/* 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^18 - 3*x^17 + 6*x^16 - 6*x^15 - 2*x^14 + 21*x^13 - 47*x^12 + 61*x^11 - 35*x^10 - 37*x^9 + 119*x^8 - 155*x^7 + 130*x^6 - 79*x^5 + 43*x^4 - 27*x^3 + 16*x^2 - 6*x + 1, 18, 286, [0, 9], -10839257382142572103, [7, 1511], [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, a^15, a^16, 1/491107*a^17 - 145852/491107*a^16 + 68649/491107*a^15 - 189598/491107*a^14 - 83149/491107*a^13 - 197736/491107*a^12 - 169651/491107*a^11 - 15221/491107*a^10 + 163954/491107*a^9 - 36046/491107*a^8 - 27262/491107*a^7 + 133011/491107*a^6 + 187505/491107*a^5 - 123529/491107*a^4 - 170238/491107*a^3 + 145436/491107*a^2 + 198396/491107*a + 166230/491107], 0, 1, [], 0, [ (1909610)/(491107)*a^(17) - (3835880)/(491107)*a^(16) + (7027557)/(491107)*a^(15) - (3352026)/(491107)*a^(14) - (9233218)/(491107)*a^(13) + (31700299)/(491107)*a^(12) - (55168725)/(491107)*a^(11) + (52051327)/(491107)*a^(10) + (1101049)/(491107)*a^(9) - (83733130)/(491107)*a^(8) + (141448531)/(491107)*a^(7) - (129092510)/(491107)*a^(6) + (78797540)/(491107)*a^(5) - (37585833)/(491107)*a^(4) + (25137927)/(491107)*a^(3) - (18050569)/(491107)*a^(2) + (6276978)/(491107)*a - (396862)/(491107) , (1242572)/(491107)*a^(17) - (3797311)/(491107)*a^(16) + (7334789)/(491107)*a^(15) - (7102584)/(491107)*a^(14) - (3457424)/(491107)*a^(13) + (27117100)/(491107)*a^(12) - (58273211)/(491107)*a^(11) + (73008208)/(491107)*a^(10) - (36626826)/(491107)*a^(9) - (54813682)/(491107)*a^(8) + (151841738)/(491107)*a^(7) - (185079506)/(491107)*a^(6) + (143338699)/(491107)*a^(5) - (79216393)/(491107)*a^(4) + (41816748)/(491107)*a^(3) - (28390032)/(491107)*a^(2) + (16540253)/(491107)*a - (4405105)/(491107) , (766488)/(491107)*a^(17) + (807490)/(491107)*a^(16) - (1515910)/(491107)*a^(15) + (6738258)/(491107)*a^(14) - (6666392)/(491107)*a^(13) + (1206744)/(491107)*a^(12) + (15080089)/(491107)*a^(11) - (41720051)/(491107)*a^(10) + (55880627)/(491107)*a^(9) - (25666406)/(491107)*a^(8) - (44083743)/(491107)*a^(7) + (108021243)/(491107)*a^(6) - (106245794)/(491107)*a^(5) + (64795144)/(491107)*a^(4) - (25756236)/(491107)*a^(3) + (18215118)/(491107)*a^(2) - (15406977)/(491107)*a + (5411230)/(491107) , (937932)/(491107)*a^(17) + (3016749)/(491107)*a^(16) - (5364865)/(491107)*a^(15) + (15037681)/(491107)*a^(14) - (10138408)/(491107)*a^(13) - (8149970)/(491107)*a^(12) + (49623610)/(491107)*a^(11) - (102423845)/(491107)*a^(10) + (112778363)/(491107)*a^(9) - (22990807)/(491107)*a^(8) - (137926189)/(491107)*a^(7) + (262595394)/(491107)*a^(6) - (240592791)/(491107)*a^(5) + (144055763)/(491107)*a^(4) - (60419495)/(491107)*a^(3) + (44379876)/(491107)*a^(2) - (33353825)/(491107)*a + (11010317)/(491107) , (839680)/(491107)*a^(17) - (7548054)/(491107)*a^(16) + (14241405)/(491107)*a^(15) - (22083372)/(491107)*a^(14) + (4094298)/(491107)*a^(13) + (42689710)/(491107)*a^(12) - (118938726)/(491107)*a^(11) + (182982199)/(491107)*a^(10) - (144078299)/(491107)*a^(9) - (53220426)/(491107)*a^(8) + (317378446)/(491107)*a^(7) - (466938003)/(491107)*a^(6) + (392108656)/(491107)*a^(5) - (225503791)/(491107)*a^(4) + (105676441)/(491107)*a^(3) - (75087725)/(491107)*a^(2) + (50349617)/(491107)*a - (15193922)/(491107) , (3959084)/(491107)*a^(17) - (12915499)/(491107)*a^(16) + (24259140)/(491107)*a^(15) - (24505004)/(491107)*a^(14) - (11728914)/(491107)*a^(13) + (90463177)/(491107)*a^(12) - (195531720)/(491107)*a^(11) + (245620371)/(491107)*a^(10) - (123027082)/(491107)*a^(9) - (186943822)/(491107)*a^(8) + (512717518)/(491107)*a^(7) - (620795749)/(491107)*a^(6) + (472480187)/(491107)*a^(5) - (257488159)/(491107)*a^(4) + (132954879)/(491107)*a^(3) - (93951893)/(491107)*a^(2) + (54228481)/(491107)*a - (13957380)/(491107) , (2097275)/(491107)*a^(17) - (7722778)/(491107)*a^(16) + (14689923)/(491107)*a^(15) - (16327328)/(491107)*a^(14) - (4536522)/(491107)*a^(13) + (52245273)/(491107)*a^(12) - (118591847)/(491107)*a^(11) + (156486465)/(491107)*a^(10) - (90162100)/(491107)*a^(9) - (99022219)/(491107)*a^(8) + (311601049)/(491107)*a^(7) - (396731999)/(491107)*a^(6) + (311891533)/(491107)*a^(5) - (173477429)/(491107)*a^(4) + (88269024)/(491107)*a^(3) - (62274784)/(491107)*a^(2) + (37398175)/(491107)*a - (10273799)/(491107) , (1193413)/(491107)*a^(17) - (4021043)/(491107)*a^(16) + (7505902)/(491107)*a^(15) - (7865362)/(491107)*a^(14) - (3419294)/(491107)*a^(13) + (27631380)/(491107)*a^(12) - (60834311)/(491107)*a^(11) + (77230242)/(491107)*a^(10) - (40322284)/(491107)*a^(9) - (55724638)/(491107)*a^(8) + (158658891)/(491107)*a^(7) - (194990797)/(491107)*a^(6) + (150734292)/(491107)*a^(5) - (84594514)/(491107)*a^(4) + (44538845)/(491107)*a^(3) - (30798185)/(491107)*a^(2) + (16976309)/(491107)*a - (4085195)/(491107) ], 524.185517787, [[x^2 - x + 2, 1], [x^3 - x^2 - 2*x + 1, 1], [x^6 - x^5 + x^4 - x^3 + x^2 - x + 1, 1], [x^9 - 2*x^8 + x^7 + 5*x^6 - 9*x^5 + 5*x^4 + 4*x^3 - 7*x^2 + 4*x - 1, 1]]]