Classification of ω-categorical monadically stable structures

Abstract

A first-order structure A is called monadically stable iff every expansion of A by unary predicates is stable. In this article we give a classification of the class M of ω-categorical monadically stable structures in terms of their automorphism groups. We prove in turn that M is smallest class of structures which contains the one-element pure set, closed under isomorphisms, and closed under taking finitely disjoint unions, infinite copies, and finite index first-order reducts. Using our classification we show that every structure in M is first-order interdefinable with a finitely bounded homogeneous structure. We also prove that every structure in M has finitely many reducts up to interdefinability, thereby confirming Thomas' conjecture for the class M.