{ "Index":190, "Name":"10_106", "RolfsenName":"10_106", "DTname":"10a_95", "TunnelNumber":2, "BridgeNumber":"Not implemented", "Hyperbolic":true, "Diagram":{ "Scode":"{14, -10, 16, 12, -2, -18, 20, 4, 6, -8}", "Acode":"{8, -6, 9, 7, -2, -10, 1, 3, 4, -5}", "PDcode":[ "{1, 15, 2, 14}", "{3, 10, 4, 11}", "{5, 17, 6, 16}", "{7, 13, 8, 12}", "{9, 2, 10, 3}", "{11, 18, 12, 19}", "{13, 1, 14, 20}", "{15, 5, 16, 4}", "{17, 7, 18, 6}", "{19, 8, 20, 9}" ], "CBtype":"{3, 0}", "ParabolicReps":{ "SolvingSeq":[ "{8, 3, 6}", [], [ "{8, 3, 9, 1}", "{3, 9, 4, 1}", "{9, 4, 10, 1}", "{3, -6, 2, 2}", "{2, 8, 1, 2}", "{6, -2, 5, 2}", "{8, 1, 7, 2}" ], "{4, 6}", "{10}", 10 ], "SolvingSeqIdx":1, "Comps":{ "u":{ "CheckEq":[ "-a - 2*u + a^3*u^2 + 4*u^3 - 2*a^2*u^3 - 6*a*b*u^3 + 2*a^3*b*u^3 + 3*a^2*b^2*u^3 - 4*u^5 + 5*a^2*u^5 - a^4*u^5 + 12*a*b*u^5 - 11*a^3*b*u^5 + 2*a^5*b*u^5 - 14*a^2*b^2*u^5 + 9*a^4*b^2*u^5 - a^6*b^2*u^5 + 8*a^3*b^3*u^5 - 3*a^5*b^3*u^5 - 2*a^4*b^4*u^5 + u^7 - 2*a^2*u^7 + a^4*u^7 - 4*a*b*u^7 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"2*u^2 - u^4" ] ], "Obstruction":-1, "ComplexVolumeN":[ "-0.67462 + 9.52466*I", "-0.67462 - 9.52466*I", -1.64188, "-1.18856 - 3.53262*I", "-1.18856 + 3.53262*I", "3.29761 - 4.06547*I", "3.29761 + 4.06547*I", "-3.4229 - 4.16688*I", "-3.4229 + 4.16688*I", "2.85501 + 0.22937*I", "2.85501 - 0.22937*I", "-3.63229 - 5.60644*I", "-3.63229 + 5.60644*I", "-4.94271 - 3.13295*I", "-4.94271 + 3.13295*I", "-5.00065 - 3.66933*I", "-5.00065 + 3.66933*I", "-2.64947 + 1.12815*I", "-2.64947 - 1.12815*I", "0.96132 + 2.87976*I", "0.96132 - 2.87976*I", "-6.97221 + 3.8785*I", "-6.97221 - 3.8785*I", "-0.205812 + 1.1821*I", "-0.205812 - 1.1821*I", "-3.11282 + 7.19611*I", "-3.11282 - 7.19611*I", "-10.2684 + 6.64183*I", "-10.2684 - 6.64183*I", "-7.3764 + 4.84807*I", "-7.3764 - 4.84807*I", "-7.3816 - 13.933*I", "-7.3816 + 13.933*I", "-10.12 - 0.2205*I", "-10.12 + 0.2205*I", -1.00861e1, "-1.44889 - 3.00326*I", "-1.44889 + 3.00326*I", 2.69998 ], "uPolysN":[ "4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39", "1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39", "1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39", "-47 + 145*u + 194*u^2 - 1038*u^3 - 164*u^4 + 3938*u^5 - 1393*u^6 - 10090*u^7 + 7684*u^8 + 18004*u^9 - 21940*u^10 - 21066*u^11 + 41725*u^12 + 11495*u^13 - 55873*u^14 + 9754*u^15 + 52280*u^16 - 28892*u^17 - 32898*u^18 + 33696*u^19 + 11847*u^20 - 26134*u^21 + 1402*u^22 + 14244*u^23 - 5349*u^24 - 4951*u^25 + 3742*u^26 + 887*u^27 - 1719*u^28 + 361*u^29 + 345*u^30 - 229*u^31 - 9*u^32 + 92*u^33 - 49*u^34 - 6*u^35 + 14*u^36 - u^37 - 3*u^38 + u^39", "1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39", "-19 - 10*u - 111*u^2 + 6*u^3 - 134*u^4 - 18*u^5 - 197*u^6 - 259*u^7 + 1297*u^8 - 882*u^9 - 623*u^10 + 1060*u^11 - 908*u^12 - 316*u^13 - 4022*u^14 - 433*u^15 + 32*u^16 - 3759*u^17 + 111*u^18 - 4855*u^19 + 1563*u^20 - 2714*u^21 - 89*u^22 + 140*u^23 - 1690*u^24 + 1573*u^25 - 2118*u^26 + 2108*u^27 - 1609*u^28 + 1284*u^29 - 932*u^30 + 672*u^31 - 336*u^32 + 215*u^33 - 106*u^34 + 56*u^35 - 17*u^36 + 9*u^37 - 3*u^38 + u^39", "4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39", "1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39", "1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39", "1 + 6*u - 20*u^2 + 24*u^3 - 58*u^4 + 187*u^5 - 475*u^6 + 720*u^7 - 757*u^8 + 439*u^9 - 405*u^10 + 105*u^11 - 199*u^12 + 337*u^13 - 520*u^14 + 495*u^15 - 645*u^16 + 614*u^17 - 493*u^18 + 659*u^19 - 614*u^20 + 785*u^21 - 1009*u^22 + 883*u^23 - 763*u^24 + 823*u^25 - 632*u^26 + 406*u^27 - 410*u^28 + 253*u^29 - 85*u^30 + 87*u^31 - 89*u^32 + 27*u^33 + 5*u^34 + 14*u^35 - 6*u^36 + u^37 + u^38 + u^39" ], "uPolys":[ "4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39", "1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39", "1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39", "-47 + 145*u + 194*u^2 - 1038*u^3 - 164*u^4 + 3938*u^5 - 1393*u^6 - 10090*u^7 + 7684*u^8 + 18004*u^9 - 21940*u^10 - 21066*u^11 + 41725*u^12 + 11495*u^13 - 55873*u^14 + 9754*u^15 + 52280*u^16 - 28892*u^17 - 32898*u^18 + 33696*u^19 + 11847*u^20 - 26134*u^21 + 1402*u^22 + 14244*u^23 - 5349*u^24 - 4951*u^25 + 3742*u^26 + 887*u^27 - 1719*u^28 + 361*u^29 + 345*u^30 - 229*u^31 - 9*u^32 + 92*u^33 - 49*u^34 - 6*u^35 + 