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Main Authors: Pericchi, Luis R., Perez, Maria-Eglee
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.10114
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author Pericchi, Luis R.
Perez, Maria-Eglee
author_facet Pericchi, Luis R.
Perez, Maria-Eglee
contents In `borrowing strength' an important problem of Statistics is to treat exceptional cases in a fundamentally different. This is what has been coined as `the Clemente problem' in honor of R. Clemente (Efron 2010). In this article, we propose to use robust penalties, in the form of losses that penalize more severely huge errors, or (equivalently) priors of heavy tails which make more probable the exceptional. Using heavy tailed priors, we can reproduce in a Bayesian way Efron and Morris `limited translated estimators' (with Double Exponential Priors) and `discarding priors estimators' (with Cauchy like priors), which discard the prior in the presence of conflict. Both Empirical Bayes and Full Bayes approaches are able to alleviate the Clemente Problem and furthermore beat the James-Stein estimator in terms of smaller square errors, for sensible Robust Bayes priors. We model in parallel Empirical Bayes and Fully Bayesian hierarchical models, illustrating that the differences among sensible versions of both are relatively small, as compared with the effect due to the robust assumptions.
format Preprint
id arxiv_https___arxiv_org_abs_2506_10114
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Limiting the Shrinkage for the Exceptional by Objective Robust Bayesian Analysis: the `Clemente Problem'
Pericchi, Luis R.
Perez, Maria-Eglee
Methodology
In `borrowing strength' an important problem of Statistics is to treat exceptional cases in a fundamentally different. This is what has been coined as `the Clemente problem' in honor of R. Clemente (Efron 2010). In this article, we propose to use robust penalties, in the form of losses that penalize more severely huge errors, or (equivalently) priors of heavy tails which make more probable the exceptional. Using heavy tailed priors, we can reproduce in a Bayesian way Efron and Morris `limited translated estimators' (with Double Exponential Priors) and `discarding priors estimators' (with Cauchy like priors), which discard the prior in the presence of conflict. Both Empirical Bayes and Full Bayes approaches are able to alleviate the Clemente Problem and furthermore beat the James-Stein estimator in terms of smaller square errors, for sensible Robust Bayes priors. We model in parallel Empirical Bayes and Fully Bayesian hierarchical models, illustrating that the differences among sensible versions of both are relatively small, as compared with the effect due to the robust assumptions.
title Limiting the Shrinkage for the Exceptional by Objective Robust Bayesian Analysis: the `Clemente Problem'
topic Methodology
url https://arxiv.org/abs/2506.10114