/* 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^12 + 9*x^11 + 20*x^10 + 57*x^9 + 29*x^8 + 27*x^7 - 53*x^6 - 44*x^5 - 84*x^4 - 43*x^3 - 100*x^2 - 75*x - 55, 15, 2, [1, 7], -4947491410771484375, [5, 47], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, 1/235*a^12 + 31/235*a^11 - 26/235*a^10 + 89/235*a^9 + 8/235*a^8 + 107/235*a^7 - 10/47*a^6 + 2/5*a^5 + 37/235*a^4 + 36/235*a^3 + 17/47*a^2 - 4/47*a + 19/47, 1/235*a^13 - 1/5*a^11 - 9/47*a^10 + 69/235*a^9 + 2/5*a^8 - 77/235*a^7 - 1/235*a^6 - 57/235*a^5 + 64/235*a^4 - 91/235*a^3 - 14/47*a^2 + 2/47*a + 22/47, 1/468523025*a^14 + 241037/468523025*a^13 - 13446/468523025*a^12 + 112445122/468523025*a^11 - 115721117/468523025*a^10 + 24747486/468523025*a^9 + 161566574/468523025*a^8 - 177333328/468523025*a^7 + 12454981/468523025*a^6 - 122483791/468523025*a^5 - 64219836/468523025*a^4 - 33727116/468523025*a^3 - 22786853/93704605*a^2 - 9170231/93704605*a + 15014348/93704605], 0, 1, [], 0, [ (28865659)/(468523025)*a^(14) - (38557497)/(468523025)*a^(13) + (20747576)/(468523025)*a^(12) - (162775602)/(468523025)*a^(11) + (451919807)/(468523025)*a^(10) + (152895464)/(468523025)*a^(9) + (966535616)/(468523025)*a^(8) - (626216787)/(468523025)*a^(7) + (463988434)/(468523025)*a^(6) - (1603452374)/(468523025)*a^(5) + (173668586)/(468523025)*a^(4) - (1132342824)/(468523025)*a^(3) - (43311197)/(93704605)*a^(2) - (263160174)/(93704605)*a + (21361447)/(93704605) , (4900184)/(468523025)*a^(14) - (14914072)/(468523025)*a^(13) + (16368976)/(468523025)*a^(12) - (40587127)/(468523025)*a^(11) + (134495932)/(468523025)*a^(10) - (129043736)/(468523025)*a^(9) + (189157641)/(468523025)*a^(8) - (476841212)/(468523025)*a^(7) + (388112609)/(468523025)*a^(6) - (747194824)/(468523025)*a^(5) + (745131386)/(468523025)*a^(4) - (511869074)/(468523025)*a^(3) + (183953603)/(93704605)*a^(2) - (70964574)/(93704605)*a + (97744567)/(93704605) , (315809)/(468523025)*a^(14) + (27533528)/(468523025)*a^(13) - (33648019)/(468523025)*a^(12) + (11175728)/(468523025)*a^(11) - (132940923)/(468523025)*a^(10) + (403101134)/(468523025)*a^(9) + (208458931)/(468523025)*a^(8) + (910476548)/(468523025)*a^(7) - (399984441)/(468523025)*a^(6) + (586840371)/(468523025)*a^(5) - (1525969179)/(468523025)*a^(4) + (195296406)/(468523025)*a^(3) - (232168382)/(93704605)*a^(2) - (2972319)/(93704605)*a - (368950248)/(93704605) , (6072266)/(468523025)*a^(14) - (5213108)/(468523025)*a^(13) + (921759)/(468523025)*a^(12) - (851124)/(9968575)*a^(11) + (76915108)/(468523025)*a^(10) + (84132506)/(468523025)*a^(9) + (249071644)/(468523025)*a^(8) - (45112658)/(468523025)*a^(7) - (175424679)/(468523025)*a^(6) - (668932226)/(468523025)*a^(5) - (415541511)/(468523025)*a^(4) - (275796086)/(468523025)*a^(3) + (117264867)/(93704605)*a^(2) + (72998159)/(93704605)*a + (108938563)/(93704605) , (415632)/(18740921)*a^(14) - (2258171)/(93704605)*a^(13) + (571337)/(93704605)*a^(12) - (8994971)/(93704605)*a^(11) + (25060428)/(93704605)*a^(10) + (24481654)/(93704605)*a^(9) + (56586672)/(93704605)*a^(8) + (6883571)/(93704605)*a^(7) + (7225506)/(93704605)*a^(6) - (9873649)/(18740921)*a^(5) - (13495456)/(18740921)*a^(4) - (26153792)/(93704605)*a^(3) - (17719055)/(18740921)*a^(2) - (15668393)/(18740921)*a - (10854988)/(18740921) , (16457584)/(468523025)*a^(14) - (35972902)/(468523025)*a^(13) + (35621401)/(468523025)*a^(12) - (106288792)/(468523025)*a^(11) + (336789982)/(468523025)*a^(10) - (159696431)/(468523025)*a^(9) + (559847096)/(468523025)*a^(8) - (768417552)/(468523025)*a^(7) + (778363514)/(468523025)*a^(6) - (1221963289)/(468523025)*a^(5) + (1094204716)/(468523025)*a^(4) - (618990594)/(468523025)*a^(3) + (121695303)/(93704605)*a^(2) - (93384649)/(93704605)*a + (128305402)/(93704605) , (1685301)/(468523025)*a^(14) - (5515258)/(468523025)*a^(13) + (3994874)/(468523025)*a^(12) - (2201018)/(468523025)*a^(11) + (41871838)/(468523025)*a^(10) - (29704739)/(468523025)*a^(9) - (33747621)/(468523025)*a^(8) - (118934998)/(468523025)*a^(7) + (237432451)/(468523025)*a^(6) + (353214029)/(468523025)*a^(5) + (318991099)/(468523025)*a^(4) - (263352751)/(468523025)*a^(3) - (102761873)/(93704605)*a^(2) - (70431371)/(93704605)*a - (30671357)/(93704605) ], 1727.98179688, [[x^3 + 5*x - 5, 1], [x^5 - 2*x^4 + 2*x^3 - x^2 + 1, 1]]]