Bias Correction for Semiparametric Regression Models
Abstract
We consider a broad class of semiparametric regression models in which the conditional distribution of the response takes the form , which is known up to a parametric component of diverging dimension , a smooth function , and a dispersion parameter . Existing semiparametric literature on such models has primarily focused on semiparametric efficiency for , typically treating and as nuisances and largely ignoring their finite-sample bias. However, the finite-sample bias of standard estimators can be substantial (especially when is large relatively to and/or dispersion is high) and can seriously undermine inference for . Moreover, is often of direct scientific interest and requires accurate estimation. To address this gap, we propose SABRE, a simulation-based bias correction framework for this broad semiparametric model class. We establish asymptotic properties of SABRE for the subclass of generalized partially linear models, where bias reduction for and can be achieved without inflating variance, and we outline how the underlying principle may be adapted more generally. Comprehensive simulation studies and a real-data application on early-stage diabetes demonstrate the empirical effectiveness of SABRE in reducing bias and improving inference.
Cite
@article{arxiv.2605.08656,
title = {Bias Correction for Semiparametric Regression Models},
author = {Yuming Zhang and Yanyuan Ma and Xuming He and Stéphane Guerrier},
journal= {arXiv preprint arXiv:2605.08656},
year = {2026}
}