S-Prime Right Submodules and an S-Version of Prime Avoidance

Abstract

Let S be an m-system of a ring R, and P a submodule of a right R-module M. This paper, presents the notion of S-prime submodule and provides some properties and equivalent definitions. We define S-multiplication right module, and prove that in multiplication (S-multiplication) right R-module M, the ideal (P :R M) is a right S-prime ideal of R if and only if P is an S-prime submodule of M. Moreover, we give an S-version of prime avoidance lemma. Furthermore, we define S-finite and S-Noetherian right modules following the definitions in [1]. We prove that a multiplication finitely generated right R-module M is S-Noetherian if (N :R M) is an S-prime ideal of R, for all submodules N of M. In addition, we give some examples of right S-Noetherian rings.