幂超立方体中二元常权码诱导子图的最大团

Juanjuan Shi, Yongfang Kou, Yulan Hu, Weihua Yang
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引用次数: 0

摘要

求给定图的最大独立集(或最大团)是图论的基本问题,也是图论应用中最重要的问题之一。设$A(n,d,w)$为$Q_{n}^{(d-1,w)}$的最大独立集的大小,它是$n$维超立方体的$d-1^{th}$ -幂的权重点$w$的诱导子图。为了进一步理解和研究$Q_{n}^{(d-1,w)}$的依赖集,我们探讨了它的团数和最大团的结构。本文给出了$5\leq d\leq 6$的团数和最大团$Q_{n}^{(d-1,w)}$的结构。此外,还给出了$A(n,d,w)=2$和$3$的表征。
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On The Maximum Cliques Of The Subgraphs Induced By Binary Constant Weight Codes In Powers Of Hypercubes
The problem of finding the maximum independent sets (or maximum cliques) of a given graph is fundamental in graph theory and is also one of the most important in terms of the application of graph theory. Let $A(n,d,w)$ be the size of the maximum independent set of $Q_{n}^{(d-1,w)}$, which is the induced subgraph of points of weight $w$ of the $d-1^{th}$-power of $n$-dimensional hypercubes. In order to further understand and study the dependent set of $Q_{n}^{(d-1,w)}$, we explore its clique number and the structure of the maximum clique. This paper obtains the clique number and the structure of the maximum clique of $Q_{n}^{(d-1,w)}$ for $5\leq d\leq 6$. Moreover, the characterizations for $A(n,d,w)=2$ and $3$ are also given.
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