Improved Distributed Steiner Forest Construction

Abstract

We present new distributed algorithms for constructing a Steiner Forest in the CONGEST model. Our deterministic algorithm finds, for any given constant ε>0, a (2+ε)-approximation in O(sk+(st,n)) rounds, where s is the shortest path diameter, t is the number of terminals, k is the number of terminal components in the input, and n is the number of nodes. Our randomized algorithm finds, with high probability, an O( n)- approximation in time O(k+(s, n)+D), where D is the unweighted diameter of the network. We also prove a matching lower bound of (k+(s,n)+D) on the running time of any distributed approximation algorithm for the Steiner Forest problem. Previous algorithms were randomized, and obtained either an O( n)-approximation in O(sk) time, or an O(1/ε)-approximation in O((n+t)1+ε+D) time.