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0.19809*I", "8.54985 - 3.07602*I", "8.54985 + 3.07602*I", "-1.16688 + 2.84021*I", "-1.16688 - 2.84021*I", "-0.073174 + 1.04774*I", "-0.073174 - 1.04774*I", "6.2486 + 2.92553*I", "6.2486 - 2.92553*I", "10.0015 - 6.93788*I", "10.0015 + 6.93788*I", "3.39122 + 8.09434*I", "3.39122 - 8.09434*I", "6.975 - 13.8661*I", "6.975 + 13.8661*I", "8.93627 + 1.59631*I", "8.93627 - 1.59631*I", "-2.32372 - 0.0123*I", "-2.32372 + 0.0123*I", "-0.113312 - 0.691322*I", "-0.113312 + 0.691322*I" ], "uPolysN":[ "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "32\/3 + (64*u)\/3 - 48*u^2 - 172*u^3 + (2044*u^4)\/3 - 251*u^5 - (2458*u^6)\/3 - (728*u^7)\/3 + 5509*u^8 - (11660*u^9)\/3 - (25175*u^10)\/3 + (14317*u^11)\/3 + (45679*u^12)\/3 - (28631*u^13)\/3 - (17042*u^14)\/3 + (24451*u^15)\/3 - (20851*u^16)\/3 - 12646*u^17 + 22142*u^18 + (35206*u^19)\/3 - (58252*u^20)\/3 - (18835*u^21)\/3 + (33448*u^22)\/3 - (9976*u^23)\/3 - 3283*u^24 + (20344*u^25)\/3 - (2915*u^26)\/3 - (17609*u^27)\/3 + 1385*u^28 + (9470*u^29)\/3 - 846*u^30 - (2539*u^31)\/3 + 228*u^32 + 122*u^33 + (169*u^34)\/3 + (119*u^35)\/3 - (43*u^36)\/3 - 15*u^37 + 10*u^38 + (19*u^39)\/3 + u^40", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "103\/3 - 64*u + 186*u^2 - (215*u^3)\/3 + (1019*u^4)\/3 + (844*u^5)\/3 - (1327*u^6)\/3 + (10510*u^7)\/3 - 3589*u^8 + (11690*u^9)\/3 + (19780*u^10)\/3 - (42866*u^11)\/3 + (72770*u^12)\/3 - 12100*u^13 + 1414*u^14 + (62432*u^15)\/3 - (53731*u^16)\/3 + (81578*u^17)\/3 - (12092*u^18)\/3 + 6837*u^19 + (54871*u^20)\/3 + 130*u^21 + 18701*u^22 + (12572*u^23)\/3 + (31814*u^24)\/3 + 9832*u^25 + 4888*u^26 + (21917*u^27)\/3 + (8878*u^28)\/3 + 3726*u^29 + 1952*u^30 + 1308*u^31 + (2819*u^32)\/3 + 262*u^33 + (1042*u^34)\/3 + 35*u^35 + (227*u^36)\/3 - (32*u^37)\/3 + (23*u^38)\/3 - (10*u^39)\/3 + u^40", "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "36 - 156*u + 235*u^2 + 175*u^3 - 1298*u^4 + 1788*u^5 + 945*u^6 - 6377*u^7 + 6375*u^8 + 7674*u^9 - 21586*u^10 + 4498*u^11 + 35376*u^12 - 30870*u^13 - 34718*u^14 + 56380*u^15 + 18142*u^16 - 63080*u^17 + 929*u^18 + 49725*u^19 - 9536*u^20 - 30312*u^21 + 8289*u^22 + 16015*u^23 - 4489*u^24 - 8140*u^25 + 2253*u^26 + 3945*u^27 - 1456*u^28 - 1444*u^29 + 896*u^30 + 240*u^31 - 382*u^32 + 80*u^33 + 103*u^34 - 75*u^35 - 4*u^36 + 20*u^37 - 3*u^38 - 3*u^39 + u^40", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40" ], "uPolys":[ "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "3*(32 + 64*u - 144*u^2 - 516*u^3 + 2044*u^4 - 753*u^5 - 2458*u^6 - 728*u^7 + 16527*u^8 - 11660*u^9 - 25175*u^10 + 14317*u^11 + 45679*u^12 - 28631*u^13 - 17042*u^14 + 24451*u^15 - 20851*u^16 - 37938*u^17 + 66426*u^18 + 35206*u^19 - 58252*u^20 - 18835*u^21 + 33448*u^22 - 9976*u^23 - 9849*u^24 + 20344*u^25 - 2915*u^26 - 17609*u^27 + 4155*u^28 + 9470*u^29 - 2538*u^30 - 2539*u^31 + 684*u^32 + 366*u^33 + 169*u^34 + 119*u^35 - 43*u^36 - 45*u^37 + 30*u^38 + 19*u^39 + 3*u^40)", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "3*(103 - 192*u + 558*u^2 - 215*u^3 + 1019*u^4 + 844*u^5 - 1327*u^6 + 10510*u^7 - 10767*u^8 + 11690*u^9 + 19780*u^10 - 42866*u^11 + 72770*u^12 - 36300*u^13 + 4242*u^14 + 62432*u^15 - 53731*u^16 + 81578*u^17 - 12092*u^18 + 20511*u^19 + 54871*u^20 + 390*u^21 + 56103*u^22 + 12572*u^23 + 31814*u^24 + 29496*u^25 + 14664*u^26 + 21917*u^27 + 8878*u^28 + 11178*u^29 + 5856*u^30 + 3924*u^31 + 2819*u^32 + 786*u^33 + 1042*u^34 + 105*u^35 + 227*u^36 - 32*u^37 + 23*u^38 - 10*u^39 + 3*u^40)", "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "36 - 156*u + 235*u^2 + 175*u^3 - 1298*u^4 + 1788*u^5 + 945*u^6 - 6377*u^7 + 6375*u^8 + 7674*u^9 - 21586*u^10 + 4498*u^11 + 35376*u^12 - 30870*u^13 - 34718*u^14 + 56380*u^15 + 18142*u^16 - 63080*u^17 + 929*u^18 + 49725*u^19 - 9536*u^20 - 30312*u^21 + 8289*u^22 + 16015*u^23 - 4489*u^24 - 8140*u^25 + 2253*u^26 + 3945*u^27 - 1456*u^28 - 1444*u^29 + 896*u^30 + 240*u^31 - 382*u^32 + 80*u^33 + 103*u^34 - 75*u^35 - 4*u^36 + 20*u^37 - 3*u^38 - 3*u^39 + u^40", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40" ], "aCuspShape":"-2 + (77349771729040236141716 - 453028714941175199523111*u + 620687385496257314441367*u^2 - 991308334663292567047636*u^3 + 959284126920471508006458*u^4 - 4321500602388315836248937*u^5 + 5934623579946785988393797*u^6 - 12520343122148608400038491*u^7 + 13399806485487953265507260*u^8 - 41640133259422982800151408*u^9 + 86094361316668433399867978*u^10 - 198945437951614549217812834*u^11 + 317179482756743969535355844*u^12 - 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0.070813 I" ], [ "u->0.424864 - 0.02763 I", "a->-1.51964 - 0.31762 I", "b->-1.26968 + 0.070813 I" ], [ "u->-0.186501 + 0.360437 I", "a->3.93271 - 1.95945 I", "b->-0.980417 - 0.195912 I" ], [ "u->-0.186501 - 0.360437 I", "a->3.93271 + 1.95945 I", "b->-0.980417 + 0.195912 I" ] ], "Epsilon":0.653176, "uPolys_ij":[ "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "1 + 4*u + 6*u^2 + 239*u^3 + 1095*u^4 + 3042*u^5 + 13111*u^6 + 22494*u^7 + 31523*u^8 - 291868*u^9 + 688944*u^10 - 2379734*u^11 + 6724728*u^12 - 15351088*u^13 + 34859112*u^14 - 75217796*u^15 + 143272115*u^16 - 243054732*u^17 + 376411998*u^18 - 537777123*u^19 + 711146355*u^20 - 872095710*u^21 + 992483607*u^22 - 1048807594*u^23 + 1030544560*u^24 - 941327964*u^25 + 794749964*u^26 - 612323721*u^27 + 423041924*u^28 - 257312604*u^29 + 135520700*u^30 - 60927492*u^31 + 23084057*u^32 - 7276436*u^33 + 1880486*u^34 - 391097*u^35 + 63799*u^36 - 7858*u^37 + 687*u^38 - 38*u^39 + u^40", "1697 + 150*u + 12996*u^2 - 