On the problem of selecting good populations |
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| Authors: | Shanti S. Gupta Woo-Chul Kim |
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| Affiliation: | 1. Purdue University , West Lafayette, Indiana;2. Seoul National University , Seoul, Korea |
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| Abstract: | The problem of selecting good populations out of k normal populations is considered in a Bayesian framework under exchangeable normal priors and additive loss functions. Some basic approximations to the Bayes rules are discussed. These approximations suggest that some well-known classical rules are "approximate" Bayes rules. Especially, it is shown that Gupta-type rules are extended Bayes with respect to a family of the exchangeable normal priors for any bounded and additive loss function. Furthermore, for a simple loss function, the results of a Monte Carlo comparison of Gupta-type rules and Seal-type rules are presented. They indicate that, in general, Gupta-type rules perform better than Seal-type rules |
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| Keywords: | subset selection of good populations additive loss Bayes rules extended Bayes rules Gupta-type rules Seal-type rules Monte Carlo comparison |
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