Generalized power domination in WK-Pyramid Networks

Abstract

The notion of power domination arises in the context of monitoring an electric power system with as few phase measurement units as possible. The k-power domination number of a graph G is the minimum cardinality of a k-power dominating set (k-PDS) of G. In this paper, we determine the k-power domination number of WK-Pyramid networks, WKP(C,L), for all positive values of k except for k=C-1, C ≥ 2, for which we give an upper bound. The k-propagation radius of a graph G is the minimum number of propagation steps needed to monitor the graph G over all minimum k-PDS. We obtain the k-propagation radius of WKP(C,L) in some cases.