Some results on the comaximal ideal graph of a commutative ring

Yıl 2018, Cilt: 5 Sayı: 2, 85 - 99, 15.05.2018

Subramanian Visweswaran Jaydeep Parejiya

https://doi.org/10.13069/jacodesmath.423751

Cited By: 1

Öz

The rings considered in this article are commutative with identity which admit at least two maximal ideals. Let $R$ be a ring such that $R$ admits at least two maximal ideals. Recall from Ye and Wu (J. Algebra Appl. 11(6): 1250114, 2012) that the comaximal ideal graph of $R$, denoted by $\mathscr{C}(R)$ is an undirected simple graph whose vertex set is the set of all proper ideals $I$ of $R$ such that $I\not\subseteq J(R)$, where $J(R)$ is the Jacobson radical of $R$ and distinct vertices $I_{1}$, $I_{2}$ are joined by an edge in $\mathscr{C}(R)$ if and only if $I_{1} + I_{2} = R$. In Section 2 of this article, we classify rings $R$ such that $\mathscr{C}(R)$ is planar. In Section 3 of this article, we classify rings $R$ such that $\mathscr{C}(R)$ is a split graph. In Section 4 of this article, we classify rings $R$ such that $\mathscr{C}(R)$ is complemented and moreover, we determine the $S$-vertices of $\mathscr{C}(R)$.

Anahtar Kelimeler

Comaximal ideal graph, Special principal ideal ring, Planar graph, Split graph, Complement of a vertex in a graph

Kaynakça

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