/* 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^15 - 6*x^13 + 9*x^11 - 18*x^10 + x^9 + 32*x^8 - 17*x^7 - 19*x^6 + 24*x^5 + 3*x^4 - 15*x^3 + 3*x^2 + 4*x - 1, 15, 32, [5, 5], -8565893077528823, [23, 191], [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, 1/70253969*a^14 - 20341715/70253969*a^13 + 29826569/70253969*a^12 - 32662361/70253969*a^11 + 3665471/70253969*a^10 - 24043703/70253969*a^9 + 6808710/70253969*a^8 + 14022021/70253969*a^7 + 2281596/70253969*a^6 + 22947435/70253969*a^5 + 19824924/70253969*a^4 + 3012647/70253969*a^3 - 10018858/70253969*a^2 + 31833807/70253969*a - 2514324/70253969], 0, 1, [], 0, [ (7609013)/(70253969)*a^(14) + (9194900)/(70253969)*a^(13) - (58826149)/(70253969)*a^(12) - (66598332)/(70253969)*a^(11) + (142066968)/(70253969)*a^(10) + (3755544)/(70253969)*a^(9) - (242980254)/(70253969)*a^(8) + (442434353)/(70253969)*a^(7) + (305599127)/(70253969)*a^(6) - (689003472)/(70253969)*a^(5) + (46774654)/(70253969)*a^(4) + (453912246)/(70253969)*a^(3) - (266211595)/(70253969)*a^(2) - (171650655)/(70253969)*a + (107089837)/(70253969) , (12326426)/(70253969)*a^(14) - (14061450)/(70253969)*a^(13) - (42069538)/(70253969)*a^(12) + (75375941)/(70253969)*a^(11) - (67284417)/(70253969)*a^(10) - (304965737)/(70253969)*a^(9) + (474285587)/(70253969)*a^(8) - (220465614)/(70253969)*a^(7) - (355376091)/(70253969)*a^(6) + (730032657)/(70253969)*a^(5) - (33826379)/(70253969)*a^(4) - (375164088)/(70253969)*a^(3) + (281474677)/(70253969)*a^(2) + (56053399)/(70253969)*a - (160555643)/(70253969) , (31215888)/(70253969)*a^(14) - (29440847)/(70253969)*a^(13) - (157352401)/(70253969)*a^(12) + (149178330)/(70253969)*a^(11) + (119496142)/(70253969)*a^(10) - (680649843)/(70253969)*a^(9) + (736876718)/(70253969)*a^(8) + (281405707)/(70253969)*a^(7) - (866543200)/(70253969)*a^(6) + (409843759)/(70253969)*a^(5) + (358366909)/(70253969)*a^(4) - (495123430)/(70253969)*a^(3) + (77470264)/(70253969)*a^(2) + (222166882)/(70253969)*a - (105768478)/(70253969) , (44594302)/(70253969)*a^(14) + (5121714)/(70253969)*a^(13) - (255911361)/(70253969)*a^(12) - (24841032)/(70253969)*a^(11) + (335137446)/(70253969)*a^(10) - (784918229)/(70253969)*a^(9) + (24904886)/(70253969)*a^(8) + (1237976291)/(70253969)*a^(7) - (604871607)/(70253969)*a^(6) - (578033933)/(70253969)*a^(5) + (805229885)/(70253969)*a^(4) + (225218694)/(70253969)*a^(3) - (491301104)/(70253969)*a^(2) - (22288137)/(70253969)*a + (108202462)/(70253969) , (4796110)/(70253969)*a^(14) + (21989898)/(70253969)*a^(13) - (47355024)/(70253969)*a^(12) - (116647448)/(70253969)*a^(11) + (140693033)/(70253969)*a^(10) + (25400650)/(70253969)*a^(9) - (479022325)/(70253969)*a^(8) + (613567029)/(70253969)*a^(7) + (237942027)/(70253969)*a^(6) - (742817860)/(70253969)*a^(5) + (302823257)/(70253969)*a^(4) + (274122754)/(70253969)*a^(3) - (289135295)/(70253969)*a^(2) - (84736883)/(70253969)*a + (119299210)/(70253969) , (15450992)/(70253969)*a^(14) + (1638036)/(70253969)*a^(13) - (80236558)/(70253969)*a^(12) - (4899062)/(70253969)*a^(11) + (66495820)/(70253969)*a^(10) - (289869516)/(70253969)*a^(9) + (79893022)/(70253969)*a^(8) + (307930678)/(70253969)*a^(7) - (239085092)/(70253969)*a^(6) + (23443591)/(70253969)*a^(5) + (201125801)/(70253969)*a^(4) - (68560382)/(70253969)*a^(3) - (186814086)/(70253969)*a^(2) + (53174519)/(70253969)*a + (29006305)/(70253969) , (11954488)/(70253969)*a^(14) + (52302672)/(70253969)*a^(13) - (83007377)/(70253969)*a^(12) - (289241735)/(70253969)*a^(11) + (164047106)/(70253969)*a^(10) + (115142543)/(70253969)*a^(9) - (974207199)/(70253969)*a^(8) + (814285938)/(70253969)*a^(7) + (964887823)/(70253969)*a^(6) - (1175717664)/(70253969)*a^(5) + (109923180)/(70253969)*a^(4) + (922313018)/(70253969)*a^(3) - (367827938)/(70253969)*a^(2) - (245058997)/(70253969)*a + (142518786)/(70253969) , (27123610)/(70253969)*a^(14) - (4532177)/(70253969)*a^(13) - (156031704)/(70253969)*a^(12) + (24948575)/(70253969)*a^(11) + (199100270)/(70253969)*a^(10) - (517059731)/(70253969)*a^(9) + (186332800)/(70253969)*a^(8) + (731675503)/(70253969)*a^(7) - (547401005)/(70253969)*a^(6) - (149550096)/(70253969)*a^(5) + (541431237)/(70253969)*a^(4) - (74635548)/(70253969)*a^(3) - (256913581)/(70253969)*a^(2) + (71380926)/(70253969)*a + (21483761)/(70253969) , (39989981)/(70253969)*a^(14) + (9360189)/(70253969)*a^(13) - (230140221)/(70253969)*a^(12) - (64855497)/(70253969)*a^(11) + (300502187)/(70253969)*a^(10) - (587294417)/(70253969)*a^(9) - (32944154)/(70253969)*a^(8) + (1063639294)/(70253969)*a^(7) - (237485570)/(70253969)*a^(6) - (672540491)/(70253969)*a^(5) + (419445446)/(70253969)*a^(4) + (256026243)/(70253969)*a^(3) - (333124590)/(70253969)*a^(2) - (54970445)/(70253969)*a + (132968770)/(70253969) ], 87.8024975924, [[x^3 - x^2 + 1, 1]]]