Approximation Algorithm for Minimum Weight Connected m-Fold Dominating Set

Abstract

Using connected dominating set (CDS) to serve as a virtual backbone in a wireless networks can save energy and reduce interference. Since nodes may fail due to accidental damage or energy depletion, it is desirable that the virtual backbone has some fault-tolerance. A k-connected m-fold dominating set ((k,m)-CDS) of a graph G is a node set D such that every node in V D has at least m neighbors in D and the subgraph of G induced by D is k-connected. Using (k,m)-CDS can tolerate the failure of \k-1,m-1\ nodes. In this paper, we study Minimum Weight (1,m)-CDS problem ((1,m)-MWCDS), and present an (H(δ+m)+2H(δ-1))-approximation algorithm, where δ is the maximum degree of the graph and H(·) is the Harmonic number. Notice that there is a 1.35 n-approximation algorithm for the (1,1)-MWCDS problem, where n is the number of nodes in the graph. Though our constant in O( ·) is larger than 1.35, n is replaced by δ. Such a replacement enables us to obtain a (6.67+)-approximation for the (1,m)-MWCDS problem on unit disk graphs.