The Strong Spectral Property of Graphs: Graph Operations and Barbell Partitions

Pub Date : 2024-02-06 DOI:10.1007/s00373-023-02745-6
Sarah Allred, Emelie Curl, Shaun Fallat, Shahla Nasserasr, Houston Schuerger, Ralihe R. Villagrán, Prateek K. Vishwakarma
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Abstract

The utility of a matrix satisfying the Strong Spectral Property has been well established particularly in connection with the inverse eigenvalue problem for graphs. More recently the class of graphs in which all associated symmetric matrices possess the Strong Spectral Property (denoted \({\mathcal {G}}^\textrm{SSP}\)) were studied, and along these lines we aim to study properties of graphs that exhibit a so-called barbell partition. Such a partition is a known impediment to membership in the class \({\mathcal {G}}^\textrm{SSP}\). In particular we consider the existence of barbell partitions under various standard and useful graph operations. We do so by considering both the preservation of an already present barbell partition after performing said graph operations as well as barbell partitions which are introduced under certain graph operations. The specific graph operations we consider are the addition and removal of vertices and edges, the duplication of vertices, as well as the Cartesian products, tensor products, strong products, corona products, joins, and vertex sums of two graphs. We also identify a correspondence between barbell partitions and graph substructures called forts, using this correspondence to further connect the study of zero forcing and the Strong Spectral Property.

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图形的强谱属性:图操作和倒钩分区
满足强谱特性的矩阵的实用性已经得到了很好的证实,特别是在图的逆特征值问题方面。最近,人们研究了所有相关对称矩阵都具有强谱性质(表示为 \({mathcal {G}}^text\rm{SSP}\ )的一类图,我们将沿着这一思路研究表现出所谓杠铃分割的图的性质。众所周知,这种分区阻碍了图形成为类 \({/mathcal{G}}^\textrm{SSP}/)的成员。我们特别考虑了在各种标准和有用的图操作下杠铃分割的存在性。为此,我们既要考虑在执行上述图运算后保留已经存在的杠铃分割,也要考虑在某些图运算下引入的杠铃分割。我们考虑的具体图操作包括顶点和边的添加和删除、顶点的复制,以及两个图的笛卡尔积、张量积、强积、日冕积、连接和顶点和。我们还确定了杠铃分区与称为 "堡垒 "的图子结构之间的对应关系,并利用这种对应关系进一步将零强迫和强谱性质的研究联系起来。
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