/* 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 + x^18 - 20*x^16 - 35*x^14 + 67*x^12 + 195*x^10 + 131*x^8 + x^6 - 21*x^4 - 2*x^2 + 1, 20, 1030, [8, 6], 982692381976802928640000000000, [2, 5, 11, 28162171], [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, 1/5231*a^18 + 617/5231*a^16 - 1811/5231*a^14 - 1408/5231*a^12 + 1085/5231*a^10 - 1013/5231*a^8 - 1388/5231*a^6 - 2354/5231*a^4 - 1098/5231*a^2 - 1571/5231, 1/5231*a^19 + 617/5231*a^17 - 1811/5231*a^15 - 1408/5231*a^13 + 1085/5231*a^11 - 1013/5231*a^9 - 1388/5231*a^7 - 2354/5231*a^5 - 1098/5231*a^3 - 1571/5231*a], 0, 1, [], 1, [ (8308)/(5231)*a^(18) + (4887)/(5231)*a^(16) - (168824)/(5231)*a^(14) - (220850)/(5231)*a^(12) + (660273)/(5231)*a^(10) + (1350273)/(5231)*a^(8) + (478872)/(5231)*a^(6) - (233718)/(5231)*a^(4) - (67323)/(5231)*a^(2) + (25632)/(5231) , a^(19) + a^(17) - 20*a^(15) - 35*a^(13) + 67*a^(11) + 195*a^(9) + 131*a^(7) + a^(5) - 21*a^(3) - 2*a , (616)/(5231)*a^(19) - (7022)/(5231)*a^(17) - (17066)/(5231)*a^(15) + (131793)/(5231)*a^(13) + (249880)/(5231)*a^(11) - (446154)/(5231)*a^(9) - (1163637)/(5231)*a^(7) - (623566)/(5231)*a^(5) + (29817)/(5231)*a^(3) + (62771)/(5231)*a , (6862)/(5231)*a^(18) + (1975)/(5231)*a^(16) - (139463)/(5231)*a^(14) - (141276)/(5231)*a^(12) + (576967)/(5231)*a^(10) + (947604)/(5231)*a^(8) + (158125)/(5231)*a^(6) - (229984)/(5231)*a^(4) - (17529)/(5231)*a^(2) + (16582)/(5231) , (7658)/(5231)*a^(18) + (6624)/(5231)*a^(16) - (152956)/(5231)*a^(14) - (247230)/(5231)*a^(12) + (525202)/(5231)*a^(10) + (1401927)/(5231)*a^(8) + (889358)/(5231)*a^(6) + (30480)/(5231)*a^(4) - (80732)/(5231)*a^(2) - (4649)/(5231) , (7658)/(5231)*a^(18) + (6624)/(5231)*a^(16) - (152956)/(5231)*a^(14) - (247230)/(5231)*a^(12) + (525202)/(5231)*a^(10) + (1401927)/(5231)*a^(8) + (889358)/(5231)*a^(6) + (30480)/(5231)*a^(4) - (80732)/(5231)*a^(2) + (582)/(5231) , (12093)/(5231)*a^(19) + (7206)/(5231)*a^(17) - (244083)/(5231)*a^(15) - (324361)/(5231)*a^(13) + (927444)/(5231)*a^(11) + (1967649)/(5231)*a^(9) + (843386)/(5231)*a^(7) - (224753)/(5231)*a^(5) - (127380)/(5231)*a^(3) + (6120)/(5231)*a , (3819)/(5231)*a^(18) + (2373)/(5231)*a^(16) - (79292)/(5231)*a^(14) - (104304)/(5231)*a^(12) + (335447)/(5231)*a^(10) + (661399)/(5231)*a^(8) + (97620)/(5231)*a^(6) - (316928)/(5231)*a^(4) - (76465)/(5231)*a^(2) + (36925)/(5231) , (10463)/(5231)*a^(18) + (11079)/(5231)*a^(16) - (211051)/(5231)*a^(14) - (378040)/(5231)*a^(12) + (728194)/(5231)*a^(10) + (2107080)/(5231)*a^(8) + (1274976)/(5231)*a^(6) - (133129)/(5231)*a^(4) - (163259)/(5231)*a^(2) + (19353)/(5231) , (19785)/(5231)*a^(19) - (12311)/(5231)*a^(18) + (13884)/(5231)*a^(17) - (475)/(5231)*a^(16) - (395841)/(5231)*a^(15) + (251787)/(5231)*a^(14) - (572384)/(5231)*a^(13) + (191901)/(5231)*a^(12) + (1416302)/(5231)*a^(11) - (1111664)/(5231)*a^(10) + (3335134)/(5231)*a^(9) - (1469572)/(5231)*a^(8) + (1894792)/(5231)*a^(7) + (175845)/(5231)*a^(6) + (70937)/(5231)*a^(5) + (638536)/(5231)*a^(4) - (135593)/(5231)*a^(3) + (58115)/(5231)*a^(2) - (10095)/(5231)*a - (45505)/(5231) , (29505)/(5231)*a^(19) - (218)/(5231)*a^(18) + (21629)/(5231)*a^(17) + (6731)/(5231)*a^(16) - (589993)/(5231)*a^(15) + (7704)/(5231)*a^(14) - (872015)/(5231)*a^(13) - (132460)/(5231)*a^(12) + (2091605)/(5231)*a^(11) - (184220)/(5231)*a^(10) + (5044053)/(5231)*a^(9) + (498077)/(5231)*a^(8) + (2961305)/(5231)*a^(7) + (1019231)/(5231)*a^(6) + (159378)/(5231)*a^(5) + (413783)/(5231)*a^(4) - (236302)/(5231)*a^(3) - (64034)/(5231)*a^(2) - (37081)/(5231)*a - (34154)/(5231) , (2028)/(5231)*a^(19) + (19969)/(5231)*a^(18) + (1067)/(5231)*a^(17) + (7099)/(5231)*a^(16) - (42394)/(5231)*a^(15) - (404743)/(5231)*a^(14) - (51608)/(5231)*a^(13) - (439131)/(5231)*a^(12) + (186445)/(5231)*a^(11) + (1636866)/(5231)*a^(10) + (341434)/(5231)*a^(9) + (2871499)/(5231)*a^(8) + (15107)/(5231)*a^(7) + (713513)/(5231)*a^(6) - (207249)/(5231)*a^(5) - (608056)/(5231)*a^(4) - (87265)/(5231)*a^(3) - (149309)/(5231)*a^(2) - (5540)/(5231)*a + (30394)/(5231) , (40709)/(5231)*a^(19) + (25662)/(5231)*a^(18) + (40039)/(5231)*a^(17) + (35834)/(5231)*a^(16) - (809090)/(5231)*a^(15) - (503854)/(5231)*a^(14) - (1409344)/(5231)*a^(13) - (1100089)/(5231)*a^(12) + (2635125)/(5231)*a^(11) + (1379641)/(5231)*a^(10) + (7765791)/(5231)*a^(9) + (5667637)/(5231)*a^(8) + (5655881)/(5231)*a^(7) + (5245716)/(5231)*a^(6) + (777122)/(5231)*a^(5) + (1374993)/(5231)*a^(4) - (569766)/(5231)*a^(3) - (321801)/(5231)*a^(2) - (161794)/(5231)*a - (135691)/(5231) ], 23750801.6233, [[x^2 - x - 1, 1], [x^10 - x^9 - 10*x^8 + 8*x^7 + 34*x^6 - 23*x^5 - 46*x^4 + 28*x^3 + 20*x^2 - 13*x + 1, 1]]]