论均匀超图的 ABC 谱半径

IF 0.9 4区 数学 Q4 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS Journal of Combinatorial Optimization Pub Date : 2024-06-28 DOI:10.1007/s10878-024-01182-2
Hongying Lin, Bo Zhou
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引用次数: 0

摘要

让 G 是一个具有顶点集 [n] 和边集 E(G) 的 k-Uniform 超图,其中 \(k\ge 2\).对于 \(i\in [n]\), \(d_i\) 表示顶点 i 在 G 中的度数。 G 的 ABC 谱半径是 $$\begin{aligned}。\max \left\{ k\sum _{e\in E(G)}\root k \of {\dfrac\sum _{i\in e}d_{i} -k}{prod _{i\in e}d_{i}}}prod _{i\in e}x_i:\textbf{x}\in {\mathbb {R}}_+^n, \sum _{i=1}^nx_i^k=1\right\} .\end{aligned}$$ 我们给出了 ABC 谱半径的下限和上限,并分别确定了给定大小的均匀超树、均匀非超星超树和均匀非幂超树的最大 ABC 谱半径,以及给定大小的均匀单环超图和线性均匀单环超图的最大 ABC 谱半径。我们还描述了在所有情况下都实际达到 ABC 谱半径最大值的均匀超图的特征。
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On ABC spectral radius of uniform hypergraphs

Let G be a k-uniform hypergraph with vertex set [n] and edge set E(G), where \(k\ge 2\). For \(i\in [n]\), \(d_i\) denotes the degree of vertex i in G. The ABC spectral radius of G is

$$\begin{aligned} \max \left\{ k\sum _{e\in E(G)}\root k \of {\dfrac{\sum _{i\in e}d_{i} -k}{\prod _{i\in e}d_{i}}}\prod _{i\in e}x_i: \textbf{x}\in {\mathbb {R}}_+^n, \sum _{i=1}^nx_i^k=1\right\} . \end{aligned}$$

We give tight lower and upper bounds for the ABC spectral radius, and determine the maximum ABC spectral radii of uniform hypertrees, uniform non-hyperstar hypertrees and uniform non-power hypertrees of given size, as well as the maximum ABC spectral radii of uniform unicyclic hypergraphs and linear uniform unicyclic hypergraphs of given size, respectively. We also characterize those uniform hypergraphs for which the maxima for the ABC spectral radii are actually attained in all cases.

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来源期刊
Journal of Combinatorial Optimization
Journal of Combinatorial Optimization 数学-计算机:跨学科应用
CiteScore
2.00
自引率
10.00%
发文量
83
审稿时长
6 months
期刊介绍: The objective of Journal of Combinatorial Optimization is to advance and promote the theory and applications of combinatorial optimization, which is an area of research at the intersection of applied mathematics, computer science, and operations research and which overlaps with many other areas such as computation complexity, computational biology, VLSI design, communication networks, and management science. It includes complexity analysis and algorithm design for combinatorial optimization problems, numerical experiments and problem discovery with applications in science and engineering. The Journal of Combinatorial Optimization publishes refereed papers dealing with all theoretical, computational and applied aspects of combinatorial optimization. It also publishes reviews of appropriate books and special issues of journals.
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