/* 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 - 4*x^13 + 4*x^12 + 4*x^11 - 23*x^10 + 60*x^9 - 28*x^8 - 144*x^7 + 179*x^6 + 44*x^5 - 101*x^4 + 3*x^3 - 35*x^2 + 40*x - 11, 14, 3, [2, 6], 19891027786401117, [3, 71], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, 1/371*a^12 + 87/371*a^11 + 69/371*a^10 - 137/371*a^9 - 4/371*a^8 - 109/371*a^7 - 57/371*a^6 - 166/371*a^5 + 51/371*a^4 - 29/371*a^3 + 85/371*a^2 - 139/371*a - 61/371, 1/13851723893*a^13 - 11895074/13851723893*a^12 + 46708456/446829803*a^11 + 4285957859/13851723893*a^10 + 3471345978/13851723893*a^9 - 1060103777/13851723893*a^8 + 6251491559/13851723893*a^7 - 435169327/1978817699*a^6 + 4740766841/13851723893*a^5 + 2886994029/13851723893*a^4 + 3662836869/13851723893*a^3 + 2833883202/13851723893*a^2 - 2756620744/13851723893*a - 66905649/261353281], 0, 1, [], 0, [ (876340788)/(13851723893)*a^(13) - (3321245244)/(13851723893)*a^(12) + (81730058)/(446829803)*a^(11) + (4673948266)/(13851723893)*a^(10) - (19052346549)/(13851723893)*a^(9) + (46874078281)/(13851723893)*a^(8) - (9478375839)/(13851723893)*a^(7) - (19602671804)/(1978817699)*a^(6) + (118236019243)/(13851723893)*a^(5) + (98693669329)/(13851723893)*a^(4) - (77100173046)/(13851723893)*a^(3) - (45832505415)/(13851723893)*a^(2) - (24198237360)/(13851723893)*a + (21846175299)/(13851723893) , (919329)/(13851723893)*a^(13) + (169506805)/(13851723893)*a^(12) - (21544004)/(446829803)*a^(11) + (836960540)/(13851723893)*a^(10) + (240794899)/(13851723893)*a^(9) - (64819933)/(261353281)*a^(8) + (10022914723)/(13851723893)*a^(7) - (6717299199)/(13851723893)*a^(6) - (18593319354)/(13851723893)*a^(5) + (30421940225)/(13851723893)*a^(4) - (103955649)/(1978817699)*a^(3) - (5798986484)/(13851723893)*a^(2) + (5046544084)/(13851723893)*a - (9816328645)/(13851723893) , (50675292)/(13851723893)*a^(13) + (91080831)/(13851723893)*a^(12) - (15616420)/(446829803)*a^(11) + (391618516)/(13851723893)*a^(10) - (823127177)/(13851723893)*a^(9) - (817138481)/(13851723893)*a^(8) + (9158126604)/(13851723893)*a^(7) - (2930031994)/(13851723893)*a^(6) - (6785441636)/(13851723893)*a^(5) - (2555887883)/(13851723893)*a^(4) - (16708564114)/(13851723893)*a^(3) + (27586845198)/(13851723893)*a^(2) + (14002861263)/(13851723893)*a + (657365308)/(1978817699) , (484496511)/(13851723893)*a^(13) - (1722311033)/(13851723893)*a^(12) + (39218714)/(446829803)*a^(11) + (341829856)/(1978817699)*a^(10) - (9314821492)/(13851723893)*a^(9) + (23278835093)/(13851723893)*a^(8) - (3685360516)/(13851723893)*a^(7) - (68142882586)/(13851723893)*a^(6) + (46243325347)/(13851723893)*a^(5) + (64291579495)/(13851723893)*a^(4) - (1600192822)/(13851723893)*a^(3) - (55829116020)/(13851723893)*a^(2) - (38785201732)/(13851723893)*a + (17026163446)/(13851723893) , (17452193)/(1978817699)*a^(13) - (727564406)/(13851723893)*a^(12) + (28719115)/(446829803)*a^(11) + (812701955)/(13851723893)*a^(10) - (3682628620)/(13851723893)*a^(9) + (10535419819)/(13851723893)*a^(8) - (8733707135)/(13851723893)*a^(7) - (28360284867)/(13851723893)*a^(6) + (39105049098)/(13851723893)*a^(5) + (16810611226)/(13851723893)*a^(4) - (27476677926)/(13851723893)*a^(3) - (15330858951)/(13851723893)*a^(2) - (5936365192)/(13851723893)*a + (5074307703)/(13851723893) , (253716877)/(13851723893)*a^(13) - (878377026)/(13851723893)*a^(12) + (15298854)/(446829803)*a^(11) + (1446730461)/(13851723893)*a^(10) - (5103679383)/(13851723893)*a^(9) + (12239893017)/(13851723893)*a^(8) + (871274325)/(13851723893)*a^(7) - (5583293214)/(1978817699)*a^(6) + (23466151386)/(13851723893)*a^(5) + (30251851262)/(13851723893)*a^(4) - (10212565371)/(13851723893)*a^(3) - (2808970266)/(13851723893)*a^(2) - (23024288556)/(13851723893)*a + (8790724037)/(13851723893) , (106259643)/(1978817699)*a^(13) - (2088926254)/(13851723893)*a^(12) + (6873340)/(446829803)*a^(11) + (4799035747)/(13851723893)*a^(10) - (13928309828)/(13851723893)*a^(9) + (27562317126)/(13851723893)*a^(8) + (20728294644)/(13851723893)*a^(7) - (108237052012)/(13851723893)*a^(6) + (32722583596)/(13851723893)*a^(5) + (115149475129)/(13851723893)*a^(4) - (46074898924)/(13851723893)*a^(3) - (30518336921)/(13851723893)*a^(2) + (8058624208)/(13851723893)*a + (6991655142)/(13851723893) ], 278.626564509, [[x^2 - x - 53, 1], [x^7 - x^6 - x^5 + x^4 - x^3 - x^2 + 2*x + 1, 1]]]