/* 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^17 - x^16 + 4*x^15 - 18*x^14 + 11*x^13 + 14*x^12 + 21*x^11 - 62*x^10 + 14*x^9 + 50*x^8 + 54*x^7 - 121*x^6 - 7*x^5 + 36*x^4 + 64*x^3 - 23*x^2 + 43*x + 1, 17, 2, [1, 8], 930227631978098127294721, [991], [1, a, a^2, a^3, a^4, a^5, a^6, 1/3*a^7 - 1/3*a^6 + 1/3*a^5 - 1/3*a^4 + 1/3*a^3 - 1/3*a^2 + 1/3*a - 1/3, 1/3*a^8 - 1/3, 1/3*a^9 - 1/3*a, 1/3*a^10 - 1/3*a^2, 1/3*a^11 - 1/3*a^3, 1/9*a^12 + 1/9*a^11 - 1/9*a^10 + 1/9*a^9 - 1/9*a^7 + 1/9*a^6 - 1/9*a^5 - 2/9*a^3 + 2/9*a^2 - 2/9*a + 1/9, 1/63*a^13 - 1/63*a^12 + 1/7*a^11 - 2/21*a^10 - 5/63*a^9 - 1/63*a^8 + 1/7*a^7 + 17/63*a^5 - 26/63*a^4 + 1/7*a^3 + 8/21*a^2 - 4/63*a - 17/63, 1/63*a^14 + 1/63*a^12 - 4/63*a^11 - 4/63*a^10 + 8/63*a^9 + 8/63*a^8 - 5/63*a^7 + 31/63*a^6 - 23/63*a^5 + 4/63*a^4 + 26/63*a^3 + 3/7*a^2 + 2/9*a - 1/21, 1/63*a^15 - 1/21*a^12 + 8/63*a^11 - 1/9*a^10 - 8/63*a^9 - 4/63*a^8 + 1/63*a^7 - 2/63*a^6 + 29/63*a^5 + 10/63*a^4 - 8/21*a^3 - 31/63*a^2 + 1/63*a - 25/63, 1/929061441*a^16 + 674213/309687147*a^15 + 106045/929061441*a^14 - 4358033/929061441*a^13 + 13622674/309687147*a^12 - 13836964/929061441*a^11 - 2470456/132723063*a^10 - 10593104/103229049*a^9 + 18158150/929061441*a^8 + 23823571/929061441*a^7 + 28153693/929061441*a^6 - 26253538/103229049*a^5 - 80177674/929061441*a^4 + 523508/3428271*a^3 + 42304928/309687147*a^2 - 252479222/929061441*a - 25772827/929061441], 0, 1, [], 0, [ (5058764)/(309687147)*a^(16) - (5063015)/(309687147)*a^(15) + (29333086)/(309687147)*a^(14) - (94529168)/(309687147)*a^(13) + (32909749)/(103229049)*a^(12) - (72119429)/(309687147)*a^(11) + (150513775)/(309687147)*a^(10) - (304282733)/(309687147)*a^(9) + (43037576)/(44241021)*a^(8) - (12053269)/(309687147)*a^(7) + (365183384)/(309687147)*a^(6) - (351135787)/(309687147)*a^(5) + (46394085)/(34409683)*a^(4) - (44446)/(1142757)*a^(3) + (339896507)/(309687147)*a^(2) - (82353247)/(309687147)*a + (190036100)/(309687147) , (29624603)/(929061441)*a^(16) - (9577340)/(309687147)*a^(15) + (133593995)/(929061441)*a^(14) - (540316552)/(929061441)*a^(13) + (39523760)/(103229049)*a^(12) + (157692991)/(929061441)*a^(11) + (645882172)/(929061441)*a^(10) - (446925742)/(309687147)*a^(9) + (776504149)/(929061441)*a^(8) + (819813956)/(929061441)*a^(7) + (151833074)/(132723063)*a^(6) - (140345330)/(44241021)*a^(5) + (318146140)/(929061441)*a^(4) + (581197)/(3428271)*a^(3) + (609613525)/(309687147)*a^(2) + (245899793)/(929061441)*a + (1108740004)/(929061441) , (12783010)/(929061441)*a^(16) - (3803824)/(309687147)*a^(15) + (6308431)/(132723063)*a^(14) - (220330004)/(929061441)*a^(13) + (33714518)/(309687147)*a^(12) + (280972655)/(929061441)*a^(11) + (269820878)/(929061441)*a^(10) - (336249202)/(309687147)*a^(9) + (61167515)/(929061441)*a^(8) + (1061596873)/(929061441)*a^(7) + (1431892195)/(929061441)*a^(6) - (770622560)/(309687147)*a^(5) - (1407472771)/(929061441)*a^(4) + (223826)/(489753)*a^(3) + (540222044)/(309687147)*a^(2) + (604388467)/(929061441)*a + (482010887)/(929061441) , (1203424)/(132723063)*a^(16) + (4437260)/(309687147)*a^(15) - (9756479)/(929061441)*a^(14) - (38199815)/(929061441)*a^(13) - (43041428)/(103229049)*a^(12) + (737860052)/(929061441)*a^(11) + (231032273)/(929061441)*a^(10) - (185272165)/(309687147)*a^(9) - (909063895)/(929061441)*a^(8) + (1022166646)/(929061441)*a^(7) + (1876360606)/(929061441)*a^(6) - (90908099)/(44241021)*a^(5) - (1209996418)/(929061441)*a^(4) + (320543)/(489753)*a^(3) + (217807222)/(103229049)*a^(2) - (1068931244)/(929061441)*a + (119092682)/(132723063) , (332137)/(9577953)*a^(16) - (20051)/(456093)*a^(15) + (194083)/(1368279)*a^(14) - (6197504)/(9577953)*a^(13) + (1611772)/(3192651)*a^(12) + (5208605)/(9577953)*a^(11) + (2960759)/(9577953)*a^(10) - (734684)/(354739)*a^(9) + (6553445)/(9577953)*a^(8) + (24835168)/(9577953)*a^(7) + (1049014)/(9577953)*a^(6) - (1520390)/(354739)*a^(5) + (1428857)/(1368279)*a^(4) + (9155)/(5049)*a^(3) + (845995)/(3192651)*a^(2) + (4711711)/(9577953)*a + (6047747)/(9577953) , (213931)/(54650673)*a^(16) + (79819)/(18216891)*a^(15) + (211303)/(54650673)*a^(14) - (2165531)/(54650673)*a^(13) - (2528969)/(18216891)*a^(12) + (11169626)/(54650673)*a^(11) + (1319156)/(7807239)*a^(10) + (559793)/(2602413)*a^(9) - (6120292)/(7807239)*a^(8) + (917032)/(54650673)*a^(7) + (34953742)/(54650673)*a^(6) + (2923507)/(2602413)*a^(5) - (142905745)/(54650673)*a^(4) - (154276)/(201663)*a^(3) + (7777292)/(6072297)*a^(2) + (108120511)/(54650673)*a - (55531276)/(54650673) , (3007804)/(309687147)*a^(16) - (1275764)/(44241021)*a^(15) + (19223453)/(309687147)*a^(14) - (84447512)/(309687147)*a^(13) + (16558620)/(34409683)*a^(12) - (64222747)/(309687147)*a^(11) + (10544839)/(44241021)*a^(10) - (317701282)/(309687147)*a^(9) + (28002066)/(34409683)*a^(8) + (40314664)/(309687147)*a^(7) + (8548031)/(44241021)*a^(6) - (523474739)/(309687147)*a^(5) + (266495002)/(309687147)*a^(4) + (27879)/(126973)*a^(3) + (67155796)/(103229049)*a^(2) - (96733708)/(103229049)*a - (20855612)/(103229049) , a ], 323467.453718, []]