Existentially closed measure-preserving actions of free groups

Abstract

This paper is motivated by the study of probability measure-preserving (pmp) actions of free groups using continuous model theory. Such an action is treated as a metric structure that consists of the measure algebra of the probability measure space expanded by a family of its automorphisms. We prove that the existentially closed pmp actions of a given free group form an elementary class, and therefore the theory of pmp Fk-actions has a model companion. We show this model companion is stable and has quantifier elimination. We also prove that the action of Fk on its profinite completion with the Haar measure is metrically generic and therefore, as we show, it is existentially closed. We deduce our main result from a more general theorem, which gives a set of sufficient conditions for the existence of a model companion for the theory of Fk-actions on a separably categorical, stable metric structure.