/* 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 - 5*x^13 + 11*x^12 - 47*x^11 + 204*x^10 - 368*x^9 - 44*x^8 + 1008*x^7 - 916*x^6 - 620*x^5 + 956*x^4 + 452*x^3 - 672*x^2 - 272*x + 304, 14, 51, [6, 4], 1453458087070606032896, [2, 809], [1, a, a^2, a^3, a^4, 1/2*a^5 - 1/2*a^4, 1/2*a^6 - 1/2*a^4, 1/2*a^7 - 1/2*a^4, 1/4*a^8 - 1/4*a^6 - 1/2*a^4 - 1/2*a^2, 1/4*a^9 - 1/4*a^7 - 1/2*a^4 - 1/2*a^3, 1/8*a^10 - 1/8*a^9 - 1/8*a^8 - 1/8*a^7 - 1/4*a^6 + 1/4*a^4 - 1/4*a^3 - 1/2*a^2, 1/8*a^11 - 1/8*a^7 - 1/4*a^5 - 1/2*a^4 - 1/4*a^3, 1/8*a^12 - 1/8*a^8 - 1/4*a^6 + 1/4*a^4, 1/5236090952*a^13 + 88848635/2618045476*a^12 + 52029641/1309022738*a^11 - 279168691/5236090952*a^10 + 9226781/2618045476*a^9 + 561468721/5236090952*a^8 - 1160838147/5236090952*a^7 + 483934559/2618045476*a^6 + 460349545/2618045476*a^5 + 1120148403/2618045476*a^4 - 471055749/2618045476*a^3 - 390924935/1309022738*a^2 - 267204976/654511369*a - 113841689/654511369], 0, 1, [], 0, [ (210061233)/(5236090952)*a^(13) - (163813507)/(1309022738)*a^(12) + (993916701)/(5236090952)*a^(11) - (7749706355)/(5236090952)*a^(10) + (6964736439)/(1309022738)*a^(9) - (21675606063)/(5236090952)*a^(8) - (30550792619)/(2618045476)*a^(7) + (26522550787)/(1309022738)*a^(6) + (6485712587)/(1309022738)*a^(5) - (57887022575)/(2618045476)*a^(4) - (2199115505)/(654511369)*a^(3) + (9893116355)/(654511369)*a^(2) + (2542336962)/(654511369)*a - (3369763573)/(654511369) , (98965461)/(5236090952)*a^(13) - (284156745)/(5236090952)*a^(12) + (362029663)/(5236090952)*a^(11) - (3629468657)/(5236090952)*a^(10) + (3076256089)/(1309022738)*a^(9) - (3097022531)/(2618045476)*a^(8) - (7231359577)/(1309022738)*a^(7) + (4146984795)/(654511369)*a^(6) + (6152250859)/(1309022738)*a^(5) - (3414123567)/(654511369)*a^(4) - (6385210377)/(1309022738)*a^(3) + (2436214615)/(1309022738)*a^(2) + (818621766)/(654511369)*a - (435258793)/(654511369) , (29805837)/(5236090952)*a^(13) - (45446501)/(2618045476)*a^(12) + (132776343)/(5236090952)*a^(11) - (1104442847)/(5236090952)*a^(10) + (1961539753)/(2618045476)*a^(9) - (2859576177)/(5236090952)*a^(8) - (4254769751)/(2618045476)*a^(7) + (1512404943)/(654511369)*a^(6) + (1869704169)/(1309022738)*a^(5) - (4562973569)/(2618045476)*a^(4) - (2332214022)/(654511369)*a^(3) + (1388848307)/(654511369)*a^(2) + (2441305349)/(654511369)*a - (1497491395)/(654511369) , (99376071)/(5236090952)*a^(13) - (70256699)/(1309022738)*a^(12) + (303211587)/(5236090952)*a^(11) - (3273536245)/(5236090952)*a^(10) + (5794743447)/(2618045476)*a^(9) - (3334574967)/(5236090952)*a^(8) - (5405585704)/(654511369)*a^(7) + (27741297781)/(2618045476)*a^(6) + (4695974480)/(654511369)*a^(5) - (43748087413)/(2618045476)*a^(4) - (2613318537)/(1309022738)*a^(3) + (12825060681)/(1309022738)*a^(2) + (2796768721)/(654511369)*a - (2387250579)/(654511369) , (34431395)/(654511369)*a^(13) - (817450959)/(5236090952)*a^(12) + (136750689)/(654511369)*a^(11) - (4936927105)/(2618045476)*a^(10) + (17340449975)/(2618045476)*a^(9) - (20007922905)/(5236090952)*a^(8) - (44990039693)/(2618045476)*a^(7) + (32197959489)/(1309022738)*a^(6) + (7433827194)/(654511369)*a^(5) - (76850260691)/(2618045476)*a^(4) - (5958807785)/(1309022738)*a^(3) + (20963039349)/(1309022738)*a^(2) + (1500379293)/(654511369)*a - (2993947289)/(654511369) , (261634117)/(2618045476)*a^(13) - (202825208)/(654511369)*a^(12) + (1210104749)/(2618045476)*a^(11) - (9586913455)/(2618045476)*a^(10) + (34433684531)/(2618045476)*a^(9) - (6460992392)/(654511369)*a^(8) - (78492630383)/(2618045476)*a^(7) + (133019002933)/(2618045476)*a^(6) + (18263979023)/(1309022738)*a^(5) - (74826207573)/(1309022738)*a^(4) - (10260963377)/(1309022738)*a^(3) + (49570214725)/(1309022738)*a^(2) + (5991693993)/(654511369)*a - (7131338669)/(654511369) , (87979895)/(1309022738)*a^(13) - (342287043)/(1309022738)*a^(12) + (319701234)/(654511369)*a^(11) - (14542572183)/(5236090952)*a^(10) + (57587950547)/(5236090952)*a^(9) - (75324067177)/(5236090952)*a^(8) - (61740493093)/(5236090952)*a^(7) + (111772391383)/(2618045476)*a^(6) - (14817252435)/(1309022738)*a^(5) - (101963108257)/(2618045476)*a^(4) + (23113954227)/(2618045476)*a^(3) + (41150186749)/(1309022738)*a^(2) - (705489499)/(654511369)*a - (9852740416)/(654511369) , (105468727)/(654511369)*a^(13) - (3104369179)/(5236090952)*a^(12) + (5387880795)/(5236090952)*a^(11) - (32923796249)/(5236090952)*a^(10) + (129197324953)/(5236090952)*a^(9) - (18357659059)/(654511369)*a^(8) - (106179152207)/(2618045476)*a^(7) + (71295586998)/(654511369)*a^(6) - (37347014903)/(2618045476)*a^(5) - (146218061311)/(1309022738)*a^(4) + (22990463447)/(1309022738)*a^(3) + (116147924505)/(1309022738)*a^(2) - (756353072)/(654511369)*a - (27226355075)/(654511369) , (1949496609)/(5236090952)*a^(13) - (8285186763)/(5236090952)*a^(12) + (14984289635)/(5236090952)*a^(11) - (79788210297)/(5236090952)*a^(10) + (168544399305)/(2618045476)*a^(9) - (228077348393)/(2618045476)*a^(8) - (227293602551)/(2618045476)*a^(7) + (815558412495)/(2618045476)*a^(6) - (120497210107)/(1309022738)*a^(5) - (412518278273)/(1309022738)*a^(4) + (67629657750)/(654511369)*a^(3) + (174151679440)/(654511369)*a^(2) - (24362468661)/(654511369)*a - (92144953831)/(654511369) ], 1157392.83214, [[x^7 - 8*x^5 - 2*x^4 + 15*x^3 + 4*x^2 - 6*x - 2, 1]]]