/* 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^19 - 2*x^18 + 2*x^17 - 2*x^16 - 3*x^15 + 14*x^14 - 7*x^13 - 22*x^12 + 30*x^11 - 9*x^10 + 5*x^9 - 2*x^8 - 51*x^7 + 90*x^6 - 19*x^5 - 91*x^4 + 113*x^3 - 59*x^2 + 14*x - 1, 19, 2, [1, 9], -99048986760825351881639, [359], [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, 1/7*a^15 + 1/7*a^14 - 2/7*a^13 - 3/7*a^12 - 2/7*a^11 + 3/7*a^10 - 2/7*a^9 + 3/7*a^8 + 2/7*a^7 + 2/7*a^6 + 2/7*a^5 + 1/7*a^4 - 2/7*a^2 - 3/7*a + 3/7, 1/91*a^16 - 2/91*a^15 - 2/7*a^14 + 38/91*a^13 + 6/13*a^12 + 16/91*a^11 + 3/91*a^10 + 2/91*a^9 + 4/13*a^8 + 17/91*a^7 - 18/91*a^6 + 23/91*a^5 + 25/91*a^4 + 33/91*a^3 + 31/91*a^2 - 37/91*a - 9/91, 1/91*a^17 - 4/91*a^15 + 12/91*a^14 - 25/91*a^13 + 22/91*a^12 - 17/91*a^11 - 5/91*a^10 - 20/91*a^9 - 31/91*a^8 - 23/91*a^7 + 3/7*a^6 + 32/91*a^5 + 18/91*a^4 + 6/91*a^3 - 27/91*a^2 + 3/13*a - 31/91, 1/189007*a^18 + 108/27001*a^17 - 202/189007*a^16 - 9805/189007*a^15 + 28391/189007*a^14 - 74177/189007*a^13 + 83374/189007*a^12 - 16025/189007*a^11 - 4202/14539*a^10 - 1701/27001*a^9 - 4226/14539*a^8 + 94309/189007*a^7 - 78941/189007*a^6 + 401/2077*a^5 + 83830/189007*a^4 + 78237/189007*a^3 - 77671/189007*a^2 + 35274/189007*a + 27486/189007], 0, 1, [], 0, [ (2907)/(2077)*a^(18) - (272291)/(189007)*a^(17) + (181281)/(189007)*a^(16) - (262386)/(189007)*a^(15) - (157769)/(27001)*a^(14) + (2721171)/(189007)*a^(13) + (1136732)/(189007)*a^(12) - (5591938)/(189007)*a^(11) + (2160644)/(189007)*a^(10) + (1538116)/(189007)*a^(9) + (2092385)/(189007)*a^(8) + (1038536)/(189007)*a^(7) - (1881606)/(27001)*a^(6) + (10666164)/(189007)*a^(5) + (739366)/(14539)*a^(4) - (18172608)/(189007)*a^(3) + (9161671)/(189007)*a^(2) - (894716)/(189007)*a - (243008)/(189007) , (323794)/(189007)*a^(18) - (472204)/(189007)*a^(17) + (351432)/(189007)*a^(16) - (33372)/(14539)*a^(15) - (1210669)/(189007)*a^(14) + (3918363)/(189007)*a^(13) + (68836)/(189007)*a^(12) - (1060466)/(27001)*a^(11) + (5322301)/(189007)*a^(10) + (664116)/(189007)*a^(9) + (2031808)/(189007)*a^(8) + (241793)/(189007)*a^(7) - (16756043)/(189007)*a^(6) + (19546519)/(189007)*a^(5) + (6368665)/(189007)*a^(4) - (26711639)/(189007)*a^(3) + (1554439)/(14539)*a^(2) - (883712)/(27001)*a + (608758)/(189007) , (237743)/(189007)*a^(18) - (327653)/(189007)*a^(17) + (216316)/(189007)*a^(16) - (302255)/(189007)*a^(15) - (71447)/(14539)*a^(14) + (2819412)/(189007)*a^(13) + (50915)/(27001)*a^(12) - (5455062)/(189007)*a^(11) + (482185)/(27001)*a^(10) + (899050)/(189007)*a^(9) + (1626546)/(189007)*a^(8) + (386598)/(189007)*a^(7) - (12399626)/(189007)*a^(6) + (1018077)/(14539)*a^(5) + (889389)/(27001)*a^(4) - (2720905)/(27001)*a^(3) + (1855084)/(27001)*a^(2) - (3288434)/(189007)*a + (63010)/(189007) , (35416)/(189007)*a^(18) + (21941)/(27001)*a^(17) - (86001)/(189007)*a^(16) + (37136)/(189007)*a^(15) - (320672)/(189007)*a^(14) - (522049)/(189007)*a^(13) + (1699289)/(189007)*a^(12) + (802649)/(189007)*a^(11) - (2984953)/(189007)*a^(10) + (23616)/(27001)*a^(9) + (1254052)/(189007)*a^(8) + (2165231)/(189007)*a^(7) - (4597)/(14539)*a^(6) - (7296724)/(189007)*a^(5) + (371086)/(14539)*a^(4) + (6043042)/(189007)*a^(3) - (7662773)/(189007)*a^(2) + (2388959)/(189007)*a + (103820)/(189007) , (137548)/(189007)*a^(18) - (189801)/(189007)*a^(17) + (123953)/(189007)*a^(16) - (182506)/(189007)*a^(15) - (536150)/(189007)*a^(14) + (1621089)/(189007)*a^(13) + (191006)/(189007)*a^(12) - (453202)/(27001)*a^(11) + (20245)/(2077)*a^(10) + (443483)/(189007)*a^(9) + (1086265)/(189007)*a^(8) + (14437)/(14539)*a^(7) - (1052554)/(27001)*a^(6) + (7521224)/(189007)*a^(5) + (275166)/(14539)*a^(4) - (10789154)/(189007)*a^(3) + (7293540)/(189007)*a^(2) - (2307241)/(189007)*a + (304936)/(189007) , (120097)/(189007)*a^(18) - (17005)/(27001)*a^(17) + (138925)/(189007)*a^(16) - (9593)/(14539)*a^(15) - (498371)/(189007)*a^(14) + (1149188)/(189007)*a^(13) + (236296)/(189007)*a^(12) - (2168382)/(189007)*a^(11) + (1603153)/(189007)*a^(10) - (15788)/(189007)*a^(9) + (459619)/(189007)*a^(8) + (535980)/(189007)*a^(7) - (5118424)/(189007)*a^(6) + (5709685)/(189007)*a^(5) + (2147109)/(189007)*a^(4) - (8411003)/(189007)*a^(3) + (927243)/(27001)*a^(2) - (241164)/(27001)*a + (45351)/(189007) , (48736)/(189007)*a^(18) - (138646)/(189007)*a^(17) + (27309)/(189007)*a^(16) - (113248)/(189007)*a^(15) - (13291)/(14539)*a^(14) + (929342)/(189007)*a^(13) - (30088)/(27001)*a^(12) - (1863929)/(189007)*a^(11) + (185174)/(27001)*a^(10) + (521036)/(189007)*a^(9) + (303497)/(189007)*a^(8) - (558437)/(189007)*a^(7) - (3705304)/(189007)*a^(6) + (378361)/(14539)*a^(5) + (214364)/(27001)*a^(4) - (938839)/(27001)*a^(3) + (586037)/(27001)*a^(2) - (831343)/(189007)*a - (125997)/(189007) , (244367)/(189007)*a^(18) - (219552)/(189007)*a^(17) + (153546)/(189007)*a^(16) - (248783)/(189007)*a^(15) - (154048)/(27001)*a^(14) + (2330451)/(189007)*a^(13) + (1279900)/(189007)*a^(12) - (4774167)/(189007)*a^(11) + (1591006)/(189007)*a^(10) + (161672)/(27001)*a^(9) + (1873490)/(189007)*a^(8) + (1434855)/(189007)*a^(7) - (11570567)/(189007)*a^(6) + (8500796)/(189007)*a^(5) + (8817635)/(189007)*a^(4) - (15447661)/(189007)*a^(3) + (7802362)/(189007)*a^(2) - (633244)/(189007)*a - (444257)/(189007) , (304936)/(189007)*a^(18) - (472324)/(189007)*a^(17) + (420071)/(189007)*a^(16) - (69417)/(27001)*a^(15) - (1097314)/(189007)*a^(14) + (3732954)/(189007)*a^(13) - (513463)/(189007)*a^(12) - (6517586)/(189007)*a^(11) + (5975666)/(189007)*a^(10) - (902129)/(189007)*a^(9) + (1968163)/(189007)*a^(8) + (476393)/(189007)*a^(7) - (2194865)/(27001)*a^(6) + (20076362)/(189007)*a^(5) + (132880)/(14539)*a^(4) - (1859386)/(14539)*a^(3) + (23668614)/(189007)*a^(2) - (10697684)/(189007)*a + (1961863)/(189007) ], 4771.45184867, []]