Modular elliptic curves over real abelian fields and the generalized Fermat equation x2+y2m=zp

Abstract

Using a combination of several powerful modularity theorems and class field theory we derive a new modularity theorem for semistable elliptic curves over certain real abelian fields. We deduce that if K is a real abelian field of conductor n<100, with 5 n and n 29, 87, 89, then every semistable elliptic curve E over K is modular. Let , m, p be prime, with , m 5 and p 3.To a putative non-trivial primitive solution of the generalized Fermat x2+y2m=zp we associate a Frey elliptic curve defined over Q(ζp)+, and study its mod representation with the help of level lowering and our modularity result. We deduce the non-existence of non-trivial primitive solutions if p 11, or if p=13 and , m 7.