English

Dimension Reduction for Polynomials over Gaussian Space and Applications

Computational Complexity 2017-08-15 v1 Information Theory math.IT

Abstract

We introduce a new technique for reducing the dimension of the ambient space of low-degree polynomials in the Gaussian space while preserving their relative correlation structure, analogous to the Johnson-Lindenstrauss lemma. As applications, we address the following problems: 1. Computability of Approximately Optimal Noise Stable function over Gaussian space: The goal is to find a partition of Rn\mathbb{R}^n into kk parts, that maximizes the noise stability. An δ\delta-optimal partition is one which is within additive δ\delta of the optimal noise stability. De, Mossel & Neeman (CCC 2017) raised the question of proving a computable bound on the dimension n0(δ)n_0(\delta) in which we can find an δ\delta-optimal partition. While De et al. provide such a bound, using our new technique, we obtain improved explicit bounds on the dimension n0(δ)n_0(\delta). 2. Decidability of Non-Interactive Simulation of Joint Distributions: A "non-interactive simulation" problem is specified by two distributions P(x,y)P(x,y) and Q(u,v)Q(u,v): The goal is to determine if two players that observe sequences XnX^n and YnY^n respectively where {(Xi,Yi)}i=1n\{(X_i, Y_i)\}_{i=1}^n are drawn i.i.d. from P(x,y)P(x,y) can generate pairs UU and VV respectively (without communicating with each other) with a joint distribution that is arbitrarily close in total variation to Q(u,v)Q(u,v). Even when PP and QQ are extremely simple, it is open in several cases if PP can simulate QQ. In the special where QQ is a joint distribution over {0,1}×{0,1}\{0,1\} \times \{0,1\}, Ghazi, Kamath and Sudan (FOCS 2016) proved a computable bound on the number of samples n0(δ)n_0(\delta) that can be drawn from P(x,y)P(x,y) to get δ\delta-close to QQ (if it is possible at all). Recently De, Mossel & Neeman obtained such bounds when QQ is a distribution over [k]×[k][k] \times [k] for any k2k \ge 2. We recover this result with improved explicit bounds on n0(δ)n_0(\delta).

Keywords

Cite

@article{arxiv.1708.03808,
  title  = {Dimension Reduction for Polynomials over Gaussian Space and Applications},
  author = {Badih Ghazi and Pritish Kamath and Prasad Raghavendra},
  journal= {arXiv preprint arXiv:1708.03808},
  year   = {2017}
}
R2 v1 2026-06-22T21:13:12.949Z