Enayat Models of Peano Arithmetic

Abstract

Simpson showed that every countable model M PA has an expansion (M, X) PA* that is pointwise definable. A natural question is whether, in general, one can obtain expansions of a non-prime model in which the definable elements coincide with those of the underlying model. Enayat showed that this is impossible by proving that there is M PA such that for each undefinable class X of M, the expansion (M, X) is pointwise definable. We call models with this property Enayat models. In this paper, we study Enayat models and show that a model of PA is Enayat if it is countable, has no proper cofinal submodels and is a conservative extension of all of its elementary cuts. We then show that, for any countable linear order γ, if there is a model M such that Lt(M) γ, then there is an Enayat model M such that Lt(M) γ.