/* 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^20 - 3*x^19 + 3*x^18 - 3*x^17 + 8*x^16 - 13*x^15 + 16*x^14 - 18*x^13 + 22*x^12 - 30*x^11 + 32*x^10 - 25*x^9 + 18*x^8 - 17*x^7 + 25*x^6 - 31*x^5 + 29*x^4 - 21*x^3 + 11*x^2 - 4*x + 1, 20, 1015, [0, 10], 2904089910121808158573, [67, 83, 631, 1777], [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, 1/17*a^18 - 7/17*a^17 + 5/17*a^16 + 6/17*a^15 + 7/17*a^14 + 7/17*a^13 - 7/17*a^12 - 2/17*a^11 + 8/17*a^10 + 7/17*a^9 - 3/17*a^7 - 4/17*a^6 - 8/17*a^5 + 8/17*a^4 - 8/17*a^3 + 6/17*a^2 - 7/17*a + 2/17, 1/188207*a^19 - 4904/188207*a^18 - 634/188207*a^17 + 84848/188207*a^16 - 2209/188207*a^15 + 3189/11071*a^14 + 61458/188207*a^13 - 63405/188207*a^12 + 7099/188207*a^11 - 84644/188207*a^10 - 89733/188207*a^9 - 47280/188207*a^8 + 36481/188207*a^7 + 25394/188207*a^6 - 84355/188207*a^5 + 54826/188207*a^4 - 64382/188207*a^3 + 34803/188207*a^2 + 89973/188207*a + 253/188207], 0, 1, [], 0, [ (143988)/(188207)*a^(19) - (252334)/(188207)*a^(18) - (63352)/(188207)*a^(17) - (108948)/(188207)*a^(16) + (908160)/(188207)*a^(15) - (561354)/(188207)*a^(14) + (341340)/(188207)*a^(13) - (822167)/(188207)*a^(12) + (1158908)/(188207)*a^(11) - (1361306)/(188207)*a^(10) + (32666)/(11071)*a^(9) - (117243)/(188207)*a^(8) + (455982)/(188207)*a^(7) - (785010)/(188207)*a^(6) + (1380945)/(188207)*a^(5) - (1041846)/(188207)*a^(4) + (509274)/(188207)*a^(3) - (206638)/(188207)*a^(2) - (251876)/(188207)*a + (5526)/(11071) , (549968)/(188207)*a^(19) - (1420637)/(188207)*a^(18) + (909255)/(188207)*a^(17) - (51709)/(11071)*a^(16) + (3738871)/(188207)*a^(15) - (5319706)/(188207)*a^(14) + (5584063)/(188207)*a^(13) - (6038550)/(188207)*a^(12) + (7906163)/(188207)*a^(11) - (11443012)/(188207)*a^(10) + (10494571)/(188207)*a^(9) - (6206958)/(188207)*a^(8) + (4103412)/(188207)*a^(7) - (5581756)/(188207)*a^(6) + (10228411)/(188207)*a^(5) - (11168902)/(188207)*a^(4) + (8343857)/(188207)*a^(3) - (4654706)/(188207)*a^(2) + (1421683)/(188207)*a - (264128)/(188207) , a^(19) - 3*a^(18) + 3*a^(17) - 3*a^(16) + 8*a^(15) - 13*a^(14) + 16*a^(13) - 18*a^(12) + 22*a^(11) - 30*a^(10) + 32*a^(9) - 25*a^(8) + 18*a^(7) - 17*a^(6) + 25*a^(5) - 31*a^(4) + 29*a^(3) - 21*a^(2) + 11*a - 4 , (261450)/(188207)*a^(19) - (793260)/(188207)*a^(18) + (682114)/(188207)*a^(17) - (416277)/(188207)*a^(16) + (1835593)/(188207)*a^(15) - (3334472)/(188207)*a^(14) + (3342775)/(188207)*a^(13) - (3285990)/(188207)*a^(12) + (4552723)/(188207)*a^(11) - (6463092)/(188207)*a^(10) + (6583347)/(188207)*a^(9) - (3872587)/(188207)*a^(8) + (1940529)/(188207)*a^(7) - (3117280)/(188207)*a^(6) + (5902690)/(188207)*a^(5) - (6761428)/(188207)*a^(4) + (5099290)/(188207)*a^(3) - (2556880)/(188207)*a^(2) + (1020002)/(188207)*a - (13446)/(188207) , (13771)/(11071)*a^(19) - (518365)/(188207)*a^(18) - (50296)/(188207)*a^(17) + (177169)/(188207)*a^(16) + (1445419)/(188207)*a^(15) - (1480129)/(188207)*a^(14) + (197465)/(188207)*a^(13) - (542854)/(188207)*a^(12) + (1474871)/(188207)*a^(11) - (2283125)/(188207)*a^(10) + (663690)/(188207)*a^(9) + (103340)/(11071)*a^(8) - (885459)/(188207)*a^(7) - (1287729)/(188207)*a^(6) + (2556944)/(188207)*a^(5) - (1530195)/(188207)*a^(4) - (826379)/(188207)*a^(3) + (1351630)/(188207)*a^(2) - (1128317)/(188207)*a + (597055)/(188207) , (288317)/(188207)*a^(19) - (615921)/(188207)*a^(18) + (210652)/(188207)*a^(17) - (368245)/(188207)*a^(16) + (1771595)/(188207)*a^(15) - (2010325)/(188207)*a^(14) + (2077401)/(188207)*a^(13) - (2197326)/(188207)*a^(12) + (3122209)/(188207)*a^(11) - (4606189)/(188207)*a^(10) + (3458987)/(188207)*a^(9) - (1676820)/(188207)*a^(8) + (1328879)/(188207)*a^(7) - (2166022)/(188207)*a^(6) + (4419943)/(188207)*a^(5) - (3836163)/(188207)*a^(4) + (148455)/(11071)*a^(3) - (1199606)/(188207)*a^(2) + (52850)/(188207)*a + (8453)/(188207) , (16372)/(11071)*a^(19) - (743347)/(188207)*a^(18) + (601087)/(188207)*a^(17) - (625336)/(188207)*a^(16) + (1947694)/(188207)*a^(15) - (2931413)/(188207)*a^(14) + (3475207)/(188207)*a^(13) - (3712289)/(188207)*a^(12) + (4663739)/(188207)*a^(11) - (6531593)/(188207)*a^(10) + (6476523)/(188207)*a^(9) - (260615)/(11071)*a^(8) + (3058281)/(188207)*a^(7) - (3121979)/(188207)*a^(6) + (5429908)/(188207)*a^(5) - (6753477)/(188207)*a^(4) + (5701415)/(188207)*a^(3) - (3504359)/(188207)*a^(2) + (1412446)/(188207)*a - (95227)/(188207) , (349051)/(188207)*a^(19) - (1010900)/(188207)*a^(18) + (874494)/(188207)*a^(17) - (682816)/(188207)*a^(16) + (2454969)/(188207)*a^(15) - (4211867)/(188207)*a^(14) + (4570898)/(188207)*a^(13) - (4557718)/(188207)*a^(12) + (6135163)/(188207)*a^(11) - (8774086)/(188207)*a^(10) + (8772718)/(188207)*a^(9) - (5470281)/(188207)*a^(8) + (3419122)/(188207)*a^(7) - (260897)/(11071)*a^(6) + (7530284)/(188207)*a^(5) - (8818357)/(188207)*a^(4) + (7374006)/(188207)*a^(3) - (4337972)/(188207)*a^(2) + (1786999)/(188207)*a - (280239)/(188207) , (403487)/(188207)*a^(19) - (976808)/(188207)*a^(18) + (405395)/(188207)*a^(17) - (319732)/(188207)*a^(16) + (2569757)/(188207)*a^(15) - (3383789)/(188207)*a^(14) + (2859233)/(188207)*a^(13) - (3060611)/(188207)*a^(12) + (4460280)/(188207)*a^(11) - (397422)/(11071)*a^(10) + (5426024)/(188207)*a^(9) - (1709496)/(188207)*a^(8) + (1124374)/(188207)*a^(7) - (3405064)/(188207)*a^(6) + (6382003)/(188207)*a^(5) - (6317284)/(188207)*a^(4) + (3381009)/(188207)*a^(3) - (1182575)/(188207)*a^(2) - (57746)/(188207)*a + (162585)/(188207) ], 194.247728439, [[x^5 - x^4 + x^3 - 2*x^2 + x - 1, 1], [x^10 - x^9 - 2*x^6 + 3*x^5 + 3*x^4 - 4*x^3 - 2*x^2 + 2*x + 1, 1]]]