On a Vizing-type integer domination conjecture

Abstract

Given a simple graph G, a dominating set in G is a set of vertices S such that every vertex not in S has a neighbor in S. Denote the domination number, which is the size of any minimum dominating set of G, by γ(G). For any integer k 1, a function f : V (G) → \0, 1, . . ., k\ is called a \k\-dominating function if the sum of its function values over any closed neighborhood is at least k. The weight of a \k\-dominating function is the sum of its values over all the vertices. The \k\-domination number of G, γ\k\(G), is defined to be the minimum weight taken over all \k\-domination functions. Bresar, Henning, and Klavzar (On integer domination in graphs and Vizing-like problems. Taiwanese J. Math. 10(5) (2006) pp. 1317--1328) asked whether there exists an integer k 2 so that γ\k\(G H) γ(G)γ(H). In this note we use the Roman \2\-domination number, γR2 of Chellali, Haynes, Hedetniemi, and McRae, (Roman \2\-domination. Discrete Applied Mathematics 204 (2016) pp. 22-28.) to prove that if G is a claw-free graph and H is an arbitrary graph, then γ\2\(G H) γR2(G H) γ(G)γ(H), which also implies the conjecture for all k 2.