The classification problem for extensions of torsion-free abelian groups, I

Abstract

Let C,A be countable abelian groups. In this paper we determine the complexity of classifying extensions C by A, in the cases when C is torsion-free and A is a p-group, a torsion group with bounded primary components, or a free R-module for some subring R⊂eq Q. Precisely, for such C and A we describe in terms of C and A the potential complexity class in the sense of Borel complexity theory of the equivalence relation RExt( C,A) of isomorphism of extensions of C by A. This complements a previous result by the same author, settling the case when C is torsion and A is arbitrary. We establish the main result within the framework of Borel-definable homological algebra, recently introduced in collaboration with Bergfalk and Panagiotopoulos. As a consequence of our main results, we will obtain that if C is torsion-free and A is either a free R-module or a torsion group with bounded components, then an extension of C by A splits if and only if it splits on all finite-rank subgroups of C. This is a purely algebraic statements obtained with methods from Borel-definable homological algebra.