Adaptive LASSO for linear regression models with ARMA-GARCH errors |
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Authors: | Young Joo Yoon Sooyong Lee |
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Institution: | 1. Department of Business Information Statistics, Daejeon University, Daejeon, Korea;2. Department of Statistics, Hankuk University of Foreign Studies, Seoul, Korea |
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Abstract: | The linear regression models with the autoregressive moving average (ARMA) errors (REGARMA models) are often considered, in order to reflect a serial correlation among observations. In this article, we focus on an adaptive least absolute shrinkage and selection operator (LASSO) (ALASSO) method for the variable selection of the REGARMA models and extend it to the linear regression models with the ARMA-generalized autoregressive conditional heteroskedasticity (ARMA-GARCH) errors (REGARMA-GARCH models). This attempt is an extension of the existing ALASSO method for the linear regression models with the AR errors (REGAR models) proposed by Wang et al. in 2007 Wang, H., Li, G., Tsai, C. (2007). Regression coefficient and autoregressive order shrinkage and selection via the lasso. Journal of the Royal Statistical Society: Series B 69:63–78. Google Scholar]. New ALASSO algorithms are proposed to determine important predictors for the REGARMA and REGARMA-GARCH models. Finally, we provide the simulation results and real data analysis to illustrate our findings. |
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Keywords: | Adaptive LASSO ARMA error models ARMA-GARCH error models Penalized regression Variable selection |
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