An improvement on the maximum number of k-Dominating Independent Sets

Abstract

Erdos and Moser raised the question of determining the maximum number of maximal cliques or equivalently, the maximum number of maximal independent sets in a graph on n vertices. Since then there has been a lot of research along these lines. A k-dominating independent set is an independent set D such that every vertex not contained in D has at least k neighbours in D. Let mik(n) denote the maximum number of k-dominating independent sets in a graph on n vertices, and let ζk:=n → ∞ [n]mik(n). Nagy initiated the study of mik(n). In this article we disprove a conjecture of Nagy and prove that for any even k we have 1.489 ≈ [9]36 ζkk. We also prove that for any k 3 we have ζkk 2.05311.053+1/k< 1.98, improving the upper bound of Nagy.