Intrinsic Bayesian Cramér-Rao Bound With an Application to Covariance Matrix Estimation

IF 2.2 3区 计算机科学 Q3 COMPUTER SCIENCE, INFORMATION SYSTEMS IEEE Transactions on Information Theory Pub Date : 2024-10-14 DOI:10.1109/TIT.2024.3480280
Florent Bouchard;Alexandre Renaux;Guillaume Ginolhac;Arnaud Breloy
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Abstract

This paper presents a new performance bound for estimation problems where the parameter to estimate lies in a Riemannian manifold (a smooth manifold endowed with a Riemannian metric) and follows a given prior distribution. In this setup, the chosen Riemannian metric induces a geometry for the parameter manifold, as well as an intrinsic notion of the estimation error measure. Performance bounds for such error measure were previously obtained in the non-Bayesian case (when the unknown parameter is assumed to deterministic), and referred to as intrinsic Cramér-Rao bound. The presented result then appears either as: a) an extension of the intrinsic Cramér-Rao bound to the Bayesian estimation framework; b) a generalization of the Van-Trees inequality (Bayesian Cramér-Rao bound) that accounts for the aforementioned geometric structures. In a second part, we leverage this formalism to study the problem of covariance matrix estimation when the data follow a Gaussian distribution, and whose covariance matrix is drawn from an inverse Wishart distribution. Performance bounds for this problem are obtained for both the mean squared error (Euclidean metric) and the natural Riemannian distance for Hermitian positive definite matrices (affine invariant metric). Numerical simulation illustrate that assessing the error with the affine invariant metric is revealing of interesting properties of the maximum a posteriori and minimum mean square error estimator, which are not observed when using the Euclidean metric.
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应用于协方差矩阵估计的本征贝叶斯克拉梅尔-拉奥约束
本文提出了估算问题的新性能约束,在这种情况下,需要估算的参数位于黎曼流形(具有黎曼度量的光滑流形)中,并遵循给定的先验分布。在这种情况下,所选的黎曼度量会诱导出参数流形的几何形状,以及估计误差度量的内在概念。这种误差度量的性能边界以前曾在非贝叶斯情况下(当未知参数被假定为确定性时)获得过,并被称为本征克拉梅尔-拉奥边界(intrinsic Cramér-Rao bound)。本文提出的结果要么是:a) 本征克拉梅尔-拉奥约束在贝叶斯估计框架下的扩展;b) 考虑到上述几何结构的 Van-Trees 不等式(贝叶斯克拉梅尔-拉奥约束)的广义化。在第二部分中,我们利用这一形式主义来研究协方差矩阵估计问题,即当数据遵循高斯分布且其协方差矩阵取自逆 Wishart 分布时。我们获得了这个问题的均方误差(欧氏度量)和赫米特正定矩阵的自然黎曼距离(仿射不变度量)的性能边界。数字模拟说明,用仿射不变度量评估误差可以揭示最大后验误差和最小均方误差估计器的有趣特性,而使用欧氏度量时则观察不到这些特性。
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来源期刊
IEEE Transactions on Information Theory
IEEE Transactions on Information Theory 工程技术-工程:电子与电气
CiteScore
5.70
自引率
20.00%
发文量
514
审稿时长
12 months
期刊介绍: The IEEE Transactions on Information Theory is a journal that publishes theoretical and experimental papers concerned with the transmission, processing, and utilization of information. The boundaries of acceptable subject matter are intentionally not sharply delimited. Rather, it is hoped that as the focus of research activity changes, a flexible policy will permit this Transactions to follow suit. Current appropriate topics are best reflected by recent Tables of Contents; they are summarized in the titles of editorial areas that appear on the inside front cover.
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Table of Contents IEEE Transactions on Information Theory Information for Authors IEEE Transactions on Information Theory Publication Information Reliable Computation by Large-Alphabet Formulas in the Presence of Noise Capacity Results for the Wiretapped Oblivious Transfer
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