Estimation of regression vectors in linear mixed models with Dirichlet process random effects |
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Authors: | Chen Li George Casella Malay Ghosh |
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Affiliation: | 1. Freddie Mac, Vienna, Virginia, USAghoshm@u.edu;3. Department of Statistics, University of Florida, Gainesville, FL, USA |
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Abstract: | The Dirichlet process has been used extensively in Bayesian non parametric modeling, and has proven to be very useful. In particular, mixed models with Dirichlet process random effects have been used in modeling many types of data and can often outperform their normal random effect counterparts. Here we examine the linear mixed model with Dirichlet process random effects from a classical view, and derive the best linear unbiased estimator (BLUE) of the fixed effects. We are also able to calculate the resulting covariance matrix and find that the covariance is directly related to the precision parameter of the Dirichlet process, giving a new interpretation of this parameter. We also characterize the relationship between the BLUE and the ordinary least-squares (OLS) estimator and show how confidence intervals can be approximated. |
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Keywords: | Best linear unbiased estimation Gauss–Markov theorem interval estimation one-way model two-way model |
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