A note on images of Galois representations (with an application to a result of Litt)

Abstract

Let X be a variety (possibly non-complete or singular) over a finitely generated field k of characteristic 0. For a prime number , let be the Galois representation on the first -adic cohomology of X. We show that if varies the image of is of bounded index in the group of Z-points of its Zariski closure. We use this to improve a recent result of Litt about arithmetic representations of geometric fundamental groups. Litt's result says that there exist constants N = N(X,) such that every arithmetic representation π1(Xk) GLn(Z) that is trivial modulo N is unipotent. We show that these constants can in fact be chosen independently of .