The Circular Chromatic Number of the Mycielskian of Mt(Kn)

Abstract

As a natural generalization of chromatic number of a graph, the circular chromatic number of graphs (or the star chromatic number) was introduced by A.Vince in 1988. Let Mt(G) denote the tth iterated Mycielski graph of G. It was conjectured by Chang, Huang and Zhu(Discrete mathematics,205(1999), 23-37) that for all n t+2, c(Mt(Kn))=(Mt(Kn))=n+t. In 2004, D.D.F. Liu proved the conjecture when t 2, n 2t-1+2t-2. In this paper,we show that the result can be strengthened to the following: if t 4, n 11/122t-1+2t+1/3, then c(Mt(Kn))=(Mt(Kn)).