The first L2-Betti number and approximation in arbitrary characteristic

Abstract

Let G be a finitely generated group and (Gi) a descending chain of finite index normal subgroups of G. Given a field K, we consider the sequence b1(Gi;K)/[G:Gi] of normalized first Betti numbers of Gi with coefficients in K, which we call a K-approximation for b1(2)(G), the first L2-Betti number of G. In this paper we address the questions of when Q-approximation and Fp-approximation have a limit, when these limits coincide, when they are independent of the sequence (Gi) and how they are related to b1(2)(G). In particular, we show that the limit of the sequence b1(Gi;Fp)/[G:Gi] is greater than or equal to b1(2)(G) under the assumptions that (Gi) has trivial intersection and each G/Gi is a finite p-group.