103229*y^10 - 30449767*y^11 + 38487328*y^12 - 44300586*y^13 + 45891158*y^14 - 42231844*y^15 + 34549502*y^16 - 25682913*y^17 + 17510204*y^18 - 11338014*y^19 + 7182948*y^20 - 4261542*y^21 + 2467463*y^22 - 1324341*y^23 + 633024*y^24 - 286483*y^25 + 96430*y^26 - 29579*y^27 + 2837*y^28 + 1474*y^29 - 1179*y^30 + 585*y^31 - 88*y^32 + 31*y^33 + 10*y^34 - y^35 + y^36)", "(-1 + 6*y - 9*y^2 + 8*y^3 - 4*y^4 + y^5)*(1 - 18*y - 133*y^2 + 93*y^3 + 853*y^4 - 1556*y^5 - 46*y^6 + 2804*y^7 - 3196*y^8 + 697*y^9 + 1742*y^10 - 2174*y^11 + 1320*y^12 - 493*y^13 + 116*y^14 - 16*y^15 + y^16)*(1 + 182*y^2 - 2633*y^3 + 8525*y^4 - 50030*y^5 + 609802*y^6 - 2431172*y^7 + 3180476*y^8 + 3045075*y^9 - 12789975*y^10 + 5844209*y^11 + 26554680*y^12 - 57023566*y^13 + 63738082*y^14 - 79608900*y^15 + 143521438*y^16 - 218284309*y^17 + 223566636*y^18 - 145056398*y^19 + 52261140*y^20 - 8618366*y^21 + 11242203*y^22 - 22137773*y^23 + 20237880*y^24 - 10195795*y^25 + 2210478*y^26 + 708313*y^27 - 776987*y^28 + 298342*y^29 - 49479*y^30 - 6759*y^31 + 6204*y^32 - 1749*y^33 + 278*y^34 - 25*y^35 + y^36)", "(-1 + 6*y - 9*y^2 + 8*y^3 - 4*y^4 + y^5)*(1 - 18*y - 133*y^2 + 93*y^3 + 853*y^4 - 1556*y^5 - 46*y^6 + 2804*y^7 - 3196*y^8 + 697*y^9 + 1742*y^10 - 2174*y^11 + 1320*y^12 - 493*y^13 + 116*y^14 - 16*y^15 + y^16)*(1 + 182*y^2 - 2633*y^3 + 8525*y^4 - 50030*y^5 + 609802*y^6 - 2431172*y^7 + 3180476*y^8 + 3045075*y^9 - 12789975*y^10 + 5844209*y^11 + 26554680*y^12 - 57023566*y^13 + 63738082*y^14 - 79608900*y^15 + 143521438*y^16 - 218284309*y^17 + 223566636*y^18 - 145056398*y^19 + 52261140*y^20 - 8618366*y^21 + 11242203*y^22 - 22137773*y^23 + 20237880*y^24 - 10195795*y^25 + 2210478*y^26 + 708313*y^27 - 776987*y^28 + 298342*y^29 - 49479*y^30 - 6759*y^31 + 6204*y^32 - 1749*y^33 + 278*y^34 - 25*y^35 + y^36)" ] }, "GeometricRepresentation":[ 1.54239e1, [ "J10_116_0", 1, "{15, 16}" ] ] } }