On universal modules with pure embeddings

Abstract

We show that certain classes of modules have universal models with respect to pure embeddings. Theorem. Let R be a ring, T a first-order theory with an infinite model extending the theory of R-modules and KT=(Mod(T), ≤pp) (where ≤pp stands for pure submodule). Assume KT has joint embedding and amalgamation. If λ|T|=λ or ∀ μ < λ( μ|T| < λ), then KT has a universal model of cardinality λ. As a special case we get a recent result of Shelah [Sh17, 1.2] concerning the existence of universal reduced torsion-free abelian groups with respect to pure embeddings. We begin the study of limit models for classes of R-modules with joint embedding and amalgamation. We show that limit models with chains of long cofinality are pure-injective and we characterize limit models with chains of countable cofinality. This can be used to answer Question 4.25 of [Maz]. As this paper is aimed at model theorists and algebraists an effort was made to provide the background for both.