On the dissociation number of Kneser graphs

Abstract

A set D of vertices of a graph G is a dissociation set if each vertex of D has at most one neighbor in D. The dissociation number of G, diss(G), is the cardinality of a maximum dissociation set in a graph G. In this paper we study dissociation in the well-known class of Kneser graphs Kn,k. In particular, we establish that the dissociation number of Kneser graphs Kn,2 equals \n-1,6\. We show that for any k ≥ 2, there exists n0 ∈ N such that diss(Kn,k)=α(Kn,k) for any n ≥ n0. We consider the case k=3 in more details and prove that n0=8 in this case. Then we improve a trivial upper bound 2α(Kn,k) for the dissociation number of Kneser graphs Kn,k by using Katona's cyclic arrangement of integers from \1,… , n\. Finally we investigate the odd graphs, that is, the Kneser graphs with n=2k+1. We prove that diss(K2k+1,k)=2k k.