/* 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 - 5*x^17 + 12*x^16 - 17*x^15 + 12*x^14 - 2*x^13 + 8*x^12 - 46*x^11 + 111*x^10 - 168*x^9 + 188*x^8 - 173*x^7 + 137*x^6 - 102*x^5 + 70*x^4 - 40*x^3 + 19*x^2 - 5*x + 1, 18, 314, [0, 9], -2745546730527991447, [23, 2647], [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, 1/107897*a^17 + 40872/107897*a^16 + 47608/107897*a^15 + 41907/107897*a^14 - 48218/107897*a^13 - 52689/107897*a^12 - 36228/107897*a^11 - 5677/107897*a^10 + 27829/107897*a^9 + 7794/107897*a^8 - 24315/107897*a^7 + 22736/107897*a^6 - 45149/107897*a^5 + 22410/107897*a^4 + 8110/107897*a^3 + 52846/107897*a^2 - 19876/107897*a - 6847/107897], 0, 1, [], 0, [ (22226)/(107897)*a^(17) - (179565)/(107897)*a^(16) + (636911)/(107897)*a^(15) - (1128789)/(107897)*a^(14) + (1018706)/(107897)*a^(13) - (59573)/(107897)*a^(12) - (399805)/(107897)*a^(11) - (1879658)/(107897)*a^(10) + (6211879)/(107897)*a^(9) - (10303353)/(107897)*a^(8) + (11791656)/(107897)*a^(7) - (9985736)/(107897)*a^(6) + (7944804)/(107897)*a^(5) - (5794330)/(107897)*a^(4) + (3841265)/(107897)*a^(3) - (2493177)/(107897)*a^(2) + (721621)/(107897)*a - (262446)/(107897) , (68176)/(107897)*a^(17) - (274244)/(107897)*a^(16) + (612836)/(107897)*a^(15) - (816207)/(107897)*a^(14) + (527016)/(107897)*a^(13) - (126237)/(107897)*a^(12) + (421687)/(107897)*a^(11) - (2382347)/(107897)*a^(10) + (5727597)/(107897)*a^(9) - (8444947)/(107897)*a^(8) + (9309210)/(107897)*a^(7) - (7875247)/(107897)*a^(6) + (5725933)/(107897)*a^(5) - (4205343)/(107897)*a^(4) + (2632660)/(107897)*a^(3) - (1578286)/(107897)*a^(2) + (443835)/(107897)*a + (69247)/(107897) , (6437)/(107897)*a^(17) - (175616)/(107897)*a^(16) + (672598)/(107897)*a^(15) - (1281905)/(107897)*a^(14) + (1227270)/(107897)*a^(13) - (38822)/(107897)*a^(12) - (573704)/(107897)*a^(11) - (1692118)/(107897)*a^(10) + (6715867)/(107897)*a^(9) - (11655003)/(107897)*a^(8) + (13098429)/(107897)*a^(7) - (11393782)/(107897)*a^(6) + (8790062)/(107897)*a^(5) - (6478939)/(107897)*a^(4) + (4729390)/(107897)*a^(3) - (2619067)/(107897)*a^(2) + (995103)/(107897)*a - (160060)/(107897) , (70645)/(107897)*a^(17) - (244971)/(107897)*a^(16) + (225567)/(107897)*a^(15) + (257923)/(107897)*a^(14) - (915496)/(107897)*a^(13) + (447889)/(107897)*a^(12) + (1500338)/(107897)*a^(11) - (2480147)/(107897)*a^(10) + (1283232)/(107897)*a^(9) + (1411400)/(107897)*a^(8) - (3573536)/(107897)*a^(7) + (3051094)/(107897)*a^(6) - (2165828)/(107897)*a^(5) + (1708121)/(107897)*a^(4) - (1296884)/(107897)*a^(3) + (1256337)/(107897)*a^(2) - (292153)/(107897)*a - (4064)/(107897) , (48842)/(107897)*a^(17) - (255864)/(107897)*a^(16) + (521174)/(107897)*a^(15) - (523881)/(107897)*a^(14) + (4263)/(107897)*a^(13) + (446797)/(107897)*a^(12) + (494412)/(107897)*a^(11) - (2570272)/(107897)*a^(10) + (4685080)/(107897)*a^(9) - (5380918)/(107897)*a^(8) + (4021238)/(107897)*a^(7) - (2809534)/(107897)*a^(6) + (1865677)/(107897)*a^(5) - (1252712)/(107897)*a^(4) + (881909)/(107897)*a^(3) + (100195)/(107897)*a^(2) - (142180)/(107897)*a + (167423)/(107897) , (61558)/(107897)*a^(17) - (159464)/(107897)*a^(16) + (62847)/(107897)*a^(15) + (325424)/(107897)*a^(14) - (712453)/(107897)*a^(13) + (170152)/(107897)*a^(12) + (1078839)/(107897)*a^(11) - (1281147)/(107897)*a^(10) + (232707)/(107897)*a^(9) + (1907239)/(107897)*a^(8) - (3488290)/(107897)*a^(7) + (3071817)/(107897)*a^(6) - (2876538)/(107897)*a^(5) + (2317472)/(107897)*a^(4) - (1730391)/(107897)*a^(3) + (1402179)/(107897)*a^(2) - (298519)/(107897)*a + (173850)/(107897) , (115087)/(107897)*a^(17) - (581233)/(107897)*a^(16) + (1239103)/(107897)*a^(15) - (1339755)/(107897)*a^(14) + (201435)/(107897)*a^(13) + (855633)/(107897)*a^(12) + (1063008)/(107897)*a^(11) - (5966899)/(107897)*a^(10) + (11162863)/(107897)*a^(9) - (13231014)/(107897)*a^(8) + (11297475)/(107897)*a^(7) - (8623875)/(107897)*a^(6) + (6082995)/(107897)*a^(5) - (4170304)/(107897)*a^(4) + (2636048)/(107897)*a^(3) - (697876)/(107897)*a^(2) + (162982)/(107897)*a + (78999)/(107897) , (83016)/(107897)*a^(17) - (438595)/(107897)*a^(16) + (1037588)/(107897)*a^(15) - (1374120)/(107897)*a^(14) + (760594)/(107897)*a^(13) + (222253)/(107897)*a^(12) + (556815)/(107897)*a^(11) - (4195719)/(107897)*a^(10) + (9564533)/(107897)*a^(9) - (13518730)/(107897)*a^(8) + (13813852)/(107897)*a^(7) - (11643321)/(107897)*a^(6) + (8776259)/(107897)*a^(5) - (6337437)/(107897)*a^(4) + (4082566)/(107897)*a^(3) - (1970630)/(107897)*a^(2) + (690187)/(107897)*a - (9156)/(107897) ], 35.6314081744, [[x^3 - x^2 + 1, 1], [x^6 - x^5 + 8*x^4 + 3*x^3 + 20*x^2 + 22*x + 35, 1], [x^9 - 2*x^8 + 4*x^7 - 5*x^6 + 6*x^5 - 6*x^4 + 5*x^3 - 4*x^2 + 3*x - 1, 3]]]