A note on the conflict-free chromatic index

Abstract

Let G be a graph with maximum degree and without isolated vertices. An edge colouring c of G is conflict-free if the closed neighbourhood of every edge includes a uniquely coloured element. The least number of colours admitting such c is the conflict-free chromatic index of G, denoted by 'CF(G). In "Conflict-free chromatic number versus conflict-free chromatic index" [J. Graph Theory, 2022; 99: 349--358] it was recently proved by means of the probabilistic method that 'CF(G)≤ C12+C2, where C1>337 and C2 are constants, whereas there are families of graphs with 'CF(G)≥ (1-o(1))2. In this note we provide an explicit simple proof of the fact that 'CF(G)≤ 32+1, which is a corollary of a stronger result: 'CF(G)≤ 32(G)+1. For this aim we prove a few auxiliary observations, implying in particular that 'CF(G)≤ 4 for bipartite graphs.