/* 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^22 - 5*x^20 - 3*x^18 + 2*x^16 + 35*x^14 + 32*x^12 + 18*x^10 - 19*x^8 - 11*x^6 - 5*x^4 + 7*x^2 - 1, 22, 39, [6, 8], 529866739430089519756710630129664, [2, 1831], [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, a^17, a^18, a^19, 1/89087*a^20 + 729/89087*a^18 + 561/89087*a^16 - 33659/89087*a^14 - 28572/89087*a^12 - 36371/89087*a^10 + 29804/89087*a^8 - 39285/89087*a^6 + 28987/89087*a^4 - 15340/89087*a^2 - 34591/89087, 1/89087*a^21 + 729/89087*a^19 + 561/89087*a^17 - 33659/89087*a^15 - 28572/89087*a^13 - 36371/89087*a^11 + 29804/89087*a^9 - 39285/89087*a^7 + 28987/89087*a^5 - 15340/89087*a^3 - 34591/89087*a], 0, 1, [], 1, [ a^(21) - 5*a^(19) - 3*a^(17) + 2*a^(15) + 35*a^(13) + 32*a^(11) + 18*a^(9) - 19*a^(7) - 11*a^(5) - 5*a^(3) + 7*a , (3239)/(89087)*a^(20) - (44118)/(89087)*a^(18) + (124426)/(89087)*a^(16) + (110074)/(89087)*a^(14) + (105772)/(89087)*a^(12) - (834438)/(89087)*a^(10) - (1015109)/(89087)*a^(8) - (1007836)/(89087)*a^(6) - (97892)/(89087)*a^(4) + (24286)/(89087)*a^(2) + (209371)/(89087) , (70931)/(89087)*a^(20) - (318109)/(89087)*a^(18) - (385946)/(89087)*a^(16) - (24016)/(89087)*a^(14) + (2583154)/(89087)*a^(12) + (3513425)/(89087)*a^(10) + (2754711)/(89087)*a^(8) - (595671)/(89087)*a^(6) - (1120107)/(89087)*a^(4) - (863792)/(89087)*a^(2) + (327194)/(89087) , (49429)/(89087)*a^(21) - (224668)/(89087)*a^(19) - (243649)/(89087)*a^(17) - (30986)/(89087)*a^(15) + (1614389)/(89087)*a^(13) + (2309763)/(89087)*a^(11) + (2266459)/(89087)*a^(9) + (812857)/(89087)*a^(7) + (101289)/(89087)*a^(5) - (377751)/(89087)*a^(3) - (219009)/(89087)*a , (37869)/(89087)*a^(21) - (188643)/(89087)*a^(19) - (136371)/(89087)*a^(17) + (202299)/(89087)*a^(15) + (1215765)/(89087)*a^(13) + (1109752)/(89087)*a^(11) + (271734)/(89087)*a^(9) - (287113)/(89087)*a^(7) - (110398)/(89087)*a^(5) - (152307)/(89087)*a^(3) - (80418)/(89087)*a , (30398)/(89087)*a^(21) - (111608)/(89087)*a^(19) - (318687)/(89087)*a^(17) + (87000)/(89087)*a^(15) + (1135638)/(89087)*a^(13) + (2191187)/(89087)*a^(11) + (1125333)/(89087)*a^(9) - (63282)/(89087)*a^(7) - (636300)/(89087)*a^(5) - (202136)/(89087)*a^(3) + (174817)/(89087)*a , (71633)/(89087)*a^(21) - (37869)/(89087)*a^(20) - (340873)/(89087)*a^(19) + (188643)/(89087)*a^(18) - (259385)/(89087)*a^(17) + (136371)/(89087)*a^(16) - (133666)/(89087)*a^(15) - (202299)/(89087)*a^(14) + (2481098)/(89087)*a^(13) - (1215765)/(89087)*a^(12) + (3103517)/(89087)*a^(11) - (1109752)/(89087)*a^(10) + (3187109)/(89087)*a^(9) - (271734)/(89087)*a^(8) - (289510)/(89087)*a^(7) + (287113)/(89087)*a^(6) - (1083069)/(89087)*a^(5) + (110398)/(89087)*a^(4) - (1209293)/(89087)*a^(3) + (152307)/(89087)*a^(2) + (365063)/(89087)*a + (80418)/(89087) , (393818)/(89087)*a^(21) + (252107)/(89087)*a^(20) - (1815819)/(89087)*a^(19) - (1158609)/(89087)*a^(18) - (1874689)/(89087)*a^(17) - (1196260)/(89087)*a^(16) + (1929)/(89087)*a^(15) - (132763)/(89087)*a^(14) + (13685037)/(89087)*a^(13) + (8747794)/(89087)*a^(12) + (17938043)/(89087)*a^(11) + (11655262)/(89087)*a^(10) + (14571516)/(89087)*a^(9) + (10177192)/(89087)*a^(8) - (1093493)/(89087)*a^(7) - (132618)/(89087)*a^(6) - (4192903)/(89087)*a^(5) - (2386350)/(89087)*a^(4) - (3563956)/(89087)*a^(3) - (2460059)/(89087)*a^(2) + (1427385)/(89087)*a + (805889)/(89087) , (83659)/(89087)*a^(21) - (3239)/(89087)*a^(20) - (393532)/(89087)*a^(19) + (44118)/(89087)*a^(18) - (372498)/(89087)*a^(17) - (124426)/(89087)*a^(16) + (72702)/(89087)*a^(15) - (110074)/(89087)*a^(14) + (3017307)/(89087)*a^(13) - (105772)/(89087)*a^(12) + (3568476)/(89087)*a^(11) + (834438)/(89087)*a^(10) + (2322142)/(89087)*a^(9) + (1015109)/(89087)*a^(8) - (1371603)/(89087)*a^(7) + (1007836)/(89087)*a^(6) - (1439186)/(89087)*a^(5) + (97892)/(89087)*a^(4) - (743521)/(89087)*a^(3) - (24286)/(89087)*a^(2) + (588161)/(89087)*a - (209371)/(89087) , (349626)/(89087)*a^(21) + (315589)/(89087)*a^(20) - (1515032)/(89087)*a^(19) - (1383645)/(89087)*a^(18) - (2078389)/(89087)*a^(17) - (1841267)/(89087)*a^(16) - (648791)/(89087)*a^(15) - (299880)/(89087)*a^(14) + (12194331)/(89087)*a^(13) + (11067672)/(89087)*a^(12) + (19273926)/(89087)*a^(11) + (16697178)/(89087)*a^(10) + (18277010)/(89087)*a^(9) + (14530277)/(89087)*a^(8) + (3137947)/(89087)*a^(7) + (1392969)/(89087)*a^(6) - (2957216)/(89087)*a^(5) - (3038297)/(89087)*a^(4) - (3878007)/(89087)*a^(3) - (2998464)/(89087)*a^(2) + (538154)/(89087)*a + (627316)/(89087) , (189817)/(89087)*a^(21) + (56980)/(89087)*a^(20) - (866388)/(89087)*a^(19) - (243383)/(89087)*a^(18) - (951585)/(89087)*a^(17) - (372801)/(89087)*a^(16) + (1976)/(89087)*a^(15) - (24884)/(89087)*a^(14) + (6579500)/(89087)*a^(13) + (1992279)/(89087)*a^(12) + (8960745)/(89087)*a^(11) + (3218433)/(89087)*a^(10) + (7141067)/(89087)*a^(9) + (2639049)/(89087)*a^(8) - (200771)/(89087)*a^(7) + (207923)/(89087)*a^(6) - (2014916)/(89087)*a^(5) - (706416)/(89087)*a^(4) - (1765925)/(89087)*a^(3) - (396991)/(89087)*a^(2) + (375662)/(89087)*a + (143782)/(89087) , (74170)/(89087)*a^(21) + (111313)/(89087)*a^(20) - (362227)/(89087)*a^(19) - (545602)/(89087)*a^(18) - (261520)/(89087)*a^(17) - (359742)/(89087)*a^(16) + (86058)/(89087)*a^(15) + (47692)/(89087)*a^(14) + (2688926)/(89087)*a^(13) + (3801605)/(89087)*a^(12) + (2678987)/(89087)*a^(11) + (4091594)/(89087)*a^(10) + (1739602)/(89087)*a^(9) + (3268991)/(89087)*a^(8) - (1603507)/(89087)*a^(7) - (897593)/(89087)*a^(6) - (1217999)/(89087)*a^(5) - (1170253)/(89087)*a^(4) - (839506)/(89087)*a^(3) - (901761)/(89087)*a^(2) + (536565)/(89087)*a + (357592)/(89087) , (1046511)/(89087)*a^(21) - (514102)/(89087)*a^(20) - (4934334)/(89087)*a^(19) + (2414000)/(89087)*a^(18) - (4534096)/(89087)*a^(17) + (2279659)/(89087)*a^(16) + (753312)/(89087)*a^(15) - (366923)/(89087)*a^(14) + (36774058)/(89087)*a^(13) - (18005051)/(89087)*a^(12) + (43867234)/(89087)*a^(11) - (21892903)/(89087)*a^(10) + (31768333)/(89087)*a^(9) - (15902190)/(89087)*a^(8) - (10115445)/(89087)*a^(7) + (4393998)/(89087)*a^(6) - (13341237)/(89087)*a^(5) + (6523863)/(89087)*a^(4) - (8731866)/(89087)*a^(3) + (4263268)/(89087)*a^(2) + (4916625)/(89087)*a - (2204572)/(89087) ], 187145857.636, [[x^11 - 2*x^10 + x^9 - 5*x^8 + 13*x^7 - 9*x^6 + x^5 - 8*x^4 + 9*x^3 - 3*x^2 - 2*x + 1, 1]]]