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Linear versus centred chromatic numbers

Combinatorics 2024-04-11 v2 Discrete Mathematics

Abstract

\DeclareMathOperator\chicenχcen\DeclareMathOperator\chilinχlin\DeclareMathOperator{\chicen}{\chi_{\mathrm{cen}}}\DeclareMathOperator{\chilin}{\chi_{\mathrm{lin}}} A centred colouring of a graph is a vertex colouring in which every connected subgraph contains a vertex whose colour is unique and a \emph{linear colouring} is a vertex colouring in which every (not-necessarily induced) path contains a vertex whose colour is unique. For a graph GG, the centred chromatic number \chicen(G)\chicen(G) and the linear chromatic number \chilin(G)\chilin(G) denote the minimum number of distinct colours required for a centred, respectively, linear colouring of GG. From these definitions, it follows immediately that \chilin(G)\chicen(G)\chilin(G)\le \chicen(G) for every graph GG. The centred chromatic number is equivalent to treedepth and has been studied extensively. Much less is known about linear colouring. Kun et al [Algorithmica 83(1)] prove that \chicen(G)O~(\chilin(G)190)\chicen(G) \le \tilde{O}(\chilin(G)^{190}) for any graph GG and conjecture that \chicen(G)2\chilin(G)\chicen(G)\le 2\chilin(G). Their upper bound was subsequently improved by Czerwinski et al [SIDMA 35(2)] to \chicen(G)O~(\chilin(G)19)\chicen(G)\le\tilde{O}(\chilin(G)^{19}). The proof of both upper bounds relies on establishing a lower bound on the linear chromatic number of pseudogrids, which appear in the proof due to their critical relationship to treewidth. Specifically, Kun et al prove that k×kk\times k pseudogrids have linear chromatic number Ω(k)\Omega(\sqrt{k}). Our main contribution is establishing a tight bound on the linear chromatic number of pseudogrids, specifically \chilin(G)Ω(k)\chilin(G)\ge \Omega(k) for every k×kk\times k pseudogrid GG. As a consequence we improve the general bound for all graphs to \chicen(G)O~(\chilin(G)10)\chicen(G)\le \tilde{O}(\chilin(G)^{10}). In addition, this tight bound gives further evidence in support of Kun et al's conjecture (above) that the centred chromatic number of any graph is upper bounded by a linear function of its linear chromatic number.

Keywords

Cite

@article{arxiv.2205.15096,
  title  = {Linear versus centred chromatic numbers},
  author = {Prosenjit Bose and Vida Dujmović and Hussein Houdrouge and Mehrnoosh Javarsineh and Pat Morin},
  journal= {arXiv preprint arXiv:2205.15096},
  year   = {2024}
}

Comments

Minor corrections and updates

R2 v1 2026-06-24T11:33:07.415Z