{ "Index":80, "Name":"9_45", "RolfsenName":"9_45", "DTname":"9n_2", "TunnelNumber":1, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-9, -16, 18, -12, -1, -6, -10, -4, 14}", "Acode":"{-6, -9, 1, -7, -1, -4, -6, -3, 8}", "PDcode":[ "{2, 9, 3, 10}", "{3, 16, 4, 17}", "{5, 1, 6, 18}", "{7, 12, 8, 13}", "{8, 1, 9, 2}", "{11, 6, 12, 7}", "{13, 10, 14, 11}", "{15, 4, 16, 5}", "{17, 15, 18, 14}" ], "CBtype":"{2, 1}", "ParabolicReps":{ "SolvingSeq":[ "{6, 4, 1}", [], [ "{6, -4, 7, 1}", "{7, -6, 8, 1}", "{4, 1, 3, 2}", "{6, -1, 5, 2}", "{1, 8, 9, 2}", "{3, -9, 2, 2}" ], "{4, 8}", "{1}", 1 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-1 - a*b + u", "-b^2 + u - u^3", "1 - a - b - u^2 - a*u^2 - a^2*u^2 + 2*b*u^2 - a^3*b*u^2 + a*u^4 + a^2*u^4 - a^4*u^4 - b*u^4 + a^3*b*u^4", "-b - 2*u^2 + b*u^2 - 2*a*b*u^2 - a^2*b^2*u^2 + u^4 + a*u^4 - a^2*u^4 - b*u^4 + 2*a*b*u^4 - a^3*b*u^4 + a^2*b^2*u^4" ], "TimingForPrimaryIdeals":9.0886e-2 }, "v":{ "CheckEq":[ "-b^2", "-1 - a*b + v", "1 - 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21*u^2 + 8*u^3 + 8*u^4 - 13*u^5 - 32*u^6 + 8*u^7 + 27*u^8 + 15*u^9 - 7*u^10 - 8*u^11 - 3*u^12)\/2", "1 - 4*u^2 + u^3 + u^4 - 4*u^5 - 3*u^6 + 4*u^7 + 5*u^8 - 2*u^10 - u^11" ], [ "(-9 - 3*u + 29*u^2 - 10*u^3 - 10*u^4 + 21*u^5 + 38*u^6 - 16*u^7 - 37*u^8 - 15*u^9 + 11*u^10 + 10*u^11 + 3*u^12)\/2", "-1 + 4*u^2 - u^3 - u^4 + 4*u^5 + 3*u^6 - 4*u^7 - 5*u^8 + 2*u^10 + u^11" ], [ "(1 - 5*u + 7*u^2 - 2*u^3 - u^5 + 8*u^6 - 5*u^8 - 5*u^9 + u^10 + 2*u^11 + u^12)\/2", "u^2" ], [ 0, "u" ], [ "u", "u - u^3" ], "{1, 0}", [ 1, "-u^2" ], [ "1 - u^2", "-u^2" ], [ "(11 + 7*u - 33*u^2 + 16*u^4 - 9*u^5 - 56*u^6 + 45*u^8 + 35*u^9 - 9*u^10 - 16*u^11 - 7*u^12)\/2", "(1 + u - 5*u^2 - 2*u^3 + u^5 - 6*u^6 + 5*u^8 + 5*u^9 - u^10 - 2*u^11 - u^12)\/2" ] ], "Obstruction":-1, "ComplexVolumeN":[ "0.965349 + 0.999086*I", "0.965349 - 0.999086*I", "-1.60812 + 2.52293*I", "-1.60812 - 2.52293*I", "-4.36446 - 3.30324*I", "-4.36446 + 3.30324*I", 1.00303, "-8.78028 + 1.38297*I", "-8.78028 - 1.38297*I", "-7.87584 - 8.60203*I", "-7.87584 + 8.60203*I", "0.60016 - 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95*u^6 - 52*u^7 + 31*u^8 + 77*u^9 + 64*u^10 + 30*u^11 + 8*u^12 + u^13" ], "uPolys":[ "-4 + 4*u - 9*u^2 + 8*u^3 + 5*u^4 - u^5 + 21*u^6 + 20*u^7 + 18*u^8 + 22*u^9 + 7*u^10 + 8*u^11 + u^12 + u^13", "-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13", "-1 + 3*u - 2*u^2 - 12*u^3 + 33*u^4 + 36*u^5 - 31*u^6 - 22*u^7 - 9*u^8 + 15*u^9 + 10*u^10 - 6*u^11 - 2*u^12 + u^13", "-1 - 2*u + 2*u^2 + 