/* 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^24 - 3*x^16 - 8*x^12 + 18*x^8 + 8*x^4 + 1, 24, 65, [0, 12], 3852179415897489839182437154816, [2, 13], [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, a^19, 1/899*a^20 + 287/899*a^16 - 342/899*a^12 - 171/899*a^8 + 386/899*a^4 + 213/899, 1/899*a^21 + 287/899*a^17 - 342/899*a^13 - 171/899*a^9 + 386/899*a^5 + 213/899*a, 1/899*a^22 + 287/899*a^18 - 342/899*a^14 - 171/899*a^10 + 386/899*a^6 + 213/899*a^2, 1/899*a^23 + 287/899*a^19 - 342/899*a^15 - 171/899*a^11 + 386/899*a^7 + 213/899*a^3], 0, 1, [], 1, [ (313)/(899)*a^(20) - (69)/(899)*a^(16) - (964)/(899)*a^(12) - (2280)/(899)*a^(8) + (5746)/(899)*a^(4) + (1042)/(899) , (313)/(899)*a^(20) - (69)/(899)*a^(16) - (964)/(899)*a^(12) - (2280)/(899)*a^(8) + (6645)/(899)*a^(4) + (1042)/(899) , (989)/(899)*a^(23) + (573)/(899)*a^(21) - (241)/(899)*a^(19) - (66)/(899)*a^(17) - (2911)/(899)*a^(15) - (1782)/(899)*a^(13) - (7299)/(899)*a^(11) - (4487)/(899)*a^(9) + (19457)/(899)*a^(7) + (10812)/(899)*a^(5) + (2988)/(899)*a^(3) + (3381)/(899)*a , (1042)/(899)*a^(22) + (138)/(899)*a^(20) - (313)/(899)*a^(18) + (50)/(899)*a^(16) - (3057)/(899)*a^(14) - (448)/(899)*a^(12) - (7372)/(899)*a^(10) - (1123)/(899)*a^(8) + (21036)/(899)*a^(6) + (2025)/(899)*a^(4) + (2590)/(899)*a^(2) + (1525)/(899) , (53)/(899)*a^(22) - (313)/(899)*a^(20) - (72)/(899)*a^(18) + (69)/(899)*a^(16) - (146)/(899)*a^(14) + (964)/(899)*a^(12) - (73)/(899)*a^(10) + (2280)/(899)*a^(8) + (1579)/(899)*a^(6) - (5746)/(899)*a^(4) - (1297)/(899)*a^(2) - (1042)/(899) , (814)/(899)*a^(22) + (626)/(899)*a^(21) + (15)/(31)*a^(20) - (122)/(899)*a^(18) - (138)/(899)*a^(17) - (4)/(31)*a^(16) - (2395)/(899)*a^(14) - (1928)/(899)*a^(13) - (46)/(31)*a^(12) - (6142)/(899)*a^(10) - (4560)/(899)*a^(9) - (116)/(31)*a^(8) + (15736)/(899)*a^(6) + (12391)/(899)*a^(5) + (303)/(31)*a^(4) + (4370)/(899)*a^(2) + (2983)/(899)*a + (64)/(31) , (952)/(899)*a^(23) - (488)/(899)*a^(22) - (15)/(31)*a^(20) - (72)/(899)*a^(19) + (188)/(899)*a^(18) + (4)/(31)*a^(16) - (2843)/(899)*a^(15) + (1480)/(899)*a^(14) + (46)/(31)*a^(12) - (7265)/(899)*a^(11) + (3437)/(899)*a^(10) + (116)/(31)*a^(8) + (17761)/(899)*a^(7) - (10366)/(899)*a^(6) - (303)/(31)*a^(4) + (5895)/(899)*a^(3) - (559)/(899)*a^(2) - (64)/(31) , (1127)/(899)*a^(23) - (814)/(899)*a^(22) + (501)/(899)*a^(21) + (363)/(899)*a^(20) - (191)/(899)*a^(19) + (122)/(899)*a^(18) - (53)/(899)*a^(17) - (103)/(899)*a^(16) - (3359)/(899)*a^(15) + (2395)/(899)*a^(14) - (1431)/(899)*a^(13) - (983)/(899)*a^(12) - (8422)/(899)*a^(11) + (6142)/(899)*a^(10) - (3862)/(899)*a^(9) - (2739)/(899)*a^(8) + (21482)/(899)*a^(7) - (15736)/(899)*a^(6) + (9091)/(899)*a^(5) + (7066)/(899)*a^(4) + (5412)/(899)*a^(3) - (3471)/(899)*a^(2) + (3328)/(899)*a + (904)/(899) , (814)/(899)*a^(23) + (53)/(899)*a^(21) + (122)/(899)*a^(20) - (122)/(899)*a^(19) - (72)/(899)*a^(17) - (47)/(899)*a^(16) - (2395)/(899)*a^(15) - (146)/(899)*a^(13) - (370)/(899)*a^(12) - (6142)/(899)*a^(11) - (73)/(899)*a^(9) - (1084)/(899)*a^(8) + (15736)/(899)*a^(7) + (1579)/(899)*a^(5) + (2142)/(899)*a^(4) + (4370)/(899)*a^(3) - a^(2) - (398)/(899)*a - (85)/(899) , (90)/(899)*a^(23) + (1042)/(899)*a^(22) + (814)/(899)*a^(21) + (326)/(899)*a^(20) - (241)/(899)*a^(19) - (313)/(899)*a^(18) - (122)/(899)*a^(17) + (66)/(899)*a^(16) - (214)/(899)*a^(15) - (3057)/(899)*a^(14) - (2395)/(899)*a^(13) - (915)/(899)*a^(12) - (107)/(899)*a^(11) - (7372)/(899)*a^(10) - (6142)/(899)*a^(9) - (2705)/(899)*a^(8) + (3275)/(899)*a^(7) + (21036)/(899)*a^(6) + (15736)/(899)*a^(5) + (5370)/(899)*a^(4) - (4204)/(899)*a^(3) + (2590)/(899)*a^(2) + (4370)/(899)*a + (2912)/(899) , (573)/(899)*a^(23) + (379)/(899)*a^(22) - (379)/(899)*a^(21) + (379)/(899)*a^(20) - (66)/(899)*a^(19) - (6)/(899)*a^(18) + (6)/(899)*a^(17) - (6)/(899)*a^(16) - (1782)/(899)*a^(15) - (1061)/(899)*a^(14) + (1061)/(899)*a^(13) - (1061)/(899)*a^(12) - (4487)/(899)*a^(11) - (2778)/(899)*a^(10) + (2778)/(899)*a^(9) - (2778)/(899)*a^(8) + (10812)/(899)*a^(7) + (6949)/(899)*a^(6) - (6949)/(899)*a^(5) + (6949)/(899)*a^(4) + (4280)/(899)*a^(3) + (1615)/(899)*a^(2) - (1615)/(899)*a + (1615)/(899) ], 2446825.407448486, [[x^2 - 2, 1], [x^2 + 2, 1], [x^2 + 1, 1], [x^4 + 4*x^2 + 2, 1], [x^4 - 4*x^2 + 2, 1], [x^4 + 1, 1], [x^6 - x^4 - 2*x^3 + 2*x + 1, 1], [x^8 + 1, 1], [x^12 - 4*x^10 + 9*x^8 - 12*x^6 + 10*x^4 - 4*x^2 + 1, 1]]]