An l ∞ Eigenvector Perturbation Bound and Its Application to Robust Covariance Estimation.

IF 4.3 3区计算机科学 Q1 AUTOMATION & CONTROL SYSTEMS Journal of Machine Learning Research Pub Date : 2018-04-01

Jianqing Fan, Weichen Wang, Yiqiao Zhong

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Abstract

In statistics and machine learning, we are interested in the eigenvectors (or singular vectors) of certain matrices (e.g. covariance matrices, data matrices, etc). However, those matrices are usually perturbed by noises or statistical errors, either from random sampling or structural patterns. The Davis-Kahan sin θ theorem is often used to bound the difference between the eigenvectors of a matrix A and those of a perturbed matrix $\tilde{A} = A + E$ , in terms of $l_{2}$ norm. In this paper, we prove that when A is a low-rank and incoherent matrix, the $l_{\infty}$ norm perturbation bound of singular vectors (or eigenvectors in the symmetric case) is smaller by a factor of $\sqrt{d_{1}}$ or $\sqrt{d_{2}}$ for left and right vectors, where d ₁ and d ₂ are the matrix dimensions. The power of this new perturbation result is shown in robust covariance estimation, particularly when random variables have heavy tails. There, we propose new robust covariance estimators and establish their asymptotic properties using the newly developed perturbation bound. Our theoretical results are verified through extensive numerical experiments.

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一个l∞特征向量扰动界及其在鲁棒协方差估计中的应用。

在统计学和机器学习中，我们对某些矩阵（如协方差矩阵、数据矩阵等）的特征向量（或奇异向量）感兴趣。然而，这些矩阵通常受到来自随机采样或结构模式的噪声或统计误差的干扰。Davis-Kahan-sinθ定理通常用于根据L2范数来约束矩阵a的特征向量与扰动矩阵a~=a+E的特征向量之间的差。在本文中，我们证明了当A是一个低秩非相干矩阵时，对于左向量和右向量，奇异向量（或对称情况下的特征向量）的l∞范数扰动界小于d1或d2的因子，其中d1和d2是矩阵维数。这种新的扰动结果的功率显示在鲁棒协方差估计中，特别是当随机变量具有重尾时。在那里，我们提出了新的鲁棒协方差估计，并使用新发展的扰动界建立了它们的渐近性质。我们的理论结果通过大量的数值实验得到了验证。

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 Machine Learning Research 工程技术-计算机：人工智能

CiteScore

18.80

自引率

0.00%

发文量

审稿时长

3 months

期刊介绍： The Journal of Machine Learning Research (JMLR) provides an international forum for the electronic and paper publication of high-quality scholarly articles in all areas of machine learning. All published papers are freely available online. JMLR has a commitment to rigorous yet rapid reviewing. JMLR seeks previously unpublished papers on machine learning that contain: new principled algorithms with sound empirical validation, and with justification of theoretical, psychological, or biological nature; experimental and/or theoretical studies yielding new insight into the design and behavior of learning in intelligent systems; accounts of applications of existing techniques that shed light on the strengths and weaknesses of the methods; formalization of new learning tasks (e.g., in the context of new applications) and of methods for assessing performance on those tasks; development of new analytical frameworks that advance theoretical studies of practical learning methods; computational models of data from natural learning systems at the behavioral or neural level; or extremely well-written surveys of existing work.