{ "Index":151, "Name":"10_67", "RolfsenName":"10_67", "DTname":"10a_37", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-14, 18, 16, 10, 20, 6, -2, 12, 4, 8}", "Acode":"{-8, 10, 9, 6, 1, 4, -2, 7, 3, 5}", "PDcode":[ "{1, 14, 2, 15}", "{3, 19, 4, 18}", "{5, 17, 6, 16}", "{7, 11, 8, 10}", "{9, 1, 10, 20}", "{11, 7, 12, 6}", "{13, 2, 14, 3}", "{15, 13, 16, 12}", "{17, 5, 18, 4}", "{19, 9, 20, 8}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{4, 9, 7}", [], [ "{4, 9, 3, 2}", "{9, 3, 10, 1}", "{3, 10, 2, 2}", "{7, 4, 6, 2}", "{4, 6, 5, 1}", "{9, 7, 8, 2}", "{2, -8, 1, 2}" ], "{7, 10}", "{5}", 5 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "a + b - a^2*u + 2*a*u^2 + 2*b*u^2 + 3*a*u^4 + b*u^4 + a*u^6", "b - u - a*b*u - 2*b*u^2 - 4*a*u^4 - 3*b*u^4 - 4*a*u^6 - b*u^6 - a*u^8", "-1 - 2*u - 2*a*b*u - 3*b^2*u - a^2*b^2*u - 3*a*b^3*u - 2*b^4*u - u^2 - a^2*u^2 - a^3*b*u^2 - u^3 - 2*a*b*u^3 - 2*b^2*u^3 - a^2*b^2*u^3 - 2*a*b^3*u^3 - b^4*u^3 - a^2*u^4 - 2*a^4*u^4 - a^3*b*u^4 - a^4*u^6", "u - b^2*u - a*b^3*u - 2*b^4*u + u^2 - 2*a*b*u^2 - a^2*b^2*u^2 + u^3 - b^2*u^3 - a*b^3*u^3 - b^4*u^3 - 2*a^2*u^4 - 2*a*b*u^4 - 2*a^3*b*u^4 - a^2*b^2*u^4 - a^2*u^6 - a^3*b*u^6" ], "TimingForPrimaryIdeals":0.125511 }, "v":{ "CheckEq":[ "a + b - v + a*b*v", "b + b^2*v", "-1 + v + b^2*v + a*b^3*v + b^4*v + b^2*v^2 - a*b^3*v^2", "b^4*v - b^4*v^2" ], "TimingForPrimaryIdeals":9.453500000000002e-2 }, "PrimaryIdeals":[ { "IdealName":"J10_67_0", "Generators":[ "-246895131 + 40233748*b + 1393603701*u - 776770986*u^2 + 3596088799*u^3 - 9965342265*u^4 + 12993854936*u^5 - 24490129620*u^6 + 34991007543*u^7 - 31560568948*u^8 + 49093265716*u^9 - 39053193540*u^10 + 51491239951*u^11 - 51569434702*u^12 + 57895855649*u^13 - 51879039386*u^14 + 58586018497*u^15 - 34361603818*u^16 + 41216069273*u^17 - 14564059958*u^18 + 18561281813*u^19 - 3828504300*u^20 + 5136625430*u^21 - 571434880*u^22 + 800796949*u^23 - 37175946*u^24 + 54165895*u^25", "-172885695 + 10058437*a + 670773488*u - 571362745*u^2 + 2086934782*u^3 - 5303225430*u^4 + 7446435615*u^5 - 13356328894*u^6 + 18359752895*u^7 - 17949821908*u^8 + 25335560148*u^9 - 21711777972*u^10 + 27242799717*u^11 - 27805465649*u^12 + 30578361627*u^13 - 28254746393*u^14 + 29981744504*u^15 - 19244448971*u^16 + 20468869748*u^17 - 8419117200*u^18 + 9007702735*u^19 - 2283473954*u^20 + 2447642091*u^21 - 351308116*u^22 + 375704303*u^23 - 23549273*u^24 + 25054784*u^25", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":7.4899e-2, "TimingZeroDimVars":8.797700000000001e-2, "TimingmagmaVCompNormalize":8.937900000000001e-2, "TimingNumberOfSols":0.270931, "TimingIsRadical":2.1920000000000002e-2, "TimingArcColoring":7.6665e-2, "TimingObstruction":9.5114e-2, "TimingComplexVolumeN":2.1430524000000002e1, "TimingaCuspShapeN":0.18438, "TiminguValues":0.696655, "TiminguPolysN":9.758800000000001e-2, "TiminguPolys":1.295087, "TimingaCuspShape":0.15707, "TimingRepresentationsN":0.258425, "TiminguValues_ij":0.22144, "TiminguPoly_ij":2.355842, "TiminguPolys_ij_N":0.216707 