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Asymptotic independence of spiked eigenvalues and linear spectral statistics for large sample covariance matrices

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arxiv 2009.11010 v2 pith:2URKG75E submitted 2020-09-23 math.ST stat.TH

Asymptotic independence of spiked eigenvalues and linear spectral statistics for large sample covariance matrices

classification math.ST stat.TH
keywords spikedsamplecovarianceeigenvaluespopulationleadinglinearmatrices
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We consider general high-dimensional spiked sample covariance models and show that their leading sample spiked eigenvalues and their linear spectral statistics are asymptotically independent when the sample size and dimension are proportional to each other. As a byproduct, we also establish the central limit theorem of the leading sample spiked eigenvalues by removing the block diagonal assumption on the population covariance matrix, which is commonly needed in the literature. Moreover, we propose consistent estimators of the $L_4$ norm of the spiked population eigenvectors. Based on these results, we develop a new statistic to test the equality of two spiked population covariance matrices. Numerical studies show that the new test procedure is more powerful than some existing methods.

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