English

Fixed-order PCA: Theory for Overestimated Factor Models

Statistics Theory 2026-05-19 v1 Econometrics Statistics Theory

Abstract

We develop asymptotic theory for principal component analysis (PCA) of a high-dimensional factor model in which the working dimension RR is fixed and only required to satisfy RrR \ge r, where rr is the true number of factors. Building on anisotropic local laws from random matrix theory, we show that the ``extra'' empirical eigencomponents beyond the rr-th are asymptotically noise-governed, incoherent, and nearly orthogonal to the factor loadings. We introduce two rotations, an expanded r×Rr\times R map HH' and a compressed R×rR\times r map H+H^{+}, and establish consistency of the estimated factors under both. As an application, we analyze a factor-augmented regression for treatment-effect inference and prove T\sqrt{T}-asymptotic normality for every fixed RrR \ge r. These results provide a theoretical underpinning for the common empirical practice of adopting a conservative upper bound on the number of factors, and shift the analytical burden from consistent dimension selection to the milder requirement of bounding rr from above.

Keywords

Cite

@article{arxiv.2605.18448,
  title  = {Fixed-order PCA: Theory for Overestimated Factor Models},
  author = {Yuan Liao and Xin Tong and Wanjie Wang and Dacheng Xiu},
  journal= {arXiv preprint arXiv:2605.18448},
  year   = {2026}
}