/* 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^21 - 4*x^18 - x^17 + x^16 + 7*x^15 + x^14 - 6*x^13 - 11*x^12 + 2*x^11 + 10*x^10 + 14*x^9 - 2*x^8 - 5*x^7 - 6*x^6 + 2*x^5 - 2*x^4 - 3*x^3 + 2*x^2 - 1, 21, 38, [3, 9], -270061427296836406180775407, [193327], [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, 1/3*a^19 - 1/3*a^17 - 1/3*a^16 - 1/3*a^14 + 1/3*a^13 - 1/3*a^12 - 1/3*a^11 - 1/3*a^10 - 1/3*a^8 - 1/3*a^7 - 1/3*a^6 - 1/3*a^5 + 1/3*a^4 - 1/3, 1/2848767*a^20 + 135774/949589*a^19 - 28807/2848767*a^18 + 346415/2848767*a^17 - 259079/949589*a^16 - 353425/2848767*a^15 - 1035032/2848767*a^14 - 376795/2848767*a^13 + 1378718/2848767*a^12 + 936119/2848767*a^11 - 283895/949589*a^10 + 463043/2848767*a^9 - 715909/2848767*a^8 - 947635/2848767*a^7 + 151601/2848767*a^6 - 400565/2848767*a^5 + 131547/949589*a^4 - 154840/949589*a^3 + 63721/949589*a^2 - 452923/2848767*a + 216238/949589], 0, 1, [], 1, [ a^(20) - 4*a^(17) - a^(16) + a^(15) + 7*a^(14) + a^(13) - 6*a^(12) - 11*a^(11) + 2*a^(10) + 10*a^(9) + 14*a^(8) - 2*a^(7) - 5*a^(6) - 6*a^(5) + 2*a^(4) - 2*a^(3) - 3*a^(2) + 2*a , (398921)/(949589)*a^(20) - (765697)/(2848767)*a^(19) + (208831)/(949589)*a^(18) - (5356454)/(2848767)*a^(17) + (1421119)/(2848767)*a^(16) - (326828)/(949589)*a^(15) + (9067168)/(2848767)*a^(14) - (2036566)/(2848767)*a^(13) - (2408621)/(2848767)*a^(12) - (11569814)/(2848767)*a^(11) + (5694754)/(2848767)*a^(10) + (1625145)/(949589)*a^(9) + (17961997)/(2848767)*a^(8) - (4161161)/(2848767)*a^(7) + (2942812)/(2848767)*a^(6) - (11751293)/(2848767)*a^(5) + (1313276)/(2848767)*a^(4) - (3035871)/(949589)*a^(3) + (291300)/(949589)*a^(2) + (651714)/(949589)*a - (1414715)/(2848767) , (493672)/(2848767)*a^(20) - (1500256)/(2848767)*a^(19) - (164440)/(2848767)*a^(18) - (914751)/(949589)*a^(17) + (5030911)/(2848767)*a^(16) + (2405849)/(2848767)*a^(15) + (4674629)/(2848767)*a^(14) - (7647920)/(2848767)*a^(13) - (1761267)/(949589)*a^(12) - (246554)/(949589)*a^(11) + (15475990)/(2848767)*a^(10) + (6299816)/(2848767)*a^(9) + (467628)/(949589)*a^(8) - (6696235)/(949589)*a^(7) - (1812036)/(949589)*a^(6) - (7210498)/(2848767)*a^(5) + (5532512)/(2848767)*a^(4) - (1106747)/(949589)*a^(3) + (1188298)/(949589)*a^(2) + (4318574)/(2848767)*a - (1700387)/(2848767) , (3163)/(949589)*a^(20) + (1200817)/(2848767)*a^(19) + (44003)/(949589)*a^(18) + (604406)/(2848767)*a^(17) - (4492075)/(2848767)*a^(16) - (217022)/(949589)*a^(15) - (769210)/(2848767)*a^(14) + (7391542)/(2848767)*a^(13) - (782140)/(2848767)*a^(12) - (4370260)/(2848767)*a^(11) - (12981232)/(2848767)*a^(10) + (338771)/(949589)*a^(9) + (4847150)/(2848767)*a^(8) + (13793561)/(2848767)*a^(7) - (1984624)/(2848767)*a^(6) + (243482)/(2848767)*a^(5) - (5178512)/(2848767)*a^(4) + (1636601)/(949589)*a^(3) - (239624)/(949589)*a^(2) + (334352)/(949589)*a + (3260015)/(2848767) , (551705)/(2848767)*a^(20) - (184006)/(949589)*a^(19) + (305158)/(2848767)*a^(18) - (2041688)/(2848767)*a^(17) + (754941)/(949589)*a^(16) + (366457)/(2848767)*a^(15) + (3015590)/(2848767)*a^(14) - (5157485)/(2848767)*a^(13) - (3662480)/(2848767)*a^(12) - (2831603)/(2848767)*a^(11) + (2717041)/(949589)*a^(10) + (2806357)/(2848767)*a^(9) - (425363)/(2848767)*a^(8) - (12096602)/(2848767)*a^(7) - (769415)/(2848767)*a^(6) + (2235467)/(2848767)*a^(5) + (3747899)/(949589)*a^(4) - (26171)/(949589)*a^(3) + (459936)/(949589)*a^(2) + (2562457)/(2848767)*a - (1078636)/(949589) , (1027450)/(2848767)*a^(20) + (124820)/(2848767)*a^(19) + (936980)/(2848767)*a^(18) - (1551862)/(949589)*a^(17) - (1042265)/(2848767)*a^(16) - (2733061)/(2848767)*a^(15) + (8689412)/(2848767)*a^(14) + (1815838)/(2848767)*a^(13) - (258358)/(949589)*a^(12) - (4895083)/(949589)*a^(11) - (3245915)/(2848767)*a^(10) + (3743816)/(2848767)*a^(9) + (7108066)/(949589)*a^(8) + (1018307)/(949589)*a^(7) + (771123)/(949589)*a^(6) - (14334184)/(2848767)*a^(5) + (1291628)/(2848767)*a^(4) - (964885)/(949589)*a^(3) + (727845)/(949589)*a^(2) - (1100599)/(2848767)*a - (67745)/(2848767) , (1215101)/(949589)*a^(20) - (3235394)/(2848767)*a^(19) + (335211)/(949589)*a^(18) - (15696193)/(2848767)*a^(17) + (9138065)/(2848767)*a^(16) + (755969)/(949589)*a^(15) + (25206674)/(2848767)*a^(14) - (16977026)/(2848767)*a^(13) - (17300665)/(2848767)*a^(12) - (25572712)/(2848767)*a^(11) + (37047479)/(2848767)*a^(10) + (7781898)/(949589)*a^(9) + (31231493)/(2848767)*a^(8) - (43626121)/(2848767)*a^(7) - (2629405)/(2848767)*a^(6) - (18681853)/(2848767)*a^(5) + (23258275)/(2848767)*a^(4) - (6813276)/(949589)*a^(3) - (411183)/(949589)*a^(2) + (3257740)/(949589)*a - (7144303)/(2848767) , (1379024)/(2848767)*a^(20) + (230914)/(2848767)*a^(19) + (511447)/(2848767)*a^(18) - (1861583)/(949589)*a^(17) - (1733485)/(2848767)*a^(16) - (255005)/(2848767)*a^(15) + (10349734)/(2848767)*a^(14) + (1954364)/(2848767)*a^(13) - (2191294)/(949589)*a^(12) - (6195014)/(949589)*a^(11) - (598324)/(2848767)*a^(10) + (10530817)/(2848767)*a^(9) + (7498198)/(949589)*a^(8) - (423425)/(949589)*a^(7) - (1931450)/(949589)*a^(6) - (11877671)/(2848767)*a^(5) + (4256950)/(2848767)*a^(4) - (644853)/(949589)*a^(3) + (671011)/(949589)*a^(2) + (3326365)/(2848767)*a + (3370016)/(2848767) , (69609)/(949589)*a^(20) - (500853)/(949589)*a^(19) + (305505)/(949589)*a^(18) - (261331)/(949589)*a^(17) + (2042120)/(949589)*a^(16) - (558602)/(949589)*a^(15) - (325880)/(949589)*a^(14) - (3523742)/(949589)*a^(13) + (968977)/(949589)*a^(12) + (2459880)/(949589)*a^(11) + (4547228)/(949589)*a^(10) - (3737596)/(949589)*a^(9) - (4026806)/(949589)*a^(8) - (5472775)/(949589)*a^(7) + (4759397)/(949589)*a^(6) + (2701489)/(949589)*a^(5) + (2753955)/(949589)*a^(4) - (3166408)/(949589)*a^(3) + (1024199)/(949589)*a^(2) + (736871)/(949589)*a - (422480)/(949589) , (161320)/(949589)*a^(20) + (475432)/(2848767)*a^(19) + (143326)/(949589)*a^(18) - (833728)/(2848767)*a^(17) - (2323018)/(2848767)*a^(16) - (247851)/(949589)*a^(15) - (191686)/(2848767)*a^(14) + (3464182)/(2848767)*a^(13) - (1440172)/(2848767)*a^(12) - (2861482)/(2848767)*a^(11) - (6669616)/(2848767)*a^(10) - (372336)/(949589)*a^(9) + (2370023)/(2848767)*a^(8) + (9363086)/(2848767)*a^(7) + (2624231)/(2848767)*a^(6) + (4955306)/(2848767)*a^(5) - (3225977)/(2848767)*a^(4) + (449535)/(949589)*a^(3) - (437204)/(949589)*a^(2) + (1536834)/(949589)*a - (1487740)/(2848767) , (1500256)/(2848767)*a^(20) + (164440)/(2848767)*a^(19) + (769565)/(2848767)*a^(18) - (5524583)/(2848767)*a^(17) - (1912177)/(2848767)*a^(16) - (1218925)/(2848767)*a^(15) + (2713864)/(949589)*a^(14) + (773923)/(949589)*a^(13) - (4690730)/(2848767)*a^(12) - (14488646)/(2848767)*a^(11) - (1363096)/(2848767)*a^(10) + (5508524)/(2848767)*a^(9) + (19101361)/(2848767)*a^(8) + (2967748)/(2848767)*a^(7) + (4248466)/(2848767)*a^(6) - (1515056)/(949589)*a^(5) + (2332897)/(2848767)*a^(4) - (1681970)/(949589)*a^(3) - (2059999)/(949589)*a^(2) + (1700387)/(2848767)*a - (3342439)/(2848767) ], 75073.7253, []]