Bias Correction in Factor-Augmented Regression Models with Weak Factors
Abstract
In this paper, we study the asymptotic bias of the factor-augmented regression estimator and its reduction, which is augmented by the factors extracted from a large number of variables with observations. In particular, we consider general weak latent factor models with signal eigenvalues that may diverge at different rates, , , . In the existing literature, the bias has been derived using an approximation for the estimated factors with a specific data-dependent rotation matrix for the model with for all , whereas we derive the bias for weak factor models. In addition, we derive the bias using the approximation with a different rotation matrix , which generally has a smaller bias than with . We also derive the bias using our preferred approximation with a purely signal-dependent rotation , which is unique and can be regarded as the population version of and . Since this bias is parametrically inestimable, we propose a split-panel jackknife bias correction, and theory shows that it successfully reduces the bias. The extensive finite-sample experiments suggest that the proposed bias correction works very well, and the empirical application illustrates its usefulness in practice.
Cite
@article{arxiv.2509.02066,
title = {Bias Correction in Factor-Augmented Regression Models with Weak Factors},
author = {Peiyun Jiang and Yoshimasa Uematsu and Takashi Yamagata},
journal= {arXiv preprint arXiv:2509.02066},
year = {2025}
}