14*u^36 - u^37 - 3*u^38 + u^39", "1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 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3*u^38 + u^39", "4 + 22*u + 133*u^2 + 418*u^3 + 517*u^4 + 1291*u^5 - 347*u^6 - 2894*u^7 - 2685*u^8 - 46786*u^9 + 30606*u^10 - 245479*u^11 + 190658*u^12 - 386127*u^13 + 372492*u^14 + 402710*u^15 - 2091026*u^16 + 5032089*u^17 - 9328127*u^18 + 13560798*u^19 - 16693043*u^20 + 18088800*u^21 - 16819879*u^22 + 14693194*u^23 - 10870965*u^24 + 8026077*u^25 - 4707295*u^26 + 3049939*u^27 - 1409837*u^28 + 789227*u^29 - 293890*u^30 + 137738*u^31 - 42442*u^32 + 15251*u^33 - 4673*u^34 + 971*u^35 - 233*u^36 + 63*u^37 - 12*u^38 + u^39", "-26829 - 271323*u - 1241622*u^2 - 3553461*u^3 - 8121815*u^4 - 16543097*u^5 - 36126247*u^6 - 102376896*u^7 - 226643919*u^8 - 178871465*u^9 + 370742607*u^10 + 992653506*u^11 + 570636787*u^12 - 769966199*u^13 - 1256721149*u^14 - 232807898*u^15 + 737258609*u^16 + 520573414*u^17 - 126946022*u^18 - 281535721*u^19 - 67449403*u^20 + 66446542*u^21 + 44364824*u^22 - 608805*u^23 - 10035642*u^24 - 3828147*u^25 + 209048*u^26 + 1041383*u^27 + 495494*u^28 - 128234*u^29 - 160233*u^30 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2*u^38 + u^39", "16 + 44*u - 1263*u^2 - 3806*u^3 + 35913*u^4 + 132330*u^5 - 297314*u^6 - 2051579*u^7 - 2723897*u^8 + 6576162*u^9 + 37716274*u^10 + 94205054*u^11 + 158193354*u^12 + 187642599*u^13 + 137994873*u^14 + 3337207*u^15 - 161665512*u^16 - 271786317*u^17 - 270661588*u^18 - 165536283*u^19 - 15145425*u^20 + 108975293*u^21 + 160422567*u^22 + 137627604*u^23 + 75868433*u^24 + 17937237*u^25 - 12881244*u^26 - 18191075*u^27 - 11560801*u^28 - 4290376*u^29 - 458767*u^30 + 576791*u^31 + 476030*u^32 + 216512*u^33 + 69348*u^34 + 16415*u^35 + 2855*u^36 + 349*u^37 + 27*u^38 + u^39", "229 + 1710*u + 4480*u^2 + 5737*u^3 + 23421*u^4 + 138955*u^5 + 460992*u^6 + 1443998*u^7 + 4601703*u^8 + 11342184*u^9 + 24605325*u^10 + 48687835*u^11 + 83871428*u^12 + 131283536*u^13 + 181011403*u^14 + 225820696*u^15 + 257332270*u^16 + 268676478*u^17 + 262824616*u^18 + 237315003*u^19 + 200683629*u^20 + 156725788*u^21 + 113360167*u^22 + 76002837*u^23 + 46696350*u^24 + 26853739*u^25 + 14002382*u^26 + 6934546*u^27 + 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5496876*u^10 - 10452088*u^11 + 683283*u^12 + 18385200*u^13 + 9188091*u^14 - 21943698*u^15 - 17862902*u^16 + 17565148*u^17 + 19895674*u^18 - 9488370*u^19 - 14833482*u^20 + 3033234*u^21 + 7994561*u^22 - 369113*u^23 - 3180931*u^24 - 118207*u^25 + 958324*u^26 + 69270*u^27 - 224196*u^28 - 17752*u^29 + 41477*u^30 + 3007*u^31 - 6237*u^32 - 359*u^33 + 804*u^34 + 48*u^35 - 79*u^36 - 5*u^37 + 6*u^38 + u^39", "-1 - 22*u - 209*u^2 - 1652*u^3 - 7098*u^4 - 26696*u^5 - 77165*u^6 - 207497*u^7 - 437389*u^8 - 848828*u^9 - 1346033*u^10 - 2111634*u^11 - 2501264*u^12 - 2787874*u^13 - 2332884*u^14 - 2655403*u^15 - 3226452*u^16 - 4764841*u^17 - 5869931*u^18 - 6281601*u^19 - 5789063*u^20 - 4179808*u^21 - 2887343*u^22 - 1234068*u^23 - 729232*u^24 - 11563*u^25 - 117184*u^26 + 97286*u^27 - 40943*u^28 + 41588*u^29 - 12336*u^30 + 15052*u^31 - 238*u^32 + 3913*u^33 + 446*u^34 + 560*u^35 + 67*u^36 + 39*u^37 + 3*u^38 + u^39", "48871 - 44030*u + 4999*u^2 + 383746*u^3 + 318787*u^4 - 1689000*u^5 + 4189319*u^6 - 3282555*u^7 + 534467*u^8 + 1079510*u^9 - 3650608*u^10 + 3175472*u^11 - 2961438*u^12 + 426121*u^13 + 2961585*u^14 + 1376313*u^15 + 885245*u^16 - 407725*u^17 - 1920972*u^18 - 367338*u^19 + 784193*u^20 + 104115*u^21 + 755001*u^22 + 432080*u^23 + 11458*u^24 - 231016*u^25 - 197009*u^26 - 54614*u^27 - 46603*u^28 + 11612*u^29 + 11851*u^30 + 11275*u^31 + 1956*u^32 + 368*u^33 + 184*u^34 + 167*u^35 + 41*u^36 + u^39", "1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39", "1132 - 20138*u + 92629*u^2 - 258160*u^3 + 831458*u^4 - 1865328*u^5 + 3355045*u^6 - 7226974*u^7 + 8136572*u^8 - 12244187*u^9 + 12874943*u^10 + 3063682*u^11 + 21692635*u^12 + 43394209*u^13 + 69207626*u^14 + 91034561*u^15 + 117022437*u^16 + 118828458*u^17 + 96606756*u^18 + 80518233*u^19 + 53611340*u^20 + 24479611*u^21 + 15670704*u^22 + 2541222*u^23 + 1001013*u^24 - 470628*u^25 - 94197*u^26 + 193237*u^27 + 282090*u^28 + 259463*u^29 + 157479*u^30 + 80108*u^31 + 35945*u^32 + 11745*u^33 + 4161*u^34 + 959*u^35 + 245*u^36 + 46*u^37 + 6*u^38 + u^39", "1031 - 9719*u + 128079*u^2 - 