On the expressive power of mod-p linear forms on the Boolean cube

Abstract

Let (Ai)i ∈ [s] be a sequence of dense subsets of the Boolean cube \0,1\n and let p be a prime. We show that if s is assumed to be superpolynomial in n then we can find distinct i,j such that the two distributions of every mod-p linear form on Ai and Aj are almost positively correlated. We also prove that if s is merely assumed to be sufficiently large independently of n then we may require the two distributions to have overlap bounded below by a positive quantity depending on p only.