Litcius/Paper detail

James–Stein for the leading eigenvector

Lisa R. Goldberg, Alec N. Kercheval

2023Proceedings of the National Academy of Sciences11 citationsDOIOpen Access PDF

Abstract

Recent research identifies and corrects bias, such as excess dispersion, in the leading sample eigenvector of a factor-based covariance matrix estimated from a high-dimension low sample size (HL) data set. We show that eigenvector bias can have a substantial impact on variance-minimizing optimization in the HL regime, while bias in estimated eigenvalues may have little effect. We describe a data-driven eigenvector shrinkage estimator in the HL regime called "James-Stein for eigenvectors" (JSE) and its close relationship with the James-Stein (JS) estimator for a collection of averages. We show, both theoretically and with numerical experiments, that, for certain variance-minimizing problems of practical importance, efforts to correct eigenvalues have little value in comparison to the JSE correction of the leading eigenvector. When certain extra information is present, JSE is a consistent estimator of the leading eigenvector.

Topics & Concepts

Eigenvalues and eigenvectorsEstimatorCovariance matrixMathematicsDimension (graph theory)Variance (accounting)StatisticsApplied mathematicsEconometricsSample size determinationShrinkage estimatorMatrix (chemical analysis)Minimum-variance unbiased estimatorBias of an estimatorCombinatoricsPhysicsEconomicsChemistryAccountingQuantum mechanicsChromatographyRandom Matrices and ApplicationsStatistical Methods and Bayesian InferenceSpatial and Panel Data Analysis