On k-limited domination: complexity and Cartesian products

Abstract

A dominating set is called k-limited if every vertex in the set has at most k neighbors outside it. The minimum cardinality of a k-limited dominating set is the k-limited domination number, denoted by γkL(G). We prove that, for every fixed integer k 2, deciding whether a graph admits a k-limited dominating set of size at most is NP-complete. In addition, a systematic study of k-limited domination in Cartesian products is initiated. In particular, we establish general lower and upper bounds for γkL(G H), show that both are sharp, and derive exact values for several natural families of graph products. Among others, we obtain exact results for rook graphs, Cartesian products of k-coronas, certain grid graphs, and several cases involving prisms and hypercubes.