Octopuses in the Boolean cube: families with pairwise small intersections, part II

Abstract

The problem we consider originally arises from 2-level polytope theory. This class of polytopes generalizes a number of other polytope families. One of the important questions in this filed can be formulated as follows: is it true for a d-dimensional 2-level polytope that the product of the number of its vertices and the number of its d-1 dimensional facets is bounded by d2d - 1? Recently, Kupavskii and Weltge~Kupavskii2020 settled this question in positive. A key element in their proof is a more general result for families of vectors in Rd such that the scalar product between any two vectors from different families is either 0 or 1. Peter Frankl noted that, when restricted to the Boolean cube, the solution boils down to an elegant application of the Harris--Kleitman correlation inequality. Meanwhile, this problem becomes much more sophisticated when we consider several families. Let F1, …, F be families of subsets of \1, …, n\. We suppose that for distinct k, k' and arbitrary F1 ∈ Fk, F2 ∈ Fk' we have |F1 F2|≤slant m. We are interested in the maximal value of |F1|… |F| and the structure of the extremal example. In the previous paper on the topic, the authors found the asymptotics of this product for constant and m as n tends to infinity. However, the possible structure of the families from the extremal example turned out to be very complicated. In this paper, we obtain a strong structural result for the extremal families.