689654*u^3 + 2422553*u^4 - 7242181*u^5 + 15780845*u^6 - 18445653*u^7 + 11329061*u^8 - 44959151*u^9 + 173398011*u^10 - 287129000*u^11 + 207320298*u^12 - 45386182*u^13 + 67698792*u^14 - 194780319*u^15 + 181107943*u^16 - 75089024*u^17 + 31113055*u^18 - 35249022*u^19 + 29792514*u^20 - 14971044*u^21 + 5014390*u^22 - 1743264*u^23 - 36096*u^24 + 1465535*u^25 - 1276065*u^26 + 777296*u^27 - 497931*u^28 + 228255*u^29 - 103395*u^30 + 38218*u^31 - 14501*u^32 + 4904*u^33 - 1075*u^34 + 503*u^35 - 34*u^36 + 33*u^37 + u^39", "4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39", "-35591 + 143976*u + 362812*u^2 - 1290705*u^3 - 3404491*u^4 + 3167750*u^5 + 15797405*u^6 - 166971*u^7 - 37459134*u^8 - 11086317*u^9 + 44491220*u^10 + 17083835*u^11 - 15942906*u^12 - 5058846*u^13 - 17985172*u^14 - 16854712*u^15 + 12177268*u^16 + 46212171*u^17 + 11062355*u^18 - 79137013*u^19 + 1255718*u^20 + 79984497*u^21 - 31051693*u^22 - 41609703*u^23 + 31713922*u^24 + 8518687*u^25 - 13826501*u^26 + 531414*u^27 + 3351916*u^28 - 628474*u^29 - 495508*u^30 + 142174*u^31 + 45371*u^32 - 17041*u^33 - 2377*u^34 + 1220*u^35 + 55*u^36 - 51*u^37 + u^39", "-1 + 9*u + 32*u^2 - 21*u^3 + 179*u^4 + 502*u^5 - 4523*u^6 + 13296*u^7 - 22000*u^8 + 3425*u^9 + 42081*u^10 + 186468*u^11 - 1596184*u^12 + 5176481*u^13 - 10410694*u^14 + 14469435*u^15 - 14379077*u^16 + 10770797*u^17 - 8583588*u^18 + 12761599*u^19 - 23115542*u^20 + 33982601*u^21 - 38985248*u^22 + 35875892*u^23 - 27218464*u^24 + 17446879*u^25 - 9730337*u^26 + 4939115*u^27 - 2431965*u^28 + 1226580*u^29 - 631963*u^30 + 314182*u^31 - 141538*u^32 + 55293*u^33 - 18182*u^34 + 4899*u^35 - 1045*u^36 + 167*u^37 - 18*u^38 + u^39", "-47 + 145*u + 194*u^2 - 1038*u^3 - 164*u^4 + 3938*u^5 - 1393*u^6 - 10090*u^7 + 7684*u^8 + 18004*u^9 - 21940*u^10 - 21066*u^11 + 41725*u^12 + 11495*u^13 - 55873*u^14 + 9754*u^15 + 52280*u^16 - 28892*u^17 - 32898*u^18 + 33696*u^19 + 11847*u^20 - 26134*u^21 + 1402*u^22 + 14244*u^23 - 5349*u^24 - 4951*u^25 + 3742*u^26 + 887*u^27 - 1719*u^28 + 361*u^29 + 345*u^30 - 229*u^31 - 9*u^32 + 92*u^33 - 49*u^34 - 6*u^35 + 14*u^36 - u^37 - 3*u^38 + u^39", "-361 - 4118*u - 17533*u^2 - 36838*u^3 - 7440*u^4 + 226320*u^5 + 113517*u^6 + 107515*u^7 - 2639099*u^8 + 501940*u^9 - 1163405*u^10 + 11724322*u^11 - 3359778*u^12 + 979878*u^13 - 18807488*u^14 - 2060209*u^15 + 5952138*u^16 + 31267437*u^17 + 34846113*u^18 + 27174317*u^19 + 1418459*u^20 - 21437930*u^21 - 35414177*u^22 - 35427728*u^23 - 27588022*u^24 - 16691167*u^25 - 8212828*u^26 - 2798390*u^27 - 448793*u^28 + 340916*u^29 + 348522*u^30 + 218830*u^31 + 95964*u^32 + 36243*u^33 + 10492*u^34 + 2730*u^35 + 513*u^36 + 91*u^37 + 9*u^38 + u^39", "-1739 - 1314*u + 7210*u^2 + 50262*u^3 + 9430*u^4 - 212645*u^5 - 484174*u^6 + 399468*u^7 + 1986149*u^8 - 1085449*u^9 - 4227398*u^10 + 1958093*u^11 + 4349061*u^12 + 2289002*u^13 - 6618918*u^14 - 8945495*u^15 + 8707031*u^16 + 5923871*u^17 - 14530716*u^18 - 12333064*u^19 + 9601938*u^20 + 9475549*u^21 - 2797597*u^22 - 6478259*u^23 + 2178463*u^24 + 8798819*u^25 + 7192337*u^26 + 2226202*u^27 - 167598*u^28 - 83639*u^29 + 30666*u^30 - 70508*u^31 - 41130*u^32 + 4828*u^33 + 5971*u^34 + 354*u^35 - 320*u^36 - 41*u^37 + 6*u^38 + u^39", "-1132 - 63890*u - 198971*u^2 - 613013*u^3 - 318899*u^4 - 68334*u^5 + 2218847*u^6 - 1117238*u^7 - 3686438*u^8 - 8806833*u^9 - 3738439*u^10 + 12096722*u^11 - 4300415*u^12 + 12652453*u^13 - 7070692*u^14 + 4672299*u^15 + 12571423*u^16 - 11513996*u^17 + 18518000*u^18 - 21260022*u^19 + 11444863*u^20 - 14018293*u^21 + 3468580*u^22 - 3280952*u^23 - 42785*u^24 + 1003878*u^25 - 425177*u^26 + 982259*u^27 - 158526*u^28 + 343453*u^29 - 30215*u^30 + 71030*u^31 - 3371*u^32 + 9481*u^33 - 213*u^34 + 816*u^35 - 6*u^36 + 42*u^37 + u^39", "-1051 - 3680*u - 9624*u^2 - 10670*u^3 + 270355*u^4 - 259800*u^5 - 491073*u^6 - 212039*u^7 + 1011922*u^8 + 4096068*u^9 - 5672720*u^10 - 9932420*u^11 + 17803996*u^12 + 9694124*u^13 - 30005882*u^14 - 10384917*u^15 + 59876483*u^16 - 31710771*u^17 - 34287199*u^18 + 33003357*u^19 + 23075240*u^20 - 35867766*u^21 - 7368528*u^22 + 31844137*u^23 - 10394480*u^24 - 13182647*u^25 + 11418310*u^26 - 350439*u^27 - 3212009*u^28 + 1198996*u^29 + 266911*u^30 - 261885*u^31 + 24110*u^32 + 23086*u^33 - 5922*u^34 - 690*u^35 + 392*u^36 - 16*u^37 - 9*u^38 + u^39", "-1 + 76*u + 4*u^2 + 1450*u^3 - 3234*u^4 - 9773*u^5 - 