{ "Index":182, "Name":"10_98", "RolfsenName":"10_98", "DTname":"10a_96", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-10, 16, 12, 18, 14, -20, 6, 2, 8, 4}", "Acode":"{-6, 9, 7, 10, 8, -1, 4, 2, 5, 3}", "PDcode":[ "{1, 10, 2, 11}", "{3, 17, 4, 16}", "{5, 13, 6, 12}", "{7, 19, 8, 18}", "{9, 15, 10, 14}", "{11, 20, 12, 1}", "{13, 7, 14, 6}", "{15, 3, 16, 2}", "{17, 9, 18, 8}", "{19, 5, 20, 4}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{4, 10, 7}", [], [ "{4, 10, 5, 1}", "{7, 4, 8, 1}", "{4, 7, 3, 2}", "{10, 3, 1, 1}", "{7, -1, 6, 2}", "{10, 5, 9, 2}", "{3, 9, 2, 2}" ], "{5, 8}", "{1}", 1 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 - a + a*b - b^2 + a*u^2 - a^2*u^2 + b*u^2 + 2*a*b*u^2 - 2*a^2*b*u^2 - b^2*u^2 - 3*a*b^2*u^2 + a^3*b^2*u^2 + 3*a^2*b^3*u^2 - a^3*b^4*u^2", "-b + b^2 + u^2 - a*u^2 - b*u^2 - a*b*u^2 + b^2*u^2 - b^3*u^2 + a^2*b^3*u^2 + 2*a*b^4*u^2 - a^2*b^5*u^2", "a - 2*b + a*b^2 + b^3 - a*b^4 - u - a*u^2 + 3*b*u^2 + 2*a^2*b*u^2 - 6*a*b^2*u^2 - a^3*b^2*u^2 + 2*b^3*u^2 + 3*a^2*b^3*u^2 - a*b^4*u^2 - b^5*u^2 - a*u^4 + 2*b*u^4 + 2*a^2*b*u^4 - 2*a*b^2*u^4 - a^3*b^2*u^4 - 4*b^3*u^4 + 5*a*b^4*u^4 - 2*b^5*u^4 + 2*a*u^6 - 4*b*u^6 - 4*a^2*b*u^6 + 12*a*b^2*u^6 + 2*a^3*b^2*u^6 - 6*b^3*u^6 - 8*a^2*b^3*u^6 + 7*a*b^4*u^6 - b^5*u^6 + 3*a*u^8 - 4*b*u^8 - 6*a^2*b*u^8 + 10*a*b^2*u^8 + 3*a^3*b^2*u^8 - 2*b^3*u^8 - 6*a^2*b^3*u^8 + 2*a*b^4*u^8 + a*u^10 - b*u^10 - 2*a^2*b*u^10 + 2*a*b^2*u^10 + a^3*b^2*u^10 - a^2*b^3*u^10", "b + b^3 - b^5 - u + b*u^2 - 2*b^3*u^2 - a^2*b^3*u^2 + 4*a*b^4*u^2 - 3*b^5*u^2 - u^3 + a*u^4 - 2*a^2*b*u^4 + 6*a*b^2*u^4 + a^3*b^2*u^4 - 8*b^3*u^4 - 6*a^2*b^3*u^4 + 11*a*b^4*u^4 - 4*b^5*u^4 + 4*a*u^6 - 6*b*u^6 - 8*a^2*b*u^6 + 20*a*b^2*u^6 + 4*a^3*b^2*u^6 - 12*b^3*u^6 - 14*a^2*b^3*u^6 + 14*a*b^4*u^6 - 3*b^5*u^6 + 6*a*u^8 - 9*b*u^8 - 12*a^2*b*u^8 + 24*a*b^2*u^8 + 6*a^3*b^2*u^8 - 8*b^3*u^8 - 15*a^2*b^3*u^8 + 9*a*b^4*u^8 - b^5*u^8 + 4*a*u^10 - 5*b*u^10 - 8*a^2*b*u^10 + 12*a*b^2*u^10 + 4*a^3*b^2*u^10 - 2*b^3*u^10 - 7*a^2*b^3*u^10 + 2*a*b^4*u^10 + a*u^12 - b*u^12 - 2*a^2*b*u^12 + 2*a*b^2*u^12 + a^3*b^2*u^12 - a^2*b^3*u^12" ], "TimingForPrimaryIdeals":0.99677 }, "v":{ "CheckEq":[ "b + b^3 - b^5 - b^5*v^2", "1 - a + a*b - b^2 + b*v^2 - 2*b^3*v^2 + a*b^4*v^2 + b^5*v^2 - a*b^6*v^2", "-b + b^2 + b^5*v^2 - b^7*v^2", "a - 2*b + a*b^2 + b^3 - a*b^4 - v + 2*b^3*v^2 - a*b^4*v^2 - b^5*v^2 - b^5*v^4" ], "TimingForPrimaryIdeals":0.10249 }, "PrimaryIdeals":[ { "IdealName":"J10_98_0", "Generators":[ "9873021 + 9342488*b - 51948197*u + 129559937*u^2 - 198580863*u^3 + 224181920*u^4 - 210889829*u^5 + 168505060*u^6 - 110631994*u^7 + 67149760*u^8 - 35850402*u^9 + 15314376*u^10 - 4789953*u^11", "2924955 + 23356220*a - 132461546*u + 235840589*u^2 - 423679166*u^3 + 498715318*u^4 - 459419041*u^5 + 405951125*u^6 - 261904435*u^7 + 163643603*u^8 - 91696433*u^9 + 38491161*u^10 - 16446192*u^11", "5 - 20*u + 64*u^2 - 106*u^3 + 149*u^4 - 157*u^5 + 139*u^6 - 110*u^7 + 70*u^8 - 42*u^9 + 22*u^10 - 9*u^11 + 3*u^12" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":9.1984e-2, "TimingZeroDimVars":6.950100000000001e-2, "TimingmagmaVCompNormalize":7.0676e-2, "TimingNumberOfSols":0.180208, "TimingIsRadical":7.811e-3, "TimingArcColoring":5.1291e-2, "TimingObstruction":3.0196e-2, "TimingComplexVolumeN":1.0709147000000002e1, "TimingaCuspShapeN":6.754500000000001e-2, "TiminguValues":0.666303, "TiminguPolysN":2.0278e-2, "TiminguPolys":0.841334, "TimingaCuspShape":0.11911, "TimingRepresentationsN":0.119077, "TiminguValues_ij":0.200791, "TiminguPoly_ij":1.463186, "TiminguPolys_ij_N":3.0291000000000002e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":12, "IsRadical":true, "ArcColoring":[ [ "(-32338205 - 118995099*u + 307690751*u^2 - 541780449*u^3 + 641790512*u^4 - 649565819*u^5 + 530049220*u^6 - 340577310*u^7 + 222654472*u^8 - 112663862*u^9 + 54419664*u^10 - 14906103*u^11)\/93424880", "(-4318419 + 29836229*u - 58947619*u^2 + 113465959*u^3 - 132165684*u^4 + 129102503*u^5 - 112536106*u^6 + 74050252*u^7 - 46013626*u^8 + 26637968*u^9 - 11185302*u^10 + 4807941*u^11)\/9342488" ], [ "(117101205 - 229358991*u + 383145189*u^2 - 340345861*u^3 + 290681588*u^4 - 194112841*u^5 + 72303370*u^6 - 38789160*u^7 + 8265218*u^8 + 7428412*u^9 - 7089474*u^10 + 7924233*u^11)\/46712440", "(5403053 - 23083641*u + 50160345*u^2 - 99890347*u^3 + 124166264*u^4 - 116952957*u^5 + 107513880*u^6 - 68740510*u^7 + 43452684*u^8 - 24665790*u^9 + 10935756*u^10 - 4465557*u^11)\/9342488" ], [ "(38592465 - 59529498*u + 65978927*u^2 - 70960258*u^3 + 47040454*u^4 - 30825703*u^5 + 8540035*u^6 - 1578205*u^7 + 1298669*u^8 + 3488161*u^9 - 1734537*u^10 + 1600824*u^11)\/23356220", "(935583 - 13512587*u + 30644891*u^2 - 92530225*u^3 + 106006120*u^4 - 114260239*u^5 + 105458184*u^6 - 68706322*u^7 + 45863148*u^8 - 25123522*u^9 + 12772476*u^10 - 4902447*u^11)\/9342488" ], "{1, 0}", [ 1, "u^2" ], [ "(100782025 + 94993667*u + 20152997*u^2 + 184223577*u^3 - 263514536*u^4 + 213454967*u^5 - 250633280*u^6 + 160950290*u^7 - 103599276*u^8 + 64188386*u^9 - 26299692*u^10 + 16209159*u^11)\/93424880", "(-3102824 + 12677443*u - 23324238*u^2 + 37855245*u^3 - 35731302*u^4 + 34297582*u^5 - 24541977*u^6 + 14881197*u^7 - 9225543*u^8 + 4067827*u^9 - 1852785*u^10 + 130161*u^11)\/4671244" ], [ "(-2924955 + 132461546*u - 235840589*u^2 + 423679166*u^3 - 498715318*u^4 + 459419041*u^5 - 405951125*u^6 + 261904435*u^7 - 163643603*u^8 + 91696433*u^9 - 38491161*u^10 + 16446192*u^11)\/23356220", "(-9873021 + 51948197*u - 129559937*u^2 + 198580863*u^3 - 224181920*u^4 + 210889829*u^5 - 168505060*u^6 + 110631994*u^7 - 67149760*u^8 + 35850402*u^9 - 15314376*u^10 + 4789953*u^11)\/9342488" ], [ "(43515195 + 5182107*u + 176118507*u^2 - 145545983*u^3 + 123478964*u^4 - 135611063*u^5 + 30623050*u^6 - 29351100*u^7 + 8461594*u^8 + 4140856*u^9 - 410442*u^10 + 8942619*u^11)\/46712440", "(-9873021 + 51948197*u - 129559937*u^2 + 198580863*u^3 - 224181920*u^4 + 210889829*u^5 - 168505060*u^6 + 110631994*u^7 - 67149760*u^8 + 35850402*u^9 - 15314376*u^10 + 4789953*u^11)\/9342488" ], [ "u", "u + u^3" ], [ 0, "u" ] ], "Obstruction":-1, "ComplexVolumeN":[ "0.93953 - 1.28267*I", "0.93953 + 1.28267*I", "3.72744 - 0.65506*I", "3.72744 + 0.65506*I", "-10.5262 + 7.73722*I", "-10.5262 - 7.73722*I", "-1.38664 + 8.65525*I", "-1.38664 - 8.65525*I", "-7.0244 - 14.4129*I", "-7.0244 + 14.4129*I", "-0.534161 - 1.00859*I", "-0.534161 + 1.00859*I" ], "uPolysN":[ "5\/3 + (26*u)\/3 + 22*u^2 + 38*u^3 + (181*u^4)\/3 + (211*u^5)\/3 + (205*u^6)\/3 + 56*u^7 + 36*u^8 + 20*u^9 + (28*u^10)\/3 + 3*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "5\/3 + (20*u)\/3 + (64*u^2)\/3 + (106*u^3)\/3 + (149*u^4)\/3 + (157*u^5)\/3 + (139*u^6)\/3 + (110*u^7)\/3 + (70*u^8)\/3 + 14*u^9 + (22*u^10)\/3 + 3*u^11 + u^12", "3\/2 + 6*u + (19*u^2)\/2 + 6*u^3 + 6*u^4 + (15*u^5)\/2 - (5*u^6)\/2 - (13*u^7)\/2 + (9*u^8)\/2 + (9*u^9)\/2 - u^10\/2 - 2*u^11 + u^12", "5\/3 + (26*u)\/3 + 22*u^2 + 38*u^3 + (181*u^4)\/3 + (211*u^5)\/3 + (205*u^6)\/3 + 56*u^7 + 36*u^8 + 20*u^9 + (28*u^10)\/3 + 3*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "5\/3 + (20*u)\/3 + (64*u^2)\/3 + (106*u^3)\/3 + (149*u^4)\/3 + (157*u^5)\/3 + (139*u^6)\/3 + (110*u^7)\/3 + (70*u^8)\/3 + 14*u^9 + (22*u^10)\/3 + 3*u^11 + u^12", "3\/2 + 6*u + (19*u^2)\/2 + 6*u^3 + 6*u^4 + (15*u^5)\/2 - (5*u^6)\/2 - (13*u^7)\/2 + (9*u^8)\/2 + (9*u^9)\/2 - u^10\/2 - 2*u^11 + u^12" ], "uPolys":[ "3*(5 + 26*u + 66*u^2 + 114*u^3 + 181*u^4 + 211*u^5 + 205*u^6 + 168*u^7 + 108*u^8 + 60*u^9 + 28*u^10 + 9*u^11 + 3*u^12)", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "3*(5 + 20*u + 64*u^2 + 106*u^3 + 149*u^4 + 157*u^5 + 139*u^6 + 110*u^7 + 70*u^8 + 42*u^9 + 22*u^10 + 9*u^11 + 3*u^12)", "2*(3 + 12*u + 19*u^2 + 12*u^3 + 12*u^4 + 15*u^5 - 5*u^6 - 13*u^7 + 9*u^8 + 9*u^9 - u^10 - 4*u^11 + 2*u^12)", "3*(5 + 26*u + 66*u^2 + 114*u^3 + 181*u^4 + 211*u^5 + 205*u^6 + 168*u^7 + 108*u^8 + 60*u^9 + 28*u^10 + 9*u^11 + 3*u^12)", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "3*(5 + 20*u + 64*u^2 + 106*u^3 + 149*u^4 + 157*u^5 + 139*u^6 + 110*u^7 + 70*u^8 + 42*u^9 + 22*u^10 + 9*u^11 + 3*u^12)", "2*(3 + 12*u + 19*u^2 + 12*u^3 + 12*u^4 + 15*u^5 - 5*u^6 - 13*u^7 + 9*u^8 + 9*u^9 - u^10 - 4*u^11 + 2*u^12)" ], "aCuspShape":"-6 + (-21318123 + 80416785*u - 115199883*u^2 + 171140219*u^3 - 181063236*u^4 + 153945863*u^5 - 133792278*u^6 + 83266848*u^7 - 50516950*u^8 + 27097068*u^9 - 11352594*u^10 + 4958289*u^11)\/2335622", "RepresentationsN":[ [ "u->0.294163 + 0.893263 I", "a->-0.392558 + 0.428484 I", "b->0.312276 - 1.3748 I" ], [ "u->0.294163 - 0.893263 I", "a->-0.392558 - 0.428484 I", "b->0.312276 + 1.3748 I" ], [ "u->-0.13231 + 1.14986 I", "a->-0.019852 + 0.332765 I", "b->-0.43581 - 0.817904 I" ], [ "u->-0.13231 - 1.14986 I", "a->-0.019852 - 0.332765 I", "b->-0.43581 + 0.817904 I" ], [ "u->1.25833 + 0.213822 I", "a->-1.45041 + 0.16116 I", "b->-1.32511 + 0.371579 I" ], [ "u->1.25833 - 0.213822 I", "a->-1.45041 - 0.16116 I", "b->-1.32511 - 0.371579 I" ], [ "u->-0.77981 + 1.24219 I", "a->-1.28771 - 0.68411 I", "b->-1.17089 + 0.448059 I" ], [ "u->-0.77981 - 1.24219 I", "a->-1.28771 + 0.68411 I", "b->-1.17089 - 0.448059 I" ], [ "u->0.66776 + 1.32565 I", "a->1.16439 - 0.95583 I", "b->1.36378 + 0.57208 I" ], [ "u->0.66776 - 1.32565 I", "a->1.16439 + 0.95583 I", "b->1.36378 - 0.57208 I" ], [ "u->0.191864 + 0.381263 I", "a->0.986139 + 0.917994 I", "b->0.255755 + 0.338417 I" ], [ "u->0.191864 - 0.381263 I", "a->0.986139 - 0.917994 I", "b->0.255755 - 0.338417 I" ] ], "Epsilon":0.915998, "uPolys_ij":[ "3*(5 + 20*u + 64*u^2 + 106*u^3 + 149*u^4 + 157*u^5 + 139*u^6 + 110*u^7 + 70*u^8 + 42*u^9 + 22*u^10 + 9*u^11 + 3*u^12)", "9*(25 - 240*u + 1346*u^2 - 2946*u^3 + 3009*u^4 - 953*u^5 - 777*u^6 + 796*u^7 - 156*u^8 - 170*u^9 + 148*u^10 - 51*u^11 + 9*u^12)", "27*(200 + 540*u + 1650*u^2 + 1417*u^3 + 2117*u^4 + 4697*u^5 + 18426*u^6 + 6500*u^7 - 2789*u^8 - 1785*u^9 + 31*u^10 + 162*u^11 + 27*u^12)", "2*(3 + 6*u + 31*u^2 - 26*u^3 + 192*u^4 - 119*u^5 + 375*u^6 + 3*u^7 + 163*u^8 + u^9 + 27*u^10 + 2*u^12)", "2*(3 - 12*u + 61*u^2 - 104*u^3 + 196*u^4 - 53*u^5 - 161*u^6 + 37*u^7 + 81*u^8 - 13*u^9 - 17*u^10 + 2*u^12)", "216 + 540*u + 818*u^2 - 85*u^3 + 913*u^4 - 348*u^5 + 448*u^6 - 118*u^7 + 142*u^8 + 8*u^9 + 22*u^10 + 3*u^11 + u^12", "4 - 11*u + 121*u^2 + 36*u^3 + 21*u^4 + 101*u^5 + 127*u^6 + 29*u^7 - 24*u^8 - 13*u^9 + 4*u^10 + 4*u^11 + u^12", "6*(31 - 130*u + 381*u^2 - 964*u^3 + 1950*u^4 - 2851*u^5 + 2911*u^6 - 2063*u^7 + 1043*u^8 - 407*u^9 + 137*u^10 - 24*u^11 + 6*u^12)", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "3*(5 + 26*u + 66*u^2 + 114*u^3 + 181*u^4 + 211*u^5 + 205*u^6 + 168*u^7 + 108*u^8 + 60*u^9 + 28*u^10 + 9*u^11 + 3*u^12)", "27*(4096 - 30208*u + 129536*u^2 - 340352*u^3 + 571968*u^4 - 642848*u^5 + 498752*u^6 - 271952*u^7 + 104620*u^8 - 27998*u^9 + 4999*u^10 - 540*u^11 + 27*u^12)", "6*(7 - 62*u + 229*u^2 - 468*u^3 + 566*u^4 - 285*u^5 - 233*u^6 + 307*u^7 + 127*u^8 - 113*u^9 - 43*u^10 + 12*u^11 + 6*u^12)", "18*(307 + 716*u + 511*u^2 - 248*u^3 + 556*u^4 + 1783*u^5 + 4125*u^6 + 3535*u^7 + 2063*u^8 + 583*u^9 + 287*u^10 + 48*u^11 + 18*u^12)", "12*(2 - 41*u + 327*u^2 + 72*u^3 + 832*u^4 + 110*u^5 - 1386*u^6 - 512*u^7 + 826*u^8 + 419*u^9 - 101*u^10 - 48*u^11 + 12*u^12)", "2*(3 + 12*u + 19*u^2 + 12*u^3 + 12*u^4 + 15*u^5 - 5*u^6 - 13*u^7 + 9*u^8 + 9*u^9 - u^10 - 4*u^11 + 2*u^12)", "18*(59 - 334*u + 1533*u^2 - 4254*u^3 + 8922*u^4 - 12857*u^5 + 11893*u^6 - 4883*u^7 - 671*u^8 + 1099*u^9 - 121*u^10 - 84*u^11 + 18*u^12)", "4*(9 + 30*u + 145*u^2 + 78*u^3 - 40*u^4 - 87*u^5 + 485*u^6 + 381*u^7 + 493*u^8 + 223*u^9 + 109*u^10 + 20*u^11 + 4*u^12)", "9*(25 - 16*u + 238*u^2 + 1974*u^3 + 4057*u^4 + 2801*u^5 - 197*u^6 - 784*u^7 + 272*u^8 + 654*u^9 + 352*u^10 + 87*u^11 + 9*u^12)" ], "GeometricComponent":"{9, 10}", "uPolys_ij_N":[ "5\/3 + (20*u)\/3 + (64*u^2)\/3 + (106*u^3)\/3 + (149*u^4)\/3 + (157*u^5)\/3 + (139*u^6)\/3 + (110*u^7)\/3 + (70*u^8)\/3 + 14*u^9 + (22*u^10)\/3 + 3*u^11 + u^12", "25\/9 - (80*u)\/3 + (1346*u^2)\/9 - (982*u^3)\/3 + (1003*u^4)\/3 - (953*u^5)\/9 - (259*u^6)\/3 + (796*u^7)\/9 - (52*u^8)\/3 - (170*u^9)\/9 + (148*u^10)\/9 - (17*u^11)\/3 + u^12", "200\/27 + 20*u + (550*u^2)\/9 + (1417*u^3)\/27 + (2117*u^4)\/27 + (4697*u^5)\/27 + (6142*u^6)\/9 + (6500*u^7)\/27 - (2789*u^8)\/27 - (595*u^9)\/9 + (31*u^10)\/27 + 6*u^11 + u^12", "3\/2 + 3*u + (31*u^2)\/2 - 13*u^3 + 96*u^4 - (119*u^5)\/2 + (375*u^6)\/2 + (3*u^7)\/2 + (163*u^8)\/2 + u^9\/2 + (27*u^10)\/2 + u^12", "3\/2 - 6*u + (61*u^2)\/2 - 52*u^3 + 98*u^4 - (53*u^5)\/2 - (161*u^6)\/2 + (37*u^7)\/2 + (81*u^8)\/2 - (13*u^9)\/2 - (17*u^10)\/2 + u^12", "216 + 540*u + 818*u^2 - 85*u^3 + 913*u^4 - 348*u^5 + 448*u^6 - 118*u^7 + 142*u^8 + 8*u^9 + 22*u^10 + 3*u^11 + u^12", "4 - 11*u + 121*u^2 + 36*u^3 + 21*u^4 + 101*u^5 + 127*u^6 + 29*u^7 - 24*u^8 - 13*u^9 + 4*u^10 + 4*u^11 + u^12", "31\/6 - (65*u)\/3 + (127*u^2)\/2 - (482*u^3)\/3 + 325*u^4 - (2851*u^5)\/6 + (2911*u^6)\/6 - (2063*u^7)\/6 + (1043*u^8)\/6 - (407*u^9)\/6 + (137*u^10)\/6 - 4*u^11 + u^12", "2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12", "5\/3 + (26*u)\/3 + 22*u^2 + 38*u^3 + (181*u^4)\/3 + (211*u^5)\/3 + (205*u^6)\/3 + 56*u^7 + 36*u^8 + 20*u^9 + (28*u^10)\/3 + 3*u^11 + u^12", "4096\/27 - (30208*u)\/27 + (129536*u^2)\/27 - (340352*u^3)\/27 + 21184*u^4 - (642848*u^5)\/27 + (498752*u^6)\/27 - (271952*u^7)\/27 + (104620*u^8)\/27 - (27998*u^9)\/27 + (4999*u^10)\/27 - 20*u^11 + u^12", "7\/6 - (31*u)\/3 + (229*u^2)\/6 - 78*u^3 + (283*u^4)\/3 - (95*u^5)\/2 - (233*u^6)\/6 + (307*u^7)\/6 + (127*u^8)\/6 - (113*u^9)\/6 - (43*u^10)\/6 + 2*u^11 + u^12", "307\/18 + (358*u)\/9 + (511*u^2)\/18 - (124*u^3)\/9 + (278*u^4)\/9 + (1783*u^5)\/18 + (1375*u^6)\/6 + (3535*u^7)\/18 + (2063*u^8)\/18 + (583*u^9)\/18 + (287*u^10)\/18 + (8*u^11)\/3 + u^12", "1\/6 - (41*u)\/12 + (109*u^2)\/4 + 6*u^3 + (208*u^4)\/3 + (55*u^5)\/6 - (231*u^6)\/2 - (128*u^7)\/3 + (413*u^8)\/6 + (419*u^9)\/12 - (101*u^10)\/12 - 4*u^11 + u^12", "3\/2 + 6*u + (19*u^2)\/2 + 6*u^3 + 6*u^4 + (15*u^5)\/2 - (5*u^6)\/2 - (13*u^7)\/2 + (9*u^8)\/2 + (9*u^9)\/2 - u^10\/2 - 2*u^11 + u^12", "59\/18 - (167*u)\/9 + (511*u^2)\/6 - (709*u^3)\/3 + (1487*u^4)\/3 - (12857*u^5)\/18 + (11893*u^6)\/18 - (4883*u^7)\/18 - (671*u^8)\/18 + (1099*u^9)\/18 - (121*u^10)\/18 - (14*u^11)\/3 + u^12", "9\/4 + (15*u)\/2 + (145*u^2)\/4 + (39*u^3)\/2 - 10*u^4 - (87*u^5)\/4 + (485*u^6)\/4 + (381*u^7)\/4 + (493*u^8)\/4 + (223*u^9)\/4 + (109*u^10)\/4 + 5*u^11 + u^12", "25\/9 - (16*u)\/9 + (238*u^2)\/9 + (658*u^3)\/3 + (4057*u^4)\/9 + (2801*u^5)\/9 - (197*u^6)\/9 - (784*u^7)\/9 + (272*u^8)\/9 + (218*u^9)\/3 + (352*u^10)\/9 + (29*u^11)\/3 + u^12" ], "Multiplicity":1, "MinRepresentationVolume":[ "{3, 4}", 0.65506 ], "ij_list":[ [ "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{4, 5}", "{9, 10}" ], [ "{2, 7}", "{4, 9}" ], [ "{1, 8}", "{3, 6}" ], [ "{3, 5}", "{8, 10}" ], [ "{3, 8}" ], [ "{2, 3}", "{3, 4}", "{7, 8}", "{8, 9}" ], [ "{1, 4}", "{6, 9}" ], [ "{2, 8}", "{2, 9}", "{3, 7}", "{3, 9}", "{4, 7}", "{4, 8}" ], [ "{1, 6}", "{1, 7}", "{2, 6}" ], [ "{2, 4}", "{7, 9}" ], [ "{2, 5}", "{7, 10}" ], [ "{2, 10}", "{5, 7}" ], [ "{1, 5}", "{6, 10}" ], [ "{1, 3}", "{3, 10}", "{5, 8}", "{6, 8}" ], [ "{1, 9}", "{4, 6}" ], [ "{1, 10}", "{5, 6}" ], [ "{1, 2}", "{6, 7}" ] ], "SortedReprnIndices":"{10, 9, 7, 8, 5, 6, 2, 1, 12, 11, 4, 3}", "aCuspShapeN":[ "-9.9715900481716437915`5.09292332655381 + 5.4953960362019661744`4.834157907209821*I", "-9.9715900481716437915`5.09292332655381 - 5.4953960362019661744`4.834157907209821*I", "0.9653912688165936355`4.728624494909784 + 2.3605354529733018578`5.116931655753648*I", "0.9653912688165936355`4.728624494909784 - 2.3605354529733018578`5.116931655753648*I", "-13.2704711246485198423`5.119963542726062 - 5.1579833092818111424`4.7095571338542985*I", "-13.2704711246485198423`5.119963542726062 + 5.1579833092818111424`4.7095571338542985*I", "-8.0535965748801959701`5.007962609714743 - 7.7582097732959543815`4.9917342570715615*I", "-8.0535965748801959701`5.007962609714743 + 7.7582097732959543815`4.9917342570715615*I", "-10.0118400117923132078`5.047075176623531 + 7.820774526293942482`4.939811040929971*I", "-10.0118400117923132078`5.047075176623531 - 7.820774526293942482`4.939811040929971*I", "-7.6578935093239208637`5.026701485132985 + 6.7136164583887115769`4.969548689227853*I", "-7.6578935093239208637`5.026701485132985 - 6.7136164583887115769`4.969548689227853*I" ], "Abelian":false }, { "IdealName":"J10_98_1", "Generators":[ "-2 - a + b - 3*u - 4*u^2 - a*u^2 - 4*u^3 - 5*u^4 - 5*u^5 - 3*u^6 - 3*u^7 - u^8 - u^9", "-7 + 6*a + 2*a^2 - 15*u + 12*a*u - 8*u^2 + 16*a*u^2 - 16*u^3 + 12*a*u^3 - 24*u^4 + 20*a*u^4 - 17*u^5 + 22*a*u^5 - 18*u^6 + 12*a*u^6 - 9*u^7 + 14*a*u^7 - 8*u^8 + 4*a*u^8 - 3*u^9 + 6*a*u^9", "1 + 2*u + 3*u^2 + 4*u^3 + 4*u^4 + 5*u^5 + 5*u^6 + 3*u^7 + 3*u^8 + u^9 + u^10" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":9.280900000000003e-2, "TimingZeroDimVars":7.7966e-2, "TimingmagmaVCompNormalize":7.9356e-2, "TimingNumberOfSols":0.266719, "TimingIsRadical":1.5635e-2, "TimingArcColoring":5.0187999999999997e-2, "TimingObstruction":5.1254e-2, "TimingComplexVolumeN":1.7704701e1, "TimingaCuspShapeN":0.111879, "TiminguValues":0.682616, "TiminguPolysN":2.6836000000000002e-2, "TiminguPolys":1.026448, "TimingaCuspShape":0.151977, "TimingRepresentationsN":0.169804, "TiminguValues_ij":0.215902, "TiminguPolys_ij_N":7.7755e-2 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":20, "IsRadical":true, "ArcColoring":[ [ "(5 - 4*a + 3*u - 6*a*u + 2*u^2 - 4*a*u^2 + 6*u^3 - 8*a*u^3 + 6*u^4 - 6*a*u^4 + u^5 - 10*a*u^5 + 4*u^6 - 4*a*u^6 - u^7 - 6*a*u^7 + 2*u^8 - 2*a*u^8 - u^9 - 2*a*u^9)\/2", "-1 - 2*a - 2*u - 2*a*u - 4*u^2 - 4*a*u^2 - 3*u^3 - 4*a*u^3 - 5*u^4 - 3*a*u^4 - 7*u^5 - 5*a*u^5 - 3*u^6 - a*u^6 - 5*u^7 - 3*a*u^7 - u^8 - 2*u^9 - a*u^9" ], [ "-1 + 2*a - u + 3*a*u + 2*u^2 + 4*a*u^2 - u^3 + 4*a*u^3 - u^4 + 5*a*u^4 + 2*u^5 + 5*a*u^5 - u^6 + 3*a*u^6 + 2*u^7 + 3*a*u^7 - u^8 + a*u^8 + u^9 + a*u^9", -1 ], [ "2*a - u + 2*a*u + 3*u^2 + 4*a*u^2 - u^3 + 3*a*u^3 + 5*a*u^4 + 2*u^5 + 5*a*u^5 - u^6 + 3*a*u^6 + 2*u^7 + 3*a*u^7 - u^8 + a*u^8 + u^9 + a*u^9", "-(a*u) + 2*u^2 - 2*a*u^3 + 2*u^4 - a*u^5 + u^6" ], "{1, 0}", [ 1, "u^2" ], [ "(1 - 2*a + 3*u - 4*a*u - 8*a*u^2 - 6*a*u^3 + 4*u^4 - 10*a*u^4 - 3*u^5 - 14*a*u^5 + 4*u^6 - 6*a*u^6 - 3*u^7 - 10*a*u^7 + 2*u^8 - 2*a*u^8 - u^9 - 4*a*u^9)\/2", "2 + 3*u + 2*u^2 + 4*u^3 + 2*a*u^3 + 3*u^4 + 5*u^5 + 2*a*u^5 + 2*u^6 + 3*u^7 + a*u^7 + u^8 + u^9" ], [ "a", "2 + a + 3*u + 4*u^2 + a*u^2 + 4*u^3 + 5*u^4 + 5*u^5 + 3*u^6 + 3*u^7 + u^8 + u^9" ], [ "-2 - 3*u - 4*u^2 - a*u^2 - 4*u^3 - 5*u^4 - 5*u^5 - 3*u^6 - 3*u^7 - u^8 - u^9", "2 + a + 3*u + 4*u^2 + a*u^2 + 4*u^3 + 5*u^4 + 5*u^5 + 3*u^6 + 3*u^7 + u^8 + u^9" ], [ "u", "u + u^3" ], [ 0, "u" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-8.22706 - 2.31006*I", "-8.22706 - 2.31006*I", "-8.22706 + 2.31006*I", "-8.22706 + 2.31006*I", "-2.84181 + 1.23169*I", "-2.84181 + 1.23169*I", "-2.84181 - 1.23169*I", "-2.84181 - 1.23169*I", "-5.70347 - 3.47839*I", "-5.70347 - 3.47839*I", "-5.70347 + 3.47839*I", "-5.70347 + 3.47839*I", "1.58679 - 4.14585*I", "1.58679 - 4.14585*I", "1.58679 + 4.14585*I", "1.58679 + 4.14585*I", "-2.90872 + 8.28632*I", "-2.90872 + 8.28632*I", "-2.90872 - 8.28632*I", "-2.90872 - 8.28632*I" ], "uPolysN":[ "1 + 2*u^2 - 12*u^3 + 13*u^4 - 30*u^5 + 66*u^6 - 100*u^7 + 172*u^8 - 228*u^9 + 261*u^10 - 284*u^11 + 245*u^12 - 204*u^13 + 145*u^14 - 86*u^15 + 53*u^16 - 