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Limiting laws for divergent spiked eigenvalues and largest nonspiked eigenvalue of sample covariance matrices

Tianxi Cai, Xiao Han, Guangming Pan

2020The Annals of Statistics59 citationsDOIOpen Access PDF

Abstract

We study the asymptotic distributions of the spiked eigenvalues and the largest nonspiked eigenvalue of the sample covariance matrix under a general covariance model with divergent spiked eigenvalues, while the other eigenvalues are bounded but otherwise arbitrary. The limiting normal distribution for the spiked sample eigenvalues is established. It has distinct features that the asymptotic mean relies on not only the population spikes but also the nonspikes and that the asymptotic variance in general depends on the population eigenvectors. In addition, the limiting Tracy–Widom law for the largest nonspiked sample eigenvalue is obtained. Estimation of the number of spikes and the convergence of the leading eigenvectors are also considered. The results hold even when the number of the spikes diverges. As a key technical tool, we develop a central limit theorem for a type of random quadratic forms where the random vectors and random matrices involved are dependent. This result can be of independent interest.

Topics & Concepts

MathematicsEigenvalues and eigenvectorsAsymptotic distributionCovarianceCentral limit theoremEigenvalue perturbationRandom matrixApplied mathematicsPopulationSample mean and sample covarianceLimit (mathematics)Estimation of covariance matricesMathematical analysisStatisticsQuantum mechanicsEstimatorSociologyPhysicsDemographyRandom Matrices and ApplicationsStochastic processes and statistical mechanicsBayesian Methods and Mixture Models