Asymptotically Optimal Proper Conflict-Free Colouring

Abstract

A proper conflict-free colouring of a graph is a colouring of the vertices such that any two adjacent vertices receive different colours, and for every non-isolated vertex v, some colour appears exactly once on the neighbourhood of v. Caro, Petrusevski and Skrekovski conjectured that every connected graph with maximum degree ≥ 3 has a proper conflict-free colouring with at most +1 colours. This conjecture holds for =3 and remains open for ≥ 4. In this paper we prove that this conjecture holds asymptotically; namely, every graph with maximum degree has a proper conflict-free colouring with (1+o(1)) colours.