20*u^17 + 11*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "1 - 4*u + 10*u^2 - 20*u^3 + 33*u^4 - 50*u^5 + 70*u^6 - 88*u^7 + 104*u^8 - 112*u^9 + 113*u^10 - 108*u^11 + 93*u^12 - 76*u^13 + 57*u^14 - 38*u^15 + 25*u^16 - 12*u^17 + 7*u^18 - 2*u^19 + u^20", "121\/2 - 259*u + (875*u^2)\/2 - 346*u^3 + 195*u^4 - 270*u^5 + 256*u^6 - 17*u^7 - 4*u^8 - 135*u^9 + (83*u^10)\/2 + 66*u^11 + 13*u^12 - 33*u^13 - (53*u^14)\/2 + 11*u^15 + 17*u^16 - u^17 - (13*u^18)\/2 + u^20", "1 + 2*u^2 - 12*u^3 + 13*u^4 - 30*u^5 + 66*u^6 - 100*u^7 + 172*u^8 - 228*u^9 + 261*u^10 - 284*u^11 + 245*u^12 - 204*u^13 + 145*u^14 - 86*u^15 + 53*u^16 - 20*u^17 + 11*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "1 - 4*u + 10*u^2 - 20*u^3 + 33*u^4 - 50*u^5 + 70*u^6 - 88*u^7 + 104*u^8 - 112*u^9 + 113*u^10 - 108*u^11 + 93*u^12 - 76*u^13 + 57*u^14 - 38*u^15 + 25*u^16 - 12*u^17 + 7*u^18 - 2*u^19 + u^20", "121\/2 - 259*u + (875*u^2)\/2 - 346*u^3 + 195*u^4 - 270*u^5 + 256*u^6 - 17*u^7 - 4*u^8 - 135*u^9 + (83*u^10)\/2 + 66*u^11 + 13*u^12 - 33*u^13 - (53*u^14)\/2 + 11*u^15 + 17*u^16 - u^17 - (13*u^18)\/2 + u^20" ], "uPolys":[ "(1 + u^2 - 6*u^3 + 6*u^4 - 9*u^5 + 9*u^6 - 5*u^7 + 5*u^8 - u^9 + u^10)^2", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "(1 - 2*u + 3*u^2 - 4*u^3 + 4*u^4 - 5*u^5 + 5*u^6 - 3*u^7 + 3*u^8 - u^9 + u^10)^2", "2*(121 - 518*u + 875*u^2 - 692*u^3 + 390*u^4 - 540*u^5 + 512*u^6 - 34*u^7 - 8*u^8 - 270*u^9 + 83*u^10 + 132*u^11 + 26*u^12 - 66*u^13 - 53*u^14 + 22*u^15 + 34*u^16 - 2*u^17 - 13*u^18 + 2*u^20)", "(1 + u^2 - 6*u^3 + 6*u^4 - 9*u^5 + 9*u^6 - 5*u^7 + 5*u^8 - u^9 + u^10)^2", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "(1 - 2*u + 3*u^2 - 4*u^3 + 4*u^4 - 5*u^5 + 5*u^6 - 3*u^7 + 3*u^8 - u^9 + u^10)^2", "2*(121 - 518*u + 875*u^2 - 692*u^3 + 390*u^4 - 540*u^5 + 512*u^6 - 34*u^7 - 8*u^8 - 270*u^9 + 83*u^10 + 132*u^11 + 26*u^12 - 66*u^13 - 53*u^14 + 22*u^15 + 34*u^16 - 2*u^17 - 13*u^18 + 2*u^20)" ], "aCuspShape":"-6 - 4*(1 + u + u^2 + 3*u^4 + 2*u^5 + 2*u^6 + 2*u^7 + u^8 + u^9)", "RepresentationsN":[ [ "u->0.584958 + 0.771492 I", "a->-0.759755 + 0.346084 I", "b->-1.50393 + 0.39581 I" ], [ "u->0.584958 + 0.771492 I", "a->0.94152 - 1.29105 I", "b->1.24454 + 0.70845 I" ], [ "u->0.584958 - 0.771492 I", "a->-0.759755 - 0.346084 I", "b->-1.50393 - 0.39581 I" ], [ "u->0.584958 - 0.771492 I", "a->0.94152 + 1.29105 I", "b->1.24454 - 0.70845 I" ], [ "u->-0.248527 + 0.782547 I", "a->2.10247 - 0.40028 I", "b->1.15778 + 0.163121 I" ], [ "u->-0.248527 + 0.782547 I", "a->-0.7326 - 2.58251 I", "b->-0.965077 + 0.285214 I" ], [ "u->-0.248527 - 0.782547 I", "a->2.10247 + 0.40028 I", "b->1.15778 - 0.163121 I" ], [ "u->-0.248527 - 0.782547 I", "a->-0.7326 + 2.58251 I", "b->-0.965077 - 0.285214 I" ], [ "u->-0.761643 + 0.208049 I", "a->-0.670419 + 0.201639 I", "b->0.25538 + 0.856092 I" ], [ "u->-0.761643 + 0.208049 I", "a->-1.53048 - 0.72472 I", "b->-1.35995 - 0.29498 I" ], [ "u->-0.761643 - 0.208049 I", "a->-0.670419 - 0.201639 I", "b->0.25538 - 0.856092 I" ], [ "u->-0.761643 - 0.208049 I", "a->-1.53048 + 0.72472 I", "b->-1.35995 + 0.29498 I" ], [ "u->0.449566 + 1.16479 I", "a->-1.03264 + 0.92392 I", "b->-1.09636 - 0.477116 I" ], [ "u->0.449566 + 1.16479 I", "a->0.006128 - 0.0919696 I", "b->-0.193027 + 0.767853 I" ], [ "u->0.449566 - 1.16479 I", "a->-1.03264 - 0.92392 I", "b->-1.09636 + 0.477116 I" ], [ "u->0.449566 - 1.16479 I", "a->0.006128 + 0.0919696 I", "b->-0.193027 - 0.767853 I" ], [ "u->-0.524355 + 1.16341 I", "a->1.0405 + 0.946543 I", "b->1.3951 - 0.62944 I" ], [ "u->-0.524355 + 1.16341 I", "a->-0.364738 - 0.233686 I", "b->0.065535 + 1.17779 I" ], [ "u->-0.524355 - 1.16341 I", "a->1.0405 - 0.946543 I", "b->1.3951 + 0.62944 I" ], [ "u->-0.524355 - 1.16341 I", "a->-0.364738 + 0.233686 I", "b->0.065535 - 1.17779 I" ] ], "Epsilon":1.15804, "uPolys_ij_N":[ "1 + 20*u + 190*u^2 + 1140*u^3 + 4845*u^4 + 15504*u^5 + 38760*u^6 + 77520*u^7 + 125970*u^8 + 167960*u^9 + 184756*u^10 + 167960*u^11 + 125970*u^12 + 77520*u^13 + 38760*u^14 + 15504*u^15 + 4845*u^16 + 1140*u^17 + 190*u^18 + 20*u^19 + u^20", "1 - 4*u + 10*u^2 - 20*u^3 + 33*u^4 - 50*u^5 + 70*u^6 - 88*u^7 + 104*u^8 - 112*u^9 + 113*u^10 - 108*u^11 + 93*u^12 - 76*u^13 + 57*u^14 - 38*u^15 + 25*u^16 - 12*u^17 + 7*u^18 - 2*u^19 + u^20", "1\/2 + 11*u + (175*u^2)\/2 + 285*u^3 + 355*u^4 - 189*u^5 - 803*u^6 + 4*u^7 + 1523*u^8 + 1086*u^9 - (967*u^10)\/2 - 540*u^11 + 102*u^12 + 107*u^13 + (31*u^14)\/2 + 48*u^15 + 5*u^16 - 21*u^17 - (5*u^18)\/2 + 4*u^19 + u^20", "1 - 4*u + 6*u^2 - 7*u^4 - 10*u^5 + 66*u^6 - 120*u^7 + 108*u^8 - 32*u^9 + 21*u^10 - 200*u^11 + 537*u^12 - 824*u^13 + 873*u^14 - 678*u^15 + 393*u^16 - 168*u^17 + 51*u^18 - 10*u^19 + u^20", "4 - 4*u + 21*u^2 - 62*u^3 + 99*u^4 - 170*u^5 + 285*u^6 - 326*u^7 + 204*u^8 + 26*u^9 - 188*u^10 + 148*u^11 + 7*u^12 - 96*u^13 + 71*u^14 - 6*u^15 - 25*u^16 + 14*u^17 + 2*u^18 - 4*u^19 + u^20", "109\/2 + 558*u + (5825*u^2)\/2 + 9563*u^3 + 21493*u^4 + 34362*u^5 + 39245*u^6 + 30654*u^7 + 13586*u^8 - 237*u^9 - (7505*u^10)\/2 - 380*u^11 + 2351*u^12 + 1847*u^13 + (831*u^14)\/2 - 120*u^15 - 30*u^16 + 57*u^17 + (77*u^18)\/2 + 10*u^19 + u^20", "961 + 388*u - 3268*u^2 - 1782*u^3 + 7676*u^4 + 8546*u^5 - 5255*u^6 - 12180*u^7 + 228*u^8 + 13930*u^9 + 11463*u^10 - 298*u^11 - 6682*u^12 - 4940*u^13 - 1082*u^14 + 766*u^15 + 781*u^16 + 346*u^17 + 91*u^18 + 14*u^19 + u^20", "961 + 388*u - 3268*u^2 - 1782*u^3 + 7676*u^4 + 8546*u^5 - 5255*u^6 - 12180*u^7 + 228*u^8 + 13930*u^9 + 11463*u^10 - 298*u^11 - 6682*u^12 - 4940*u^13 - 1082*u^14 + 766*u^15 + 781*u^16 + 346*u^17 + 91*u^18 + 14*u^19 + u^20", "41\/2 - 55*u + (651*u^2)\/2 - 921*u^3 + 1543*u^4 - 1552*u^5 + 636*u^6 + 1040*u^7 - 2055*u^8 + 1180*u^9 + (1295*u^10)\/2 - 1306*u^11 + 345*u^12 + 509*u^13 - (587*u^14)\/2 - 94*u^15 + 91*u^16 + 7*u^17 - (29*u^18)\/2 + u^20", "1 + 2*u^2 - 12*u^3 + 13*u^4 - 30*u^5 + 66*u^6 - 100*u^7 + 172*u^8 - 228*u^9 + 261*u^10 - 284*u^11 + 245*u^12 - 204*u^13 + 145*u^14 - 86*u^15 + 53*u^16 - 20*u^17 + 11*u^18 - 2*u^19 + u^20", "14641\/4 + (28287*u)\/2 + (143093*u^2)\/4 + 57975*u^3 + 65895*u^4 + (106465*u^5)\/2 + (66899*u^6)\/2 + (44611*u^7)\/2 + (38231*u^8)\/2 + (33259*u^9)\/2 + (44239*u^10)\/4 + 5097*u^11 + (4375*u^12)\/2 + 1525*u^13 + (5819*u^14)\/4 + 1174*u^15 + (1363*u^16)\/2 + 275*u^17 + (305*u^18)\/4 + 13*u^19 + u^20", "3844 - 10540*u + 31157*u^2 - 31322*u^3 + 54057*u^4 - 16000*u^5 + 62340*u^6 + 8712*u^7 + 54780*u^8 + 22952*u^9 + 35142*u^10 + 17156*u^11 + 15678*u^12 + 7264*u^13 + 4436*u^14 + 1608*u^15 + 664*u^16 + 164*u^17 + 45*u^18 + 6*u^19 + u^20", "1 + 4*u + 30*u^2 + 40*u^3 + 57*u^4 - 374*u^5 - 1110*u^6 + 264*u^7 + 3556*u^8 + 3040*u^9 - 2979*u^10 - 7072*u^11 - 3783*u^12 + 2648*u^13 + 5721*u^14 + 4590*u^15 + 2233*u^16 + 712*u^17 + 147*u^18 + 18*u^19 + u^20", "1\/2 + 11*u + (175*u^2)\/2 + 285*u^3 + 355*u^4 - 189*u^5 - 803*u^6 + 4*u^7 + 1523*u^8 + 1086*u^9 - (967*u^10)\/2 - 540*u^11 + 102*u^12 + 107*u^13 + (31*u^14)\/2 + 48*u^15 + 5*u^16 - 21*u^17 - (5*u^18)\/2 + 4*u^19 + u^20", "109\/2 + 558*u + (5825*u^2)\/2 + 9563*u^3 + 21493*u^4 + 34362*u^5 + 39245*u^6 + 30654*u^7 + 13586*u^8 - 237*u^9 - (7505*u^10)\/2 - 380*u^11 + 2351*u^12 + 1847*u^13 + (831*u^14)\/2 - 120*u^15 - 30*u^16 + 57*u^17 + (77*u^18)\/2 + 10*u^19 + u^20", "11\/2 - 3*u + (89*u^2)\/2 - 3*u^3 + 189*u^4 + 30*u^5 + 604*u^6 + 168*u^7 + 933*u^8 + 300*u^9 + (2361*u^10)\/2 - 152*u^11 + 485*u^12 + 111*u^13 + (99*u^14)\/2 + 42*u^15 + 35*u^16 + 9*u^17 + u^18\/2 + 2*u^19 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "121\/2 - 259*u + (875*u^2)\/2 - 346*u^3 + 195*u^4 - 270*u^5 + 256*u^6 - 17*u^7 - 4*u^8 - 135*u^9 + (83*u^10)\/2 + 66*u^11 + 13*u^12 - 33*u^13 - (53*u^14)\/2 + 11*u^15 + 17*u^16 - u^17 - (13*u^18)\/2 + u^20", "41\/2 - 55*u + (651*u^2)\/2 - 921*u^3 + 1543*u^4 - 1552*u^5 + 636*u^6 + 1040*u^7 - 2055*u^8 + 1180*u^9 + (1295*u^10)\/2 - 1306*u^11 + 345*u^12 + 509*u^13 - (587*u^14)\/2 - 94*u^15 + 91*u^16 + 7*u^17 - (29*u^18)\/2 + u^20", "31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20", "14641\/4 + (28287*u)\/2 + (143093*u^2)\/4 + 57975*u^3 + 65895*u^4 + (106465*u^5)\/2 + (66899*u^6)\/2 + (44611*u^7)\/2 + (38231*u^8)\/2 + (33259*u^9)\/2 + (44239*u^10)\/4 + 5097*u^11 + (4375*u^12)\/2 + 1525*u^13 + (5819*u^14)\/4 + 1174*u^15 + (1363*u^16)\/2 + 275*u^17 + (305*u^18)\/4 + 13*u^19 + u^20", "121\/2 - 259*u + (875*u^2)\/2 - 346*u^3 + 195*u^4 - 270*u^5 + 256*u^6 - 17*u^7 - 4*u^8 - 135*u^9 + (83*u^10)\/2 + 66*u^11 + 13*u^12 - 33*u^13 - (53*u^14)\/2 + 11*u^15 + 17*u^16 - u^17 - (13*u^18)\/2 + u^20", "11\/2 - 3*u + (89*u^2)\/2 - 3*u^3 + 189*u^4 + 30*u^5 + 604*u^6 + 168*u^7 + 933*u^8 + 300*u^9 + (2361*u^10)\/2 - 152*u^11 + 485*u^12 + 111*u^13 + (99*u^14)\/2 + 42*u^15 + 35*u^16 + 9*u^17 + u^18\/2 + 2*u^19 + u^20", "2699\/2 - 9148*u + (52703*u^2)\/2 - 40298*u^3 + 40009*u^4 - 31009*u^5 + 12782*u^6 + 33*u^7 - 4443*u^8 + 7495*u^9 - (2487*u^10)\/2 + 2996*u^11 + 1030*u^12 + 777*u^13 + (1287*u^14)\/2 + 183*u^15 + 165*u^16 + 29*u^17 + (41*u^18)\/2 + 2*u^19 + u^20", "1\/2 + 7*u + (141*u^2)\/2 + 451*u^3 + 2160*u^4 + 7610*u^5 + 19339*u^6 + 35844*u^7 + 49654*u^8 + 53062*u^9 + (90907*u^10)\/2 + 32444*u^11 + 19806*u^12 + 10316*u^13 + (9223*u^14)\/2 + 1799*u^15 + 588*u^16 + 163*u^17 + (77*u^18)\/2 + 6*u^19 + u^20", "128 + 832*u + 3136*u^2 - 13728*u^3 + 17632*u^4 - 11052*u^5 + 1484*u^6 + 2277*u^7 - 568*u^8 + (755*u^9)\/4 + (2239*u^10)\/4 - 181*u^11 - 630*u^12 - (619*u^13)\/2 - (11*u^14)\/2 + 140*u^15 + 127*u^16 + (267*u^17)\/4 + (95*u^18)\/4 + 6*u^19 + u^20", "128 + 832*u + 3136*u^2 - 13728*u^3 + 17632*u^4 - 11052*u^5 + 1484*u^6 + 2277*u^7 - 568*u^8 + (755*u^9)\/4 + (2239*u^10)\/4 - 181*u^11 - 630*u^12 - (619*u^13)\/2 - (11*u^14)\/2 + 140*u^15 + 127*u^16 + (267*u^17)\/4 + (95*u^18)\/4 + 6*u^19 + u^20", "1\/2 + 7*u + (141*u^2)\/2 + 451*u^3 + 2160*u^4 + 7610*u^5 + 19339*u^6 + 35844*u^7 + 49654*u^8 + 53062*u^9 + (90907*u^10)\/2 + 32444*u^11 + 19806*u^12 + 10316*u^13 + (9223*u^14)\/2 + 1799*u^15 + 588*u^16 + 163*u^17 + (77*u^18)\/2 + 6*u^19 + u^20", "2699\/2 - 9148*u + (52703*u^2)\/2 - 40298*u^3 + 40009*u^4 - 31009*u^5 + 12782*u^6 + 33*u^7 - 4443*u^8 + 7495*u^9 - (2487*u^10)\/2 + 2996*u^11 + 1030*u^12 + 777*u^13 + (1287*u^14)\/2 + 183*u^15 + 165*u^16 + 29*u^17 + (41*u^18)\/2 + 2*u^19 + u^20" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{5, 6, 7, 8}", 1.23169 ], "ij_list":[ [ "{2, 4}", "{7, 9}" ], [ "{4, 10}", "{5, 9}", "{5, 10}" ], [ "{7, 10}" ], [ "{4, 5}", "{9, 10}" ], [ "{2, 7}", "{4, 9}" ], [ "{8, 10}" ], [ "{2, 3}", "{8, 9}" ], [ "{3, 4}", "{7, 8}" ], [ "{1, 9}" ], [ "{1, 6}", "{1, 7}", "{2, 6}" ], [ "{5, 6}" ], [ "{3, 8}" ], [ "{1, 2}", "{6, 7}" ], [ "{2, 5}" ], [ "{3, 5}" ], [ "{5, 7}" ], [ "{3, 7}", "{4, 7}", "{4, 8}" ], [ "{5, 8}", "{6, 8}" ], [ "{4, 6}" ], [ "{2, 8}", "{2, 9}", "{3, 9}" ], [ "{1, 10}" ], [ "{1, 3}", "{3, 10}" ], [ "{2, 10}" ], [ "{3, 6}" ], [ "{6, 9}" ], [ "{6, 10}" ], [ "{1, 5}" ], [ "{1, 4}" ], [ "{1, 8}" ] ], "SortedReprnIndices":"{17, 18, 19, 20, 15, 16, 13, 14, 11, 12, 9, 10, 3, 4, 1, 2, 5, 6, 7, 8}", "aCuspShapeN":[ "-12.8636856742166906396`5.134823979103174 + 3.5213288290654002923`4.572165141902342*I", "-12.8636856742166906396`5.134823979103174 + 3.5213288290654002923`4.572165141902342*I", "-12.8636856742166906396`5.134823979103174 - 3.5213288290654002923`4.572165141902342*I", "-12.8636856742166906396`5.134823979103174 - 3.5213288290654002923`4.572165141902342*I", "-7.0982250412765951868`5.049910243623332 - 5.4490760952382537182`4.9350833523537245*I", "-7.0982250412765951868`5.049910243623332 - 5.4490760952382537182`4.9350833523537245*I", "-7.0982250412765951868`5.049910243623332 + 5.4490760952382537182`4.9350833523537245*I", "-7.0982250412765951868`5.049910243623332 + 5.4490760952382537182`4.9350833523537245*I", "-11.1950342723316639793`5.137383487426232 + 2.7951457097873371775`4.534762512369593*I", "-11.1950342723316639793`5.137383487426232 + 2.7951457097873371775`4.534762512369593*I", "-11.1950342723316639793`5.137383487426232 - 2.7951457097873371775`4.534762512369593*I", "-11.1950342723316639793`5.137383487426232 - 2.7951457097873371775`4.534762512369593*I", "-3.0186551916147262972`4.932046956193867 + 3.9760011439015594274`5.051679948656518*I", "-3.0186551916147262972`4.932046956193867 + 3.9760011439015594274`5.051679948656518*I", "-3.0186551916147262972`4.932046956193867 - 3.9760011439015594274`5.051679948656518*I", "-3.0186551916147262972`4.932046956193867 - 3.9760011439015594274`5.051679948656518*I", "-7.8243998205603238977`5.04608454421825 - 6.1488129170457130415`4.941424789231912*I", "-7.8243998205603238977`5.04608454421825 - 6.1488129170457130415`4.941424789231912*I", "-7.8243998205603238977`5.04608454421825 + 6.1488129170457130415`4.941424789231912*I", "-7.8243998205603238977`5.04608454421825 + 6.1488129170457130415`4.941424789231912*I" ], "Abelian":false }, { "IdealName":"J10_98_2", "Generators":[ "b + u", "-1 + 2*a - u", "1 + u^2" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":9.008800000000003e-2, "TimingZeroDimVars":6.5718e-2, "TimingmagmaVCompNormalize":6.699e-2, "TimingNumberOfSols":2.0686e-2, "TimingIsRadical":1.5880000000000004e-3, "TimingArcColoring":4.4546e-2, "TimingObstruction":1.347e-3, "TimingComplexVolumeN":1.460641, "TimingaCuspShapeN":9.191000000000001e-3, "TiminguValues":0.634892, "TiminguPolysN":3.75e-4, "TiminguPolys":0.809225, "TimingaCuspShape":0.100772, "TimingRepresentationsN":2.9211e-2, "TiminguValues_ij":0.160773, "TiminguPolys_ij_N":7.37e-4 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":2, "IsRadical":true, "ArcColoring":[ [ 0.5, "(1 + u)\/2" ], [ "(-1 + u)\/2", 1 ], [ "(1 + u)\/2", 1 ], "{1, 0}", "{1, -1}", [ "(1 + 2*u)\/2", "(-1 - 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6*u^3 + 6*u^4 - 9*u^5 + 9*u^6 - 5*u^7 + 5*u^8 - u^9 + u^10)^2*(5 + 26*u + 66*u^2 + 114*u^3 + 181*u^4 + 211*u^5 + 205*u^6 + 168*u^7 + 108*u^8 + 60*u^9 + 28*u^10 + 9*u^11 + 3*u^12)", "u^3*(1 + u)^3*(1 + u^2)*(2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12)*(31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20)", "u^3*(1 + u)^3*(1 + u^2)*(2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12)*(31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20)", "3*(1 + u^2)*(1 + u + u^3)^2*(1 - 2*u + 3*u^2 - 4*u^3 + 4*u^4 - 5*u^5 + 5*u^6 - 3*u^7 + 3*u^8 - u^9 + u^10)^2*(5 + 20*u + 64*u^2 + 106*u^3 + 149*u^4 + 157*u^5 + 139*u^6 + 110*u^7 + 70*u^8 + 42*u^9 + 22*u^10 + 9*u^11 + 3*u^12)", "8*(1 - 2*u + 2*u^2)*(1 + u + u^3)*(-1 + u + 2*u^2 + u^3)*(3 + 12*u + 19*u^2 + 12*u^3 + 12*u^4 + 15*u^5 - 5*u^6 - 13*u^7 + 9*u^8 + 9*u^9 - u^10 - 4*u^11 + 2*u^12)*(121 - 518*u + 875*u^2 - 692*u^3 + 390*u^4 - 540*u^5 + 512*u^6 - 34*u^7 - 8*u^8 - 270*u^9 + 83*u^10 + 132*u^11 + 26*u^12 - 66*u^13 - 53*u^14 + 22*u^15 + 34*u^16 - 2*u^17 - 13*u^18 + 2*u^20)", "3*(1 + u^2)*(1 + u + u^3)^2*(1 + u^2 - 6*u^3 + 6*u^4 - 9*u^5 + 9*u^6 - 5*u^7 + 5*u^8 - u^9 + u^10)^2*(5 + 26*u + 66*u^2 + 114*u^3 + 181*u^4 + 211*u^5 + 205*u^6 + 168*u^7 + 108*u^8 + 60*u^9 + 28*u^10 + 9*u^11 + 3*u^12)", "u^3*(1 + u)^3*(1 + u^2)*(2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12)*(31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20)", "u^3*(1 + u)^3*(1 + u^2)*(2 + u + 3*u^2 - 14*u^3 + 21*u^4 - 15*u^5 + u^6 + 3*u^7 + u^9 - 2*u^11 + u^12)*(31 - 58*u + 48*u^2 - 32*u^3 - 30*u^4 + 72*u^5 - 43*u^6 + 50*u^7 + 8*u^8 - 102*u^9 + 31*u^10 + 42*u^11 - 12*u^12 + 14*u^13 - 10*u^14 - 24*u^15 + 13*u^16 + 10*u^17 - 5*u^18 - 2*u^19 + u^20)", "3*(1 + u^2)*(1 + u + u^3)^2*(1 - 2*u + 3*u^2 - 4*u^3 + 4*u^4 - 5*u^5 + 5*u^6 - 3*u^7 + 3*u^8 - u^9 + u^10)^2*(5 + 20*u + 64*u^2 + 106*u^3 + 149*u^4 + 157*u^5 + 139*u^6 + 110*u^7 + 70*u^8 + 42*u^9 + 22*u^10 + 9*u^11 + 3*u^12)", "8*(1 - 2*u + 2*u^2)*(1 + u + u^3)*(-1 + u + 2*u^2 + u^3)*(3 + 12*u + 19*u^2 + 12*u^3 + 12*u^4 + 15*u^5 - 5*u^6 - 13*u^7 + 9*u^8 + 9*u^9 - u^10 - 4*u^11 + 2*u^12)*(121 - 518*u + 875*u^2 - 692*u^3 + 390*u^4 - 540*u^5 + 512*u^6 - 34*u^7 - 8*u^8 - 270*u^9 + 83*u^10 + 132*u^11 + 26*u^12 - 66*u^13 - 53*u^14 + 22*u^15 + 34*u^16 - 2*u^17 - 13*u^18 + 2*u^20)" ], "RileyPolyC":[ "9*(1 + y)^2*(-1 + y + 2*y^2 + y^3)^2*(1 + 2*y + 13*y^2 - 6*y^3 - 44*y^4 - 21*y^5 + 41*y^6 + 59*y^7 + 33*y^8 + 9*y^9 + y^10)^2*(25 - 16*y + 238*y^2 + 1974*y^3 + 4057*y^4 + 2801*y^5 - 197*y^6 - 784*y^7 + 272*y^8 + 654*y^9 + 352*y^10 + 87*y^11 + 9*y^12)", "(-1 + y)^3*y^3*(1 + y)^2*(4 + 11*y + 121*y^2 - 36*y^3 + 21*y^4 - 101*y^5 + 127*y^6 - 29*y^7 - 24*y^8 + 13*y^9 + 4*y^10 - 4*y^11 + y^12)*(961 - 388*y - 3268*y^2 + 1782*y^3 + 7676*y^4 - 8546*y^5 - 5255*y^6 + 12180*y^7 + 228*y^8 - 13930*y^9 + 11463*y^10 + 298*y^11 - 6682*y^12 + 4940*y^13 - 1082*y^14 - 766*y^15 + 781*y^16 - 346*y^17 + 91*y^18 - 14*y^19 + y^20)", "(-1 + y)^3*y^3*(1 + y)^2*(4 + 11*y + 121*y^2 - 36*y^3 + 21*y^4 - 101*y^5 + 127*y^6 - 29*y^7 - 24*y^8 + 13*y^9 + 4*y^10 - 4*y^11 + y^12)*(961 - 388*y - 3268*y^2 + 1782*y^3 + 7676*y^4 - 8546*y^5 - 5255*y^6 + 12180*y^7 + 228*y^8 - 13930*y^9 + 11463*y^10 + 298*y^11 - 6682*y^12 + 4940*y^13 - 1082*y^14 - 766*y^15 + 781*y^16 - 346*y^17 + 91*y^18 - 14*y^19 + y^20)", "9*(1 + y)^2*(-1 + y + 2*y^2 + y^3)^2*(1 + 2*y + y^2 - 2*y^3 + 7*y^5 + 17*y^6 + 19*y^7 + 13*y^8 + 5*y^9 + y^10)^2*(25 + 240*y + 1346*y^2 + 2946*y^3 + 3009*y^4 + 953*y^5 - 777*y^6 - 796*y^7 - 156*y^8 + 170*y^9 + 148*y^10 + 51*y^11 + 9*y^12)", "64*(1 + 4*y^2)*(-1 + 5*y - 2*y^2 + y^3)*(-1 + y + 2*y^2 + y^3)*(9 - 30*y + 145*y^2 - 78*y^3 - 40*y^4 + 87*y^5 + 485*y^6 - 381*y^7 + 493*y^8 - 223*y^9 + 109*y^10 - 20*y^11 + 4*y^12)*(14641 - 56574*y + 143093*y^2 - 231900*y^3 + 263580*y^4 - 212930*y^5 + 133798*y^6 - 89222*y^7 + 76462*y^8 - 66518*y^9 + 44239*y^10 - 20388*y^11 + 8750*y^12 - 6100*y^13 + 5819*y^14 - 4696*y^15 + 2726*y^16 - 1100*y^17 + 305*y^18 - 52*y^19 + 4*y^20)", "9*(1 + y)^2*(-1 + y + 2*y^2 + y^3)^2*(1 + 2*y + 13*y^2 - 6*y^3 - 44*y^4 - 21*y^5 + 41*y^6 + 59*y^7 + 33*y^8 + 9*y^9 + y^10)^2*(25 - 16*y + 238*y^2 + 1974*y^3 + 4057*y^4 + 2801*y^5 - 197*y^6 - 784*y^7 + 272*y^8 + 654*y^9 + 352*y^10 + 87*y^11 + 9*y^12)", "(-1 + y)^3*y^3*(1 + y)^2*(4 + 11*y + 121*y^2 - 36*y^3 + 21*y^4 - 101*y^5 + 127*y^6 - 29*y^7 - 24*y^8 + 13*y^9 + 4*y^10 - 4*y^11 + y^12)*(961 - 388*y - 3268*y^2 + 1782*y^3 + 7676*y^4 - 8546*y^5 - 5255*y^6 + 12180*y^7 + 228*y^8 - 13930*y^9 + 11463*y^10 + 298*y^11 - 6682*y^12 + 4940*y^13 - 1082*y^14 - 766*y^15 + 781*y^16 - 346*y^17 + 91*y^18 - 14*y^19 + y^20)", "(-1 + y)^3*y^3*(1 + y)^2*(4 + 11*y + 121*y^2 - 36*y^3 + 21*y^4 - 101*y^5 + 127*y^6 - 29*y^7 - 24*y^8 + 13*y^9 + 4*y^10 - 4*y^11 + y^12)*(961 - 388*y - 3268*y^2 + 1782*y^3 + 7676*y^4 - 8546*y^5 - 5255*y^6 + 12180*y^7 + 228*y^8 - 13930*y^9 + 11463*y^10 + 298*y^11 - 6682*y^12 + 4940*y^13 - 1082*y^14 - 766*y^15 + 781*y^16 - 346*y^17 + 91*y^18 - 14*y^19 + y^20)", "9*(1 + y)^2*(-1 + y + 2*y^2 + y^3)^2*(1 + 2*y + y^2 - 2*y^3 + 7*y^5 + 17*y^6 + 19*y^7 + 13*y^8 + 5*y^9 + y^10)^2*(25 + 240*y + 1346*y^2 + 2946*y^3 + 3009*y^4 + 953*y^5 - 777*y^6 - 796*y^7 - 156*y^8 + 170*y^9 + 148*y^10 + 51*y^11 + 9*y^12)", "64*(1 + 4*y^2)*(-1 + 5*y - 2*y^2 + y^3)*(-1 + y + 2*y^2 + y^3)*(9 - 30*y + 145*y^2 - 78*y^3 - 40*y^4 + 87*y^5 + 485*y^6 - 381*y^7 + 493*y^8 - 223*y^9 + 109*y^10 - 20*y^11 + 4*y^12)*(14641 - 56574*y + 143093*y^2 - 231900*y^3 + 263580*y^4 - 212930*y^5 + 133798*y^6 - 89222*y^7 + 76462*y^8 - 66518*y^9 + 44239*y^10 - 20388*y^11 + 8750*y^12 - 6100*y^13 + 5819*y^14 - 4696*y^15 + 2726*y^16 - 1100*y^17 + 305*y^18 - 52*y^19 + 4*y^20)" ] }, "GeometricRepresentation":[ 1.44129e1, [ "J10_98_0", 1, "{9, 10}" ] ] } }