Very Well-Covered Graphs with the Erdos-Ko-Rado Property

Abstract

A family of independent r-sets of a graph G is an r-star if every set in the family contains some fixed vertex v. A graph is r-EKR if the maximum size of an intersecting family of independent r-sets is the size of an r-star. Holroyd and Talbot conjecture that a graph is r-EKR as long as 1≤ r≤μ(G)2, where μ(G) is the minimum size of a maximal independent set. It is suspected that the smallest counterexample to this conjecture is a well-covered graph. Here we consider the class of very well-covered graphs G* obtained by appending a single pendant edge to each vertex of G. We prove that the pendant complete graph Kn* is r-EKR when n ≥ 2r and strictly so when n>2r. Pendant path graphs Pn* are also explored and the vertex whose r-star is of maximum size is determined.

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