/* 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^26 - x^25 - 37*x^24 + 36*x^23 + 656*x^22 - 602*x^21 - 7532*x^20 + 5987*x^19 + 63242*x^18 - 39168*x^17 - 407978*x^16 + 177750*x^15 + 2044391*x^14 - 593805*x^13 - 7863783*x^12 + 1620832*x^11 + 22802242*x^10 - 3804296*x^9 - 48757198*x^8 + 7281003*x^7 + 74301119*x^6 - 12442481*x^5 - 74591007*x^4 + 16397553*x^3 + 41639217*x^2 - 9412671*x - 11716513, 26, 3, [2, 12], 713943735055873357083710772983186869616893, [13, 191], [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, 1/7*a^21 + 2/7*a^20 - 2/7*a^19 - 1/7*a^18 + 3/7*a^17 - 1/7*a^15 + 3/7*a^14 - 3/7*a^13 - 3/7*a^12 - 2/7*a^11 - 3/7*a^10 - 2/7*a^7 - 3/7*a^6 + 3/7*a^5 + 3/7*a^4 + 1/7*a^3 - 2/7, 1/7*a^22 + 1/7*a^20 + 3/7*a^19 - 2/7*a^18 + 1/7*a^17 - 1/7*a^16 - 2/7*a^15 - 2/7*a^14 + 3/7*a^13 - 3/7*a^12 + 1/7*a^11 - 1/7*a^10 - 2/7*a^8 + 1/7*a^7 + 2/7*a^6 - 3/7*a^5 + 2/7*a^4 - 2/7*a^3 - 2/7*a - 3/7, 1/7*a^23 + 1/7*a^20 + 2/7*a^18 + 3/7*a^17 - 2/7*a^16 - 1/7*a^15 - 3/7*a^12 + 1/7*a^11 + 3/7*a^10 - 2/7*a^9 + 1/7*a^8 - 3/7*a^7 - 1/7*a^5 + 2/7*a^4 - 1/7*a^3 - 2/7*a^2 - 3/7*a + 2/7, 1/407030407*a^24 + 26500680/407030407*a^23 - 26746959/407030407*a^22 - 16747158/407030407*a^21 - 809895/3602039*a^20 - 168841075/407030407*a^19 + 121204474/407030407*a^18 + 2485405/8306743*a^17 - 72052441/407030407*a^16 - 152047013/407030407*a^15 + 61556484/407030407*a^14 + 4123975/58147201*a^13 + 16250571/407030407*a^12 + 179770040/407030407*a^11 - 414085/8306743*a^10 - 23961327/407030407*a^9 - 94350002/407030407*a^8 - 2417505/407030407*a^7 + 41840655/407030407*a^6 + 21041534/407030407*a^5 + 5485625/21422653*a^4 - 85395049/407030407*a^3 - 73695659/407030407*a^2 + 26168305/407030407*a - 17597504/407030407, 1/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^25 + 2817902550531034922440596344724118625648516882205332745727943828816057507851/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^24 + 25633179683937210952200413519014468635540031485672101444897935286563806296882838900/639359059067385794816264986105677896627003001617342874252774471785176946217028355569*a^23 + 285188829684754932185736697198495335886856683284196967275062599671412895042222108250/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^22 - 1528944139521844170390685906279603248340666650545833364067668312814649557297489612/33650476793020304990329736110825152454052789558807519697514445883430365590369913451*a^21 + 240271694835107178741605553828903905427934370647819591304960433994277108556797299890/639359059067385794816264986105677896627003001617342874252774471785176946217028355569*a^20 - 27160438997221409640914807351379884154858358699600731965088024239841130015226210674/91337008438197970688037855157953985232429000231048982036110638826453849459575479367*a^19 + 196597662592663935607412397912609323751996643731476029114867328367660936756082149132/406864855770154596701259536612704116035365546483763647251765572954203511229018044453*a^18 - 1225836950162667252198973362115337557400889629564884924586909968655157276916995268635/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^17 - 111507807809919078537153231334440439687401118693625384511681444631979637306947065899/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^16 + 1120238464320768430023543122132617228149679595278101156802977899088080943477670414656/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^15 + 2191687245068664655474871902446777596249228543514073727261284509057779019884548540368/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^14 + 188058963851948476218220194693495684343871835099381481859061501333764092329568457946/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^13 + 111482647893157219231457639087075652191861541709712454976666882403285815532575729979/639359059067385794816264986105677896627003001617342874252774471785176946217028355569*a^12 + 129633899200774173357995098702706190040437652830157608874181175241218438300069260022/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^11 - 1367654813433467918224250935390690015795292785499024959384840687208284550380828178867/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^10 + 2017268097943887318798001482822784911153281156023722418937116900002631183304424658775/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^9 - 1427983676775956461361093700774150873232955778315643038511212195513690778554054169010/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^8 - 1910242237873322387430769400140709413490819144258311134576346566017197365996989197612/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^7 - 440842511816791535095401996371200254386108415409145172765345223996820882756314172973/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^6 + 1704640218688968812449021278266973425767774868395587637628587264117715908959257219996/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^5 - 2232896232029545305418650273464719051343814777827982383786483716058969796388364810982/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^4 - 2089368399433922149756832433185955799843556156338278487526370626383839155456408886108/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^3 + 510946582554466015771480386600272033650080704854328993474863782288222764158669481486/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983*a^2 + 6740537480707759232441605735749622760543786006925400955923025642966773484861626006/39606313393554872245255353121590666162734699215233629378490454004391492243532729991*a + 1211557338016559476502033276566541352600596217290438386907870571220906801993495147779/4475513413471700563713854902739745276389021011321400119769421302496238623519198488983], 0, 0,0,0,0,0, [[x^2 - x - 3, 1], [x^13 - 2*x^12 + 4*x^10 - 5*x^9 + x^8 + 5*x^7 - 11*x^6 + 19*x^5 - 22*x^4 + 16*x^3 - 10*x^2 + 6*x - 1, 1]]]