/* 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 - 2*x^13 - 8*x^12 + 8*x^11 + 39*x^10 + 6*x^9 - 139*x^8 - 72*x^7 + 279*x^6 + 186*x^5 - 223*x^4 - 208*x^3 - 10*x^2 + 20*x + 1, 14, 51, [10, 2], 9524221049139396608, [2, 4129], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, 1/2*a^8 - 1/2*a^7 - 1/2*a^6 - 1/2*a^2 - 1/2*a - 1/2, 1/2*a^9 - 1/2*a^6 - 1/2*a^3 - 1/2, 1/2*a^10 - 1/2*a^7 - 1/2*a^4 - 1/2*a, 1/2*a^11 - 1/2*a^7 - 1/2*a^6 - 1/2*a^5 - 1/2*a - 1/2, 1/2*a^12 - 1/2, 1/428594*a^13 + 24879/428594*a^12 - 44821/214297*a^11 + 10291/214297*a^10 - 69049/428594*a^9 + 5443/214297*a^8 + 98658/214297*a^7 + 89351/428594*a^6 + 12716/214297*a^5 + 84517/214297*a^4 - 58191/428594*a^3 + 77175/214297*a^2 - 34197/428594*a + 58925/214297], 0, 1, [], 0, [ (371372)/(214297)*a^(13) - (1122652)/(214297)*a^(12) - (1847141)/(214297)*a^(11) + (4961939)/(214297)*a^(10) + (18900017)/(428594)*a^(9) - (7886302)/(214297)*a^(8) - (43866701)/(214297)*a^(7) + (38497565)/(428594)*a^(6) + (86382714)/(214297)*a^(5) - (23312529)/(214297)*a^(4) - (126532295)/(428594)*a^(3) - (6179458)/(214297)*a^(2) + (5003658)/(214297)*a + (413483)/(428594) , (6055475)/(428594)*a^(13) - (8279048)/(214297)*a^(12) - (18152295)/(214297)*a^(11) + (75155279)/(428594)*a^(10) + (181107755)/(428594)*a^(9) - (48430782)/(214297)*a^(8) - (771217695)/(428594)*a^(7) + (130401979)/(428594)*a^(6) + (798049791)/(214297)*a^(5) - (45532731)/(428594)*a^(4) - (1321372205)/(428594)*a^(3) - (144978852)/(214297)*a^(2) + (77667598)/(214297)*a + (7931941)/(428594) , (5584375)/(428594)*a^(13) - (15223393)/(428594)*a^(12) - (16805417)/(214297)*a^(11) + (69056825)/(428594)*a^(10) + (83796063)/(214297)*a^(9) - (44064240)/(214297)*a^(8) - (712029633)/(428594)*a^(7) + (57502360)/(214297)*a^(6) + (736925884)/(214297)*a^(5) - (31398517)/(428594)*a^(4) - (610836714)/(214297)*a^(3) - (137420531)/(214297)*a^(2) + (71989293)/(214297)*a + (8006513)/(428594) , (518483)/(428594)*a^(13) - (563273)/(214297)*a^(12) - (2059942)/(214297)*a^(11) + (2713411)/(214297)*a^(10) + (19868071)/(428594)*a^(9) - (2734309)/(428594)*a^(8) - (74757231)/(428594)*a^(7) - (9840274)/(214297)*a^(6) + (82686968)/(214297)*a^(5) + (26035603)/(214297)*a^(4) - (155749245)/(428594)*a^(3) - (57295117)/(428594)*a^(2) + (11221610)/(214297)*a + (573267)/(214297) , (958082)/(214297)*a^(13) - (5195295)/(428594)*a^(12) - (11656461)/(428594)*a^(11) + (11848713)/(214297)*a^(10) + (57977221)/(428594)*a^(9) - (30095959)/(428594)*a^(8) - (122768680)/(214297)*a^(7) + (37369171)/(428594)*a^(6) + (510986205)/(428594)*a^(5) - (4381992)/(214297)*a^(4) - (427149611)/(428594)*a^(3) - (93167375)/(428594)*a^(2) + (26268113)/(214297)*a + (946043)/(214297) , (2454635)/(428594)*a^(13) - (3426160)/(214297)*a^(12) - (14303345)/(428594)*a^(11) + (15604997)/(214297)*a^(10) + (71551947)/(428594)*a^(9) - (43038611)/(428594)*a^(8) - (154881909)/(214297)*a^(7) + (69973681)/(428594)*a^(6) + (640809171)/(428594)*a^(5) - (26540669)/(214297)*a^(4) - (528599307)/(428594)*a^(3) - (90545441)/(428594)*a^(2) + (66271063)/(428594)*a + (285935)/(428594) , (2257867)/(214297)*a^(13) - (6199833)/(214297)*a^(12) - (26896045)/(428594)*a^(11) + (28115566)/(214297)*a^(10) + (134296787)/(428594)*a^(9) - (73240971)/(428594)*a^(8) - (286835455)/(214297)*a^(7) + (102747793)/(428594)*a^(6) + (1185518525)/(428594)*a^(5) - (21881609)/(214297)*a^(4) - (978504253)/(428594)*a^(3) - (211103709)/(428594)*a^(2) + (57648679)/(214297)*a + (6297029)/(428594) , (518483)/(428594)*a^(13) - (563273)/(214297)*a^(12) - (2059942)/(214297)*a^(11) + (2713411)/(214297)*a^(10) + (19868071)/(428594)*a^(9) - (2734309)/(428594)*a^(8) - (74757231)/(428594)*a^(7) - (9840274)/(214297)*a^(6) + (82686968)/(214297)*a^(5) + (26035603)/(214297)*a^(4) - (155749245)/(428594)*a^(3) - (57295117)/(428594)*a^(2) + (11435907)/(214297)*a + (787564)/(214297) , (2409839)/(428594)*a^(13) - (6344713)/(428594)*a^(12) - (7634492)/(214297)*a^(11) + (14490723)/(214297)*a^(10) + (37789848)/(214297)*a^(9) - (33518827)/(428594)*a^(8) - (313480341)/(428594)*a^(7) + (25471875)/(428594)*a^(6) + (327987619)/(214297)*a^(5) + (14994516)/(214297)*a^(4) - (277471255)/(214297)*a^(3) - (144303883)/(428594)*a^(2) + (32432420)/(214297)*a + (1642044)/(214297) , (1236108)/(214297)*a^(13) - (3631696)/(214297)*a^(12) - (13073427)/(428594)*a^(11) + (32400285)/(428594)*a^(10) + (66450855)/(428594)*a^(9) - (24509691)/(214297)*a^(8) - (149966698)/(214297)*a^(7) + (53029249)/(214297)*a^(6) + (601903567)/(428594)*a^(5) - (113382837)/(428594)*a^(4) - (465812379)/(428594)*a^(3) - (32422681)/(214297)*a^(2) + (24185020)/(214297)*a + (1156031)/(214297) , (3978210)/(214297)*a^(13) - (10969195)/(214297)*a^(12) - (47056967)/(428594)*a^(11) + (99346055)/(428594)*a^(10) + (235171873)/(428594)*a^(9) - (130623025)/(428594)*a^(8) - (1007548627)/(428594)*a^(7) + (190582525)/(428594)*a^(6) + (2077912169)/(428594)*a^(5) - (94691809)/(428594)*a^(4) - (1707671761)/(428594)*a^(3) - (360767127)/(428594)*a^(2) + (197716193)/(428594)*a + (10359361)/(428594) ], 63318.0457285, [[x^7 - 3*x^6 - 8*x^5 + 28*x^4 + 8*x^3 - 68*x^2 + 32*x + 14, 1]]]