Circular chromatic number and a generalization of the construction of Mycielski

In this paper, we introduce a graph transformation analogous to that of Mycielski. Given a graph G and any integer m, one can transform G into a new graph µm(G), the generalized Mycielskian of G. Many basic properties of µm(G) were established in (Lam et al., Some properties of generalized Mycielski's graphs, to appear). Here we completely determine the circular chromatic number of µm(Kn) for any m(?0) and n(?2). We prove that for any odd integer n?3 and any nonnegative integer m, ?c(µm(Kn))=?(µm(Kn))=n+1. This answers part of the question raised by Zhou (J. Combin. Theory Ser. B 70 (1997) 245) or that by Zhu (Discrete Math. 229 (2001) 371). Because µm(K3), for arbitrary m, is a planar graph with connectivity 3 and maximum degree 4, it provides another counterexample to a question asked by Vince (J. Graph Theory 17 (1993) 349). For any positive even number n(?2) and any nonnegative integer m, we show that ?c(µm(Kn))=n+(1/t), where t=?2m/n?+1. This gives a family of arbitrarily large critical graphs G with high connectivity and small maximum degree for which ?c(G) can be arbitrarily close to ?(G)-1.