/* Data is in the following format Note, if the class group has not been computed, it, the class number, the fundamental units, regulator and whether grh was assumed are all 0. [polynomial, degree, t-number of Galois group, signature [r,s], discriminant, list of ramifying primes, integral basis as polynomials in a, 1 if it is a cm field otherwise 0, class number, class group structure, 1 if grh was assumed and 0 if not, fundamental units, regulator, list of subfields each as a pair [polynomial, number of subfields isomorphic to one defined by this polynomial] ] */ [x^20 - x^19 + 5*x^18 - 3*x^17 + 9*x^16 - x^15 + 7*x^14 + 4*x^13 + 4*x^12 + 5*x^11 + 4*x^10 + 3*x^9 + 6*x^8 + 5*x^6 + 2*x^5 - x^4 + 3*x^3 + 1, 20, 1110, [0, 10], 1607377523338966031377, [28753, 236438047], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, a^12, a^13, a^14, a^15, a^16, a^17, a^18, 1/503*a^19 + 201/503*a^18 - 136/503*a^17 + 190/503*a^16 + 161/503*a^15 - 174/503*a^14 + 69/503*a^13 - 142/503*a^12 - 9/503*a^11 + 199/503*a^10 - 38/503*a^9 - 128/503*a^8 - 197/503*a^7 - 57/503*a^6 + 60/503*a^5 + 50/503*a^4 + 39/503*a^3 - 167/503*a^2 - 33/503*a - 127/503], 0, 1, [], 0, [ (30)/(503)*a^(19) - (509)/(503)*a^(18) + (447)/(503)*a^(17) - (2348)/(503)*a^(16) + (806)/(503)*a^(15) - (4214)/(503)*a^(14) - (948)/(503)*a^(13) - (4260)/(503)*a^(12) - (3288)/(503)*a^(11) - (4090)/(503)*a^(10) - (3655)/(503)*a^(9) - (3840)/(503)*a^(8) - (2389)/(503)*a^(7) - (3722)/(503)*a^(6) - (715)/(503)*a^(5) - (2524)/(503)*a^(4) - (1345)/(503)*a^(3) + (20)/(503)*a^(2) - (990)/(503)*a - (289)/(503) , (289)/(503)*a^(19) - (259)/(503)*a^(18) + (936)/(503)*a^(17) - (420)/(503)*a^(16) + (253)/(503)*a^(15) + (517)/(503)*a^(14) - (2191)/(503)*a^(13) + (208)/(503)*a^(12) - (3104)/(503)*a^(11) - (1843)/(503)*a^(10) - (2934)/(503)*a^(9) - (2788)/(503)*a^(8) - (2106)/(503)*a^(7) - (2389)/(503)*a^(6) - (2277)/(503)*a^(5) - (137)/(503)*a^(4) - (2813)/(503)*a^(3) - (478)/(503)*a^(2) + (20)/(503)*a - (990)/(503) , (776)/(503)*a^(19) - (960)/(503)*a^(18) + (3615)/(503)*a^(17) - (2957)/(503)*a^(16) + (5725)/(503)*a^(15) - (2232)/(503)*a^(14) + (3244)/(503)*a^(13) - (35)/(503)*a^(12) + (1064)/(503)*a^(11) + (3)/(503)*a^(10) + (692)/(503)*a^(9) - (740)/(503)*a^(8) + (2555)/(503)*a^(7) - (2483)/(503)*a^(6) + (1793)/(503)*a^(5) + (69)/(503)*a^(4) - (1928)/(503)*a^(3) + (685)/(503)*a^(2) + (45)/(503)*a - (467)/(503) , (442)/(503)*a^(19) - (692)/(503)*a^(18) + (2260)/(503)*a^(17) - (2033)/(503)*a^(16) + (3760)/(503)*a^(15) - (955)/(503)*a^(14) + (1827)/(503)*a^(13) + (1620)/(503)*a^(12) + (46)/(503)*a^(11) + (1442)/(503)*a^(10) - (197)/(503)*a^(9) - (240)/(503)*a^(8) + (951)/(503)*a^(7) - (2056)/(503)*a^(6) + (867)/(503)*a^(5) - (32)/(503)*a^(4) - (1876)/(503)*a^(3) + (1133)/(503)*a^(2) - (502)/(503)*a - (804)/(503) , (230)/(503)*a^(19) - (46)/(503)*a^(18) + (912)/(503)*a^(17) + (442)/(503)*a^(16) + (1317)/(503)*a^(15) + (2232)/(503)*a^(14) + (1283)/(503)*a^(13) + (3556)/(503)*a^(12) + (1954)/(503)*a^(11) + (3518)/(503)*a^(10) + (2326)/(503)*a^(9) + (2752)/(503)*a^(8) + (2475)/(503)*a^(7) + (1980)/(503)*a^(6) + (1225)/(503)*a^(5) + (2446)/(503)*a^(4) + (419)/(503)*a^(3) + (824)/(503)*a^(2) + (961)/(503)*a - (36)/(503) , (619)/(503)*a^(19) - (828)/(503)*a^(18) + (2835)/(503)*a^(17) - (2607)/(503)*a^(16) + (4592)/(503)*a^(15) - (2076)/(503)*a^(14) + (2974)/(503)*a^(13) + (127)/(503)*a^(12) + (1471)/(503)*a^(11) + (952)/(503)*a^(10) + (1125)/(503)*a^(9) + (242)/(503)*a^(8) + (2298)/(503)*a^(7) - (1582)/(503)*a^(6) + (1427)/(503)*a^(5) + (267)/(503)*a^(4) - (1512)/(503)*a^(3) + (748)/(503)*a^(2) + (196)/(503)*a - (145)/(503) , (414)/(503)*a^(19) - (284)/(503)*a^(18) + (2044)/(503)*a^(17) - (311)/(503)*a^(16) + (3779)/(503)*a^(15) + (1905)/(503)*a^(14) + (3919)/(503)*a^(13) + (4590)/(503)*a^(12) + (4322)/(503)*a^(11) + (4924)/(503)*a^(10) + (4388)/(503)*a^(9) + (3847)/(503)*a^(8) + (4455)/(503)*a^(7) + (2055)/(503)*a^(6) + (3211)/(503)*a^(5) + (2592)/(503)*a^(4) + (553)/(503)*a^(3) + (1282)/(503)*a^(2) + (925)/(503)*a - (266)/(503) , (413)/(503)*a^(19) - (485)/(503)*a^(18) + (1677)/(503)*a^(17) - (1507)/(503)*a^(16) + (2109)/(503)*a^(15) - (1442)/(503)*a^(14) + (329)/(503)*a^(13) - (1304)/(503)*a^(12) - (699)/(503)*a^(11) - (1814)/(503)*a^(10) - (604)/(503)*a^(9) - (2061)/(503)*a^(8) + (628)/(503)*a^(7) - (2415)/(503)*a^(6) + (133)/(503)*a^(5) - (476)/(503)*a^(4) - (1498)/(503)*a^(3) - (60)/(503)*a^(2) + (455)/(503)*a - (139)/(503) , (198)/(503)*a^(19) - (442)/(503)*a^(18) + (737)/(503)*a^(17) - (1111)/(503)*a^(16) + (189)/(503)*a^(15) - (248)/(503)*a^(14) - (1931)/(503)*a^(13) + (555)/(503)*a^(12) - (1782)/(503)*a^(11) - (335)/(503)*a^(10) - (482)/(503)*a^(9) - (697)/(503)*a^(8) + (731)/(503)*a^(7) - (1226)/(503)*a^(6) + (311)/(503)*a^(5) + (846)/(503)*a^(4) - (1332)/(503)*a^(3) + (635)/(503)*a^(2) + (508)/(503)*a - (499)/(503) ], 140.247818215, [[x^10 - 2*x^9 + x^8 + 2*x^7 - 3*x^6 + x^5 + x^4 - x + 1, 1]]]