A new heteroskedasticity-consistent covariance matrix estimator and inference under heteroskedasticity |
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| Authors: | Shunyong Li Nahui Zhang Guannan Wang |
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| Institution: | 1. School of Mathematical Sciences, Shanxi University, Shanxi, People's Republic of China;2. Department of Mathematics, College of William and Mary, Williamsburg, VA, USA |
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| Abstract: | To solve the heteroscedastic problem in linear regression, many different heteroskedasticity-consistent covariance matrix estimators have been proposed, including HC0 estimator and its variants, such as HC1, HC2, HC3, HC4, HC5 and HC4m. Each variant of the HC0 estimator aims at correcting the tendency of underestimating the true variances. In this paper, a new variant of HC0 estimator, HC5m, which is a combination of HC5 and HC4m, is proposed. Both the numerical analysis and the empirical analysis show that the quasi-t inference based on HC5m is typically more reliable than inferences based on other covariance matrix estimators, regardless of the existence of high leverage points. |
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| Keywords: | Heteroskedasticity covariance matrix estimators quasi-t test high leverage points |
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