/* 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^17 - 3*x^16 + 4*x^15 - 3*x^14 + x^13 + 4*x^12 - 8*x^11 + 9*x^10 - 2*x^9 - 9*x^8 + 12*x^7 - x^6 - 4*x^5 + 2*x^4 - 3*x^3 + x^2 - x - 1, 17, 10, [3, 7], -1912319465404851491, [227, 2411, 3533, 988994191], [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, 1/6939479*a^16 + 451058/6939479*a^15 + 3027220/6939479*a^14 + 416024/6939479*a^13 + 1749826/6939479*a^12 + 2742367/6939479*a^11 - 1209329/6939479*a^10 - 3401265/6939479*a^9 + 2025153/6939479*a^8 + 3098117/6939479*a^7 + 2168524/6939479*a^6 + 3159955/6939479*a^5 - 1826954/6939479*a^4 + 2372537/6939479*a^3 + 1036727/6939479*a^2 + 3385454/6939479*a + 33785/6939479], 0, 1, [], 0, [ (668821)/(6939479)*a^(16) - (2907949)/(6939479)*a^(15) + (5914580)/(6939479)*a^(14) - (6701759)/(6939479)*a^(13) + (4999712)/(6939479)*a^(12) - (236746)/(6939479)*a^(11) - (7535222)/(6939479)*a^(10) + (13970862)/(6939479)*a^(9) - (10414523)/(6939479)*a^(8) - (1082469)/(6939479)*a^(7) + (17158162)/(6939479)*a^(6) - (15703269)/(6939479)*a^(5) + (5200565)/(6939479)*a^(4) + (482300)/(6939479)*a^(3) - (1013334)/(6939479)*a^(2) + (7884740)/(6939479)*a - (5765618)/(6939479) , a , (2120656)/(6939479)*a^(16) - (5870791)/(6939479)*a^(15) + (7991336)/(6939479)*a^(14) - (6870921)/(6939479)*a^(13) + (3642270)/(6939479)*a^(12) + (7475239)/(6939479)*a^(11) - (16940584)/(6939479)*a^(10) + (23079634)/(6939479)*a^(9) - (10266278)/(6939479)*a^(8) - (8491204)/(6939479)*a^(7) + (18669587)/(6939479)*a^(6) - (6700139)/(6939479)*a^(5) + (4861271)/(6939479)*a^(4) - (2574577)/(6939479)*a^(3) - (10524910)/(6939479)*a^(2) + (6548794)/(6939479)*a - (3757715)/(6939479) , (1367013)/(6939479)*a^(16) - (5256791)/(6939479)*a^(15) + (8763353)/(6939479)*a^(14) - (7845654)/(6939479)*a^(13) + (3417917)/(6939479)*a^(12) + (5994391)/(6939479)*a^(11) - (18018981)/(6939479)*a^(10) + (23187614)/(6939479)*a^(9) - (11395313)/(6939479)*a^(8) - (11698137)/(6939479)*a^(7) + (28556987)/(6939479)*a^(6) - (15081421)/(6939479)*a^(5) - (6892134)/(6939479)*a^(4) + (12379667)/(6939479)*a^(3) - (9691282)/(6939479)*a^(2) + (7204844)/(6939479)*a + (2301460)/(6939479) , (100030)/(6939479)*a^(16) - (1160718)/(6939479)*a^(15) + (1710956)/(6939479)*a^(14) - (1174843)/(6939479)*a^(13) + (615963)/(6939479)*a^(12) + (1366140)/(6939479)*a^(11) - (7121421)/(6939479)*a^(10) + (7177941)/(6939479)*a^(9) - (8155857)/(6939479)*a^(8) + (1390328)/(6939479)*a^(7) + (3221138)/(6939479)*a^(6) - (2969800)/(6939479)*a^(5) + (970845)/(6939479)*a^(4) - (5305690)/(6939479)*a^(3) - (6711845)/(6939479)*a^(2) + (7327899)/(6939479)*a - (12723)/(6939479) , (186232)/(6939479)*a^(16) - (959839)/(6939479)*a^(15) + (1961080)/(6939479)*a^(14) - (2301467)/(6939479)*a^(13) + (2601271)/(6939479)*a^(12) - (1405340)/(6939479)*a^(11) - (1906862)/(6939479)*a^(10) + (4320161)/(6939479)*a^(9) - (5450675)/(6939479)*a^(8) + (6362126)/(6939479)*a^(7) - (1358316)/(6939479)*a^(6) + (3041402)/(6939479)*a^(5) - (1581437)/(6939479)*a^(4) - (1256825)/(6939479)*a^(3) + (1557926)/(6939479)*a^(2) + (444262)/(6939479)*a + (4680146)/(6939479) , (842332)/(6939479)*a^(16) - (2827473)/(6939479)*a^(15) + (5779011)/(6939479)*a^(14) - (6422053)/(6939479)*a^(13) + (2973590)/(6939479)*a^(12) + (4407719)/(6939479)*a^(11) - (10392818)/(6939479)*a^(10) + (18131523)/(6939479)*a^(9) - (11550984)/(6939479)*a^(8) - (3504938)/(6939479)*a^(7) + (21374546)/(6939479)*a^(6) - (16987054)/(6939479)*a^(5) + (3985791)/(6939479)*a^(4) + (11855427)/(6939479)*a^(3) - (2649475)/(6939479)*a^(2) + (1435863)/(6939479)*a - (7556238)/(6939479) , (1529449)/(6939479)*a^(16) - (4218785)/(6939479)*a^(15) + (6789333)/(6939479)*a^(14) - (7217692)/(6939479)*a^(13) + (4033692)/(6939479)*a^(12) + (6084435)/(6939479)*a^(11) - (13812893)/(6939479)*a^(10) + (21926659)/(6939479)*a^(9) - (12705121)/(6939479)*a^(8) - (3103247)/(6939479)*a^(7) + (20027932)/(6939479)*a^(6) - (17074234)/(6939479)*a^(5) + (10706315)/(6939479)*a^(4) + (6894055)/(6939479)*a^(3) - (8241203)/(6939479)*a^(2) + (7797433)/(6939479)*a - (5865648)/(6939479) , (2196622)/(6939479)*a^(16) - (7946065)/(6939479)*a^(15) + (13330754)/(6939479)*a^(14) - (12518582)/(6939479)*a^(13) + (5203941)/(6939479)*a^(12) + (10967181)/(6939479)*a^(11) - (26943875)/(6939479)*a^(10) + (34083209)/(6939479)*a^(9) - (15742910)/(6939479)*a^(8) - (23244425)/(6939479)*a^(7) + (51169185)/(6939479)*a^(6) - (28834614)/(6939479)*a^(5) - (5825251)/(6939479)*a^(4) + (25180493)/(6939479)*a^(3) - (17608278)/(6939479)*a^(2) + (1916139)/(6939479)*a + (2085844)/(6939479) ], 144.902374432, []]