Acyclic Edge Coloring of 3-sparse Graphs

Abstract

A proper edge coloring of a graph without any bichromatic cycles is said to be an acyclic edge coloring of the graph. The acyclic chromatic index of a graph G denoted by a'(G), is the minimum integer k such that G has an acyclic edge coloring with k colors. Fiamc\'k conjectured that for a graph G with maximum degree , a'(G) +2. A graph G is said to be 3-sparse if every edge in G is incident on at least one vertex of degree at most 3. We prove the conjecture for the class of 3-sparse graphs. Further, we give a stronger bound of +1, if there exists an edge xy in the graph with dG(x)+ dG(y) < +3. When > 3, the 3-sparse graphs where no such edge exists is the set of bipartite graphs where one partition has vertices with degree exactly 3 and the other partition has vertices with degree exactly .