On the distribution of the largest eigenvalue in principal components analysis
成果类型:
Article
署名作者:
Johnstone, IM
署名单位:
Stanford University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/aos/1009210544
发表日期:
2001
页码:
295-327
关键词:
random-matrix
spacing distributions
ensembles
fluctuations
spectrum
roots
edge
摘要:
Let x((1)) denote the square of the largest singular value of an n x p matrix X, all of whose entries are independent standard Gaussian variates. Equivalently, x((1)) is the largest principal component variance of the covariance matrix X'X, or the largest eigenvalue of a p-variate Wishart distribution on n degrees of freedom with identity covariance. Consider the limit of large p and n with n/p = gamma greater than or equal to 1. When centered by mu (p) = (rootn - 1 + rootp)(2) and scaled by sigma (p) = (rootn - 1 + rootp)(1/rootn - 1 + 1/rootp)(1/3), the distribution of x((1)) approaches the Tracy-Widom law of order 1, which is defined in terms of the Painleve II differential equation and can be numerically evaluated and tabulated in software. Simulations show the approximation to be informative for n and p as small as 5. The limit is derived via a corresponding result for complex Wishart matrices using methods from random matrix theory. The result suggests that some aspects of large p multivariate distribution theory may be easier to apply in practice than their fixed p counterparts.
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