On the absoluteness of 1-freeness

Abstract

1-free groups, abelian groups for which every countable subgroup is free, exhibit a number of interesting algebraic and set-theoretic properties. In this paper, we give a complete proof that the property of being 1-free is absolute; that is, if an abelian group G is 1-free in some transitive model M of ZFC, then it is 1-free in any transitive model of ZFC containing G. The absoluteness of 1-freeness has the following remarkable consequence: an abelian group G is 1-free in some transitive model of ZFC if and only if it is (countable and) free in some model extension. This set-theoretic characterization will be the starting point for further exploring the relationship between the set-theoretic and algebraic properties of 1-free groups. In particular, this paper will demonstrate how proofs may be dramatically simplified using model extensions for 1-free groups.