On endomorphism algebras of GL2-type abelian varieties and Diophantine applications

Abstract

Let f and g be two different newforms without complex multiplication having the same coefficient field. The main result of the present article proves that a congruence between the Galois representations attached to f and to g for a large prime p implies an isomorphism between the endomorphism algebras of the abelian varieties Af and Ag attached to f and g by the Eichler-Shimura construction. This implies important relations between their building blocks. A non-trivial application of our result is that for all prime numbers d congruent to 3 modulo 8 satisfying that the class number of Q(-d) is prime to 3, the equation x4+dy2 =zp has no non-trivial primitive solutions when p is large enough. We prove a similar result for the equation x2+dy6=zp.

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