/* 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 - 4*x^19 + 9*x^18 - 14*x^17 + 19*x^16 - 29*x^15 + 45*x^14 - 60*x^13 + 64*x^12 - 62*x^11 + 65*x^10 - 52*x^9 + 42*x^8 - 47*x^7 + 35*x^6 - 24*x^5 + 22*x^4 - 11*x^3 + 4*x^2 - 3*x + 1, 20, 288, [0, 10], 2086514456522375390625, [3, 5, 67], [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, 1/3*a^16 - 1/3*a^15 + 1/3*a^14 + 1/3*a^12 - 1/3*a^11 - 1/3*a^9 + 1/3*a^7 - 1/3*a^6 + 1/3*a^5 - 1/3*a^4 + 1/3*a^3 - 1/3*a^2 + 1/3, 1/21*a^17 + 1/7*a^16 + 3/7*a^15 + 10/21*a^14 + 1/3*a^13 - 3/7*a^12 + 5/21*a^11 - 4/21*a^10 + 2/21*a^9 - 5/21*a^8 - 1/7*a^7 + 1/7*a^6 + 2/7*a^5 + 3/7*a^3 + 8/21*a^2 + 1/21*a - 5/21, 1/105*a^18 - 1/15*a^16 - 52/105*a^15 + 11/35*a^14 - 2/7*a^13 - 38/105*a^12 - 4/35*a^11 + 2/15*a^10 - 4/105*a^9 - 2/7*a^8 + 47/105*a^7 + 5/21*a^6 - 4/105*a^5 - 26/105*a^4 + 16/105*a^3 + 47/105*a^2 - 29/105*a - 34/105, 1/207795*a^19 - 338/207795*a^18 + 14/29685*a^17 - 7617/69265*a^16 + 23498/69265*a^15 - 66169/207795*a^14 - 86078/207795*a^13 - 1626/69265*a^12 - 4050/13853*a^11 - 55661/207795*a^10 - 22391/69265*a^9 - 89248/207795*a^8 - 103711/207795*a^7 - 60359/207795*a^6 - 15964/207795*a^5 - 14997/69265*a^4 - 49006/207795*a^3 + 7457/41559*a^2 + 18691/69265*a - 70373/207795], 0, 1, [], 0, [ (2899322)/(207795)*a^(19) - (9845246)/(207795)*a^(18) + (20174536)/(207795)*a^(17) - (28457162)/(207795)*a^(16) + (37905823)/(207795)*a^(15) - (61020278)/(207795)*a^(14) + (93281894)/(207795)*a^(13) - (117304126)/(207795)*a^(12) + (7619062)/(13853)*a^(11) - (36592994)/(69265)*a^(10) + (120386464)/(207795)*a^(9) - (76059866)/(207795)*a^(8) + (74263358)/(207795)*a^(7) - (89398313)/(207795)*a^(6) + (6564116)/(29685)*a^(5) - (41089732)/(207795)*a^(4) + (1783043)/(9895)*a^(3) - (537746)/(13853)*a^(2) + (6174596)/(207795)*a - (1496592)/(69265) , (1317224)/(207795)*a^(19) - (4516223)/(207795)*a^(18) + (9249607)/(207795)*a^(17) - (13083317)/(207795)*a^(16) + (17427853)/(207795)*a^(15) - (4022147)/(29685)*a^(14) + (43179023)/(207795)*a^(13) - (7760152)/(29685)*a^(12) + (17691524)/(69265)*a^(11) - (17050801)/(69265)*a^(10) + (8096341)/(29685)*a^(9) - (36870662)/(207795)*a^(8) + (34932419)/(207795)*a^(7) - (6071063)/(29685)*a^(6) + (21936608)/(207795)*a^(5) - (19318948)/(207795)*a^(4) + (1214813)/(13853)*a^(3) - (200902)/(9895)*a^(2) + (445313)/(29685)*a - (778206)/(69265) , (8769)/(1979)*a^(19) - (644008)/(41559)*a^(18) + (1349779)/(41559)*a^(17) - (1952813)/(41559)*a^(16) + (2616919)/(41559)*a^(15) - (592973)/(5937)*a^(14) + (6363352)/(41559)*a^(13) - (8142433)/(41559)*a^(12) + (8149271)/(41559)*a^(11) - (2612830)/(13853)*a^(10) + (2817980)/(13853)*a^(9) - (5738996)/(41559)*a^(8) + (5407840)/(41559)*a^(7) - (6225883)/(41559)*a^(6) + (497350)/(5937)*a^(5) - (3001924)/(41559)*a^(4) + (2673971)/(41559)*a^(3) - (240308)/(13853)*a^(2) + (161004)/(13853)*a - (48940)/(5937) , (1444658)/(207795)*a^(19) - (4795019)/(207795)*a^(18) + (9666239)/(207795)*a^(17) - (13361098)/(207795)*a^(16) + (5912294)/(69265)*a^(15) - (9650114)/(69265)*a^(14) + (14751432)/(69265)*a^(13) - (2617974)/(9895)*a^(12) + (1497728)/(5937)*a^(11) - (7204264)/(29685)*a^(10) + (8056598)/(29685)*a^(9) - (34323439)/(207795)*a^(8) + (11596194)/(69265)*a^(7) - (14046944)/(69265)*a^(6) + (973178)/(9895)*a^(5) - (2741534)/(29685)*a^(4) + (17548102)/(207795)*a^(3) - (97315)/(5937)*a^(2) + (992793)/(69265)*a - (2282344)/(207795) , (1048673)/(207795)*a^(19) - (520577)/(29685)*a^(18) + (2529983)/(69265)*a^(17) - (520693)/(9895)*a^(16) + (2094251)/(29685)*a^(15) - (23299147)/(207795)*a^(14) + (35569861)/(207795)*a^(13) - (6459857)/(29685)*a^(12) + (9017263)/(41559)*a^(11) - (43477073)/(207795)*a^(10) + (2228896)/(9895)*a^(9) - (1456524)/(9895)*a^(8) + (28822027)/(207795)*a^(7) - (34675147)/(207795)*a^(6) + (18779008)/(207795)*a^(5) - (5307916)/(69265)*a^(4) + (2163701)/(29685)*a^(3) - (99320)/(5937)*a^(2) + (2292079)/(207795)*a - (1988309)/(207795) , (267857)/(69265)*a^(19) - (2633192)/(207795)*a^(18) + (5378533)/(207795)*a^(17) - (1081109)/(29685)*a^(16) + (3421189)/(69265)*a^(15) - (5528172)/(69265)*a^(14) + (3581401)/(29685)*a^(13) - (10478207)/(69265)*a^(12) + (10283781)/(69265)*a^(11) - (30393887)/(207795)*a^(10) + (33145358)/(207795)*a^(9) - (20368778)/(207795)*a^(8) + (21687151)/(207795)*a^(7) - (3466777)/(29685)*a^(6) + (1736581)/(29685)*a^(5) - (12210862)/(207795)*a^(4) + (703335)/(13853)*a^(3) - (2215468)/(207795)*a^(2) + (312512)/(29685)*a - (1223632)/(207795) , (365954)/(29685)*a^(19) - (8684873)/(207795)*a^(18) + (5913378)/(69265)*a^(17) - (4998884)/(41559)*a^(16) + (2223355)/(13853)*a^(15) - (53920049)/(207795)*a^(14) + (82434571)/(207795)*a^(13) - (34480169)/(69265)*a^(12) + (4797933)/(9895)*a^(11) - (97290014)/(207795)*a^(10) + (107494627)/(207795)*a^(9) - (3251694)/(9895)*a^(8) + (22134648)/(69265)*a^(7) - (3819167)/(9895)*a^(6) + (13566158)/(69265)*a^(5) - (36844124)/(207795)*a^(4) + (34191013)/(207795)*a^(3) - (2529851)/(69265)*a^(2) + (172262)/(5937)*a - (1395206)/(69265) , (66007)/(9895)*a^(19) - (4735078)/(207795)*a^(18) + (3246842)/(69265)*a^(17) - (4607171)/(69265)*a^(16) + (18477932)/(207795)*a^(15) - (29672989)/(207795)*a^(14) + (15105798)/(69265)*a^(13) - (11412400)/(41559)*a^(12) + (55966849)/(207795)*a^(11) - (10799233)/(41559)*a^(10) + (59038247)/(207795)*a^(9) - (12528787)/(69265)*a^(8) + (12000208)/(69265)*a^(7) - (14511536)/(69265)*a^(6) + (1525084)/(13853)*a^(5) - (1330927)/(13853)*a^(4) + (2680903)/(29685)*a^(3) - (4251379)/(207795)*a^(2) + (3098924)/(207795)*a - (736991)/(69265) , (2057777)/(207795)*a^(19) - (65695)/(1979)*a^(18) + (14112316)/(207795)*a^(17) - (2837207)/(29685)*a^(16) + (1266951)/(9895)*a^(15) - (2861921)/(13853)*a^(14) + (65423474)/(207795)*a^(13) - (3911159)/(9895)*a^(12) + (80058613)/(207795)*a^(11) - (77550698)/(207795)*a^(10) + (810337)/(1979)*a^(9) - (7615658)/(29685)*a^(8) + (10694281)/(41559)*a^(7) - (62523728)/(207795)*a^(6) + (32017343)/(207795)*a^(5) - (29639083)/(207795)*a^(4) + (3738397)/(29685)*a^(3) - (841879)/(29685)*a^(2) + (4793287)/(207795)*a - (197447)/(13853) ], 527.926443922, [[x^2 - x + 1, 1], [x^5 - x^4 - x^2 + x + 1, 1], [x^10 - x^9 + x^8 + 2*x^7 - 2*x^6 + 3*x^5 + 2*x^4 - x^3 + 2*x^2 + x + 1, 1], [x^10 - 4*x^9 + 7*x^8 - 7*x^7 + 2*x^6 + 4*x^5 - 3*x^4 - 2*x^3 + 5*x^2 - 3*x + 1, 1], [x^10 - 3*x^9 + 3*x^8 + 2*x^7 - 7*x^6 + 15*x^5 - 26*x^4 + 29*x^3 - 23*x^2 + 9*x - 3, 1]]]