On the vanishing cohomology problem for cocycle actions of groups on II1 factors

Abstract

We prove that any free cocycle action of a countable amenable group on any II1 factor N can be perturbed by inner automorphisms to a genuine action. This vanishing cohomology property, that we call V C, is also closed to free products with amalgamation over finite groups. But beyond this no other examples of V C-groups are known. In turn, by considering special cocycle actions N in the case N is the hyperfinite II1 factor R, respectively the free group factor N=L( F∞), we exclude many groups from being V C. We also show that any free action R gives rise to a free cocycle -action on the II1 factor R' Rω whose vanishing cohomology is equivalent to Connes' Approximate Embedding property for the II1 factor R .