二面体群的非通图的度和能量

Q3 Multidisciplinary Malaysian journal of science Pub Date : 2022-09-30 DOI:10.22452/mjs.sp2022no1.5

M. U. Romdhini, A. Nawawi

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引用次数: 2

摘要

对于有限群G，设Z（G）是G的中心。则G上的非交换图，用ΓG表示，以G\Z（G，当vpvq≠vqvp时，两个不同的顶点vp和vq通过边连接为其顶点集。图的度和矩阵是一个平方矩阵，当p与q不同时，其第（p，q）项为dvp+dvq，否则为零，其中dvi是顶点vi的度。本文给出了2n，D2n阶二面体群的非交换图的度总和能量EDS（ΓG）的通式，对于所有n≥3。

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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DEGREE SUM ENERGY OF NON-COMMUTING GRAPH FOR DIHEDRAL GROUPS

For a finite group G, let Z(G) be the centre of G. Then the non-commuting graph on G, denoted by ΓG, has G\Z(G) as its vertex set with two distinct vertices vp and vq joined by an edge whenever vpvq ≠ vqvp. The degree sum matrix of a graph is a square matrix whose (p,q)-th entry is dvp + dvq whenever p is different from q, otherwise, it is zero, where dvi is the degree of the vertex vi. This study presents the general formula for the degree sum energy, EDS (ΓG), for the non-commuting graph of dihedral groups of order 2n, D2n, for all n ≥ 3.

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来源期刊

Malaysian journal of science Multidisciplinary-Multidisciplinary

CiteScore

1.10

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0.00%

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