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":26, "IsRadical":true, "ArcColoring":[ [ "(307433160 - 1747150053*u + 1114532127*u^2 - 4482313904*u^3 + 12608766683*u^4 - 16787288598*u^5 + 31084839895*u^6 - 44650859527*u^7 + 40898187567*u^8 - 62290454152*u^9 + 50472571978*u^10 - 65665611143*u^11 + 65940747777*u^12 - 74069555665*u^13 + 66635945181*u^14 - 74635705720*u^15 + 44690370514*u^16 - 52214176387*u^17 + 19220400840*u^18 - 23398916437*u^19 + 5127192727*u^20 - 6447905220*u^21 + 776292315*u^22 - 1001339785*u^23 + 51222635*u^24 - 67476781*u^25)\/10058437", "(-219401615 + 985671115*u - 816610582*u^2 + 2900521715*u^3 - 7403750927*u^4 + 10577842472*u^5 - 19499428720*u^6 + 27166400659*u^7 - 27241836398*u^8 + 38584748134*u^9 - 33004649446*u^10 + 41628151797*u^11 - 42139027722*u^12 + 46705178577*u^13 - 43791864804*u^14 + 46737739743*u^15 - 30887360198*u^16 + 32850970597*u^17 - 14037648024*u^18 + 14886514495*u^19 - 3956010840*u^20 + 4158337890*u^21 - 632037232*u^22 + 655079609*u^23 - 43972464*u^24 + 44780857*u^25)\/40233748" ], [ "1 + u^2", "-2*u^2 - u^4" ], [ 1, "-u^2" ], "{1, 0}", [ "(632380725 - 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42779597396*u^5 + 77915445196*u^6 - 108430019123*u^7 + 103359856580*u^8 - 150435506308*u^9 + 125900305428*u^10 - 160462438819*u^11 + 162791297298*u^12 - 180209302157*u^13 + 164898024958*u^14 - 178512996513*u^15 + 111339399702*u^16 - 123091548265*u^17 + 48240528758*u^18 - 54592092753*u^19 + 12962400116*u^20 - 14927193794*u^21 + 1976667344*u^22 - 2303614161*u^23 + 131373038*u^24 - 154385031*u^25)\/40233748", "(246895131 - 1393603701*u + 776770986*u^2 - 3596088799*u^3 + 9965342265*u^4 - 12993854936*u^5 + 24490129620*u^6 - 34991007543*u^7 + 31560568948*u^8 - 49093265716*u^9 + 39053193540*u^10 - 51491239951*u^11 + 51569434702*u^12 - 57895855649*u^13 + 51879039386*u^14 - 58586018497*u^15 + 34361603818*u^16 - 41216069273*u^17 + 14564059958*u^18 - 18561281813*u^19 + 3828504300*u^20 - 5136625430*u^21 + 571434880*u^22 - 800796949*u^23 + 37175946*u^24 - 54165895*u^25)\/40233748" ], [ "(172885695 - 670773488*u + 571362745*u^2 - 2086934782*u^3 + 5303225430*u^4 - 7446435615*u^5 + 13356328894*u^6 - 18359752895*u^7 + 17949821908*u^8 - 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6.14693*I", "1.3833 + 6.14693*I", "5.55732 + 2.75521*I", "5.55732 - 2.75521*I", "-0.439201 + 1.27856*I", "-0.439201 - 1.27856*I", "8.0695 - 12.4216*I", "8.0695 + 12.4216*I", "9.09667 + 6.2519*I", "9.09667 - 6.2519*I", "10.1443 + 6.11174*I", "10.1443 - 6.11174*I", "10.7607 + 0.12219*I", "10.7607 - 0.12219*I", "-1.75304 - 2.04961*I", "-1.75304 + 2.04961*I" ], "uPolysN":[ "1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26", "2 + 3*u + 7*u^2 - 4*u^3 - 16*u^4 - 2*u^5 + 19*u^6 + 5*u^7 + 4*u^9 - 28*u^10 - 33*u^11 + 44*u^12 + 59*u^13 - 