Near-Optimal Distributed Approximation of Minimum-Weight Connected Dominating Set

Abstract

This paper presents a near-optimal distributed approximation algorithm for the minimum-weight connected dominating set (MCDS) problem. The presented algorithm finds an O( n) approximation in O(D+n) rounds, where D is the network diameter and n is the number of nodes. MCDS is a classical NP-hard problem and the achieved approximation factor O( n) is known to be optimal up to a constant factor, unless P=NP. Furthermore, the O(D+n) round complexity is known to be optimal modulo logarithmic factors (for any approximation), following [Das Sarma et al.---STOC'11].