A uniform open image theorem for l-adic representations in positive characteristic

Abstract

Let k be a finitely generated field of characteristic p > 0 and a prime. Let X be a smooth, separated, geometrically connected curve of finite type over k and : π1(X)→ GLr( Z) a continuous representation of the ηle fundamental group of X with image G. Any k-rational point x:Spec(k)→ X induces a local representation x: π1(Spec(k)) → π1(X) → GLr( Z) with image Gx. The goal of this paper is to study how Gx varies with x∈ X(k). In particular we prove that if ≠ p and every open subgroup of (π1(X k)) has finite abelianization, then the set Xex(k) of k-rational points such that Gx is not open in G is finite and there exists a constant C≥ 0 such that [G:Gx]≤ C for all x∈ X(k)-Xex(k). This result can be applied to obtain uniform bounds for the -primary torsion of groups theoretic invariants in one dimensional families of varieties. For example, torsion of abelian varieties and the Galois invariants of the geometric Brauer group. This extends to positive characteristic previous results of Anna Cadoret and Akio Tamagawa in characteristic 0.