Recoloring bounded treewidth graphs
Discrete Mathematics
2013-02-15 v1 Combinatorics
Abstract
Let be an integer. Two vertex -colorings of a graph are \emph{adjacent} if they differ on exactly one vertex. A graph is \emph{-mixing} if any proper -coloring can be transformed into any other through a sequence of adjacent proper -colorings. Any graph is -mixing, where is the treewidth of the graph (Cereceda 2006). We prove that the shortest sequence between any two -colorings is at most quadratic, a problem left open in Bonamy et al. (2012). Jerrum proved that any graph is -mixing if is at least the maximum degree plus two. We improve Jerrum's bound using the grundy number, which is the worst number of colors in a greedy coloring.
Cite
@article{arxiv.1302.3486,
title = {Recoloring bounded treewidth graphs},
author = {Marthe Bonamy and Nicolas Bousquet},
journal= {arXiv preprint arXiv:1302.3486},
year = {2013}
}
Comments
11 pages, 5 figures