Properties of h-Likelihood Estimators in Clustered Data |
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| Authors: | Lee Youngjo Gwangsu Kim |
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| Affiliation: | 1. Department of Statistics, Seoul National University, Seoul, Korea;2. School of Electrical Engineering, Korea Advanced Institute of Science and Technology, Daejeon, Korea |
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| Abstract: | We study properties of the maximum h-likelihood estimators for random effects in clustered data. To define optimality in random effects predictions, several foundational concepts of statistics such as likelihood, unbiasedness, consistency, confidence distribution and the Cramer–Rao lower bound are extended. Exact probability statements about interval estimators for random effects can be made asymptotically without a prior assumption. Using the binary-matched pair example, we illustrated that the use of random effects recover information, leading to the boon on estimating treatment effects. |
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| Keywords: | Maximum likelihood estimator best linear unbiased predictor Bayes estimator Bartlett identities Cramer–Rao bound confidence distribution |
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