/* 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 - 7*x^19 + 24*x^18 - 52*x^17 + 75*x^16 - 58*x^15 - 28*x^14 + 140*x^13 - 109*x^12 - 274*x^11 + 1033*x^10 - 1874*x^9 + 2367*x^8 - 2282*x^7 + 1739*x^6 - 1057*x^5 + 509*x^4 - 190*x^3 + 53*x^2 - 10*x + 1, 20, 781, [0, 10], 2825584168318748978373, [3, 37, 109, 241], [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, 1/58974943*a^19 + 26100956/58974943*a^18 + 4441811/58974943*a^17 + 6717049/58974943*a^16 + 29168546/58974943*a^15 + 21041664/58974943*a^14 - 1661676/58974943*a^13 + 8787212/58974943*a^12 + 21434130/58974943*a^11 + 27183508/58974943*a^10 - 7725163/58974943*a^9 + 15959240/58974943*a^8 + 10227602/58974943*a^7 + 4964115/58974943*a^6 - 3726288/58974943*a^5 + 1530909/58974943*a^4 + 21410941/58974943*a^3 - 27182349/58974943*a^2 + 4596607/58974943*a + 17015652/58974943], 0, 1, [], 1, [ (170469271)/(58974943)*a^(19) - (1107741039)/(58974943)*a^(18) + (3494946958)/(58974943)*a^(17) - (6929036835)/(58974943)*a^(16) + (8932019192)/(58974943)*a^(15) - (5006475513)/(58974943)*a^(14) - (7278454937)/(58974943)*a^(13) + (19215480418)/(58974943)*a^(12) - (7094073266)/(58974943)*a^(11) - (50888046390)/(58974943)*a^(10) + (146458214592)/(58974943)*a^(9) - (236071278443)/(58974943)*a^(8) + (273396584995)/(58974943)*a^(7) - (245014812337)/(58974943)*a^(6) + (174367714885)/(58974943)*a^(5) - (98869823579)/(58974943)*a^(4) + (44056731443)/(58974943)*a^(3) - (14979138902)/(58974943)*a^(2) + (3589774868)/(58974943)*a - (509835363)/(58974943) , (154535783)/(58974943)*a^(19) - (991858053)/(58974943)*a^(18) + (3127902055)/(58974943)*a^(17) - (6165716435)/(58974943)*a^(16) + (7772183881)/(58974943)*a^(15) - (3861535384)/(58974943)*a^(14) - (7489634184)/(58974943)*a^(13) + (18095803770)/(58974943)*a^(12) - (6129253312)/(58974943)*a^(11) - (47779338876)/(58974943)*a^(10) + (134020851972)/(58974943)*a^(9) - (209619553989)/(58974943)*a^(8) + (232367009724)/(58974943)*a^(7) - (195423465312)/(58974943)*a^(6) + (127400827323)/(58974943)*a^(5) - (63637839084)/(58974943)*a^(4) + (23381382653)/(58974943)*a^(3) - (5828813705)/(58974943)*a^(2) + (814615000)/(58974943)*a - (1654540)/(58974943) , (1999557)/(830633)*a^(19) - (11621030)/(830633)*a^(18) + (32845725)/(830633)*a^(17) - (57103703)/(830633)*a^(16) + (59853676)/(830633)*a^(15) - (6105135)/(830633)*a^(14) - (103812724)/(830633)*a^(13) + (160553047)/(830633)*a^(12) + (43900364)/(830633)*a^(11) - (605708363)/(830633)*a^(10) + (1316763499)/(830633)*a^(9) - (1770622082)/(830633)*a^(8) + (1733831181)/(830633)*a^(7) - (1302660169)/(830633)*a^(6) + (761468086)/(830633)*a^(5) - (339192181)/(830633)*a^(4) + (113541589)/(830633)*a^(3) - (27213490)/(830633)*a^(2) + (5101620)/(830633)*a + (94914)/(830633) , (207403991)/(58974943)*a^(19) - (1329825328)/(58974943)*a^(18) + (4221012307)/(58974943)*a^(17) - (8449034836)/(58974943)*a^(16) + (10991313885)/(58974943)*a^(15) - (6242257941)/(58974943)*a^(14) - (8836687422)/(58974943)*a^(13) + (23941936121)/(58974943)*a^(12) - (9987499377)/(58974943)*a^(11) - (60740921145)/(58974943)*a^(10) + (179482526555)/(58974943)*a^(9) - (291225226680)/(58974943)*a^(8) + (335849394540)/(58974943)*a^(7) - (295797532191)/(58974943)*a^(6) + (204216771182)/(58974943)*a^(5) - (110375651809)/(58974943)*a^(4) + (45895175881)/(58974943)*a^(3) - (13980973735)/(58974943)*a^(2) + (2921509570)/(58974943)*a - (298975827)/(58974943) , (339008175)/(58974943)*a^(19) - (2222710082)/(58974943)*a^(18) + (7149431935)/(58974943)*a^(17) - (14468632217)/(58974943)*a^(16) + (19076855397)/(58974943)*a^(15) - (11395818298)/(58974943)*a^(14) - (14205694894)/(58974943)*a^(13) + (40795922241)/(58974943)*a^(12) - (18825932913)/(58974943)*a^(11) - (100608348246)/(58974943)*a^(10) + (304589105739)/(58974943)*a^(9) - (500427996152)/(58974943)*a^(8) + (584022637199)/(58974943)*a^(7) - (522427035231)/(58974943)*a^(6) + (368421625661)/(58974943)*a^(5) - (205329234678)/(58974943)*a^(4) + (89138569659)/(58974943)*a^(3) - (29117121795)/(58974943)*a^(2) + (6703309431)/(58974943)*a - (847496673)/(58974943) , (84930488)/(58974943)*a^(19) - (565770714)/(58974943)*a^(18) + (1868219015)/(58974943)*a^(17) - (3900003283)/(58974943)*a^(16) + (5351989753)/(58974943)*a^(15) - (3579886111)/(58974943)*a^(14) - (3217575696)/(58974943)*a^(13) + (11041043945)/(58974943)*a^(12) - (6719563567)/(58974943)*a^(11) - (24245314709)/(58974943)*a^(10) + (80775696951)/(58974943)*a^(9) - (138323796427)/(58974943)*a^(8) + (165795191051)/(58974943)*a^(7) - (150585130256)/(58974943)*a^(6) + (106576826067)/(58974943)*a^(5) - (58649972990)/(58974943)*a^(4) + (24493316533)/(58974943)*a^(3) - (7359999014)/(58974943)*a^(2) + (1425021530)/(58974943)*a - (88348972)/(58974943) , (285722443)/(58974943)*a^(19) - (1916478553)/(58974943)*a^(18) + (6314558012)/(58974943)*a^(17) - (13104665215)/(58974943)*a^(16) + (17856502623)/(58974943)*a^(15) - (11807329174)/(58974943)*a^(14) - (10963062708)/(58974943)*a^(13) + (36737314065)/(58974943)*a^(12) - (21212049505)/(58974943)*a^(11) - (83203884151)/(58974943)*a^(10) + (271082718441)/(58974943)*a^(9) - (460894269782)/(58974943)*a^(8) + (552183183424)/(58974943)*a^(7) - (505170417507)/(58974943)*a^(6) + (363433862005)/(58974943)*a^(5) - (206028093207)/(58974943)*a^(4) + (90762582803)/(58974943)*a^(3) - (30019999917)/(58974943)*a^(2) + (7042216505)/(58974943)*a - (930602197)/(58974943) , (127459714)/(58974943)*a^(19) - (614850438)/(58974943)*a^(18) + (1294168561)/(58974943)*a^(17) - (1200652422)/(58974943)*a^(16) - (788930412)/(58974943)*a^(15) + (5046995517)/(58974943)*a^(14) - (8586291499)/(58974943)*a^(13) + (3454907665)/(58974943)*a^(12) + (16425072666)/(58974943)*a^(11) - (40500540702)/(58974943)*a^(10) + (43225776469)/(58974943)*a^(9) - (10055142370)/(58974943)*a^(8) - (40730282560)/(58974943)*a^(7) + (75813075936)/(58974943)*a^(6) - (78166782586)/(58974943)*a^(5) + (56212015465)/(58974943)*a^(4) - (29119672945)/(58974943)*a^(3) + (10652795855)/(58974943)*a^(2) - (2647369755)/(58974943)*a + (357274570)/(58974943) , (229770728)/(58974943)*a^(19) - (1544081300)/(58974943)*a^(18) + (5088949017)/(58974943)*a^(17) - (10594101342)/(58974943)*a^(16) + (14550747408)/(58974943)*a^(15) - (9907451157)/(58974943)*a^(14) - (8272030832)/(58974943)*a^(13) + (29199007803)/(58974943)*a^(12) - (17486626224)/(58974943)*a^(11) - (65564772528)/(58974943)*a^(10) + (217094636634)/(58974943)*a^(9) - (373475619867)/(58974943)*a^(8) + (453387203084)/(58974943)*a^(7) - (421305205266)/(58974943)*a^(6) + (308267684496)/(58974943)*a^(5) - (177963617784)/(58974943)*a^(4) + (79700868526)/(58974943)*a^(3) - (26580657274)/(58974943)*a^(2) + (6010961122)/(58974943)*a - (690618265)/(58974943) ], 567.746569822, [[x^2 - x + 1, 1], [x^4 - x^3 - 2*x^2 + 3, 1], [x^10 - 3*x^9 + 5*x^8 - 7*x^7 + 7*x^6 - 6*x^5 + 4*x^4 - 2*x^3 + x^2 + 1, 1]]]