On set systems without a simplex-cluster and the Junta method

Abstract

A family \A0,…,Ad\ of k-element subsets of [n]=\1,2,…,n\ is called a simplex-cluster if A0·s Ad=, |A0·s Ad|2k, and the intersection of any d of the sets in \A0,…,Ad\ is nonempty. In 2006, Keevash and Mubayi conjectured that for any d+1 kdd+1n, the largest family of k-element subsets of [n] that does not contain a simplex-cluster is the family of all k-subsets that contain a given element. We prove the conjecture for all kζ n for an arbitrarily small ζ>0, provided that n n0(ζ,d). We call a family \A0,…,Ad\ of k-element subsets of [n] a (d,k,s)-cluster if A0·s Ad= and |A0·s Ad| s. We also show that for any ζ n kdd+1n the largest family of k-element subsets of [n] that does not contain a (d,k,(d+1d+ζ)k)-cluster is again the family of all k-subsets that contain a given element, provided that n n0(ζ,d). Our proof is based on the junta method for extremal combinatorics initiated by Dinur and Friedgut and further developed by Ellis, Keller, and the author.