Incomparable actions of free groups

Abstract

Suppose that X is a Polish space, E is a countable Borel equivalence relation on X, and μ is an E-invariant Borel probability measure on X. We consider the circumstances under which for every countable non-abelian free group , there is a Borel sequence (·r)r ∈ R of free actions of on X, generating subequivalence relations Er of E with respect to which μ is ergodic, with the further property that (Er)r ∈ R is an increasing sequence of relations which are pairwise incomparable under μ-reducibility. In particular, we show that if E satisfies a natural separability condition, then this is the case as long as there exists a free Borel action of a countable non-abelian free group on X, generating a subequivalence relation of E with respect to which μ is ergodic.