/* 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^16 - 30*x^14 + 73*x^12 + 330*x^10 - 630*x^8 - 1427*x^6 + 1839*x^4 + 2205*x^2 - 1297, 18, 840, [10, 4], 161536237646646866899894272, [2, 3, 1297], [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, 1/7*a^14 + 1/7*a^10 - 1/7*a^8 + 1/7*a^6 - 3/7*a^2 + 3/7, 1/7*a^15 + 1/7*a^11 - 1/7*a^9 + 1/7*a^7 - 3/7*a^3 + 3/7*a, 1/10010949557*a^16 - 694662428/10010949557*a^14 - 2613837743/10010949557*a^12 + 423432675/10010949557*a^10 + 2193740940/10010949557*a^8 - 2979577753/10010949557*a^6 - 3883837947/10010949557*a^4 - 4932318352/10010949557*a^2 - 1924317228/10010949557, 1/10010949557*a^17 - 694662428/10010949557*a^15 - 2613837743/10010949557*a^13 + 423432675/10010949557*a^11 + 2193740940/10010949557*a^9 - 2979577753/10010949557*a^7 - 3883837947/10010949557*a^5 - 4932318352/10010949557*a^3 - 1924317228/10010949557*a], 0, 1, [], 1, [ (18727222)/(10010949557)*a^(16) - (127373408)/(10010949557)*a^(14) - (315149580)/(10010949557)*a^(12) + (3088745271)/(10010949557)*a^(10) + (516676213)/(10010949557)*a^(8) - (24660828305)/(10010949557)*a^(6) + (17422136338)/(10010949557)*a^(4) + (52516172357)/(10010949557)*a^(2) - (44374583907)/(10010949557) , (159487399)/(10010949557)*a^(16) - (758426464)/(10010949557)*a^(14) - (3535527603)/(10010949557)*a^(12) + (17857807619)/(10010949557)*a^(10) + (23355988375)/(10010949557)*a^(8) - (140958246203)/(10010949557)*a^(6) + (6848434751)/(10010949557)*a^(4) + (284898109661)/(10010949557)*a^(2) - (133434567596)/(10010949557) , (119375664)/(10010949557)*a^(16) - (704667981)/(10010949557)*a^(14) - (2340285071)/(10010949557)*a^(12) + (17100206573)/(10010949557)*a^(10) + (11645518274)/(10010949557)*a^(8) - (137913559864)/(10010949557)*a^(6) + (41585528111)/(10010949557)*a^(4) + (283975909463)/(10010949557)*a^(2) - (141125564316)/(10010949557) , (105072350)/(10010949557)*a^(16) - (568477914)/(10010949557)*a^(14) - (2189442474)/(10010949557)*a^(12) + (13780784127)/(10010949557)*a^(10) + (12975006977)/(10010949557)*a^(8) - (112442810960)/(10010949557)*a^(6) + (15057936655)/(10010949557)*a^(4) + (240503445776)/(10010949557)*a^(2) - (83665274390)/(10010949557) , (161651101)/(10010949557)*a^(16) - (706862591)/(10010949557)*a^(14) - (3666899723)/(10010949557)*a^(12) + (16471877292)/(10010949557)*a^(10) + (24811578369)/(10010949557)*a^(8) - (129348390144)/(10010949557)*a^(6) + (268618796)/(10010949557)*a^(4) + (254727603562)/(10010949557)*a^(2) - (122718631178)/(10010949557) , (4990644)/(1430135651)*a^(16) - (3309953)/(1430135651)*a^(14) - (152083266)/(1430135651)*a^(12) - (755059)/(1430135651)*a^(10) + (1523442253)/(1430135651)*a^(8) + (523940106)/(1430135651)*a^(6) - (5258410265)/(1430135651)*a^(4) - (3283810868)/(1430135651)*a^(2) + (4834188119)/(1430135651) , (125963274)/(10010949557)*a^(16) - (644287449)/(10010949557)*a^(14) - (2635964174)/(10010949557)*a^(12) + (15483599071)/(10010949557)*a^(10) + (14947273184)/(10010949557)*a^(8) - (125493783206)/(10010949557)*a^(6) + (25900257038)/(10010949557)*a^(4) + (262849112034)/(10010949557)*a^(2) - a - (117323921879)/(10010949557) , (127866997)/(10010949557)*a^(17) + (61377683)/(10010949557)*a^(16) - (479362844)/(10010949557)*a^(15) - (271644479)/(10010949557)*a^(14) - (3100678057)/(10010949557)*a^(13) - (1368772738)/(10010949557)*a^(12) + (10895583691)/(10010949557)*a^(11) + (6194052056)/(10010949557)*a^(10) + (23634234765)/(10010949557)*a^(9) + (9339475051)/(10010949557)*a^(8) - (83461252835)/(10010949557)*a^(7) - (47117145545)/(10010949557)*a^(6) - (28811952166)/(10010949557)*a^(5) - (3220263433)/(10010949557)*a^(4) + (159266037514)/(10010949557)*a^(3) + (88747469354)/(10010949557)*a^(2) - (51666831425)/(10010949557)*a - (41801998339)/(10010949557) , (584944930)/(10010949557)*a^(17) - (47714396)/(1430135651)*a^(16) - (2752787962)/(10010949557)*a^(15) + (231026158)/(1430135651)*a^(14) - (12961044716)/(10010949557)*a^(13) + (1026870234)/(1430135651)*a^(12) + (64974713023)/(10010949557)*a^(11) - (5416769567)/(1430135651)*a^(10) + (85298352682)/(10010949557)*a^(9) - (6361249840)/(1430135651)*a^(8) - (516185505830)/(10010949557)*a^(7) + (42602616461)/(1430135651)*a^(6) + (17846191340)/(10010949557)*a^(5) - (5104768796)/(1430135651)*a^(4) + (1050162101056)/(10010949557)*a^(3) - (83642095659)/(1430135651)*a^(2) - (434019014628)/(10010949557)*a + (36169589082)/(1430135651) , (92932489)/(10010949557)*a^(16) - (456193173)/(10010949557)*a^(14) - (2036095195)/(10010949557)*a^(12) + (10900869104)/(10010949557)*a^(10) + (12970138994)/(10010949557)*a^(8) - (87128833577)/(10010949557)*a^(6) + (7996919689)/(10010949557)*a^(4) + (182252713590)/(10010949557)*a^(2) + a - (75495198701)/(10010949557) , (127866997)/(10010949557)*a^(17) - (110971988)/(10010949557)*a^(16) - (479362844)/(10010949557)*a^(15) + (638676036)/(10010949557)*a^(14) - (3100678057)/(10010949557)*a^(13) + (2152419177)/(10010949557)*a^(12) + (10895583691)/(10010949557)*a^(11) - (15251457621)/(10010949557)*a^(10) + (23634234765)/(10010949557)*a^(9) - (10377695460)/(10010949557)*a^(8) - (83461252835)/(10010949557)*a^(7) + (121752779538)/(10010949557)*a^(6) - (28811952166)/(10010949557)*a^(5) - (38685026209)/(10010949557)*a^(4) + (159266037514)/(10010949557)*a^(3) - (252030546254)/(10010949557)*a^(2) - (51666831425)/(10010949557)*a + (118699342728)/(10010949557) , (158734080)/(10010949557)*a^(17) - (226351737)/(10010949557)*a^(16) - (719020993)/(10010949557)*a^(15) + (1108221290)/(10010949557)*a^(14) - (3569174916)/(10010949557)*a^(13) + (4994441428)/(10010949557)*a^(12) + (16864243985)/(10010949557)*a^(11) - (26292975320)/(10010949557)*a^(10) + (24155778961)/(10010949557)*a^(9) - (33307486832)/(10010949557)*a^(8) - (133436058523)/(10010949557)*a^(7) + (208323840453)/(10010949557)*a^(6) - (4328798862)/(10010949557)*a^(5) - (1931255562)/(10010949557)*a^(4) + (270032942057)/(10010949557)*a^(3) - (420896280719)/(10010949557)*a^(2) - (84189591907)/(10010949557)*a + (159133748252)/(10010949557) , (119375664)/(10010949557)*a^(17) + (30510600)/(10010949557)*a^(16) - (704667981)/(10010949557)*a^(15) - (31986330)/(10010949557)*a^(14) - (2340285071)/(10010949557)*a^(13) - (900275879)/(10010949557)*a^(12) + (17100206573)/(10010949557)*a^(11) + (225391762)/(10010949557)*a^(10) + (11645518274)/(10010949557)*a^(9) + (8817930855)/(10010949557)*a^(8) - (137913559864)/(10010949557)*a^(7) + (2857660143)/(10010949557)*a^(6) + (41585528111)/(10010949557)*a^(5) - (27703416737)/(10010949557)*a^(4) + (283975909463)/(10010949557)*a^(3) - (22019435189)/(10010949557)*a^(2) - (141125564316)/(10010949557)*a + (20753610814)/(10010949557) ], 2924853.36917, [[x^3 - 3*x - 1, 1], [x^9 - 3*x^8 + 9*x^6 - 9*x^5 - 6*x^4 + 11*x^3 - 3*x + 1, 1]]]