近环强零因子图的直径、周长和着色

Pub Date : 2016-12-23 DOI:10.5666/KMJ.2016.56.4.1103

P. Das

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引用次数: 2

摘要

．在这篇文章里,我们研究a导演简单graphΓs (N) for a near-ring N套V∗(N)》,哪里vertices集》是所有左派N的-subsets nonzero左annihilators和为任何两个distinct vertices I, J∈V∗(N), I '是adjacent to J如果只和如果IJ = 0。这里,我们成交直径,girth》和《coloring graphΓs (N)。而且,我们证明a suﬃcient condition for occurrence of a常规编程元素of near-ring N》境之左者一些vertex坚强zero-divisor graphΓs (N)。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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On the Diameter, Girth and Coloring of the Strong Zero‑Divisor Graph of Near‑rings

. In this paper, we study a directed simple graph Γ s ( N ) for a near-ring N , where the set V ∗ ( N ) of vertices is the set of all left N -subsets of N with nonzero left annihilators and for any two distinct vertices I, J ∈ V ∗ ( N ), I is adjacent to J if and only if IJ = 0. Here, we deal with the diameter, girth and coloring of the graph Γ s ( N ). Moreover, we prove a suﬃcient condition for occurrence of a regular element of the near-ring N in the left annihilator of some vertex in the strong zero-divisor graph Γ s ( N ).

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