On the p-reinforcement and the complexity

Abstract

Let G=(V,E) be a graph and p be a positive integer. A subset S⊂eq V is called a p-dominating set if each vertex not in S has at least p neighbors in S. The p-domination number p(G) is the size of a smallest p-dominating set of G. The p-reinforcement number rp(G) is the smallest number of edges whose addition to G results in a graph G' with p(G')<p(G). In this paper, we give an original study on the p-reinforcement, determine rp(G) for some graphs such as paths, cycles and complete t-partite graphs, and establish some upper bounds of rp(G). In particular, we show that the decision problem on rp(G) is NP-hard for a general graph G and a fixed integer p≥ 2.