/* 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^18 + 2*x^16 - x^15 - 5*x^14 - 5*x^12 + 10*x^11 - 11*x^10 + 19*x^9 - 8*x^8 - 17*x^7 + 46*x^6 - 57*x^5 + 52*x^4 - 37*x^3 + 14*x^2 - 3*x + 1, 18, 88, [0, 9], -16481672572799864375, [5, 11, 23], [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, 1/5*a^15 + 1/5*a^14 + 1/5*a^13 + 1/5*a^12 + 2/5*a^11 - 2/5*a^10 + 2/5*a^9 + 2/5*a^8 + 1/5*a^7 + 2/5*a^6 - 2/5*a^5 + 1/5*a^3 - 2/5*a^2 - 2/5*a - 2/5, 1/5*a^16 + 1/5*a^12 + 1/5*a^11 - 1/5*a^10 - 1/5*a^8 + 1/5*a^7 + 1/5*a^6 + 2/5*a^5 + 1/5*a^4 + 2/5*a^3 + 2/5, 1/3029771545*a^17 - 292269546/3029771545*a^16 + 113494807/3029771545*a^15 - 676258248/3029771545*a^14 - 624457397/3029771545*a^13 - 1001474408/3029771545*a^12 - 1233781428/3029771545*a^11 + 701788097/3029771545*a^10 - 217782827/3029771545*a^9 - 804115889/3029771545*a^8 + 257956867/3029771545*a^7 - 138295421/605954309*a^6 + 160462277/605954309*a^5 + 490679776/3029771545*a^4 + 23624492/605954309*a^3 - 1190301754/3029771545*a^2 + 1455677013/3029771545*a + 1387349104/3029771545], 0, 1, [], 0, [ (1970603636)/(3029771545)*a^(17) + (2188112856)/(3029771545)*a^(16) + (5530995419)/(3029771545)*a^(15) + (3399328134)/(3029771545)*a^(14) - (1624862711)/(605954309)*a^(13) - (9996481564)/(3029771545)*a^(12) - (16986702342)/(3029771545)*a^(11) + (4244500771)/(3029771545)*a^(10) - (11383889953)/(3029771545)*a^(9) + (21155039043)/(3029771545)*a^(8) + (12489846706)/(3029771545)*a^(7) - (28224723489)/(3029771545)*a^(6) + (11064414150)/(605954309)*a^(5) - (35883170422)/(3029771545)*a^(4) + (36276346071)/(3029771545)*a^(3) - (16368322243)/(3029771545)*a^(2) - (4338763561)/(3029771545)*a - (4133725821)/(3029771545) , (1479144098)/(3029771545)*a^(17) + (1522240673)/(3029771545)*a^(16) + (3956095197)/(3029771545)*a^(15) + (2206770102)/(3029771545)*a^(14) - (1315669487)/(605954309)*a^(13) - (7394147687)/(3029771545)*a^(12) - (12609467876)/(3029771545)*a^(11) + (3322782878)/(3029771545)*a^(10) - (8287992694)/(3029771545)*a^(9) + (18219348324)/(3029771545)*a^(8) + (11971924238)/(3029771545)*a^(7) - (21299829087)/(3029771545)*a^(6) + (8603570360)/(605954309)*a^(5) - (30284280881)/(3029771545)*a^(4) + (23658661313)/(3029771545)*a^(3) - (9454765954)/(3029771545)*a^(2) - (3560487678)/(3029771545)*a - (2788157243)/(3029771545) , (24336452)/(605954309)*a^(17) + (3298373)/(605954309)*a^(16) - (8479036)/(605954309)*a^(15) - (88164388)/(605954309)*a^(14) - (323042460)/(605954309)*a^(13) - (185736271)/(605954309)*a^(12) + (31614020)/(605954309)*a^(11) + (477455930)/(605954309)*a^(10) + (457744720)/(605954309)*a^(9) + (607510476)/(605954309)*a^(8) + (403693276)/(605954309)*a^(7) - (1072338463)/(605954309)*a^(6) + (706054491)/(605954309)*a^(5) - (411748723)/(605954309)*a^(4) - (809334002)/(605954309)*a^(3) + (590251126)/(605954309)*a^(2) - (872556126)/(605954309)*a + (64562806)/(605954309) , (2231209431)/(3029771545)*a^(17) + (213070895)/(605954309)*a^(16) + (5099750773)/(3029771545)*a^(15) + (339307578)/(3029771545)*a^(14) - (10812281816)/(3029771545)*a^(13) - (4953283861)/(3029771545)*a^(12) - (2864145163)/(605954309)*a^(11) + (14952559549)/(3029771545)*a^(10) - (3576565377)/(605954309)*a^(9) + (33840404492)/(3029771545)*a^(8) - (2850765336)/(3029771545)*a^(7) - (39048644127)/(3029771545)*a^(6) + (17490063547)/(605954309)*a^(5) - (89167593903)/(3029771545)*a^(4) + (78158916648)/(3029771545)*a^(3) - (43711182016)/(3029771545)*a^(2) + (6987847816)/(3029771545)*a - (661590491)/(3029771545) , (2141844549)/(3029771545)*a^(17) + (474171084)/(605954309)*a^(16) + (6169538819)/(3029771545)*a^(15) + (3850939419)/(3029771545)*a^(14) - (8413245237)/(3029771545)*a^(13) - (10345056262)/(3029771545)*a^(12) - (18831684471)/(3029771545)*a^(11) + (4735385992)/(3029771545)*a^(10) - (12635953821)/(3029771545)*a^(9) + (23499525277)/(3029771545)*a^(8) + (11949484773)/(3029771545)*a^(7) - (31054415754)/(3029771545)*a^(6) + (59312621386)/(3029771545)*a^(5) - (44614309672)/(3029771545)*a^(4) + (44298016219)/(3029771545)*a^(3) - (17286913153)/(3029771545)*a^(2) - (446451261)/(605954309)*a - (2611432288)/(3029771545) , (62798952)/(3029771545)*a^(17) + (1519346228)/(3029771545)*a^(16) + (317507940)/(605954309)*a^(15) + (788819537)/(605954309)*a^(14) + (1629911697)/(3029771545)*a^(13) - (1335467913)/(605954309)*a^(12) - (6864065139)/(3029771545)*a^(11) - (10695378143)/(3029771545)*a^(10) + (5731601328)/(3029771545)*a^(9) - (6789354101)/(3029771545)*a^(8) + (3312512846)/(605954309)*a^(7) + (4382689582)/(3029771545)*a^(6) - (21923343522)/(3029771545)*a^(5) + (41750092592)/(3029771545)*a^(4) - (32638152494)/(3029771545)*a^(3) + (5651008404)/(605954309)*a^(2) - (11211426441)/(3029771545)*a - (3189513834)/(3029771545) , (2053140866)/(3029771545)*a^(17) + (2051356828)/(3029771545)*a^(16) + (6086776662)/(3029771545)*a^(15) + (3405588862)/(3029771545)*a^(14) - (7837855387)/(3029771545)*a^(13) - (9410546054)/(3029771545)*a^(12) - (20281477869)/(3029771545)*a^(11) + (3564272443)/(3029771545)*a^(10) - (14071925587)/(3029771545)*a^(9) + (29569204437)/(3029771545)*a^(8) + (10828300606)/(3029771545)*a^(7) - (25415081141)/(3029771545)*a^(6) + (62622551198)/(3029771545)*a^(5) - (11777547045)/(605954309)*a^(4) + (55067368568)/(3029771545)*a^(3) - (29185639114)/(3029771545)*a^(2) + (5934806303)/(3029771545)*a - (6168377713)/(3029771545) , (2023547642)/(3029771545)*a^(17) + (1687271703)/(3029771545)*a^(16) + (1143763339)/(605954309)*a^(15) + (505362088)/(605954309)*a^(14) - (7573673053)/(3029771545)*a^(13) - (1345506649)/(605954309)*a^(12) - (16738283774)/(3029771545)*a^(11) + (8036592142)/(3029771545)*a^(10) - (16004106962)/(3029771545)*a^(9) + (27395991984)/(3029771545)*a^(8) + (241426321)/(605954309)*a^(7) - (28001707463)/(3029771545)*a^(6) + (65557409613)/(3029771545)*a^(5) - (66903634313)/(3029771545)*a^(4) + (67138368436)/(3029771545)*a^(3) - (7987060061)/(605954309)*a^(2) + (10779227694)/(3029771545)*a - (4710336964)/(3029771545) ], 102.074554739, [[x^2 - x + 6, 1], [x^3 - x^2 + 1, 3], [x^6 - 3*x^5 + 5*x^4 - 5*x^3 + 5*x^2 - 3*x + 1, 1], [x^9 - 3*x^8 + 7*x^7 - 9*x^6 + 7*x^5 - 7*x^4 + 13*x^3 - 6*x^2 + x + 1, 3]]]