Structural and Spectral Properties of Chordal Ring, Multi-Ring, and Mixed Graphs

Symmetry Pub Date : 2024-09-02 DOI:10.3390/sym16091135
M. A. Reyes, C. Dalfó, M. A. Fiol
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Abstract

The chordal ring (CR) graphs are a well-known family of graphs used to model some interconnection networks for computer systems in which all nodes are in a cycle. Generalizing the CR graphs, in this paper, we introduce the families of chordal multi-ring (CMR), chordal ring mixed (CRM), and chordal multi-ring mixed (CMRM) graphs. In the case of mixed graphs, we can have edges (without direction) and arcs (with direction). The chordal ring and chordal ring mixed graphs are bipartite and 3-regular. They consist of a number r (for r≥1) of (undirected or directed) cycles with some edges (the chords) joining them. In particular, for CMR, when r=1, that is, with only one undirected cycle, we obtain the known families of chordal ring graphs. Here, we used plane tessellations to represent our chordal multi-ring graphs. This allowed us to obtain their maximum number of vertices for every given diameter. Additionally, we computationally obtained their minimum diameter for any value of the number of vertices. Moreover, when seen as a lift graph (also called voltage graph) of a base graph on Abelian groups, we obtained closed formulas for the spectrum, that is, the eigenvalue multi-set of its adjacency matrix.
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弦环、多环和混合图的结构和谱特性
弦环图(CR)是一个著名的图族,用于模拟计算机系统中所有节点都在一个周期内的某些互连网络。在本文中,我们对 CR 图进行了归纳,引入了弦多环(CMR)、弦环混合(CRM)和弦多环混合(CMRM)图族。在混合图中,我们可以有边(无方向)和弧(有方向)。弦环图和弦环混合图是双方形和三规则图。它们由若干个 r(r≥1)的(无向或有向)循环和连接它们的一些边(弦)组成。特别是对于 CMR,当 r=1 时,即只有一个无向循环时,我们可以得到已知的弦环图族。在这里,我们使用平面方格来表示弦多环图。这样,我们就能获得每个给定直径下的最大顶点数。此外,我们还通过计算获得了任何顶点数量值的最小直径。此外,如果将其视为阿贝尔群上基图的提升图(也称为电压图),我们还获得了频谱的封闭公式,即其邻接矩阵的特征值多集。
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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