/* 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 - 6*x^19 + 23*x^18 - 66*x^17 + 154*x^16 - 304*x^15 + 519*x^14 - 778*x^13 + 1036*x^12 - 1233*x^11 + 1317*x^10 - 1265*x^9 + 1093*x^8 - 845*x^7 + 580*x^6 - 349*x^5 + 180*x^4 - 76*x^3 + 25*x^2 - 6*x + 1, 20, 799, [0, 10], 405424975045226129161, [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, 1/193*a^19 - 70/193*a^18 + 64/193*a^17 + 84/193*a^16 - 11/193*a^15 + 14/193*a^14 + 9/193*a^13 - 3/193*a^12 + 70/193*a^11 + 77/193*a^10 + 56/193*a^9 - 24/193*a^8 - 73/193*a^7 - 33/193*a^6 - 10/193*a^5 - 95/193*a^4 + 84/193*a^3 - 48/193*a^2 + 9/193*a - 3/193], 0, 1, [], 0, [ (784)/(193)*a^(19) - (4507)/(193)*a^(18) + (16594)/(193)*a^(17) - (46084)/(193)*a^(16) + (103895)/(193)*a^(15) - (198429)/(193)*a^(14) + (327243)/(193)*a^(13) - (473272)/(193)*a^(12) + (607439)/(193)*a^(11) - (695420)/(193)*a^(10) + (712649)/(193)*a^(9) - (655137)/(193)*a^(8) + (539524)/(193)*a^(7) - (394888)/(193)*a^(6) + (253868)/(193)*a^(5) - (141258)/(193)*a^(4) + (65277)/(193)*a^(3) - (23350)/(193)*a^(2) + (5898)/(193)*a - (1001)/(193) , (266)/(193)*a^(19) - (1636)/(193)*a^(18) + (6216)/(193)*a^(17) - (17800)/(193)*a^(16) + (41271)/(193)*a^(15) - (81003)/(193)*a^(14) + (137301)/(193)*a^(13) - (204220)/(193)*a^(12) + (269520)/(193)*a^(11) - (317654)/(193)*a^(10) + (335276)/(193)*a^(9) - (317693)/(193)*a^(8) + (270082)/(193)*a^(7) - (204673)/(193)*a^(6) + (136686)/(193)*a^(5) - (79696)/(193)*a^(4) + (39135)/(193)*a^(3) - (15277)/(193)*a^(2) + (4324)/(193)*a - (991)/(193) , (1001)/(193)*a^(19) - (5222)/(193)*a^(18) + (18516)/(193)*a^(17) - (49472)/(193)*a^(16) + (108070)/(193)*a^(15) - (200409)/(193)*a^(14) + (321090)/(193)*a^(13) - (451535)/(193)*a^(12) + (563764)/(193)*a^(11) - (626794)/(193)*a^(10) + (622897)/(193)*a^(9) - (553616)/(193)*a^(8) + (438956)/(193)*a^(7) - (306321)/(193)*a^(6) + (185692)/(193)*a^(5) - (95481)/(193)*a^(4) + (38922)/(193)*a^(3) - (10799)/(193)*a^(2) + (1675)/(193)*a - (108)/(193) , (156)/(193)*a^(19) - (1270)/(193)*a^(18) + (5159)/(193)*a^(17) - (15653)/(193)*a^(16) + (37463)/(193)*a^(15) - (75209)/(193)*a^(14) + (129363)/(193)*a^(13) - (193854)/(193)*a^(12) + (256416)/(193)*a^(11) - (301806)/(193)*a^(10) + (317343)/(193)*a^(9) - (299034)/(193)*a^(8) + (252250)/(193)*a^(7) - (190042)/(193)*a^(6) + (125820)/(193)*a^(5) - (72527)/(193)*a^(4) + (35106)/(193)*a^(3) - (13664)/(193)*a^(2) + (3913)/(193)*a - (854)/(193) , (230)/(193)*a^(19) - (1046)/(193)*a^(18) + (3719)/(193)*a^(17) - (9630)/(193)*a^(16) + (20823)/(193)*a^(15) - (38082)/(193)*a^(14) + (60163)/(193)*a^(13) - (83487)/(193)*a^(12) + (102371)/(193)*a^(11) - (111214)/(193)*a^(10) + (107643)/(193)*a^(9) - (91984)/(193)*a^(8) + (69481)/(193)*a^(7) - (45032)/(193)*a^(6) + (24527)/(193)*a^(5) - (10077)/(193)*a^(4) + (2336)/(193)*a^(3) + (540)/(193)*a^(2) - (825)/(193)*a + (275)/(193) , (26)/(193)*a^(19) - (276)/(193)*a^(18) + (1085)/(193)*a^(17) - (3606)/(193)*a^(16) + (8978)/(193)*a^(15) - (19129)/(193)*a^(14) + (34588)/(193)*a^(13) - (54504)/(193)*a^(12) + (75739)/(193)*a^(11) - (93147)/(193)*a^(10) + (102009)/(193)*a^(9) - (100212)/(193)*a^(8) + (87654)/(193)*a^(7) - (68408)/(193)*a^(6) + (46832)/(193)*a^(5) - (28332)/(193)*a^(4) + (13957)/(193)*a^(3) - (5687)/(193)*a^(2) + (1778)/(193)*a - (464)/(193) , (564)/(193)*a^(19) - (2617)/(193)*a^(18) + (8883)/(193)*a^(17) - (22490)/(193)*a^(16) + (47064)/(193)*a^(15) - (83586)/(193)*a^(14) + (128403)/(193)*a^(13) - (173269)/(193)*a^(12) + (207969)/(193)*a^(11) - (221947)/(193)*a^(10) + (211846)/(193)*a^(9) - (180481)/(193)*a^(8) + (136967)/(193)*a^(7) - (90215)/(193)*a^(6) + (51488)/(193)*a^(5) - (24051)/(193)*a^(4) + (8390)/(193)*a^(3) - (1403)/(193)*a^(2) + (58)/(193)*a + (238)/(193) , (970)/(193)*a^(19) - (5561)/(193)*a^(18) + (20392)/(193)*a^(17) - (56515)/(193)*a^(16) + (127132)/(193)*a^(15) - (242338)/(193)*a^(14) + (398976)/(193)*a^(13) - (575927)/(193)*a^(12) + (737996)/(193)*a^(11) - (843218)/(193)*a^(10) + (862218)/(193)*a^(9) - (790648)/(193)*a^(8) + (649080)/(193)*a^(7) - (473015)/(193)*a^(6) + (302381)/(193)*a^(5) - (167034)/(193)*a^(4) + (76269)/(193)*a^(3) - (26681)/(193)*a^(2) + (6800)/(193)*a - (1173)/(193) , (690)/(193)*a^(19) - (3717)/(193)*a^(18) + (13280)/(193)*a^(17) - (35838)/(193)*a^(16) + (78681)/(193)*a^(15) - (146670)/(193)*a^(14) + (235880)/(193)*a^(13) - (332872)/(193)*a^(12) + (416930)/(193)*a^(11) - (465268)/(193)*a^(10) + (464591)/(193)*a^(9) - (415491)/(193)*a^(8) + (332156)/(193)*a^(7) - (235070)/(193)*a^(6) + (145184)/(193)*a^(5) - (77130)/(193)*a^(4) + (33256)/(193)*a^(3) - (10732)/(193)*a^(2) + (2350)/(193)*a - (333)/(193) ], 62.9466310057, [[x^5 - 2*x^4 + 3*x^2 - 2*x - 1, 1], [x^10 - x^9 + 2*x^7 - 5*x^6 + 10*x^5 - 11*x^4 + 10*x^3 - 8*x^2 + 4*x - 1, 1], [x^10 + x^8 - x^7 - x^5 - x^3 + x^2 + 1, 1], [x^10 - x^9 + x^8 + 2*x^7 - 7*x^6 + 2*x^5 + 6*x^4 - x^2 - 3*x + 1, 1]]]