Properly ergodic structures

Abstract

We consider ergodic Sym(N)-invariant probability measures on the space of L-structures with domain N (for L a countable relational language), and call such a measure a properly ergodic structure when no isomorphism class of structures is assigned measure 1. We characterize those theories in countable fragments of Lω1, ω for which there is a properly ergodic structure concentrated on the models of the theory. We show that for a countable fragment F of Lω1, ω the almost-sure F-theory of a properly ergodic structure has continuum-many models (an analogue of Vaught's Conjecture in this context), but its full almost-sure Lω1, ω-theory has no models. We also show that, for an F-theory T, if there is some properly ergodic structure that concentrates on the class of models of T, then there are continuum-many such properly ergodic structures.