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Bibliographic Details
Main Authors: Cvetković, Nada, Lie, Han Cheng
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.23541
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author Cvetković, Nada
Lie, Han Cheng
author_facet Cvetković, Nada
Lie, Han Cheng
contents The work of Sprungk (Inverse Problems, 2020) established the local Lipschitz continuity of the misfit-to-posterior and prior-to-posterior maps with respect to the Kullback--Leibler divergence and the total variation, Hellinger, and 1-Wasserstein metrics, by proving certain upper bounds. The upper bounds were also used to show that if a posterior measure is more concentrated, then it can be more sensitive to perturbations in the misfit or prior. We prove upper bounds and lower bounds that emphasise the importance of the evidence. The lower bounds show that the sensitivity of posteriors to perturbations in the misfit or the prior not only can increase, but in general will increase as the posterior measure becomes more concentrated, i.e. as the evidence decreases to zero. Using the explicit dependence of our bounds on the evidence, we identify sufficient conditions for the misfit-to-posterior and prior-to-posterior maps to be locally bi-Lipschitz continuous.
format Preprint
id arxiv_https___arxiv_org_abs_2505_23541
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Upper and lower bounds for local Lipschitz stability of Bayesian posteriors
Cvetković, Nada
Lie, Han Cheng
Statistics Theory
60B10, 62C10, 62F15, 62G35
The work of Sprungk (Inverse Problems, 2020) established the local Lipschitz continuity of the misfit-to-posterior and prior-to-posterior maps with respect to the Kullback--Leibler divergence and the total variation, Hellinger, and 1-Wasserstein metrics, by proving certain upper bounds. The upper bounds were also used to show that if a posterior measure is more concentrated, then it can be more sensitive to perturbations in the misfit or prior. We prove upper bounds and lower bounds that emphasise the importance of the evidence. The lower bounds show that the sensitivity of posteriors to perturbations in the misfit or the prior not only can increase, but in general will increase as the posterior measure becomes more concentrated, i.e. as the evidence decreases to zero. Using the explicit dependence of our bounds on the evidence, we identify sufficient conditions for the misfit-to-posterior and prior-to-posterior maps to be locally bi-Lipschitz continuous.
title Upper and lower bounds for local Lipschitz stability of Bayesian posteriors
topic Statistics Theory
60B10, 62C10, 62F15, 62G35
url https://arxiv.org/abs/2505.23541