Upper chromatic number of finite projective planes |
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| Authors: | Gábor Bacsó Zsolt Tuza |
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| Affiliation: | 1. Computer and Automation Institute, Hungarian Academy of Sciences, H‐1111 Budapest, Kende u. 13–17, Hungary;2. Department of Computer Science, University of Pannonia, Veszprém, Hungary |
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| Abstract: | For a finite projective plane  , let  denote the maximum number of classes in a partition of the point set, such that each line has at least two points in the same partition class. We prove that the best possible general estimate in terms of the order of projective planes is  , which is tight apart from a multiplicative constant in the third term  : - (1) As
 holds for every projective plane  of order q. - (2) If q is a square, then the Galois plane of order q satisfies
 . Our results asymptotically solve a ten‐year‐old open problem in the coloring theory of mixed hypergraphs, where  is termed the upper chromatic number of  . Further improvements on the upper bound (1) are presented for Galois planes and their subclasses. © 2007 Wiley Periodicals, Inc. J Combin Designs 16: 221–230, 2008 |
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| Keywords: | hypergraph vertex coloring finite projective plane upper chromatic number MSC 2000 05C15 05B25 |
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