Rank 2 local systems and abelian varieties

Abstract

Let X/Fq be a smooth geometrically connected variety. Inspired by work of Corlette-Simpson over C, we formulate a conjecture that absolutely irreducible rank 2 local systems with infinite monodromy on X come from families of abelian varieties. When X is a projective variety, we prove a Lefschetz-style theorem for abelian schemes of GL2-type on X, modeled after a theorem of Simpson. If one assumes a strong form of Deligne's (p-adic) companions conjecture from Weil II, this implies that our conjecture for projective varieties also reduces to the case of projective curves. We also answer affirmitavely a question of Grothendieck on extending abelian schemes via their p-divisible groups.