Some rigidity results for II1 factors arising from wreath products of property (T) groups

Abstract

We show that any infinite collection (n)n∈ N of icc, hyperbolic, property (T) groups satisfies the following von Neumann algebraic infinite product rigidity phenomenon. If is an arbitrary group such that L(n∈ N n) L() then there exists an infinite direct sum decomposition =(n ∈ N n ) A with A icc amenable such that, for all n∈ N, up to amplifications, we have L(n) L(n) and L(k≥ n k ) L((k≥ n k) A). The result is sharp and complements the previous finite product rigidity property found in [CdSS16]. Using this we provide an uncountable family of restricted wreath products of icc, property (T) groups , whose wreath product structure is recognizable, up to a normal amenable subgroup, from their von Neumann algebras L(). Along the way we highlight several applications of these results to the study of rigidity in the C*-algebra setting.