{ "Index":205, "Name":"10_121", "RolfsenName":"10_121", "DTname":"10a_90", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{-11, 9, 1, 15, -17, 7, 19, -3, 5, 13}", "Acode":"{-6, 5, 1, 8, -9, 4, 10, -2, 3, 7}", "PDcode":[ "{2, 11, 3, 12}", "{4, 10, 5, 9}", "{6, 2, 7, 1}", "{8, 16, 9, 15}", "{10, 17, 11, 18}", "{12, 8, 13, 7}", "{14, 20, 15, 19}", "{16, 3, 17, 4}", "{18, 6, 19, 5}", "{20, 14, 1, 13}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{2, 5, 9}", [], [ "{2, 5, 3, 1}", "{5, -9, 6, 1}", "{9, 3, 10, 1}", "{2, -6, 1, 2}", "{9, -2, 8, 2}", "{5, 8, 4, 2}", "{8, 10, 7, 2}" ], "{3, 6}", "{10}", 10 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "1 - a^2*u + 2*a*b*u - b^2*u + 2*a*b*u^2 + a^2*b^2*u^2 - a^2*u^4 + a^3*b*u^4 + 3*a^4*b^2*u^4 + a^5*b^3*u^4 - a^4*u^6 - 2*a^5*b*u^6 - a^6*b^2*u^6", "-u - a*b*u + b^2*u + u^2 + 2*a*b*u^4 + 5*a^2*b^2*u^4 + 4*a^3*b^3*u^4 + a^4*b^4*u^4 - a^2*u^6 - 3*a^3*b*u^6 - 3*a^4*b^2*u^6 - a^5*b^3*u^6", "-a + b + a^2*u - 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682*u^12 + 1793*u^13 - 2068*u^14 + 1509*u^15 - 1184*u^16 + 491*u^17 - 255*u^18 + 102*u^19 - 24*u^20 + 15*u^21 + u^23", "16 - 364*u + 3895*u^2 - 5650*u^3 - 10347*u^4 - 12656*u^5 - 30995*u^6 + 127705*u^7 + 431011*u^8 + 464394*u^9 + 239311*u^10 + 120890*u^11 + 117825*u^12 + 79698*u^13 + 26410*u^14 + 4041*u^15 - 926*u^16 - 2055*u^17 - 1234*u^18 - 236*u^19 + 62*u^20 + 43*u^21 + 10*u^22 + u^23", "-4194304 + 2097152*u - 7602176*u^2 + 28901376*u^3 - 9142272*u^4 + 22585344*u^5 - 24014848*u^6 + 3507712*u^7 - 13141312*u^8 + 3263296*u^9 + 3989120*u^10 + 2911137*u^11 + 320469*u^12 - 151263*u^13 - 61101*u^14 + 19869*u^15 + 9796*u^16 - 769*u^17 - 1876*u^18 - 467*u^19 + 7*u^20 + 37*u^21 + 9*u^22 + u^23", "39901 - 35772*u + 133466*u^2 - 52725*u^3 + 51990*u^4 + 34404*u^5 - 86699*u^6 + 51695*u^7 - 69364*u^8 + 3678*u^9 - 19745*u^10 + 11599*u^11 + 9790*u^12 - 2243*u^13 + 6193*u^14 + 1309*u^15 - 1482*u^16 + 425*u^17 + 229*u^18 - 210*u^19 - 63*u^20 + 22*u^21 + 10*u^22 + u^23" ], "GeometricComponent":"{14, 15}", "uPolys_ij_N":[ "4 - 10*u - 19*u^2 + 61*u^3 + 162*u^4 - 1044*u^5 + 2836*u^6 - 6097*u^7 + 11870*u^8 - 19484*u^9 + 23997*u^10 - 18629*u^11 + 1917*u^12 + 18717*u^13 - 32413*u^14 + 33738*u^15 - 25646*u^16 + 15010*u^17 - 6861*u^18 + 2435*u^19 - 655*u^20 + 127*u^21 - 16*u^22 + u^23", "16 + 252*u + 2877*u^2 + 8069*u^3 + 18864*u^4 + 76002*u^5 + 266158*u^6 + 439405*u^7 + 561556*u^8 + 543170*u^9 + 427877*u^10 + 370499*u^11 + 243239*u^12 + 174611*u^13 + 80613*u^14 + 46012*u^15 + 13512*u^16 + 6922*u^17 + 1211*u^18 + 659*u^19 + 67*u^20 + 39*u^21 + 2*u^22 + u^23", "256 - 1360*u + 2337*u^2 + 2566*u^3 - 15413*u^4 + 24299*u^5 - 24651*u^6 + 31431*u^7 - 45236*u^8 + 44949*u^9 - 24779*u^10 + 1182*u^11 + 13045*u^12 - 17231*u^13 + 13993*u^14 - 6497*u^15 - 433*u^16 + 3431*u^17 - 3012*u^18 + 1547*u^19 - 526*u^20 + 118*u^21 - 16*u^22 + u^23", "1 - 16*u + 98*u^2 - 231*u^3 + 116*u^4 + 491*u^5 - 956*u^6 + 431*u^7 + 518*u^8 - 758*u^9 + 438*u^10 + 166*u^11 - 996*u^12 + 811*u^13 + 562*u^14 - 878*u^15 - 152*u^16 + 588*u^17 - 199*u^18 - 44*u^19 + 21*u^20 + 12*u^21 - 7*u^22 + u^23", "1 + 2*u - u^2 - 2*u^3 - 5*u^4 + 10*u^5 - 7*u^6 - 16*u^7 + 24*u^8 + 23*u^9 - 62*u^10 - 8*u^11 + 72*u^12 + u^13 - 61*u^14 + 16*u^15 + 34*u^16 - 8*u^17 - 13*u^18 + 8*u^19 + 4*u^20 - u^21 - u^22 + u^23", "89 - 142*u - 1239*u^2 + 5146*u^3 - 8971*u^4 + 7809*u^5 + 696*u^6 - 10612*u^7 + 11763*u^8 - 1025*u^9 - 12032*u^10 + 14745*u^11 - 5929*u^12 - 3572*u^13 + 5573*u^14 - 1858*u^15 - 1137*u^16 + 1365*u^17 - 460*u^18 - 38*u^19 + 72*u^20 - 14*u^21 - 3*u^22 + u^23", "1 + 2*u + 10*u^2 + 30*u^3 + 37*u^4 + 127*u^5 + 78*u^6 + 262*u^7 + 115*u^8 + 330*u^9 + 118*u^10 + 305*u^11 + 90*u^12 + 229*u^13 + 65*u^14 + 136*u^15 + 32*u^16 + 63*u^17 + 15*u^18 + 22*u^19 + 3*u^20 + 5*u^21 + u^22 + u^23", "67 - 635*u + 2572*u^2 - 5088*u^3 + 3385*u^4 + 5128*u^5 - 10723*u^6 + 2393*u^7 + 9278*u^8 - 5879*u^9 - 5377*u^10 + 5472*u^11 + 1976*u^12 - 3036*u^13 - 557*u^14 + 1205*u^15 + 124*u^16 - 342*u^17 - 27*u^18 + 71*u^19 + 3*u^20 - 10*u^21 + u^23", "1018963 + 1284576*u - 1460111*u^2 - 105455*u^3 + 937157*u^4 - 813882*u^5 - 440414*u^6 + 888738*u^7 + 304146*u^8 - 22239*u^9 + 279447*u^10 + 165577*u^11 - 49682*u^12 - 26606*u^13 + 3152*u^14 - 435*u^15 + 1792*u^16 + 2541*u^17 + 154*u^18 - 424*u^19 - 103*u^20 + 17*u^21 + 9*u^22 + u^23", "16 - 108*u + 407*u^2 - 1046*u^3 + 1957*u^4 - 2631*u^5 + 2089*u^6 + 747*u^7 - 6344*u^8 + 13969*u^9 - 21703*u^10 + 27206*u^11 - 28821*u^12 + 26333*u^13 - 20941*u^14 + 14533*u^15 - 8785*u^16 + 4597*u^17 - 2060*u^18 + 777*u^19 - 240*u^20 + 58*u^21 - 10*u^22 + u^23", "1 + u + u^2 + 8*u^3 + 18*u^4 - 4*u^5 - 33*u^6 + 8*u^7 + 49*u^8 + 12*u^9 - 38*u^10 - 19*u^11 + 25*u^12 + 16*u^13 - 9*u^14 + 9*u^15 - 7*u^16 - 10*u^17 + 8*u^18 + 10*u^19 - 4*u^20 - 3*u^21 + u^22 + u^23", "2048 - 18432*u + 82432*u^2 - 237824*u^3 + 483328*u^4 - 703616*u^5 + 680192*u^6 - 233472*u^7 - 599544*u^8 + 1528920*u^9 - 2179488*u^10 + 2327055*u^11 - 2008851*u^12 + 1446505*u^13 - 881365*u^14 + 456977*u^15 - 201544*u^16 + 75179*u^17 - 23442*u^18 + 5991*u^19 - 1215*u^20 + 185*u^21 - 19*u^22 + u^23", "-1 + 6*u + u^2 + 48*u^3 - 191*u^4 + 358*u^5 - 521*u^6 + 734*u^7 - 1750*u^8 + 4177*u^9 - 7864*u^10 + 11614*u^11 - 13380*u^12 + 12767*u^13 - 9855*u^14 + 6598*u^15 - 3620*u^16 + 1818*u^17 - 721*u^18 + 284*u^19 - 74*u^20 + 25*u^21 - 3*u^22 + u^23", "1 + 6*u - 3*u^2 - 41*u^3 + 46*u^4 + 14*u^5 - 315*u^6 + 