Rank 2 local systems and abelian varieties II

Abstract

Let X/Fq be a smooth, geometrically connected, quasiprojective variety. Let E be a semisimple overconvergent F-isocrystal on X. Suppose that irreducible summands Ei of E have rank 2, determinant Qp(-1), and infinite monodromy at ∞. Suppose further that for each closed point x of X, the characteristic polynomial of E at x is in Q[t]⊂ Qp[t]. Then there exists a non-trivial open set U⊂ X such that E|U comes from a family of abelian varieties on U. As an application, let L1 be an irreducible lisse Ql sheaf on X that has rank 2, determinant Ql(-1), and infinite monodromy at ∞. Then all crystalline companions to L1 exist (as predicted by Deligne's crystalline companions conjecture) if and only if there exists a non-trivial open set U⊂ X and an abelian scheme πU AU→ U such that L1|U is a summand of R1(πU)*Ql.