Shimizu, K. (2023) Asymptotic properties of Bayesian inference in linear regression with a structural break. Journal of Econometrics, 235(1), pp. 202-219. (doi: 10.1016/j.jeconom.2022.03.006)
Text
269010.pdf - Published Version Available under License Creative Commons Attribution. 502kB |
Abstract
This paper studies large sample properties of a Bayesian approach to inference about slope parameters γ in linear regression models with a structural break. In contrast to the conventional approach to inference about γ that does not take into account the uncertainty of the unknown break date, the Bayesian approach that we consider incorporates such uncertainty. Our main theoretical contribution is a Bernstein–von Mises type theorem (Bayesian asymptotic normality) for γ under a wide class of priors, which essentially indicates an asymptotic equivalence between the conventional frequentist and Bayesian inference. Consequently, a frequentist researcher could look at credible intervals of γ to check robustness with respect to the uncertainty of the break date. Simulation studies show that the conventional confidence intervals of γ tend to undercover in finite samples whereas the credible intervals offer more reasonable coverages in general. As the sample size increases, the two methods coincide, as predicted from our theoretical conclusion. Using data from Paye and Timmermann (2006) on stock return prediction, we illustrate that the traditional confidence intervals on γ might underrepresent the true sampling uncertainty.
Item Type: | Articles |
---|---|
Status: | Published |
Refereed: | Yes |
Glasgow Author(s) Enlighten ID: | Shimizu, Dr Kenichi |
Authors: | Shimizu, K. |
College/School: | College of Social Sciences > Adam Smith Business School > Economics |
Journal Name: | Journal of Econometrics |
Publisher: | Elsevier |
ISSN: | 0304-4076 |
ISSN (Online): | 1872-6895 |
Published Online: | 30 April 2022 |
Copyright Holders: | Copyright © 2022 The Authors |
First Published: | First published in Journal of Econometrics 235(1): 202-219 |
Publisher Policy: | Reproduced under a Creative Commons License |
University Staff: Request a correction | Enlighten Editors: Update this record