Best possible bounds on the double-diversity of intersecting hypergraphs
Abstract
For a family F⊂ [n]k and two elements x,y∈ [n] define F(x,y)=\F∈ F x F,\ y F\. The double-diversity γ2(F) is defined as the minimum of |F(x,y)| over all pairs x,y. Let L⊂[7]3 consist of the seven lines of the Fano plane. For n≥ 7, k≥ 3 one defines the Fano k-graph FL as the collection of all k-subsets of [n] that contain at least one line. It is proven that for n≥ 13k2 the Fano k-graph is the essentially unique family maximizing the double diversity over all k-graphs without a pair of disjoint edges. Some similar, although less exact results are proven for triple and higher diversity as well.
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