New Bounds for the Acyclic Chromatic Index

Abstract

An edge coloring of a graph G is called an acyclic edge coloring if it is proper and every cycle in G contains edges of at least three different colors. The least number of colors needed for an acyclic edge coloring of G is called the acyclic chromatic index of G and is denoted by a'(G). Fiamcik and independently Alon, Sudakov, and Zaks conjectured that a'(G) ≤ (G)+2, where (G) denotes the maximum degree of G. The best known general bound is a'(G)≤ 4((G)-1) due to Esperet and Parreau. We apply a generalization of the Lov\'asz Local Lemma to show that if G contains no copy of a given bipartite graph H, then a'(G) ≤ 3(G)+o((G)). Moreover, for every >0, there exists a constant c such that if g(G)≥ c, then a'(G)≤(2+)(G)+o((G)), where g(G) denotes the girth of G.