Discrete amenable group actions on von Neumann algebras and invariant nuclear C*-subalgebras

Abstract

Let G be a countable discrete amenable group, M a McDuff factor von Neumann algebra, and A a separable nuclear weakly dense C*-subalgebra of M. We show that if two centrally free actions of G on M differ up to approximately inner automorphisms then they are outer conjugate by an approximately inner automorphism, in the operator norm topology, which makes A invariant. In addition, when A is unital, simple, and with a unique tracial state and α is an automorphism of A we also show that the aperiodicity of α on the von Neumann algebra is equivalent to the weak Rohlin property.