Classification of a family of non almost periodic free Araki-Woods factors

Abstract

We obtain a complete classification of a large class of non almost periodic free Araki-Woods factors (μ,m)" up to isomorphism. We do this by showing that free Araki-Woods factors (μ, m)" arising from finite symmetric Borel measures μ on R whose atomic part μa is nonzero and not concentrated on \0\ have the joint measure class C(k ≥ 1 μ k) as an invariant. Our key technical result is a deformation/rigidity criterion for the unitary conjugacy of two faithful normal states. We use this to also deduce rigidity and classification theorems for free product von Neumann algebras.