Characters, L2-Betti numbers and an equivariant approximation theorem

Abstract

Let G be a group with a finite subgroup H. We define the L2-multiplicity of an irreducible representation of H in the L2-homology of a proper G-CW-complex. These invariants generalize the L2-Betti numbers. Our main results are approximation theorems for L2-multiplicities which extend the approximation theorems for L2-Betti numbers of L\"uck, Farber and Elek-Szab\'o respectively. The main ingredient is the theory of characters of infinite groups and a method to induce characters from finite subgroups. We discuss applications to the cohomology of (arithmetic) groups.