📝 SummarXiv

Abstract

In this paper, we introduce the notion of u-S-essential submodules as a uniform S-version of essential submodules. Let R be a commutative ring and S a multiplicative subset of R. A submodule K of an R-module M is said to be u-S-essential if whenever L is a submodule of M such that s1(K\cap L)=0 for some s1 in S, then s2L = 0 for some s2 in S. Several properties of this notion are studied. The notion of u-S injective u-S-envelope of an R-module M is also introduced and some of its properties are discussed. For example, we show that a u-S-injective u-S-envelope is characterized by a u-S-essential submodule.