/* 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^14 - 7*x^13 + 6*x^12 + 53*x^11 - 98*x^10 - 127*x^9 + 309*x^8 + 174*x^7 - 406*x^6 - 232*x^5 + 238*x^4 + 226*x^3 - 48*x^2 - 86*x - 2, 14, 51, [12, 1], -34135604022671835136, [2, 19, 809], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, a^12, 1/234761*a^13 - 22817/234761*a^12 - 407/10207*a^11 - 108047/234761*a^10 + 30994/234761*a^9 - 107896/234761*a^8 + 108506/234761*a^7 + 63537/234761*a^6 - 99723/234761*a^5 + 1391/3979*a^4 - 9438/234761*a^3 + 5169/234761*a^2 - 54916/234761*a - 50822/234761], 0, 1, [], 0, [ (36214)/(234761)*a^(13) - (170879)/(234761)*a^(12) - (10397)/(10207)*a^(11) + (1825617)/(234761)*a^(10) + (259136)/(234761)*a^(9) - (7261251)/(234761)*a^(8) + (241427)/(234761)*a^(7) + (13887256)/(234761)*a^(6) + (1837829)/(234761)*a^(5) - (219311)/(3979)*a^(4) - (6079502)/(234761)*a^(3) + (4780869)/(234761)*a^(2) + (3923344)/(234761)*a - (176429)/(234761) , (48770)/(234761)*a^(13) - (252711)/(234761)*a^(12) - (6982)/(10207)*a^(11) + (2340826)/(234761)*a^(10) - (987743)/(234761)*a^(9) - (7667218)/(234761)*a^(8) + (4080856)/(234761)*a^(7) + (12296623)/(234761)*a^(6) - (3233727)/(234761)*a^(5) - (189893)/(3979)*a^(4) - (2037788)/(234761)*a^(3) + (5358319)/(234761)*a^(2) + (2247778)/(234761)*a - (686585)/(234761) , (73316)/(234761)*a^(13) - (413808)/(234761)*a^(12) - (4551)/(10207)*a^(11) + (3722747)/(234761)*a^(10) - (2477986)/(234761)*a^(9) - (12204052)/(234761)*a^(8) + (8096524)/(234761)*a^(7) + (21514181)/(234761)*a^(6) - (5294387)/(234761)*a^(5) - (373240)/(3979)*a^(4) - (6689049)/(234761)*a^(3) + (9456590)/(234761)*a^(2) + (6503002)/(234761)*a + (295601)/(234761) , (57365)/(234761)*a^(13) - (339391)/(234761)*a^(12) - (4146)/(10207)*a^(11) + (3330421)/(234761)*a^(10) - (1987092)/(234761)*a^(9) - (12422608)/(234761)*a^(8) + (6801605)/(234761)*a^(7) + (24315863)/(234761)*a^(6) - (3240501)/(234761)*a^(5) - (417946)/(3979)*a^(4) - (9442444)/(234761)*a^(3) + (8937460)/(234761)*a^(2) + (7044349)/(234761)*a + (92829)/(234761) , (10546)/(234761)*a^(13) + (1943)/(234761)*a^(12) - (15489)/(10207)*a^(11) + (535754)/(234761)*a^(10) + (2188261)/(234761)*a^(9) - (3975586)/(234761)*a^(8) - (4850819)/(234761)*a^(7) + (8269943)/(234761)*a^(6) + (7093352)/(234761)*a^(5) - (104541)/(3979)*a^(4) - (7976358)/(234761)*a^(3) + (282483)/(234761)*a^(2) + (4236949)/(234761)*a + (1399117)/(234761) , (62457)/(234761)*a^(13) - (316860)/(234761)*a^(12) - (14776)/(10207)*a^(11) + (3434881)/(234761)*a^(10) - (516470)/(234761)*a^(9) - (13662105)/(234761)*a^(8) + (4339153)/(234761)*a^(7) + (25754175)/(234761)*a^(6) - (1833408)/(234761)*a^(5) - (417594)/(3979)*a^(4) - (9609496)/(234761)*a^(3) + (9434298)/(234761)*a^(2) + (7716711)/(234761)*a + (13827)/(234761) , (37732)/(234761)*a^(13) - (62457)/(234761)*a^(12) - (36217)/(10207)*a^(11) + (1673449)/(234761)*a^(10) + (4581526)/(234761)*a^(9) - (9531811)/(234761)*a^(8) - (9473888)/(234761)*a^(7) + (16901544)/(234761)*a^(6) + (12443405)/(234761)*a^(5) - (160937)/(3979)*a^(4) - (11720229)/(234761)*a^(3) + (419839)/(234761)*a^(2) + (4840055)/(234761)*a + (146905)/(234761) , (20985)/(234761)*a^(13) - (137066)/(234761)*a^(12) + (2364)/(10207)*a^(11) + (1129248)/(234761)*a^(10) - (1287446)/(234761)*a^(9) - (3449130)/(234761)*a^(8) + (3338125)/(234761)*a^(7) + (6689534)/(234761)*a^(6) - (1905689)/(234761)*a^(5) - (139074)/(3979)*a^(4) - (2735278)/(234761)*a^(3) + (4237581)/(234761)*a^(2) + (2846621)/(234761)*a + (19553)/(234761) , (94096)/(234761)*a^(13) - (568609)/(234761)*a^(12) + (9799)/(10207)*a^(11) + (3995052)/(234761)*a^(10) - (4954460)/(234761)*a^(9) - (8559206)/(234761)*a^(8) + (10788931)/(234761)*a^(7) + (11657215)/(234761)*a^(6) - (6476785)/(234761)*a^(5) - (216535)/(3979)*a^(4) - (916229)/(234761)*a^(3) + (5591696)/(234761)*a^(2) + (1357001)/(234761)*a + (169419)/(234761) , (68321)/(234761)*a^(13) - (536739)/(234761)*a^(12) + (38049)/(10207)*a^(11) + (2762929)/(234761)*a^(10) - (8689303)/(234761)*a^(9) - (771499)/(234761)*a^(8) + (18736448)/(234761)*a^(7) - (3810450)/(234761)*a^(6) - (17313655)/(234761)*a^(5) - (31757)/(3979)*a^(4) + (10404353)/(234761)*a^(3) + (4531164)/(234761)*a^(2) - (3956671)/(234761)*a - (329433)/(234761) , (24879)/(234761)*a^(13) - (12045)/(234761)*a^(12) - (31030)/(10207)*a^(11) + (1085942)/(234761)*a^(10) + (4370300)/(234761)*a^(9) - (7364901)/(234761)*a^(8) - (9855927)/(234761)*a^(7) + (14176870)/(234761)*a^(6) + (12622825)/(234761)*a^(5) - (137939)/(3979)*a^(4) - (10611247)/(234761)*a^(3) - (284238)/(234761)*a^(2) + (4279554)/(234761)*a + (256969)/(234761) , (106473)/(234761)*a^(13) - (557135)/(234761)*a^(12) - (5796)/(10207)*a^(11) + (4130750)/(234761)*a^(10) - (2593586)/(234761)*a^(9) - (9371713)/(234761)*a^(8) + (4830987)/(234761)*a^(7) + (10431509)/(234761)*a^(6) + (667812)/(234761)*a^(5) - (113807)/(3979)*a^(4) - (3636509)/(234761)*a^(3) + (1252958)/(234761)*a^(2) + (1060003)/(234761)*a + (774527)/(234761) ], 183002.663841, [[x^7 - 8*x^5 - 2*x^4 + 15*x^3 + 4*x^2 - 6*x - 2, 1]]]