/* 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^18 - x^17 + 4*x^15 - 5*x^14 + x^13 + 6*x^12 - 9*x^11 + 7*x^10 + x^9 - 12*x^8 + 11*x^7 - 2*x^6 - 5*x^5 + 6*x^4 - x^3 - x^2 - x + 1, 18, 217, [0, 9], -13950087665617805207, [11, 23], [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, a^16, 1/16867*a^17 - 6775/16867*a^16 - 1257/16867*a^15 - 2913/16867*a^14 - 1733/16867*a^13 - 89/16867*a^12 - 4320/16867*a^11 - 574/16867*a^10 - 7994/16867*a^9 + 8287/16867*a^8 - 2774/16867*a^7 + 1249/16867*a^6 + 6506/16867*a^5 + 1822/16867*a^4 + 4422/16867*a^3 + 1163/16867*a^2 - 1274/16867*a - 5829/16867], 0, 1, [], 0, [ (17410)/(16867)*a^(17) - (1819)/(16867)*a^(16) + (8996)/(16867)*a^(15) + (54340)/(16867)*a^(14) - (13334)/(16867)*a^(13) + (19141)/(16867)*a^(12) + (49354)/(16867)*a^(11) - (24943)/(16867)*a^(10) + (61545)/(16867)*a^(9) + (13219)/(16867)*a^(8) - (55720)/(16867)*a^(7) - (13340)/(16867)*a^(6) - (9312)/(16867)*a^(5) - (5807)/(16867)*a^(4) - (27702)/(16867)*a^(3) + (41164)/(16867)*a^(2) - (235)/(16867)*a - (11018)/(16867) , (5790)/(16867)*a^(17) + (5392)/(16867)*a^(16) - (8353)/(16867)*a^(15) + (34464)/(16867)*a^(14) + (1795)/(16867)*a^(13) - (26167)/(16867)*a^(12) + (68429)/(16867)*a^(11) - (34395)/(16867)*a^(10) - (2212)/(16867)*a^(9) + (79450)/(16867)*a^(8) - (105278)/(16867)*a^(7) + (29501)/(16867)*a^(6) + (22596)/(16867)*a^(5) - (76830)/(16867)*a^(4) + (33008)/(16867)*a^(3) - (13030)/(16867)*a^(2) + (11286)/(16867)*a + (957)/(16867) , (15616)/(16867)*a^(17) - (8576)/(16867)*a^(16) + (3876)/(16867)*a^(15) + (51492)/(16867)*a^(14) - (41594)/(16867)*a^(13) + (10137)/(16867)*a^(12) + (57481)/(16867)*a^(11) - (74675)/(16867)*a^(10) + (65831)/(16867)*a^(9) + (6168)/(16867)*a^(8) - (122397)/(16867)*a^(7) + (56733)/(16867)*a^(6) - (9112)/(16867)*a^(5) - (52878)/(16867)*a^(4) + (34188)/(16867)*a^(3) + (12516)/(16867)*a^(2) - (8591)/(16867)*a + (5535)/(16867) , (9857)/(16867)*a^(17) - (4722)/(16867)*a^(16) + (6996)/(16867)*a^(15) + (27927)/(16867)*a^(14) - (12777)/(16867)*a^(13) + (16678)/(16867)*a^(12) + (23802)/(16867)*a^(11) - (7473)/(16867)*a^(10) + (39500)/(16867)*a^(9) - (1922)/(16867)*a^(8) - (18778)/(16867)*a^(7) - (1517)/(16867)*a^(6) + (18175)/(16867)*a^(5) - (3901)/(16867)*a^(4) - (30408)/(16867)*a^(3) + (27865)/(16867)*a^(2) - (8770)/(16867)*a - (7451)/(16867) , (2247)/(16867)*a^(17) + (7476)/(16867)*a^(16) - (7690)/(16867)*a^(15) + (15752)/(16867)*a^(14) + (19093)/(16867)*a^(13) - (31313)/(16867)*a^(12) + (42086)/(16867)*a^(11) + (8981)/(16867)*a^(10) - (32897)/(16867)*a^(9) + (84056)/(16867)*a^(8) - (42989)/(16867)*a^(7) - (27153)/(16867)*a^(6) + (62761)/(16867)*a^(5) - (55248)/(16867)*a^(4) + (18438)/(16867)*a^(3) + (32610)/(16867)*a^(2) - (12155)/(16867)*a - (8971)/(16867) , (9221)/(16867)*a^(17) + (3093)/(16867)*a^(16) - (3168)/(16867)*a^(15) + (42092)/(16867)*a^(14) - (6944)/(16867)*a^(13) - (11053)/(16867)*a^(12) + (72602)/(16867)*a^(11) - (47217)/(16867)*a^(10) + (29850)/(16867)*a^(9) + (74385)/(16867)*a^(8) - (109884)/(16867)*a^(7) + (47469)/(16867)*a^(6) + (12774)/(16867)*a^(5) - (66338)/(16867)*a^(4) + (58324)/(16867)*a^(3) + (13478)/(16867)*a^(2) + (8745)/(16867)*a - (10947)/(16867) , (9801)/(16867)*a^(17) + (3604)/(16867)*a^(16) - (6947)/(16867)*a^(15) + (39252)/(16867)*a^(14) - (64)/(16867)*a^(13) - (28939)/(16867)*a^(12) + (63318)/(16867)*a^(11) - (25930)/(16867)*a^(10) - (1979)/(16867)*a^(9) + (73750)/(16867)*a^(8) - (99572)/(16867)*a^(7) - (3993)/(16867)*a^(6) + (58647)/(16867)*a^(5) - (55332)/(16867)*a^(4) + (25566)/(16867)*a^(3) + (30205)/(16867)*a^(2) - (21761)/(16867)*a - (1500)/(16867) , (17410)/(16867)*a^(17) - (1819)/(16867)*a^(16) + (8996)/(16867)*a^(15) + (54340)/(16867)*a^(14) - (13334)/(16867)*a^(13) + (19141)/(16867)*a^(12) + (49354)/(16867)*a^(11) - (24943)/(16867)*a^(10) + (61545)/(16867)*a^(9) + (13219)/(16867)*a^(8) - (55720)/(16867)*a^(7) - (13340)/(16867)*a^(6) - (9312)/(16867)*a^(5) - (5807)/(16867)*a^(4) - (27702)/(16867)*a^(3) + (41164)/(16867)*a^(2) + (16632)/(16867)*a - (11018)/(16867) ], 91.5286994248, [[x^2 - x + 6, 1], [x^3 - x^2 + 1, 3], [x^6 - 3*x^5 + 5*x^4 - 5*x^3 + 5*x^2 - 3*x + 1, 1], [x^9 - 2*x^8 + 2*x^7 - 2*x^5 + 2*x^4 - x + 1, 1]]]