A Note on the Probability of Rectangles for Correlated Binary Strings

Abstract

Consider two sequences of n independent and identically distributed fair coin tosses, X=(X1,…,Xn) and Y=(Y1,…,Yn), which are -correlated for each j, i.e. P[Xj=Yj] = 1+ 2. We study the question of how large (small) the probability P[X ∈ A, Y∈ B] can be among all sets A,B⊂\0,1\n of a given cardinality. For sets |A|,|B| = (2n) it is well known that the largest (smallest) probability is approximately attained by concentric (anti-concentric) Hamming balls, and this can be proved via the hypercontractive inequality (reverse hypercontractivity). Here we consider the case of |A|,|B| = 2(n). By applying a recent extension of the hypercontractive inequality of Polyanskiy-Samorodnitsky (J. Functional Analysis, 2019), we show that Hamming balls of the same size approximately maximize P[X ∈ A, Y∈ B] in the regime of 1. We also prove a similar tight lower bound, i.e. show that for 0 the pair of opposite Hamming balls approximately minimizes the probability P[X ∈ A, Y∈ B].