40*u^14 - 66*u^15 + 29*u^16 + 59*u^17 - 13*u^18 - 41*u^19 + 2*u^20 + 22*u^21 + 3*u^22 - 8*u^23 - 2*u^24 + 2*u^25 + u^26", "4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26", "1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26", "1 - 10*u + 101*u^2 + 931*u^3 + 3924*u^4 + 11075*u^5 + 24008*u^6 + 42385*u^7 + 63465*u^8 + 82878*u^9 + 96464*u^10 + 101725*u^11 + 98267*u^12 + 87529*u^13 + 72083*u^14 + 54919*u^15 + 38689*u^16 + 25153*u^17 + 15039*u^18 + 8201*u^19 + 4033*u^20 + 1752*u^21 + 658*u^22 + 205*u^23 + 51*u^24 + 9*u^25 + u^26", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "2 + 3*u + 7*u^2 - 4*u^3 - 16*u^4 - 2*u^5 + 19*u^6 + 5*u^7 + 4*u^9 - 28*u^10 - 33*u^11 + 44*u^12 + 59*u^13 - 40*u^14 - 66*u^15 + 29*u^16 + 59*u^17 - 13*u^18 - 41*u^19 + 2*u^20 + 22*u^21 + 3*u^22 - 8*u^23 - 2*u^24 + 2*u^25 + u^26" ], "uPolys":[ "1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26", "2 + 3*u + 7*u^2 - 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96*u + 1504*u^2 + 898*u^3 + 5829*u^4 + 2806*u^5 + 4839*u^6 + 4210*u^7 - 6918*u^8 - 7348*u^9 + 1238*u^10 - 2110*u^11 + 611*u^12 + 11564*u^13 + 8282*u^14 + 860*u^15 + 687*u^16 + 114*u^17 - 1469*u^18 - 646*u^19 + 402*u^20 + 234*u^21 - 65*u^22 - 52*u^23 + 2*u^24 + 6*u^25 + u^26" ], "GeometricComponent":"{17, 18}", "uPolys_ij_N":[ "1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26", "1 + 42*u + 433*u^2 - 1103*u^3 + 6164*u^4 - 11315*u^5 - 2512*u^6 - 20969*u^7 + 181125*u^8 - 412234*u^9 + 619284*u^10 - 929057*u^11 + 1390627*u^12 - 1748257*u^13 + 1841927*u^14 - 1802603*u^15 + 1706561*u^16 - 1450705*u^17 + 1015051*u^18 - 558437*u^19 + 236929*u^20 - 76536*u^21 + 18498*u^22 - 3245*u^23 + 391*u^24 - 29*u^25 + u^26", "32 - 496*u + 3080*u^2 - 10108*u^3 + 21854*u^4 - 45023*u^5 + 90767*u^6 - 119471*u^7 + 137867*u^8 - 138830*u^9 + 122859*u^10 - 92768*u^11 + 79782*u^12 - 47864*u^13 + 36521*u^14 - 16825*u^15 + 12549*u^16 - 4712*u^17 + 3228*u^18 - 825*u^19 + 582*u^20 - 140*u^21 + 99*u^22 - 16*u^23 + 11*u^24 - 2*u^25 + u^26", "1 + 16*u + 17*u^2 - 487*u^3 + 1366*u^4 - 3547*u^5 + 7290*u^6 - 9341*u^7 + 16697*u^8 - 12002*u^9 + 16498*u^10 - 18661*u^11 + 15681*u^12 - 19375*u^13 + 11155*u^14 - 12227*u^15 + 7181*u^16 - 3923*u^17 + 3703*u^18 - 507*u^19 + 1201*u^20 + 24*u^21 + 226*u^22 + 13*u^23 + 23*u^24 + u^25 + u^26", "37 + 14*u + 58*u^2 - 275*u^3 - 343*u^4 + 822*u^5 + 2883*u^6 - 3510*u^7 - 1412*u^8 + 660*u^9 + 3534*u^10 + 3844*u^11 - 456*u^12 - 18868*u^13 + 13106*u^14 - 14761*u^15 + 18737*u^16 - 4981*u^17 + 10095*u^18 - 1238*u^19 + 2778*u^20 - 229*u^21 + 415*u^22 - 24*u^23 + 32*u^24 - u^25 + u^26", "2183 - 4454*u + 1011*u^2 + 9937*u^3 - 12288*u^4 - 6046*u^5 + 25111*u^6 - 11569*u^7 - 20330*u^8 + 26064*u^9 - 3212*u^10 - 14803*u^11 + 16808*u^12 - 9663*u^13 - 3640*u^14 + 12120*u^15 - 4761*u^16 - 4543*u^17 + 3651*u^18 + 750*u^19 - 1179*u^20 - 34*u^21 + 206*u^22 - 7*u^23 - 20*u^24 + u^25 + u^26", "49 - 180*u + 261*u^2 - 41*u^3 + 1418*u^4 + 2697*u^5 + 8496*u^6 + 20053*u^7 + 23917*u^8 + 22702*u^9 + 1506*u^10 - 14505*u^11 - 28951*u^12 - 21891*u^13 - 13557*u^14 - 6977*u^15 + 11517*u^16 - 1367*u^17 + 14341*u^18 - 3251*u^19 + 4811*u^20 - 926*u^21 + 680*u^22 - 91*u^23 + 43*u^24 - 3*u^25 + u^26", "1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26", "193 + 292*u - 2392*u^2 - 6581*u^3 - 3829*u^4 + 8552*u^5 + 56351*u^6 + 203484*u^7 + 453900*u^8 + 623416*u^9 + 486118*u^10 + 9012*u^11 - 386170*u^12 - 368700*u^13 - 75792*u^14 + 143619*u^15 + 114027*u^16 - 3779*u^17 - 34403*u^18 - 8266*u^19 + 4438*u^20 + 1989*u^21 - 179*u^22 - 192*u^23 - 12*u^24 + 7*u^25 + u^26", "4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26", "16 + 192*u + 916*u^2 + 1582*u^3 + 967*u^4 - 2082*u^5 - 7967*u^6 - 8782*u^7 + 2396*u^8 + 18148*u^9 + 25550*u^10 + 13386*u^11 - 9389*u^12 - 21012*u^13 - 13152*u^14 + 3096*u^15 + 12015*u^16 + 9658*u^17 + 3953*u^18 + 2238*u^19 + 2350*u^20 + 1114*u^21 + 311*u^22 + 64*u^23 + 24*u^24 + 6*u^25 + u^26", "157 + 574*u + 2670*u^2 + 6773*u^3 + 17869*u^4 + 32962*u^5 + 54969*u^6 + 74686*u^7 + 85472*u^8 + 77536*u^9 + 51958*u^10 + 15508*u^11 - 15030*u^12 - 25842*u^13 - 17856*u^14 - 2029*u^15 + 7523*u^16 + 7091*u^17 + 1295*u^18 - 2236*u^19 - 1096*u^20 + 333*u^21 + 239*u^22 - 26*u^23 - 24*u^24 + u^25 + u^26", "16 + 289*u + 9665*u^2 - 15528*u^3 - 26856*u^4 + 71476*u^5 + 80031*u^6 - 453825*u^7 + 704260*u^8 - 601270*u^9 + 409002*u^10 - 467945*u^11 + 710092*u^12 - 841485*u^13 + 754578*u^14 - 555748*u^15 + 361089*u^16 - 214145*u^17 + 117803*u^18 - 61085*u^19 + 29466*u^20 - 12414*u^21 + 4207*u^22 - 1064*u^23 + 186*u^24 - 20*u^25 + u^26", "127 - 1808*u + 13578*u^2 - 65443*u^3 + 192547*u^4 - 300946*u^5 + 130575*u^6 + 300874*u^7 - 431212*u^8 - 23876*u^9 + 430796*u^10 - 226624*u^11 - 166682*u^12 + 176462*u^13 + 31530*u^14 - 79683*u^15 + 1763*u^16 + 24909*u^17 - 2571*u^18 - 5768*u^19 + 632*u^20 + 991*u^21 - 57*u^22 - 116*u^23 - 4*u^24 + 7*u^25 + u^26", "4 - 8*u + 10*u^2 + 40*u^3 + 41*u^4 + 636*u^5 + 287*u^6 + 949*u^7 + 7175*u^8 + 527*u^9 - 9741*u^10 + 9576*u^11 + 12082*u^12 - 10525*u^13 - 1325*u^14 + 6215*u^15 - 181*u^16 - 1338*u^17 + 678*u^18 + 76*u^19 - 276*u^20 - 11*u^21 + 45*u^22 - 3*u^23 - u^24 + 3*u^25 + u^26", "604 + 2088*u + 5718*u^2 + 7888*u^3 + 11275*u^4 + 7092*u^5 + 12135*u^6 + 4981*u^7 + 22743*u^8 + 9023*u^9 + 35317*u^10 + 5842*u^11 + 34206*u^12 - 3103*u^13 + 24031*u^14 - 6793*u^15 + 13017*u^16 - 4864*u^17 + 5186*u^18 - 2034*u^19 + 1434*u^20 - 519*u^21 + 261*u^22 - 75*u^23 + 27*u^24 - 5*u^25 + u^26", "3764 - 3824*u + 14470*u^2 - 25108*u^3 + 99747*u^4 - 50946*u^5 + 124114*u^6 + 20085*u^7 + 240259*u^8 + 53401*u^9 + 291054*u^10 + 156123*u^11 + 269201*u^12 + 130904*u^13 + 139939*u^14 + 23450*u^15 + 42400*u^16 + 5125*u^17 + 13777*u^18 + 2315*u^19 + 3240*u^20 + 467*u^21 + 476*u^22 + 36*u^23 + 35*u^24 + u^25 + u^26", "3104 - 31112*u + 141060*u^2 - 300110*u^3 + 608429*u^4 - 