Cellular covers of cotorsion-free modules

Abstract

In this paper we improve recent results dealing with cellular covers of R-modules. Cellular covers (sometimes called co-localizations) come up in the context of homotopical localization of topological spaces. They are related to idempotent cotriples, idempotent comonads or coreflectors in category theory. Recall that a homomorphism of R-modules π: G H is called a cellular cover over H if π induces an isomorphism π*: R(G,G) R(G,H), where π*(φ)= π φ for each φ ∈ R(G,G) (where maps are acting on the left). On the one hand, we show that every cotorsion-free R-module of rank < is realizable as the kernel of some cellular cover G H where the rank of G is 3 +1 (or 3, if =1). The proof is based on Corner's classical idea of how to construct torsion-free abelian groups with prescribed countable endomorphism rings. This complements results by Buckner--Dugas BD. On the other hand, we prove that every cotorsion-free R-module H that satisfies some rigid conditions admits arbitrarily large cellular covers G H. This improves results by Fuchs-G\"obel FG and Farjoun-G\"obel-Segev-Shelah FGSS07.