/* 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 - 3*x^19 + 9*x^18 - 18*x^17 + 34*x^16 - 53*x^15 + 77*x^14 - 97*x^13 + 114*x^12 - 121*x^11 + 116*x^10 - 104*x^9 + 79*x^8 - 56*x^7 + 33*x^6 - 19*x^5 + 12*x^4 - 7*x^3 + 5*x^2 - 2*x + 1, 20, 654, [0, 10], 2392595214874267578125, [5, 280001], [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, 1/7*a^18 + 3/7*a^17 - 1/7*a^15 + 2/7*a^13 - 2/7*a^12 - 2/7*a^11 + 2/7*a^10 + 1/7*a^9 - 2/7*a^8 - 3/7*a^7 + 3/7*a^6 + 1/7*a^5 + 3/7*a^3 + 2/7*a^2 + 1/7*a - 1/7, 1/45787*a^19 + 1453/45787*a^18 - 3707/45787*a^17 + 387/1477*a^16 + 22819/45787*a^15 - 3869/45787*a^14 - 198/6541*a^13 + 16138/45787*a^12 - 1616/6541*a^11 - 216/1477*a^10 - 22793/45787*a^9 - 4219/45787*a^8 + 2691/6541*a^7 - 6338/45787*a^6 - 18367/45787*a^5 - 15845/45787*a^4 + 6340/45787*a^3 - 11400/45787*a^2 - 554/6541*a + 18136/45787], 0, 1, [], 1, [ (22434)/(45787)*a^(19) - (23365)/(45787)*a^(18) + (64846)/(45787)*a^(17) - (1325)/(1477)*a^(16) + (42409)/(45787)*a^(15) + (60793)/(45787)*a^(14) - (180758)/(45787)*a^(13) + (407625)/(45787)*a^(12) - (577839)/(45787)*a^(11) + (3237)/(211)*a^(10) - (924309)/(45787)*a^(9) + (764521)/(45787)*a^(8) - (835836)/(45787)*a^(7) + (564092)/(45787)*a^(6) - (302410)/(45787)*a^(5) + (206686)/(45787)*a^(4) - (41731)/(45787)*a^(3) + (16671)/(6541)*a^(2) - (23375)/(45787)*a + (19365)/(45787) , (6862)/(45787)*a^(19) - (63408)/(45787)*a^(18) + (137876)/(45787)*a^(17) - (11868)/(1477)*a^(16) + (594210)/(45787)*a^(15) - (1045719)/(45787)*a^(14) + (1373492)/(45787)*a^(13) - (1838195)/(45787)*a^(12) + (1922157)/(45787)*a^(11) - (9664)/(211)*a^(10) + (1827765)/(45787)*a^(9) - (1465496)/(45787)*a^(8) + (1121304)/(45787)*a^(7) - (471199)/(45787)*a^(6) + (285438)/(45787)*a^(5) - (75839)/(45787)*a^(4) + (79381)/(45787)*a^(3) - (18180)/(6541)*a^(2) + (76444)/(45787)*a - (39080)/(45787) , (72505)/(45787)*a^(19) - (34514)/(6541)*a^(18) + (660837)/(45787)*a^(17) - (43444)/(1477)*a^(16) + (2411602)/(45787)*a^(15) - (3739430)/(45787)*a^(14) + (5217171)/(45787)*a^(13) - (6443980)/(45787)*a^(12) + (7253399)/(45787)*a^(11) - (243099)/(1477)*a^(10) + (6936809)/(45787)*a^(9) - (5889089)/(45787)*a^(8) + (4365650)/(45787)*a^(7) - (2693627)/(45787)*a^(6) + (1565777)/(45787)*a^(5) - (870061)/(45787)*a^(4) + (85945)/(6541)*a^(3) - (435241)/(45787)*a^(2) + (180184)/(45787)*a - (91206)/(45787) , (68686)/(45787)*a^(19) - (224214)/(45787)*a^(18) + (610818)/(45787)*a^(17) - (39966)/(1477)*a^(16) + (2189190)/(45787)*a^(15) - (3386624)/(45787)*a^(14) + (4656110)/(45787)*a^(13) - (5719649)/(45787)*a^(12) + (6308718)/(45787)*a^(11) - (209656)/(1477)*a^(10) + (825413)/(6541)*a^(9) - (692456)/(6541)*a^(8) + (3364292)/(45787)*a^(7) - (271292)/(6541)*a^(6) + (1040386)/(45787)*a^(5) - (476337)/(45787)*a^(4) + (414248)/(45787)*a^(3) - (298176)/(45787)*a^(2) + (135655)/(45787)*a - (57236)/(45787) , (24053)/(45787)*a^(19) - (10215)/(6541)*a^(18) + (185589)/(45787)*a^(17) - (11359)/(1477)*a^(16) + (605328)/(45787)*a^(15) - (891826)/(45787)*a^(14) + (1199022)/(45787)*a^(13) - (1401564)/(45787)*a^(12) + (1522494)/(45787)*a^(11) - (49158)/(1477)*a^(10) + (1347873)/(45787)*a^(9) - (1081798)/(45787)*a^(8) + (782752)/(45787)*a^(7) - (415451)/(45787)*a^(6) + (298575)/(45787)*a^(5) - (171945)/(45787)*a^(4) + (26042)/(6541)*a^(3) - (64349)/(45787)*a^(2) - (2874)/(45787)*a + (5918)/(45787) , (50161)/(45787)*a^(19) - (100545)/(45787)*a^(18) + (314689)/(45787)*a^(17) - (16151)/(1477)*a^(16) + (956173)/(45787)*a^(15) - (1263852)/(45787)*a^(14) + (259000)/(6541)*a^(13) - (1938996)/(45787)*a^(12) + (322946)/(6541)*a^(11) - (67446)/(1477)*a^(10) + (1858984)/(45787)*a^(9) - (1558503)/(45787)*a^(8) + (133995)/(6541)*a^(7) - (708082)/(45787)*a^(6) + (339436)/(45787)*a^(5) - (305021)/(45787)*a^(4) + (213173)/(45787)*a^(3) - (93131)/(45787)*a^(2) + (10056)/(6541)*a - (22007)/(45787) , (41851)/(45787)*a^(19) - (139535)/(45787)*a^(18) + (377159)/(45787)*a^(17) - (25554)/(1477)*a^(16) + (1398661)/(45787)*a^(15) - (2216463)/(45787)*a^(14) + (3061290)/(45787)*a^(13) - (549375)/(6541)*a^(12) + (4290341)/(45787)*a^(11) - (145744)/(1477)*a^(10) + (4085017)/(45787)*a^(9) - (3527214)/(45787)*a^(8) + (2616203)/(45787)*a^(7) - (1538141)/(45787)*a^(6) + (995612)/(45787)*a^(5) - (453844)/(45787)*a^(4) + (346348)/(45787)*a^(3) - (288664)/(45787)*a^(2) + (147557)/(45787)*a - (86396)/(45787) , (1507)/(6541)*a^(19) - (37112)/(45787)*a^(18) + (147398)/(45787)*a^(17) - (1472)/(211)*a^(16) + (682554)/(45787)*a^(15) - (159536)/(6541)*a^(14) + (1764291)/(45787)*a^(13) - (2324900)/(45787)*a^(12) + (2927543)/(45787)*a^(11) - (101697)/(1477)*a^(10) + (3254680)/(45787)*a^(9) - (2970881)/(45787)*a^(8) + (2409562)/(45787)*a^(7) - (1783153)/(45787)*a^(6) + (1044038)/(45787)*a^(5) - (82257)/(6541)*a^(4) + (273657)/(45787)*a^(3) - (257414)/(45787)*a^(2) + (135753)/(45787)*a - (92619)/(45787) , (9505)/(45787)*a^(19) + (3191)/(6541)*a^(18) - (44455)/(45787)*a^(17) + (6613)/(1477)*a^(16) - (358179)/(45787)*a^(15) + (724708)/(45787)*a^(14) - (1053457)/(45787)*a^(13) + (1529293)/(45787)*a^(12) - (1785295)/(45787)*a^(11) + (64516)/(1477)*a^(10) - (2050337)/(45787)*a^(9) + (1715018)/(45787)*a^(8) - (1564407)/(45787)*a^(7) + (863332)/(45787)*a^(6) - (594276)/(45787)*a^(5) + (261440)/(45787)*a^(4) - (15027)/(6541)*a^(3) + (236682)/(45787)*a^(2) - (8396)/(45787)*a + (92740)/(45787) ], 858.376938924, [[x^2 - x - 1, 1], [x^4 - x^3 + x^2 - x + 1, 1], [x^10 - x^9 - x^8 + 3*x^7 - 3*x^6 - x^5 + 5*x^4 - x^3 - 3*x^2 + x + 1, 1]]]