/* 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 - 17*x^15 + 17*x^14 + 112*x^13 - 115*x^12 - 356*x^11 + 389*x^10 + 547*x^9 - 675*x^8 - 342*x^7 + 560*x^6 + 27*x^5 - 205*x^4 + 42*x^3 + 24*x^2 - 10*x + 1, 17, 10, [13, 2], 2232673506822932495146063557, [3, 205542871, 402308340646912121], [1, a, a^2, a^3, a^4, a^5, a^6, a^7, a^8, a^9, a^10, a^11, a^12, a^13, a^14, 1/3*a^15 - 1/3*a^12 + 1/3*a^9 - 1/3*a^4 - 1/3*a^3 - 1/3*a^2 + 1/3, 1/21*a^16 - 1/7*a^15 + 1/7*a^14 - 10/21*a^13 + 2/7*a^12 + 2/7*a^11 + 10/21*a^10 - 3/7*a^9 - 3/7*a^8 - 2/7*a^7 + 2/7*a^6 + 2/21*a^5 + 2/21*a^4 + 8/21*a^3 - 3/7*a^2 + 1/3*a - 1/7], 0, 1, [], 1, [ a , a - 1 , (101)/(21)*a^(16) - (58)/(21)*a^(15) - (578)/(7)*a^(14) + (964)/(21)*a^(13) + (11596)/(21)*a^(12) - (2143)/(7)*a^(11) - (37903)/(21)*a^(10) + (21512)/(21)*a^(9) + (20711)/(7)*a^(8) - (12158)/(7)*a^(7) - (15786)/(7)*a^(6) + (28195)/(21)*a^(5) + (14405)/(21)*a^(4) - (9118)/(21)*a^(3) - (776)/(21)*a^(2) + (140)/(3)*a - (142)/(21) , (80)/(21)*a^(16) - (37)/(21)*a^(15) - (459)/(7)*a^(14) + (607)/(21)*a^(13) + (9244)/(21)*a^(12) - (1338)/(7)*a^(11) - (30427)/(21)*a^(10) + (13343)/(21)*a^(9) + (16882)/(7)*a^(8) - (7433)/(7)*a^(7) - (13392)/(7)*a^(6) + (16435)/(21)*a^(5) + (13838)/(21)*a^(4) - (4813)/(21)*a^(3) - (1637)/(21)*a^(2) + (68)/(3)*a + (5)/(21) , (239)/(21)*a^(16) - (122)/(21)*a^(15) - (1392)/(7)*a^(14) + (2083)/(21)*a^(13) + (28664)/(21)*a^(12) - (4842)/(7)*a^(11) - (97675)/(21)*a^(10) + (52183)/(21)*a^(9) + (57376)/(7)*a^(8) - (33175)/(7)*a^(7) - (50027)/(7)*a^(6) + (95377)/(21)*a^(5) + (19260)/(7)*a^(4) - (14499)/(7)*a^(3) - (5686)/(21)*a^(2) + (1055)/(3)*a - (1004)/(21) , (23)/(21)*a^(16) + (12)/(7)*a^(15) - (145)/(7)*a^(14) - (608)/(21)*a^(13) + (1103)/(7)*a^(12) + (1299)/(7)*a^(11) - (13042)/(21)*a^(10) - (3898)/(7)*a^(9) + (9507)/(7)*a^(8) + (5365)/(7)*a^(7) - (11322)/(7)*a^(6) - (7829)/(21)*a^(5) + (19450)/(21)*a^(4) - (404)/(21)*a^(3) - (1399)/(7)*a^(2) + (95)/(3)*a + (26)/(7) , (34)/(21)*a^(16) - (11)/(21)*a^(15) - (204)/(7)*a^(14) + (206)/(21)*a^(13) + (4376)/(21)*a^(12) - (548)/(7)*a^(11) - (15809)/(21)*a^(10) + (6988)/(21)*a^(9) + (10104)/(7)*a^(8) - (5395)/(7)*a^(7) - (9844)/(7)*a^(6) + (19115)/(21)*a^(5) + (12346)/(21)*a^(4) - (9983)/(21)*a^(3) - (1153)/(21)*a^(2) + (250)/(3)*a - (242)/(21) , (39)/(7)*a^(16) - (113)/(21)*a^(15) - (660)/(7)*a^(14) + (632)/(7)*a^(13) + (12959)/(21)*a^(12) - (4197)/(7)*a^(11) - (13596)/(7)*a^(10) + (41395)/(21)*a^(9) + (20600)/(7)*a^(8) - (22781)/(7)*a^(7) - (12821)/(7)*a^(6) + (17109)/(7)*a^(5) + (5477)/(21)*a^(4) - (15724)/(21)*a^(3) + (1733)/(21)*a^(2) + 67*a - (281)/(21) , (83)/(21)*a^(16) - (109)/(21)*a^(15) - (470)/(7)*a^(14) + (1858)/(21)*a^(13) + (9283)/(21)*a^(12) - (4181)/(7)*a^(11) - (29431)/(21)*a^(10) + (42191)/(21)*a^(9) + (14920)/(7)*a^(8) - (24281)/(7)*a^(7) - (8948)/(7)*a^(6) + (60751)/(21)*a^(5) + (1034)/(21)*a^(4) - (22849)/(21)*a^(3) + (3712)/(21)*a^(2) + (443)/(3)*a - (781)/(21) , (179)/(21)*a^(16) - (61)/(21)*a^(15) - (1032)/(7)*a^(14) + (1003)/(21)*a^(13) + (20926)/(21)*a^(12) - (2267)/(7)*a^(11) - (69631)/(21)*a^(10) + (23792)/(21)*a^(9) + (39377)/(7)*a^(8) - (14400)/(7)*a^(7) - (32283)/(7)*a^(6) + (36919)/(21)*a^(5) + (34280)/(21)*a^(4) - (14500)/(21)*a^(3) - (3368)/(21)*a^(2) + (317)/(3)*a - (271)/(21) , (136)/(21)*a^(16) - (38)/(7)*a^(15) - (767)/(7)*a^(14) + (1916)/(21)*a^(13) + (5018)/(7)*a^(12) - (4271)/(7)*a^(11) - (47402)/(21)*a^(10) + (14229)/(7)*a^(9) + (24050)/(7)*a^(8) - (24002)/(7)*a^(7) - (15317)/(7)*a^(6) + (56195)/(21)*a^(5) + (7706)/(21)*a^(4) - (18862)/(21)*a^(3) + (530)/(7)*a^(2) + (310)/(3)*a - (129)/(7) , (10)/(21)*a^(16) - (23)/(21)*a^(15) - (60)/(7)*a^(14) + (404)/(21)*a^(13) + (1292)/(21)*a^(12) - (939)/(7)*a^(11) - (4667)/(21)*a^(10) + (9892)/(21)*a^(9) + (2917)/(7)*a^(8) - (6117)/(7)*a^(7) - (2598)/(7)*a^(6) + (17429)/(21)*a^(5) + (2281)/(21)*a^(4) - (7781)/(21)*a^(3) + (575)/(21)*a^(2) + (187)/(3)*a - (275)/(21) , (53)/(21)*a^(16) - (26)/(21)*a^(15) - (297)/(7)*a^(14) + (415)/(21)*a^(13) + (5771)/(21)*a^(12) - (874)/(7)*a^(11) - (17908)/(21)*a^(10) + (8035)/(21)*a^(9) + (8920)/(7)*a^(8) - (3753)/(7)*a^(7) - (5683)/(7)*a^(6) + (4495)/(21)*a^(5) + (1377)/(7)*a^(4) + (461)/(7)*a^(3) - (841)/(21)*a^(2) - (121)/(3)*a + (268)/(21) , (14)/(3)*a^(16) - (2)/(3)*a^(15) - 79*a^(14) + (28)/(3)*a^(13) + (1550)/(3)*a^(12) - 56*a^(11) - (4891)/(3)*a^(10) + (529)/(3)*a^(9) + 2522*a^(8) - 251*a^(7) - 1737*a^(6) + (187)/(3)*a^(5) + 452*a^(4) + 33*a^(3) - (97)/(3)*a^(2) - (40)/(3)*a + (10)/(3) ], 129255854.893, []]