Performance Guaranteed Approximation Algorithm for Minimum k-Connected m-Fold Dominating Set

Abstract

To achieve an efficient routing in a wireless sensor network, connected dominating set (CDS) is used as virtual backbone. A fault-tolerant virtual backbone can be modeled as a (k,m)-CDS. For a connected graph G=(V,E) and two fixed integers k and m, a node set C⊂eq V is a (k,m)-CDS of G if every node in V C has at least m neighbors in C, and the subgraph of G induced by C is k-connected. Previous to this work, approximation algorithms with guaranteed performance ratio in a general graph were know only for k≤ 3. This paper makes a significant progress by presenting a (2k-1)α0 approximation algorithm for general k and m with m≥ k, where α0 is the performance ratio for the minimum CDS problem. Using currently best known ratio for α0, our algorithm has performance ratio O(), where is the maximum degree of the graph.