Injective Edge Chromatic Index of a Graph

Abstract

Three edges e1, e2 and e3 in a graph G are consecutive if they form a path (in this order) or a cycle of length three. An injective edge coloring of a graph G = (V,E) is a coloring c of the edges of G such that if e1, e2 and e3 are consecutive edges in G, then c(e1)≠ c(e3). The injective edge coloring number i'(G) is the minimum number of colors permitted in such a coloring. In this paper, exact values of i'(G) for several classes of graphs are obtained, upper and lower bounds for i'(G) are introduced and it is proven that checking whether i'(G)= k is NP-complete.