Two-way Clustering Robust Variance Estimator in Quantile Regression Models
Econometrics
2026-05-26 v2 Applications
Abstract
We study inference for linear quantile regression with two-way clustered data. Using a separately exchangeable array framework and a projection decomposition of the quantile score, we characterize regime-dependent convergence rates and establish a self-normalized Gaussian approximation. We propose a two-way cluster-robust sandwich variance estimator with a kernel-based density ``bread'' and a projection-matched ``meat'', and prove consistency and validity of inference in Gaussian regimes. We also show an impossibility result for uniform inference in a non-Gaussian interaction regime.
Keywords
Cite
@article{arxiv.2602.16376,
title = {Two-way Clustering Robust Variance Estimator in Quantile Regression Models},
author = {Ulrich Hounyo and Jiahao Lin},
journal= {arXiv preprint arXiv:2602.16376},
year = {2026}
}