274*u^7 + 739*u^8 - 810*u^9 - 516*u^10 + 2234*u^11 - 77*u^12 - 2554*u^13 + 447*u^14 + 1627*u^15 - 288*u^16 - 614*u^17 + 83*u^18 + 136*u^19 - 13*u^20 - 17*u^21 + u^22 + u^23", "1 - 31*u + 655*u^2 - 263*u^3 - 1475*u^4 - 1475*u^5 + 4501*u^6 + 3762*u^7 - 7394*u^8 - 3615*u^9 + 5317*u^10 + 3325*u^11 - 3186*u^12 - 621*u^13 + 756*u^14 - 208*u^15 - 177*u^16 + 207*u^17 + 95*u^18 - 71*u^19 - 38*u^20 + 8*u^21 + 7*u^22 + u^23", "773 + 16949*u + 28538*u^2 + 68097*u^3 + 101765*u^4 + 100521*u^5 + 129499*u^6 + 80968*u^7 + 62195*u^8 + 54802*u^9 + 11752*u^10 + 22465*u^11 + 2220*u^12 + 2651*u^13 + 3903*u^14 + 809*u^15 + 989*u^16 + 625*u^17 + 209*u^18 + 97*u^19 + 23*u^20 + 12*u^21 + 4*u^22 + u^23", "-2133 + 19980*u - 74112*u^2 + 151030*u^3 - 172022*u^4 + 80089*u^5 + 48612*u^6 - 85946*u^7 + 25705*u^8 + 43293*u^9 - 74108*u^10 + 69089*u^11 - 44142*u^12 + 23802*u^13 - 11479*u^14 + 4108*u^15 - 1913*u^16 + 678*u^17 - 46*u^18 + 159*u^19 + 28*u^20 + 21*u^21 + 3*u^22 + u^23", "1 - u + 21*u^2 + 86*u^3 + 404*u^4 + 1334*u^5 + 2737*u^6 + 4266*u^7 + 5159*u^8 + 5532*u^9 + 4656*u^10 + 3161*u^11 + 631*u^12 - 1292*u^13 - 2187*u^14 - 1603*u^15 - 649*u^16 + 136*u^17 + 324*u^18 + 256*u^19 + 112*u^20 + 37*u^21 + 7*u^22 + u^23", "1 - 16*u + 54*u^2 + 512*u^3 - 5509*u^4 + 24861*u^5 - 70434*u^6 + 143078*u^7 - 225017*u^8 + 288638*u^9 - 312270*u^10 + 290417*u^11 - 234972*u^12 + 166595*u^13 - 103741*u^14 + 56796*u^15 - 27172*u^16 + 11323*u^17 - 4043*u^18 + 1232*u^19 - 307*u^20 + 63*u^21 - 9*u^22 + u^23", "1 + 6*u - 17*u^2 - 61*u^3 + 261*u^4 - 170*u^5 - 513*u^6 + 962*u^7 - 122*u^8 - 1165*u^9 + 1337*u^10 + 112*u^11 - 1980*u^12 + 2674*u^13 - 1836*u^14 + 1242*u^15 - 636*u^16 + 489*u^17 - 203*u^18 + 83*u^19 - 22*u^20 + 12*u^21 - 4*u^22 + u^23", "1 - 12*u + 41*u^2 - 24*u^3 - 79*u^4 + 299*u^5 - 140*u^6 + 708*u^7 + 434*u^8 + 343*u^9 + 995*u^10 + 545*u^11 - 682*u^12 + 1793*u^13 - 2068*u^14 + 1509*u^15 - 1184*u^16 + 491*u^17 - 255*u^18 + 102*u^19 - 24*u^20 + 15*u^21 + u^23", "16 - 364*u + 3895*u^2 - 5650*u^3 - 10347*u^4 - 12656*u^5 - 30995*u^6 + 127705*u^7 + 431011*u^8 + 464394*u^9 + 239311*u^10 + 120890*u^11 + 117825*u^12 + 79698*u^13 + 26410*u^14 + 4041*u^15 - 926*u^16 - 2055*u^17 - 1234*u^18 - 236*u^19 + 62*u^20 + 43*u^21 + 10*u^22 + u^23", "-4194304 + 2097152*u - 7602176*u^2 + 28901376*u^3 - 9142272*u^4 + 22585344*u^5 - 24014848*u^6 + 3507712*u^7 - 13141312*u^8 + 3263296*u^9 + 3989120*u^10 + 2911137*u^11 + 320469*u^12 - 151263*u^13 - 61101*u^14 + 19869*u^15 + 9796*u^16 - 769*u^17 - 1876*u^18 - 467*u^19 + 7*u^20 + 37*u^21 + 9*u^22 + u^23", "39901 - 35772*u + 133466*u^2 - 52725*u^3 + 51990*u^4 + 34404*u^5 - 86699*u^6 + 51695*u^7 - 69364*u^8 + 3678*u^9 - 19745*u^10 + 11599*u^11 + 9790*u^12 - 2243*u^13 + 6193*u^14 + 1309*u^15 - 1482*u^16 + 425*u^17 + 229*u^18 - 210*u^19 - 63*u^20 + 22*u^21 + 10*u^22 + u^23" ], "Multiplicity":1, "ij_list":[ [ "{2, 5}", "{3, 5}" ], [ "{2, 3}" ], [ "{1, 10}", "{7, 8}" ], [ "{1, 9}", "{6, 8}" ], [ "{2, 8}", "{2, 9}", "{5, 9}", "{6, 9}" ], [ "{7, 9}" ], [ "{1, 3}", "{1, 4}", "{4, 6}", "{4, 7}" ], [ "{3, 8}", "{5, 10}" ], [ "{2, 7}" ], [ "{1, 7}", "{7, 10}", "{8, 10}" ], [ "{3, 9}", "{3, 10}", "{4, 8}", "{5, 8}" ], [ "{1, 6}", "{2, 6}" ], [ "{5, 6}", "{8, 9}" ], [ "{3, 7}", "{4, 10}" ], [ "{6, 10}" ], [ "{5, 7}" ], [ "{2, 10}" ], [ "{4, 5}", "{9, 10}" ], [ "{3, 4}", "{6, 7}" ], [ "{2, 4}", "{3, 6}" ], [ "{4, 9}" ], [ "{1, 8}" ], [ "{1, 2}" ], [ "{1, 5}" ] ], "SortedReprnIndices":"{14, 15, 12, 13, 18, 19, 23, 22, 1, 2, 21, 20, 11, 10, 6, 7, 16, 17, 8, 9, 5, 4, 3}", "aCuspShapeN":[ "12.5679307498233631042`5.075937648373397 - 8.0453497226627030783`4.88221879648525*I", "12.5679307498233631042`5.075937648373397 + 8.0453497226627030783`4.88221879648525*I", -7.3767, "3.2608454185885884136`5.150464137119898 + 0.0499079467056146906`3.335303628343481*I", "3.2608454185885884136`5.150464137119898 - 0.0499079467056146906`3.335303628343481*I", "2.5183657569342304852`5.013404047242449 - 2.3628086652821743363`4.985713796676508*I", "2.5183657569342304852`5.013404047242449 + 2.3628086652821743363`4.985713796676508*I", "0.9949101588473804329`4.699923009105562 - 2.6256896666916026741`5.121382538732885*I", "0.9949101588473804329`4.699923009105562 + 2.6256896666916026741`5.121382538732885*I", "1.2656715322829194718`4.598812114255433 + 4.3271101526929476212`5.132689053193583*I", "1.2656715322829194718`4.598812114255433 - 4.3271101526929476212`5.132689053193583*I", "-7.1820038150273945051`4.976752848915046 - 7.9522510817321330739`5.020997301306244*I", "-7.1820038150273945051`4.976752848915046 + 7.9522510817321330739`5.020997301306244*I", "0``4.141044411168645 - 9.3440033916709750352`5.111577398576494*I", "0``4.141044411168645 + 9.3440033916709750352`5.111577398576494*I", "0.0037081105699575449`2.195129040381676 - 3.3460957660219768611`5.150514731156767*I", "0.0037081105699575449`2.195129040381676 + 3.3460957660219768611`5.150514731156767*I", 0, 0, 0, 0, 0, 0 ], "Abelian":false }, { "IdealName":"J10_121_1", "Generators":[ "-203 - 317*a - 330*a^2 + 103*a^3 + 317*b + 57*u - 482*a^2*u + 210*a^3*u + 479*u^2 - 634*a*u^2 + 1066*a^2*u^2 - 204*a^3*u^2 - 528*u^3 + 494*a^2*u^3 - 110*a^3*u^3 - 239*u^4 + 1585*a*u^4 - 2011*a^2*u^4 + 571*a^3*u^4 + 1663*u^5 - 951*a*u^5 + 1159*a^2*u^5 + 254*a^3*u^5 - 1724*u^6 - 1268*a*u^6 + 2588*a^2*u^6 - 729*a^3*u^6 + 684*u^7 + 2219*a*u^7 - 4833*a^2*u^7 + 301*a^3*u^7 + 217*u^8 - 1268*a*u^8 + 3960*a^2*u^8 + 349*a^3*u^8 - 267*u^9 + 317*a*u^9 - 1663*a^2*u^9 - 333*a^3*u^9 + 89*u^10 + 343*a^2*u^10 + 111*a^3*u^10", "12 + 9*a^2 - a^3 + a^4 - 19*u + 5*a*u - 12*a^2*u + 2*a^3*u - 6*u^2 - 5*a*u^2 - 4*a^2*u^2 + a^3*u^2 + 46*u^3 + 2*a*u^3 + 31*a^2*u^3 - 2*a^3*u^3 - 41*u^4 - 28*a^2*u^4 - 3*a^3*u^4 - 35*u^5 + 4*a*u^5 - 18*a^2*u^5 + 16*a^3*u^5 + 125*u^6 - 12*a*u^6 + 79*a^2*u^6 - 28*a^3*u^6 - 144*u^7 + 16*a*u^7 - 97*a^2*u^7 + 28*a^3*u^7 + 93*u^8 - 12*a*u^8 + 67*a^2*u^8 - 17*a^3*u^8 - 34*u^9 + 5*a*u^9 - 26*a^2*u^9 + 6*a^3*u^9 + 6*u^10 - a*u^10 + 5*a^2*u^10 - a^3*u^10", "1 - 3*u^2 + 3*u^3 + 3*u^4 - 8*u^5 + 4*u^6 + 8*u^7 - 15*u^8 + 12*u^9 - 5*u^10 + u^11" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":0.113597, "TimingZeroDimVars":0.149354, "TimingmagmaVCompNormalize":0.150743, "TimingNumberOfSols":0.327613, "TimingIsRadical":7.4483e-2, "TimingArcColoring":0.107322, "TimingObstruction":0.266188, "TimingComplexVolumeN":3.9322529e1, "TimingaCuspShapeN":0.422603, "TiminguValues":0.749012, "TiminguPolysN":0.219019, "TiminguPolys":1.588325, "TimingaCuspShape":0.602738, "TimingRepresentationsN":0.374767, "TiminguValues_ij":0.3758, "TiminguPolys_ij_N":0.788592 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":44, "IsRadical":true, "ArcColoring":[ [ "(159 + 317*a + 107*a^2 + 152*a^3 - 79*u + 317*a*u + 212*a^2*u + 76*a^3*u - 41*u^2 - 1268*a*u^2 - 532*a^2*u^2 - 418*a^3*u^2 - 19*u^3 - 317*a*u^3 + 372*a^2*u^3 - 70*a^3*u^3 - 8*u^4 + 2219*a*u^4 + 507*a^2*u^4 + 421*a^3*u^4 - 8*u^5 - 1268*a*u^5 - 1395*a^2*u^5 - 213*a^3*u^5 - 2*u^6 - 2536*a*u^6 + 206*a^2*u^6 + 26*a^3*u^6 + 3*u^7 + 4755*a*u^7 + 1593*a^2*u^7 - 39*a^3*u^7 - 6*u^8 - 3804*a*u^8 - 1918*a^2*u^8 + 78*a^3*u^8 + 3*u^9 + 1585*a*u^9 + 959*a^2*u^9 - 39*a^3*u^9 - u^10 - 317*a*u^10 - 214*a^2*u^10 + 13*a^3*u^10)\/317", "(-1 - 317*a + 103*a^2 + 13*a^3 + 158*u + 317*a*u + 210*a^2*u + 165*a^3*u + 82*u^2 + 1268*a*u^2 + 113*a^2*u^2 + 202*a^3*u^2 + 38*u^3 - 1268*a*u^3 - 110*a^2*u^3 - 177*a^3*u^3 + 16*u^4 - 1268*a*u^4 + 571*a^2*u^4 - 208*a^3*u^4 + 16*u^5 + 3804*a*u^5 + 254*a^2*u^5 + 109*a^3*u^5 + 4*u^6 - 2219*a*u^6 - 729*a^2*u^6 - 52*a^3*u^6 - 6*u^7 - 951*a*u^7 + 301*a^2*u^7 + 78*a^3*u^7 + 12*u^8 + 2219*a*u^8 + 349*a^2*u^8 - 156*a^3*u^8 - 6*u^9 - 1268*a*u^9 - 333*a^2*u^9 + 78*a^3*u^9 + 2*u^10 + 317*a*u^10 + 111*a^2*u^10 - 26*a^3*u^10)\/317" ], "{1, 0}", [ 1, "u^2" ], [ "(-4 - 317*a - 222*a^2 + 52*a^3 + 632*u - 317*a*u + 206*a^2*u + 26*a^3*u - 306*u^2 + 634*a*u^2 + 769*a^2*u^2 - 143*a^3*u^2 + 152*u^3 + 317*a*u^3 - 440*a^2*u^3 + 243*a^3*u^3 + 64*u^4 - 634*a*u^4 - 886*a^2*u^4 + 436*a^3*u^4 + 64*u^5 + 317*a*u^5 + 1333*a^2*u^5 - 515*a^3*u^5 + 16*u^6 + 571*a^2*u^6 - 208*a^3*u^6 - 24*u^7 - 1966*a^2*u^7 + 629*a^3*u^7 + 48*u^8 + 1713*a^2*u^8 - 624*a^3*u^8 - 24*u^9 - 698*a^2*u^9 + 312*a^3*u^9 + 8*u^10 + 127*a^2*u^10 - 104*a^3*u^10)\/317", "(-312 + 634*a + 119*a^2 - 65*a^3 - 156*u - 99*a^2*u - 191*a^3*u + 224*u^2 - 1902*a*u^2 - 882*a^2*u^2 - 59*a^3*u^2 - 190*u^3 + 951*a*u^3 + 550*a^2*u^3 - 66*a^3*u^3 - 80*u^4 + 1902*a*u^4 + 315*a^2*u^4 - 228*a^3*u^4 - 80*u^5 - 4121*a*u^5 - 1587*a^2*u^5 + 406*a^3*u^5 - 20*u^6 + 2219*a*u^6 + 158*a^2*u^6 + 260*a^3*u^6 + 30*u^7 + 951*a*u^7 + 1665*a^2*u^7 - 707*a^3*u^7 - 60*u^8 - 2219*a*u^8 - 2062*a^2*u^8 + 780*a^3*u^8 + 30*u^9 + 1268*a*u^9 + 1031*a^2*u^9 - 390*a^3*u^9 - 10*u^10 - 317*a*u^10 - 238*a^2*u^10 + 130*a^3*u^10)\/317" ], [ 0, "u" ], [ "a^2*u", "(316 - 317*a + 103*a^2 + 13*a^3 + 158*u + 317*a*u + 210*a^2*u + 165*a^3*u + 82*u^2 + 1268*a*u^2 + 113*a^2*u^2 + 202*a^3*u^2 + 38*u^3 - 1268*a*u^3 - 110*a^2*u^3 - 177*a^3*u^3 + 16*u^4 - 1268*a*u^4 + 571*a^2*u^4 - 208*a^3*u^4 + 16*u^5 + 3804*a*u^5 + 254*a^2*u^5 + 109*a^3*u^5 + 4*u^6 - 2219*a*u^6 - 729*a^2*u^6 - 52*a^3*u^6 - 6*u^7 - 951*a*u^7 + 301*a^2*u^7 + 78*a^3*u^7 + 12*u^8 + 2219*a*u^8 + 349*a^2*u^8 - 156*a^3*u^8 - 6*u^9 - 1268*a*u^9 - 333*a^2*u^9 + 78*a^3*u^9 + 2*u^10 + 317*a*u^10 + 111*a^2*u^10 - 26*a^3*u^10)\/317" ], [ "(153 - 226*a^2 + 230*a^3 - 82*u - 317*a*u + 204*a^2*u + 115*a^3*u - 183*u^2 - 317*a*u^2 + 780*a^2*u^2 - 791*a^3*u^2 + 526*u^3 + 951*a*u^3 - 605*a^2*u^3 + 453*a^3*u^3 - 229*u^4 + 317*a*u^4 - 505*a^2*u^4 + 1392*a^3*u^4 + 88*u^5 - 1585*a*u^5 + 1080*a^2*u^5 - 1778*a^3*u^5 + 22*u^6 - 634*a*u^6 + 587*a^2*u^6 - 286*a^3*u^6 - 33*u^7 + 3487*a*u^7 - 1990*a^2*u^7 + 2014*a^3*u^7 + 66*u^8 - 3487*a*u^8 + 1761*a^2*u^8 - 1809*a^3*u^8 - 33*u^9 + 1585*a*u^9 - 722*a^2*u^9 + 746*a^3*u^9 + 11*u^10 - 317*a*u^10 + 135*a^2*u^10 - 143*a^3*u^10)\/317", "(3 + 634*a + 325*a^2 - 39*a^3 + 160*u + 634*a*u + 4*a^2*u + 139*a^3*u + 71*u^2 - 1268*a*u^2 - 973*a^2*u^2 + 345*a^3*u^2 - 431*u^3 - 634*a*u^3 + 964*a^2*u^3 - 737*a^3*u^3 + 269*u^4 + 1585*a*u^4 + 1140*a^2*u^4 - 644*a^3*u^4 - 48*u^5 + 951*a*u^5 - 2347*a^2*u^5 + 1575*a^3*u^5 - 12*u^6 - 1902*a*u^6 - 349*a^2*u^6 - 161*a^3*u^6 + 18*u^7 - 317*a*u^7 + 3535*a^2*u^7 - 1502*a^3*u^7 - 36*u^8 + 1902*a*u^8 - 3583*a^2*u^8 + 1419*a^3*u^8 + 18*u^9 - 1268*a*u^9 + 1633*a^2*u^9 - 551*a^3*u^9 - 6*u^10 + 317*a*u^10 - 333*a^2*u^10 + 78*a^3*u^10)\/317" ], [ "(-203 - 330*a^2 + 103*a^3 + 57*u - 482*a^2*u + 210*a^3*u + 479*u^2 - 634*a*u^2 + 1066*a^2*u^2 - 204*a^3*u^2 - 528*u^3 + 494*a^2*u^3 - 110*a^3*u^3 - 239*u^4 + 1585*a*u^4 - 2011*a^2*u^4 + 571*a^3*u^4 + 1663*u^5 - 951*a*u^5 + 1159*a^2*u^5 + 254*a^3*u^5 - 1724*u^6 - 1268*a*u^6 + 2588*a^2*u^6 - 729*a^3*u^6 + 684*u^7 + 2219*a*u^7 - 4833*a^2*u^7 + 301*a^3*u^7 + 217*u^8 - 1268*a*u^8 + 3960*a^2*u^8 + 349*a^3*u^8 - 267*u^9 + 317*a*u^9 - 