On Tur\'an numbers for disconnected hypergraphs

Abstract

We introduce the following simpler variant of the Tur\'an problem: Given integers n>k>r≥ 2 and m≥ 1, what is the smallest integer t for which there exists an r-uniform hypergraph with n vertices, t edges and m connected components such that any k-subset of the vertex set contains at least one edge? We prove some general estimates for this quantity and for its limit, normalized by nr, as n→ ∞. Moreover, we give a complete solution of the problem for the particular case when k=5, r=3 and m≥ 2.

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