Title | Regression coefficient and autoregressive order shrinkage and selection via the lasso |
Authors | Wang, Hansheng Li, Guodong Tsai, Chih-Ling |
Affiliation | Peking Univ, Guanghua Sch Management, Beijing 100871, Peoples R China. Univ Hong Kong, Hong Kong, Hong Kong, Peoples R China. Univ Calif Davis, Davis, CA 95616 USA. |
Keywords | autoregression with exogenous variables lasso oracle estimator regression model with autoregressive errors NONCONCAVE PENALIZED LIKELIHOOD MODEL SELECTION VARIABLE SELECTION |
Issue Date | 2007 |
Publisher | journal of the royal statistical society series b statistical methodology |
Citation | JOURNAL OF THE ROYAL STATISTICAL SOCIETY SERIES B-STATISTICAL METHODOLOGY.2007,69,63-78. |
Abstract | The least absolute shrinkage and selection operator ('lasso') has been widely used in regression shrinkage and selection. We extend its application to the regression model with autoregressive errors. Two types of lasso estimators are carefully studied. The first is similar to the traditional lasso estimator with only two tuning parameters (one for regression coefficients and the other for autoregression coefficients). These tuning parameters can be easily calculated via a data-driven method, but the resulting lasso estimator may not be fully efficient. To overcome this limitation, we propose a second lasso estimator which uses different tuning parameters for each coefficient. We show that this modified lasso can produce the estimator as efficiently as the oracle. Moreover, we propose an algorithm for tuning parameter estimates to obtain the modified lasso estimator. Simulation studies demonstrate that the modified estimator is superior to the traditional estimator. One empirical example is also presented to illustrate the usefulness of lasso estimators. The extension of the lasso to the autoregression with exogenous variables model is briefly discussed. |
URI | http://hdl.handle.net/20.500.11897/321880 |
ISSN | 1369-7412 |
Indexed | SCI(E) |
Appears in Collections: | 光华管理学院 |