905878*u^5 + 1128819*u^6 - 757224*u^7 - 163212*u^8 + 426232*u^9 + 250036*u^10 - 394310*u^11 + 102203*u^12 - 14962*u^13 + 200810*u^14 - 142822*u^15 + 26909*u^16 - 6598*u^17 + 13221*u^18 - 8936*u^19 + 4044*u^20 - 1480*u^21 + 425*u^22 - 100*u^23 + 30*u^24 - 8*u^25 + u^26", "2 + 3*u + 7*u^2 - 4*u^3 - 16*u^4 - 2*u^5 + 19*u^6 + 5*u^7 + 4*u^9 - 28*u^10 - 33*u^11 + 44*u^12 + 59*u^13 - 40*u^14 - 66*u^15 + 29*u^16 + 59*u^17 - 13*u^18 - 41*u^19 + 2*u^20 + 22*u^21 + 3*u^22 - 8*u^23 - 2*u^24 + 2*u^25 + u^26", "1 - 10*u + 101*u^2 + 931*u^3 + 3924*u^4 + 11075*u^5 + 24008*u^6 + 42385*u^7 + 63465*u^8 + 82878*u^9 + 96464*u^10 + 101725*u^11 + 98267*u^12 + 87529*u^13 + 72083*u^14 + 54919*u^15 + 38689*u^16 + 25153*u^17 + 15039*u^18 + 8201*u^19 + 4033*u^20 + 1752*u^21 + 658*u^22 + 205*u^23 + 51*u^24 + 9*u^25 + u^26", "121 + 906*u + 3780*u^2 + 12305*u^3 + 32717*u^4 + 62488*u^5 + 67515*u^6 + 6232*u^7 - 70346*u^8 - 17304*u^9 + 165376*u^10 + 222758*u^11 + 24768*u^12 - 157576*u^13 - 79766*u^14 + 86509*u^15 + 99433*u^16 + 12247*u^17 - 26711*u^18 - 11318*u^19 + 2248*u^20 + 2117*u^21 + 91*u^22 - 168*u^23 - 24*u^24 + 5*u^25 + u^26", "1 - 102*u + 36669*u^2 - 195403*u^3 + 600372*u^4 - 1508707*u^5 + 3027560*u^6 - 4481717*u^7 + 4801781*u^8 - 3601830*u^9 + 1659004*u^10 - 193693*u^11 - 135189*u^12 - 430641*u^13 + 1183019*u^14 - 1562831*u^15 + 1447705*u^16 - 1039333*u^17 + 600763*u^18 - 283473*u^19 + 109281*u^20 - 34116*u^21 + 8470*u^22 - 1621*u^23 + 227*u^24 - 21*u^25 + u^26", "48566 + 39713*u + 175139*u^2 - 34185*u^3 + 247005*u^4 - 117352*u^5 + 364438*u^6 + 20975*u^7 + 421239*u^8 + 138703*u^9 + 327787*u^10 + 99118*u^11 + 221306*u^12 - 12512*u^13 + 153276*u^14 - 66794*u^15 + 92380*u^16 - 48313*u^17 + 36673*u^18 - 16325*u^19 + 8297*u^20 - 2792*u^21 + 990*u^22 - 229*u^23 + 55*u^24 - 7*u^25 + u^26", "1 - 10*u - 2*u^2 - 299*u^3 + 3885*u^4 - 2298*u^5 + 9873*u^6 - 3104*u^7 + 5176*u^8 - 7152*u^9 - 638*u^10 - 6918*u^11 + 1712*u^12 - 550*u^13 + 6216*u^14 + 4051*u^15 + 5941*u^16 + 3647*u^17 + 3113*u^18 + 1638*u^19 + 1024*u^20 + 437*u^21 + 207*u^22 + 68*u^23 + 24*u^24 + 5*u^25 + u^26", "128 - 96*u + 1504*u^2 + 898*u^3 + 5829*u^4 + 2806*u^5 + 4839*u^6 + 4210*u^7 - 6918*u^8 - 7348*u^9 + 1238*u^10 - 2110*u^11 + 611*u^12 + 11564*u^13 + 8282*u^14 + 860*u^15 + 687*u^16 + 114*u^17 - 1469*u^18 - 646*u^19 + 402*u^20 + 234*u^21 - 65*u^22 - 52*u^23 + 2*u^24 + 6*u^25 + u^26" ], "Multiplicity":1, "MinRepresentationVolume":[ "{23, 24}", 0.12219 ], "ij_list":[ [ "{2, 10}", "{3, 9}", "{3, 10}", "{4, 9}" ], [ "{2, 3}", "{3, 4}", "{9, 10}" ], [ "{1, 7}", "{2, 9}", "{4, 10}" ], [ "{2, 4}" ], [ "{5, 8}" ], [ "{2, 6}" ], [ "{1, 9}", "{3, 6}" ], [ "{1, 8}", "{2, 7}", "{2, 8}" ], [ "{3, 7}" ], [ "{1, 10}", "{4, 6}", "{4, 7}", "{5, 6}" ], [ "{3, 8}" ], [ "{4, 8}" ], [ "{4, 5}", "{6, 7}" ], [ "{3, 5}" ], [ "{2, 5}" ], [ "{6, 8}" ], [ "{5, 9}" ], [ "{5, 7}" ], [ "{1, 5}", "{1, 6}", "{5, 10}" ], [ "{1, 2}", "{7, 8}", "{7, 