一类周长为4的完备图

Ars Comb. Pub Date : 1900-01-01 DOI:10.21236/ada262423

Michael R. Pinter

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引用次数: 16

摘要

摘要:如果图的每个极大独立集也是极大独立集，则图是完全覆盖的。1-完备覆盖图G具有G-v对于G中的每个点v也是完备覆盖的附加性质，因此，1-完备覆盖图构成了完备覆盖图的一个子类。我们研究无三角形的1-完全覆盖图。除了C5和K2, 1-完备覆盖图必须包含三角形或4-环。因此，我们考虑的图周长为4。给出了两种构造，可得到周长为4的1-完备覆盖图的无限族。这些族包含具有任意大独立数的图。

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A Class Of Well-Covered Graphs With Girth Four

Abstract : A graph is well-covered if every maximal independent set is also a maximum independent set. A 1-well-covered graph G has the additional property that G-v is also well-covered for every point v in G. Thus, the 1-well-covered graphs form a subclass of the well-covered graphs. We examine triangle-free 1- well-covered graphs. Other than C5 and K2, a 1-well-covered graph must contain a triangle or a 4-cycle. Thus, the graphs we consider have girth 4. Two constructions are given which yield infinite families of 1-well-covered graphs with girth 4. These families contain graphs with arbitrarily large independence number.

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Ars Comb.

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