On the super domination number of graphs

Abstract

The open neighbourhood of a vertex v of a graph G is the set N(v) consisting of all vertices adjacent to v in G. For D⊂eq V(G), we define D=V(G) D. A set D⊂eq V(G) is called a super dominating set of G if for every vertex u∈ D, there exists v∈ D such that N(v) D=\u\. The super domination number of G is the minimum cardinality among all super dominating sets in G. In this article, we obtain closed formulas and tight bounds for the super domination number of G in terms of several invariants of G. Furthermore, the particular cases of corona product graphs and Cartesian product graphs are considered.