Higher-order Expansions and Inference for Panel Data Models

In this paper, we propose a simple inferential method for a wide class of panel data models with a focus on such cases that have both serial correlation and cross-sectional dependence. In order to establish an asymptotic theory to support the inferential method, we develop some new and useful higher-order expansions, such as Berry-Esseen bound and Edgeworth Expansion, under a set of simple and general conditions. We further demonstrate the usefulness of these theoretical results by explicitly investigating a panel data model with interactive effects which nests many traditional panel data models as special cases. Finally, we show the superiority of our approach over several natural competitors using extensive numerical studies.

Keywords: Dependent Wild Bootstrap, Edgeworth Expansion, Fund Performance Evaluation

JEL Classification: C12, C18, C23

Suggested Citation: Suggested Citation

Gao, Jiti and Peng, Bin and Yan, Yayi, Higher-order Expansions and Inference for Panel Data Models (June 8, 2022). Available at SSRN: https://ssrn.com/abstract=4098007 or http://dx.doi.org/10.2139/ssrn.4098007