On the number of k-dominating independent sets

Abstract

We study the existence and the number of k-dominating independent sets in certain graph families. While the case k=1 namely the case of maximal independent sets - which is originated from Erdos and Moser - is widely investigated, much less is known in general. In this paper we settle the question for trees and prove that the maximum number of k-dominating independent sets in n-vertex graphs is between ck·[2k]2n and ck'·[k+1]2n if k≥ 2, moreover the maximum number of 2-dominating independent sets in n-vertex graphs is between c· 1.22n and c'·1.246n. Graph constructions containing a large number of k-dominating independent sets are coming from product graphs, complete bipartite graphs and with finite geometries. The product graph construction is associated with the number of certain MDS codes.