English

Tracy-Widom, Gaussian, and Bootstrap: Approximations for Leading Eigenvalues in High-Dimensional PCA

Statistics Theory 2025-04-01 v1 Statistics Theory

Abstract

Under certain conditions, the largest eigenvalue of a sample covariance matrix undergoes a well-known phase transition when the sample size nn and data dimension pp diverge proportionally. In the subcritical regime, this eigenvalue has fluctuations of order n2/3n^{-2/3} that can be approximated by a Tracy-Widom distribution, while in the supercritical regime, it has fluctuations of order n1/2n^{-1/2} that can be approximated with a Gaussian distribution. However, the statistical problem of determining which regime underlies a given dataset is far from resolved. We develop a new testing framework and procedure to address this problem. In particular, we demonstrate that the procedure has an asymptotically controlled level, and that it is power consistent for certain alternatives. Also, this testing procedure enables the design a new bootstrap method for approximating the distributions of functionals of the leading sample eigenvalues within the subcritical regime -- which is the first such method that is supported by theoretical guarantees.

Keywords

Cite

@article{arxiv.2503.23097,
  title  = {Tracy-Widom, Gaussian, and Bootstrap: Approximations for Leading Eigenvalues in High-Dimensional PCA},
  author = {Nina Dörnemann and Miles E. Lopes},
  journal= {arXiv preprint arXiv:2503.23097},
  year   = {2025}
}
R2 v1 2026-06-28T22:39:00.898Z