On the power domination number of de Bruijn and Kautz digraphs

Abstract

Let G=(V,A) be a directed graph without parallel arcs, and let S⊂eq V be a set of vertices. Let the sequence S=S0⊂eq S1⊂eq S2⊂eq·s be defined as follows: S1 is obtained from S0 by adding all out-neighbors of vertices in S0. For k≥slant 2, Sk is obtained from Sk-1 by adding all vertices w such that for some vertex v∈ Sk-1, w is the unique out-neighbor of v in V Sk-1. We set M(S)=S0 S1·s, and call S a power dominating set for G if M(S)=V(G). The minimum cardinality of such a set is called the power domination number of G. In this paper, we determine the power domination numbers of de Bruijn and Kautz digraphs.