Level structure, arithmetic representations, and noncommutative Siegel linearization

Abstract

Let be a prime, k a finitely generated field of characteristic different from , and X a smooth geometrically connected curve over k. Say a semisimple representation of π1et(X k) is arithmetic if it extends to a finite index subgroup of π1et(X). We show that there exists an effective constant N=N(X,) such that any semisimple arithmetic representation of π1et(X k) into GLn(Z), which is trivial mod N, is in fact trivial. This extends a previous result of the second author from characteristic zero to all characteristics. The proof relies on a new noncommutative version of Siegel's linearization theorem and the -adic form of Baker's theorem on linear forms in logarithms.