32103*u^3 + 26597*u^4 - 163690*u^5 + 151663*u^6 - 329792*u^7 + 534849*u^8 - 525748*u^9 + 1655584*u^10 - 1231308*u^11 + 3955666*u^12 - 2678342*u^13 + 6561196*u^14 - 3454832*u^15 + 7466399*u^16 - 2693482*u^17 + 6197470*u^18 - 1216553*u^19 + 4016891*u^20 - 224490*u^21 + 2156719*u^22 + 109026*u^23 + 963302*u^24 + 123270*u^25 + 357946*u^26 + 60885*u^27 + 111210*u^28 + 20574*u^29 + 28244*u^30 + 5260*u^31 + 5933*u^32 + 1016*u^33 + 1010*u^34 + 169*u^35 + 141*u^36 + 20*u^37 + 15*u^38 + 2*u^39 + u^40", "9 - 54*u + 254*u^2 - 499*u^3 + 257*u^4 + 4008*u^5 - 13329*u^6 + 25510*u^7 - 20197*u^8 - 21976*u^9 + 136864*u^10 - 393918*u^11 + 978620*u^12 - 2127000*u^13 + 3983240*u^14 - 6579026*u^15 + 9748045*u^16 - 12773180*u^17 + 15653662*u^18 - 16841141*u^19 + 17743605*u^20 - 15974200*u^21 + 14734587*u^22 - 11264404*u^23 + 9083358*u^24 - 5977732*u^25 + 4181128*u^26 - 2390673*u^27 + 1439608*u^28 - 716112*u^29 + 367916*u^30 - 157998*u^31 + 68583*u^32 - 25012*u^33 + 9062*u^34 - 2715*u^35 + 805*u^36 - 184*u^37 + 43*u^38 - 6*u^39 + u^40", "9*(1024 - 13312*u + 217600*u^2 - 915856*u^3 + 5259656*u^4 - 16245105*u^5 + 68815932*u^6 - 198058404*u^7 + 559118935*u^8 - 1244242596*u^9 + 2404685585*u^10 - 3325715575*u^11 + 3050118125*u^12 - 280261067*u^13 - 3799839124*u^14 + 6632102875*u^15 - 4937560085*u^16 - 853770802*u^17 + 7139412006*u^18 - 9653874054*u^19 + 7112353724*u^20 - 2109686907*u^21 - 1915980574*u^22 + 3099817580*u^23 - 2085106321*u^24 + 508066440*u^25 + 497001301*u^26 - 700214121*u^27 + 491979321*u^28 - 229030454*u^29 + 69599062*u^30 - 9184727*u^31 - 3734506*u^32 + 2673038*u^33 - 833091*u^34 + 126539*u^35 + 12895*u^36 - 8113*u^37 + 2352*u^38 - 181*u^39 + 9*u^40)", "9*(26713 + 186499*u + 1989401*u^2 + 6644787*u^3 + 28167311*u^4 + 39069673*u^5 + 119860846*u^6 + 562187*u^7 + 234501071*u^8 - 363602328*u^9 + 301556870*u^10 - 1044239608*u^11 + 577398928*u^12 - 1544551036*u^13 + 1272551162*u^14 - 1450237972*u^15 + 1982441523*u^16 - 896373011*u^17 + 2139904167*u^18 - 358225193*u^19 + 1707434143*u^20 - 157090315*u^21 + 1004721600*u^22 - 91553979*u^23 + 449656048*u^24 - 40092121*u^25 + 175536789*u^26 - 9047341*u^27 + 57837474*u^28 + 3374712*u^29 + 12271062*u^30 + 3705802*u^31 + 1653911*u^32 + 1193883*u^33 + 311611*u^34 + 173119*u^35 + 51363*u^36 + 11641*u^37 + 2726*u^38 + 157*u^39 + 9*u^40)", "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "81 - 389*u - 2019*u^2 + 11473*u^3 + 112595*u^4 + 485253*u^5 + 1500788*u^6 + 3658481*u^7 + 7004679*u^8 + 10227166*u^9 + 10958862*u^10 + 8589282*u^11 + 7488548*u^12 + 15496844*u^13 + 35999480*u^14 + 60768232*u^15 + 73652727*u^16 + 64706733*u^17 + 40883439*u^18 + 20881583*u^19 + 18601271*u^20 + 32022209*u^21 + 47498656*u^22 + 52849489*u^23 + 45796240*u^24 + 32201673*u^25 + 19166969*u^26 + 10293399*u^27 + 5496888*u^28 + 3164920*u^29 + 1923320*u^30 + 1124908*u^31 + 587381*u^32 + 263235*u^33 + 99141*u^34 + 30841*u^35 + 7751*u^36 + 1521*u^37 + 220*u^38 + 21*u^39 + u^40", "3*(872 + 9496*u + 52278*u^2 + 275161*u^3 + 1428470*u^4 + 5591518*u^5 + 16532168*u^6 + 44352193*u^7 + 117755020*u^8 + 269941907*u^9 + 473342573*u^10 + 636758596*u^11 + 723490883*u^12 + 736713615*u^13 + 542619342*u^14 + 6147036*u^15 - 583677285*u^16 - 564587081*u^17 + 326891279*u^18 + 1367519835*u^19 + 1477655582*u^20 + 535735598*u^21 - 450052280*u^22 - 635365760*u^23 - 224805045*u^24 + 113109607*u^25 + 131473540*u^26 + 26107533*u^27 - 21684856*u^28 - 12549233*u^29 + 123834*u^30 + 1806366*u^31 + 352935*u^32 - 104768*u^33 - 36420*u^34 + 2525*u^35 + 1123*u^36 - 256*u^37 - 27*u^38 + 20*u^39 + 3*u^40)", "3*(773 + 8347*u + 52463*u^2 + 184363*u^3 + 421061*u^4 + 699993*u^5 + 563432*u^6 + 789935*u^7 + 7278579*u^8 + 34501792*u^9 + 113664700*u^10 + 276253542*u^11 + 534288250*u^12 + 859269812*u^13 + 1154546270*u^14 + 1323672338*u^15 + 1317193921*u^16 + 1157207821*u^17 + 948743321*u^18 + 766811009*u^19 + 597861713*u^20 + 454633665*u^21 + 326914416*u^22 + 190882251*u^23 + 112521168*u^24 + 56456215*u^25 + 19835985*u^26 + 6913657*u^27 + 4533884*u^28 + 154762*u^29 - 129722*u^30 + 349678*u^31 + 85283*u^32 - 36533*u^33 + 2247*u^34 + 5551*u^35 - 767*u^36 - 93*u^37 + 102*u^38 - 19*u^39 + 3*u^40)", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "36 - 156*u + 235*u^2 + 175*u^3 - 1298*u^4 + 1788*u^5 + 945*u^6 - 6377*u^7 + 6375*u^8 + 7674*u^9 - 21586*u^10 + 4498*u^11 + 35376*u^12 - 30870*u^13 - 34718*u^14 + 56380*u^15 + 18142*u^16 - 63080*u^17 + 929*u^18 + 49725*u^19 - 9536*u^20 - 30312*u^21 + 8289*u^22 + 16015*u^23 - 4489*u^24 - 8140*u^25 + 2253*u^26 + 3945*u^27 - 1456*u^28 - 1444*u^29 + 896*u^30 + 240*u^31 - 382*u^32 + 80*u^33 + 103*u^34 - 75*u^35 - 4*u^36 + 20*u^37 - 3*u^38 - 3*u^39 + u^40", "3*(269 + 1242*u + 4460*u^2 + 10233*u^3 + 71597*u^4 + 102952*u^5 + 277595*u^6 + 906106*u^7 + 1125977*u^8 + 527446*u^9 + 8973930*u^10 - 7576710*u^11 + 22482812*u^12 - 6426252*u^13 + 18750876*u^14 + 17766916*u^15 + 3628561*u^16 + 30834206*u^17 - 1515502*u^18 + 35193841*u^19 + 9399553*u^20 + 31885918*u^21 + 26237821*u^22 + 25075694*u^23 + 32190042*u^24 + 10330724*u^25 + 23813494*u^26 + 600785*u^27 + 10953480*u^28 - 1081132*u^29 + 3199016*u^30 - 451108*u^31 + 601627*u^32 - 87844*u^33 + 72230*u^34 - 9635*u^35 + 5279*u^36 - 586*u^37 + 207*u^38 - 16*u^39 + 3*u^40)", "9*(440831 + 5985053*u + 38119203*u^2 + 153200859*u^3 + 428921247*u^4 + 849163969*u^5 + 1129199254*u^6 + 762391561*u^7 - 504993199*u^8 - 2040889550*u^9 - 2461846670*u^10 - 994499342*u^11 + 1469552060*u^12 + 2945973408*u^13 + 2372442396*u^14 + 717314026*u^15 - 737242323*u^16 - 1664360465*u^17 - 1736769267*u^18 - 601915723*u^19 + 