Asymptotic structure of free Araki-Woods factors

Abstract

The purpose of this paper is to investigate the structure of Shlyakhtenko's free Araki-Woods factors using the framework of ultraproduct von Neumann algebras. We first prove that all the free Araki-Woods factors (H R, Ut) are ω-solid in the following sense: for every von Neumann subalgebra Q ⊂ (H R, Ut) that is the range of a faithful normal conditional expectation and such that the relative commutant Q' Mω is diffuse, we have that Q is amenable. Next, we prove that the continuous cores of the free Araki-Woods factors (H R, Ut) associated with mixing orthogonal representations U : R O(H R) are ω-solid type II∞ factors. Finally, when the orthogonal representation U : R O(H R) is weakly mixing, we prove a dichotomy result for all the von Neumann subalgebras Q ⊂ (H R, Ut) that are globally invariant under the modular automorphism group (σtU) of the free quasi-free state U.