/* 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 - 3*x^17 + 6*x^16 - 7*x^15 + 4*x^14 + 2*x^13 - 4*x^12 - 3*x^11 + 14*x^10 - 19*x^9 + 17*x^8 - 6*x^7 - 10*x^6 + 18*x^5 - 9*x^4 - 6*x^3 + 10*x^2 - 5*x + 1, 18, 319, [0, 9], -12619972448180608967, [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, 1/687259*a^17 + 211711/687259*a^16 - 9533/40427*a^15 + 135755/687259*a^14 + 62694/687259*a^13 + 164451/687259*a^12 + 38070/687259*a^11 - 221575/687259*a^10 - 291973/687259*a^9 + 51755/687259*a^8 + 287850/687259*a^7 - 129672/687259*a^6 - 129804/687259*a^5 + 101595/687259*a^4 - 61102/687259*a^3 + 127323/687259*a^2 - 298125/687259*a - 56954/687259], 0, 1, [], 0, [ (814384)/(687259)*a^(17) - (2050601)/(687259)*a^(16) + (240116)/(40427)*a^(15) - (4029928)/(687259)*a^(14) + (1893904)/(687259)*a^(13) + (2163631)/(687259)*a^(12) - (2090905)/(687259)*a^(11) - (3160796)/(687259)*a^(10) + (10038073)/(687259)*a^(9) - (11459435)/(687259)*a^(8) + (9447421)/(687259)*a^(7) - (1333144)/(687259)*a^(6) - (7804759)/(687259)*a^(5) + (11289391)/(687259)*a^(4) - (2939568)/(687259)*a^(3) - (5885665)/(687259)*a^(2) + (5942261)/(687259)*a - (1378203)/(687259) , (1388599)/(687259)*a^(17) - (3663246)/(687259)*a^(16) + (387737)/(40427)*a^(15) - (6573714)/(687259)*a^(14) + (1728176)/(687259)*a^(13) + (4382514)/(687259)*a^(12) - (4121904)/(687259)*a^(11) - (6714305)/(687259)*a^(10) + (17093000)/(687259)*a^(9) - (18288378)/(687259)*a^(8) + (13507448)/(687259)*a^(7) - (551528)/(687259)*a^(6) - (16842659)/(687259)*a^(5) + (18241950)/(687259)*a^(4) - (2678030)/(687259)*a^(3) - (11906971)/(687259)*a^(2) + (8814214)/(687259)*a - (1999798)/(687259) , (492663)/(687259)*a^(17) - (1060260)/(687259)*a^(16) + (131200)/(40427)*a^(15) - (1893056)/(687259)*a^(14) + (907403)/(687259)*a^(13) + (1395798)/(687259)*a^(12) - (992218)/(687259)*a^(11) - (1708219)/(687259)*a^(10) + (5199932)/(687259)*a^(9) - (5720666)/(687259)*a^(8) + (4709749)/(687259)*a^(7) + (251068)/(687259)*a^(6) - (4301656)/(687259)*a^(5) + (5897105)/(687259)*a^(4) - (1437685)/(687259)*a^(3) - (2921335)/(687259)*a^(2) + (2400310)/(687259)*a - (1092568)/(687259) , (1011374)/(687259)*a^(17) - (2725867)/(687259)*a^(16) + (289877)/(40427)*a^(15) - (4961945)/(687259)*a^(14) + (1253475)/(687259)*a^(13) + (3413156)/(687259)*a^(12) - (3426331)/(687259)*a^(11) - (4775474)/(687259)*a^(10) + (13044290)/(687259)*a^(9) - (13791027)/(687259)*a^(8) + (10027867)/(687259)*a^(7) - (3394)/(687259)*a^(6) - (12547178)/(687259)*a^(5) + (14255397)/(687259)*a^(4) - (2768422)/(687259)*a^(3) - (9481395)/(687259)*a^(2) + (7329097)/(687259)*a - (1243488)/(687259) , (2380737)/(687259)*a^(17) - (6165075)/(687259)*a^(16) + (677530)/(40427)*a^(15) - (11334639)/(687259)*a^(14) + (3826671)/(687259)*a^(13) + (7182152)/(687259)*a^(12) - (6557402)/(687259)*a^(11) - (10966138)/(687259)*a^(10) + (29562111)/(687259)*a^(9) - (31800294)/(687259)*a^(8) + (24385737)/(687259)*a^(7) - (1621759)/(687259)*a^(6) - (25855745)/(687259)*a^(5) + (31406005)/(687259)*a^(4) - (5301270)/(687259)*a^(3) - (19808000)/(687259)*a^(2) + (15012197)/(687259)*a - (3166988)/(687259) , (1691543)/(687259)*a^(17) - (3470460)/(687259)*a^(16) + (365757)/(40427)*a^(15) - (4615036)/(687259)*a^(14) + (35070)/(687259)*a^(13) + (5108607)/(687259)*a^(12) - (1875326)/(687259)*a^(11) - (9006352)/(687259)*a^(10) + (15857788)/(687259)*a^(9) - (13737671)/(687259)*a^(8) + (9643338)/(687259)*a^(7) + (3942098)/(687259)*a^(6) - (16600173)/(687259)*a^(5) + (12819761)/(687259)*a^(4) + (3656919)/(687259)*a^(3) - (11892175)/(687259)*a^(2) + (4277627)/(687259)*a - (173402)/(687259) , (424221)/(687259)*a^(17) - (815766)/(687259)*a^(16) + (97006)/(40427)*a^(15) - (1495086)/(687259)*a^(14) + (562592)/(687259)*a^(13) + (593840)/(687259)*a^(12) - (493030)/(687259)*a^(11) - (1729163)/(687259)*a^(10) + (3611537)/(687259)*a^(9) - (4428972)/(687259)*a^(8) + (3959284)/(687259)*a^(7) - (634)/(687259)*a^(6) - (3078863)/(687259)*a^(5) + (2782382)/(687259)*a^(4) - (1465616)/(687259)*a^(3) - (1343463)/(687259)*a^(2) + (1951850)/(687259)*a - (1179948)/(687259) , (159676)/(687259)*a^(17) - (1104574)/(687259)*a^(16) + (127804)/(40427)*a^(15) - (3457034)/(687259)*a^(14) + (2174327)/(687259)*a^(13) + (86004)/(687259)*a^(12) - (2689571)/(687259)*a^(11) - (116380)/(687259)*a^(10) + (5318848)/(687259)*a^(9) - (9192462)/(687259)*a^(8) + (7789047)/(687259)*a^(7) - (4577933)/(687259)*a^(6) - (2975618)/(687259)*a^(5) + (8468892)/(687259)*a^(4) - (6379519)/(687259)*a^(3) - (2817426)/(687259)*a^(2) + (5772466)/(687259)*a - (2437593)/(687259) ], 86.4501902329, [[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 + 4*x^7 - 5*x^6 + 6*x^5 - 6*x^4 + 5*x^3 - 4*x^2 + 3*x - 1, 1]]]