/* 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^30 - x^29 + 3*x^28 - 4*x^27 + 9*x^26 - 14*x^25 + 28*x^24 - 47*x^23 + 89*x^22 - 155*x^21 + 286*x^20 + 132*x^19 + 285*x^18 + 265*x^17 + 437*x^16 + 378*x^15 + 761*x^14 + 432*x^13 + 1468*x^12 + 157*x^11 + 3211*x^10 - 1429*x^9 + 636*x^8 - 283*x^7 + 126*x^6 - 56*x^5 + 25*x^4 - 11*x^3 + 5*x^2 - 2*x + 1, 30, 1, [0, 15], -1046076147688308987260717152173116396995512371, [7, 11], [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, a^20, 1/696851*a^21 - 332692/696851*a^20 + 335130/696851*a^19 - 303662/696851*a^18 - 55621/696851*a^17 - 216573/696851*a^16 - 198331/696851*a^15 - 290436/696851*a^14 - 322799/696851*a^13 + 240447/696851*a^12 + 217221/696851*a^11 + 319182/696851*a^10 + 341691/696851*a^9 + 138309/696851*a^8 + 167404/696851*a^7 - 245946/696851*a^6 + 22212/696851*a^5 - 346700/696851*a^4 + 145178/696851*a^3 - 119515/696851*a^2 + 63171/696851*a - 157023/696851, 1/696851*a^22 - 318543/696851*a^11 - 163850/696851, 1/696851*a^23 - 318543/696851*a^12 - 163850/696851*a, 1/696851*a^24 - 318543/696851*a^13 - 163850/696851*a^2, 1/696851*a^25 - 318543/696851*a^14 - 163850/696851*a^3, 1/696851*a^26 - 318543/696851*a^15 - 163850/696851*a^4, 1/696851*a^27 - 318543/696851*a^16 - 163850/696851*a^5, 1/696851*a^28 - 318543/696851*a^17 - 163850/696851*a^6, 1/696851*a^29 - 318543/696851*a^18 - 163850/696851*a^7], 1, 16, [2, 2, 2, 2], 1, [ (417)/(696851)*a^(23) + (266110)/(696851)*a^(12) - (2821456)/(696851)*a , (344166)/(696851)*a^(29) - (172083)/(696851)*a^(28) + (860415)/(696851)*a^(27) - (860415)/(696851)*a^(26) + (2409162)/(696851)*a^(25) - (3269577)/(696851)*a^(24) + (7227486)/(696851)*a^(23) - (11357478)/(696851)*a^(22) + (22542873)/(696851)*a^(21) - (38030057)/(696851)*a^(20) + (71758611)/(696851)*a^(19) + (94645650)/(696851)*a^(18) + (120802266)/(696851)*a^(17) + (140247645)/(696851)*a^(16) + (196002537)/(696851)*a^(15) + (205295019)/(696851)*a^(14) + (326957700)/(696851)*a^(13) + (279634875)/(696851)*a^(12) + (579575544)/(696851)*a^(11) + (306651906)/(696851)*a^(10) + (1132318240)/(696851)*a^(9) + (60745299)/(696851)*a^(8) - (27017031)/(696851)*a^(7) + (12045810)/(696851)*a^(6) - (5334573)/(696851)*a^(5) + (2409162)/(696851)*a^(4) - (1032498)/(696851)*a^(3) + (516249)/(696851)*a^(2) - (172083)/(696851)*a + (172083)/(696851) , (248706)/(696851)*a^(29) - (138031)/(696851)*a^(28) + (684710)/(696851)*a^(27) - (690155)/(696851)*a^(26) + (1931314)/(696851)*a^(25) - (2622589)/(696851)*a^(24) + (5797302)/(696851)*a^(23) - (9110046)/(696851)*a^(22) + (18082061)/(696851)*a^(21) - (30504982)/(696851)*a^(20) + (57558927)/(696851)*a^(19) + (58436328)/(696851)*a^(18) + (96897762)/(696851)*a^(17) + (109015506)/(696851)*a^(16) + (157217309)/(696851)*a^(15) + (163954580)/(696851)*a^(14) + (262258900)/(696851)*a^(13) + (224300375)/(696851)*a^(12) + (464888408)/(696851)*a^(11) + (245971242)/(696851)*a^(10) + (908024022)/(696851)*a^(9) + (48724943)/(696851)*a^(8) + (179854040)/(696851)*a^(7) + (9662170)/(696851)*a^(6) + (35635516)/(696851)*a^(5) + (1932434)/(696851)*a^(4) + (7077362)/(696851)*a^(3) + (414093)/(696851)*a^(2) - (138031)/(696851)*a - (558820)/(696851) , (2371)/(696851)*a^(26) + (417)/(696851)*a^(24) + (1514733)/(696851)*a^(15) + (266110)/(696851)*a^(13) - (17763618)/(696851)*a^(4) - (3518307)/(696851)*a^(2) , (12141)/(696851)*a^(28) - (286)/(696851)*a^(23) + (7757848)/(696851)*a^(17) - (184183)/(696851)*a^(12) - (89687024)/(696851)*a^(6) + (1565785)/(696851)*a , (417)/(696851)*a^(24) - (286)/(696851)*a^(23) + (266110)/(696851)*a^(13) - (184183)/(696851)*a^(12) - (3518307)/(696851)*a^(2) + (1565785)/(696851)*a - 1 , (12141)/(696851)*a^(29) - (172083)/(696851)*a^(28) + (245632)/(696851)*a^(27) - (552672)/(696851)*a^(26) + (859712)/(696851)*a^(25) - (1719424)/(696851)*a^(24) + (2886176)/(696851)*a^(23) - (5465312)/(696851)*a^(22) + (9518240)/(696851)*a^(21) - (17562688)/(696851)*a^(20) + (31133677)/(696851)*a^(19) - (48982965)/(696851)*a^(18) - (8515272)/(696851)*a^(17) - (26835296)/(696851)*a^(16) - (23212224)/(696851)*a^(15) - (46731488)/(696851)*a^(14) - (26528256)/(696851)*a^(13) - (90146944)/(696851)*a^(12) - (9641056)/(696851)*a^(11) - (197181088)/(696851)*a^(10) + (87752032)/(696851)*a^(9) - (491877849)/(696851)*a^(8) + (380513801)/(696851)*a^(7) - (97424432)/(696851)*a^(6) + (3438848)/(696851)*a^(5) - (1535200)/(696851)*a^(4) + (675488)/(696851)*a^(3) - (307040)/(696851)*a^(2) + (122816)/(696851)*a - (61408)/(696851) , (138031)/(696851)*a^(29) + (276062)/(696851)*a^(27) - (138031)/(696851)*a^(26) + (690155)/(696851)*a^(25) - (690155)/(696851)*a^(24) + (1932434)/(696851)*a^(23) - (2622589)/(696851)*a^(22) + (5797433)/(696851)*a^(21) - (9110177)/(696851)*a^(20) + (18082061)/(696851)*a^(19) + (57696958)/(696851)*a^(18) + (57558927)/(696851)*a^(17) + (75917050)/(696851)*a^(16) + (96897762)/(696851)*a^(15) + (112495265)/(696851)*a^(14) + (157217309)/(696851)*a^(13) + (164670983)/(696851)*a^(12) + (262258900)/(696851)*a^(11) + (224382302)/(696851)*a^(10) + (464806481)/(696851)*a^(9) + (245971242)/(696851)*a^(8) - (109458583)/(696851)*a^(7) + (48724943)/(696851)*a^(6) - (21670867)/(696851)*a^(5) + (9662170)/(696851)*a^(4) - (4278961)/(696851)*a^(3) + (1932434)/(696851)*a^(2) - (828186)/(696851)*a - (282758)/(696851) , (34052)/(696851)*a^(29) - (184224)/(696851)*a^(28) + (245632)/(696851)*a^(27) - (552672)/(696851)*a^(26) + (859712)/(696851)*a^(25) - (1719138)/(696851)*a^(24) + (2886176)/(696851)*a^(23) - (5465312)/(696851)*a^(22) + (9518240)/(696851)*a^(21) - (17562688)/(696851)*a^(20) + (31133677)/(696851)*a^(19) - (34982002)/(696851)*a^(18) - (16273120)/(696851)*a^(17) - (26835296)/(696851)*a^(16) - (23212224)/(696851)*a^(15) - (46731488)/(696851)*a^(14) - (26344073)/(696851)*a^(13) - (90146944)/(696851)*a^(12) - (9641056)/(696851)*a^(11) - (197181088)/(696851)*a^(10) + (87752032)/(696851)*a^(9) - (491877849)/(696851)*a^(8) + (218903371)/(696851)*a^(7) - (7737408)/(696851)*a^(6) + (3438848)/(696851)*a^(5) - (1535200)/(696851)*a^(4) + (675488)/(696851)*a^(3) - (1872825)/(696851)*a^(2) + (122816)/(696851)*a - (61408)/(696851) , (12141)/(696851)*a^(28) - (5445)/(696851)*a^(27) - (286)/(696851)*a^(22) + (7757848)/(696851)*a^(17) - (3479759)/(696851)*a^(16) - (184183)/(696851)*a^(11) - (89687024)/(696851)*a^(6) + (39914477)/(696851)*a^(5) + (868934)/(696851) , (470056)/(696851)*a^(29) - (248706)/(696851)*a^(28) + (1243530)/(696851)*a^(27) - (1243530)/(696851)*a^(26) + (3481884)/(696851)*a^(25) - (4725414)/(696851)*a^(24) + (10445652)/(696851)*a^(23) - (16414596)/(696851)*a^(22) + (32580486)/(696851)*a^(21) - (54964050)/(696851)*a^(20) + (103710402)/(696851)*a^(19) + (119307578)/(696851)*a^(18) + (174591612)/(696851)*a^(17) + (202695390)/(696851)*a^(16) + (283276134)/(696851)*a^(15) + (296706258)/(696851)*a^(14) + (472541400)/(696851)*a^(13) + (404147250)/(696851)*a^(12) + (837641808)/(696851)*a^(11) + (443194092)/(696851)*a^(10) + (1636216445)/(696851)*a^(9) + (87793218)/(696851)*a^(8) + (162478065)/(696851)*a^(7) + (17409420)/(696851)*a^(6) - (7709886)/(696851)*a^(5) + (3481884)/(696851)*a^(4) - (1492236)/(696851)*a^(3) + (746118)/(696851)*a^(2) - (248706)/(696851)*a - (448145)/(696851) , (122816)/(696851)*a^(29) - (49267)/(696851)*a^(28) + (307040)/(696851)*a^(27) - (307040)/(696851)*a^(26) + (859712)/(696851)*a^(25) - (1166752)/(696851)*a^(24) + (2578850)/(696851)*a^(23) - (4052928)/(696851)*a^(22) + (8044448)/(696851)*a^(21) - (13570989)/(696851)*a^(20) + (25607136)/(696851)*a^(19) + (33774400)/(696851)*a^(18) + (50866264)/(696851)*a^(17) + (50047520)/(696851)*a^(16) + (69943712)/(696851)*a^(15) + (73259744)/(696851)*a^(14) + (116675200)/(696851)*a^(13) + (99603817)/(696851)*a^(12) + (206822144)/(696851)*a^(11) + (109429056)/(696851)*a^(10) + (404125817)/(696851)*a^(9) + (21677024)/(696851)*a^(8) - (9641056)/(696851)*a^(7) - (85388464)/(696851)*a^(6) - (1903648)/(696851)*a^(5) + (859712)/(696851)*a^(4) - (368448)/(696851)*a^(3) + (184224)/(696851)*a^(2) + (1504377)/(696851)*a + (61408)/(696851) , (620228)/(696851)*a^(29) - (282758)/(696851)*a^(28) + (1550570)/(696851)*a^(27) - (1550570)/(696851)*a^(26) + (4341596)/(696851)*a^(25) - (5893000)/(696851)*a^(24) + (13024788)/(696851)*a^(23) - (20467524)/(696851)*a^(22) + (40624934)/(696851)*a^(21) - (68535039)/(696851)*a^(20) + (129317538)/(696851)*a^(19) + (170562700)/(696851)*a^(18) + (235180750)/(696851)*a^(17) + (252742910)/(696851)*a^(16) + (353219846)/(696851)*a^(15) + (369966002)/(696851)*a^(14) + (588684380)/(696851)*a^(13) + (503935250)/(696851)*a^(12) + (1044463952)/(696851)*a^(11) + (552623148)/(696851)*a^(10) + (2040342262)/(696851)*a^(9) + (109470242)/(696851)*a^(8) - (48687898)/(696851)*a^(7) - (179816927)/(696851)*a^(6) - (9613534)/(696851)*a^(5) + (4341596)/(696851)*a^(4) - (1860684)/(696851)*a^(3) + (7270105)/(696851)*a^(2) - (310114)/(696851)*a + (310114)/(696851) , (386737)/(696851)*a^(29) - (552124)/(696851)*a^(28) + (1236834)/(696851)*a^(27) - (1930063)/(696851)*a^(26) + (3863748)/(696851)*a^(25) - (6487040)/(696851)*a^(24) + (12284473)/(696851)*a^(23) - (21394805)/(696851)*a^(22) + (39476866)/(696851)*a^(21) - (69981848)/(696851)*a^(20) + (127540775)/(696851)*a^(19) + (19097493)/(696851)*a^(18) + (60319547)/(696851)*a^(17) + (48695959)/(696851)*a^(16) + (106556324)/(696851)*a^(15) + (58912989)/(696851)*a^(14) + (202895618)/(696851)*a^(13) + (21486684)/(696851)*a^(12) + (443217541)/(696851)*a^(11) - (197246299)/(696851)*a^(10) + (1105270321)/(696851)*a^(9) - (1056545378)/(696851)*a^(8) + (218916813)/(696851)*a^(7) - (7729736)/(696851)*a^(6) + (43365252)/(696851)*a^(5) - (19281959)/(696851)*a^(4) + (8595703)/(696851)*a^(3) - (3794369)/(696851)*a^(2) + (1703816)/(696851)*a - 1 ], 4697581952.048968, [[x^2 - x + 3, 1], [x^3 - x^2 - 2*x + 1, 1], [x^5 - x^4 - 4*x^3 + 3*x^2 + 3*x - 1, 1], [x^6 - x^5 + 4*x^4 - 3*x^3 + 29*x^2 - 4*x + 71, 1], [x^10 - x^9 + x^8 - x^7 + x^6 - x^5 + x^4 - x^3 + x^2 - x + 1, 1], [x^15 - x^14 - 22*x^13 + 17*x^12 + 166*x^11 - 102*x^10 - 533*x^9 + 270*x^8 + 729*x^7 - 352*x^6 - 393*x^5 + 173*x^4 + 80*x^3 - 27*x^2 - 6*x + 1, 1]]]