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Optimal Shrinkage Estimation in Heteroscedastic Hierarchical Models

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If you have a question about this talk, please contact Richard Samworth.

Hierarchical models are powerful statistical tools widely used in scientific and engineering applications. The homoscedastic (equal variance) case has been extensively studied, and it is well known that shrinkage estimates, the James-Stein estimate in particular, offer nice theoretical (e.g., risk) properties. The heteroscedastic (the unequal variance) case, on the other hand, has received less attention, even though it frequently appears in real applications. It is not clear of how to construct “optimal” shrinkage estimate. In this talk, we study this problem. We introduce a class of shrinkage estimates, inspired by Stein’s unbiased risk estimate. We will show that this class is asymptotically optimal in the heteroscedastic case. We apply the estimates to real examples and observe excellent numerical results.

This talk is based on joint work with Lawrence Brown and Xianchao Xie.

This talk is part of the Statistics series.

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