Uniform edge distribution in hypergraphs is hereditary.
Mubayi, Dhruv, Rödl, Vojtěch (2004)
The Electronic Journal of Combinatorics [electronic only]
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Displaying similar documents to “A class of inequalities relating degrees of adjacent nodes to the average degree in edge-weighted uniform hypergraphs.”
Uniform edge distribution in hypergraphs is hereditary.
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Jackson, Bill, Sokal, Alan D. (2010)
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Przybylo, Jakub (2008)
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Hypergraphs with large transversal number and with edge sizes at least four
Michael Henning, Christian Löwenstein (2012)
Open Mathematics
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Let H be a hypergraph on n vertices and m edges with all edges of size at least four. The transversal number τ(H) of H is the minimum number of vertices that intersect every edge. Lai and Chang [An upper bound for the transversal numbers of 4-uniform hypergraphs, J. Combin. Theory Ser. B, 1990, 50(1), 129–133] proved that τ(H) ≤ 2(n+m)/9, while Chvátal and McDiarmid [Small transversals in hypergraphs, Combinatorica, 1992, 12(1), 19–26] proved that τ(H) ≤ (n + 2m)/6. In this paper, we...
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Martin Bača (1990)
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Nagy, Zoltán Lóránt (2011)
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Henning, Michael A., Yeo, Anders (2006)
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Fukuyama, Junichiro (2006)
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Chen, Ailian, Zhang, Fuji, Li, Hao (2008)
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Maximum Hypergraphs without Regular Subgraphs
Jaehoon Kim, Alexandr V. Kostochka (2014)
Discussiones Mathematicae Graph Theory
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We show that an n-vertex hypergraph with no r-regular subgraphs has at most 2n−1+r−2 edges. We conjecture that if n > r, then every n-vertex hypergraph with no r-regular subgraphs having the maximum number of edges contains a full star, that is, 2n−1 distinct edges containing a given vertex. We prove this conjecture for n ≥ 425. The condition that n > r cannot be weakened.