37627*u^6 - 81380*u^7 - 306847*u^8 - 386267*u^9 - 252643*u^10 - 350551*u^11 - 331457*u^12 - 153991*u^13 - 381364*u^14 - 618045*u^15 - 454469*u^16 - 503638*u^17 - 502501*u^18 - 226483*u^19 + 4958*u^20 + 88699*u^21 + 63473*u^22 + 103521*u^23 + 12359*u^24 - 29237*u^25 - 1570*u^26 - 28062*u^27 + 13200*u^28 + 21261*u^29 + 11303*u^30 + 18923*u^31 + 3513*u^32 + 5173*u^33 + 513*u^34 + 662*u^35 + 36*u^36 + 41*u^37 + u^38 + u^39", "-1 + 5*u - 71*u^2 - 1531*u^3 - 15930*u^4 - 96161*u^5 - 385792*u^6 - 1029241*u^7 - 1582644*u^8 - 385552*u^9 + 3861763*u^10 + 8033151*u^11 + 4749543*u^12 - 7624948*u^13 - 16589969*u^14 - 7449951*u^15 + 13260825*u^16 + 19752719*u^17 + 1780026*u^18 - 17408319*u^19 - 13297251*u^20 + 5011919*u^21 + 11989226*u^22 + 3429811*u^23 - 4633961*u^24 - 3673988*u^25 + 357573*u^26 + 1428631*u^27 + 382340*u^28 - 258841*u^29 - 162626*u^30 + 7767*u^31 + 29528*u^32 + 5829*u^33 - 2243*u^34 - 1040*u^35 - 26*u^36 + 62*u^37 + 14*u^38 + u^39", "1 + 6*u - 20*u^2 + 24*u^3 - 58*u^4 + 187*u^5 - 475*u^6 + 720*u^7 - 757*u^8 + 439*u^9 - 405*u^10 + 105*u^11 - 199*u^12 + 337*u^13 - 520*u^14 + 495*u^15 - 645*u^16 + 614*u^17 - 493*u^18 + 659*u^19 - 614*u^20 + 785*u^21 - 1009*u^22 + 883*u^23 - 763*u^24 + 823*u^25 - 632*u^26 + 406*u^27 - 410*u^28 + 253*u^29 - 85*u^30 + 87*u^31 - 89*u^32 + 27*u^33 + 5*u^34 + 14*u^35 - 6*u^36 + u^37 + u^38 + u^39", "-885847 - 5699653*u - 26437812*u^2 - 25141117*u^3 + 49783616*u^4 + 17906440*u^5 - 123229647*u^6 - 24500526*u^7 + 31768982*u^8 - 166237581*u^9 - 124547594*u^10 - 13081834*u^11 - 88303132*u^12 - 85017978*u^13 - 26229007*u^14 - 16398817*u^15 - 30552612*u^16 - 28453465*u^17 - 25521967*u^18 - 34150322*u^19 - 32271488*u^20 - 28543634*u^21 - 21473422*u^22 - 14838632*u^23 - 9138190*u^24 - 4507012*u^25 - 1878316*u^26 - 480237*u^27 + 94361*u^28 + 223980*u^29 + 184418*u^30 + 109721*u^31 + 53900*u^32 + 22026*u^33 + 7666*u^34 + 2236*u^35 + 535*u^36 + 100*u^37 + 13*u^38 + u^39", "1399 + 10592*u + 47785*u^2 + 98383*u^3 + 216312*u^4 + 123612*u^5 - 497315*u^6 - 2266077*u^7 - 1869707*u^8 + 2937725*u^9 + 8361321*u^10 + 1188270*u^11 - 13982071*u^12 - 10282729*u^13 + 15725740*u^14 + 25141242*u^15 - 7277828*u^16 - 33179358*u^17 - 12296942*u^18 + 20507631*u^19 + 21460148*u^20 - 943162*u^21 - 13151411*u^22 - 6123456*u^23 + 3248137*u^24 + 3851076*u^25 + 291096*u^26 - 1146852*u^27 - 430077*u^28 + 178031*u^29 + 133505*u^30 - 8274*u^31 - 22449*u^32 - 1987*u^33 + 2231*u^34 + 408*u^35 - 124*u^36 - 32*u^37 + 3*u^38 + u^39", "4 + 22*u + 133*u^2 + 418*u^3 + 517*u^4 + 1291*u^5 - 347*u^6 - 2894*u^7 - 2685*u^8 - 46786*u^9 + 30606*u^10 - 245479*u^11 + 190658*u^12 - 386127*u^13 + 372492*u^14 + 402710*u^15 - 2091026*u^16 + 5032089*u^17 - 9328127*u^18 + 13560798*u^19 - 16693043*u^20 + 18088800*u^21 - 16819879*u^22 + 14693194*u^23 - 10870965*u^24 + 8026077*u^25 - 4707295*u^26 + 3049939*u^27 - 1409837*u^28 + 789227*u^29 - 293890*u^30 + 137738*u^31 - 42442*u^32 + 15251*u^33 - 4673*u^34 + 971*u^35 - 233*u^36 + 63*u^37 - 12*u^38 + u^39", "-26829 - 271323*u - 1241622*u^2 - 3553461*u^3 - 8121815*u^4 - 16543097*u^5 - 36126247*u^6 - 102376896*u^7 - 226643919*u^8 - 178871465*u^9 + 370742607*u^10 + 992653506*u^11 + 570636787*u^12 - 769966199*u^13 - 1256721149*u^14 - 232807898*u^15 + 737258609*u^16 + 520573414*u^17 - 126946022*u^18 - 281535721*u^19 - 67449403*u^20 + 66446542*u^21 + 44364824*u^22 - 608805*u^23 - 10035642*u^24 - 3828147*u^25 + 209048*u^26 + 1041383*u^27 + 495494*u^28 - 128234*u^29 - 160233*u^30 + 7175*u^31 + 28748*u^32 - 461*u^33 - 3298*u^34 + 147*u^35 + 226*u^36 - 21*u^37 - 7*u^38 + u^39", "-19 - 10*u - 111*u^2 + 6*u^3 - 134*u^4 - 18*u^5 - 197*u^6 - 259*u^7 + 1297*u^8 - 882*u^9 - 623*u^10 + 1060*u^11 - 908*u^12 - 316*u^13 - 4022*u^14 - 433*u^15 + 32*u^16 - 3759*u^17 + 111*u^18 - 4855*u^19 + 1563*u^20 - 2714*u^21 - 89*u^22 + 140*u^23 - 1690*u^24 + 1573*u^25 - 2118*u^26 + 2108*u^27 - 1609*u^28 + 1284*u^29 - 932*u^30 + 672*u^31 - 336*u^32 + 215*u^33 - 106*u^34 + 56*u^35 - 17*u^36 + 9*u^37 - 3*u^38 + u^39", "1 - 4*u - 24*u^2 + 382*u^3 - 2387*u^4 + 9684*u^5 - 29639*u^6 + 76827*u^7 - 183256*u^8 + 398376*u^9 - 746952*u^10 + 1206051*u^11 - 1745053*u^12 + 2282805*u^13 - 2711906*u^14 + 3030743*u^15 - 3131782*u^16 + 2989940*u^17 - 2757944*u^18 + 2270157*u^19 - 1844689*u^20 + 1394007*u^21 - 928387*u^22 + 726439*u^23 - 340963*u^24 + 