Duality of Preenvelopes and Pure Injective Modules

Abstract

Let R be an arbitrary ring and (-)+=Z(-, Q/Z) where Z is the ring of integers and Q is the ring of rational numbers, and let C be a subcategory of left R-modules and D a subcategory of right R-modules such that X+∈ D for any X∈ C and all modules in C are pure injective. Then a homomorphism f: A C of left R-modules with C∈ C is a C-(pre)envelope of A provided f+: C+ A+ is a D-(pre)cover of A+. Some applications of this result are given.