/* 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 - 2*x^16 + 4*x^15 - 18*x^14 + 10*x^13 - 16*x^12 + 44*x^11 + 10*x^10 + 72*x^9 + 18*x^8 + 134*x^7 + 88*x^6 + 275*x^5 + 200*x^4 + 220*x^3 + 240*x^2 + 80*x + 64, 17, 2, [1, 8], 2007233999721653909999521, [1091], [1, a, a^2, a^3, 1/2*a^4 - 1/2*a, 1/2*a^5 - 1/2*a^2, 1/2*a^6 - 1/2*a^3, 1/4*a^7 - 1/4*a^6 - 1/4*a^5 - 1/4*a^4 - 1/4*a^3 - 1/4*a^2 - 1/2*a, 1/4*a^8 - 1/4*a^2, 1/4*a^9 - 1/4*a^3, 1/4*a^10 - 1/4*a^4, 1/16*a^11 + 1/16*a^10 - 1/16*a^9 - 1/8*a^7 - 1/8*a^6 - 3/16*a^5 + 1/16*a^4 + 7/16*a^3 + 3/8*a^2 + 1/4*a, 1/16*a^12 - 1/8*a^10 + 1/16*a^9 - 1/8*a^8 - 1/16*a^6 - 1/4*a^5 - 1/8*a^4 - 1/16*a^3 + 3/8*a^2 + 1/4*a, 1/16*a^13 - 1/16*a^10 - 1/16*a^7 - 1/4*a^6 - 1/4*a^5 + 1/16*a^4 + 1/4*a^3 + 1/4*a^2, 1/32*a^14 - 1/32*a^12 - 1/32*a^10 + 1/16*a^9 + 1/32*a^8 + 1/16*a^7 + 3/32*a^6 + 1/16*a^5 - 5/32*a^4 + 1/4*a, 1/32*a^15 - 1/32*a^13 - 1/32*a^11 + 1/16*a^10 + 1/32*a^9 + 1/16*a^8 + 3/32*a^7 + 1/16*a^6 - 5/32*a^5 + 1/4*a^2, 1/8286671488*a^16 - 68849395/8286671488*a^15 + 120169979/8286671488*a^14 - 31185489/8286671488*a^13 - 231372529/8286671488*a^12 - 155375939/8286671488*a^11 + 626061315/8286671488*a^10 + 5191329/123681664*a^9 - 370481855/8286671488*a^8 + 21699013/8286671488*a^7 + 508174493/8286671488*a^6 + 100883231/487451264*a^5 - 61534825/258958484*a^4 + 612237787/2071667872*a^3 - 15242284/64739621*a^2 + 225047811/517916968*a - 42857061/129479242], 0, 1, [], 1, [ (27638595)/(2071667872)*a^(16) - (59758569)/(2071667872)*a^(15) + (114372541)/(2071667872)*a^(14) - (503032675)/(2071667872)*a^(13) + (334125613)/(2071667872)*a^(12) - (406806641)/(2071667872)*a^(11) + (1238202533)/(2071667872)*a^(10) + (1409071)/(30920416)*a^(9) + (1958013207)/(2071667872)*a^(8) - (7560353)/(2071667872)*a^(7) + (3443761159)/(2071667872)*a^(6) + (87982853)/(121862816)*a^(5) + (1789572533)/(517916968)*a^(4) + (120955080)/(64739621)*a^(3) + (122601464)/(64739621)*a^(2) + (114222595)/(64739621)*a + (18608725)/(64739621) , (74996645)/(8286671488)*a^(16) - (205870467)/(8286671488)*a^(15) + (363052387)/(8286671488)*a^(14) - (1487967265)/(8286671488)*a^(13) + (1598759023)/(8286671488)*a^(12) - (974199819)/(8286671488)*a^(11) + (3897530875)/(8286671488)*a^(10) - (22599039)/(123681664)*a^(9) + (2849665209)/(8286671488)*a^(8) - (3311805323)/(8286671488)*a^(7) + (8005073533)/(8286671488)*a^(6) + (98372871)/(487451264)*a^(5) + (2892843841)/(2071667872)*a^(4) - (706562537)/(2071667872)*a^(3) - (35088549)/(129479242)*a^(2) + (155291909)/(517916968)*a - (57018825)/(129479242) , (2943)/(16474496)*a^(16) + (175443)/(16474496)*a^(15) - (331575)/(16474496)*a^(14) + (523089)/(16474496)*a^(13) - (2910035)/(16474496)*a^(12) + (900435)/(16474496)*a^(11) - (430519)/(16474496)*a^(10) + (91623)/(245888)*a^(9) + (5013987)/(16474496)*a^(8) + (8137731)/(16474496)*a^(7) + (3300847)/(16474496)*a^(6) + (1130201)/(969088)*a^(5) + (5287503)/(4118624)*a^(4) + (7902041)/(4118624)*a^(3) + (1221713)/(514828)*a^(2) + (1069403)/(1029656)*a + (410853)/(257414) , (51006195)/(8286671488)*a^(16) - (84014117)/(8286671488)*a^(15) + (206234617)/(8286671488)*a^(14) - (904092839)/(8286671488)*a^(13) + (310716933)/(8286671488)*a^(12) - (1332582669)/(8286671488)*a^(11) + (2042321881)/(8286671488)*a^(10) + (7832479)/(123681664)*a^(9) + (6201114547)/(8286671488)*a^(8) + (4591316475)/(8286671488)*a^(7) + (13197412471)/(8286671488)*a^(6) + (511090041)/(487451264)*a^(5) + (2063680363)/(1035833936)*a^(4) + (610088117)/(2071667872)*a^(3) + (244385619)/(258958484)*a^(2) + (10682897)/(517916968)*a + (32284239)/(129479242) , (63150545)/(4143335744)*a^(16) + (4481207)/(4143335744)*a^(15) - (71206375)/(4143335744)*a^(14) - (708225295)/(4143335744)*a^(13) - (1434825827)/(4143335744)*a^(12) + (662249911)/(4143335744)*a^(11) + (3615040137)/(4143335744)*a^(10) + (66601915)/(61840832)*a^(9) + (2621739563)/(4143335744)*a^(8) + (2761000251)/(4143335744)*a^(7) + (10252795383)/(4143335744)*a^(6) + (955589709)/(243725632)*a^(5) + (8820575161)/(2071667872)*a^(4) + (5781445111)/(1035833936)*a^(3) + (356048950)/(64739621)*a^(2) + (306534399)/(129479242)*a + (88535823)/(64739621) , (3099)/(15232852)*a^(16) - (778193)/(121862816)*a^(15) + (1500569)/(121862816)*a^(14) - (3431815)/(121862816)*a^(13) + (13064755)/(121862816)*a^(12) - (8090567)/(121862816)*a^(11) + (14644221)/(121862816)*a^(10) - (472633)/(1818848)*a^(9) + (8511623)/(121862816)*a^(8) - (50977705)/(121862816)*a^(7) + (469325)/(121862816)*a^(6) - (97581585)/(121862816)*a^(5) - (74389117)/(121862816)*a^(4) - (42872641)/(30465704)*a^(3) - (13169777)/(15232852)*a^(2) - (13181633)/(15232852)*a - (3576494)/(3808213) , (67814601)/(8286671488)*a^(16) - (234095699)/(8286671488)*a^(15) + (444375935)/(8286671488)*a^(14) - (1457245705)/(8286671488)*a^(13) + (2013105723)/(8286671488)*a^(12) - (731979019)/(8286671488)*a^(11) + (1138003775)/(8286671488)*a^(10) + (22149825)/(123681664)*a^(9) - (5003388539)/(8286671488)*a^(8) + (6808792053)/(8286671488)*a^(7) - (2569440695)/(8286671488)*a^(6) + (264565311)/(487451264)*a^(5) + (1248537237)/(2071667872)*a^(4) - (2948667503)/(2071667872)*a^(3) + (477137409)/(517916968)*a^(2) - (411165849)/(517916968)*a - (50269591)/(129479242) , (97026975)/(8286671488)*a^(16) - (358034209)/(8286671488)*a^(15) + (541845141)/(8286671488)*a^(14) - (1921291211)/(8286671488)*a^(13) + (3189896617)/(8286671488)*a^(12) + (11706927)/(8286671488)*a^(11) + (3429878237)/(8286671488)*a^(10) - (88858701)/(123681664)*a^(9) - (2669839113)/(8286671488)*a^(8) - (5809955937)/(8286671488)*a^(7) + (9331308083)/(8286671488)*a^(6) - (234659075)/(487451264)*a^(5) - (409691155)/(1035833936)*a^(4) - (6765012675)/(2071667872)*a^(3) - (382921001)/(129479242)*a^(2) + (342505529)/(517916968)*a - (1331749)/(129479242) ], 1757145.67579, []]