A comparison of bayes-laplace, jeffreys, and other priors: the case of zero events

Tuyl, Frank; Gerlach, Richard; Mengersen, Kerrie

Title: A comparison of bayes-laplace, jeffreys, and other priors: the case of zero events
Creator: Tuyl, Frank; Gerlach, Richard; Mengersen, Kerrie
Relation: American Statistician Vol. 62, Issue 1, p. 40-44
Publisher Link: http://dx.doi.org/10.1198/000313008X267839
Publisher: American Statistical Association
Resource Type: journal article
Date: 2008
Description: Beta distributions with both parameters equal to 0, ½, or 1 are the usual choices for “noninformative” priors for Bayesian estimation of the binomial parameter. However, as illustrated by two examples from the Bayesian literature, care needs to be taken with parameter values below 1, both for noninformative and informative priors, as such priors concentrate their mass close to 0 and/or 1 and can suppress the importance of the observed data. These examples concern the case of no successes (or failures) and illustrate the informativeness of the Jeffreys prior usually recommended as the “consensus prior.” In particular, the second example suggests that when the binomial parameter is known to be very small, an informative prior from the beta(1, b) family (b > 1) seems appropriate, while a beta(a, b) with a < 1 can be too informative. It is thus argued that sensitivity analysis of an informative prior should be based on a consensus posterior corresponding to the Bayes–Laplace prior rather than the Jeffreys prior.
Subject: Bayesian inference; binomial distribution; noninformative priors; prior families
Identifier: http://hdl.handle.net/1959.13/41595
Identifier: uon:4882
Identifier: ISSN:0003-1305
Language: eng
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