Double domination in maximal outerplanar graphs

Abstract

In a graph G, a vertex dominates itself and its neighbors. A subset S⊂eq V(G) is said to be a double dominating set of G if S dominates every vertex of G at least twice. The double domination number γ× 2(G) is the minimum cardinality of a double dominating set of G. We show that if G is a maximal outerplanar graph on n≥ 3 vertices, then γ× 2(G)≤ 2n3. Further, if n≥ 4, then γ× 2(G)≤ \ n+t2, n-t\, where t is the number of vertices of degree 2 in G. These bounds are shown to be tight. In addition, we also study the case that G is a striped maximal outerplanar graph.