Independence of -adic Galois representations over function fields

Abstract

Let K be a finitely generated extension of Q. We consider the family of -adic representations ( varies through the set of all prime numbers) of the absolute Galois group of K, attached to -adic cohomology of a smooth separated scheme of finite type over K. We prove that the fields cut out from the algebraic closure of K by the kernels of the representations of the family are linearly disjoint over a finite extension of K. This gives a positive answer to a question asked by Serre in 1991.