5*u^3 - 2*u^4 - u^5 + 7*u^6 + 8*u^7 - 5*u^8 - 10*u^9 - 4*u^10 + 3*u^11 + 3*u^12 + u^13", "-4 + 4*u - 9*u^2 + 8*u^3 + 5*u^4 - u^5 + 21*u^6 + 20*u^7 + 18*u^8 + 22*u^9 + 7*u^10 + 8*u^11 + u^12 + u^13", "-1 - 2*u + 2*u^2 + 5*u^3 - 2*u^4 - u^5 + 7*u^6 + 8*u^7 - 5*u^8 - 10*u^9 - 4*u^10 + 3*u^11 + 3*u^12 + u^13", "-1 + 8*u - 28*u^2 + 51*u^3 - 84*u^4 + 161*u^5 - 175*u^6 + 152*u^7 - 113*u^8 + 64*u^9 - 30*u^10 + 13*u^11 - 3*u^12 + u^13", "-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13", "-1 + 5*u + 30*u^2 + 50*u^3 + 17*u^4 - 56*u^5 - 95*u^6 - 52*u^7 + 31*u^8 + 77*u^9 + 64*u^10 + 30*u^11 + 8*u^12 + u^13" ], "aCuspShape":"9 + 8*u - 15*u^2 + 5*u^3 + 13*u^4 + 4*u^5 - 26*u^6 - 10*u^7 + 9*u^8 + 14*u^9 + u^10 - 3*u^11 - 2*u^12", "RepresentationsN":[ [ "u->1.13973 + 0.20182 I", "a->0.10711 - 0.295303 I", "b->-0.452299 + 0.637242 I" ], [ "u->1.13973 - 0.20182 I", "a->0.10711 + 0.295303 I", "b->-0.452299 - 0.637242 I" ], [ "u->0.431606 + 0.658497 I", "a->-0.349504 + 0.760906 I", "b->0.997974 + 0.2886 I" ], [ "u->0.431606 - 0.658497 I", "a->-0.349504 - 0.760906 I", "b->0.997974 - 0.2886 I" ], [ "u->-0.946506 + 0.889214 I", "a->0.759526 + 1.12823 I", "b->-0.25689 + 1.55234 I" ], [ "u->-0.946506 - 0.889214 I", "a->0.759526 - 1.12823 I", "b->-0.25689 - 1.55234 I" ], [ "u->0.650994", "a->0.569843", "b->-0.61246" ], [ "u->-0.831561 + 1.07051 I", "a->-0.593619 - 1.04489 I", "b->-0.02169 - 1.76519 I" ], [ "u->-0.831561 - 1.07051 I", "a->-0.593619 + 1.04489 I", "b->-0.02169 + 1.76519 I" ], [ "u->-1.1081 + 0.91291 I", "a->-0.85406 - 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1352*u^8 + 136*u^9 + 396*u^10 + 135*u^11 + 19*u^12 + u^13", "-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13", "1 + 85*u + 366*u^2 + 730*u^3 + 647*u^4 + 204*u^5 + 79*u^6 + 324*u^7 + 341*u^8 + 249*u^9 + 76*u^10 + 30*u^11 + 4*u^12 + u^13", "-1 + 3*u - 2*u^2 - 12*u^3 + 33*u^4 + 36*u^5 - 31*u^6 - 22*u^7 - 9*u^8 + 15*u^9 + 10*u^10 - 6*u^11 - 2*u^12 + u^13", "-5231 + 13885*u - 22084*u^2 + 26636*u^3 - 10357*u^4 + 22154*u^5 - 14059*u^6 + 1302*u^7 - 9189*u^8 + 5755*u^9 + 184*u^10 - 134*u^11 - 2*u^12 + u^13", "-1 + 5*u + 30*u^2 + 50*u^3 + 17*u^4 - 56*u^5 - 95*u^6 - 52*u^7 + 31*u^8 + 77*u^9 + 64*u^10 + 30*u^11 + 8*u^12 + u^13", "-1588 + 6004*u - 3089*u^2 - 5394*u^3 + 5827*u^4 + 731*u^5 + 2091*u^6 - 1722*u^7 - 2982*u^8 + 1430*u^9 + 51*u^10 + 84*u^11 + 3*u^12 + u^13", "-79 + 407*u - 846*u^2 + 1664*u^3 - 2545*u^4 + 2474*u^5 - 2301*u^6 + 1344*u^7 - 47*u^8 + 697*u^9 + 126*u^10 + 42*u^11 + 4*u^12 + u^13" ], "GeometricComponent":"{10, 