The Bayes rule of the variance parameter of the hierarchical normal and inverse gamma model under Stein's loss |
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| Authors: | Ying-Ying Zhang |
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| Affiliation: | Department of Statistics and Actuarial Science, College of Mathematics and Statistics, Chongqing University, Chongqing, China |
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| Abstract: | ![]()
For the variance parameter of the hierarchical normal and inverse gamma model, we analytically calculate the Bayes rule (estimator) with respect to a prior distribution IG (alpha, beta) under Stein's loss function. This estimator minimizes the posterior expected Stein's loss (PESL). We also analytically calculate the Bayes rule and the PESL under the squared error loss. Finally, the numerical simulations exemplify that the PESLs depend only on alpha and the number of observations. The Bayes rules and PESLs under Stein's loss are unanimously smaller than those under the squared error loss. |
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| Keywords: | Bayes rule hierarchical normal and inverse gamma model posterior expected loss Stein's loss variance parameter. |
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