Characterizing spanning trees via the size or the spectral radius of graphs

IF 0.9 3区 数学 Q2 MATHEMATICS Aequationes Mathematicae Pub Date : 2024-09-04 DOI:10.1007/s00010-024-01112-x
Jie Wu
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引用次数: 0

Abstract

Let G be a connected graph and let \(k\ge 1\) be an integer. Let T be a spanning tree of G. The leaf degree of a vertex \(v\in V(T)\) is defined as the number of leaves adjacent to v in T. The leaf degree of T is the maximum leaf degree among all the vertices of T. Let |E(G)| and \(\rho (G)\) denote the size and the spectral radius of G, respectively. In this paper, we first create a lower bound on the size of G to ensure that G admits a spanning tree with leaf degree at most k. Then we establish a lower bound on the spectral radius of G to guarantee that G contains a spanning tree with leaf degree at most k. Finally, we create some extremal graphs to show all the bounds obtained in this paper are sharp.

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通过图的大小或谱半径确定生成树的特征
让 G 是一个连通图,让 \(k\ge 1\) 是一个整数。让 T 是 G 的生成树。顶点的叶子度 \(v\in V(T)\) 定义为 T 中与 v 相邻的叶子的数量。在本文中,我们首先建立了 G 的大小下限,以确保 G 能容纳一棵叶子度最多为 k 的生成树;然后,我们建立了 G 的谱半径下限,以确保 G 包含一棵叶子度最多为 k 的生成树;最后,我们创建了一些极值图,以证明本文得到的所有下限都是尖锐的。
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来源期刊
Aequationes Mathematicae
Aequationes Mathematicae MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
1.70
自引率
12.50%
发文量
62
审稿时长
>12 weeks
期刊介绍: aequationes mathematicae is an international journal of pure and applied mathematics, which emphasizes functional equations, dynamical systems, iteration theory, combinatorics, and geometry. The journal publishes research papers, reports of meetings, and bibliographies. High quality survey articles are an especially welcome feature. In addition, summaries of recent developments and research in the field are published rapidly.
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