11}", "uPolys_ij_N":[ "-1 - 2*u + 2*u^2 + 5*u^3 - 2*u^4 - u^5 + 7*u^6 + 8*u^7 - 5*u^8 - 10*u^9 - 4*u^10 + 3*u^11 + 3*u^12 + u^13", "-1 + 8*u - 28*u^2 + 51*u^3 - 84*u^4 + 161*u^5 - 175*u^6 + 152*u^7 - 113*u^8 + 64*u^9 - 30*u^10 + 13*u^11 - 3*u^12 + u^13", "-1 + 8*u - 136*u^2 + 123*u^3 + 1772*u^4 + 6661*u^5 + 4385*u^6 + 296*u^7 - 29*u^8 + 540*u^9 + 390*u^10 + 117*u^11 + 17*u^12 + u^13", "-7373 + 46988*u - 46122*u^2 - 18845*u^3 + 40374*u^4 + 9365*u^5 - 35313*u^6 + 22902*u^7 - 8433*u^8 + 2660*u^9 - 504*u^10 + 97*u^11 - 9*u^12 + u^13", "-16 - 56*u + 23*u^2 + 314*u^3 + 641*u^4 + 667*u^5 - 111*u^6 - 316*u^7 + 252*u^8 + 508*u^9 + 307*u^10 + 94*u^11 + 15*u^12 + u^13", "-1201 + 666*u + 9162*u^2 - 9743*u^3 - 14982*u^4 + 36335*u^5 - 31597*u^6 + 15750*u^7 - 5153*u^8 + 1380*u^9 - 230*u^10 + 47*u^11 - 7*u^12 + u^13", "-4 + 4*u - 9*u^2 + 8*u^3 + 5*u^4 - u^5 + 21*u^6 + 20*u^7 + 18*u^8 + 22*u^9 + 7*u^10 + 8*u^11 + u^12 + u^13", "-9292 + 25012*u - 25003*u^2 + 91126*u^3 - 112585*u^4 + 115607*u^5 - 110067*u^6 + 71034*u^7 - 1300*u^8 + 2900*u^9 + 193*u^10 + 82*u^11 + 3*u^12 + u^13", "-7097 + 1359*u - 7356*u^2 + 58354*u^3 - 47935*u^4 + 26560*u^5 - 16845*u^6 + 15354*u^7 - 2725*u^8 - 1205*u^9 + 364*u^10 + 12*u^11 - 12*u^12 + u^13", "61 + 2435*u + 8960*u^2 + 16432*u^3 + 15813*u^4 + 10530*u^5 + 1513*u^6 + 128*u^7 - 693*u^8 + 175*u^9 + 40*u^10 - 4*u^11 - 4*u^12 + u^13", "-1 - 5*u - 4*u^2 + 34*u^3 - 71*u^4 + 54*u^5 + 153*u^6 - 54*u^7 - 127*u^8 + 61*u^9 + 28*u^10 - 14*u^11 - 2*u^12 + u^13", "1 + 5*u + 10*u^2 + 430*u^3 + 2227*u^4 + 3944*u^5 + 2311*u^6 + 488*u^7 + 445*u^8 + 617*u^9 + 360*u^10 + 106*u^11 + 16*u^12 + u^13", "-2048 + 6144*u - 7680*u^2 + 8960*u^3 - 3840*u^4 - 2176*u^5 + 3328*u^6 - 576*u^7 - 1352*u^8 + 136*u^9 + 396*u^10 + 135*u^11 + 19*u^12 + u^13", "-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13", "1 + 85*u + 366*u^2 + 730*u^3 + 647*u^4 + 204*u^5 + 79*u^6 + 324*u^7 + 341*u^8 + 249*u^9 + 76*u^10 + 30*u^11 + 4*u^12 + u^13", "-1 + 3*u - 2*u^2 - 12*u^3 + 33*u^4 + 36*u^5 - 31*u^6 - 22*u^7 - 9*u^8 + 15*u^9 + 10*u^10 - 6*u^11 - 2*u^12 + u^13", "-5231 + 13885*u - 22084*u^2 + 26636*u^3 - 10357*u^4 + 22154*u^5 - 14059*u^6 + 1302*u^7 - 9189*u^8 + 5755*u^9 + 184*u^10 - 134*u^11 - 2*u^12 + u^13", "-1 + 5*u + 30*u^2 + 50*u^3 + 17*u^4 - 56*u^5 - 95*u^6 - 52*u^7 + 31*u^8 + 77*u^9 + 64*u^10 + 30*u^11 + 8*u^12 + u^13", "-1588 + 6004*u - 3089*u^2 - 5394*u^3 + 5827*u^4 + 731*u^5 + 2091*u^6 - 1722*u^7 - 2982*u^8 + 1430*u^9 + 51*u^10 + 84*u^11 + 3*u^12 + u^13", "-79 + 407*u - 846*u^2 + 1664*u^3 - 2545*u^4 + 2474*u^5 - 2301*u^6 + 1344*u^7 - 47*u^8 + 697*u^9 + 126*u^10 + 42*u^11 + 4*u^12 + u^13" ], "Multiplicity":1, "ij_list":[ [ "{4, 6}", "{4, 7}", "{5, 7}" ], [ "{3, 6}", "{4, 5}", "{6, 7}", "{6, 8}" ], [ "{7, 8}" ], [ "{3, 5}" ], [ "{1, 2}", "{4, 8}", "{5, 6}" ], [ "{5, 8}" ], [ "{1, 5}", "{1, 6}", "{2, 6}" ], [ "{2, 5}" ], [ "{2, 7}" ], [ "{2, 4}" ], [ "{6, 9}" ], [ "{3, 4}" ], [ "{3, 7}" ], [ "{2, 9}", "{3, 8}", "{3, 9}" ], [ "{1, 9}" ], [ "{1, 3}", "{1, 4}", "{1, 7}", "{2, 8}" ], [ "{5, 9}" ], [ "{1, 8}", "{2, 3}", "{8, 9}" ], [ "{7, 9}" ], [ "{4, 9}" ] ], "SortedReprnIndices":"{11, 10, 6, 5, 3, 4, 13, 12, 8, 9, 1, 2, 7}", "aCuspShapeN":[ "3.5436164132214422593`5.144736903801377 + 0.5819119857558727747`4.360147501765804*I", "3.5436164132214422593`5.144736903801377 - 0.5819119857558727747`4.360147501765804*I", "1.6457205516441687833`4.696106569732475 - 4.3870698002042573089`5.121925021395591*I", "1.6457205516441687833`4.696106569732475 + 4.3870698002042573089`5.121925021395591*I", "4.8361014426365865348`5.102771040810663 + 2.3982068791774619749`4.798162283118853*I", "4.8361014426365865348`5.102771040810663 - 2.3982068791774619749`4.798162283118853*I", 1.0118e1, "1.0657513426460384366`5.069586807717771 - 0.7162225581291006882`4.896978914689216*I", "1.0657513426460384366`5.069586807717771 + 0.7162225581291006882`4.896978914689216*I", "2.4145832518062617924`4.766232950785627 + 5.3279735712426599942`5.109952828764577*I", "2.4145832518062617924`4.766232950785627 - 5.3279735712426599942`5.109952828764577*I", "1.4351255730660175128`4.660270599277732 + 4.198982293105347351`5.1265247391495965*I", "1.4351255730660175128`4.660270599277732 - 4.198982293105347351`5.1265247391495965*I" ], "Abelian":false }, { "IdealName":"J9_45_1", "Generators":[ "b", "1 - a + a^2", "-1 + u" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.6405e-2, "TimingZeroDimVars":5.4157000000000004e-2, "TimingmagmaVCompNormalize":5.536e-2, "TimingNumberOfSols":2.0503999999999998e-2, "TimingIsRadical":1.438e-3, "TimingArcColoring":4.5474e-2, "TimingObstruction":9.220000000000001e-4, "TimingComplexVolumeN":2.088129, "TimingaCuspShapeN":8.874e-3, "TiminguValues":0.574481, "TiminguPolysN":2.55e-4, "TiminguPolys":0.734902, "TimingaCuspShape":9.697800000000001e-2, "TimingRepresentationsN":2.4912999999999998e-2, "TiminguValues_ij":0.106091, "TiminguPolys_ij_N":2.4300000000000002e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ "a", 0 ], [ "a", 0 ], [ "-1 + a", 1 ], "{0, 1}", "{1, 0}", "{1, 0}", "{1, -1}", "{0, -1}", [ "a", "-a" ] ], "Obstruction":1, "ComplexVolumeN":[ "1.64493 - 2.02988*I", "1.64493 + 2.02988*I" ], "uPolysN":[ "u^2", "1 - u + u^2", "1 + u + u^2", "1 + 2*u + u^2", "u^2", "1 - 2*u + u^2", "1 - 2*u + u^2", "1 + u + u^2", "1 + u + u^2" ], "uPolys":[ "u^2", "1 - u + u^2", "1 + u + u^2", "(1 + u)^2", "u^2", "(-1 + u)^2", "(-1 + u)^2", "1 + u + u^2", "1 + u + u^2" ], "aCuspShape":"5 + 2*(1 + 2*a)", "RepresentationsN":[ [ "u->1.", "a->0.5 + 0.866025 I", "b->0" ], [ "u->1.", "a->0.5 - 0.866025 I", "b->0" ] ], "Epsilon":1.73205, "uPolys_ij_N":[ "1 + 2*u + u^2", "u^2", "1 - u + u^2", "1 + u + u^2", "1 + u + u^2", "1 - u + u^2" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{1, 2}", 2.02988 ], "ij_list":[ [ "{3, 5}", "{3, 6}", "{4, 5}", "{4, 6}", "{4, 7}", "{5, 7}", "{5, 8}", "{6, 7}", "{6, 8}", "{7, 8}" ], [ "{1, 2}", "{1, 5}", "{1, 6}", "{2, 5}", "{2, 6}", "{4, 8}", "{5, 6}", "{7, 9}" ], [ "{1, 9}", "{2, 9}", "{3, 8}", "{3, 9}" ], [ "{3, 4}" ], [ "{1, 7}", "{1, 8}", "{2, 7}", "{2, 8}", "{3, 7}", "{4, 9}", "{5, 9}", "{6, 9}" ], [ "{1, 3}", "{1, 4}", "{2, 3}", "{2, 4}", "{8, 9}" ] ], "SortedReprnIndices":"{2, 1}", "aCuspShapeN":[ "9.`5.120516032994348 + 3.464101615137754587`4.705864146578835*I", "9.`5.120516032994348 - 3.464101615137754587`4.705864146578835*I" ], "Abelian":false }, { "IdealName":"abJ9_45_2", "Generators":[ "b", "-1 + a", "-1 + v" ], "VariableOrder":[ "b", "a", "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":4.2223e-2, "TimingZeroDimVars":5.59e-2, "TimingmagmaVCompNormalize":5.7153e-2, "TimingNumberOfSols":2.1589e-2, "TimingIsRadical":1.544e-3, "TimingArcColoring":4.3236e-2, "TimingObstruction":3.8e-4, "TimingComplexVolumeN":0.374599, "TimingaCuspShapeN":4.982e-3, "TiminguValues":0.571225, "TiminguPolysN":7.000000000000002e-5, "TiminguPolys":0.718244, "TimingaCuspShape":9.015000000000001e-2, "TimingRepresentationsN":2.2698e-2, "TiminguValues_ij":0.106287, "TiminguPoly_ij":0.119496, "TiminguPolys_ij_N":3.000000000000001e-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}" ], "Obstruction":1, "ComplexVolumeN":"{0}", "uPolysN":[ "u", "u", "u", "u", "u", "u", "u", "u", "u" ], "uPolys":[ "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}", "{2, 3}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 7}", "{2, 8}", "{2, 9}", "{3, 4}", "{3, 5}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{4, 5}", "{4, 6}", "{4, 7}", "{4, 8}", "{4, 9}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{6, 7}", "{6, 8}", "{6, 9}", "{7, 8}", "{7, 9}", "{8, 