327340*u^25 - 83413*u^26 + 126118*u^27 - 8876*u^28 + 40363*u^29 + 2309*u^30 + 10314*u^31 + 1302*u^32 + 2003*u^33 + 294*u^34 + 276*u^35 + 36*u^36 + 24*u^37 + 2*u^38 + u^39", "16 + 44*u - 1263*u^2 - 3806*u^3 + 35913*u^4 + 132330*u^5 - 297314*u^6 - 2051579*u^7 - 2723897*u^8 + 6576162*u^9 + 37716274*u^10 + 94205054*u^11 + 158193354*u^12 + 187642599*u^13 + 137994873*u^14 + 3337207*u^15 - 161665512*u^16 - 271786317*u^17 - 270661588*u^18 - 165536283*u^19 - 15145425*u^20 + 108975293*u^21 + 160422567*u^22 + 137627604*u^23 + 75868433*u^24 + 17937237*u^25 - 12881244*u^26 - 18191075*u^27 - 11560801*u^28 - 4290376*u^29 - 458767*u^30 + 576791*u^31 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299863*u^26 + 190773*u^27 + 76525*u^28 + 46411*u^29 + 16386*u^30 + 9406*u^31 + 2916*u^32 + 1560*u^33 + 419*u^34 + 206*u^35 + 46*u^36 + 20*u^37 + 3*u^38 + u^39", "-477 - 2475*u + 1692*u^2 + 26253*u^3 + 62359*u^4 + 104677*u^5 + 148701*u^6 + 79046*u^7 - 171267*u^8 - 377009*u^9 - 321599*u^10 + 185380*u^11 + 1229815*u^12 + 2460385*u^13 + 3885107*u^14 + 5490038*u^15 + 7488973*u^16 + 10149590*u^17 + 12734776*u^18 + 12938917*u^19 + 13015521*u^20 + 11261432*u^21 + 9486216*u^22 + 6940753*u^23 + 4791458*u^24 + 3014949*u^25 + 1754768*u^26 + 955667*u^27 + 469780*u^28 + 231264*u^29 + 100297*u^30 + 43203*u^31 + 14240*u^32 + 4747*u^33 + 1268*u^34 + 391*u^35 + 90*u^36 + 11*u^37 + 3*u^38 + u^39", "2209 + 39261*u + 354072*u^2 + 2152154*u^3 + 9865504*u^4 + 36175188*u^5 + 109939511*u^6 + 283444112*u^7 + 630161348*u^8 + 1222878906*u^9 + 2091169188*u^10 + 3175713400*u^11 + 4311206807*u^12 + 5262130835*u^13 + 5804695905*u^14 + 5814769642*u^15 + 5313497702*u^16 + 4448084994*u^17 + 3424552548*u^18 + 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"TiminguPolys_ij_N":1.747e-3 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":4, "IsRadical":true, "ArcColoring":[ [ "-1 - u^3", -1 ], [ "-u^3", -1 ], [ 0, "u" ], [ "-u", "u - u^3" ], [ "1 + u^3", "u + u^2 - u^3" ], [ "-u", "u - u^3" ], [ "-u^3", -1 ], "{1, 0}", [ 1, "u^2" ], [ "1 - u^2", "-1 + 2*u^2 - u^3" ] ], "Obstruction":-1, "ComplexVolumeN":[ -1.64493, -1.64493, -1.64493, -1.64493 ], "uPolysN":[ "1 + 4*u + 6*u^2 + 4*u^3 + u^4", "1 - 2*u^2 + u^3 + u^4", "-1 - u^3 + u^4", "1 - 2*u^2 - u^3 + u^4", "1 - 2*u^2 + u^3 + u^4", "-1 - u^3 + u^4", "1 + 4*u + 6*u^2 + 4*u^3 + u^4", "-1 - u^3 + u^4", "-1 - u^3 + u^4", "1 + 4*u + u^2 + u^4" ], "uPolys":[ "(1 + u)^4", "1 - 2*u^2 + u^3 + u^4", "-1 - u^3 + u^4", "1 - 2*u^2 - u^3 + u^4", "1 - 2*u^2 + u^3 + u^4", "-1 - u^3 + u^4", "(1 + u)^4", "-1 - u^3 + u^4", "-1 - u^3 + u^4", "1 + 4*u + u^2 + u^4" ], "aCuspShape":-6, "RepresentationsN":[ [ "u->0.219447 + 0.914474 I", "a->-0.219447 - 0.914474 I", "b->0.75943 + 1.5471 I" ], [ "u->0.219447 - 0.914474 I", "a->-0.219447 + 0.914474 I", "b->0.75943 - 1.5471 I" ], [ "u->-0.819173", "a->0.819173", "b->-0.269472" ], [ "u->1.38028", "a->-1.38028", "b->-1.24938" ] ], "Epsilon":2.69854, "uPolys_ij":[ "(1 + u)^4", "u^4", "-1 - u^3 + u^4", "1 - 2*u^2 + u^3 + u^4", "1 - 2*u^2 - u^3 + u^4", "-1 + 10*u + 6*u^3 + u^4", "1 + 4*u + 6*u^2 + 5*u^3 + u^4", "1 + 4*u + u^2 + u^4", "11 + 6*u - 6*u^2 + u^3 + u^4", "1 - 4*u + 4*u^2 - u^3 + u^4", "1 - 14*u + 3*u^2 + 2*u^3 + u^4", "1 - 4*u + 6*u^2 - 5*u^3 + u^4", "-1 - 4*u - 7*u^2 - 2*u^3 + u^4", "-1 + 5*u^2 - 6*u^3 + u^4", "1 + 6*u + 2*u^2 - 3*u^3 + u^4", "-7 - 18*u - 14*u^2 - 3*u^3 + u^4" ], "GeometricComponent":0, "uPolys_ij_N":[ "1 + 4*u + 6*u^2 + 4*u^3 + u^4", "u^4", "-1 - u^3 + u^4", "1 - 2*u^2 + u^3 + u^4", "1 - 2*u^2 - u^3 + u^4", "-1 + 10*u + 6*u^3 + u^4", "1 + 4*u + 6*u^2 + 5*u^3 + u^4", "1 + 4*u + u^2 + u^4", "11 + 6*u - 6*u^2 + u^3 + u^4", "1 - 4*u + 4*u^2 - u^3 + u^4", "1 - 14*u + 3*u^2 + 2*u^3 + u^4", "1 - 4*u + 6*u^2 - 5*u^3 + u^4", "-1 - 4*u - 7*u^2 - 2*u^3 + u^4", "-1 + 5*u^2 - 6*u^3 + u^4", "1 + 6*u + 2*u^2 - 3*u^3 + u^4", "-7 - 18*u - 14*u^2 - 3*u^3 + u^4" ], "Multiplicity":1, "ij_list":[ [ "{1, 2}", "{1, 7}", "{1, 8}", "{2, 8}", "{7, 8}" ], [ "{2, 7}", "{4, 6}" ], [ "{2, 10}", "{3, 8}", "{3, 9}", "{4, 9}", "{4, 10}", "{6, 9}", "{6, 10}", "{7, 10}" ], [ "{2, 4}", "{2, 5}", "{2, 6}", "{3, 4}", "{3, 6}", "{8, 9}", "{9, 10}" ], [ "{4, 7}", "{5, 7}", "{6, 7}" ], [ "{5, 9}" ], [ "{3, 7}", "{4, 5}" ], [ "{1, 5}", "{3, 10}", "{4, 8}", "{5, 10}", "{6, 8}" ], [ "{1, 4}", "{1, 6}" ], [ "{5, 8}" ], [ "{1, 10}" ], [ "{2, 3}", "{5, 6}" ], [ "{2, 9}", "{7, 9}" ], [ "{1, 3}", "{3, 5}" ], [ "{8, 10}" ], [ "{1, 9}" ] ], "SortedReprnIndices":"{1, 2, 3, 4}", "aCuspShapeN":[ -6.0, -6.0, -6.0, -6.0 ], "Abelian":false }, { "IdealName":"J10_106_3", "Generators":[ "b", "-1 + a", "1 + u" ], "VariableOrder":[ "b", "a", "u" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":8.963800000000001e-2, "TimingZeroDimVars":7.1827e-2, "TimingmagmaVCompNormalize":7.3372e-2, "TimingNumberOfSols":2.7863000000000002e-2, "TimingIsRadical":1.953e-3, "TimingArcColoring":6.6414e-2, "TimingObstruction":4.09e-4, "TimingComplexVolumeN":0.700408, "TimingaCuspShapeN":4.717e-3, "TiminguValues":0.632708, "TiminguPolysN":9.1e-5, "TiminguPolys":0.81345, "TimingaCuspShape":9.7828e-2, "TimingRepresentationsN":2.6659000000000002e-2, "TiminguValues_ij":0.156255, "TiminguPoly_ij":0.344225, "TiminguPolys_ij_N":7.500000000000002e-5 }, "ZeroDimensionalVars":[ "b", "a", "u" ], "NumberOfSols":1, "IsRadical":true, "ArcColoring":[ "{0, -1}", "{1, -1}", "{0, -1}", "{1, 0}", "{0, 1}", "{1, 0}", "{1, -1}", "{1, 0}", "{1, 1}", "{0, 1}" ], "Obstruction":-1, "ComplexVolumeN":[ -1.64493 ], "uPolysN":[ "1 + u", "1 + u", "1 + u", "-1 + u", "1 + u", "1 + u", "1 + u", "1 + u", "1 + u", "u" ], "uPolys":[ "1 + u", "1 + u", "1 + u", "-1 + u", "1 + u", "1 + u", "1 + u", "1 + u", "1 + u", "u" ], "aCuspShape":-6, "RepresentationsN":[ [ "u->-1.", "a->1.", "b->0" ] ], "Epsilon":"Infinity", "uPolys_ij":[ "2 + u", "1 + u", "u", "-1 + u" ], "GeometricComponent":0, "uPolys_ij_N":[ "2 + u", "1 + u", "u", "-1 + u" ], "Multiplicity":1, "ij_list":[ [ "{2, 9}", "{7, 9}" ], [ "{1, 2}", "{1, 4}", "{1, 6}", "{1, 7}", "{1, 8}", "{1, 9}", "{2, 4}", "{2, 5}", "{2, 6}", "{2, 8}", "{2, 10}", "{3, 4}", "{3, 6}", "{3, 7}", "{3, 8}", "{3, 9}", "{4, 5}", "{4, 9}", "{4, 10}", "{6, 9}", "{6, 10}", "{7, 8}", "{7, 10}", "{8, 9}", "{8, 10}", "{9, 10}" ], [ "{1, 3}", "{1, 5}", "{1, 10}", "{2, 7}", "{3, 5}", "{3, 10}", "{4, 6}", "{4, 8}", "{5, 10}", "{6, 8}" ], [ "{2, 3}", "{4, 7}", "{5, 6}", "{5, 7}", "{5, 8}", "{5, 9}", "{6, 7}" ] ], "SortedReprnIndices":"{1}", "aCuspShapeN":[ -6.0 ], "Abelian":false }, { "IdealName":"abJ10_106_4", "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":8.728e-2, "TimingZeroDimVars":6.6514e-2, "TimingmagmaVCompNormalize":6.7887e-2, "TimingNumberOfSols":2.6136e-2, "TimingIsRadical":1.7980000000000001e-3, "TimingArcColoring":6.807e-2, "TimingObstruction":3.89e-4, "TimingComplexVolumeN":0.539986, "TimingaCuspShapeN":4.4340000000000004e-3, "TiminguValues":0.627621, "TiminguPolysN":7.6e-5, "TiminguPolys":0.811842, "TimingaCuspShape":9.8288e-2, "TimingRepresentationsN":2.7812000000000003e-2, "TiminguValues_ij":0.154567, "TiminguPoly_ij":0.152872, "TiminguPolys_ij_N":2.9e-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)^5*(1 - u - 3*u^2 + 3*u^3 + 2*u^4 - 3*u^5 - u^6 + u^7)*(4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39)", "(1 + u)*(1 - 2*u^2 + u^3 + u^4)*(1 - u - 3*u^2 + 2*u^3 + 3*u^4 - 3*u^5 - u^6 + u^7)*(1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39)", "(1 + u)*(-1 - u^3 + u^4)*(-1 + 2*u^2 + 4*u^3 - u^4 - 4*u^5 + u^7)*(1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39)", "(-1 + u)*(1 - 2*u^2 - u^3 + u^4)*(-1 + 3*u - 3*u^2 - u^3 + 4*u^4 - 2*u^5 + u^7)*(-47 + 145*u + 194*u^2 - 1038*u^3 - 164*u^4 + 3938*u^5 - 1393*u^6 - 10090*u^7 + 7684*u^8 + 18004*u^9 - 21940*u^10 - 21066*u^11 + 41725*u^12 + 11495*u^13 - 55873*u^14 + 9754*u^15 + 52280*u^16 - 28892*u^17 - 32898*u^18 + 33696*u^19 + 11847*u^20 - 26134*u^21 + 1402*u^22 + 14244*u^23 - 5349*u^24 - 4951*u^25 + 3742*u^26 + 887*u^27 - 1719*u^28 + 361*u^29 + 345*u^30 - 229*u^31 - 9*u^32 + 92*u^33 - 49*u^34 - 6*u^35 + 14*u^36 - u^37 - 3*u^38 + u^39)", "(1 + u)*(1 - 2*u^2 + u^3 + u^4)*(-1 - u + 3*u^2 + 2*u^3 - 3*u^4 - 3*u^5 + u^6 + u^7)*(1 - 3*u - 5*u^3 - u^4 - 2*u^5 + 29*u^6 + 12*u^7 - 116*u^8 - 109*u^9 + 47*u^10 + 584*u^11 + 494*u^12 - 1467*u^13 - 1466*u^14 + 1987*u^15 + 2301*u^16 - 1149*u^17 - 2658*u^18 - 697*u^19 + 2576*u^20 + 2151*u^21 - 2290*u^22 - 2264*u^23 + 1882*u^24 + 1411*u^25 - 1391*u^26 - 487*u^27 + 883*u^28 - 2*u^29 - 469*u^30 + 114*u^31 + 200*u^32 - 75*u^33 - 66*u^34 + 29*u^35 + 15*u^36 - 7*u^37 - 2*u^38 + u^39)", "(1 + u)*(-1 - u^3 + u^4)*(-1 - 2*u^3 + u^4 + u^7)*(-19 - 