S-small and S-essential submodules

Abstract

This paper is concerned with S-co-m modules which are a generalization of co-m modules. In section 2, we introduce the S-small and S-essential submodules of a unitary R-module M over a commutative ring R with 1≠ 0 such that S is a multiplicatively closed subset of R. We prove that if M is an S-co-m module satisfying the S-DAC and N≤ M, then N≤ SeM if and only if there exists I SR such that s(0:MI)≤ N≤ (0 :MI) for some s∈ S. Let M be a faithful S-strong co-m R-module. We prove that if N SM then there exists an ideal I≤ SeR such that s(0 :MI)≤ N≤ (0 :MI). The converse is true if S=\1\and M is a prime module. In section 3, we introduce the S-quasi-copure submodules N of an R-module M and investigate some results related to this class of submodules.