Abelian varieties genuinely of GLn-type
Abstract
A simple abelian variety A defined over a number field k is called of GLn-type if there exists a number field of degree 2(A)/n which is a subalgebra of End0(A). We say that A is genuinely of GLn-type if its base change Ak contains no isogeny factor of GLm-type for m<n. This generalizes the classical notion of abelian variety of GL2-type without potential complex multiplication introduced by Ribet. We develop a theory of building blocks, inner twists and nebentypes for these varieties. When the center of End0(A) is totally real, Chi, Banaszak, Gajda, and Kraso\'n have attached to A a compatible system of Galois representations of degree n which is either symplectic or orthogonal. We extend their results under the weaker assumption that the center of End0(Ak) be totally real. We conclude the article by showing an explicit family of abelian fourfolds genuinely of GL4-type. This involves the construction of a family of genus 2 curves defined over a quadratic field whose Jacobian has trivial endomorphism ring and is isogenous to its Galois conjugate.
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