1173577895*u^20 + 2224697611*u^21 + 1472005444*u^22 - 323391815*u^23 - 1089966152*u^24 - 457122115*u^25 + 259643733*u^26 + 237272857*u^27 - 12546924*u^28 - 57148896*u^29 + 294952*u^30 + 12974232*u^31 + 279223*u^32 - 3542673*u^33 - 1037657*u^34 + 273289*u^35 + 231119*u^36 + 58437*u^37 + 7158*u^38 + 397*u^39 + 9*u^40)", "3*(417744 + 4299552*u + 23119299*u^2 + 83907061*u^3 + 230043932*u^4 + 509680974*u^5 + 952266463*u^6 + 1538226357*u^7 + 2178006069*u^8 + 2735099742*u^9 + 3106652696*u^10 + 3298740094*u^11 + 3406268350*u^12 + 3501993556*u^13 + 3548462788*u^14 + 3424716562*u^15 + 3045221122*u^16 + 2457851068*u^17 + 1818592465*u^18 + 1267130947*u^19 + 845541564*u^20 + 532511534*u^21 + 308348179*u^22 + 164330501*u^23 + 83351473*u^24 + 41056840*u^25 + 19096139*u^26 + 8111133*u^27 + 3230424*u^28 + 1294172*u^29 + 502814*u^30 + 166646*u^31 + 51786*u^32 + 18326*u^33 + 5665*u^34 + 1407*u^35 + 328*u^36 + 88*u^37 + 47*u^38 - 7*u^39 + 3*u^40)", "3*(1 + 40*u + 764*u^2 + 9145*u^3 + 77379*u^4 + 486510*u^5 + 2328939*u^6 + 8776784*u^7 + 27424501*u^8 + 74095422*u^9 + 184699110*u^10 + 388768456*u^11 + 580970648*u^12 + 474453940*u^13 - 63534438*u^14 - 641803736*u^15 - 684173629*u^16 - 169989300*u^17 + 332916776*u^18 + 387205779*u^19 + 112079439*u^20 - 119277762*u^21 - 134332555*u^22 - 32810330*u^23 + 34865558*u^24 + 31129108*u^25 + 3820616*u^26 - 7821595*u^27 - 4326856*u^28 + 335992*u^29 + 1083174*u^30 + 253538*u^31 - 122807*u^32 - 64936*u^33 + 3658*u^34 + 7531*u^35 + 639*u^36 - 468*u^37 - 75*u^38 + 14*u^39 + 3*u^40)", "1 - 4*u - 6*u^2 + 41*u^3 + 219*u^4 - 926*u^5 + 3671*u^6 - 26934*u^7 + 101823*u^8 - 132280*u^9 - 271872*u^10 + 1336946*u^11 - 1905340*u^12 - 540012*u^13 + 6649856*u^14 - 12018476*u^15 + 10298623*u^16 - 1157376*u^17 - 7601218*u^18 + 8337679*u^19 - 2003013*u^20 - 4142602*u^21 + 5342011*u^22 - 3012374*u^23 + 790360*u^24 - 122020*u^25 + 224180*u^26 - 240227*u^27 + 137076*u^28 - 146284*u^29 + 258260*u^30 - 320084*u^31 + 271541*u^32 - 168048*u^33 + 78750*u^34 - 28343*u^35 + 7803*u^36 - 1606*u^37 + 235*u^38 - 22*u^39 + u^40", "3*(103 - 192*u + 558*u^2 - 215*u^3 + 1019*u^4 + 844*u^5 - 1327*u^6 + 10510*u^7 - 10767*u^8 + 11690*u^9 + 19780*u^10 - 42866*u^11 + 72770*u^12 - 36300*u^13 + 4242*u^14 + 62432*u^15 - 53731*u^16 + 81578*u^17 - 12092*u^18 + 20511*u^19 + 54871*u^20 + 390*u^21 + 56103*u^22 + 12572*u^23 + 31814*u^24 + 29496*u^25 + 14664*u^26 + 21917*u^27 + 8878*u^28 + 11178*u^29 + 5856*u^30 + 3924*u^31 + 2819*u^32 + 786*u^33 + 1042*u^34 + 105*u^35 + 227*u^36 - 32*u^37 + 23*u^38 - 10*u^39 + 3*u^40)", "1296 - 7416*u + 16369*u^2 - 14789*u^3 - 27470*u^4 + 418132*u^5 - 1733195*u^6 + 2898937*u^7 + 3180161*u^8 - 40184928*u^9 + 177261818*u^10 - 570571326*u^11 + 1457354500*u^12 - 3026794616*u^13 + 5200905784*u^14 - 7515387620*u^15 + 9275745384*u^16 - 9921671528*u^17 + 9322007187*u^18 - 7788238267*u^19 + 5847653054*u^20 - 3979238412*u^21 + 2468388225*u^22 - 1399892903*u^23 + 725766721*u^24 - 342619120*u^25 + 145779927*u^26 - 54676351*u^27 + 17225120*u^28 - 4025672*u^29 + 364872*u^30 + 227888*u^31 - 141988*u^32 + 38412*u^33 - 887*u^34 - 4125*u^35 + 2114*u^36 - 620*u^37 + 121*u^38 - 15*u^39 + u^40", "3*(1231 + 8948*u + 32082*u^2 + 132867*u^3 + 520629*u^4 + 1046324*u^5 + 1174167*u^6 + 2684236*u^7 + 1223453*u^8 - 12111646*u^9 + 12683824*u^10 + 61951672*u^11 - 76208868*u^12 - 208793582*u^13 + 130873580*u^14 + 378562714*u^15 - 80062005*u^16 - 409821198*u^17 - 36070232*u^18 + 278440917*u^19 + 96284071*u^20 - 116034472*u^21 - 67405069*u^22 + 21017184*u^23 + 25102586*u^24 + 2439540*u^25 - 3312500*u^26 - 2691081*u^27 - 1127526*u^28 + 936528*u^29 + 669314*u^30 - 239046*u^31 - 158745*u^32 + 47840*u^33 + 21064*u^34 - 6969*u^35 - 1421*u^36 + 634*u^37 + 17*u^38 - 28*u^39 + 3*u^40)", "3*(32 - 320*u + 2240*u^2 - 10784*u^3 + 41898*u^4 - 133575*u^5 + 265931*u^6 - 174618*u^7 - 109429*u^8 - 1065246*u^9 + 4123743*u^10 - 2377194*u^11 - 6971100*u^12 + 7377484*u^13 + 7363315*u^14 - 9289522*u^15 - 8355663*u^16 + 10502667*u^17 + 6979319*u^18 - 10336067*u^19 - 2861789*u^20 + 7799113*u^21 - 1123110*u^22 - 3783133*u^23 + 2372851*u^24 + 721724*u^25 - 1499980*u^26 + 321037*u^27 + 507987*u^28 - 293541*u^29 - 77958*u^30 + 104900*u^31 - 5880*u^32 - 21760*u^33 + 5759*u^34 + 2429*u^35 - 1292*u^36 - 48*u^37 + 151*u^38 - 37*u^39 + 3*u^40)", "9*(2592 - 59632*u + 644952*u^2 - 4146984*u^3 + 19204756*u^4 - 74092423*u^5 + 264034643*u^6 - 818775130*u^7 + 2044106807*u^8 - 3966083792*u^9 + 5962958309*u^10 - 7383619644*u^11 + 9749994826*u^12 - 18690307976*u^13 + 41746245279*u^14 - 81115317536*u^15 + 127296755593*u^16 - 161932355243*u^17 + 170038332687*u^18 - 151031847235*u^19 + 117899284517*u^20 - 85814139739*u^21 + 61873136196*u^22 - 44531318431*u^23 + 30066431761*u^24 - 17564045168*u^25 + 8393611242*u^26 - 3277514759*u^27 + 1205580765*u^28 - 560143557*u^29 + 310721306*u^30 - 144968174*u^31 + 45455246*u^32 - 6984612*u^33 - 656951*u^34 + 460907*u^35 - 19438*u^36 - 25834*u^37 + 5831*u^38 - 367*u^39 + 9*u^40)", "3*(344 - 144*u + 3154*u^2 + 4953*u^3 + 9095*u^4 + 71885*u^5 - 20408*u^6 + 452792*u^7 - 42880*u^8 + 900412*u^9 + 2194447*u^10 - 3188214*u^11 + 15581509*u^12 - 23831754*u^13 + 52715142*u^14 - 68134699*u^15 + 104429854*u^16 - 112046274*u^17 + 132193820*u^18 - 115906368*u^19 + 112688193*u^20 - 81472754*u^21 + 68004303*u^22 - 40551775*u^23 + 30485003*u^24 - 14410167*u^25 + 10520725*u^26 - 3572678*u^27 + 2848413*u^28 - 560067*u^29 + 609162*u^30 - 31328*u^31 + 102673*u^32 + 8177*u^33 + 13467*u^34 + 2327*u^35 + 1325*u^36 + 267*u^37 + 88*u^38 + 13*u^39 + 3*u^40)", "9*(184728 + 631624*u + 1346126*u^2 + 3184325*u^3 + 15650621*u^4 + 56100543*u^5 + 119042248*u^6 + 226351694*u^7 + 692412150*u^8 + 1294613308*u^9 + 1622940943*u^10 + 3206898008*u^11 + 4388288867*u^12 + 3479057128*u^13 + 7391277788*u^14 + 4598289689*u^15 + 5047096328*u^16 + 7777927118*u^17 + 355522748*u^18 + 7310792486*u^19 + 249871771*u^20 + 1881626946*u^21 + 3088285223*u^22 - 2327403923*u^23 + 3626530233*u^24 - 2478656395*u^25 + 2028563983*u^26 - 1131636468*u^27 + 660947567*u^28 - 297632715*u^29 + 132613924*u^30 - 48477554*u^31 + 16962491*u^32 - 5118461*u^33 + 1400435*u^34 - 342283*u^35 + 70729*u^36 - 13677*u^37 + 2318*u^38 - 175*u^39 + 9*u^40)", "3*(6379 - 18301*u + 126845*u^2 - 115457*u^3 + 892351*u^4 + 534375*u^5 + 3616650*u^6 + 7789303*u^7 + 12328997*u^8 + 33424746*u^9 + 32213628*u^10 + 73038478*u^11 + 42749086*u^12 + 73713206*u^13 + 89187306*u^14 + 59630568*u^15 + 400599975*u^16 + 226745607*u^17 + 818258333*u^18 + 314381125*u^19 + 689540101*u^20 + 104010005*u^21 + 270540494*u^22 - 50102561*u^23 + 43016530*u^24 - 48973273*u^25 - 2268435*u^26 - 15734337*u^27 - 1133306*u^28 - 2175326*u^29 + 316028*u^30 + 29484*u^31 + 177503*u^32 + 55381*u^33 + 33143*u^34 + 8119*u^35 + 3163*u^36 + 521*u^37 + 154*u^38 + 13*u^39 + 3*u^40)", "3*(32 + 64*u - 144*u^2 - 516*u^3 + 2044*u^4 - 753*u^5 - 2458*u^6 - 728*u^7 + 16527*u^8 - 11660*u^9 - 25175*u^10 + 14317*u^11 + 45679*u^12 - 28631*u^13 - 17042*u^14 + 24451*u^15 - 20851*u^16 - 37938*u^17 + 66426*u^18 + 35206*u^19 - 58252*u^20 - 18835*u^21 + 33448*u^22 - 9976*u^23 - 9849*u^24 + 20344*u^25 - 2915*u^26 - 17609*u^27 + 4155*u^28 + 9470*u^29 - 2538*u^30 - 2539*u^31 + 684*u^32 + 366*u^33 + 169*u^34 + 119*u^35 - 43*u^36 - 45*u^37 + 30*u^38 + 19*u^39 + 3*u^40)", "3*(1503877 - 2961952*u + 18860564*u^2 - 42248145*u^3 + 99363827*u^4 - 126885462*u^5 - 65715557*u^6 + 464282070*u^7 - 400358785*u^8 + 233285636*u^9 + 382124604*u^10 - 646393078*u^11 + 555460700*u^12 + 231528886*u^13 - 156510518*u^14 + 383543038*u^15 + 79119397*u^16 + 33147730*u^17 + 154803604*u^18 + 96286223*u^19 + 37498339*u^20 + 46944878*u^21 + 40312077*u^22 + 16470918*u^23 + 16498280*u^24 + 10997782*u^25 + 5238844*u^26 + 2688931*u^27 + 1927912*u^28 + 859886*u^29 + 399868*u^30 + 218428*u^31 + 94679*u^32 + 30258*u^33 + 9808*u^34 + 2907*u^35 + 595*u^36 + 198*u^37 + 101*u^38 + 28*u^39 + 3*u^40)", "3*(1 - 10*u + 58*u^2 - 227*u^3 + 641*u^4 - 1522*u^5 + 3561*u^6 - 9894*u^7 + 27233*u^8 - 78006*u^9 + 237308*u^10 - 607998*u^11 + 1441614*u^12 - 3277662*u^13 + 6160618*u^14 - 8796454*u^15 + 15770073*u^16 - 12665656*u^17 + 25928348*u^18 - 9400535*u^19 + 29273103*u^20 - 1723026*u^21 + 23689343*u^22 + 3236462*u^23 + 14163006*u^24 + 3522890*u^25 + 6390508*u^26 + 1927913*u^27 + 2201742*u^28 + 698288*u^29 + 580258*u^30 + 180254*u^31 + 115861*u^32 + 33584*u^33 + 17048*u^34 + 4395*u^35 + 1747*u^36 + 374*u^37 + 111*u^38 + 16*u^39 + 3*u^40)", "9*(10609 - 78084*u + 438718*u^2 - 1141713*u^3 + 1738187*u^4 + 2349794*u^5 - 12291841*u^6 + 11591970*u^7 + 40401811*u^8 - 210949680*u^9 + 404068556*u^10 - 548331034*u^11 + 517285132*u^12 - 471776404*u^13 + 1510707840*u^14 - 2177219336*u^15 + 2682757163*u^16 - 1587596900*u^17 - 971139442*u^18 + 3110664049*u^19 - 3488725965*u^20 + 2109798194*u^21 - 14473821*u^22 - 1192179778*u^23 + 1279434688*u^24 - 661780792*u^25 + 74248424*u^26 + 181179791*u^27 - 167479428*u^28 + 64647532*u^29 + 4699976*u^30 - 24542420*u^31 + 18523405*u^32 - 8741688*u^33 + 2997870*u^34 - 755637*u^35 + 138815*u^36 - 17770*u^37 + 1251*u^38 - 38*u^39 + 9*u^40)" ], "GeometricComponent":"{33, 34}", "uPolys_ij_N":[ "1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40", "1 + 4*u + 6*u^2 + 239*u^3 + 1095*u^4 + 3042*u^5 + 13111*u^6 + 22494*u^7 + 31523*u^8 - 291868*u^9 + 688944*u^10 - 2379734*u^11 + 6724728*u^12 - 15351088*u^13 + 34859112*u^14 - 75217796*u^15 + 143272115*u^16 - 243054732*u^17 + 376411998*u^18 - 537777123*u^19 + 711146355*u^20 - 872095710*u^21 + 992483607*u^22 - 1048807594*u^23 + 1030544560*u^24 - 941327964*u^25 + 794749964*u^26 - 612323721*u^27 + 423041924*u^28 - 257312604*u^29 + 135520700*u^30 - 60927492*u^31 + 23084057*u^32 - 7276436*u^33 + 1880486*u^34 - 391097*u^35 + 63799*u^36 - 7858*u^37 + 687*u^38 - 38*u^39 + u^40", "1697 + 150*u + 12996*u^2 - 32103*u^3 + 26597*u^4 - 163690*u^5 + 151663*u^6 - 329792*u^7 + 534849*u^8 - 525748*u^9 + 1655584*u^10 - 1231308*u^11 + 3955666*u^12 - 2678342*u^13 + 6561196*u^14 - 3454832*u^15 + 7466399*u^16 - 2693482*u^17 + 6197470*u^18 - 1216553*u^19 + 4016891*u^20 - 224490*u^21 + 2156719*u^22 + 109026*u^23 + 963302*u^24 + 123270*u^25 + 357946*u^26 + 60885*u^27 + 111210*u^28 + 20574*u^29 + 28244*u^30 + 5260*u^31 + 5933*u^32 + 1016*u^33 + 1010*u^34 + 169*u^35 + 141*u^36 + 20*u^37 + 15*u^38 + 2*u^39 + u^40", "9 - 54*u + 254*u^2 - 499*u^3 + 257*u^4 + 4008*u^5 - 13329*u^6 + 25510*u^7 - 20197*u^8 - 21976*u^9 + 136864*u^10 - 393918*u^11 + 978620*u^12 - 2127000*u^13 + 3983240*u^14 - 6579026*u^15 + 9748045*u^16 - 12773180*u^17 + 15653662*u^18 - 16841141*u^19 + 17743605*u^20 - 15974200*u^21 + 14734587*u^22 - 11264404*u^23 + 9083358*u^24 - 5977732*u^25 + 4181128*u^26 - 2390673*u^27 + 1439608*u^28 - 716112*u^29 + 367916*u^30 - 157998*u^31 + 68583*u^32 - 25012*u^33 + 9062*u^34 - 2715*u^35 + 805*u^36 - 184*u^37 + 43*u^38 - 6*u^39 + u^40", "1024\/9 - (13312*u)\/9 + (217600*u^2)\/9 - (915856*u^3)\/9 + (5259656*u^4)\/9 - (5415035*u^5)\/3 + (22938644*u^6)\/3 - (66019468*u^7)\/3 + (559118935*u^8)\/9 - (414747532*u^9)\/3 + (2404685585*u^10)\/9 - (3325715575*u^11)\/9 + (3050118125*u^12)\/9 - (280261067*u^13)\/9 - (3799839124*u^14)\/9 + (6632102875*u^15)\/9 - (4937560085*u^16)\/9 - (853770802*u^17)\/9 + (2379804002*u^18)\/3 - (3217958018*u^19)\/3 + (7112353724*u^20)\/9 - (703228969*u^21)\/3 - (1915980574*u^22)\/9 + (3099817580*u^23)\/9 - (2085106321*u^24)\/9 + (169355480*u^25)\/3 + (497001301*u^26)\/9 - 77801569*u^27 + 54664369*u^28 - (229030454*u^29)\/9 + (69599062*u^30)\/9 - (9184727*u^31)\/9 - (3734506*u^32)\/9 + (2673038*u^33)\/9 - (277697*u^34)\/3 + (126539*u^35)\/9 + (12895*u^36)\/9 - (8113*u^37)\/9 + (784*u^38)\/3 - (181*u^39)\/9 + u^40", "26713\/9 + (186499*u)\/9 + (1989401*u^2)\/9 + (2214929*u^3)\/3 + (28167311*u^4)\/9 + (39069673*u^5)\/9 + (119860846*u^6)\/9 + (562187*u^7)\/9 + (234501071*u^8)\/9 - (121200776*u^9)\/3 + (301556870*u^10)\/9 - (1044239608*u^11)\/9 + (577398928*u^12)\/9 - (1544551036*u^13)\/9 + (1272551162*u^14)\/9 - (1450237972*u^15)\/9 + (660813841*u^16)\/3 - (896373011*u^17)\/9 + (713301389*u^18)\/3 - (358225193*u^19)\/9 + (1707434143*u^20)\/9 - (157090315*u^21)\/9 + (334907200*u^22)\/3 - (30517993*u^23)\/3 + (449656048*u^24)\/9 - (40092121*u^25)\/9 + (58512263*u^26)\/3 - (9047341*u^27)\/9 + 6426386*u^28 + 374968*u^29 + (4090354*u^30)\/3 + (3705802*u^31)\/9 + (1653911*u^32)\/9 + (397961*u^33)\/3 + (311611*u^34)\/9 + (173119*u^35)\/9 + 5707*u^36 + (11641*u^37)\/9 + (2726*u^38)\/9 + (157*u^39)\/9 + u^40", "1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40", "81 - 389*u - 2019*u^2 + 11473*u^3 + 112595*u^4 + 485253*u^5 + 1500788*u^6 + 3658481*u^7 + 7004679*u^8 + 10227166*u^9 + 10958862*u^10 + 8589282*u^11 + 7488548*u^12 + 15496844*u^13 + 35999480*u^14 + 60768232*u^15 + 73652727*u^16 + 64706733*u^17 + 40883439*u^18 + 20881583*u^19 + 18601271*u^20 + 32022209*u^21 + 47498656*u^22 + 52849489*u^23 + 45796240*u^24 + 32201673*u^25 + 19166969*u^26 + 10293399*u^27 + 5496888*u^28 + 3164920*u^29 + 1923320*u^30 + 1124908*u^31 + 587381*u^32 + 263235*u^33 + 99141*u^34 + 30841*u^35 + 7751*u^36 + 1521*u^37 + 220*u^38 + 21*u^39 + u^40", "872\/3 + (9496*u)\/3 + 17426*u^2 + (275161*u^3)\/3 + (1428470*u^4)\/3 + (5591518*u^5)\/3 + (16532168*u^6)\/3 + (44352193*u^7)\/3 + (117755020*u^8)\/3 + (269941907*u^9)\/3 + (473342573*u^10)\/3 + (636758596*u^11)\/3 + (723490883*u^12)\/3 + 245571205*u^13 + 180873114*u^14 + 2049012*u^15 - 194559095*u^16 - (564587081*u^17)\/3 + (326891279*u^18)\/3 + 455839945*u^19 + (1477655582*u^20)\/3 + (535735598*u^21)\/3 - (450052280*u^22)\/3 - (635365760*u^23)\/3 - 74935015*u^24 + (113109607*u^25)\/3 + (131473540*u^26)\/3 + 8702511*u^27 - (21684856*u^28)\/3 - (12549233*u^29)\/3 + 41278*u^30 + 602122*u^31 + 117645*u^32 - (104768*u^33)\/3 - 12140*u^34 + (2525*u^35)\/3 + (1123*u^36)\/3 - (256*u^37)\/3 - 9*u^38 + (20*u^39)\/3 + u^40", "773\/3 + (8347*u)\/3 + (52463*u^2)\/3 + (184363*u^3)\/3 + (421061*u^4)\/3 + 233331*u^5 + (563432*u^6)\/3 + (789935*u^7)\/3 + 2426193*u^8 + (34501792*u^9)\/3 + (113664700*u^10)\/3 + 92084514*u^11 + (534288250*u^12)\/3 + (859269812*u^13)\/3 + (1154546270*u^14)\/3 + (1323672338*u^15)\/3 + (1317193921*u^16)\/3 + (1157207821*u^17)\/3 + (948743321*u^18)\/3 + (766811009*u^19)\/3 + (597861713*u^20)\/3 + 151544555*u^21 + 108971472*u^22 + 63627417*u^23 + 37507056*u^24 + (56456215*u^25)\/3 + 6611995*u^26 + (6913657*u^27)\/3 + (4533884*u^28)\/3 + (154762*u^29)\/3 - (129722*u^30)\/3 + (349678*u^31)\/3 + (85283*u^32)\/3 - (36533*u^33)\/3 + 749*u^34 + (5551*u^35)\/3 - (767*u^36)\/3 - 31*u^37 + 34*u^38 - (19*u^39)\/3 + u^40", "9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40", "36 - 156*u + 235*u^2 + 175*u^3 - 1298*u^4 + 1788*u^5 + 945*u^6 - 6377*u^7 + 6375*u^8 + 7674*u^9 - 21586*u^10 + 4498*u^11 + 35376*u^12 - 30870*u^13 - 34718*u^14 + 56380*u^15 + 18142*u^16 - 63080*u^17 + 929*u^18 + 49725*u^19 - 9536*u^20 - 30312*u^21 + 8289*u^22 + 16015*u^23 - 4489*u^24 - 8140*u^25 + 2253*u^26 + 3945*u^27 - 1456*u^28 - 1444*u^29 + 896*u^30 + 240*u^31 - 382*u^32 + 80*u^33 + 103*u^34 - 75*u^35 - 4*u^36 + 20*u^37 - 3*u^38 - 3*u^39 + u^40", "269\/3 + 414*u + (4460*u^2)\/3 + 3411*u^3 + (71597*u^4)\/3 + (102952*u^5)\/3 + (277595*u^6)\/3 + (906106*u^7)\/3 + (1125977*u^8)\/3 + (527446*u^9)\/3 + 2991310*u^10 - 2525570*u^11 + (22482812*u^12)\/3 - 2142084*u^13 + 6250292*u^14 + (17766916*u^15)\/3 + (3628561*u^16)\/3 + (30834206*u^17)\/3 - (1515502*u^18)\/3 + (35193841*u^19)\/3 + (9399553*u^20)\/3 + (31885918*u^21)\/3 + (26237821*u^22)\/3 + (25075694*u^23)\/3 + 10730014*u^24 + (10330724*u^25)\/3 + (23813494*u^26)\/3 + (600785*u^27)\/3 + 3651160*u^28 - (1081132*u^29)\/3 + (3199016*u^30)\/3 - (451108*u^31)\/3 + (601627*u^32)\/3 - (87844*u^33)\/3 + (72230*u^34)\/3 - (9635*u^35)\/3 + (5279*u^36)\/3 - (586*u^37)\/3 + 69*u^38 - (16*u^39)\/3 + u^40", "440831\/9 + (5985053*u)\/9 + 4235467*u^2 + (51066953*u^3)\/3 + (142973749*u^4)\/3 + (849163969*u^5)\/9 + (1129199254*u^6)\/9 + (762391561*u^7)\/9 - (504993199*u^8)\/9 - (2040889550*u^9)\/9 - (2461846670*u^10)\/9 - (994499342*u^11)\/9 + (1469552060*u^12)\/9 + (981991136*u^13)\/3 + (790814132*u^14)\/3 + (717314026*u^15)\/9 - (245747441*u^16)\/3 - (1664360465*u^17)\/9 - 192974363*u^18 - (601915723*u^19)\/9 + (1173577895*u^20)\/9 + (2224697611*u^21)\/9 + (1472005444*u^22)\/9 - (323391815*u^23)\/9 - (1089966152*u^24)\/9 - (457122115*u^25)\/9 + (86547911*u^26)\/3 + (237272857*u^27)\/9 - (4182308*u^28)\/3 - (19049632*u^29)\/3 + (294952*u^30)\/9 + (4324744*u^31)\/3 + (279223*u^32)\/9 - (1180891*u^33)\/3 - (1037657*u^34)\/9 + (273289*u^35)\/9 + (231119*u^36)\/9 + 6493*u^37 + (2386*u^38)\/3 + (397*u^39)\/9 + u^40", "139248 + 1433184*u + 7706433*u^2 + (83907061*u^3)\/3 + (230043932*u^4)\/3 + 169893658*u^5 + (952266463*u^6)\/3 + 512742119*u^7 + 726002023*u^8 + 911699914*u^9 + (3106652696*u^10)\/3 + (3298740094*u^11)\/3 + (3406268350*u^12)\/3 + (3501993556*u^13)\/3 + (3548462788*u^14)\/3 + (3424716562*u^15)\/3 + (3045221122*u^16)\/3 + (2457851068*u^17)\/3 + (1818592465*u^18)\/3 + (1267130947*u^19)\/3 + 281847188*u^20 + (532511534*u^21)\/3 + (308348179*u^22)\/3 + (164330501*u^23)\/3 + (83351473*u^24)\/3 + (41056840*u^25)\/3 + (19096139*u^26)\/3 + 2703711*u^27 + 1076808*u^28 + (1294172*u^29)\/3 + (502814*u^30)\/3 + (166646*u^31)\/3 + 17262*u^32 + (18326*u^33)\/3 + (5665*u^34)\/3 + 469*u^35 + (328*u^36)\/3 + (88*u^37)\/3 + (47*u^38)\/3 - (7*u^39)\/3 + u^40", "1\/3 + (40*u)\/3 + (764*u^2)\/3 + (9145*u^3)\/3 + 25793*u^4 + 162170*u^5 + 776313*u^6 + (8776784*u^7)\/3 + (27424501*u^8)\/3 + 24698474*u^9 + 61566370*u^10 + (388768456*u^11)\/3 + (580970648*u^12)\/3 + (474453940*u^13)\/3 - 21178146*u^14 - (641803736*u^15)\/3 - (684173629*u^16)\/3 - 56663100*u^17 + (332916776*u^18)\/3 + 129068593*u^19 + 37359813*u^20 - 39759254*u^21 - (134332555*u^22)\/3 - (32810330*u^23)\/3 + (34865558*u^24)\/3 + (31129108*u^25)\/3 + (3820616*u^26)\/3 - (7821595*u^27)\/3 - (4326856*u^28)\/3 + (335992*u^29)\/3 + 361058*u^30 + (253538*u^31)\/3 - (122807*u^32)\/3 - (64936*u^33)\/3 + (3658*u^34)\/3 + (7531*u^35)\/3 + 213*u^36 - 156*u^37 - 25*u^38 + (14*u^39)\/3 + u^40", "1 - 4*u - 6*u^2 + 41*u^3 + 219*u^4 - 926*u^5 + 3671*u^6 - 26934*u^7 + 101823*u^8 - 132280*u^9 - 271872*u^10 + 1336946*u^11 - 1905340*u^12 - 540012*u^13 + 6649856*u^14 - 12018476*u^15 + 10298623*u^16 - 1157376*u^17 - 7601218*u^18 + 8337679*u^19 - 2003013*u^20 - 4142602*u^21 + 5342011*u^22 - 3012374*u^23 + 790360*u^24 - 122020*u^25 + 224180*u^26 - 240227*u^27 + 137076*u^28 - 146284*u^29 + 258260*u^30 - 320084*u^31 + 271541*u^32 - 168048*u^33 + 78750*u^34 - 28343*u^35 + 7803*u^36 - 1606*u^37 + 235*u^38 - 22*u^39 + u^40", "103\/3 - 64*u + 186*u^2 - (215*u^3)\/3 + (1019*u^4)\/3 + (844*u^5)\/3 - (1327*u^6)\/3 + (10510*u^7)\/3 - 3589*u^8 + (11690*u^9)\/3 + (19780*u^10)\/3 - (42866*u^11)\/3 + (72770*u^12)\/3 - 12100*u^13 + 1414*u^14 + (62432*u^15)\/3 - (53731*u^16)\/3 + (81578*u^17)\/3 - (12092*u^18)\/3 + 6837*u^19 + (54871*u^20)\/3 + 130*u^21 + 18701*u^22 + (12572*u^23)\/3 + (31814*u^24)\/3 + 9832*u^25 + 4888*u^26 + (21917*u^27)\/3 + (8878*u^28)\/3 + 3726*u^29 + 1952*u^30 + 1308*u^31 + (2819*u^32)\/3 + 262*u^33 + (1042*u^34)\/3 + 35*u^35 + (227*u^36)\/3 - (32*u^37)\/3 + (23*u^38)\/3 - (10*u^39)\/3 + u^40", "1296 - 7416*u + 16369*u^2 - 14789*u^3 - 27470*u^4 + 418132*u^5 - 1733195*u^6 + 2898937*u^7 + 3180161*u^8 - 40184928*u^9 + 177261818*u^10 - 570571326*u^11 + 1457354500*u^12 - 3026794616*u^13 + 5200905784*u^14 - 7515387620*u^15 + 9275745384*u^16 - 9921671528*u^17 + 9322007187*u^18 - 7788238267*u^19 + 5847653054*u^20 - 3979238412*u^21 + 2468388225*u^22 - 1399892903*u^23 + 725766721*u^24 - 342619120*u^25 + 145779927*u^26 - 54676351*u^27 + 17225120*u^28 - 4025672*u^29 + 364872*u^30 + 227888*u^31 - 141988*u^32 + 38412*u^33 - 887*u^34 - 4125*u^35 + 2114*u^36 - 620*u^37 + 121*u^38 - 15*u^39 + u^40", "1231\/3 + (8948*u)\/3 + 10694*u^2 + 44289*u^3 + 173543*u^4 + (1046324*u^5)\/3 + 391389*u^6 + (2684236*u^7)\/3 + (1223453*u^8)\/3 - (12111646*u^9)\/3 + (12683824*u^10)\/3 + (61951672*u^11)\/3 - 25402956*u^12 - (208793582*u^13)\/3 + (130873580*u^14)\/3 + (378562714*u^15)\/3 - 26687335*u^16 - 136607066*u^17 - (36070232*u^18)\/3 + 92813639*u^19 + (96284071*u^20)\/3 - (116034472*u^21)\/3 - (67405069*u^22)\/3 + 7005728*u^23 + (25102586*u^24)\/3 + 813180*u^25 - (3312500*u^26)\/3 - 897027*u^27 - 375842*u^28 + 312176*u^29 + (669314*u^30)\/3 - 79682*u^31 - 52915*u^32 + (47840*u^33)\/3 + (21064*u^34)\/3 - 2323*u^35 - (1421*u^36)\/3 + (634*u^37)\/3 + (17*u^38)\/3 - (28*u^39)\/3 + u^40", "32\/3 - (320*u)\/3 + (2240*u^2)\/3 - (10784*u^3)\/3 + 13966*u^4 - 44525*u^5 + (265931*u^6)\/3 - 58206*u^7 - (109429*u^8)\/3 - 355082*u^9 + 1374581*u^10 - 792398*u^11 - 2323700*u^12 + (7377484*u^13)\/3 + (7363315*u^14)\/3 - (9289522*u^15)\/3 - 2785221*u^16 + 3500889*u^17 + (6979319*u^18)\/3 - (10336067*u^19)\/3 - (2861789*u^20)\/3 + (7799113*u^21)\/3 - 374370*u^22 - (3783133*u^23)\/3 + (2372851*u^24)\/3 + (721724*u^25)\/3 - (1499980*u^26)\/3 + (321037*u^27)\/3 + 169329*u^28 - 97847*u^29 - 25986*u^30 + (104900*u^31)\/3 - 1960*u^32 - (21760*u^33)\/3 + (5759*u^34)\/3 + (2429*u^35)\/3 - (1292*u^36)\/3 - 16*u^37 + (151*u^38)\/3 - (37*u^39)\/3 + u^40", "288 - (59632*u)\/9 + (214984*u^2)\/3 - 460776*u^3 + (19204756*u^4)\/9 - (74092423*u^5)\/9 + (264034643*u^6)\/9 - (818775130*u^7)\/9 + (2044106807*u^8)\/9 - (3966083792*u^9)\/9 + (5962958309*u^10)\/9 - (2461206548*u^11)\/3 + (9749994826*u^12)\/9 - (18690307976*u^13)\/9 + (13915415093*u^14)\/3 - 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2.02988*I", "-1.64493 + 2.02988*I" ], "uPolysN":[ "1 + u + u^2", "1\/3 + u^2", "1 + u + u^2", "1\/3 - u + u^2", "1 - u + u^2", "1 - 2*u + u^2", "u^2", "1 + 2*u + u^2", "1 - u + u^2", "1 - u + u^2" ], "uPolys":[ "1 + u + u^2", "3*(1 + 3*u^2)", "1 + u + u^2", "3*(1 - 3*u + 3*u^2)", "1 - u + u^2", "(-1 + u)^2", "u^2", "(1 + u)^2", "1 - u + u^2", "1 - u + u^2" ], "aCuspShape":"-2 + (-21 + 20*u)\/3", "RepresentationsN":[ [ "u->0.5 + 0.866025 I", "a->0. + 0.57735 I", "b->-1." ], [ "u->0.5 - 0.866025 I", "a->0. - 0.57735 I", "b->-1." ] ], "Epsilon":2.08167, "uPolys_ij_N":[ "u^2", "1\/9 - (2*u)\/3 + u^2", "1 - 2*u + u^2", "7\/3 - u + u^2", "13\/9 + (2*u)\/3 + u^2", "4\/3 + u^2", "7\/3 - 2*u + u^2", "1 - u + u^2", "3 - 3*u + u^2", "1\/3 + u^2", "1\/9 - u\/3 + u^2", "1\/3 - u + u^2", "1\/3 + u + u^2", "7\/9 + (4*u)\/3 + u^2", "4\/3 - 2*u + u^2", "3 + 3*u + u^2", "1 + u + u^2", "16\/9 + (4*u)\/3 + u^2", "1 + u + u^2", "1 - u + u^2", "13\/9 + (2*u)\/3 + u^2" ], "GeometricComponent":0, "Multiplicity":1, "MinRepresentationVolume":[ "{1, 2}", 2.02988 ], "ij_list":[ [ "{1, 7}", "{1, 8}", "{7, 8}" ], [ "{2, 3}" ], [ "{6, 7}", "{6, 8}", "{6, 9}", "{7, 9}", "{8, 9}" ], [ "{2, 9}" ], [ "{5, 10}" ], [ "{5, 9}" ], [ "{6, 10}" ], [ "{1, 10}", "{3, 9}" ], [ "{1, 9}" ], [ "{2, 7}", "{2, 8}", "{3, 7}", "{3, 8}" ], [ "{4, 5}" ], [ "{4, 7}", "{4, 8}", "{5, 7}", "{5, 8}", "{7, 10}", "{8, 10}" ], [ "{3, 6}" ], [ "{3, 5}" ], [ "{4, 6}" ], [ "{1, 6}" ], [ "{1, 4}", "{1, 5}", "{2, 5}", "{2, 6}", "{3, 4}", "{9, 10}" ], [ "{2, 10}" ], [ "{3, 10}", "{4, 9}", "{4, 10}" ], [ "{1, 2}", "{1, 3}", "{5, 6}" ], [ "{2, 4}" ] ], "SortedReprnIndices":"{2, 1}", "aCuspShapeN":[ "-5.6666666666666666666`4.995906271816714 + 5.7735026918962576451`5.004017977798271*I", "-5.6666666666666666666`4.995906271816714 - 5.7735026918962576451`5.004017977798271*I" ], "Abelian":false }, { "IdealName":"abJ10_90_2", "Generators":[ "b", "-1 + a", "-1 + v" ], "VariableOrder":[ "b", "a", "v" ], "Characteristic":0, "KnownGroebner":[], "Status":[ "vCompNormalize" ], "MonomialOrder":"lex", "IsHomogeneous":false, "IsZeroDim":true, "IdealDimension":0, "Timings":{ "TimingGroebner":7.6403e-2, "TimingZeroDimVars":7.62e-2, "TimingmagmaVCompNormalize":7.7449e-2, "TimingNumberOfSols":2.6217999999999998e-2, "TimingIsRadical":1.742e-3, "TimingArcColoring":6.0785e-2, "TimingObstruction":4.26e-4, "TimingComplexVolumeN":0.611611, "TimingaCuspShapeN":4.292e-3, "TiminguValues":0.646394, "TiminguPolysN":7.3e-5, "TiminguPolys":0.81464, "TimingaCuspShape":0.1013, "TimingRepresentationsN":2.3224e-2, "TiminguValues_ij":0.15176, "TiminguPoly_ij":0.147604, "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 + u^2)*(1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40)", "9*(1 + 3*u^2)*(32 + 64*u - 144*u^2 - 516*u^3 + 2044*u^4 - 753*u^5 - 2458*u^6 - 728*u^7 + 16527*u^8 - 11660*u^9 - 25175*u^10 + 14317*u^11 + 45679*u^12 - 28631*u^13 - 17042*u^14 + 24451*u^15 - 20851*u^16 - 37938*u^17 + 66426*u^18 + 35206*u^19 - 58252*u^20 - 18835*u^21 + 33448*u^22 - 9976*u^23 - 9849*u^24 + 20344*u^25 - 2915*u^26 - 17609*u^27 + 4155*u^28 + 9470*u^29 - 2538*u^30 - 2539*u^31 + 684*u^32 + 366*u^33 + 169*u^34 + 119*u^35 - 43*u^36 - 45*u^37 + 30*u^38 + 19*u^39 + 3*u^40)", "(1 + u + u^2)*(1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40)", "9*(1 - 3*u + 3*u^2)*(103 - 192*u + 558*u^2 - 215*u^3 + 1019*u^4 + 844*u^5 - 1327*u^6 + 10510*u^7 - 10767*u^8 + 11690*u^9 + 19780*u^10 - 42866*u^11 + 72770*u^12 - 36300*u^13 + 4242*u^14 + 62432*u^15 - 53731*u^16 + 81578*u^17 - 12092*u^18 + 20511*u^19 + 54871*u^20 + 390*u^21 + 56103*u^22 + 12572*u^23 + 31814*u^24 + 29496*u^25 + 14664*u^26 + 21917*u^27 + 8878*u^28 + 11178*u^29 + 5856*u^30 + 3924*u^31 + 2819*u^32 + 786*u^33 + 1042*u^34 + 105*u^35 + 227*u^36 - 32*u^37 + 23*u^38 - 10*u^39 + 3*u^40)", "(1 - u + u^2)*(1 - 2*u + 15*u^3 - 33*u^4 - 4*u^5 + 141*u^6 - 256*u^7 + 17*u^8 + 518*u^9 - 678*u^10 + 320*u^11 + 610*u^12 - 2118*u^13 + 1494*u^14 + 2280*u^15 - 3723*u^16 + 370*u^17 + 2852*u^18 - 2827*u^19 + 391*u^20 + 2220*u^21 - 2215*u^22 + 82*u^23 + 1278*u^24 - 1170*u^25 + 374*u^26 + 565*u^27 - 916*u^28 + 296*u^29 + 532*u^30 - 522*u^31 - 103*u^32 + 320*u^33 - 42*u^34 - 111*u^35 + 33*u^36 + 22*u^37 - 9*u^38 - 2*u^39 + u^40)", "(-1 + u)^2*(9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40)", "u^2*(36 - 156*u + 235*u^2 + 175*u^3 - 1298*u^4 + 1788*u^5 + 945*u^6 - 6377*u^7 + 6375*u^8 + 7674*u^9 - 21586*u^10 + 4498*u^11 + 35376*u^12 - 30870*u^13 - 34718*u^14 + 56380*u^15 + 18142*u^16 - 63080*u^17 + 929*u^18 + 49725*u^19 - 9536*u^20 - 30312*u^21 + 8289*u^22 + 16015*u^23 - 4489*u^24 - 8140*u^25 + 2253*u^26 + 3945*u^27 - 1456*u^28 - 1444*u^29 + 896*u^30 + 240*u^31 - 382*u^32 + 80*u^33 + 103*u^34 - 75*u^35 - 4*u^36 + 20*u^37 - 3*u^38 - 3*u^39 + u^40)", "(1 + u)^2*(9 - 31*u + 75*u^2 - 195*u^3 + 247*u^4 + 499*u^5 - 2302*u^6 + 2537*u^7 + 2499*u^8 - 9606*u^9 + 7346*u^10 + 8530*u^11 - 21412*u^12 + 9788*u^13 + 19212*u^14 - 29420*u^15 + 3067*u^16 + 28327*u^17 - 23983*u^18 - 8845*u^19 + 26243*u^20 - 9345*u^21 - 14338*u^22 + 14549*u^23 + 2160*u^24 - 10181*u^25 + 3275*u^26 + 4247*u^27 - 3416*u^28 - 760*u^29 + 1872*u^30 - 336*u^31 - 659*u^32 + 337*u^33 + 131*u^34 - 139*u^35 - u^36 + 31*u^37 - 6*u^38 - 3*u^39 + u^40)", "(1 - u + u^2)*(1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40)", "(1 - u + u^2)*(1 - 2*u - 17*u^3 + 37*u^4 - 4*u^5 + 33*u^6 - 170*u^7 + 271*u^8 - 246*u^9 + 648*u^10 - 1540*u^11 + 3926*u^12 - 7514*u^13 + 12476*u^14 - 16432*u^15 + 20977*u^16 - 22050*u^17 + 24714*u^18 - 23805*u^19 + 27125*u^20 - 26416*u^21 + 31565*u^22 - 30402*u^23 + 34652*u^24 - 30552*u^25 + 31278*u^26 - 23843*u^27 + 21726*u^28 - 13782*u^29 + 11256*u^30 - 5752*u^31 + 4243*u^32 - 1682*u^33 + 1126*u^34 - 327*u^35 + 199*u^36 - 38*u^37 + 21*u^38 - 2*u^39 + u^40)" ], "RileyPolyC":[ "(1 + y + y^2)*(1 - 4*y - 6*y^2 + 41*y^3 + 219*y^4 - 926*y^5 + 3671*y^6 - 26934*y^7 + 101823*y^8 - 132280*y^9 - 271872*y^10 + 1336946*y^11 - 1905340*y^12 - 540012*y^13 + 6649856*y^14 - 12018476*y^15 + 10298623*y^16 - 1157376*y^17 - 7601218*y^18 + 8337679*y^19 - 2003013*y^20 - 4142602*y^21 + 5342011*y^22 - 3012374*y^23 + 790360*y^24 - 122020*y^25 + 224180*y^26 - 240227*y^27 + 137076*y^28 - 146284*y^29 + 258260*y^30 - 320084*y^31 + 271541*y^32 - 168048*y^33 + 78750*y^34 - 28343*y^35 + 7803*y^36 - 