Some results on the sum-annihilating essential submodule graph
Author(s):
Article Type:
Research/Original Article (دارای رتبه معتبر)
Abstract:
Consider a commutative ring $R$ with a non-zero identity $1\neq 0$, and let $M$ be a non-zero unitary module over $R$. In this document, our goal is to present the sum-annihilating essential submodule graph $\mathbb{AE}^{0}_{R}(M)$ and its subgraph $\mathbb{AE}^{1}_{R}(M)$ of a module $M$ over a commutative ring $R$ which is described in the following way: The vertex set of graph $\mathbb{AE}^{0}_{R}(M)$ (resp., $\mathbb{AE}^{1}_{R}(M)$) is the collection of all (resp., non-zero proper) annihilating submodules of $M$ and two separate annihilating submodules $N$ and $K$ are connected anytime $N+K$ is essential in $M$. We study and investigate the basic properties of graphs $\mathbb{AE}^{i}_{R}(M)$ ($i=0, 1$) and will present some related results. Additionally, we explore how the properties of graphs interact with the algebraic structures they represent.
Keywords:
Language:
English
Published:
Journal of Algebraic Structures and Their Applications, Volume:11 Issue: 4, Autumn 2024
Pages:
321 to 335
https://www.magiran.com/p2828444
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