Graphs which satisfy a Vizing-like bound for power domination of Cartesian products

Abstract

Power domination is a two-step observation process that is used to monitor power networks and can be viewed as a combination of domination and zero forcing. Given a graph G, a subset S⊂eq V(G) that can observe all vertices of G using this process is known as a power dominating set of G, and the power domination number of G, γP(G), is the minimum number of vertices in a power dominating set. We introduce a new partition on the vertices of a graph to provide a lower bound for the power domination number. We also consider the power domination number of the Cartesian product of two graphs, G H, and show certain graphs satisfy a Vizing-like bound with regards to the power domination number. In particular, we prove that for any two trees T1 and T2, γP(T1)γP(T2) ≤ γP(T1 T2).