On asymptotically tight bound for the conflict-free chromatic index of nearly regular graphs

Abstract

Let G be a graph of maximum degree which does not contain isolated vertices. An edge coloring c of G is called conflict-free if each edge's closed neighborhood includes a uniquely colored element. The least number of colors admitting such c is called the conflict-free chromatic index of G and denoted ' CF(G). It is known that in general ' CF(G)≤ 3 2 +1, while there is a family of graphs, e.g. the complete graphs, for which ' CF(G)≥ (1-o(1))2. In the present paper we provide the asymptotically tight upper bound ' CF(G)≤ (1+o(1))2 for regular and nearly regular graphs, which in particular implies that the same bound holds a.a.s. for a random graph G=G(n,p) whenever p n- for any fixed constant ∈ (0,1). Our proof is probabilistic and exploits classic results of Hall and Berge. This was inspired by our approach utilized in the particular case of complete graphs, for which we give a more specific upper bound. We also observe that almost the same bounds hold in the open neighborhood regime.