/* 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 - 2*x^19 + 3*x^18 - 12*x^17 + 27*x^16 - 39*x^15 + 68*x^14 - 127*x^13 + 178*x^12 - 215*x^11 + 277*x^10 - 328*x^9 + 297*x^8 - 211*x^7 + 139*x^6 - 82*x^5 + 29*x^4 + x^3 - 3*x^2 - x + 1, 20, 799, [0, 10], 2788613721199293001609, [7, 53, 139], [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, 1/74019941*a^19 - 25336160/74019941*a^18 - 34882728/74019941*a^17 - 12443997/74019941*a^16 + 20770159/74019941*a^15 + 6077301/74019941*a^14 + 8699359/74019941*a^13 + 29973500/74019941*a^12 + 26432076/74019941*a^11 + 20199767/74019941*a^10 - 31349346/74019941*a^9 - 29727334/74019941*a^8 - 6873169/74019941*a^7 + 12448186/74019941*a^6 - 9340461/74019941*a^5 + 21719426/74019941*a^4 + 8670726/74019941*a^3 + 10743901/74019941*a^2 - 26025510/74019941*a - 3564028/74019941], 0, 1, [], 0, [ (1193179739)/(74019941)*a^(19) - (1343337790)/(74019941)*a^(18) + (2049129060)/(74019941)*a^(17) - (12275268327)/(74019941)*a^(16) + (20964555193)/(74019941)*a^(15) - (24747961565)/(74019941)*a^(14) + (54669139544)/(74019941)*a^(13) - (98237447496)/(74019941)*a^(12) + (112261460128)/(74019941)*a^(11) - (134754526927)/(74019941)*a^(10) + (188468735575)/(74019941)*a^(9) - (195420388461)/(74019941)*a^(8) + (139054491636)/(74019941)*a^(7) - (88950600315)/(74019941)*a^(6) + (61748987087)/(74019941)*a^(5) - (26140133516)/(74019941)*a^(4) - (813394797)/(74019941)*a^(3) + (3919542159)/(74019941)*a^(2) + (964985651)/(74019941)*a - (816942117)/(74019941) , (1156032250)/(74019941)*a^(19) - (1419281582)/(74019941)*a^(18) + (2059243141)/(74019941)*a^(17) - (12077433009)/(74019941)*a^(16) + (21446057676)/(74019941)*a^(15) - (25507334683)/(74019941)*a^(14) + (54841675197)/(74019941)*a^(13) - (99902211422)/(74019941)*a^(12) + (116404376105)/(74019941)*a^(11) - (138661886171)/(74019941)*a^(10) + (193177626037)/(74019941)*a^(9) - (203995642427)/(74019941)*a^(8) + (148593318552)/(74019941)*a^(7) - (95609085939)/(74019941)*a^(6) + (66245343373)/(74019941)*a^(5) - (29959395597)/(74019941)*a^(4) + (817040043)/(74019941)*a^(3) + (3835404880)/(74019941)*a^(2) + (867875413)/(74019941)*a - (931226842)/(74019941) , (64176579)/(74019941)*a^(19) - (98023209)/(74019941)*a^(18) + (135080323)/(74019941)*a^(17) - (688046290)/(74019941)*a^(16) + (1396962250)/(74019941)*a^(15) - (1710366930)/(74019941)*a^(14) + (3322097470)/(74019941)*a^(13) - (6370733153)/(74019941)*a^(12) + (7816348939)/(74019941)*a^(11) - (9025476259)/(74019941)*a^(10) + (12406117443)/(74019941)*a^(9) - (13746952315)/(74019941)*a^(8) + (10413052567)/(74019941)*a^(7) - (6496624268)/(74019941)*a^(6) + (4330951422)/(74019941)*a^(5) - (2005398614)/(74019941)*a^(4) - (31751057)/(74019941)*a^(3) + (476028116)/(74019941)*a^(2) + (15580021)/(74019941)*a - (29334578)/(74019941) , (686555619)/(74019941)*a^(19) - (577880090)/(74019941)*a^(18) + (1007375123)/(74019941)*a^(17) - (6773934988)/(74019941)*a^(16) + (10119517754)/(74019941)*a^(15) - (11284655537)/(74019941)*a^(14) + (28169715798)/(74019941)*a^(13) - (48331802694)/(74019941)*a^(12) + (50458263021)/(74019941)*a^(11) - (62719978993)/(74019941)*a^(10) + (89873010917)/(74019941)*a^(9) - (85764271422)/(74019941)*a^(8) + (54445326866)/(74019941)*a^(7) - (34444471772)/(74019941)*a^(6) + (24307132633)/(74019941)*a^(5) - (7093188982)/(74019941)*a^(4) - (2997807351)/(74019941)*a^(3) + (1735876541)/(74019941)*a^(2) + (849580213)/(74019941)*a - (205017100)/(74019941) , (1043021688)/(74019941)*a^(19) - (1530410157)/(74019941)*a^(18) + (2042888541)/(74019941)*a^(17) - (11251297760)/(74019941)*a^(16) + (21786048256)/(74019941)*a^(15) - (26467082708)/(74019941)*a^(14) + (53296379357)/(74019941)*a^(13) - (100124533414)/(74019941)*a^(12) + (121779116958)/(74019941)*a^(11) - (142042052128)/(74019941)*a^(10) + (195942565931)/(74019941)*a^(9) - (215319890847)/(74019941)*a^(8) + (162810324614)/(74019941)*a^(7) - (104102996634)/(74019941)*a^(6) + (71700605082)/(74019941)*a^(5) - (35415607228)/(74019941)*a^(4) + (2726362420)/(74019941)*a^(3) + (4544524868)/(74019941)*a^(2) + (376237622)/(74019941)*a - (1193179739)/(74019941) , (564030254)/(74019941)*a^(19) - (557760749)/(74019941)*a^(18) + (895416688)/(74019941)*a^(17) - (5695336043)/(74019941)*a^(16) + (9145963094)/(74019941)*a^(15) - (10485822422)/(74019941)*a^(14) + (24589753642)/(74019941)*a^(13) - (43297610888)/(74019941)*a^(12) + (47397826511)/(74019941)*a^(11) - (57987719027)/(74019941)*a^(10) + (82233003985)/(74019941)*a^(9) - (82071572041)/(74019941)*a^(8) + (56014010401)/(74019941)*a^(7) - (36415793100)/(74019941)*a^(6) + (25629300651)/(74019941)*a^(5) - (9745087856)/(74019941)*a^(4) - (858581641)/(74019941)*a^(3) + (1360988253)/(74019941)*a^(2) + (611666378)/(74019941)*a - (272253784)/(74019941) , (645247522)/(74019941)*a^(19) - (620355109)/(74019941)*a^(18) + (1033691075)/(74019941)*a^(17) - (6488700941)/(74019941)*a^(16) + (10319882717)/(74019941)*a^(15) - (11951302181)/(74019941)*a^(14) + (27990351359)/(74019941)*a^(13) - (49035817938)/(74019941)*a^(12) + (53778999487)/(74019941)*a^(11) - (65922026589)/(74019941)*a^(10) + (93274790125)/(74019941)*a^(9) - (92991961210)/(74019941)*a^(8) + (63460014771)/(74019941)*a^(7) - (41298476843)/(74019941)*a^(6) + (29072885210)/(74019941)*a^(5) - (10721331395)/(74019941)*a^(4) - (1316569103)/(74019941)*a^(3) + (1651796941)/(74019941)*a^(2) + (628349798)/(74019941)*a - (210673331)/(74019941) , (984181412)/(74019941)*a^(19) - (1513710055)/(74019941)*a^(18) + (1931220847)/(74019941)*a^(17) - (10732304641)/(74019941)*a^(16) + (21159852895)/(74019941)*a^(15) - (25534107315)/(74019941)*a^(14) + (51153913219)/(74019941)*a^(13) - (96802615835)/(74019941)*a^(12) + (118087527901)/(74019941)*a^(11) - (137215691942)/(74019941)*a^(10) + (189504832272)/(74019941)*a^(9) - (209124503150)/(74019941)*a^(8) + (158553458089)/(74019941)*a^(7) - (101212585101)/(74019941)*a^(6) + (69386006964)/(74019941)*a^(5) - (34690322507)/(74019941)*a^(4) + (2514160355)/(74019941)*a^(3) + (4708353146)/(74019941)*a^(2) + (193849380)/(74019941)*a - (1287533046)/(74019941) , (802810485)/(74019941)*a^(19) - (1378002180)/(74019941)*a^(18) + (1714021895)/(74019941)*a^(17) - (8937412161)/(74019941)*a^(16) + (18726395552)/(74019941)*a^(15) - (23062058089)/(74019941)*a^(14) + (44006677733)/(74019941)*a^(13) - (85078836424)/(74019941)*a^(12) + (106924000746)/(74019941)*a^(11) - (122588909301)/(74019941)*a^(10) + (168155132520)/(74019941)*a^(9) - (190581730194)/(74019941)*a^(8) + (148006941656)/(74019941)*a^(7) - (94591343086)/(74019941)*a^(6) + (65139075659)/(74019941)*a^(5) - (34400295775)/(74019941)*a^(4) + (4204010020)/(74019941)*a^(3) + (4034207551)/(74019941)*a^(2) + (111422549)/(74019941)*a - (1188676220)/(74019941) ], 192.366272752, [[x^5 - 2*x^4 + 3*x^2 - 2*x - 1, 1], [x^10 - x^9 + 2*x^8 + x^7 - 6*x^6 + 8*x^5 - 6*x^4 - x^3 + 8*x^2 - 6*x + 1, 1], [x^10 - 2*x^9 + 3*x^8 - 6*x^7 + 3*x^6 - x^4 + 12*x^3 - x^2 + 9*x + 1, 1], [x^10 + x^8 - x^7 - x^5 - x^3 + x^2 + 1, 1]]]