The distance domination of generalized de Bruijn and Kautz digraphs

Abstract

Let G=(V,A) be a digraph and k 1 an integer. For u,v∈ V, we say that the vertex u distance k-dominate v if the distance from u to v at most k. A set D of vertices in G is a distance k-dominating set if for each vertex of V D is distance k-dominated by some vertex of D. The distance k-domination number of G, denoted by γk(G), is the minimum cardinality of a distance k-dominating set of G. Generalized de Bruijn digraphs GB(n,d) and generalized Kautz digraphs GK(n,d) are good candidates for interconnection networks. Tian and Xu showed that n/Σj=0kdj γk(GB(n,d)) n/dk and n /Σj=0kdj γk(GK(n,d)) n/dk. In this paper we prove that every generalized de Bruijn digraph GB(n,d) has the distance k-domination number n/Σj=0kdj or n/Σj=0kdj+1, and the distance k-domination number of every generalized Kautz digraph GK(n,d) bounded above by n/(dk-1+dk). Additionally, we present various sufficient conditions for γk(GB(n,d))= n/Σj=0kdj and γk(GK(n,d))= n/Σj=0kdj.