English

Notes on Nonrepetitive Graph Colouring

Combinatorics 2008-09-09 v2

Abstract

A vertex colouring of a graph is \emph{nonrepetitive on paths} if there is no path v1,v2,...,v2tv_1,v_2,...,v_{2t} such that v_i and v_{t+i} receive the same colour for all i=1,2,...,t. We determine the maximum density of a graph that admits a k-colouring that is nonrepetitive on paths. We prove that every graph has a subdivision that admits a 4-colouring that is nonrepetitive on paths. The best previous bound was 5. We also study colourings that are nonrepetitive on walks, and provide a conjecture that would imply that every graph with maximum degree Δ\Delta has a f(Δ)f(\Delta)-colouring that is nonrepetitive on walks. We prove that every graph with treewidth k and maximum degree Δ\Delta has a O(kΔ)O(k\Delta)-colouring that is nonrepetitive on paths, and a O(kΔ3)O(k\Delta^3)-colouring that is nonrepetitive on walks.

Keywords

Cite

@article{arxiv.math/0509608,
  title  = {Notes on Nonrepetitive Graph Colouring},
  author = {János Barát and David R. Wood},
  journal= {arXiv preprint arXiv:math/0509608},
  year   = {2008}
}