An Erdos-Ko-Rado type theorem for subgraphs of perfect matchings
Abstract
Let Mk be a 2n-vertex graph with n pairwise disjoint edges and let H(p,s)(n) be the family of subsets of V(Mn) that span exactly p edges and s isolated vertices. We prove that for n 2p+s this family has the Erdos--Ko--Rado property: the size of the largest intersecting family equals to the number of sets containing a fixed vertex. The bound n 2p+s is the best possible, improving a recent theorem with n 2p+2s by Fuentes and Kamat.
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