Goldie Pure Rickart Modules and Duality

Let R be a commutative ring with identity and M be an R-module. Let Z2 (M) be the second singular submodule of M. In this research we introduce the concept of Goldie Pure Rickart modules and dual Goldie Pure Rickart modules as a generalization of Goldie Rickart modules and dual Goldie Rickart modules respectively. An R-module M is called Goldie Pure Rickart if f^ (-1) (Z2 (M)) is a pure ( in sense of Anderson and Fuller) submodule of M for every f EndR (M). An R-module M is called dual Goldie Pure Rickart if ^ (-1) ( Im (f)) is a pure ( in sense of Anderson and Fuller) submodule of M for every f EndR (M). Various properties of this class of modules are given and some relationships between these modules and other related modules are studied.