A new approach to Baer and dual Baer modules

Abstract

Let R be a ring. It is proved that an R-module M is Baer (resp. dual Baer) if and only if every exact sequence 0→ X→ M→ Y→ 0 with Y∈ Cog(MR) (resp. X∈ Gen(MR)) splits. This shows that being (dual) Baer is a Morita invariant property. As more applications, the Baer condition for the R-module M+ = Hom Z(M, Q/ Z) is investigated and shown that R is a von Neumann regular ring, if R+ is a Baer R-module. Baer modules with (weak) chain conditions are studied and determined when a Baer (resp. dual baer) module is a direct sum of mutually orthogonal prime (resp. co-prime) modules. Finitely generated dual Baer modules over commutative rings are studeid