Uniform intersecting families with large covering number
Abstract
A family F has covering number τ if the size of the smallest set intersecting all sets from F is equal to τ. Let M(n,k,τ) stand for the size of the largest intersecting family F of k-element subsets of \1,…,n\ with covering number τ. It is a classical result of Erd os and Lov\'asz that M(n,k,k) kk for any n. In this short note, we explore the behaviour of M(n,k,τ) for n<k2 and large τ. The results are quite surprising: For example, we show that M(n,k,τ) =(1-o(1))n-1 k-1, if n = k3/2, and τ k-k3/4+o(1) as k∞; M(n,k,τ) <e-ck1/2n k, if n = k3/2 and τ>k- 12k1/2.
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