On Total Domination and Minimum Maximal Matchings in Graphs

Abstract

A subset M of the edges of a graph G is a matching if no two edges in M are incident. A maximal matching is a matching that is not contained in a larger matching. A subset S of vertices of a graph G with no isolated vertices is a total dominating set of G if every vertex of G is adjacent to at least one vertex in S. Let μ*(G) and γt(G) be the minimum cardinalities of a maximal matching and a total dominating set in G, respectively. Let δ(G) denote the minimum degree in graph G. We observe that γt(G)≤ 2μ*(G) when 1≤ δ(G)≤ 2 and γt(G)≤ 2μ*(G)-δ(G)+2 when δ(G)≥ 3. We show that the upper bound for the total domination number is tight for every fixed δ(G). We provide a constructive characterization of graphs G satisfying γt(G)= 2μ*(G) and a polynomial time procedure to determine whether γt(G) = 2μ*(G) for a graph G with minimum degree two.