9}" ], [ "{1, 3}", "{6, 9}" ], [ "{8, 9}" ], [ "{7, 10}" ], [ "{8, 10}" ], [ "{1, 4}", "{6, 10}" ] ], "SortedReprnIndices":"{18, 17, 4, 3, 19, 20, 12, 11, 21, 22, 10, 9, 13, 14, 5, 6, 1, 2, 26, 25, 7, 8, 15, 16, 23, 24}", "aCuspShapeN":[ "0.3754808590415121478`4.0852696993907145 - 4.3472958966166030079`5.1489010978410095*I", "0.3754808590415121478`4.0852696993907145 + 4.3472958966166030079`5.1489010978410095*I", "-5.2138968738754866161`4.902363661910861 + 7.6191967847693145703`5.067110415398893*I", "-5.2138968738754866161`4.902363661910861 - 7.6191967847693145703`5.067110415398893*I", "-3.6024317217816200235`5.049714628851962 - 2.7688282404314579321`4.93541488649039*I", "-3.6024317217816200235`5.049714628851962 + 2.7688282404314579321`4.93541488649039*I", "-3.3793566718072627613`5.142841514477631 - 0.6409161148514826427`4.4208086743692*I", "-3.3793566718072627613`5.142841514477631 + 0.6409161148514826427`4.4208086743692*I", "-12.7738627561829408824`5.114702319077238 + 5.4089861953137128773`4.741495946386331*I", "-12.7738627561829408824`5.114702319077238 - 5.4089861953137128773`4.741495946386331*I", "-5.9253773547001359329`4.994468801648417 + 6.0763252348536327872`5.005393799650713*I", "-5.9253773547001359329`4.994468801648417 - 6.0763252348536327872`5.005393799650713*I", "0.1773756778465146026`3.9170225231197873 - 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3.464101615137754587`4.849485002168011*I", "-5.9999999999999999999`5.088045629527841 + 3.464101615137754587`4.849485002168011*I", "-5.9999999999999999999`5.088045629527841 - 3.464101615137754587`4.849485002168011*I" ], "Abelian":false }, { "IdealName":"abJ10_67_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":7.3029e-2, "TimingZeroDimVars":6.9517e-2, "TimingmagmaVCompNormalize":7.1098e-2, "TimingNumberOfSols":2.4792e-2, "TimingIsRadical":1.7540000000000001e-3, "TimingArcColoring":5.8398000000000005e-2, "TimingObstruction":4.2e-4, "TimingComplexVolumeN":0.409932, "TimingaCuspShapeN":4.5190000000000004e-3, "TiminguValues":0.639442, "TiminguPolysN":7.3e-5, "TiminguPolys":0.797717, "TimingaCuspShape":8.6878e-2, "TimingRepresentationsN":2.6589e-2, "TiminguValues_ij":0.133918, "TiminguPoly_ij":0.151166, "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":[ "(1 + u^2)^2*(1 + 2*u + u^2 + 3*u^3 + 2*u^4 + 3*u^5 + u^6 + 3*u^7 + u^9)*(1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26)", "(1 + u^2)^2*(1 + 2*u + u^2 + 3*u^3 + 2*u^4 + 3*u^5 + u^6 + 3*u^7 + u^9)*(1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26)", "(1 + u^2)^2*(1 + 2*u + u^2 + 3*u^3 + 2*u^4 + 3*u^5 + u^6 + 3*u^7 + u^9)*(1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26)", "(1 - u + u^2)^2*(1 + 2*u + u^2 + u^3)^3*(4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26)", "(1 - u^2 + u^3)^3*(1 - u^2 + u^4)*(2 + 3*u + 7*u^2 - 4*u^3 - 16*u^4 - 2*u^5 + 19*u^6 + 5*u^7 + 4*u^9 - 28*u^10 - 33*u^11 + 44*u^12 + 