A sharp product bound for non-trivial cross-intersecting families

Abstract

Two families A, B ⊂ [n]k are cross-intersecting if A B for all A ∈ A and B ∈ B, and non-trivial if neither A nor B is a star. Pyber proved that any two cross-intersecting families A, B ⊂ [n]k satisfy |A||B| n-1k-12, and the maximum is attained by two full stars. Frankl, as well as Frankl and Wang, conjectured that the sharp bound, when both families are required to be non-trivial, is h(n,k)2, where h(n,k) = n-1k-1 - n-k-1k-1 + 1, the size of the Hilton--Milner family. The cases k=3, and the range k8 and n 4k, were established earlier by Frankl and by Frankl and Wang, respectively. In this paper, we prove their conjecture in the full range. We show that every non-trivial cross-intersecting pair A, B ⊂ [n]k with n 2k and k 3 satisfies |A||B| h(n,k)2. Moreover, we characterize all extremal pairs. Whereas the corresponding sum problem admits asymmetric and unbalanced extremizers, the product extremum forces a balanced, symmetric-or-dual structure: the two families are isomorphic when n>2k and complement-dual when n=2k. Independently and contemporaneously with the present work, Frankl and Wang obtained the same bound for k8 and n2k+1 by a different method. Our proof combines a diversity technique with several new properties of an extended shift operation. Moreover, we show that the problem behaves differently for different uniformities, exhibiting new extremal configurations. In particular, we disprove a related conjecture proposed by Frankl and Wang.