9}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":"{0}", "Abelian":true } ] }, "uPolyC":[ "u^2*(-4 + 4*u - 9*u^2 + 8*u^3 + 5*u^4 - u^5 + 21*u^6 + 20*u^7 + 18*u^8 + 22*u^9 + 7*u^10 + 8*u^11 + u^12 + u^13)", "(1 - u + u^2)*(-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13)", "(1 + u + u^2)*(-1 + 3*u - 2*u^2 - 12*u^3 + 33*u^4 + 36*u^5 - 31*u^6 - 22*u^7 - 9*u^8 + 15*u^9 + 10*u^10 - 6*u^11 - 2*u^12 + u^13)", "(1 + u)^2*(-1 - 2*u + 2*u^2 + 5*u^3 - 2*u^4 - u^5 + 7*u^6 + 8*u^7 - 5*u^8 - 10*u^9 - 4*u^10 + 3*u^11 + 3*u^12 + u^13)", "u^2*(-4 + 4*u - 9*u^2 + 8*u^3 + 5*u^4 - u^5 + 21*u^6 + 20*u^7 + 18*u^8 + 22*u^9 + 7*u^10 + 8*u^11 + u^12 + u^13)", "(-1 + u)^2*(-1 - 2*u + 2*u^2 + 5*u^3 - 2*u^4 - u^5 + 7*u^6 + 8*u^7 - 5*u^8 - 10*u^9 - 4*u^10 + 3*u^11 + 3*u^12 + u^13)", "(-1 + u)^2*(-1 + 8*u - 28*u^2 + 51*u^3 - 84*u^4 + 161*u^5 - 175*u^6 + 152*u^7 - 113*u^8 + 64*u^9 - 30*u^10 + 13*u^11 - 3*u^12 + u^13)", "(1 + u + u^2)*(-1 + u + 2*u^2 + 6*u^3 + 11*u^4 + 12*u^5 + 17*u^6 + 16*u^7 + 15*u^8 + 13*u^9 + 8*u^10 + 6*u^11 + 2*u^12 + u^13)", "(1 + u + u^2)*(-1 + 5*u + 30*u^2 + 50*u^3 + 17*u^4 - 56*u^5 - 95*u^6 - 52*u^7 + 31*u^8 + 77*u^9 + 64*u^10 + 30*u^11 + 8*u^12 + u^13)" ], "RileyPolyC":[ "y^2*(-16 - 56*y + 23*y^2 + 314*y^3 + 641*y^4 + 667*y^5 - 111*y^6 - 316*y^7 + 252*y^8 + 508*y^9 + 307*y^10 + 94*y^11 + 15*y^12 + y^13)", "(1 + y + y^2)*(-1 + 5*y + 30*y^2 + 50*y^3 + 17*y^4 - 56*y^5 - 95*y^6 - 52*y^7 + 31*y^8 + 77*y^9 + 64*y^10 + 30*y^11 + 8*y^12 + y^13)", "(1 + y + y^2)*(-1 + 5*y - 10*y^2 + 430*y^3 - 2227*y^4 + 3944*y^5 - 2311*y^6 + 488*y^7 - 445*y^8 + 617*y^9 - 360*y^10 + 106*y^11 - 16*y^12 + y^13)", "(-1 + y)^2*(-1 + 8*y - 28*y^2 + 51*y^3 - 84*y^4 + 161*y^5 - 175*y^6 + 152*y^7 - 113*y^8 + 64*y^9 - 30*y^10 + 13*y^11 - 3*y^12 + y^13)", "y^2*(-16 - 56*y + 23*y^2 + 314*y^3 + 641*y^4 + 667*y^5 - 111*y^6 - 316*y^7 + 252*y^8 + 508*y^9 + 307*y^10 + 94*y^11 + 15*y^12 + y^13)", "(-1 + y)^2*(-1 + 8*y - 28*y^2 + 51*y^3 - 84*y^4 + 161*y^5 - 175*y^6 + 152*y^7 - 113*y^8 + 64*y^9 - 30*y^10 + 13*y^11 - 3*y^12 + y^13)", "(-1 + y)^2*(-1 + 8*y - 136*y^2 + 123*y^3 + 1772*y^4 + 6661*y^5 + 4385*y^6 + 296*y^7 - 29*y^8 + 540*y^9 + 390*y^10 + 117*y^11 + 17*y^12 + y^13)", "(1 + y + y^2)*(-1 + 5*y + 30*y^2 + 50*y^3 + 17*y^4 - 56*y^5 - 95*y^6 - 52*y^7 + 31*y^8 + 77*y^9 + 64*y^10 + 30*y^11 + 8*y^12 + y^13)", "(1 + y + y^2)*(-1 + 85*y - 366*y^2 + 730*y^3 - 647*y^4 + 204*y^5 - 79*y^6 + 324*y^7 - 341*y^8 + 249*y^9 - 76*y^10 + 30*y^11 - 4*y^12 + y^13)" ] }, "GeometricRepresentation":[ 8.60203, [ "J9_45_0", 1, "{10, 11}" ] ] } }