Weak equivalence and non-classifiability of measure preserving actions

Abstract

Ab\'ert-Weiss have shown that the Bernoulli shift s of a countably infinite group is weakly contained in any free measure preserving action (mpa) b of . We establish a strong version of this result, conjectured by Ioana, by showing that s × b is weakly equivalent to b. This is generalized to non-free mpa's using random Bernoulli shifts. The result for free mpa's is used to show that isomorphism on the weak equivalence class of a free mpa does not admit classification by countable structures. This provides a negative answer to a question of Ab\'ert and Elek. We also answer a question of Kechris regarding two ergodic theoretic properties of residually finite groups. An infinite residually finite group is said to have EMD if the action p of on its profinite completion weakly contains all ergodic mpa's of , and is said to have property MD if i × p weakly contains all mpa's of , where i denotes the trivial action on a standard non-atomic probability space. Kechris asks if these two properties equivalent and we provide a positive answer by studying the relationship between convexity and weak containment.