The maximum spectral radius of graphs with a large core

IF 0.7 4区 数学 Q2 Mathematics Electronic Journal of Linear Algebra Pub Date : 2023-02-24 DOI:10.13001/ela.2023.7283
Xiaocong He, Lihua Feng, D. Stevanović
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Abstract

The $(k+1)$-core of a graph $G$, denoted by $C_{k+1}(G)$, is the subgraph obtained by repeatedly removing any vertex of degree less than or equal to $k$. $C_{k+1}(G)$ is the unique induced subgraph of minimum degree larger than $k$ with a maximum number of vertices. For $1\leq k\leq m\leq n$, we denote $R_{n, k, m}=K_k\vee(K_{m-k}\cup {I_{n-m}})$. In this paper, we prove that $R_{n, k, m}$ obtains the maximum spectral radius and signless Laplacian spectral radius among all $n$-vertex graphs whose $(k+1)$-core has at most $m$ vertices. Our result extends a recent theorem proved by Nikiforov [Electron. J. Linear Algebra, 27:250--257, 2014]. Moreover, we also present the bipartite version of our result.
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具有大核的图的最大谱半径
图$G$的$(k+1)$ -核,用$C_{k+1}(G)$表示,是通过反复去除任何小于或等于$k$的顶点而得到的子图。$C_{k+1}(G)$是最小度大于$k$且顶点数最大的唯一诱导子图。对于$1\leq k\leq m\leq n$,我们表示$R_{n, k, m}=K_k\vee(K_{m-k}\cup {I_{n-m}})$。本文证明了$R_{n, k, m}$在其$(k+1)$ -核最多有$m$个顶点的所有$n$ -顶点图中获得了最大谱半径和无符号拉普拉斯谱半径。我们的结果扩展了Nikiforov [Electron]最近证明的一个定理。[j].数学学报,2014,27(2):557—557。此外,我们还给出了结果的二部化版本。
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来源期刊
CiteScore
1.20
自引率
14.30%
发文量
45
审稿时长
6-12 weeks
期刊介绍: The journal is essentially unlimited by size. Therefore, we have no restrictions on length of articles. Articles are submitted electronically. Refereeing of articles is conventional and of high standards. Posting of articles is immediate following acceptance, processing and final production approval.
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