English

Peaceful Colourings

Combinatorics 2025-08-22 v3

Abstract

We introduce peaceful colourings, a variant of hh-conflict free colourings. We call a colouring with no monochromatic edges pp-peaceful if for each vertex vv, there are at most pp neighbours of vv coloured with a colour appearing on another neighbour of vv. An hh-conflict-free colouring of a graph is a (vertex)-colouring with no monochromatic edges so that for every vertex vv, the number of neighbours of vv which are coloured with a colour appearing on no other neighbour of vv is at least the minimum of hh and the degree of vv. If GG is Δ\Delta-regular then it has an hh-conflict free colouring precisely if it has a (Δh)(\Delta-h)-peaceful colouring. We focus on the minimum pΔp_\Delta of those pp for which every graph of maximum degree Δ\Delta has a pp-peaceful colouring with Δ+1\Delta+1 colours. We show that pΔ>(11eo(1))Δp_\Delta > (1-\frac{1}{e}-o(1))\Delta and that for graphs of bounded codegree, pΔ(11e+o(1))Δp_\Delta \leq (1-\frac{1}{e}+o(1))\Delta. We ask if the latter result can be improved by dropping the bound on the codegree. As a partial result, we show that pΔ80008001Δp_\Delta \leq \frac{8000}{8001}\Delta for sufficiently large Δ\Delta.

Keywords

Cite

@article{arxiv.2402.09762,
  title  = {Peaceful Colourings},
  author = {Chun-Hung Liu and Bruce Reed},
  journal= {arXiv preprint arXiv:2402.09762},
  year   = {2025}
}
R2 v1 2026-06-28T14:49:19.200Z