Approximation by juntas in the symmetric group, and forbidden intersection problems

Abstract

A family of permutations F ⊂ Sn is said to be t-intersecting if any two permutations in F agree on at least t points. It is said to be (t-1)-intersection-free if no two permutations in F agree on exactly t-1 points. If S,T ⊂ \1,2,…,n\ with |S|=|T|, and π: S T is a bijection, the π-star in Sn is the family of all permutations in Sn that agree with π on all of S. An s-star is a π-star such that π is a bijection between sets of size s. Friedgut and Pilpel, and independently the first author, showed that if F ⊂ Sn is t-intersecting, and n is sufficiently large depending on t, then |F| ≤ (n-t)!; this proved a conjecture of Deza and Frankl from 1977. Equality holds only if F is a t-star. In this paper, we give a more `robust' proof of a strengthening of the Deza-Frankl conjecture, namely that if n is sufficiently large depending on t, and F ⊂ Sn is (t-1)-intersection-free, then |F ≤ (n-t)!, with equality only if F is a t-star. The main ingredient of our proof is a `junta approximation' result, namely, that any (t-1)-intersection-free family of permutations is essentially contained in a t-intersecting junta (a `junta' being a union of a bounded number of O(1)-stars). The proof of our junta approximation result relies, in turn, on a weak regularity lemma for families of permutations, a combinatorial argument that `bootstraps' a weak notion of pseudorandomness into a stronger one, and finally a spectral argument for pairs of highly-pseudorandom fractional families. Our proof employs four different notions of pseudorandomness, three being combinatorial in nature, and one being algebraic.