Essential ideals represented by mod-annihilators of modules

Abstract

Let R be a commutative ring with unity, M be a unitary R-module and G a finite abelian group (viewed as a Z-module). The main objective of this paper is to study properties of mod-annihilators of M. For x ∈ M, we study the ideals [x : M] =\r∈ R | rM⊂eq Rx\ of R corresponding to mod-annihilator of M. We investigate that when [x : M] is an essential ideal of R. We prove that arbitrary intersection of essential ideals represented by mod-annihilators is an essential ideal. We observe that [x : M] is injective if and only if R is non-singular and the radical of R/[x : M] is zero. Moreover, if essential socle of M is non-zero, then we show that [x : M] is the intersection of maximal ideals and [x : M]2 = [x : M]. Finally, we discuss the correspondence of essential ideals of R and vertices of the annihilating graphs realized by M over R.