Binary scalar products

Abstract

Let A,B ⊂eq Rd both span Rd such that a, b ∈ \0,1\ holds for all a ∈ A, b ∈ B. We show that |A| · |B| (d+1) 2d . This allows us to settle a conjecture by Bohn, Faenza, Fiorini, Fisikopoulos, Macchia, and Pashkovich (2015) concerning 2-level polytopes. Such polytopes have the property that for every facet-defining hyperplane H there is a parallel hyperplane H' such that H H' contain all vertices. The authors conjectured that for every d-dimensional 2-level polytope P the product of the number of vertices of P and the number of facets of P is at most d 2d+1, which we show to be true.