G-local systems on smooth projective curves are potentially automorphic

Abstract

Let X be a smooth, projective, geometrically connected curve over a finite field Fq, and let G be a split semisimple algebraic group over Fq. Its dual group G is a split reductive group over Z. Conjecturally, any l-adic G-local system on X (equivalently, any conjugacy class of continuous homomorphisms π1(X) G(Ql)) should be associated to an everywhere unramified automorphic representation of the group G. We show that for any homomorphism π1(X) G(Ql) of Zariski dense image, there exists a finite Galois cover Y X over which the associated local system becomes automorphic.