1606*y^37 + 235*y^38 - 22*y^39 + y^40)", "81*(1 + 3*y)^2*(1024 - 13312*y + 217600*y^2 - 915856*y^3 + 5259656*y^4 - 16245105*y^5 + 68815932*y^6 - 198058404*y^7 + 559118935*y^8 - 1244242596*y^9 + 2404685585*y^10 - 3325715575*y^11 + 3050118125*y^12 - 280261067*y^13 - 3799839124*y^14 + 6632102875*y^15 - 4937560085*y^16 - 853770802*y^17 + 7139412006*y^18 - 9653874054*y^19 + 7112353724*y^20 - 2109686907*y^21 - 1915980574*y^22 + 3099817580*y^23 - 2085106321*y^24 + 508066440*y^25 + 497001301*y^26 - 700214121*y^27 + 491979321*y^28 - 229030454*y^29 + 69599062*y^30 - 9184727*y^31 - 3734506*y^32 + 2673038*y^33 - 833091*y^34 + 126539*y^35 + 12895*y^36 - 8113*y^37 + 2352*y^38 - 181*y^39 + 9*y^40)", "(1 + y + y^2)*(1 - 4*y + 6*y^2 - 239*y^3 + 1095*y^4 - 3042*y^5 + 13111*y^6 - 22494*y^7 + 31523*y^8 + 291868*y^9 + 688944*y^10 + 2379734*y^11 + 6724728*y^12 + 15351088*y^13 + 34859112*y^14 + 75217796*y^15 + 143272115*y^16 + 243054732*y^17 + 376411998*y^18 + 537777123*y^19 + 711146355*y^20 + 872095710*y^21 + 992483607*y^22 + 1048807594*y^23 + 1030544560*y^24 + 941327964*y^25 + 794749964*y^26 + 612323721*y^27 + 423041924*y^28 + 257312604*y^29 + 135520700*y^30 + 60927492*y^31 + 23084057*y^32 + 7276436*y^33 + 1880486*y^34 + 391097*y^35 + 63799*y^36 + 7858*y^37 + 687*y^38 + 38*y^39 + y^40)", "81*(1 - 3*y + 9*y^2)*(10609 + 78084*y + 438718*y^2 + 1141713*y^3 + 1738187*y^4 - 2349794*y^5 - 12291841*y^6 - 11591970*y^7 + 40401811*y^8 + 210949680*y^9 + 404068556*y^10 + 548331034*y^11 + 517285132*y^12 + 471776404*y^13 + 1510707840*y^14 + 2177219336*y^15 + 2682757163*y^16 + 1587596900*y^17 - 971139442*y^18 - 3110664049*y^19 - 3488725965*y^20 - 2109798194*y^21 - 14473821*y^22 + 1192179778*y^23 + 1279434688*y^24 + 661780792*y^25 + 74248424*y^26 - 181179791*y^27 - 167479428*y^28 - 64647532*y^29 + 4699976*y^30 + 24542420*y^31 + 18523405*y^32 + 8741688*y^33 + 2997870*y^34 + 755637*y^35 + 138815*y^36 + 17770*y^37 + 1251*y^38 + 38*y^39 + 9*y^40)", "(1 + y + y^2)*(1 - 4*y - 6*y^2 + 41*y^3 + 219*y^4 - 926*y^5 + 3671*y^6 - 26934*y^7 + 101823*y^8 - 132280*y^9 - 271872*y^10 + 1336946*y^11 - 1905340*y^12 - 540012*y^13 + 6649856*y^14 - 12018476*y^15 + 10298623*y^16 - 1157376*y^17 - 7601218*y^18 + 8337679*y^19 - 2003013*y^20 - 4142602*y^21 + 5342011*y^22 - 3012374*y^23 + 790360*y^24 - 122020*y^25 + 224180*y^26 - 240227*y^27 + 137076*y^28 - 146284*y^29 + 258260*y^30 - 320084*y^31 + 271541*y^32 - 168048*y^33 + 78750*y^34 - 28343*y^35 + 7803*y^36 - 1606*y^37 + 235*y^38 - 22*y^39 + y^40)", "(-1 + y)^2*(81 + 389*y - 2019*y^2 - 11473*y^3 + 112595*y^4 - 485253*y^5 + 1500788*y^6 - 3658481*y^7 + 7004679*y^8 - 10227166*y^9 + 10958862*y^10 - 8589282*y^11 + 7488548*y^12 - 15496844*y^13 + 35999480*y^14 - 60768232*y^15 + 73652727*y^16 - 64706733*y^17 + 40883439*y^18 - 20881583*y^19 + 18601271*y^20 - 32022209*y^21 + 47498656*y^22 - 52849489*y^23 + 45796240*y^24 - 32201673*y^25 + 19166969*y^26 - 10293399*y^27 + 5496888*y^28 - 3164920*y^29 + 1923320*y^30 - 1124908*y^31 + 587381*y^32 - 263235*y^33 + 99141*y^34 - 30841*y^35 + 7751*y^36 - 1521*y^37 + 220*y^38 - 21*y^39 + y^40)", "y^2*(1296 - 7416*y + 16369*y^2 - 14789*y^3 - 27470*y^4 + 418132*y^5 - 1733195*y^6 + 2898937*y^7 + 3180161*y^8 - 40184928*y^9 + 177261818*y^10 - 570571326*y^11 + 1457354500*y^12 - 3026794616*y^13 + 5200905784*y^14 - 7515387620*y^15 + 9275745384*y^16 - 9921671528*y^17 + 9322007187*y^18 - 7788238267*y^19 + 5847653054*y^20 - 3979238412*y^21 + 2468388225*y^22 - 1399892903*y^23 + 725766721*y^24 - 342619120*y^25 + 145779927*y^26 - 54676351*y^27 + 17225120*y^28 - 4025672*y^29 + 364872*y^30 + 227888*y^31 - 141988*y^32 + 38412*y^33 - 887*y^34 - 4125*y^35 + 2114*y^36 - 620*y^37 + 121*y^38 - 15*y^39 + y^40)", "(-1 + y)^2*(81 + 389*y - 2019*y^2 - 11473*y^3 + 112595*y^4 - 485253*y^5 + 1500788*y^6 - 3658481*y^7 + 7004679*y^8 - 10227166*y^9 + 10958862*y^10 - 8589282*y^11 + 7488548*y^12 - 15496844*y^13 + 35999480*y^14 - 60768232*y^15 + 73652727*y^16 - 64706733*y^17 + 40883439*y^18 - 20881583*y^19 + 18601271*y^20 - 32022209*y^21 + 47498656*y^22 - 52849489*y^23 + 45796240*y^24 - 32201673*y^25 + 19166969*y^26 - 10293399*y^27 + 5496888*y^28 - 3164920*y^29 + 1923320*y^30 - 1124908*y^31 + 587381*y^32 - 263235*y^33 + 99141*y^34 - 30841*y^35 + 7751*y^36 - 1521*y^37 + 220*y^38 - 21*y^39 + y^40)", "(1 + y + y^2)*(1 - 4*y + 6*y^2 - 239*y^3 + 1095*y^4 - 3042*y^5 + 13111*y^6 - 22494*y^7 + 31523*y^8 + 291868*y^9 + 688944*y^10 + 2379734*y^11 + 6724728*y^12 + 15351088*y^13 + 34859112*y^14 + 75217796*y^15 + 143272115*y^16 + 243054732*y^17 + 376411998*y^18 + 537777123*y^19 + 711146355*y^20 + 872095710*y^21 + 992483607*y^22 + 1048807594*y^23 + 1030544560*y^24 + 941327964*y^25 + 794749964*y^26 + 612323721*y^27 + 423041924*y^28 + 257312604*y^29 + 135520700*y^30 + 60927492*y^31 + 23084057*y^32 + 7276436*y^33 + 1880486*y^34 + 391097*y^35 + 63799*y^36 + 7858*y^37 + 687*y^38 + 38*y^39 + y^40)", "(1 + y + y^2)*(1 - 4*y + 6*y^2 - 239*y^3 + 1095*y^4 - 3042*y^5 + 13111*y^6 - 22494*y^7 + 31523*y^8 + 291868*y^9 + 688944*y^10 + 2379734*y^11 + 6724728*y^12 + 15351088*y^13 + 34859112*y^14 + 75217796*y^15 + 143272115*y^16 + 243054732*y^17 + 376411998*y^18 + 537777123*y^19 + 711146355*y^20 + 872095710*y^21 + 992483607*y^22 + 1048807594*y^23 + 1030544560*y^24 + 941327964*y^25 + 794749964*y^26 + 612323721*y^27 + 423041924*y^28 + 257312604*y^29 + 135520700*y^30 + 60927492*y^31 + 23084057*y^32 + 7276436*y^33 + 1880486*y^34 + 391097*y^35 + 63799*y^36 + 7858*y^37 + 687*y^38 + 38*y^39 + y^40)" ] }, "GeometricRepresentation":[ 1.38661e1, [ "J10_90_0", 1, "{33, 34}" ] ] } }