New bounds for proper h-conflict-free colourings

Abstract

A proper k-colouring of a graph G is called h-conflict-free if every vertex v has at least \, \h, deg(v)\ colours appearing exactly once in its neighbourhood. Let pcfh(G) denote the minimum k such that such a colouring exists. We show that for every fixed h 1, every graph G of maximum degree satisfies pcfh(G) h + O( ). This expands on the work of Cho et al., and improves a recent result of Liu and Reed in the case h=1. We conjecture that for every h 1 and every graph G of maximum degree sufficiently large, the bound pcfh(G) h + 1 should hold, which would be tight. When the minimum degree δ of G is sufficiently large, namely δ \100h, 2000 \, we show that this upper bound can be further reduced to pcfh(G) + O(h). This improves a recent bound from Kamyczura and Przybyo when δ h.