| Atkin-Lehner |
2- 3+ 5+ 11+ 41- |
Signs for the Atkin-Lehner involutions |
| Class |
108240u |
Isogeny class |
| Conductor |
108240 |
Conductor |
| ∏ cp |
16 |
Product of Tamagawa factors cp |
| Δ |
-1.4813466624E+34 |
Discriminant |
| Eigenvalues |
2- 3+ 5+ 4 11+ -4 6 -8 |
Hecke eigenvalues for primes up to 20 |
| Equation |
[0,-1,0,34527964504,5309614351645296] |
[a1,a2,a3,a4,a6] |
| Generators |
[-175873477624567550694417005343086610437699232921830063311232122606311897905631773404659249410343987871991688426:186821741808833637651215006848887892549347357853997364523344459336611321188909187934886685644488535168293457031250:3257906168060937483259860170274798329880881967404960655704402505272936693933996323399437327607254122807779] |
Generators of the group modulo torsion |
| j |
1111416125716710792458089622591831/3616569000000000000000000000000 |
j-invariant |
| L |
5.7915841942914 |
L(r)(E,1)/r! |
| Ω |
0.0088213016729878 |
Real period |
| R |
164.13632616222 |
Regulator |
| r |
1 |
Rank of the group of rational points |
| S |
1 |
(Analytic) order of Ш |
| t |
2 |
Number of elements in the torsion subgroup |
| Twists |
13530g4 |
Quadratic twists by: -4 |