On k-limited domination in graphs

Abstract

In this work, we introduce and study the notion of k-limited domination in graphs, motivated by applications where dominating vertices have bounded capacity and cannot be overloaded by too many external neighbors. Formally, given an integer k Δ(G), a set of vertices D ⊂eq V(G) is called a k-limited dominating set if it is a dominating set and, in addition, each vertex of D has at most k neighbors outside D. The minimum cardinality of such a set is the k-limited domination number, denoted by γkL(G). Since Δ(G)-limited domination coincides with the classical domination, we restrict our attention to the nontrivial range 1 k < Δ(G), where the degree limitation becomes meaningful and leads to new combinatorial phenomena. In this paper, we initiate the study of this concept by deriving sharp general bounds for γkL(G)(G) and identifying conditions under which these bounds can be further improved. We establish a connection between k-limited domination and (1,t)-domination. In particular, for d-regular graphs we prove that γkL(G)(G)=γ1,d-k(G). In the special case k=1, we show that 1-limited domination is tightly linked to graph packings, yielding the bound γ L1(G) n - ρ(G) and its characterization. The study reveals several natural open questions and indicates that limited domination provides a rich ground for further research.