/* 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^20 - 6*x^19 + 24*x^18 - 72*x^17 + 177*x^16 - 363*x^15 + 637*x^14 - 973*x^13 + 1307*x^12 - 1556*x^11 + 1649*x^10 - 1556*x^9 + 1307*x^8 - 973*x^7 + 637*x^6 - 363*x^5 + 177*x^4 - 72*x^3 + 24*x^2 - 6*x + 1, 20, 86, [0, 10], 2941196258837390453449, [11, 23], [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, a^17, a^18, 1/109*a^19 - 7/109*a^18 + 31/109*a^17 + 6/109*a^16 - 47/109*a^15 + 11/109*a^14 - 28/109*a^13 + 36/109*a^12 - 37/109*a^11 + 7/109*a^10 + 7/109*a^9 - 37/109*a^8 + 36/109*a^7 - 28/109*a^6 + 11/109*a^5 - 47/109*a^4 + 6/109*a^3 + 31/109*a^2 - 7/109*a + 1/109], 0, 1, [], 0, [ (285)/(109)*a^(19) - (1341)/(109)*a^(18) + (4693)/(109)*a^(17) - (12024)/(109)*a^(16) + (25191)/(109)*a^(15) - (41882)/(109)*a^(14) + (56548)/(109)*a^(13) - (60481)/(109)*a^(12) + (46135)/(109)*a^(11) - (14028)/(109)*a^(10) - (26999)/(109)*a^(9) + (64120)/(109)*a^(8) - (84025)/(109)*a^(7) + (83580)/(109)*a^(6) - (67061)/(109)*a^(5) + (43830)/(109)*a^(4) - (23469)/(109)*a^(3) + (10034)/(109)*a^(2) - (3085)/(109)*a + (721)/(109) , (105)/(109)*a^(19) - (626)/(109)*a^(18) + (2492)/(109)*a^(17) - (7654)/(109)*a^(16) + (19263)/(109)*a^(15) - (40919)/(109)*a^(14) + (74777)/(109)*a^(13) - (120044)/(109)*a^(12) + (169425)/(109)*a^(11) - (211488)/(109)*a^(10) + (233668)/(109)*a^(9) - (227771)/(109)*a^(8) + (195293)/(109)*a^(7) - (146275)/(109)*a^(6) + (94132)/(109)*a^(5) - (51369)/(109)*a^(4) + (22975)/(109)*a^(3) - (8081)/(109)*a^(2) + (2317)/(109)*a - (440)/(109) , (114)/(109)*a^(19) - (798)/(109)*a^(18) + (3207)/(109)*a^(17) - (9671)/(109)*a^(16) + (23309)/(109)*a^(15) - (46597)/(109)*a^(14) + (77904)/(109)*a^(13) - (111545)/(109)*a^(12) + (137918)/(109)*a^(11) - (148532)/(109)*a^(10) + (139337)/(109)*a^(9) - (113436)/(109)*a^(8) + (79314)/(109)*a^(7) - (47010)/(109)*a^(6) + (22727)/(109)*a^(5) - (8410)/(109)*a^(4) + (1992)/(109)*a^(3) - (63)/(109)*a^(2) - (144)/(109)*a + (5)/(109) , (15)/(109)*a^(19) + (4)/(109)*a^(18) - (407)/(109)*a^(17) + (2161)/(109)*a^(16) - (7572)/(109)*a^(15) + (20112)/(109)*a^(14) - (43475)/(109)*a^(13) + (77385)/(109)*a^(12) - (116967)/(109)*a^(11) + (152051)/(109)*a^(10) - (171679)/(109)*a^(9) + (169158)/(109)*a^(8) - (145411)/(109)*a^(7) + (108471)/(109)*a^(6) - (69813)/(109)*a^(5) + (38099)/(109)*a^(4) - (17241)/(109)*a^(3) + (6133)/(109)*a^(2) - (1631)/(109)*a + (233)/(109) , (23)/(109)*a^(19) - (379)/(109)*a^(18) + (2021)/(109)*a^(17) - (7274)/(109)*a^(16) + (19956)/(109)*a^(15) - (44655)/(109)*a^(14) + (82414)/(109)*a^(13) - (127465)/(109)*a^(12) + (167118)/(109)*a^(11) - (187864)/(109)*a^(10) + (181101)/(109)*a^(9) - (149636)/(109)*a^(8) + (104705)/(109)*a^(7) - (60812)/(109)*a^(6) + (28484)/(109)*a^(5) - (10346)/(109)*a^(4) + (2645)/(109)*a^(3) - (595)/(109)*a^(2) + (57)/(109)*a + (23)/(109) , (20)/(109)*a^(19) - (249)/(109)*a^(18) + (1056)/(109)*a^(17) - (3477)/(109)*a^(16) + (8870)/(109)*a^(15) - (18964)/(109)*a^(14) + (33775)/(109)*a^(13) - (52036)/(109)*a^(12) + (70110)/(109)*a^(11) - (82809)/(109)*a^(10) + (86359)/(109)*a^(9) - (79329)/(109)*a^(8) + (63613)/(109)*a^(7) - (44814)/(109)*a^(6) + (27034)/(109)*a^(5) - (13802)/(109)*a^(4) + (6006)/(109)*a^(3) - (2214)/(109)*a^(2) + (732)/(109)*a - (198)/(109) , (288)/(109)*a^(19) - (1253)/(109)*a^(18) + (4241)/(109)*a^(17) - (10589)/(109)*a^(16) + (22216)/(109)*a^(15) - (37816)/(109)*a^(14) + (55592)/(109)*a^(13) - (72581)/(109)*a^(12) + (85373)/(109)*a^(11) - (92051)/(109)*a^(10) + (90960)/(109)*a^(9) - (81615)/(109)*a^(8) + (66721)/(109)*a^(7) - (48285)/(109)*a^(6) + (30200)/(109)*a^(5) - (15825)/(109)*a^(4) + (6633)/(109)*a^(3) - (2081)/(109)*a^(2) + (600)/(109)*a - (39)/(109) , (134)/(109)*a^(19) - (720)/(109)*a^(18) + (2955)/(109)*a^(17) - (8897)/(109)*a^(16) + (22260)/(109)*a^(15) - (46159)/(109)*a^(14) + (82358)/(109)*a^(13) - (126739)/(109)*a^(12) + (169769)/(109)*a^(11) - (199077)/(109)*a^(10) + (204986)/(109)*a^(9) - (184590)/(109)*a^(8) + (145325)/(109)*a^(7) - (98473)/(109)*a^(6) + (56737)/(109)*a^(5) - (27008)/(109)*a^(4) + (10069)/(109)*a^(3) - (2604)/(109)*a^(2) + (370)/(109)*a + (134)/(109) , (28)/(109)*a^(19) + (131)/(109)*a^(18) - (767)/(109)*a^(17) + (3111)/(109)*a^(16) - (8619)/(109)*a^(15) + (19710)/(109)*a^(14) - (36100)/(109)*a^(13) + (56053)/(109)*a^(12) - (75810)/(109)*a^(11) + (90339)/(109)*a^(10) - (96814)/(109)*a^(9) + (93576)/(109)*a^(8) - (81505)/(109)*a^(7) + (64398)/(109)*a^(6) - (45472)/(109)*a^(5) + (28223)/(109)*a^(4) - (14983)/(109)*a^(3) + (6427)/(109)*a^(2) - (2049)/(109)*a + (573)/(109) ], 2189.13991382, [[x^2 - x + 3, 1], [x^5 - x^4 - 4*x^3 + 3*x^2 + 3*x - 1, 1], [x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1, 1], [x^10 - 4*x^9 + 5*x^8 + 2*x^7 - 8*x^6 - x^5 + 4*x^4 + 6*x^3 - 2*x^2 - 3*x + 1, 1], [x^10 - 3*x^9 + 2*x^8 + 3*x^7 - 9*x^6 + 11*x^5 - 9*x^4 + 3*x^3 + 2*x^2 - 3*x + 1, 1]]]