Abstract
This paper is concerned with statistical inference for regression coefficients in high-dimensional linear regression models. We propose a new method for testing the coefficient vector of the high-dimensional linear models, and establish the asymptotic normality of our proposed test statistic with the aid of the martingale central limit theorem. We derive the asymptotical relative efficiency (ARE) of the proposed test with respect to the test proposed in Zhong and Chen (J. Amer. Statist. Assoc. 106 (2011) 260–274), and show that the ARE is always greater or equal to one under the local alternative studied in this paper. Our numerical studies imply that the proposed test with critical values derived from its asymptotical normal distribution may retain Type I error rate very well. Our numerical comparison demonstrates the proposed test performs better than existing ones in terms of powers. We further illustrate our proposed method with a real data example.
Funding Statement
The research of R. Li and was supported by NIH Grants R01AI170249 and R01AI136664. The content is solely the responsibility of the authors and does not necessarily represent the official views of the NIH.
Acknowledgments
Alex Zhao and Changcheng Li are the first authors of this paper. The authors would like to thank the Associate Editor and reviewers for their constructive comments, which lead to significant improvement of this work.
Citation
Alex Zhao. Changcheng Li. Runze Li. Zhe Zhang. "Testing high-dimensional regression coefficients in linear models." Ann. Statist. 52 (5) 2034 - 2058, October 2024. https://doi.org/10.1214/24-AOS2420
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