We provide a O(log6logn)-round randomized algorithm for distance-2 coloring in CONGEST with Δ2+1 colors. For Δ≫polylogn, this improves exponentially on the O(logΔ+polyloglogn) algorithm of [Halldórsson, Kuhn, Maus, Nolin, DISC'20]. Our study is motivated by the ubiquity and hardness of local reductions in CONGEST. For instance, algorithms for the Local Lovász Lemma [Moser, Tardos, JACM'10; Fischer, Ghaffari, DISC'17; Davies, SODA'23] usually assume communication on the conflict graph, which can be simulated in LOCAL with only constant overhead, while this may be prohibitively expensive in CONGEST. We hope our techniques help tackle in CONGEST other coloring problems defined by local relations.
History
Editor
Oshman R
Primary Research Area
Algorithmic Foundations and Cryptography
Name of Conference
DISC International Symposium on Distributed Computing (DISC)
Journal
DISC
Volume
281
Page Range
19:1-19:1
Publisher
Schloss Dagstuhl - Leibniz-Zentrum für Informatik
BibTeX
@conference{Flin:Halldórsson:Nolin:2023,
title = "Fast Coloring Despite Congested Relays.",
author = "Flin, Maxime" AND "Halldórsson, Magnús M" AND "Nolin, Alexandre",
editor = "Oshman, Rotem",
year = 2023,
month = 10,
journal = "DISC",
pages = "19:1--19:1",
publisher = "Schloss Dagstuhl - Leibniz-Zentrum für Informatik"
}