/* 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^14 - x^13 - 7*x^12 + 9*x^11 + 25*x^10 + 3*x^9 - 117*x^8 - 73*x^7 + 406*x^6 + 26*x^5 - 480*x^4 - 164*x^3 + 456*x^2 + 204*x - 116, 14, 10, [2, 6], 4156382630830772224, [2, 317], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, 1/2*a^8 - 1/2*a^4, 1/2*a^9 - 1/2*a^5, 1/2*a^10 - 1/2*a^6, 1/2*a^11 - 1/2*a^7, 1/2*a^12 - 1/2*a^4, 1/1891874804997038*a^13 + 218102613586431/1891874804997038*a^12 + 187073085814668/945937402498519*a^11 - 191810521200383/945937402498519*a^10 + 165760374023856/945937402498519*a^9 + 339970133997857/1891874804997038*a^8 + 455553928093765/945937402498519*a^7 - 322970410798278/945937402498519*a^6 + 835027717449179/1891874804997038*a^5 + 35517148568566/945937402498519*a^4 + 50546028537219/945937402498519*a^3 - 12602477137948/945937402498519*a^2 - 28314009263874/945937402498519*a - 172258960003668/945937402498519], 0, 3, [3], 0, [ (3574894745192)/(945937402498519)*a^(13) - (2159374378552)/(945937402498519)*a^(12) - (57677544141141)/(1891874804997038)*a^(11) + (46720689034803)/(1891874804997038)*a^(10) + (107157237967747)/(945937402498519)*a^(9) + (76320734220127)/(1891874804997038)*a^(8) - (811846558457025)/(1891874804997038)*a^(7) - (1002843553847505)/(1891874804997038)*a^(6) + (1351786005972265)/(945937402498519)*a^(5) + (1300234545773105)/(1891874804997038)*a^(4) - (1661847178508261)/(945937402498519)*a^(3) - (67304835771584)/(945937402498519)*a^(2) + (567097843674363)/(945937402498519)*a + (306134875727733)/(945937402498519) , (957661712547)/(945937402498519)*a^(13) + (5275995540949)/(1891874804997038)*a^(12) - (15636673627705)/(1891874804997038)*a^(11) - (9917507172162)/(945937402498519)*a^(10) + (28581066965451)/(945937402498519)*a^(9) + (70981188136198)/(945937402498519)*a^(8) - (18271592148231)/(1891874804997038)*a^(7) - (326606643241825)/(945937402498519)*a^(6) + (64753987257224)/(945937402498519)*a^(5) + (1018465906173069)/(1891874804997038)*a^(4) + (32428368046210)/(945937402498519)*a^(3) - (669774181820313)/(945937402498519)*a^(2) - (228179050664449)/(945937402498519)*a + (779210271022979)/(945937402498519) , (7225398409063)/(1891874804997038)*a^(13) + (2519518034686)/(945937402498519)*a^(12) - (50298910455335)/(1891874804997038)*a^(11) - (18579203728937)/(1891874804997038)*a^(10) + (107912299587647)/(945937402498519)*a^(9) + (156748299948655)/(945937402498519)*a^(8) - (508573532637545)/(1891874804997038)*a^(7) - (1448455296878891)/(1891874804997038)*a^(6) + (1114621205673085)/(1891874804997038)*a^(5) + (1518582771380746)/(945937402498519)*a^(4) - (783760350596467)/(945937402498519)*a^(3) - (1733420347995885)/(945937402498519)*a^(2) - (141712057130336)/(945937402498519)*a + (708177475194611)/(945937402498519) , (3024223595452)/(945937402498519)*a^(13) + (484039869569)/(945937402498519)*a^(12) - (48776405255399)/(1891874804997038)*a^(11) + (7740713633111)/(1891874804997038)*a^(10) + (104530617332137)/(945937402498519)*a^(9) + (155332385135995)/(1891874804997038)*a^(8) - (617087231172421)/(1891874804997038)*a^(7) - (1071981272445791)/(1891874804997038)*a^(6) + (845324350434442)/(945937402498519)*a^(5) + (2259838032986183)/(1891874804997038)*a^(4) - (1254238621743713)/(945937402498519)*a^(3) - (942995045594481)/(945937402498519)*a^(2) + (269079349758297)/(945937402498519)*a + (1233258381790711)/(945937402498519) , (5482295843469)/(945937402498519)*a^(13) - (16256498450645)/(1891874804997038)*a^(12) - (69940693757343)/(1891874804997038)*a^(11) + (134214964332477)/(1891874804997038)*a^(10) + (95616187687498)/(945937402498519)*a^(9) - (20233453212933)/(1891874804997038)*a^(8) - (1216314030897997)/(1891874804997038)*a^(7) - (318242107628387)/(1891874804997038)*a^(6) + (2156799947601715)/(945937402498519)*a^(5) - (1039321803520788)/(945937402498519)*a^(4) - (1062545123710867)/(945937402498519)*a^(3) - (321167931422674)/(945937402498519)*a^(2) + (1750799108871205)/(945937402498519)*a - (1020364098219283)/(945937402498519) , (3575615051758)/(945937402498519)*a^(13) + (3273072063224)/(945937402498519)*a^(12) - (37846154854321)/(1891874804997038)*a^(11) - (23605969103869)/(1891874804997038)*a^(10) + (57980817956709)/(945937402498519)*a^(9) + (325979405968723)/(1891874804997038)*a^(8) - (108386685300629)/(1891874804997038)*a^(7) - (975237923545985)/(1891874804997038)*a^(6) + (37034342417405)/(945937402498519)*a^(5) + (334984936615725)/(1891874804997038)*a^(4) - (28558313018960)/(945937402498519)*a^(3) + (141637557691127)/(945937402498519)*a^(2) + (1034528929244321)/(945937402498519)*a + (201515299181701)/(945937402498519) , (20350950245099)/(1891874804997038)*a^(13) - (51391907308981)/(1891874804997038)*a^(12) - (91076975812315)/(1891874804997038)*a^(11) + (333569538713863)/(1891874804997038)*a^(10) + (50739199427282)/(945937402498519)*a^(9) - (130796490530113)/(945937402498519)*a^(8) - (2235998040128283)/(1891874804997038)*a^(7) + (1283491513411643)/(1891874804997038)*a^(6) + (7483810918814195)/(1891874804997038)*a^(5) - (10121572955386909)/(1891874804997038)*a^(4) + (551239192071994)/(945937402498519)*a^(3) - (253136302070753)/(945937402498519)*a^(2) + (2492040267058686)/(945937402498519)*a - (870717228943687)/(945937402498519) ], 5502.73317638, [[x^7 - 2*x^6 + 2*x^4 - 2*x^3 + 2*x^2 - 2, 1]]]