An extension of the Erdos-Ko-Rado theorem to set-wise 2-intersecting families of perfect matchings

Abstract

Two perfect matchings P and Q of the complete graph on 2k vertices are said to be set-wise t-intersecting if there exist edges P1, ·s, Pt in P and Q1, ·s, Qt in Q such that the union of edges P1, ·s, Pt has the same set of vertices as the union of Q1, ·s, Qt has. In this paper we prove an extension of the famous Erdos-Ko-Rado (EKR) theorem to set-wise 2-intersecting families of perfect matching on all values of k, and we conjecture similar statement for all t≥ 2.

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