1663*a^2*u^9 - 333*a^3*u^9 + 89*u^10 + 343*a^2*u^10 + 111*a^3*u^10)\/317", "(203 + 317*a + 330*a^2 - 103*a^3 - 57*u + 482*a^2*u - 210*a^3*u - 479*u^2 + 634*a*u^2 - 1066*a^2*u^2 + 204*a^3*u^2 + 528*u^3 - 494*a^2*u^3 + 110*a^3*u^3 + 239*u^4 - 1585*a*u^4 + 2011*a^2*u^4 - 571*a^3*u^4 - 1663*u^5 + 951*a*u^5 - 1159*a^2*u^5 - 254*a^3*u^5 + 1724*u^6 + 1268*a*u^6 - 2588*a^2*u^6 + 729*a^3*u^6 - 684*u^7 - 2219*a*u^7 + 4833*a^2*u^7 - 301*a^3*u^7 - 217*u^8 + 1268*a*u^8 - 3960*a^2*u^8 - 349*a^3*u^8 + 267*u^9 - 317*a*u^9 + 1663*a^2*u^9 + 333*a^3*u^9 - 89*u^10 - 343*a^2*u^10 - 111*a^3*u^10)\/317" ], [ "a", "(203 + 317*a + 330*a^2 - 103*a^3 - 57*u + 482*a^2*u - 210*a^3*u - 479*u^2 + 634*a*u^2 - 1066*a^2*u^2 + 204*a^3*u^2 + 528*u^3 - 494*a^2*u^3 + 110*a^3*u^3 + 239*u^4 - 1585*a*u^4 + 2011*a^2*u^4 - 571*a^3*u^4 - 1663*u^5 + 951*a*u^5 - 1159*a^2*u^5 - 254*a^3*u^5 + 1724*u^6 + 1268*a*u^6 - 2588*a^2*u^6 + 729*a^3*u^6 - 684*u^7 - 2219*a*u^7 + 4833*a^2*u^7 - 301*a^3*u^7 - 217*u^8 + 1268*a*u^8 - 3960*a^2*u^8 - 349*a^3*u^8 + 267*u^9 - 317*a*u^9 + 1663*a^2*u^9 + 333*a^3*u^9 - 89*u^10 - 343*a^2*u^10 - 111*a^3*u^10)\/317" ], [ "(-203 - 330*a^2 + 103*a^3 + 57*u - 482*a^2*u + 210*a^3*u + 479*u^2 - 317*a*u^2 + 1066*a^2*u^2 - 204*a^3*u^2 - 528*u^3 + 494*a^2*u^3 - 110*a^3*u^3 - 239*u^4 + 1585*a*u^4 - 2011*a^2*u^4 + 571*a^3*u^4 + 1663*u^5 - 951*a*u^5 + 1159*a^2*u^5 + 254*a^3*u^5 - 1724*u^6 - 1268*a*u^6 + 2588*a^2*u^6 - 729*a^3*u^6 + 684*u^7 + 2219*a*u^7 - 4833*a^2*u^7 + 301*a^3*u^7 + 217*u^8 - 1268*a*u^8 + 3960*a^2*u^8 + 349*a^3*u^8 - 267*u^9 + 317*a*u^9 - 1663*a^2*u^9 - 333*a^3*u^9 + 89*u^10 + 343*a^2*u^10 + 111*a^3*u^10)\/317", "(25 + 278*a^2 - 325*a^3 - 146*u + 139*a^2*u - 321*a^3*u - 148*u^2 + 1268*a*u^2 - 1240*a^2*u^2 + 973*a^3*u^2 + 318*u^3 - 951*a*u^3 - 103*a^2*u^3 - 13*a^3*u^3 - 83*u^4 - 2853*a*u^4 + 1892*a^2*u^4 - 1774*a^3*u^4 - 1034*u^5 + 3487*a*u^5 - 1278*a^2*u^5 + 1079*a^3*u^5 + 1485*u^6 + 1585*a*u^6 - 2063*a^2*u^6 + 1300*a^3*u^6 - 801*u^7 - 5706*a*u^7 + 4204*a^2*u^7 - 2267*a^3*u^7 + 17*u^8 + 4755*a*u^8 - 3336*a^2*u^8 + 1364*a^3*u^8 + 150*u^9 - 1902*a*u^9 + 1351*a^2*u^9 - 365*a^3*u^9 - 50*u^10 + 317*a*u^10 - 239*a^2*u^10 + 16*a^3*u^10)\/317" ] ], "Obstruction":-1, "ComplexVolumeN":[ "2.98579 - 7.03062*I", "2.98579 - 2.97085*I", "2.98579 - 7.03062*I", "2.98579 - 2.97085*I", "2.98579 + 7.03062*I", "2.98579 + 2.97085*I", "2.98579 + 7.03062*I", "2.98579 + 2.97085*I", "-2.06894 - 4.27767*I", "-2.06894 - 0.2179*I", "-2.06894 - 0.2179*I", "-2.06894 - 4.27767*I", "-2.06894 + 4.27767*I", "-2.06894 + 0.2179*I", "-2.06894 + 0.2179*I", "-2.06894 + 4.27767*I", "0.1153 + 7.95431*I", "0.1153 + 3.89454*I", "0.1153 + 3.89454*I", "0.1153 + 7.95431*I", "0.1153 - 7.95431*I", "0.1153 - 3.89454*I", "0.1153 - 3.89454*I", "0.1153 - 7.95431*I", "-2.44783 - 4.73429*I", "-2.44783 - 4.73429*I", "-2.44783 - 0.67452*I", "-2.44783 - 0.67452*I", "-2.44783 + 4.73429*I", "-2.44783 + 4.73429*I", "-2.44783 + 0.67452*I", "-2.44783 + 0.67452*I", "-4.02369 - 2.02988*I", "-4.02369 + 2.02988*I", "-4.02369 - 2.02988*I", "-4.02369 + 2.02988*I", "-1.50728 - 7.24617*I", "-1.50728 - 7.24617*I", "-1.50728 - 3.18641*I", "-1.50728 - 3.18641*I", "-1.50728 + 7.24617*I", "-1.50728 + 7.24617*I", "-1.50728 + 3.18641*I", "-1.50728 + 3.18641*I" ], "uPolysN":[ "1 + 22*u + 253*u^2 + 2002*u^3 + 12166*u^4 + 60214*u^5 + 251713*u^6 + 910822*u^7 + 2903428*u^8 + 8260934*u^9 + 21191555*u^10 + 49402850*u^11 + 105328685*u^12 + 206429300*u^13 + 373455830*u^14 + 625796996*u^15 + 974015867*u^16 + 1411306358*u^17 + 1907165337*u^18 + 2407049106*u^19 + 2840372304*u^20 + 3136046298*u^21 + 3241135527*u^22 + 3136046298*u^23 + 2840372304*u^24 + 2407049106*u^25 + 1907165337*u^26 + 1411306358*u^27 + 974015867*u^28 + 625796996*u^29 + 373455830*u^30 + 206429300*u^31 + 105328685*u^32 + 49402850*u^33 + 21191555*u^34 + 8260934*u^35 + 2903428*u^36 + 910822*u^37 + 251713*u^38 + 60214*u^39 + 12166*u^40 + 2002*u^41 + 253*u^42 + 22*u^43 + u^44", "1 - 12*u^2 - 12*u^3 + 66*u^4 + 140*u^5 - 146*u^6 - 752*u^7 - 357*u^8 + 2112*u^9 + 3658*u^10 - 1636*u^11 - 11733*u^12 - 10104*u^13 + 15198*u^14 + 40520*u^15 + 17379*u^16 - 58272*u^17 - 102224*u^18 - 20892*u^19 + 144424*u^20 + 206172*u^21 + 31784*u^22 - 254176*u^23 - 348692*u^24 - 95904*u^25 + 306192*u^26 + 480928*u^27 + 251972*u^28 - 186832*u^29 - 474038*u^30 - 412268*u^31 - 96055*u^32 + 231296*u^33 + 394188*u^34 + 375704*u^35 + 261694*u^36 + 142672*u^37 + 62242*u^38 + 21764*u^39 + 6021*u^40 + 1280*u^41 + 198*u^42 + 20*u^43 + u^44", "1 - 8*u + 28*u^2 - 4*u^3 - 234*u^4 + 629*u^5 + 329*u^6 - 3155*u^7 + 2520*u^8 + 9840*u^9 - 8989*u^10 - 19273*u^11 + 25314*u^12 + 41201*u^13 - 41392*u^14 - 88923*u^15 + 25007*u^16 + 140143*u^17 + 49735*u^18 - 125802*u^19 - 123511*u^20 + 38012*u^21 + 120235*u^22 + 41536*u^23 - 53049*u^24 - 50473*u^25 + 1746*u^26 + 22709*u^27 + 9147*u^28 - 3420*u^29 - 3349*u^30 - 211*u^31 + 558*u^32 + 661*u^33 + 860*u^34 + 549*u^35 + 39*u^36 - 104*u^37 + 17*u^38 + 69*u^39 + 26*u^40 - 5*u^41 - 4*u^42 + u^43 + u^44", "289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 196403*u^24 - 95423*u^25 + 136934*u^26 + 52883*u^27 - 80197*u^28 - 25972*u^29 + 38807*u^30 + 10739*u^31 - 14636*u^32 - 3651*u^33 + 4000*u^34 + 995*u^35 - 627*u^36 - 204*u^37 + u^38 + 15*u^39 + 34*u^40 - u^41 - 6*u^42 - u^43 + u^44", "1 + 14*u + 70*u^2 + 224*u^3 + 874*u^4 + 1403*u^5 + 5195*u^6 + 4073*u^7 + 18752*u^8 + 2630*u^9 + 47049*u^10 - 20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 