Cohomology of groups acting on vector spaces over finite fields

Abstract

Let Fq be the finite field with q=pm elements and G be a subgroup of GLn(Fq). A famous theorem of Nori published in 1987 states that there exists a (non-effective) constant c(n), depending only on n, such that if p>c(n) and G acts semisimply on Fpn, then H1(G,Fpn)=0. We solve the long-standing problem, also considered by Serre of giving an effective proof of Nori's Theorem. Our approach yields the optimal constant c(n)=n+2. We also prove a more general version of Nori's theorem, namely, that for all powers q of p, if G acts semisimply on Fqn and p>n+2, then H1(G,Fqn) is trivial. We apply these results to refine a criterion, proved by Ciperiani and Stix, which gives sufficient conditions for an affirmative answer to a classical question posed by Cassels in the case of abelian varieties over number fields.