Modular elliptic directions with complex multiplication (with an application to Gross's elliptic curves)
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Autores: Josep González i Rovira
, Joan Carles Lario Loyo
- Localización: Commentarii mathematici helvetici, ISSN 0010-2571, Vol. 86, Nº 2, 2011, págs. 317-351
- Idioma: inglés
- DOI: 10.4171/cmh/225
- Texto completo no disponible (Saber más ...)
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Resumen
Let Af be the abelian variety attached by Shimura to a normalized newform f?S2(?1(N)) and assume that Af has elliptic quotients. The paper deals with the determination of the one dimensional subspaces (elliptic directions) in S2(?1(N)) corresponding to the pullbacks of the regular differentials of all elliptic quotients of Af. For modular elliptic curves over number fields without complex multiplication (CM), the directions were studied by the authors in [8]. The main goal of the present paper is to characterize the directions corresponding to elliptic curves with CM. Then we apply the results obtained to the case N=p2, for primes p>3 and p?3 mod 4. For this case we prove that if f has CM, then all optimal elliptic quotients of Af are also optimal in the sense that its endomorphism ring is the maximal order of Q(-p---?). Moreover, if f has trivial Nebentypus then all optimal quotients are Gross�s elliptic curve A(p) and its Galois conjugates. Among all modular parametrizations J0(p2)?A(p), we describe a canonical one and discuss some of its properties.
