Asymptotic Normality of the Largest Eigenvalue for Noncentral Sample Covariance Matrices
Abstract
Let X be a p× n independent identically distributed real Gaussian matrix with positive mean μ and variance σ2 entries. The goal of this paper is to investigate the largest eigenvalue of the noncentral sample covariance matrix W=XXT/n, when the dimension p and the sample size n both grow to infinity with the limit p/n=c\,(0<c<∞). Utilizing the von Mises iteration method, we derive an approximation of the largest eigenvalue λ1(W) and show that λ1(W) asymptotically has a normal distribution with expectation pμ2+(1+c)σ2 and variance 4cμ2σ2.
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