English

Boolean functions: noise stability, non-interactive correlation distillation, and mutual information

Probability 2021-01-27 v6 Information Theory math.IT

Abstract

Let TϵT_{\epsilon} be the noise operator acting on Boolean functions f:{0,1}n{0,1}f:\{0, 1\}^n\to \{0, 1\}, where ϵ[0,1/2]\epsilon\in[0, 1/2] is the noise parameter. Given α>1\alpha>1 and fixed mean Ef\mathbb{E} f, which Boolean function ff has the largest α\alpha-th moment E(Tϵf)α\mathbb{E}(T_\epsilon f)^\alpha? This question has close connections with noise stability of Boolean functions, the problem of non-interactive correlation distillation, and Courtade-Kumar's conjecture on the most informative Boolean function. In this paper, we characterize maximizers in some extremal settings, such as low noise (ϵ=ϵ(n)\epsilon=\epsilon(n) is close to 0), high noise (ϵ=ϵ(n)\epsilon=\epsilon(n) is close to 1/2), as well as when α=α(n)\alpha=\alpha(n) is large. Analogous results are also established in more general contexts, such as Boolean functions defined on discrete torus (Z/pZ)n(\mathbb{Z}/p\mathbb{Z})^n and the problem of noise stability in a tree model.

Cite

@article{arxiv.1801.04462,
  title  = {Boolean functions: noise stability, non-interactive correlation distillation, and mutual information},
  author = {Jiange Li and Muriel Medard},
  journal= {arXiv preprint arXiv:1801.04462},
  year   = {2021}
}

Comments

Corrections of some inaccuracies

R2 v1 2026-06-22T23:44:27.589Z