Ultrafast Distributed Coloring of High Degree Graphs

Abstract

We give a new randomized distributed algorithm for the +1-list coloring problem. The algorithm and its analysis dramatically simplify the previous best result known of Chang, Li, and Pettie [SICOMP 2020]. This allows for numerous refinements, and in particular, we can color all n-node graphs of maximum degree 2+(1) n in O(* n) rounds. The algorithm works in the CONGEST model, i.e., it uses only O( n) bits per message for communication. On low-degree graphs, the algorithm shatters the graph into components of size poly( n) in O(* ) rounds, showing that the randomized complexity of +1-list coloring in CONGEST depends inherently on the deterministic complexity of related coloring problems.