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20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 920*u^37 + 513*u^38 - 191*u^39 + 94*u^40 - 27*u^41 + 12*u^42 - 3*u^43 + u^44", "289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 196403*u^24 - 95423*u^25 + 136934*u^26 + 52883*u^27 - 80197*u^28 - 25972*u^29 + 38807*u^30 + 10739*u^31 - 14636*u^32 - 3651*u^33 + 4000*u^34 + 995*u^35 - 627*u^36 - 204*u^37 + u^38 + 15*u^39 + 34*u^40 - u^41 - 6*u^42 - u^43 + u^44", "1 + 8*u + 44*u^2 + 188*u^3 + 682*u^4 + 2164*u^5 + 6166*u^6 + 16000*u^7 + 38243*u^8 + 84840*u^9 + 175770*u^10 + 341628*u^11 + 625187*u^12 + 1080288*u^13 + 1766518*u^14 + 2738464*u^15 + 4029915*u^16 + 5635472*u^17 + 7494248*u^18 + 9481972*u^19 + 11416912*u^20 + 13082556*u^21 + 14264400*u^22 + 14793336*u^23 + 14583908*u^24 + 13656056*u^25 + 12132976*u^26 + 10214904*u^27 + 8136484*u^28 + 6119856*u^29 + 4336610*u^30 + 2887164*u^31 + 1800025*u^32 + 1046800*u^33 + 565148*u^34 + 281624*u^35 + 128614*u^36 + 53352*u^37 + 19874*u^38 + 6548*u^39 + 1869*u^40 + 448*u^41 + 86*u^42 + 12*u^43 + u^44" ], "uPolys":[ "(1 + u + u^2)^22", "(-1 + 3*u^2 + 3*u^3 - 3*u^4 - 8*u^5 - 4*u^6 + 8*u^7 + 15*u^8 + 12*u^9 + 5*u^10 + u^11)^4", "1 - 8*u + 28*u^2 - 4*u^3 - 234*u^4 + 629*u^5 + 329*u^6 - 3155*u^7 + 2520*u^8 + 9840*u^9 - 8989*u^10 - 19273*u^11 + 25314*u^12 + 41201*u^13 - 41392*u^14 - 88923*u^15 + 25007*u^16 + 140143*u^17 + 49735*u^18 - 125802*u^19 - 123511*u^20 + 38012*u^21 + 120235*u^22 + 41536*u^23 - 53049*u^24 - 50473*u^25 + 1746*u^26 + 22709*u^27 + 9147*u^28 - 3420*u^29 - 3349*u^30 - 211*u^31 + 558*u^32 + 661*u^33 + 860*u^34 + 549*u^35 + 39*u^36 - 104*u^37 + 17*u^38 + 69*u^39 + 26*u^40 - 5*u^41 - 4*u^42 + u^43 + u^44", "289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 196403*u^24 - 95423*u^25 + 136934*u^26 + 52883*u^27 - 80197*u^28 - 25972*u^29 + 38807*u^30 + 10739*u^31 - 14636*u^32 - 3651*u^33 + 4000*u^34 + 995*u^35 - 627*u^36 - 204*u^37 + u^38 + 15*u^39 + 34*u^40 - u^41 - 6*u^42 - u^43 + u^44", "1 + 14*u + 70*u^2 + 224*u^3 + 874*u^4 + 1403*u^5 + 5195*u^6 + 4073*u^7 + 18752*u^8 + 2630*u^9 + 47049*u^10 - 20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 920*u^37 + 513*u^38 - 191*u^39 + 94*u^40 - 27*u^41 + 12*u^42 - 3*u^43 + u^44", "1 - 8*u + 28*u^2 - 4*u^3 - 234*u^4 + 629*u^5 + 329*u^6 - 3155*u^7 + 2520*u^8 + 9840*u^9 - 8989*u^10 - 19273*u^11 + 25314*u^12 + 41201*u^13 - 41392*u^14 - 88923*u^15 + 25007*u^16 + 140143*u^17 + 49735*u^18 - 125802*u^19 - 123511*u^20 + 38012*u^21 + 120235*u^22 + 41536*u^23 - 53049*u^24 - 50473*u^25 + 1746*u^26 + 22709*u^27 + 9147*u^28 - 3420*u^29 - 3349*u^30 - 211*u^31 + 558*u^32 + 661*u^33 + 860*u^34 + 549*u^35 + 39*u^36 - 104*u^37 + 17*u^38 + 69*u^39 + 26*u^40 - 5*u^41 - 4*u^42 + u^43 + u^44", "(1 + 2*u + 5*u^2 + 9*u^3 + 15*u^4 + 18*u^5 + 20*u^6 + 18*u^7 + 13*u^8 + 8*u^9 + 3*u^10 + u^11)^4", "1 + 14*u + 70*u^2 + 224*u^3 + 874*u^4 + 1403*u^5 + 5195*u^6 + 4073*u^7 + 18752*u^8 + 2630*u^9 + 47049*u^10 - 20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 920*u^37 + 513*u^38 - 191*u^39 + 94*u^40 - 27*u^41 + 12*u^42 - 3*u^43 + u^44", "289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 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3*u^9 + u^10", "1 - 2*u + 4*u^2 - 3*u^3 + 6*u^4 - 3*u^5 + 6*u^6 - u^7 + 4*u^8 + u^10", "1 + 4*u + 10*u^2 + 18*u^3 + 24*u^4 + 27*u^5 + 24*u^6 + 16*u^7 + 9*u^8 + 3*u^9 + u^10", "1 - 3*u + 7*u^2 - 11*u^3 + 10*u^4 - 8*u^5 + 4*u^6 - 4*u^7 + 7*u^8 - 3*u^9 + u^10", "11 - 55*u + 114*u^2 - 141*u^3 + 141*u^4 - 116*u^5 + 73*u^6 - 39*u^7 + 17*u^8 - 5*u^9 + u^10", "1 + 4*u + 5*u^2 + u^3 - 2*u^4 + 3*u^6 + 2*u^7 - u^8 - u^9 + u^10", "1 - u + 4*u^2 - 4*u^3 + 8*u^4 - 5*u^5 + 7*u^6 - 2*u^7 + 3*u^8 - u^9 + u^10", "1 - u + 2*u^2 - 4*u^3 + 4*u^4 - 2*u^5 + 7*u^6 + 5*u^8 + u^10", "1 + 3*u + 8*u^2 - 9*u^3 - 14*u^4 + 19*u^5 + 17*u^6 - 9*u^7 - 7*u^8 + u^9 + u^10", "1 - 4*u + 4*u^2 + 12*u^3 - 26*u^4 - 5*u^5 + 56*u^6 - 62*u^7 + 33*u^8 - 9*u^9 + u^10", "1 + 4*u + 4*u^2 - 12*u^3 - 26*u^4 + 5*u^5 + 56*u^6 + 62*u^7 + 33*u^8 + 9*u^9 + u^10", "1 - 3*u + 8*u^2 + 9*u^3 - 14*u^4 - 19*u^5 + 17*u^6 + 9*u^7 - 7*u^8 - u^9 + u^10", "23 - 83*u + 98*u^2 - 32*u^3 - 18*u^5 + 3*u^6 + 16*u^7 - 4*u^8 - 3*u^9 + u^10", "1 + u + 4*u^2 + 4*u^3 + 8*u^4 + 5*u^5 + 7*u^6 + 2*u^7 + 3*u^8 + u^9 + u^10", "1 - 6*u + 13*u^2 - 15*u^3 + 16*u^4 - 16*u^5 + 25*u^6 - 14*u^7 + 11*u^8 - 3*u^9 + u^10", "1 - 4*u + 5*u^2 - u^3 - 2*u^4 + 3*u^6 - 2*u^7 - u^8 + u^9 + u^10", "1 + 3*u + 9*u^2 + 10*u^3 - 3*u^4 - 20*u^5 - 15*u^6 + 7*u^7 + 14*u^8 + 6*u^9 + u^10", "1 - 4*u + 10*u^2 - 18*u^3 + 24*u^4 - 27*u^5 + 24*u^6 - 16*u^7 + 9*u^8 - 3*u^9 + u^10", "53 - 126*u + 136*u^2 + 17*u^3 - 75*u^4 - 10*u^5 + 24*u^6 + 3*u^7 - 2*u^8 + 2*u^9 + u^10", "1 - 7*u + 24*u^2 - 52*u^3 + 82*u^4 - 95*u^5 + 77*u^6 - 44*u^7 + 19*u^8 - 5*u^9 + u^10", "37 + 80*u + 23*u^2 - 48*u^3 - 4*u^4 + 73*u^5 + 96*u^6 + 72*u^7 + 34*u^8 + 9*u^9 + u^10", "1 + 4*u + 14*u^2 + 17*u^3 + 36*u^4 + 4*u^5 - 26*u^6 - u^7 + 6*u^8 - 3*u^9 + u^10" ], "Multiplicity":1, "MinRepresentationVolume":[ "{5, 6}", 1.97177 ], "ij_list":[ [ "{2, 5}", "{3, 5}" ], [ "{2, 3}" ], [ "{3, 8}" ], [ "{5, 10}" ], [ "{6, 8}" ], [ "{2, 4}", "{3, 6}" ], [ "{1, 3}", "{1, 4}", "{4, 6}", "{4, 7}" ], [ "{3, 4}", "{6, 7}" ], [ "{1, 2}" ], [ "{1, 9}" ], [ "{1, 6}", "{2, 6}" ], [ "{1, 7}" ], [ "{2, 10}" ], [ "{2, 7}" ], [ "{3, 9}", "{3, 10}" ], [ "{2, 8}", "{2, 9}" ], [ "{4, 9}" ], [ "{4, 