Proper Additive Edge Colorings of Regular Graphs

Abstract

We show that if G is a d-regular Vizing-class-1 graph, then the proper additive chromatic index of G, denoted η'p(G), is equal to its chromatic index. This verifies that a strengthening of the Additive Coloring Conjecture of Czerwiński et al. holds for line graphs of d-regular Vizing-class-1 graphs. We show that if G is a d-regular Vizing-class-2 graph, η'p(G)≤ (2 2 (d+1))2+23, and if G is a d-regular Vizing-class-2 graph that admits a proper edge-coloring with a smallest color class of size r and girth(G)≥ 6r-5, then ηp'(G)≤ 2d, among other results.