Bayesian bridge-randomized penalized quantile regression estimation for linear regression model with AP(q) perturbation |
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| Authors: | Yuzhu Tian Liyong Wang Maozai Tian |
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| Affiliation: | 1. School of Mathematics and Statistics, Henan University of Science and Technology, LuoYang, People's Republic of China;2. School of Mathematics and Statistics, Northwest Normal University, LanZhou, People's Republic of China;3. School of Statistics and Mathematics, The Central University of Finance and Economics, Beijing, People's Republic of China;4. School of Statistics, Renmin University of China, Beijing, People's Republic of China |
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| Abstract: | Bridge penalized regression has many desirable statistical properties such as unbiasedness, sparseness as well as ‘oracle’. In Bayesian framework, bridge regularized penalty can be implemented based on generalized Gaussian distribution (GGD) prior. In this paper, we incorporate Bayesian bridge-randomized penalty and its adaptive version into the quantile regression (QR) models with autoregressive perturbations to conduct Bayesian penalization estimation. Employing the working likelihood of the asymmetric Laplace distribution (ALD) perturbations, the Bayesian joint hierarchical models are established. Based on the mixture representations of the ALD and generalized Gaussian distribution (GGD) priors of coefficients, the hybrid algorithms based on Gibbs sampler and Metropolis-Hasting sampler are provided to conduct fully Bayesian posterior estimation. Finally, the proposed Bayesian procedures are illustrated by some simulation examples and applied to a real data application of the electricity consumption. |
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| Keywords: | QR analysis Bayesian penalty bridge regression autoregressive (AR) perturbation GGD prior joint hierarchical model |
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