Distributed (+1)-Coloring in Sublogarithmic Rounds

Abstract

We give a new randomized distributed algorithm for (+1)-coloring in the LOCAL model, running in O( )+ 2O( n) rounds in a graph of maximum degree~. This implies that the (+1)-coloring problem is easier than the maximal independent set problem and the maximal matching problem, due to their lower bounds of ( ( n n, ) ) by Kuhn, Moscibroda, and Wattenhofer [PODC'04]. Our algorithm also extends to list-coloring where the palette of each node contains +1 colors. We extend the set of distributed symmetry-breaking techniques by performing a decomposition of graphs into dense and sparse parts.