/* 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 + 9*x^16 - 9*x^15 + 36*x^14 - 63*x^13 + 109*x^12 - 189*x^11 + 252*x^10 - 335*x^9 + 378*x^8 - 378*x^7 + 334*x^6 - 243*x^5 + 147*x^4 - 67*x^3 + 21*x^2 - 3*x + 1, 18, 57, [0, 9], -1548507685660102467, [3, 23], [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, 1/1153182335*a^17 - 394336921/1153182335*a^16 - 85928896/230636467*a^15 - 97238009/1153182335*a^14 - 49031889/230636467*a^13 - 138175543/1153182335*a^12 + 462712092/1153182335*a^11 - 279666761/1153182335*a^10 - 280014797/1153182335*a^9 - 524613583/1153182335*a^8 + 63869246/1153182335*a^7 - 17051817/67834255*a^6 - 77106787/1153182335*a^5 - 214113886/1153182335*a^4 + 560320823/1153182335*a^3 - 96385234/230636467*a^2 - 142185499/1153182335*a + 564604746/1153182335], 0, 1, [], 0, [ (7787269)/(67834255)*a^(17) - (775114)/(67834255)*a^(16) + (14561708)/(13566851)*a^(15) - (75084051)/(67834255)*a^(14) + (63477544)/(13566851)*a^(13) - (513110897)/(67834255)*a^(12) + (1040788863)/(67834255)*a^(11) - (1598219739)/(67834255)*a^(10) + (2471706147)/(67834255)*a^(9) - (3126190612)/(67834255)*a^(8) + (3731901739)/(67834255)*a^(7) - (3993706766)/(67834255)*a^(6) + (3491474512)/(67834255)*a^(5) - (2883271559)/(67834255)*a^(4) + (1815929392)/(67834255)*a^(3) - (178925970)/(13566851)*a^(2) + (312293934)/(67834255)*a - (27417146)/(67834255) , (113222024)/(1153182335)*a^(17) + (55131366)/(1153182335)*a^(16) + (193757382)/(230636467)*a^(15) - (543260141)/(1153182335)*a^(14) + (622325566)/(230636467)*a^(13) - (4879861732)/(1153182335)*a^(12) + (7328683703)/(1153182335)*a^(11) - (12523178434)/(1153182335)*a^(10) + (15206422027)/(1153182335)*a^(9) - (15405478787)/(1153182335)*a^(8) + (17985332554)/(1153182335)*a^(7) - (666095633)/(67834255)*a^(6) + (5748851982)/(1153182335)*a^(5) - (2073417299)/(1153182335)*a^(4) - (4448509843)/(1153182335)*a^(3) + (793439782)/(230636467)*a^(2) - (1950402161)/(1153182335)*a + (340926974)/(1153182335) , (178802317)/(1153182335)*a^(17) + (50157738)/(1153182335)*a^(16) + (295167334)/(230636467)*a^(15) - (1158575403)/(1153182335)*a^(14) + (987272678)/(230636467)*a^(13) - (8311404001)/(1153182335)*a^(12) + (12673519399)/(1153182335)*a^(11) - (21722715152)/(1153182335)*a^(10) + (25092904776)/(1153182335)*a^(9) - (31254712571)/(1153182335)*a^(8) + (29876349352)/(1153182335)*a^(7) - (1475263934)/(67834255)*a^(6) + (17684984381)/(1153182335)*a^(5) - (6013754842)/(1153182335)*a^(4) + (1025853856)/(1153182335)*a^(3) + (220696501)/(230636467)*a^(2) - (2005756463)/(1153182335)*a + (388091067)/(1153182335) , (26858599)/(1153182335)*a^(17) + (192380726)/(1153182335)*a^(16) + (8888358)/(230636467)*a^(15) + (1074178204)/(1153182335)*a^(14) - (537387521)/(230636467)*a^(13) + (3331740458)/(1153182335)*a^(12) - (14050528177)/(1153182335)*a^(11) + (14856338311)/(1153182335)*a^(10) - (32487491478)/(1153182335)*a^(9) + (41195931338)/(1153182335)*a^(8) - (49412987666)/(1153182335)*a^(7) + (3401221482)/(67834255)*a^(6) - (49307725013)/(1153182335)*a^(5) + (41730658171)/(1153182335)*a^(4) - (23852906973)/(1153182335)*a^(3) + (2061584994)/(230636467)*a^(2) - (2770205536)/(1153182335)*a + (613268979)/(1153182335) , (335539153)/(1153182335)*a^(17) + (415907127)/(1153182335)*a^(16) + (617166644)/(230636467)*a^(15) + (449056538)/(1153182335)*a^(14) + (1751882503)/(230636467)*a^(13) - (9039130324)/(1153182335)*a^(12) + (13975578746)/(1153182335)*a^(11) - (28814422013)/(1153182335)*a^(10) + (24996012669)/(1153182335)*a^(9) - (34483388644)/(1153182335)*a^(8) + (34033375843)/(1153182335)*a^(7) - (1312022291)/(67834255)*a^(6) + (16964605959)/(1153182335)*a^(5) - (6132877753)/(1153182335)*a^(4) - (2344263796)/(1153182335)*a^(3) + (486836096)/(230636467)*a^(2) - (3113200302)/(1153182335)*a + (1680560288)/(1153182335) , (7717972)/(67834255)*a^(17) + (13555223)/(67834255)*a^(16) + (16262261)/(13566851)*a^(15) + (47173707)/(67834255)*a^(14) + (49157180)/(13566851)*a^(13) - (167600876)/(67834255)*a^(12) + (308768684)/(67834255)*a^(11) - (895490907)/(67834255)*a^(10) + (497754946)/(67834255)*a^(9) - (1423818216)/(67834255)*a^(8) + (1188695972)/(67834255)*a^(7) - (1297973193)/(67834255)*a^(6) + (1421199251)/(67834255)*a^(5) - (920550427)/(67834255)*a^(4) + (845243156)/(67834255)*a^(3) - (67781282)/(13566851)*a^(2) + (211776622)/(67834255)*a - (901808)/(67834255) , (94166316)/(1153182335)*a^(17) + (237634764)/(1153182335)*a^(16) + (258123870)/(230636467)*a^(15) + (1727320226)/(1153182335)*a^(14) + (1055059070)/(230636467)*a^(13) + (2443434597)/(1153182335)*a^(12) + (7905724342)/(1153182335)*a^(11) - (5121191536)/(1153182335)*a^(10) + (4278272468)/(1153182335)*a^(9) - (13311177608)/(1153182335)*a^(8) + (2541094371)/(1153182335)*a^(7) - (374200542)/(67834255)*a^(6) + (588237258)/(1153182335)*a^(5) + (3665657139)/(1153182335)*a^(4) - (4964064202)/(1153182335)*a^(3) + (1171730599)/(230636467)*a^(2) - (3469817434)/(1153182335)*a + (417084781)/(1153182335) , (305725712)/(1153182335)*a^(17) + (412187843)/(1153182335)*a^(16) + (616491220)/(230636467)*a^(15) + (1183190987)/(1153182335)*a^(14) + (2097113568)/(230636467)*a^(13) - (5066018986)/(1153182335)*a^(12) + (19483233154)/(1153182335)*a^(11) - (24589697202)/(1153182335)*a^(10) + (29036839026)/(1153182335)*a^(9) - (40044302106)/(1153182335)*a^(8) + (34383968397)/(1153182335)*a^(7) - (1960080519)/(67834255)*a^(6) + (21977459606)/(1153182335)*a^(5) - (13295745582)/(1153182335)*a^(4) + (3183462736)/(1153182335)*a^(3) - (339693754)/(230636467)*a^(2) - (1272504488)/(1153182335)*a + (206732022)/(1153182335) ], 78.7017437829, [[x^2 - x + 1, 1], [x^3 - x^2 + 1, 1], [x^6 - x^5 + x^4 - 2*x^3 + x^2 + 1, 1], [x^9 - x^6 + 1, 3]]]