Abstract
An oriented 3-graph consists of a family of triples (3-sets), each of which is given one of its two possible cyclic orientations. A cycle in an oriented 3-graph is a positive sum of some of the triples that gives weight zero to each 2-set. Our aim in this paper is to consider the following question: how large can the girth of an oriented 3-graph be? We show that there exist oriented 3-graphs whose shortest cycle has length \(\frac{n^2}{2}(1+o(1))\): this is asymptotically best possible. We also show that there exist 3-tournaments whose shortest cycle has length \(\frac{n^2}{3}(1+o(1))\), in complete contrast to the case of 2-tournaments.
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Acknowledgments
Ta Sheng Tan was supported by the University Malaya Research Fund Assistance (BKP) via grant BK021-2013.
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Leader, I., Tan, T.S. Cycles in Oriented 3-Graphs. Discrete Comput Geom 54, 432–443 (2015). https://doi.org/10.1007/s00454-015-9702-1
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DOI: https://doi.org/10.1007/s00454-015-9702-1