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Distances between nested densities and a measure of the impact of the prior in Bayesian statistics

Abstract:
In this paper we propose tight upper and lower bounds for the Wasserstein distance between any two {{univariate continuous distributions}} with probability densities $p_1$ and $p_2$ having nested supports. These explicit bounds are expressed in terms of the derivative of the likelihood ratio $p_1/p_2$ as well as the Stein kernel $\tau_1$ of $p_1$. The method of proof relies on a new variant of Stein's method which manipulates Stein operators. We give several applications of these bounds. Our main application is in Bayesian statistics : we derive explicit data-driven bounds on the Wasserstein distance between the posterior distribution based on a given prior and the no-prior posterior based uniquely on the sampling distribution. This is the first finite sample result confirming the well-known fact that with well-identified parameters and large sample sizes, reasonable choices of prior distributions will have only minor effects on posterior inferences if the data are benign.
Publication status:
Submitted
Peer review status:
Under review

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Institution:
University of Oxford
Division:
MPLS
Department:
Statistics
Role:
Author


Journal:
Annals of Applied Probability  More from this journal


Keywords:
Pubs id:
pubs:571257
UUID:
uuid:f45b73a7-f23c-49d9-ab54-5d13ce53c1aa
Local pid:
pubs:571257
Source identifiers:
571257
Deposit date:
2016-02-24
ARK identifier:

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