A model theoretic solution to a problem of L\'aszl\'o Fuchs

Abstract

Problem 5.1 in page 181 of [Fuc15] asks to find the cardinals λ such that there is a universal abelian p-group for purity of cardinality λ, i.e., an abelian p-group Uλ of cardinality λ such that every abelian p-group of cardinality ≤ λ purely embeds in Uλ. In this paper we use ideas from the theory of abstract elementary classes to show: Theorem. Let p be a prime number. If λ0=λ or ∀ μ < λ( μ0 < λ), then there is a universal abelian p-group for purity of cardinality λ. Moreover for n≥ 2, there is a universal abelian p-group for purity of cardinality n if and only if 20 ≤ n. As the theory of abstract elementary classes has barely been used to tackle algebraic questions, an effort was made to introduce this theory from an algebraic perspective.