/* 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 - x^16 + x^15 - 3*x^14 + 4*x^13 - 4*x^12 - x^11 + 4*x^10 - 5*x^9 + 17*x^8 - 42*x^7 + 59*x^6 - 45*x^5 + 9*x^4 + 15*x^3 - 15*x^2 + 6*x - 1, 17, 10, [3, 7], -2311521177047925203, [16843, 137239279050521], [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, 1/28117*a^16 + 11484/28117*a^15 - 3106/28117*a^14 + 260/907*a^13 + 7940/28117*a^12 + 7465/28117*a^11 + 6791/28117*a^10 - 1919/28117*a^9 + 4008/28117*a^8 + 4368/28117*a^7 + 5710/28117*a^6 + 10565/28117*a^5 - 13992/28117*a^4 - 9456/28117*a^3 + 446/907*a^2 - 13221/28117*a - 11379/28117], 0, 1, [], 0, [ a , (312988)/(28117)*a^(16) + (101848)/(28117)*a^(15) + (201366)/(28117)*a^(14) - (21835)/(907)*a^(13) + (200494)/(28117)*a^(12) - (404684)/(28117)*a^(11) - (1184021)/(28117)*a^(10) + (95733)/(28117)*a^(9) - (630742)/(28117)*a^(8) + (4160009)/(28117)*a^(7) - (7040524)/(28117)*a^(6) + (5669952)/(28117)*a^(5) + (35239)/(28117)*a^(4) - (3589967)/(28117)*a^(3) + (58861)/(907)*a^(2) + (20776)/(28117)*a - (247466)/(28117) , (146434)/(28117)*a^(16) - (282767)/(28117)*a^(15) + (109056)/(28117)*a^(14) - (16625)/(907)*a^(13) + (891520)/(28117)*a^(12) - (677724)/(28117)*a^(11) + (19355)/(28117)*a^(10) + (1091015)/(28117)*a^(9) - (822179)/(28117)*a^(8) + (2717428)/(28117)*a^(7) - (7990434)/(28117)*a^(6) + (11774542)/(28117)*a^(5) - (9100529)/(28117)*a^(4) + (1263260)/(28117)*a^(3) + (126195)/(907)*a^(2) - (3044515)/(28117)*a + (812561)/(28117) , (273065)/(28117)*a^(16) - (179252)/(28117)*a^(15) + (150000)/(28117)*a^(14) - (24828)/(907)*a^(13) + (793389)/(28117)*a^(12) - (670849)/(28117)*a^(11) - (578426)/(28117)*a^(10) + (988889)/(28117)*a^(9) - (825098)/(28117)*a^(8) + (4270447)/(28117)*a^(7) - (9868035)/(28117)*a^(6) + (11852314)/(28117)*a^(5) - (6598196)/(28117)*a^(4) - (1355678)/(28117)*a^(3) + (129266)/(907)*a^(2) - (2106457)/(28117)*a + (368556)/(28117) , (165585)/(28117)*a^(16) + (81664)/(28117)*a^(15) + (93505)/(28117)*a^(14) - (11353)/(907)*a^(13) + (22097)/(28117)*a^(12) - (156231)/(28117)*a^(11) - (670254)/(28117)*a^(10) - (7398)/(28117)*a^(9) - (233924)/(28117)*a^(8) + (2158581)/(28117)*a^(7) - (3289698)/(28117)*a^(6) + (2102677)/(28117)*a^(5) + (987692)/(28117)*a^(4) - (2297858)/(28117)*a^(3) + (22924)/(907)*a^(2) + (327739)/(28117)*a - (240247)/(28117) , (74408)/(28117)*a^(16) - (424030)/(28117)*a^(15) + (66726)/(28117)*a^(14) - (13835)/(907)*a^(13) + (1129796)/(28117)*a^(12) - (754774)/(28117)*a^(11) + (492110)/(28117)*a^(10) + (1451258)/(28117)*a^(9) - (853265)/(28117)*a^(8) + (2034165)/(28117)*a^(7) - (8047769)/(28117)*a^(6) + (13690296)/(28117)*a^(5) - (12315706)/(28117)*a^(4) + (3062513)/(28117)*a^(3) + (147586)/(907)*a^(2) - (4123771)/(28117)*a + (1179503)/(28117) , (93379)/(28117)*a^(16) - (158529)/(28117)*a^(15) + (76032)/(28117)*a^(14) - (10013)/(907)*a^(13) + (518193)/(28117)*a^(12) - (424184)/(28117)*a^(11) - (42146)/(28117)*a^(10) + (613914)/(28117)*a^(9) - (508461)/(28117)*a^(8) + (1701290)/(28117)*a^(7) - (4768471)/(28117)*a^(6) + (7037206)/(28117)*a^(5) - (5304208)/(28117)*a^(4) + (669252)/(28117)*a^(3) + (74689)/(907)*a^(2) - (1830128)/(28117)*a + (487895)/(28117) , (385357)/(28117)*a^(16) - (35427)/(28117)*a^(15) + (218667)/(28117)*a^(14) - (30680)/(907)*a^(13) + (604980)/(28117)*a^(12) - (663190)/(28117)*a^(11) - (1183185)/(28117)*a^(10) + (679942)/(28117)*a^(9) - (883815)/(28117)*a^(8) + (5526103)/(28117)*a^(7) - (10872995)/(28117)*a^(6) + (10948852)/(28117)*a^(5) - (3685732)/(28117)*a^(4) - (3487217)/(28117)*a^(3) + (117888)/(907)*a^(2) - (1129177)/(28117)*a + (37549)/(28117) , (146434)/(28117)*a^(16) - (282767)/(28117)*a^(15) + (109056)/(28117)*a^(14) - (16625)/(907)*a^(13) + (891520)/(28117)*a^(12) - (677724)/(28117)*a^(11) + (19355)/(28117)*a^(10) + (1091015)/(28117)*a^(9) - (822179)/(28117)*a^(8) + (2717428)/(28117)*a^(7) - (7990434)/(28117)*a^(6) + (11774542)/(28117)*a^(5) - (9100529)/(28117)*a^(4) + (1263260)/(28117)*a^(3) + (125288)/(907)*a^(2) - (3044515)/(28117)*a + (812561)/(28117) ], 161.12597366, []]