/* 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^15 - 2*x^14 + x^12 - 6*x^11 + 27*x^9 - 37*x^8 + 44*x^7 - 34*x^6 + 14*x^5 - 15*x^4 - 8*x^3 + 9*x - 1, 15, 30, [3, 6], 351730374981194881, [7, 71], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, 1/7*a^12 - 1/7*a^11 + 1/7*a^10 - 1/7*a^9 + 3/7*a^8 - 1/7*a^6 + 1/7*a^5 + 1/7*a^4 - 2/7*a^3 - 1/7*a^2 - 1/7, 1/7*a^13 + 2/7*a^9 + 3/7*a^8 - 1/7*a^7 + 2/7*a^5 - 1/7*a^4 - 3/7*a^3 - 1/7*a^2 - 1/7*a - 1/7, 1/2049272407*a^14 + 650660/2049272407*a^13 + 38608274/2049272407*a^12 - 215400421/2049272407*a^11 + 13067319/292753201*a^10 + 715149348/2049272407*a^9 - 754312263/2049272407*a^8 - 413178839/2049272407*a^7 - 648259/1899233*a^6 + 481581404/2049272407*a^5 - 790941285/2049272407*a^4 + 390461632/2049272407*a^3 - 293010650/2049272407*a^2 - 642956668/2049272407*a + 365753205/2049272407], 0, 1, [], 0, [ (255880921)/(2049272407)*a^(14) - (485636051)/(2049272407)*a^(13) - (197206)/(2049272407)*a^(12) + (167332587)/(2049272407)*a^(11) - (1544287239)/(2049272407)*a^(10) - (116046345)/(2049272407)*a^(9) + (6574703196)/(2049272407)*a^(8) - (8781867005)/(2049272407)*a^(7) + (11059264)/(1899233)*a^(6) - (1313768850)/(292753201)*a^(5) + (4266157921)/(2049272407)*a^(4) - (4294261913)/(2049272407)*a^(3) - (3596720318)/(2049272407)*a^(2) - (346727385)/(2049272407)*a + (540418521)/(292753201) , (255880921)/(2049272407)*a^(14) - (485636051)/(2049272407)*a^(13) - (197206)/(2049272407)*a^(12) + (167332587)/(2049272407)*a^(11) - (1544287239)/(2049272407)*a^(10) - (116046345)/(2049272407)*a^(9) + (6574703196)/(2049272407)*a^(8) - (8781867005)/(2049272407)*a^(7) + (11059264)/(1899233)*a^(6) - (1313768850)/(292753201)*a^(5) + (4266157921)/(2049272407)*a^(4) - (4294261913)/(2049272407)*a^(3) - (3596720318)/(2049272407)*a^(2) - (346727385)/(2049272407)*a + (247665320)/(292753201) , (12852236)/(292753201)*a^(14) - (122422434)/(2049272407)*a^(13) - (114538017)/(2049272407)*a^(12) + (151620566)/(2049272407)*a^(11) - (529271406)/(2049272407)*a^(10) - (369366035)/(2049272407)*a^(9) + (316189996)/(292753201)*a^(8) - (2148532518)/(2049272407)*a^(7) + (1578590)/(1899233)*a^(6) + (439905178)/(2049272407)*a^(5) - (1281000761)/(2049272407)*a^(4) + (3334239357)/(2049272407)*a^(3) - (684134664)/(292753201)*a^(2) + (977574347)/(2049272407)*a - (129883449)/(292753201) , (230234853)/(2049272407)*a^(14) - (423783931)/(2049272407)*a^(13) + (5909252)/(292753201)*a^(12) + (21717355)/(292753201)*a^(11) - (1643983526)/(2049272407)*a^(10) - (154507558)/(2049272407)*a^(9) + (823087748)/(292753201)*a^(8) - (8487705271)/(2049272407)*a^(7) + (10976977)/(1899233)*a^(6) - (6001607020)/(2049272407)*a^(5) + (1515621637)/(2049272407)*a^(4) - (1306943656)/(2049272407)*a^(3) - (2919595537)/(2049272407)*a^(2) - (2254342921)/(2049272407)*a - (513987218)/(2049272407) , (62648636)/(2049272407)*a^(14) + (5792520)/(2049272407)*a^(13) - (224814635)/(2049272407)*a^(12) - (41965270)/(2049272407)*a^(11) - (198590085)/(2049272407)*a^(10) - (785041694)/(2049272407)*a^(9) + (1556176147)/(2049272407)*a^(8) + (1553912298)/(2049272407)*a^(7) - (1058661)/(1899233)*a^(6) + (1558469032)/(2049272407)*a^(5) - (1083243712)/(2049272407)*a^(4) - (3513994917)/(2049272407)*a^(3) - (762093273)/(2049272407)*a^(2) - (49549904)/(292753201)*a + (572514282)/(2049272407) , (221055444)/(2049272407)*a^(14) - (347237069)/(2049272407)*a^(13) - (219151923)/(2049272407)*a^(12) + (328922297)/(2049272407)*a^(11) - (1314313100)/(2049272407)*a^(10) - (504703060)/(2049272407)*a^(9) + (6085241802)/(2049272407)*a^(8) - (6047367721)/(2049272407)*a^(7) + (4997054)/(1899233)*a^(6) - (1520419438)/(2049272407)*a^(5) - (3855266138)/(2049272407)*a^(4) + (3073335172)/(2049272407)*a^(3) - (1026437769)/(292753201)*a^(2) + (986250905)/(2049272407)*a + (1202736900)/(2049272407) , (33247931)/(292753201)*a^(14) - (464036849)/(2049272407)*a^(13) + (23194359)/(292753201)*a^(12) + (998838)/(292753201)*a^(11) - (205663050)/(292753201)*a^(10) + (155140392)/(2049272407)*a^(9) + (5132102050)/(2049272407)*a^(8) - (9330341444)/(2049272407)*a^(7) + (1825530)/(271319)*a^(6) - (13121056801)/(2049272407)*a^(5) + (8242550949)/(2049272407)*a^(4) - (5076936499)/(2049272407)*a^(3) - (1777739870)/(2049272407)*a^(2) - (653214006)/(2049272407)*a + (1124025486)/(2049272407) , (2518059)/(157636339)*a^(14) - (4280195)/(157636339)*a^(13) + (962023)/(157636339)*a^(12) + (2944593)/(157636339)*a^(11) - (14921471)/(157636339)*a^(10) - (12044792)/(157636339)*a^(9) + (50284490)/(157636339)*a^(8) - (96676948)/(157636339)*a^(7) + (1052425)/(1899233)*a^(6) - (72658038)/(157636339)*a^(5) + (92140511)/(157636339)*a^(4) - (141206899)/(157636339)*a^(3) + (86490816)/(157636339)*a^(2) + (24219284)/(157636339)*a + (90969295)/(157636339) ], 694.485336338, [[x^3 - x^2 - 2*x + 1, 1]]]