/* 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^20 - 5*x^18 - 85*x^16 + 390*x^14 - 265*x^12 - 981*x^10 + 1905*x^8 - 1200*x^6 + 235*x^4 + 5*x^2 - 1, 20, 513, [14, 3], -59031562240000000000000000000000, [2, 5, 7], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, 1/2*a^10 - 1/2*a^9 - 1/2*a^8 - 1/2*a^6 - 1/2*a^5 - 1/2*a^4 - 1/2*a^2 - 1/2*a - 1/2, 1/2*a^11 - 1/2*a^8 - 1/2*a^7 - 1/2*a^4 - 1/2*a^3 - 1/2, 1/2*a^12 - 1/2*a^9 - 1/2*a^8 - 1/2*a^5 - 1/2*a^4 - 1/2*a, 1/2*a^13 - 1/2*a^8 - 1/2*a^4 - 1/2*a - 1/2, 1/2*a^14 - 1/2*a^9 - 1/2*a^5 - 1/2*a^2 - 1/2*a, 1/2*a^15 - 1/2*a^9 - 1/2*a^8 - 1/2*a^5 - 1/2*a^4 - 1/2*a^3 - 1/2*a - 1/2, 1/26*a^16 + 3/26*a^14 + 3/26*a^12 - 5/26*a^10 - 1/2*a^9 - 9/26*a^8 + 5/26*a^6 - 1/2*a^5 + 2/13*a^4 + 5/13*a^2 - 1/2*a + 6/13, 1/26*a^17 + 3/26*a^15 + 3/26*a^13 - 5/26*a^11 + 2/13*a^9 - 1/2*a^8 + 5/26*a^7 - 9/26*a^5 - 1/2*a^4 + 5/13*a^3 - 1/26*a - 1/2, 1/15546518*a^18 - 509/106483*a^16 - 1696161/7773259*a^14 - 1572912/7773259*a^12 + 702551/7773259*a^10 - 1/2*a^9 - 7290041/15546518*a^8 - 5750851/15546518*a^6 - 1/2*a^5 + 252185/1195886*a^4 + 143219/597943*a^2 - 1/2*a + 4908783/15546518, 1/15546518*a^19 - 509/106483*a^17 - 1696161/7773259*a^15 - 1572912/7773259*a^13 + 702551/7773259*a^11 + 241609/7773259*a^9 - 1/2*a^8 - 5750851/15546518*a^7 - 172879/597943*a^5 - 1/2*a^4 + 143219/597943*a^3 - 1432238/7773259*a - 1/2], 0, 1, [], 1, [ (609810)/(597943)*a^(18) - (31645)/(8191)*a^(16) - (54585512)/(597943)*a^(14) + (171491552)/(597943)*a^(12) + (41962946)/(597943)*a^(10) - (533290520)/(597943)*a^(8) + (517498240)/(597943)*a^(6) - (148619024)/(597943)*a^(4) + (8264314)/(597943)*a^(2) + (920801)/(597943) , a , (42958679)/(15546518)*a^(19) - (1084222)/(106483)*a^(17) - (1931991671)/(7773259)*a^(15) + (899066591)/(1195886)*a^(13) + (168298765)/(597943)*a^(11) - (18771169714)/(7773259)*a^(9) + (31976447973)/(15546518)*a^(7) - (2887363283)/(7773259)*a^(5) - (270714513)/(7773259)*a^(3) + (15381787)/(15546518)*a , (27103619)/(15546518)*a^(19) - (672837)/(106483)*a^(17) - (1222380015)/(7773259)*a^(15) + (556083487)/(1195886)*a^(13) + (126335819)/(597943)*a^(11) - (11838392954)/(7773259)*a^(9) + (18521493733)/(15546518)*a^(7) - (955315971)/(7773259)*a^(5) - (378150595)/(7773259)*a^(3) - (8559039)/(15546518)*a , (14220305)/(15546518)*a^(19) - (338297)/(106483)*a^(17) - (645545292)/(7773259)*a^(15) + (3601617757)/(15546518)*a^(13) + (1176007465)/(7773259)*a^(11) - (6179042782)/(7773259)*a^(9) + (7814619937)/(15546518)*a^(7) + (552333240)/(7773259)*a^(5) - (567524818)/(7773259)*a^(3) + (37697327)/(15546518)*a , (4387831)/(7773259)*a^(18) - (243276)/(106483)*a^(16) - (388967965)/(7773259)*a^(14) + (2675141927)/(15546518)*a^(12) + (56610471)/(15546518)*a^(10) - (4049918346)/(7773259)*a^(8) + (9299314931)/(15546518)*a^(6) - (1588914485)/(7773259)*a^(4) + (25313135)/(15546518)*a^(2) + (23342415)/(15546518) , (17174574)/(7773259)*a^(19) - (1716437)/(212966)*a^(17) - (3096409923)/(15546518)*a^(15) + (9236989841)/(15546518)*a^(13) + (2021171201)/(7773259)*a^(11) - (15144567937)/(7773259)*a^(9) + (11943930711)/(7773259)*a^(7) - (180539163)/(1195886)*a^(5) - (79200535)/(1195886)*a^(3) - (53348615)/(15546518)*a , (13357987)/(15546518)*a^(18) - (51887)/(16382)*a^(16) - (1199615167)/(15546518)*a^(14) + (3631012093)/(15546518)*a^(12) + (1187263295)/(15546518)*a^(10) - (5669713746)/(7773259)*a^(8) + (5223949568)/(7773259)*a^(6) - (2898340249)/(15546518)*a^(4) + (104244203)/(7773259)*a^(2) - (5517455)/(15546518) , (8388230)/(7773259)*a^(19) - (963043)/(212966)*a^(17) - (1474280497)/(15546518)*a^(15) + (2658685104)/(7773259)*a^(13) - (915479425)/(15546518)*a^(11) - (7415148662)/(7773259)*a^(9) + (20673147789)/(15546518)*a^(7) - (10803984233)/(15546518)*a^(5) + (1060142765)/(7773259)*a^(3) - (34375740)/(7773259)*a , (6229624)/(7773259)*a^(19) - (17144805)/(15546518)*a^(18) - (578255)/(212966)*a^(17) + (38278)/(8191)*a^(16) - (1135053827)/(15546518)*a^(15) + (1510795233)/(15546518)*a^(14) + (3058681673)/(15546518)*a^(13) - (5526467191)/(15546518)*a^(12) + (2347045757)/(15546518)*a^(11) + (498537417)/(15546518)*a^(10) - (5297625858)/(7773259)*a^(9) + (8291710343)/(7773259)*a^(8) + (5748090013)/(15546518)*a^(7) - (10017659238)/(7773259)*a^(6) + (1338756727)/(15546518)*a^(5) + (3630918514)/(7773259)*a^(4) - (258433895)/(7773259)*a^(3) - (240641422)/(7773259)*a^(2) - (51942367)/(15546518)*a - (42322923)/(15546518) , (103791)/(1195886)*a^(19) + (29905417)/(15546518)*a^(18) + (101561)/(212966)*a^(17) - (792256)/(106483)*a^(16) - (83195689)/(7773259)*a^(15) - (2669418883)/(15546518)*a^(14) - (374128851)/(7773259)*a^(13) + (8628125381)/(15546518)*a^(12) + (3449843223)/(15546518)*a^(11) + (764339912)/(7773259)*a^(10) + (79919166)/(7773259)*a^(9) - (13332681031)/(7773259)*a^(8) - (4801205647)/(7773259)*a^(7) + (27146774913)/(15546518)*a^(6) + (8778922533)/(15546518)*a^(5) - (4078763316)/(7773259)*a^(4) - (1725761963)/(15546518)*a^(3) + (338314567)/(15546518)*a^(2) - (52032923)/(7773259)*a + (46353091)/(15546518) , (2139586)/(7773259)*a^(19) - (315827)/(212966)*a^(18) - (133195)/(212966)*a^(17) + (1195029)/(212966)*a^(16) - (408531837)/(15546518)*a^(15) + (28301081)/(212966)*a^(14) + (624724743)/(15546518)*a^(13) - (88767935)/(212966)*a^(12) + (1102555150)/(7773259)*a^(11) - (12230074)/(106483)*a^(10) - (3418502427)/(15546518)*a^(9) + (281282611)/(212966)*a^(8) - (1191429178)/(7773259)*a^(7) - (260793627)/(212966)*a^(6) + (2445158438)/(7773259)*a^(5) + (2262164)/(8191)*a^(4) - (1394987047)/(15546518)*a^(3) + (293061)/(16382)*a^(2) - (27080629)/(7773259)*a - (246691)/(106483) , (3721244)/(7773259)*a^(19) + (11782926)/(7773259)*a^(18) - (359345)/(212966)*a^(17) - (1178501)/(212966)*a^(16) - (335523647)/(7773259)*a^(15) - (2122235391)/(15546518)*a^(14) + (1908998387)/(15546518)*a^(13) + (243743299)/(597943)*a^(12) + (414249312)/(7773259)*a^(11) + (99394021)/(597943)*a^(10) - (2886047678)/(7773259)*a^(9) - (10187290649)/(7773259)*a^(8) + (2551819837)/(7773259)*a^(7) + (8421865834)/(7773259)*a^(6) - (2149583861)/(15546518)*a^(5) - (3054715095)/(15546518)*a^(4) + (371741986)/(7773259)*a^(3) - (22306103)/(15546518)*a^(2) + (46701325)/(15546518)*a + (15349899)/(7773259) , a - 1 , a^(19) - (21174973)/(15546518)*a^(18) - 5*a^(17) + (548232)/(106483)*a^(16) - 85*a^(15) + (1896377245)/(15546518)*a^(14) + 390*a^(13) - (5939609061)/(15546518)*a^(12) - 265*a^(11) - (1535126253)/(15546518)*a^(10) - 981*a^(9) + (18509798253)/(15546518)*a^(8) + 1905*a^(7) - (8815423570)/(7773259)*a^(6) - 1200*a^(5) + (4986582191)/(15546518)*a^(4) + 235*a^(3) - (266341360)/(7773259)*a^(2) + 5*a + (40247257)/(7773259) , (44948369)/(7773259)*a^(19) + (32557632)/(7773259)*a^(18) - (4707835)/(212966)*a^(17) - (1679299)/(106483)*a^(16) - (4021322967)/(7773259)*a^(15) - (5837509241)/(15546518)*a^(14) + (12790623031)/(7773259)*a^(13) + (9093560976)/(7773259)*a^(12) + (6011605383)/(15546518)*a^(11) + (2599686664)/(7773259)*a^(10) - (40108764012)/(7773259)*a^(9) - (57441805179)/(15546518)*a^(8) + (76984914191)/(15546518)*a^(7) + (26558994418)/(7773259)*a^(6) - (20019659365)/(15546518)*a^(5) - (12633232171)/(15546518)*a^(4) + (389489389)/(15546518)*a^(3) - (266912239)/(15546518)*a^(2) + (14803934)/(7773259)*a + (79809833)/(15546518) ], 986409161.34, [[x^2 - x - 1, 1], [x^5 - 10*x^3 + 20*x - 10, 1], [x^10 - 15*x^8 + 60*x^6 - 4*x^5 - 60*x^4 + 15*x^2 - 1, 1]]]