On cellular covers with free kernels

Abstract

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*()= π for each ∈ R(G,G) (where maps are acting on the left). In this paper we show that every cotorsion-free module K of finite rank can be realized as the kernel of a cellular cover of some cotorsion-free module of rank 2. In particular, every free abelian group of any finite rank appears then as the kernel of a cellular cover of a cotorsion-free abelian group of rank 2. This situation is best possible in the sense that cotorsion-free abelian groups of rank 1 do not admit cellular covers with free kernel except for the trivial ones. This work comes motivated by an example due to Buckner and Dugas, and recent results obtained by G\"obel--Rodr\'iguez--Str\"ungmann, and Fuchs--G\"obel.