The circular chromatic number of a digraph

Authors:
Drago Bokal;Gasper Fijavz;Martin Juvan;P. Mark Kayll;Bojan Mohar
Affiliations:
Department of Mathematics, IMFM 1000 Ljubljana, Slovenia;Department of Computer Science, University of Ljubljana, 1000 Ljubljana, Slovenia;Department of Mathematics, University of Ljubljana, 1000 Ljubljana, Slovenia;(On leave at University of Ljubljana) Department of Mathematical Sciences, University of Montana, Missoula MT 59812-0864, USA;Department of Mathematics, University of Ljubljana, 1000 Ljubljana, Slovenia
Venue:
Journal of Graph Theory
Year:
2004

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Cited 4

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Abstract

We introduce the circular chromatic number χc of a digraph and establish various basic results. They show that the coloring theory for digraphs is similar to the coloring theory for undirected graphs when independent sets of vertices are replaced by acyclic sets. Since the directed k-cycle has circular chromatic number k-(k – 1), for k ≥ 2, values of χc between 1 and 2 are possible. We show that in fact, χc takes on all rational values greater than 1. Furthermore, there exist digraphs of arbitrarily large digirth and circular chromatic number. It is NP-complete to decide if a given digraph has χc at most 2. © 2004 Wiley Periodicals, Inc. J Graph Theory 46: 227–240, 2004