The Whetstone and the Alum Block: balanced objective Bayesian comparison of nested models for discrete data
The Whetstone and the Alum Block: balanced objective Bayesian comparison of nested models for discrete data
When two nested models are compared, using a Bayes factor, from an objective standpoint, two seemingly conflicting issues emerge at the time of choosing parameter priors under the two models. On the one hand, for moderate sample sizes, the evidence in favor of the smaller model can be inflated by diffuseness of the prior under the larger model. On the other hand, asymptotically, the evidence in favor of the smaller model typically ac- cumulates at a slower rate. With reference to finitely discrete data models, we show that these two issues can be dealt with jointly, by combining intrinsic priors and nonlocal priors in a new unified class of priors. We illustrate our ideas in a running Bernoulli example, then we apply them to test the equality of two proportions, and finally we deal with the more general case of logistic regression models
398-423
Consonni, Guido
0e3fc0a4-388c-450d-8a9c-3ca9bb4a720b
Forster, Jonathan J.
e3c534ad-fa69-42f5-b67b-11617bc84879
La Rocca, Luca
2c184dd4-1a7a-422f-b8a9-4dd5e9c9a4ee
2013
Consonni, Guido
0e3fc0a4-388c-450d-8a9c-3ca9bb4a720b
Forster, Jonathan J.
e3c534ad-fa69-42f5-b67b-11617bc84879
La Rocca, Luca
2c184dd4-1a7a-422f-b8a9-4dd5e9c9a4ee
Consonni, Guido, Forster, Jonathan J. and La Rocca, Luca
(2013)
The Whetstone and the Alum Block: balanced objective Bayesian comparison of nested models for discrete data.
Statistical Science, 28 (3), .
(doi:10.1214/13-STS433).
Abstract
When two nested models are compared, using a Bayes factor, from an objective standpoint, two seemingly conflicting issues emerge at the time of choosing parameter priors under the two models. On the one hand, for moderate sample sizes, the evidence in favor of the smaller model can be inflated by diffuseness of the prior under the larger model. On the other hand, asymptotically, the evidence in favor of the smaller model typically ac- cumulates at a slower rate. With reference to finitely discrete data models, we show that these two issues can be dealt with jointly, by combining intrinsic priors and nonlocal priors in a new unified class of priors. We illustrate our ideas in a running Bernoulli example, then we apply them to test the equality of two proportions, and finally we deal with the more general case of logistic regression models
This record has no associated files available for download.
More information
Published date: 2013
Organisations:
Statistics
Identifiers
Local EPrints ID: 359246
URI: http://eprints.soton.ac.uk/id/eprint/359246
ISSN: 0883-4237
PURE UUID: 04581afa-f88b-4870-945a-111fcaa1b650
Catalogue record
Date deposited: 24 Oct 2013 09:03
Last modified: 15 Mar 2024 02:46
Export record
Altmetrics
Contributors
Author:
Guido Consonni
Author:
Jonathan J. Forster
Author:
Luca La Rocca
Download statistics
Downloads from ePrints over the past year. Other digital versions may also be available to download e.g. from the publisher's website.
View more statistics