关于与整数环模数 $n$ 相关的压缩零除数图

IF 1 Q1 MATHEMATICS Carpathian Mathematical Publications Pub Date : 2023-12-26 DOI:10.15330/cmp.15.2.552-558

M. Aijaz, K. Rani, S. Pirzada

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引用次数: 0

摘要

让 $R$ 是一个具有统一性 $1\ne 0$ 的交换环。在本文中，我们完整地描述了整数环 modulo $n$ 的压缩零因子图的顶点和边色度数。我们找到了 $\mathbb Z_n$ 的压缩零除数图 $\Gamma_E(\mathbb Z_n)$ 的簇数，并证明了 $\Gamma_E(\mathbb Z_n)$ 是弱完美的。我们还证明了 $\Gamma_E(\mathbb Z_n)$ 的边色度数等于最大度数，证明了 $\Gamma_E(\mathbb Z_n)$ 属于第 1 类图族。

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On compressed zero divisor graphs associated to the ring of integers modulo $n$

Let $R$ be a commutative ring with unity $1\ne 0$. In this paper, we completely describe the vertex and the edge chromatic number of the compressed zero divisor graph of the ring of integers modulo $n$. We find the clique number of the compressed zero divisor graph $\Gamma_E(\mathbb Z_n)$ of $\mathbb Z_n$ and show that $\Gamma_E(\mathbb Z_n)$ is weakly perfect. We also show that the edge chromatic number of $\Gamma_E(\mathbb Z_n)$ is equal to the largest degree proving that $\Gamma_E(\mathbb Z_n)$ resides in class 1 family of graphs.

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