On Acyclic Edge-Coloring of Complete Bipartite Graphs

Abstract

An acyclic edge-coloring of a graph is a proper edge-coloring without bichromatic (2-colored) cycles. The acyclic chromatic index of a graph G, denoted by a'(G), is the least integer k such that G admits an acyclic edge-coloring using k colors. Let = (G) denote the maximum degree of a vertex in a graph G. A complete bipartite graph with n vertices on each side is denoted by Kn,n. Basavaraju, Chandran and Kummini proved that a'(Kn,n) n+2 = + 2 when n is odd. Basavaraju and Chandran provided an acyclic edge-coloring of Kp,p using p+2 colors and thus establishing a'(Kp,p) = p+2 = + 2 when p is an odd prime. The main tool in their approach is perfect 1-factorization of Kp,p. Recently, following their approach, Venkateswarlu and Sarkar have shown that K2p-1,2p-1 admits an acyclic edge-coloring using 2p+1 colors which implies that a'(K2p-1,2p-1) = 2p+1 = + 2, where p is an odd prime. In this paper, we generalize this approach and present a general framework to possibly get an acyclic edge-coloring of Kn,n which possess a perfect 1-factorization using n+2 = +2 colors. In this general framework, we show that Kp2,p2 admits an acyclic edge-coloring using p2+2 colors and thus establishing a'(Kp2,p2) = p2+2 = + 2 when p 5 is an odd prime.