Interval cyclic edge-colorings of graphs

Abstract

A proper edge-coloring of a graph G with colors 1,…,t is called an interval cyclic t-coloring if all colors are used, and the edges incident to each vertex v∈ V(G) are colored by dG(v) consecutive colors modulo t, where dG(v) is the degree of a vertex v in G. A graph G is interval cyclically colorable if it has an interval cyclic t-coloring for some positive integer t. The set of all interval cyclically colorable graphs is denoted by Nc. For a graph G∈ Nc, the least and the greatest values of t for which it has an interval cyclic t-coloring are denoted by wc(G) and Wc(G), respectively. In this paper we investigate some properties of interval cyclic colorings. In particular, we prove that if G is a triangle-free graph with at least two vertices and G∈ Nc, then Wc(G)≤ V(G) +(G)-2. We also obtain bounds on wc(G) and Wc(G) for various classes of graphs. Finally, we give some methods for constructing of interval cyclically non-colorable graphs.