Haifang Shi scite author profile

This paper presents a Bayesian analysis of linear mixed models for quantile regression based on a Cholesky decomposition for the covariance matrix of random effects. We develop a Bayesian shrinkage approach to quantile mixed regression models using a Bayesian adaptive lasso and an extended Bayesian adaptive group lasso. We also consider variable selection procedures for both fixed and random effects in a linear quantile mixed model via the Bayesian adaptive lasso and extended Bayesian adaptive group lasso with spike and slab priors. To improve mixing of the Markov chains, a simple and efficient partially collapsed Gibbs sampling algorithm is developed for posterior inference. Simulation experiments and an application to the Age-Related Macular Degeneration Trial data to demonstrate the proposed methods.

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Constrained Bayesian doubly elastic net Lasso for linear quantile mixed models

Shi

2021

Journal of Statistical Computation and Simulation

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Bayesian Model Selection in Order-Restricted Two-Way ANOVA Mixed Models

Shi

2019

Statistics in Biopharmaceutical Research

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Haifang Shi

An Approximation Model of the Collective Risk Model with INAR(1) Claim Process

Shrinkage estimation of fixed and random effects in linear quantile mixed models

Bayesian variable selection in linear quantile mixed models for longitudinal data with application to macular degeneration

Constrained Bayesian doubly elastic net Lasso for linear quantile mixed models

Bayesian Model Selection in Order-Restricted Two-Way ANOVA Mixed Models

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