On Konig-Egervary Square-Stable Graphs
Combinatorics
2011-01-25 v3 Discrete Mathematics
Abstract
The stability number of a graph G, denoted by alpha(G), is the cardinality of a maximum stable set, and mu(G) is the cardinality of a maximum matching in G. If alpha(G)+mu(G) equals its order, then G is a Konig-Egervary graph. In this paper we deal with square-stable graphs, i.e., the graphs G enjoying the equality alpha(G)=alpha(G^{2}), where G^{2} denotes the second power of G. In particular, we show that a Konig-Egervary graph is square-stable if and only if it has a perfect matching consisting of pendant edges, and in consequence, we deduce that well-covered trees are exactly the square-stable trees.
Cite
@article{arxiv.0908.1313,
title = {On Konig-Egervary Square-Stable Graphs},
author = {Vadim E. Levit and Eugen Mandrescu},
journal= {arXiv preprint arXiv:0908.1313},
year = {2011}
}
Comments
12 pages, 9 figures