L2-Betti numbers of C*-tensor categories associated with totally disconnected groups

Abstract

We prove that the L2-Betti numbers of a rigid C*-tensor category vanish in the presence of an almost-normal subcategory with vanishing L2-Betti numbers, generalising a result of Bader, Furman and Sauer. We apply this criterion to show that the categories constructed from totally disconnected groups by Arano and Vaes have vanishing L2-Betti numbers. Given an almost-normal inclusion of discrete groups <, with acting on a type II1 factor P by outer automorphisms, we relate the cohomology theory of the quasi-regular inclusion P⊂ P to that of the Schlichting completion G of <. If < is unimodular, this correspondence allows us to prove that the L2-Betti numbers of P⊂ P are equal to those of G.