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MTA Rényi Intézet, nagyterem
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Description
For a graph F, a hypergraph H is a Berge copy of F (or a Berge-F in short), if there
is a bijection f:E(F)→E(H) such that for each $e\in E(F)$ we have $e\subset f(e)$. A hypergraph
is Berge-F-free if it does not contain a Berge copy of F. We denote the maximum
number of hyperedges in an n-vertex r-uniform Berge-F-free hypergraph by $ex_(n,Berge-F)$.
We prove two general lemmas concerning the maximum size of a Berge-F-free
hypergraph and use them to establish new results and improve several old results.
link: https://arxiv.org/abs/1808.10842
Joint work with Abhishek Methuku and Cory Palmer