Hypergraph Turan with bounded matching number

Abstract

For a fixed graph G, an r-uniform hypergraph is said to contain a Berge-G if there exists a bijection f E(G) E(H) for some subhypergraph H such that e⊂eq f(e) for every e∈ E(G). Motivated by Alon and Frankl's study of Turán problems under bounded matching constraints, we investigate the maximum number of edges in r-uniform Berge-K3-free hypergraphs with matching number at most~s. We determine the exact Turán numbers for the cases r=3 and r=4. For r=3 and n ≥ 3 s, we prove that every n-vertex Berge- K3-free 3-graph with matching number s has at most s(n-2 s) edges, and we characterize the unique extremal hypergraph attaining equality. For r=4 and n ≥ 4 s, the maximum number of edges is s(n-2 s) / 2, except for the exceptional case s=1 and n 1( 4), in which the bound is (n-1) / 2. As a corollary, our results recover the classical theorem of Győri on Berge-K3-free hypergraphs.

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