On Some Distance Spectral Characteristics of Trees

Axioms Pub Date : 2024-07-23 DOI:10.3390/axioms13080494
Sakander Hayat, Asad Khan, Mohammed J. F. Alenazi
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Abstract

Graham and Pollack in 1971 presented applications of eigenvalues of the distance matrix in addressing problems in data communication systems. Spectral graph theory employs tools from linear algebra to retrieve the properties of a graph from the spectrum of graph-theoretic matrices. The study of graphs with “few eigenvalues” is a contemporary problem in spectral graph theory. This paper studies graphs with few distinct distance eigenvalues. After mentioning the classification of graphs with one and two distinct distance eigenvalues, we mainly focus on graphs with three distinct distance eigenvalues. Characterizing graphs with three distinct distance eigenvalues is “highly” non-trivial. In this paper, we classify all trees whose distance matrix has precisely three distinct eigenvalues. Our proof is different from earlier existing proof of the result as our proof is extendable to other similar families such as unicyclic and bicyclic graphs. The main tools which we employ include interlacing and equitable partitions. We also list all the connected graphs on ν ≤ 6 vertices and compute their distance spectra. Importantly, all these graphs on ν ≤ 6 vertices are determined from their distance spectra. We deliver a distance cospectral pair of order 7, thus making it a distance cospectral pair of the smallest order. This paper is concluded with some future directions.
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论树木的一些距离谱特征
1971 年,Graham 和 Pollack 提出了距离矩阵特征值在解决数据通信系统问题中的应用。谱图理论利用线性代数的工具,从图理论矩阵的谱中检索图的属性。研究具有 "少数特征值 "的图是谱图理论的当代难题。本文研究的是具有几个不同距离特征值的图。在提到具有一个和两个不同距离特征值的图的分类之后,我们主要关注具有三个不同距离特征值的图。描述具有三个不同距离特征值的图是 "高度 "非难的。在本文中,我们对距离矩阵恰好有三个不同特征值的所有树进行了分类。我们的证明不同于之前已有的结果证明,因为我们的证明可以扩展到其他类似的族,如单环图和双环图。我们使用的主要工具包括交错和等分。我们还列出了 ν ≤ 6 个顶点上的所有连通图,并计算了它们的距离谱。重要的是,ν ≤ 6 个顶点上的所有这些图都是根据它们的距离谱确定的。我们得到了阶数为 7 的距离余谱对,从而使其成为阶数最小的距离余谱对。本文最后提出了一些未来发展方向。
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