The Number of Maximal Independent Sets in Quasi-Tree Graphs and Quasi-Forest Graphs

Jenq-Jong Lin, Min-Jen Jou
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引用次数: 0

Abstract

A maximal independent set is an independent set that is not a proper subset of any other independent set. A connected graph (respectively, graph) G with vertex set V(G) is called a quasi-tree graph (respectively, quasi-forest graph), if there exists a vertex x ∈V(G) such that G − x is a tree (respectively, forest). In this paper, we survey on the large numbers of maximal independent sets among all trees, forests, quasi-trees and quasi-forests. In addition, we further look into the problem of determining the third largest number of maximal independent sets among all quasi-trees and quasi-forests. Extremal graphs achieving these values are also given.
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拟树图和拟森林图中极大独立集的个数
极大独立集是一个独立集,它不是任何其他独立集的适当子集。具有顶点集V(G)的连通图(分别是图)G称为拟树图(分别为拟森林图),如果存在一个顶点x∈V(G)使得G−x是树(分别为森林)。在本文中,我们考察了所有树、森林、拟树和拟森林之间的大量极大独立集。此外,我们还进一步研究了在所有拟树和拟林中确定第三大数量的最大独立集的问题。还给出了实现这些值的极值图。
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来源期刊
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