Matrix Denoising: Bayes-Optimal Estimators Via Low-Degree Polynomials

IF 1.3 3区物理与天体物理 Q3 PHYSICS, MATHEMATICAL

Journal of Statistical Physics Pub Date : 2024-10-23 DOI:10.1007/s10955-024-03359-9

Guilhem Semerjian

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Abstract

We consider the additive version of the matrix denoising problem, where a random symmetric matrix S of size n has to be inferred from the observation of \(Y=S+Z\), with Z an independent random matrix modeling a noise. For prior distributions of S and Z that are invariant under conjugation by orthogonal matrices we determine, using results from first and second order free probability theory, the Bayes-optimal (in terms of the mean square error) polynomial estimators of degree at most D, asymptotically in n, and show that as D increases they converge towards the estimator introduced by Bun et al. (IEEE Trans Inf Theory 62:7475, 2016). We conjecture that this optimality holds beyond strictly orthogonally invariant priors, and provide partial evidences of this universality phenomenon when S is an arbitrary Wishart matrix and Z is drawn from the Gaussian Orthogonal Ensemble, a case motivated by the related extensive rank matrix factorization problem.

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矩阵去噪：通过低度多项式的贝叶斯最优估计器

我们考虑的是矩阵去噪问题的加法版本，即必须从观测结果中推断出大小为 n 的随机对称矩阵 S（Y=S+Z），Z 是一个独立的随机矩阵，用于模拟噪声。对于在正交矩阵共轭下不变的 S 和 Z 的先验分布，我们利用一阶和二阶自由概率论的结果，确定了贝叶斯最优（就均方误差而言）多项式估计器，其阶数至多为 D，渐近于 n，并表明随着 D 的增大，它们向 Bun 等人引入的估计器收敛（IEEE Trans Inf Theory 62:7475, 2016）。我们猜想这种最优性在严格正交不变先验之外也是成立的，并提供了当 S 是任意 Wishart 矩阵且 Z 来自高斯正交集合时这种普遍性现象的部分证据，这种情况是由相关的广泛秩矩阵因式分解问题激发的。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Statistical Physics 物理-物理：数学物理

CiteScore

3.10

自引率

12.50%

发文量

152

审稿时长

3-6 weeks

期刊介绍： The Journal of Statistical Physics publishes original and invited review papers in all areas of statistical physics as well as in related fields concerned with collective phenomena in physical systems.