Fixed-b Asymptotics for Panel Models with Two-Way Clustering
Abstract
This paper studies a cluster robust variance estimator proposed by Chiang, Hansen and Sasaki (2024) for linear panels. First, we show algebraically that this variance estimator (CHS estimator, hereafter) is a linear combination of three common variance estimators: the one-way unit cluster estimator, the "HAC of averages" estimator, and the "average of HACs" estimator. Based on this finding, we obtain a fixed- asymptotic result for the CHS estimator and corresponding test statistics as the cross-section and time sample sizes jointly go to infinity. Furthermore, we propose two simple bias-corrected versions of the variance estimator and derive the fixed- limits. In a simulation study, we find that the two bias-corrected variance estimators along with fixed- critical values provide improvements in finite sample coverage probabilities. We illustrate the impact of bias-correction and use of the fixed- critical values on inference in an empirical example on the relationship between industry profitability and market concentration.
Keywords
Cite
@article{arxiv.2309.08707,
title = {Fixed-b Asymptotics for Panel Models with Two-Way Clustering},
author = {Kaicheng Chen and Timothy J. Vogelsang},
journal= {arXiv preprint arXiv:2309.08707},
year = {2024}
}