10*u - 111*u^2 + 6*u^3 - 134*u^4 - 18*u^5 - 197*u^6 - 259*u^7 + 1297*u^8 - 882*u^9 - 623*u^10 + 1060*u^11 - 908*u^12 - 316*u^13 - 4022*u^14 - 433*u^15 + 32*u^16 - 3759*u^17 + 111*u^18 - 4855*u^19 + 1563*u^20 - 2714*u^21 - 89*u^22 + 140*u^23 - 1690*u^24 + 1573*u^25 - 2118*u^26 + 2108*u^27 - 1609*u^28 + 1284*u^29 - 932*u^30 + 672*u^31 - 336*u^32 + 215*u^33 - 106*u^34 + 56*u^35 - 17*u^36 + 9*u^37 - 3*u^38 + u^39)", "(1 + u)^5*(-1 - u + 3*u^2 + 3*u^3 - 2*u^4 - 3*u^5 + u^6 + u^7)*(4 - 30*u + 107*u^2 - 292*u^3 + 601*u^4 - 686*u^5 + 202*u^6 + 839*u^7 - 2279*u^8 + 922*u^9 + 4734*u^10 - 4140*u^11 - 6624*u^12 + 8649*u^13 + 4665*u^14 - 11847*u^15 + 2558*u^16 + 9403*u^17 - 10754*u^18 + 33*u^19 + 11865*u^20 - 8973*u^21 - 5613*u^22 + 10188*u^23 - 811*u^24 - 5279*u^25 + 2642*u^26 + 527*u^27 - 1381*u^28 + 1138*u^29 + 67*u^30 - 829*u^31 + 284*u^32 + 276*u^33 - 164*u^34 - 41*u^35 + 43*u^36 - u^37 - 5*u^38 + u^39)", "(1 + u)*(-1 - u^3 + u^4)*(1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7)*(1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39)", "(1 + u)*(-1 - u^3 + u^4)*(1 - 2*u^2 + 4*u^3 + u^4 - 4*u^5 + u^7)*(1 - 12*u + 55*u^2 - 118*u^3 + 118*u^4 - 264*u^5 + 541*u^6 + 191*u^7 - 1833*u^8 + 1222*u^9 - 73*u^10 + 2418*u^11 + 1466*u^12 - 13968*u^13 + 3552*u^14 + 27655*u^15 - 10324*u^16 - 42081*u^17 + 13877*u^18 + 57507*u^19 - 13977*u^20 - 66920*u^21 + 9303*u^22 + 63250*u^23 - 1402*u^24 - 47907*u^25 - 3948*u^26 + 28740*u^27 + 4315*u^28 - 13364*u^29 - 2340*u^30 + 4672*u^31 + 776*u^32 - 1179*u^33 - 160*u^34 + 202*u^35 + 19*u^36 - 21*u^37 - u^38 + u^39)", "u*(1 + 4*u + u^2 + u^4)*(-1 - u^3 + 2*u^4 + u^7)*(1 + 6*u - 20*u^2 + 24*u^3 - 58*u^4 + 187*u^5 - 475*u^6 + 720*u^7 - 757*u^8 + 439*u^9 - 405*u^10 + 105*u^11 - 199*u^12 + 337*u^13 - 520*u^14 + 495*u^15 - 645*u^16 + 614*u^17 - 493*u^18 + 659*u^19 - 614*u^20 + 785*u^21 - 1009*u^22 + 883*u^23 - 763*u^24 + 823*u^25 - 632*u^26 + 406*u^27 - 410*u^28 + 253*u^29 - 85*u^30 + 87*u^31 - 89*u^32 + 27*u^33 + 5*u^34 + 14*u^35 - 6*u^36 + u^37 + u^38 + u^39)" ], "RileyPolyC":[ "(-1 + y)^5*(-1 + 7*y - 19*y^2 + 29*y^3 - 30*y^4 + 19*y^5 - 7*y^6 + y^7)*(-16 + 44*y + 1263*y^2 - 3806*y^3 - 35913*y^4 + 132330*y^5 + 297314*y^6 - 2051579*y^7 + 2723897*y^8 + 6576162*y^9 - 37716274*y^10 + 94205054*y^11 - 158193354*y^12 + 187642599*y^13 - 137994873*y^14 + 3337207*y^15 + 161665512*y^16 - 271786317*y^17 + 270661588*y^18 - 165536283*y^19 + 15145425*y^20 + 108975293*y^21 - 160422567*y^22 + 137627604*y^23 - 75868433*y^24 + 17937237*y^25 + 12881244*y^26 - 18191075*y^27 + 11560801*y^28 - 4290376*y^29 + 458767*y^30 + 576791*y^31 - 476030*y^32 + 216512*y^33 - 69348*y^34 + 16415*y^35 - 2855*y^36 + 349*y^37 - 27*y^38 + y^39)", "(-1 + y)*(1 - 4*y + 6*y^2 - 5*y^3 + y^4)*(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 9*y + 32*y^2 - 21*y^3 + 179*y^4 + 502*y^5 - 4523*y^6 + 13296*y^7 - 22000*y^8 + 3425*y^9 + 42081*y^10 + 186468*y^11 - 1596184*y^12 + 5176481*y^13 - 10410694*y^14 + 14469435*y^15 - 14379077*y^16 + 10770797*y^17 - 8583588*y^18 + 12761599*y^19 - 23115542*y^20 + 33982601*y^21 - 38985248*y^22 + 35875892*y^23 - 27218464*y^24 + 17446879*y^25 - 9730337*y^26 + 4939115*y^27 - 2431965*y^28 + 1226580*y^29 - 631963*y^30 + 314182*y^31 - 141538*y^32 + 55293*y^33 - 18182*y^34 + 4899*y^35 - 1045*y^36 + 167*y^37 - 18*y^38 + y^39)", "(-1 + y)*(1 - 2*y^2 - y^3 + y^4)*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-1 + 34*y - 429*y^2 + 6198*y^3 - 12048*y^4 + 69392*y^5 - 302267*y^6 + 988019*y^7 - 2174123*y^8 + 2691212*y^9 - 3013365*y^10 + 15176466*y^11 - 84339162*y^12 + 321563878*y^13 - 924739536*y^14 + 2164616915*y^15 - 4297950070*y^16 + 7366421537*y^17 - 11002474879*y^18 + 14477337549*y^19 - 16990795781*y^20 + 17960779670*y^21 - 17181740817*y^22 + 14877553416*y^23 - 11633841346*y^24 + 8185924657*y^25 - 5156749560*y^26 + 2888357806*y^27 - 1425868485*y^28 + 614077804*y^29 - 228150862*y^30 + 72249150*y^31 - 19241368*y^32 + 4242167*y^33 - 759036*y^34 + 107298*y^35 - 11523*y^36 + 883*y^37 - 43*y^38 + y^39)", "(-1 + y)*(1 - 4*y + 6*y^2 - 5*y^3 + y^4)*(-1 + 3*y - 7*y^2 + 13*y^3 - 6*y^4 + 2*y^5 - 4*y^6 + y^7)*(-2209 + 39261*y - 354072*y^2 + 2152154*y^3 - 9865504*y^4 + 36175188*y^5 - 109939511*y^6 + 283444112*y^7 - 630161348*y^8 + 1222878906*y^9 - 2091169188*y^10 + 3175713400*y^11 - 4311206807*y^12 + 5262130835*y^13 - 5804695905*y^14 + 5814769642*y^15 - 5313497702*y^16 + 4448084994*y^17 - 3424552548*y^18 + 2432696014*y^19 - 1597910477*y^20 + 970770462*y^21 - 544053386*y^22 + 279334320*y^23 - 129619037*y^24 + 53005075*y^25 - 18148926*y^26 + 4529551*y^27 - 307631*y^28 - 477087*y^29 + 351459*y^30 - 152511*y^31 + 46169*y^32 - 8592*y^33 - 3*y^34 + 712*y^35 - 294*y^36 + 73*y^37 - 11*y^38 + y^39)", "(-1 + y)*(1 - 4*y + 6*y^2 - 5*y^3 + y^4)*(-1 + 7*y - 19*y^2 + 30*y^3 - 29*y^4 + 19*y^5 - 7*y^6 + y^7)*(-1 + 9*y + 32*y^2 - 21*y^3 + 179*y^4 + 502*y^5 - 4523*y^6 + 13296*y^7 - 22000*y^8 + 3425*y^9 + 42081*y^10 + 186468*y^11 - 1596184*y^12 + 5176481*y^13 - 10410694*y^14 + 14469435*y^15 - 14379077*y^16 + 10770797*y^17 - 8583588*y^18 + 12761599*y^19 - 23115542*y^20 + 33982601*y^21 - 38985248*y^22 + 35875892*y^23 - 27218464*y^24 + 17446879*y^25 - 9730337*y^26 + 4939115*y^27 - 2431965*y^28 + 1226580*y^29 - 631963*y^30 + 314182*y^31 - 141538*y^32 + 55293*y^33 - 18182*y^34 + 4899*y^35 - 1045*y^36 + 167*y^37 - 18*y^38 + y^39)", "(-1 + y)*(1 - 2*y^2 - y^3 + y^4)*(-1 + 2*y^2 + 4*y^3 - y^4 - 4*y^5 + y^7)*(-361 - 4118*y - 17533*y^2 - 36838*y^3 - 7440*y^4 + 226320*y^5 + 113517*y^6 + 107515*y^7 - 2639099*y^8 + 501940*y^9 - 1163405*y^10 + 11724322*y^11 - 3359778*y^12 + 979878*y^13 - 18807488*y^14 - 2060209*y^15 + 5952138*y^16 + 31267437*y^17 + 34846113*y^18 + 27174317*y^19 + 1418459*y^20 - 21437930*y^21 - 35414177*y^22 - 35427728*y^23 - 27588022*y^24 - 16691167*y^25 - 8212828*y^26 - 2798390*y^27 - 448793*y^28 + 340916*y^29 + 348522*y^30 + 218830*y^31 + 95964*y^32 + 36243*y^33 + 10492*y^34 + 2730*y^35 + 513*y^36 + 91*y^37 + 9*y^38 + y^39)", "(-1 + y)^5*(-1 + 7*y - 19*y^2 + 29*y^3 - 30*y^4 + 19*y^5 - 7*y^6 + y^7)*(-16 + 44*y + 1263*y^2 - 3806*y^3 - 35913*y^4 + 132330*y^5 + 297314*y^6 - 2051579*y^7 + 2723897*y^8 + 6576162*y^9 - 37716274*y^10 + 94205054*y^11 - 158193354*y^12 + 187642599*y^13 - 137994873*y^14 + 3337207*y^15 + 161665512*y^16 - 271786317*y^17 + 270661588*y^18 - 165536283*y^19 + 15145425*y^20 + 108975293*y^21 - 160422567*y^22 + 137627604*y^23 - 75868433*y^24 + 17937237*y^25 + 12881244*y^26 - 18191075*y^27 + 11560801*y^28 - 4290376*y^29 + 458767*y^30 + 576791*y^31 - 476030*y^32 + 216512*y^33 - 69348*y^34 + 16415*y^35 - 2855*y^36 + 349*y^37 - 27*y^38 + y^39)", "(-1 + y)*(1 - 2*y^2 - y^3 + y^4)*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-1 + 34*y - 429*y^2 + 6198*y^3 - 12048*y^4 + 69392*y^5 - 302267*y^6 + 988019*y^7 - 2174123*y^8 + 2691212*y^9 - 3013365*y^10 + 15176466*y^11 - 84339162*y^12 + 321563878*y^13 - 924739536*y^14 + 2164616915*y^15 - 4297950070*y^16 + 7366421537*y^17 - 11002474879*y^18 + 14477337549*y^19 - 16990795781*y^20 + 17960779670*y^21 - 17181740817*y^22 + 14877553416*y^23 - 11633841346*y^24 + 8185924657*y^25 - 5156749560*y^26 + 2888357806*y^27 - 1425868485*y^28 + 614077804*y^29 - 228150862*y^30 + 72249150*y^31 - 19241368*y^32 + 4242167*y^33 - 759036*y^34 + 107298*y^35 - 11523*y^36 + 883*y^37 - 43*y^38 + y^39)", "(-1 + y)*(1 - 2*y^2 - y^3 + y^4)*(-1 + 4*y - 6*y^2 + 20*y^3 - 33*y^4 + 24*y^5 - 8*y^6 + y^7)*(-1 + 34*y - 429*y^2 + 6198*y^3 - 12048*y^4 + 69392*y^5 - 302267*y^6 + 988019*y^7 - 2174123*y^8 + 2691212*y^9 - 3013365*y^10 + 15176466*y^11 - 84339162*y^12 + 321563878*y^13 - 924739536*y^14 + 2164616915*y^15 - 4297950070*y^16 + 7366421537*y^17 - 11002474879*y^18 + 14477337549*y^19 - 16990795781*y^20 + 17960779670*y^21 - 17181740817*y^22 + 14877553416*y^23 - 11633841346*y^24 + 8185924657*y^25 - 5156749560*y^26 + 2888357806*y^27 - 1425868485*y^28 + 614077804*y^29 - 228150862*y^30 + 72249150*y^31 - 19241368*y^32 + 4242167*y^33 - 759036*y^34 + 107298*y^35 - 11523*y^36 + 883*y^37 - 43*y^38 + y^39)", "y*(1 - 14*y + 3*y^2 + 2*y^3 + y^4)*(-1 + 4*y^2 + y^3 - 4*y^4 - 2*y^5 + y^7)*(-1 + 76*y + 4*y^2 + 1450*y^3 - 3234*y^4 - 9773*y^5 - 37627*y^6 - 81380*y^7 - 306847*y^8 - 386267*y^9 - 252643*y^10 - 350551*y^11 - 331457*y^12 - 153991*y^13 - 381364*y^14 - 618045*y^15 - 454469*y^16 - 503638*y^17 - 502501*y^18 - 226483*y^19 + 4958*y^20 + 88699*y^21 + 63473*y^22 + 103521*y^23 + 12359*y^24 - 29237*y^25 - 1570*y^26 - 28062*y^27 + 13200*y^28 + 21261*y^29 + 11303*y^30 + 18923*y^31 + 3513*y^32 + 5173*y^33 + 513*y^34 + 662*y^35 + 36*y^36 + 41*y^37 + y^38 + y^39)" ] }, "GeometricRepresentation":[ 1.3933e1, [ "J10_106_0", 1, "{32, 33}" ] ] } }