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Randomly coloring constant degree graphs
Dyer, M. Frieze, A. Hayes, T.P. Vigoda, E.
Sch. of Comput. Studies, Leeds Univ., UK;

This paper appears in: Foundations of Computer Science, 2004. Proceedings. 45th Annual IEEE Symposium on
Publication Date: 17-19 Oct. 2004
On page(s): 582- 589
ISSN: 0272-5428
ISBN: 0-7695-2228-9
INSPEC Accession Number: 8331124
Digital Object Identifier: 10.1109/FOCS.2004.57
Current Version Published: 2004-12-13

Abstract
We study a simple Markov chain, known as the Glauber dynamics, for generating a random k-coloring of a n-vertex graph with maximum degree Δ. We prove that the dynamics converges to a random coloring after O(n log n) steps assuming k ≥ k₀ for some absolute constant k₀, and either: (i) k/Δ > α* ≈ 1.763 and the girth g ≥ 5, or (ii) k/Δ > β* ≈ 1.489 and the girth g ≥ 6. Previous results on this problem applied when k = Ω(log n), or when k > 11 Δ/6 for general graphs.

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