10}" ], [ "{1, 10}" ], [ "{7, 8}" ], [ "{3, 7}" ], [ "{7, 9}" ], [ "{5, 9}", "{6, 9}" ], [ "{4, 5}", "{9, 10}" ], [ "{4, 8}", "{5, 8}" ], [ "{1, 5}" ], [ "{7, 10}", "{8, 10}" ], [ "{5, 7}" ], [ "{5, 6}", "{8, 9}" ], [ "{6, 10}" ], [ "{1, 8}" ] ], "SortedReprnIndices":"{8, 7, 10, 9, 2, 1, 4, 3, 6, 5}", "aCuspShapeN":[ "-7.4942569953632865892`4.844391074125864 + 13.1842339401780445978`5.089717392666994*I", "-7.4942569953632865892`4.844391074125864 - 13.1842339401780445978`5.089717392666994*I", "-9.2577942681581347528`5.136019574965055 + 2.4323935321752797739`4.555545889481035*I", "-9.2577942681581347528`5.136019574965055 - 2.4323935321752797739`4.555545889481035*I", "-10.1871396921936579047`5.129345599737651 + 3.2598682013825895866`4.634493379842102*I", "-10.1871396921936579047`5.129345599737651 - 3.2598682013825895866`4.634493379842102*I", "-2.9849237937669004893`4.883700268981514 + 4.640455386008169342`5.075327622736575*I", "-2.9849237937669004893`4.883700268981514 - 4.640455386008169342`5.075327622736575*I", "-4.5758852505180202778`5.038741853176859 + 3.7544405506328645858`4.9528119599783755*I", "-4.5758852505180202778`5.038741853176859 - 3.7544405506328645858`4.9528119599783755*I" ], "Abelian":false }, { "IdealName":"abJ10_121_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":0.110781, "TimingZeroDimVars":7.8461e-2, "TimingmagmaVCompNormalize":7.9944e-2, "TimingNumberOfSols":2.874e-2, "TimingIsRadical":1.8830000000000001e-3, "TimingArcColoring":6.8951e-2, "TimingObstruction":4.5000000000000004e-4, "TimingComplexVolumeN":0.309138, "TimingaCuspShapeN":4.574e-3, "TiminguValues":0.6321, "TiminguPolysN":7.2e-5, "TiminguPolys":0.807998, "TimingaCuspShape":8.839600000000003e-2, "TimingRepresentationsN":2.8093e-2, "TiminguValues_ij":0.155778, "TiminguPoly_ij":0.152276, "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 + u^2)^22*(1 - 2*u + 4*u^2 - 3*u^3 + 6*u^4 - 3*u^5 + 6*u^6 - u^7 + 4*u^8 + u^10)*(2048 - 18432*u + 82432*u^2 - 237824*u^3 + 483328*u^4 - 703616*u^5 + 680192*u^6 - 233472*u^7 - 599544*u^8 + 1528920*u^9 - 2179488*u^10 + 2327055*u^11 - 2008851*u^12 + 1446505*u^13 - 881365*u^14 + 456977*u^15 - 201544*u^16 + 75179*u^17 - 23442*u^18 + 5991*u^19 - 1215*u^20 + 185*u^21 - 19*u^22 + u^23)", "(1 - u - u^2 + 4*u^3 - 3*u^4 - 3*u^5 + 12*u^6 - 16*u^7 + 12*u^8 - 5*u^9 + u^10)*(-1 + 3*u^2 + 3*u^3 - 3*u^4 - 8*u^5 - 4*u^6 + 8*u^7 + 15*u^8 + 12*u^9 + 5*u^10 + u^11)^4*(4 - 10*u - 19*u^2 + 61*u^3 + 162*u^4 - 1044*u^5 + 2836*u^6 - 6097*u^7 + 11870*u^8 - 19484*u^9 + 23997*u^10 - 18629*u^11 + 1917*u^12 + 18717*u^13 - 32413*u^14 + 33738*u^15 - 25646*u^16 + 15010*u^17 - 6861*u^18 + 2435*u^19 - 655*u^20 + 127*u^21 - 16*u^22 + u^23)", "(1 - u - 3*u^2 + 3*u^3 + 11*u^4 + 7*u^5 - u^6 - u^7 + 3*u^8 + 3*u^9 + u^10)*(1 + 2*u + 10*u^2 + 30*u^3 + 37*u^4 + 127*u^5 + 78*u^6 + 262*u^7 + 115*u^8 + 330*u^9 + 118*u^10 + 305*u^11 + 90*u^12 + 229*u^13 + 65*u^14 + 136*u^15 + 32*u^16 + 63*u^17 + 15*u^18 + 22*u^19 + 3*u^20 + 5*u^21 + u^22 + u^23)*(1 - 8*u + 28*u^2 - 4*u^3 - 234*u^4 + 629*u^5 + 329*u^6 - 3155*u^7 + 2520*u^8 + 9840*u^9 - 8989*u^10 - 19273*u^11 + 25314*u^12 + 41201*u^13 - 41392*u^14 - 88923*u^15 + 25007*u^16 + 140143*u^17 + 49735*u^18 - 125802*u^19 - 123511*u^20 + 38012*u^21 + 120235*u^22 + 41536*u^23 - 53049*u^24 - 50473*u^25 + 1746*u^26 + 22709*u^27 + 9147*u^28 - 3420*u^29 - 3349*u^30 - 211*u^31 + 558*u^32 + 661*u^33 + 860*u^34 + 549*u^35 + 39*u^36 - 104*u^37 + 17*u^38 + 69*u^39 + 26*u^40 - 5*u^41 - 4*u^42 + u^43 + u^44)", "(1 - 4*u + 5*u^2 - u^3 - 2*u^4 + 3*u^6 - 2*u^7 - u^8 + u^9 + u^10)*(1 + u + u^2 + 8*u^3 + 18*u^4 - 4*u^5 - 33*u^6 + 8*u^7 + 49*u^8 + 12*u^9 - 38*u^10 - 19*u^11 + 25*u^12 + 16*u^13 - 9*u^14 + 9*u^15 - 7*u^16 - 10*u^17 + 8*u^18 + 10*u^19 - 4*u^20 - 3*u^21 + u^22 + u^23)*(289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 196403*u^24 - 95423*u^25 + 136934*u^26 + 52883*u^27 - 80197*u^28 - 25972*u^29 + 38807*u^30 + 10739*u^31 - 14636*u^32 - 3651*u^33 + 4000*u^34 + 995*u^35 - 627*u^36 - 204*u^37 + u^38 + 15*u^39 + 34*u^40 - u^41 - 6*u^42 - u^43 + u^44)", "(1 + u + 4*u^2 + 4*u^3 + 8*u^4 + 5*u^5 + 7*u^6 + 2*u^7 + 3*u^8 + u^9 + u^10)*(1 + 2*u - u^2 - 2*u^3 - 5*u^4 + 10*u^5 - 7*u^6 - 16*u^7 + 24*u^8 + 23*u^9 - 62*u^10 - 8*u^11 + 72*u^12 + u^13 - 61*u^14 + 16*u^15 + 34*u^16 - 8*u^17 - 13*u^18 + 8*u^19 + 4*u^20 - u^21 - u^22 + u^23)*(1 + 14*u + 70*u^2 + 224*u^3 + 874*u^4 + 1403*u^5 + 5195*u^6 + 4073*u^7 + 18752*u^8 + 2630*u^9 + 47049*u^10 - 20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 920*u^37 + 513*u^38 - 191*u^39 + 94*u^40 - 27*u^41 + 12*u^42 - 3*u^43 + u^44)", "(1 - u - 3*u^2 + 3*u^3 + 11*u^4 + 7*u^5 - u^6 - u^7 + 3*u^8 + 3*u^9 + u^10)*(1 + 2*u + 10*u^2 + 30*u^3 + 37*u^4 + 127*u^5 + 78*u^6 + 262*u^7 + 115*u^8 + 330*u^9 + 118*u^10 + 305*u^11 + 90*u^12 + 229*u^13 + 65*u^14 + 136*u^15 + 32*u^16 + 63*u^17 + 15*u^18 + 22*u^19 + 3*u^20 + 5*u^21 + u^22 + u^23)*(1 - 8*u + 28*u^2 - 4*u^3 - 234*u^4 + 629*u^5 + 329*u^6 - 3155*u^7 + 2520*u^8 + 9840*u^9 - 8989*u^10 - 19273*u^11 + 25314*u^12 + 41201*u^13 - 41392*u^14 - 88923*u^15 + 25007*u^16 + 140143*u^17 + 49735*u^18 - 125802*u^19 - 123511*u^20 + 38012*u^21 + 120235*u^22 + 41536*u^23 - 53049*u^24 - 50473*u^25 + 1746*u^26 + 22709*u^27 + 9147*u^28 - 3420*u^29 - 3349*u^30 - 211*u^31 + 558*u^32 + 661*u^33 + 860*u^34 + 549*u^35 + 39*u^36 - 104*u^37 + 17*u^38 + 69*u^39 + 26*u^40 - 5*u^41 - 4*u^42 + u^43 + u^44)", "(1 - 4*u + 10*u^2 - 18*u^3 + 24*u^4 - 27*u^5 + 24*u^6 - 16*u^7 + 9*u^8 - 3*u^9 + u^10)*(1 + 2*u + 5*u^2 + 9*u^3 + 15*u^4 + 18*u^5 + 20*u^6 + 18*u^7 + 13*u^8 + 8*u^9 + 3*u^10 + u^11)^4*(16 - 108*u + 407*u^2 - 1046*u^3 + 1957*u^4 - 2631*u^5 + 2089*u^6 + 747*u^7 - 6344*u^8 + 13969*u^9 - 21703*u^10 + 27206*u^11 - 28821*u^12 + 26333*u^13 - 20941*u^14 + 14533*u^15 - 8785*u^16 + 4597*u^17 - 2060*u^18 + 777*u^19 - 240*u^20 + 58*u^21 - 10*u^22 + u^23)", "(1 + u + 4*u^2 + 4*u^3 + 8*u^4 + 5*u^5 + 7*u^6 + 2*u^7 + 3*u^8 + u^9 + u^10)*(1 + 2*u - u^2 - 2*u^3 - 5*u^4 + 10*u^5 - 7*u^6 - 16*u^7 + 24*u^8 + 23*u^9 - 62*u^10 - 8*u^11 + 72*u^12 + u^13 - 61*u^14 + 16*u^15 + 34*u^16 - 8*u^17 - 13*u^18 + 8*u^19 + 4*u^20 - u^21 - u^22 + u^23)*(1 + 14*u + 70*u^2 + 224*u^3 + 874*u^4 + 1403*u^5 + 5195*u^6 + 4073*u^7 + 18752*u^8 + 2630*u^9 + 47049*u^10 - 20611*u^11 + 94232*u^12 - 80883*u^13 + 168208*u^14 - 167145*u^15 + 263867*u^16 - 252517*u^17 + 342193*u^18 - 308792*u^19 + 368297*u^20 - 311554*u^21 + 337097*u^22 - 265870*u^23 + 263867*u^24 - 194673*u^25 + 177938*u^26 - 121843*u^27 + 103139*u^28 - 65154*u^29 + 50959*u^30 - 29477*u^31 + 21376*u^32 - 11251*u^33 + 7546*u^34 - 3605*u^35 + 2205*u^36 - 920*u^37 + 513*u^38 - 191*u^39 + 94*u^40 - 27*u^41 + 12*u^42 - 3*u^43 + u^44)", "(1 - 4*u + 5*u^2 - u^3 - 2*u^4 + 3*u^6 - 2*u^7 - u^8 + u^9 + u^10)*(1 + u + u^2 + 8*u^3 + 18*u^4 - 4*u^5 - 33*u^6 + 8*u^7 + 49*u^8 + 12*u^9 - 38*u^10 - 19*u^11 + 25*u^12 + 16*u^13 - 9*u^14 + 9*u^15 - 7*u^16 - 10*u^17 + 8*u^18 + 10*u^19 - 4*u^20 - 3*u^21 + u^22 + u^23)*(289 - 918*u - 98*u^2 + 2868*u^3 + 702*u^4 - 11243*u^5 + 3859*u^6 + 27433*u^7 - 15106*u^8 - 62226*u^9 + 41091*u^10 + 115265*u^11 - 80366*u^12 - 180667*u^13 + 133186*u^14 + 238245*u^15 - 188299*u^16 - 268513*u^17 + 234423*u^18 + 256628*u^19 - 254005*u^20 - 212244*u^21 + 240551*u^22 + 151918*u^23 - 196403*u^24 - 95423*u^25 + 136934*u^26 + 52883*u^27 - 80197*u^28 - 25972*u^29 + 38807*u^30 + 10739*u^31 - 14636*u^32 - 3651*u^33 + 4000*u^34 + 995*u^35 - 627*u^36 - 204*u^37 + u^38 + 15*u^39 + 34*u^40 - u^41 - 6*u^42 - u^43 + u^44)", "(1 + 4*u + 10*u^2 + 18*u^3 + 24*u^4 + 27*u^5 + 24*u^6 + 16*u^7 + 9*u^8 + 3*u^9 + u^10)*(1 + 2*u + 5*u^2 + 9*u^3 + 15*u^4 + 18*u^5 + 20*u^6 + 18*u^7 + 13*u^8 + 8*u^9 + 3*u^10 + u^11)^4*(16 - 108*u + 407*u^2 - 1046*u^3 + 1957*u^4 - 2631*u^5 + 2089*u^6 + 747*u^7 - 6344*u^8 + 13969*u^9 - 21703*u^10 + 27206*u^11 - 28821*u^12 + 26333*u^13 - 20941*u^14 + 14533*u^15 - 8785*u^16 + 4597*u^17 - 2060*u^18 + 777*u^19 - 240*u^20 + 58*u^21 - 10*u^22 + u^23)" ], "RileyPolyC":[ "(1 + y + y^2)^22*(1 + 4*y + 16*y^2 + 39*y^3 + 70*y^4 + 91*y^5 + 86*y^6 + 59*y^7 + 28*y^8 + 8*y^9 + y^10)*(-4194304 + 2097152*y - 7602176*y^2 + 28901376*y^3 - 9142272*y^4 + 22585344*y^5 - 24014848*y^6 + 3507712*y^7 - 13141312*y^8 + 3263296*y^9 + 3989120*y^10 + 2911137*y^11 + 320469*y^12 - 151263*y^13 - 61101*y^14 + 19869*y^15 + 9796*y^16 - 769*y^17 - 1876*y^18 - 467*y^19 + 7*y^20 + 37*y^21 + 9*y^22 + y^23)", "(1 - 3*y + 3*y^2 + 8*y^3 + y^4 + 15*y^5 + 14*y^6 - 4*y^7 + 8*y^8 - y^9 + y^10)*(-1 + 6*y - 15*y^2 + 19*y^3 - 3*y^4 + 8*y^5 - 12*y^6 + 28*y^7 - 9*y^8 + 10*y^9 - y^10 + y^11)^4*(-16 + 252*y - 2877*y^2 + 8069*y^3 - 18864*y^4 + 76002*y^5 - 266158*y^6 + 439405*y^7 - 561556*y^8 + 543170*y^9 - 427877*y^10 + 370499*y^11 - 243239*y^12 + 174611*y^13 - 80613*y^14 + 46012*y^15 - 13512*y^16 + 6922*y^17 - 1211*y^18 + 659*y^19 - 67*y^20 + 39*y^21 - 2*y^22 + y^23)", "(1 - 7*y + 37*y^2 - 63*y^3 + 89*y^4 - 75*y^5 + 57*y^6 - 27*y^7 + 13*y^8 - 3*y^9 + y^10)*(-1 - 16*y - 54*y^2 + 512*y^3 + 5509*y^4 + 24861*y^5 + 70434*y^6 + 143078*y^7 + 225017*y^8 + 288638*y^9 + 312270*y^10 + 290417*y^11 + 234972*y^12 + 166595*y^13 + 103741*y^14 + 56796*y^15 + 27172*y^16 + 11323*y^17 + 4043*y^18 + 1232*y^19 + 307*y^20 + 63*y^21 + 9*y^22 + y^23)*(1 - 8*y + 252*y^2 - 2398*y^3 + 32772*y^4 - 294271*y^5 + 2215467*y^6 - 14627901*y^7 + 71563422*y^8 - 276514814*y^9 + 922228003*y^10 - 2597294749*y^11 + 5989803396*y^12 - 11160280687*y^13 + 16959509898*y^14 - 21487837907*y^15 + 23413609921*y^16 - 22634175149*y^17 + 19853712787*y^18 - 15967358340*y^19 + 11893802087*y^20 - 8367046006*y^21 + 5683234989*y^22 - 3733057710*y^23 + 2331968837*y^24 - 1366119411*y^25 + 757447618*y^26 - 402291843*y^27 + 204217681*y^28 - 97227990*y^29 + 43417045*y^30 - 18388735*y^31 + 7418648*y^32 - 2873057*y^33 + 1055166*y^34 - 372193*y^35 + 132567*y^36 - 44662*y^37 + 15073*y^38 - 4607*y^39 + 1516*y^40 - 337*y^41 + 78*y^42 - 9*y^43 + y^44)", "(1 - 6*y + 13*y^2 - 15*y^3 + 16*y^4 - 16*y^5 + 25*y^6 - 14*y^7 + 11*y^8 - 3*y^9 + y^10)*(-1 - y - 21*y^2 + 86*y^3 - 404*y^4 + 1334*y^5 - 2737*y^6 + 4266*y^7 - 5159*y^8 + 5532*y^9 - 4656*y^10 + 3161*y^11 - 631*y^12 - 1292*y^13 + 2187*y^14 - 1603*y^15 + 649*y^16 + 136*y^17 - 324*y^18 + 256*y^19 - 112*y^20 + 37*y^21 - 7*y^22 + y^23)*(83521 - 899368*y + 5681008*y^2 - 26774662*y^3 + 105862008*y^4 - 365878263*y^5 + 1124590987*y^6 - 3110811077*y^7 + 7777220670*y^8 - 17620555754*y^9 + 36313255875*y^10 - 68305213765*y^11 + 117683414708*y^12 - 186348895715*y^13 + 272080800930*y^14 - 367454494087*y^15 + 460458439409*y^16 - 536966339593*y^17 + 584320130383*y^18 - 594682825836*y^19 + 566935585403*y^20 - 506619481126*y^21 + 424175893449*y^22 - 332228267130*y^23 + 242752577909*y^24 - 164840388607*y^25 + 103517214754*y^26 - 59758188799*y^27 + 31478494033*y^28 - 14991474598*y^29 + 6377486429*y^30 - 2383380363*y^31 + 763178136*y^32 - 200533409*y^33 + 39282830*y^34 - 3918145*y^35 - 735173*y^36 + 466702*y^37 - 119099*y^38 + 16949*y^39 - 488*y^40 - 377*y^41 + 102*y^42 - 13*y^43 + y^44)", "(1 + 7*y + 24*y^2 + 52*y^3 + 82*y^4 + 95*y^5 + 77*y^6 + 44*y^7 + 19*y^8 + 5*y^9 + y^10)*(-1 + 6*y + y^2 + 48*y^3 - 191*y^4 + 358*y^5 - 521*y^6 + 734*y^7 - 1750*y^8 + 4177*y^9 - 7864*y^10 + 11614*y^11 - 13380*y^12 + 12767*y^13 - 9855*y^14 + 6598*y^15 - 3620*y^16 + 1818*y^17 - 721*y^18 + 284*y^19 - 74*y^20 + 25*y^21 - 3*y^22 + y^23)*(1 - 56*y + 376*y^2 + 43290*y^3 + 786092*y^4 + 7933485*y^5 + 54511875*y^6 + 278133171*y^7 + 1106597134*y^8 + 3545138966*y^9 + 9363319019*y^10 + 20785302295*y^11 + 39466181976*y^12 + 65227593693*y^13 + 95575631386*y^14 + 126517867953*y^15 + 153955535737*y^16 + 174548380647*y^17 + 185898888075*y^18 + 186637195200*y^19 + 176677076099*y^20 + 157440329690*y^21 + 131762752129*y^22 + 103327935262*y^23 + 75781966061*y^24 + 51902561369*y^25 + 33153014562*y^26 + 19723962021*y^27 + 10913229885*y^28 + 5605191566*y^29 + 2666356969*y^30 + 1171590633*y^31 + 474013596*y^32 + 175966623*y^33 + 59688810*y^34 + 18413687*y^35 + 5138439*y^36 + 1287994*y^37 + 287949*y^38 + 56665*y^39 + 9724*y^40 + 1407*y^41 + 170*y^42 + 15*y^43 + y^44)", "(1 - 7*y + 37*y^2 - 63*y^3 + 89*y^4 - 75*y^5 + 57*y^6 - 27*y^7 + 13*y^8 - 3*y^9 + y^10)*(-1 - 16*y - 54*y^2 + 512*y^3 + 5509*y^4 + 24861*y^5 + 70434*y^6 + 143078*y^7 + 225017*y^8 + 288638*y^9 + 312270*y^10 + 290417*y^11 + 234972*y^12 + 166595*y^13 + 103741*y^14 + 56796*y^15 + 27172*y^16 + 11323*y^17 + 4043*y^18 + 1232*y^19 + 307*y^20 + 63*y^21 + 9*y^22 + y^23)*(1 - 8*y + 252*y^2 - 2398*y^3 + 32772*y^4 - 294271*y^5 + 2215467*y^6 - 14627901*y^7 + 71563422*y^8 - 276514814*y^9 + 922228003*y^10 - 2597294749*y^11 + 5989803396*y^12 - 11160280687*y^13 + 16959509898*y^14 - 21487837907*y^15 + 23413609921*y^16 - 22634175149*y^17 + 19853712787*y^18 - 15967358340*y^19 + 11893802087*y^20 - 8367046006*y^21 + 5683234989*y^22 - 3733057710*y^23 + 2331968837*y^24 - 1366119411*y^25 + 757447618*y^26 - 402291843*y^27 + 204217681*y^28 - 97227990*y^29 + 43417045*y^30 - 18388735*y^31 + 7418648*y^32 - 2873057*y^33 + 1055166*y^34 - 372193*y^35 + 132567*y^36 - 44662*y^37 + 15073*y^38 - 4607*y^39 + 1516*y^40 - 337*y^41 + 78*y^42 - 9*y^43 + y^44)", "(1 + 4*y + 4*y^2 - 12*y^3 - 26*y^4 + 5*y^5 + 56*y^6 + 62*y^7 + 33*y^8 + 9*y^9 + y^10)*(-1 - 6*y - 19*y^2 - 37*y^3 - 55*y^4 - 56*y^5 - 24*y^6 + 20*y^7 + 35*y^8 + 22*y^9 + 7*y^10 + y^11)^4*(-256 - 1360*y - 2337*y^2 + 2566*y^3 + 15413*y^4 + 24299*y^5 + 24651*y^6 + 31431*y^7 + 45236*y^8 + 44949*y^9 + 24779*y^10 + 1182*y^11 - 13045*y^12 - 17231*y^13 - 13993*y^14 - 6497*y^15 + 433*y^16 + 3431*y^17 + 3012*y^18 + 1547*y^19 + 526*y^20 + 118*y^21 + 16*y^22 + y^23)", "(1 + 7*y + 24*y^2 + 52*y^3 + 82*y^4 + 95*y^5 + 77*y^6 + 44*y^7 + 19*y^8 + 5*y^9 + y^10)*(-1 + 6*y + y^2 + 48*y^3 - 191*y^4 + 358*y^5 - 521*y^6 + 734*y^7 - 1750*y^8 + 4177*y^9 - 7864*y^10 + 11614*y^11 - 13380*y^12 + 12767*y^13 - 9855*y^14 + 6598*y^15 - 3620*y^16 + 1818*y^17 - 721*y^18 + 284*y^19 - 74*y^20 + 25*y^21 - 3*y^22 + y^23)*(1 - 56*y + 376*y^2 + 43290*y^3 + 786092*y^4 + 7933485*y^5 + 54511875*y^6 + 278133171*y^7 + 1106597134*y^8 + 3545138966*y^9 + 9363319019*y^10 + 20785302295*y^11 + 39466181976*y^12 + 65227593693*y^13 + 95575631386*y^14 + 126517867953*y^15 + 153955535737*y^16 + 174548380647*y^17 + 185898888075*y^18 + 186637195200*y^19 + 176677076099*y^20 + 157440329690*y^21 + 131762752129*y^22 + 103327935262*y^23 + 75781966061*y^24 + 51902561369*y^25 + 33153014562*y^26 + 19723962021*y^27 + 10913229885*y^28 + 5605191566*y^29 + 2666356969*y^30 + 1171590633*y^31 + 474013596*y^32 + 175966623*y^33 + 59688810*y^34 + 18413687*y^35 + 5138439*y^36 + 1287994*y^37 + 287949*y^38 + 56665*y^39 + 9724*y^40 + 1407*y^41 + 170*y^42 + 15*y^43 + y^44)", "(1 - 6*y + 13*y^2 - 15*y^3 + 16*y^4 - 16*y^5 + 25*y^6 - 14*y^7 + 11*y^8 - 3*y^9 + y^10)*(-1 - y - 21*y^2 + 86*y^3 - 404*y^4 + 1334*y^5 - 2737*y^6 + 4266*y^7 - 5159*y^8 + 5532*y^9 - 4656*y^10 + 3161*y^11 - 631*y^12 - 1292*y^13 + 2187*y^14 - 1603*y^15 + 649*y^16 + 136*y^17 - 324*y^18 + 256*y^19 - 112*y^20 + 37*y^21 - 7*y^22 + y^23)*(83521 - 899368*y + 5681008*y^2 - 26774662*y^3 + 105862008*y^4 - 365878263*y^5 + 1124590987*y^6 - 3110811077*y^7 + 7777220670*y^8 - 17620555754*y^9 + 36313255875*y^10 - 68305213765*y^11 + 117683414708*y^12 - 186348895715*y^13 + 272080800930*y^14 - 367454494087*y^15 + 460458439409*y^16 - 536966339593*y^17 + 584320130383*y^18 - 594682825836*y^19 + 566935585403*y^20 - 506619481126*y^21 + 424175893449*y^22 - 332228267130*y^23 + 242752577909*y^24 - 164840388607*y^25 + 103517214754*y^26 - 59758188799*y^27 + 31478494033*y^28 - 14991474598*y^29 + 6377486429*y^30 - 2383380363*y^31 + 763178136*y^32 - 200533409*y^33 + 39282830*y^34 - 3918145*y^35 - 735173*y^36 + 466702*y^37 - 119099*y^38 + 16949*y^39 - 488*y^40 - 377*y^41 + 102*y^42 - 13*y^43 + y^44)", "(1 + 4*y + 4*y^2 - 12*y^3 - 26*y^4 + 5*y^5 + 56*y^6 + 62*y^7 + 33*y^8 + 9*y^9 + y^10)*(-1 - 6*y - 19*y^2 - 37*y^3 - 55*y^4 - 56*y^5 - 24*y^6 + 20*y^7 + 35*y^8 + 22*y^9 + 7*y^10 + y^11)^4*(-256 - 1360*y - 2337*y^2 + 2566*y^3 + 15413*y^4 + 24299*y^5 + 24651*y^6 + 31431*y^7 + 45236*y^8 + 44949*y^9 + 24779*y^10 + 1182*y^11 - 13045*y^12 - 17231*y^13 - 13993*y^14 - 6497*y^15 + 433*y^16 + 3431*y^17 + 3012*y^18 + 1547*y^19 + 526*y^20 + 118*y^21 + 16*y^22 + y^23)" ] }, "GeometricRepresentation":[ 1.6974899999999998e1, [ "J10_121_0", 1, "{14, 15}" ] ] } }