Optimal k-fold colorings of webs and antiwebs

Abstract

A k-fold x-coloring of a graph is an assignment of (at least) k distinct colors from the set 1, 2, ..., x to each vertex such that any two adjacent vertices are assigned disjoint sets of colors. The smallest number x such that G admits a k-fold x-coloring is the k-th chromatic number of G, denoted by k(G). We determine the exact value of this parameter when G is a web or an antiweb. Our results generalize the known corresponding results for odd cycles and imply necessary and sufficient conditions under which k(G) attains its lower and upper bounds based on the clique, the fractional chromatic and the chromatic numbers. Additionally, we extend the concept of -critical graphs to k-critical graphs. We identify the webs and antiwebs having this property, for every integer k <= 1.