The Annihilating-Ideal Graph of a Ring

Abstract

Let S be a semigroup with 0 and R be a ring with 1. We extend the definition of the zero-divisor graphs of commutative semigroups to not necessarily commutative semigroups. We define an annihilating-ideal graph of a ring as a special type of zero-divisor graph of a semigroup. We introduce two ways to define the zero-divisor graphs of semigroups. The first definition gives a directed graph (S), and the other definition yields an undirected graph (S). It is shown that (S) is not necessarily connected, but (S) is always connected and diam((S))≤ 3. For a ring R define a directed graph APOG(R) to be equal to (IPO(R)), where IPO(R) is a semigroup consisting of all products of two one-sided ideals of R, and define an undirected graph APOG(R) to be equal to (IPO(R)). We show that R is an Artinian (resp., Noetherian) ring if and only if APOG(R) has DCC (resp., ACC) on some special subset of its vertices. Also, It is shown that APOG(R) is a complete graph if and only if either (D(R))2=0, R is a direct product of two division rings, or R is a local ring with maximal ideal m such that IPO(R)=\0,m,m2, R\. Finally, we investigate the diameter and the girth of square matrix rings over commutative rings Mn× n(R) where n≥ 2.