Fast Monte Carlo Markov chains for Bayesian shrinkage models with random effects
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When performing Bayesian data analysis using a general linear mixed model, the resulting posterior density is almost always analytically intractable. However, if proper conditionally conjugate priors are used, there is a simple two-block Gibbs sampler that is geometrically ergodic in nearly all practical settings, including situations where p > n (Abrahamsen and Hobert, 2017). Unfortunately, the (conditionally conjugate) multivariate normal prior on β does not perform well in the high-dimensional setting where p ≫ n. In this paper, we consider an alternative model in which the multivariate normal prior is replaced by the normal-gamma shrinkage prior developed by Griffin and Brown (2010). This change leads to a much more complex posterior density, and we develop a simple MCMC algorithm for exploring it. This algorithm, which has both deterministic and random scan components, is easier to analyze than the more obvious three-step Gibbs sampler. Indeed, we prove that the new algorithm is geometrically ergodic in most practical settings.
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