A Note on the Probability of Rectangles for Correlated Binary Strings

• dc.contributor.author: Ordentlich, Or
• dc.contributor.author: Polyanskiy, Yury
• dc.contributor.author: Shayevitz, Ofer
• dc.date.issued: 2020
• dc.identifier.uri: https://hdl.handle.net/1721.1/134030
• dc.description.abstract: © 1963-2012 IEEE. Consider two sequences of ${n}$ independent and identically distributed fair coin tosses, ${X}=({X}_{1},\ldots,{X}_{n})$ and ${Y}=({Y}_{1},\ldots,{Y}_{n})$ , which are $\rho $ -correlated for each ${j}$ , i.e. $\mathbb {P}[{X}_{j}={Y}_{j}] = {\frac{1+\rho }{ 2}}$. We study the question of how large (small) the probability $\mathbb {P}[{X} \in {A}, {Y}\in {B}]$ can be among all sets ${A},{B}\subset \{0,1\}^{n}$ of a given cardinality. For sets $|{A}|,|{B}| = \Theta (2^{n})$ 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 $|{A}|,|{B}| = 2^{\Theta ({n})}$. 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 $\mathbb {P}[{X} \in {A}, {Y}\in {B}]$ in the regime of $\rho \to 1$. We also prove a similar tight lower bound, i.e. show that for $\rho \to 0$ the pair of opposite Hamming balls approximately minimizes the probability $\mathbb {P}[{X} \in {A}, {Y}\in {B}]$.
• dc.language.iso: en
• dc.publisher: Institute of Electrical and Electronics Engineers (IEEE)
• dc.relation.isversionof: 10.1109/TIT.2020.3018232
• dc.source: arXiv
• dc.type: Article
• dc.contributor.department: Massachusetts Institute of Technology. Department of Electrical Engineering and Computer Science
• dc.relation.journal: IEEE Transactions on Information Theory
• dc.eprint.version: Original manuscript
• mit.journal.volume: 66
• mit.journal.issue: 12