W*-superrigidity of mixing Gaussian actions of rigid groups

Abstract

We generalize W*-superrigidity results about Bernoulli actions of rigid groups to general mixing Gaussian actions. We thus obtain the following: If \ is any ICC group which is w-rigid (i.e. it contains an infinite normal subgroup with the relative property (T)) then any mixing Gaussian action σ\ of \ is W*-superrigid. More precisely, if \ is another free ergodic action of a group \ such that the crossed-product von Neumann algebras associated with \ and σ\ are isomorphic, then \ and \ are isomorphic, and the actions \ and σ\ are conjugate. We prove a similar statement whenever \ is a non-amenable ICC product of two infinite groups.