/* 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 - 2*x^16 + 57*x^14 - 240*x^12 + 1054*x^10 - 2522*x^8 + 2724*x^6 + 915*x^4 - 2225*x^2 + 679, 18, 5, [0, 9], -30678065370140273522687719, [7, 97], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, 1/3*a^8 - 1/3, 1/6*a^9 - 1/2*a^7 - 1/2*a^2 - 1/6*a - 1/2, 1/6*a^10 - 1/6*a^8 - 1/2*a^3 - 1/6*a^2 - 1/2*a - 1/3, 1/6*a^11 - 1/2*a^7 - 1/2*a^4 - 1/6*a^3 - 1/2*a - 1/2, 1/42*a^12 - 1/14*a^10 + 1/21*a^8 + 1/7*a^6 - 1/2*a^5 + 17/42*a^4 - 1/2*a^3 + 2/7*a^2 - 1/3, 1/42*a^13 - 1/14*a^11 + 1/21*a^9 + 1/7*a^7 - 1/2*a^6 + 17/42*a^5 - 1/2*a^4 + 2/7*a^3 - 1/3*a, 1/42*a^14 + 5/42*a^8 - 1/2*a^7 - 1/6*a^6 - 1/2*a^4 + 5/14*a^2 - 1/2*a - 1/3, 1/42*a^15 - 1/21*a^9 - 1/6*a^8 + 1/3*a^7 - 1/2*a^5 + 5/14*a^3 - 1/6*a + 1/6, 1/383927173182*a^16 - 349793596/63987862197*a^14 - 744788801/127975724394*a^12 + 1354111921/18282246342*a^10 + 11149632248/191963586591*a^8 - 1/2*a^7 + 21715821485/127975724394*a^6 - 1/2*a^5 + 16166130688/63987862197*a^4 - 1/2*a^3 - 14825407055/63987862197*a^2 - 20997357983/54846739026, 1/383927173182*a^17 - 349793596/63987862197*a^15 - 744788801/127975724394*a^13 + 1354111921/18282246342*a^11 + 11149632248/191963586591*a^9 - 1/6*a^8 + 21715821485/127975724394*a^7 - 1/2*a^6 + 16166130688/63987862197*a^5 - 1/2*a^4 - 14825407055/63987862197*a^3 - 20997357983/54846739026*a - 1/3], 0, 2, [2], 0, [ (367530133)/(127975724394)*a^(17) + (9702235)/(4128249174)*a^(16) - (94895275)/(21329287399)*a^(15) - (14626825)/(4128249174)*a^(14) + (1476505786)/(9141123171)*a^(13) + (90475968)/(688041529)*a^(12) - (78564960925)/(127975724394)*a^(11) - (2068821421)/(4128249174)*a^(10) + (350596777967)/(127975724394)*a^(9) + (3016315795)/(1376083058)*a^(8) - (35609153837)/(6094082114)*a^(7) - (10015790833)/(2064124587)*a^(6) + (596753825491)/(127975724394)*a^(5) + (5283730393)/(1376083058)*a^(4) + (445003182662)/(63987862197)*a^(3) + (14132477101)/(4128249174)*a^(2) - (42808810027)/(6094082114)*a - (303815575)/(589749882) , (3421075925)/(383927173182)*a^(17) + (2036023133)/(383927173182)*a^(16) - (820119782)/(63987862197)*a^(15) - (489944149)/(63987862197)*a^(14) + (32044024178)/(63987862197)*a^(13) + (37963838993)/(127975724394)*a^(12) - (237314101225)/(127975724394)*a^(11) - (10149404762)/(9141123171)*a^(10) + (1602858717484)/(191963586591)*a^(9) + (134715067252)/(27423369513)*a^(8) - (2261005953503)/(127975724394)*a^(7) - (1351048871035)/(127975724394)*a^(6) + (125826836536)/(9141123171)*a^(5) + (1114413982543)/(127975724394)*a^(4) + (2156742010909)/(127975724394)*a^(3) + (1133831487919)/(127975724394)*a^(2) - (581509465615)/(54846739026)*a - (172216533158)/(27423369513) , (105521972)/(27423369513)*a^(17) - (80225701)/(27423369513)*a^(16) - (91524985)/(18282246342)*a^(15) + (543586451)/(127975724394)*a^(14) + (3953253983)/(18282246342)*a^(13) - (7034589797)/(42658574798)*a^(12) - (14150177855)/(18282246342)*a^(11) + (26118961699)/(42658574798)*a^(10) + (96998925257)/(27423369513)*a^(9) - (76080440533)/(27423369513)*a^(8) - (134810917853)/(18282246342)*a^(7) + (380650346390)/(63987862197)*a^(6) + (106503219199)/(18282246342)*a^(5) - (219732815433)/(42658574798)*a^(4) + (55660247434)/(9141123171)*a^(3) - (202114101745)/(42658574798)*a^(2) - (82988061439)/(27423369513)*a + (137821163539)/(54846739026) , (4116525256)/(191963586591)*a^(17) - (738947471)/(54846739026)*a^(16) - (276485488)/(9141123171)*a^(15) + (393413108)/(21329287399)*a^(14) + (25681306484)/(21329287399)*a^(13) - (16117877977)/(21329287399)*a^(12) - (81089753755)/(18282246342)*a^(11) + (58747973341)/(21329287399)*a^(10) + (3831766942966)/(191963586591)*a^(9) - (2384940653299)/(191963586591)*a^(8) - (2699094152072)/(63987862197)*a^(7) + (1106508578913)/(42658574798)*a^(6) + (703255839851)/(21329287399)*a^(5) - (414374677137)/(21329287399)*a^(4) + (5176583812591)/(127975724394)*a^(3) - (81631262042)/(3047041057)*a^(2) - (1418848383691)/(54846739026)*a + (456062652110)/(27423369513) , (1185326012)/(191963586591)*a^(17) + (273389475)/(42658574798)*a^(16) - (62095946)/(9141123171)*a^(15) - (276048261)/(21329287399)*a^(14) + (14862912091)/(42658574798)*a^(13) + (46048103501)/(127975724394)*a^(12) - (149824645385)/(127975724394)*a^(11) - (98664611042)/(63987862197)*a^(10) + (2146643735827)/(383927173182)*a^(9) + (276268931147)/(42658574798)*a^(8) - (704679644965)/(63987862197)*a^(7) - (327283800101)/(21329287399)*a^(6) + (26472131064)/(3047041057)*a^(5) + (1774184760469)/(127975724394)*a^(4) + (610661866048)/(63987862197)*a^(3) + (858130992854)/(63987862197)*a^(2) - (199530987586)/(27423369513)*a - (29982021207)/(3047041057) , (76250849)/(21329287399)*a^(17) + (274513025)/(54846739026)*a^(16) - (608694095)/(127975724394)*a^(15) - (932164523)/(127975724394)*a^(14) + (25681569751)/(127975724394)*a^(13) + (5998965121)/(21329287399)*a^(12) - (46290819541)/(63987862197)*a^(11) - (134037646429)/(127975724394)*a^(10) + (10012869806)/(3047041057)*a^(9) + (1805935776035)/(383927173182)*a^(8) - (872770926823)/(127975724394)*a^(7) - (1282801727359)/(127975724394)*a^(6) + (325172106160)/(63987862197)*a^(5) + (175408271128)/(21329287399)*a^(4) + (894171281117)/(127975724394)*a^(3) + (556074193889)/(63987862197)*a^(2) - (11587380046)/(3047041057)*a - (327024509737)/(54846739026) , (143310170)/(27423369513)*a^(16) - (453986606)/(63987862197)*a^(14) + (18778103221)/(63987862197)*a^(12) - (68347518955)/(63987862197)*a^(10) + (926198285216)/(191963586591)*a^(8) - (653296699681)/(63987862197)*a^(6) + (508287821372)/(63987862197)*a^(4) + (636027253069)/(63987862197)*a^(2) - (173455174030)/(27423369513) , (360079345)/(191963586591)*a^(16) + (34420670)/(63987862197)*a^(14) + (6288139589)/(63987862197)*a^(12) - (1851806473)/(9141123171)*a^(10) + (25729787317)/(27423369513)*a^(8) - (1999302092)/(63987862197)*a^(6) - (415517045378)/(63987862197)*a^(4) + (1047773434585)/(63987862197)*a^(2) - (203344040150)/(27423369513) ], 482397.970896, [[x^2 - x + 170, 1], [x^3 + x - 5, 3], [x^6 + 6*x^4 + 9*x^2 + 679, 1], [x^9 + 2*x^7 - 7*x^6 + 3*x^5 - 7*x^4 + 16*x^3 + 7*x^2 - 13*x + 7, 9]]]