59*u^13 - 40*u^14 - 66*u^15 + 29*u^16 + 59*u^17 - 13*u^18 - 41*u^19 + 2*u^20 + 22*u^21 + 3*u^22 - 8*u^23 - 2*u^24 + 2*u^25 + u^26)", "(1 + u + u^2)^2*(1 + 2*u + u^2 + u^3)^3*(4 - 19*u + 9*u^2 + 152*u^3 + 476*u^4 + 708*u^5 + 395*u^6 - 725*u^7 - 2220*u^8 - 2974*u^9 - 1710*u^10 + 2031*u^11 + 7544*u^12 + 13075*u^13 + 16846*u^14 + 17796*u^15 + 16049*u^16 + 12571*u^17 + 8631*u^18 + 5199*u^19 + 2742*u^20 + 1254*u^21 + 491*u^22 + 160*u^23 + 42*u^24 + 8*u^25 + u^26)", "(1 + u^2)^2*(1 + 2*u + u^2 + 3*u^3 + 2*u^4 + 3*u^5 + u^6 + 3*u^7 + u^9)*(1 - 8*u + 27*u^2 - 51*u^3 + 94*u^4 - 119*u^5 + 180*u^6 - 187*u^7 + 249*u^8 - 220*u^9 + 272*u^10 - 215*u^11 + 247*u^12 - 179*u^13 + 197*u^14 - 131*u^15 + 137*u^16 - 83*u^17 + 85*u^18 - 43*u^19 + 43*u^20 - 18*u^21 + 18*u^22 - 5*u^23 + 5*u^24 - u^25 + u^26)", "(1 + u)^4*(-1 + 2*u + 7*u^2 + 15*u^3 + 24*u^4 + 27*u^5 + 23*u^6 + 15*u^7 + 6*u^8 + u^9)*(1 - 10*u + 101*u^2 + 931*u^3 + 3924*u^4 + 11075*u^5 + 24008*u^6 + 42385*u^7 + 63465*u^8 + 82878*u^9 + 96464*u^10 + 101725*u^11 + 98267*u^12 + 87529*u^13 + 72083*u^14 + 54919*u^15 + 38689*u^16 + 25153*u^17 + 15039*u^18 + 8201*u^19 + 4033*u^20 + 1752*u^21 + 658*u^22 + 205*u^23 + 51*u^24 + 9*u^25 + u^26)", "(1 + u^2)^2*(1 + 2*u + u^2 + 3*u^3 + 2*u^4 + 3*u^5 + u^6 + 3*u^7 + u^9)*(1 - 10*u + 29*u^2 - 31*u^3 + 106*u^4 - 239*u^5 + 348*u^6 - 601*u^7 + 791*u^8 - 806*u^9 + 1082*u^10 - 959*u^11 + 1183*u^12 - 1213*u^13 + 1311*u^14 - 1227*u^15 + 1249*u^16 - 833*u^17 + 835*u^18 - 363*u^19 + 363*u^20 - 98*u^21 + 98*u^22 - 15*u^23 + 15*u^24 - u^25 + u^26)", "(1 - u^2 + u^3)^3*(1 - u^2 + u^4)*(2 + 3*u + 7*u^2 - 4*u^3 - 16*u^4 - 2*u^5 + 19*u^6 + 5*u^7 + 4*u^9 - 28*u^10 - 33*u^11 + 44*u^12 + 59*u^13 - 40*u^14 - 66*u^15 + 29*u^16 + 59*u^17 - 13*u^18 - 41*u^19 + 2*u^20 + 22*u^21 + 3*u^22 - 8*u^23 - 2*u^24 + 2*u^25 + u^26)" ], "RileyPolyC":[ "(1 + y)^4*(-1 + 2*y + 7*y^2 + 15*y^3 + 24*y^4 + 27*y^5 + 23*y^6 + 15*y^7 + 6*y^8 + y^9)*(1 - 10*y + 101*y^2 + 931*y^3 + 3924*y^4 + 11075*y^5 + 24008*y^6 + 42385*y^7 + 63465*y^8 + 82878*y^9 + 96464*y^10 + 101725*y^11 + 98267*y^12 + 87529*y^13 + 72083*y^14 + 54919*y^15 + 38689*y^16 + 25153*y^17 + 15039*y^18 + 8201*y^19 + 4033*y^20 + 1752*y^21 + 658*y^22 + 205*y^23 + 51*y^24 + 9*y^25 + y^26)", "(1 + y)^4*(-1 + 2*y + 7*y^2 + 15*y^3 + 24*y^4 + 27*y^5 + 23*y^6 + 15*y^7 + 6*y^8 + y^9)*(1 - 42*y + 433*y^2 + 1103*y^3 + 6164*y^4 + 11315*y^5 - 2512*y^6 + 20969*y^7 + 181125*y^8 + 412234*y^9 + 619284*y^10 + 929057*y^11 + 1390627*y^12 + 1748257*y^13 + 1841927*y^14 + 1802603*y^15 + 1706561*y^16 + 1450705*y^17 + 1015051*y^18 + 558437*y^19 + 236929*y^20 + 76536*y^21 + 18498*y^22 + 3245*y^23 + 391*y^24 + 29*y^25 + y^26)", "(1 + y)^4*(-1 + 2*y + 7*y^2 + 15*y^3 + 24*y^4 + 27*y^5 + 23*y^6 + 15*y^7 + 6*y^8 + y^9)*(1 - 42*y + 433*y^2 + 1103*y^3 + 6164*y^4 + 11315*y^5 - 2512*y^6 + 20969*y^7 + 181125*y^8 + 412234*y^9 + 619284*y^10 + 929057*y^11 + 1390627*y^12 + 1748257*y^13 + 1841927*y^14 + 1802603*y^15 + 1706561*y^16 + 1450705*y^17 + 1015051*y^18 + 558437*y^19 + 236929*y^20 + 76536*y^21 + 18498*y^22 + 3245*y^23 + 391*y^24 + 29*y^25 + y^26)", "(1 + y + y^2)^2*(-1 + 2*y + 3*y^2 + y^3)^3*(16 - 289*y + 9665*y^2 + 15528*y^3 - 26856*y^4 - 71476*y^5 + 80031*y^6 + 453825*y^7 + 704260*y^8 + 601270*y^9 + 409002*y^10 + 467945*y^11 + 710092*y^12 + 841485*y^13 + 754578*y^14 + 555748*y^15 + 361089*y^16 + 214145*y^17 + 117803*y^18 + 61085*y^19 + 29466*y^20 + 12414*y^21 + 4207*y^22 + 1064*y^23 + 186*y^24 + 20*y^25 + y^26)", "(1 - y + y^2)^2*(-1 + 2*y - y^2 + y^3)^3*(4 + 19*y + 9*y^2 - 152*y^3 + 476*y^4 - 708*y^5 + 395*y^6 + 725*y^7 - 2220*y^8 + 2974*y^9 - 1710*y^10 - 2031*y^11 + 7544*y^12 - 13075*y^13 + 16846*y^14 - 17796*y^15 + 16049*y^16 - 12571*y^17 + 8631*y^18 - 5199*y^19 + 2742*y^20 - 1254*y^21 + 491*y^22 - 160*y^23 + 42*y^24 - 8*y^25 + y^26)", "(1 + y + y^2)^2*(-1 + 2*y + 3*y^2 + y^3)^3*(16 - 289*y + 9665*y^2 + 15528*y^3 - 26856*y^4 - 71476*y^5 + 80031*y^6 + 453825*y^7 + 704260*y^8 + 601270*y^9 + 409002*y^10 + 467945*y^11 + 710092*y^12 + 841485*y^13 + 754578*y^14 + 555748*y^15 + 361089*y^16 + 214145*y^17 + 117803*y^18 + 61085*y^19 + 29466*y^20 + 12414*y^21 + 4207*y^22 + 1064*y^23 + 186*y^24 + 20*y^25 + y^26)", "(1 + y)^4*(-1 + 2*y + 7*y^2 + 15*y^3 + 24*y^4 + 27*y^5 + 23*y^6 + 15*y^7 + 6*y^8 + y^9)*(1 - 10*y + 101*y^2 + 931*y^3 + 3924*y^4 + 11075*y^5 + 24008*y^6 + 42385*y^7 + 63465*y^8 + 82878*y^9 + 96464*y^10 + 101725*y^11 + 98267*y^12 + 87529*y^13 + 72083*y^14 + 54919*y^15 + 38689*y^16 + 25153*y^17 + 15039*y^18 + 8201*y^19 + 4033*y^20 + 1752*y^21 + 658*y^22 + 205*y^23 + 51*y^24 + 9*y^25 + y^26)", "(-1 + y)^4*(-1 + 18*y + 59*y^2 + 43*y^3 - 16*y^4 - 5*y^5 + 23*y^6 + 3*y^7 - 6*y^8 + y^9)*(1 + 102*y + 36669*y^2 + 195403*y^3 + 600372*y^4 + 1508707*y^5 + 3027560*y^6 + 4481717*y^7 + 4801781*y^8 + 3601830*y^9 + 1659004*y^10 + 193693*y^11 - 135189*y^12 + 430641*y^13 + 1183019*y^14 + 1562831*y^15 + 1447705*y^16 + 1039333*y^17 + 600763*y^18 + 283473*y^19 + 109281*y^20 + 34116*y^21 + 8470*y^22 + 1621*y^23 + 227*y^24 + 21*y^25 + y^26)", "(1 + y)^4*(-1 + 2*y + 7*y^2 + 15*y^3 + 24*y^4 + 27*y^5 + 23*y^6 + 15*y^7 + 6*y^8 + y^9)*(1 - 42*y + 433*y^2 + 1103*y^3 + 6164*y^4 + 11315*y^5 - 2512*y^6 + 20969*y^7 + 181125*y^8 + 412234*y^9 + 619284*y^10 + 929057*y^11 + 1390627*y^12 + 1748257*y^13 + 1841927*y^14 + 1802603*y^15 + 1706561*y^16 + 1450705*y^17 + 1015051*y^18 + 558437*y^19 + 236929*y^20 + 76536*y^21 + 18498*y^22 + 3245*y^23 + 391*y^24 + 29*y^25 + y^26)", "(1 - y + y^2)^2*(-1 + 2*y - y^2 + y^3)^3*(4 + 19*y + 9*y^2 - 152*y^3 + 476*y^4 - 708*y^5 + 395*y^6 + 725*y^7 - 2220*y^8 + 2974*y^9 - 1710*y^10 - 2031*y^11 + 7544*y^12 - 13075*y^13 + 16846*y^14 - 17796*y^15 + 16049*y^16 - 12571*y^17 + 8631*y^18 - 5199*y^19 + 2742*y^20 - 1254*y^21 + 491*y^22 - 160*y^23 + 42*y^24 - 8*y^25 + y^26)" ] }, "GeometricRepresentation":[ 1.24216e1, [ "J10_67_0", 1, "{17, 18}" ] ] } }