S. Visweswaran scite author profile

Let R be a commutative ring with identity which is not an integral domain. An ideal I of a ring R is called an annihilating ideal if there exists r ∈ R\{0} such that Ir = (0). In this paper, we consider a simple undirected graph associated with R denoted by Ω(R) whose vertex set equals the set of all nonzero annihilating ideals of R and two distinct vertices I, J in this graph are joined by an edge if and only if I + J is also an annihilating ideal of R. In this paper, for any ring R which is not an integral domain, the problem of when Ω(R) is connected is discussed and if Ω(R) is connected, then it is shown that diam (Ω(R)) ≤ 2. Moreover, it is verified that gr (Ω(R)) ∈ {3, ∞}. Furthermore, rings R such that ω(Ω(R)) < ∞ are characterized.

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On the complement of a graph associated with the set of all nonzero annihilating ideals of a commutative ring

Visweswaran

Sarman

2016

Discrete Math. Algorithm. Appl.

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The rings considered in this paper are commutative with identity which are not integral domains. Recall that an ideal [Formula: see text] of a ring [Formula: see text] is called an annihilating ideal if there exists [Formula: see text] such that [Formula: see text]. As in [M. Behboodi and Z. Rakeei, The annihilating-ideal graph of commutative rings I, J. Algebra Appl. 10(4) (2011) 727–739], for any ring [Formula: see text], we denote by [Formula: see text] the set of all annihilating ideals of [Formula: see text] and by [Formula: see text] the set of all nonzero annihilating ideals of [Formula: see text]. Let [Formula: see text] be a ring. In [S. Visweswaran and H. D. Patel, A graph associated with the set of all nonzero annihilating ideals of a commutative ring, Discrete Math. Algorithm Appl. 6(4) (2014), Article ID: 1450047, 22pp], we introduced and studied the properties of a graph, denoted by [Formula: see text], which is an undirected simple graph whose vertex set is [Formula: see text] and distinct elements [Formula: see text] are joined by an edge in this graph if and only if [Formula: see text]. The aim of this paper is to study the interplay between the ring theoretic properties of a ring [Formula: see text] and the graph theoretic properties of [Formula: see text], where [Formula: see text] is the complement of [Formula: see text]. In this paper, we first determine when [Formula: see text] is connected and also determine its diameter when it is connected. We next discuss the girth of [Formula: see text] and study regarding the cliques of [Formula: see text]. Moreover, it is shown that [Formula: see text] is complemented if and only if [Formula: see text] is reduced.

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Some Properties of the Complement of the Zero-Divisor Graph of a Commutative Ring

Visweswaran

2011

ISRN Algebra

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Let R be a commutative ring with identity admitting at least two nonzero zero-divisors. Let Γ R c denote the complement of the zero-divisor graph Γ R of R. It is shown that if Γ R c is connected, then its radius is equal to 2 and we also determine the center of Γ R c . It is proved that if Γ R c is connected, then its girth is equal to 3, and we also discuss about its girth in the case when Γ R c is not connected. We discuss about the cliques in Γ R c .

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S. Visweswaran

Some results on S-primary ideals of a commutative ring

Some results on modules satisfying S-strong accr∗

A graph associated with the set of all nonzero annihilating ideals of a commutative ring

On the complement of a graph associated with the set of all nonzero annihilating ideals of a commutative ring

Some Properties of the Complement of the Zero-Divisor Graph of a Commutative Ring

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