/* 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^44 + 23*x^42 + 299*x^40 + 2668*x^38 + 18055*x^36 + 96646*x^34 + 421245*x^32 + 1516689*x^30 + 4557519*x^28 + 11467961*x^26 + 24199128*x^24 + 42662286*x^22 + 62532561*x^20 + 75392022*x^18 + 73935156*x^16 + 57768387*x^14 + 35301228*x^12 + 16195335*x^10 + 5446584*x^8 + 1210352*x^6 + 180389*x^4 + 11638*x^2 + 529, 44, 2, [0, 22], 860115008245742907292219227824365111518443501386754869093198564719785672888549376, [2, 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, a^17, a^18, a^19, a^20, a^21, 1/23*a^22, 1/23*a^23, 1/23*a^24, 1/23*a^25, 1/23*a^26, 1/23*a^27, 1/23*a^28, 1/23*a^29, 1/23*a^30, 1/23*a^31, 1/23*a^32, 1/23*a^33, 1/23*a^34, 1/23*a^35, 1/23*a^36, 1/23*a^37, 1/23*a^38, 1/23*a^39, 1/24556157*a^40 + 305889/24556157*a^38 - 203316/24556157*a^36 - 15232/24556157*a^34 + 423632/24556157*a^32 - 263735/24556157*a^30 - 17058/1067659*a^28 + 79693/24556157*a^26 + 384404/24556157*a^24 + 210138/24556157*a^22 + 392320/1067659*a^20 - 491477/1067659*a^18 + 460291/1067659*a^16 + 409417/1067659*a^14 - 360327/1067659*a^12 + 372646/1067659*a^10 - 195531/1067659*a^8 + 255097/1067659*a^6 + 12929/1067659*a^4 + 446170/1067659*a^2 + 55697/1067659, 1/24556157*a^41 + 305889/24556157*a^39 - 203316/24556157*a^37 - 15232/24556157*a^35 + 423632/24556157*a^33 - 263735/24556157*a^31 - 17058/1067659*a^29 + 79693/24556157*a^27 + 384404/24556157*a^25 + 210138/24556157*a^23 + 392320/1067659*a^21 - 491477/1067659*a^19 + 460291/1067659*a^17 + 409417/1067659*a^15 - 360327/1067659*a^13 + 372646/1067659*a^11 - 195531/1067659*a^9 + 255097/1067659*a^7 + 12929/1067659*a^5 + 446170/1067659*a^3 + 55697/1067659*a, 1/636968065704100522440858389810697591023*a^42 + 5755636131279205685327418474843/636968065704100522440858389810697591023*a^40 - 2766808978853660638281687333283189226/636968065704100522440858389810697591023*a^38 + 8420125655964967570434335740564366516/636968065704100522440858389810697591023*a^36 + 5363834181750727225775342499545938237/636968065704100522440858389810697591023*a^34 - 5011363664417770982567818120174250979/636968065704100522440858389810697591023*a^32 + 6462774396101919123854667907489977390/636968065704100522440858389810697591023*a^30 + 1361369016049795655998233811816501799/636968065704100522440858389810697591023*a^28 + 13749647834678826284671003425575098586/636968065704100522440858389810697591023*a^26 + 9151572527542995230221480787613417001/636968065704100522440858389810697591023*a^24 + 11197155162359815775484628671272258602/636968065704100522440858389810697591023*a^22 - 13338061847948670589198734037381162771/27694263726265240106124277817856417001*a^20 + 6650709677926776184583509957164195314/27694263726265240106124277817856417001*a^18 - 6820424214318991627456015401316240546/27694263726265240106124277817856417001*a^16 + 10544871495508316610122098060856487900/27694263726265240106124277817856417001*a^14 - 1169895739344639205339676515850645904/27694263726265240106124277817856417001*a^12 - 91687202865078033400874710337434905/27694263726265240106124277817856417001*a^10 - 1264766535778439148738828954779831460/27694263726265240106124277817856417001*a^8 + 406874121304761360307825622872948776/27694263726265240106124277817856417001*a^6 - 3615734122086171837070622535576165639/27694263726265240106124277817856417001*a^4 - 1644145403094707030709335232608519251/27694263726265240106124277817856417001*a^2 - 2178959152626519883114055851297237383/27694263726265240106124277817856417001, 1/636968065704100522440858389810697591023*a^43 + 5755636131279205685327418474843/636968065704100522440858389810697591023*a^41 - 2766808978853660638281687333283189226/636968065704100522440858389810697591023*a^39 + 8420125655964967570434335740564366516/636968065704100522440858389810697591023*a^37 + 5363834181750727225775342499545938237/636968065704100522440858389810697591023*a^35 - 5011363664417770982567818120174250979/636968065704100522440858389810697591023*a^33 + 6462774396101919123854667907489977390/636968065704100522440858389810697591023*a^31 + 1361369016049795655998233811816501799/636968065704100522440858389810697591023*a^29 + 13749647834678826284671003425575098586/636968065704100522440858389810697591023*a^27 + 9151572527542995230221480787613417001/636968065704100522440858389810697591023*a^25 + 11197155162359815775484628671272258602/636968065704100522440858389810697591023*a^23 - 13338061847948670589198734037381162771/27694263726265240106124277817856417001*a^21 + 6650709677926776184583509957164195314/27694263726265240106124277817856417001*a^19 - 6820424214318991627456015401316240546/27694263726265240106124277817856417001*a^17 + 10544871495508316610122098060856487900/27694263726265240106124277817856417001*a^15 - 1169895739344639205339676515850645904/27694263726265240106124277817856417001*a^13 - 91687202865078033400874710337434905/27694263726265240106124277817856417001*a^11 - 1264766535778439148738828954779831460/27694263726265240106124277817856417001*a^9 + 406874121304761360307825622872948776/27694263726265240106124277817856417001*a^7 - 3615734122086171837070622535576165639/27694263726265240106124277817856417001*a^5 - 1644145403094707030709335232608519251/27694263726265240106124277817856417001*a^3 - 2178959152626519883114055851297237383/27694263726265240106124277817856417001*a], 1, 0,0,0,0,0, [[x^2 + 69, 1], [x^2 - 23, 1], [x^2 - x + 1, 1], [x^4 + 23*x^2 + 529, 1], [x^11 - x^10 - 10*x^9 + 9*x^8 + 36*x^7 - 28*x^6 - 56*x^5 + 35*x^4 + 35*x^3 - 15*x^2 - 6*x + 1, 1], [x^22 + 69*x^20 + 2070*x^18 + 35397*x^16 + 380052*x^14 + 2660364*x^12 + 12206376*x^10 + 35965215*x^8 + 64737387*x^6 + 64737387*x^4 + 29878794*x^2 + 4074381, 1], [x^22 - 23*x^20 + 230*x^18 - 1311*x^16 + 4692*x^14 - 10948*x^12 + 16744*x^10 - 16445*x^8 + 9867*x^6 - 3289*x^4 + 506*x^2 - 23, 1], [x^22 - x^21 + 11*x^20 - 8*x^19 + 73*x^18 - 46*x^17 + 301*x^16 - 145*x^15 + 883*x^14 - 355*x^13 + 1776*x^12 - 498*x^11 + 2527*x^10 - 574*x^9 + 2324*x^8 - 251*x^7 + 1358*x^6 - 161*x^5 + 400*x^4 + 20*x^3 + 51*x^2 - 6*x + 1, 1]]]