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Article Dans Une Revue Bernoulli Année : 2022

Functional inequalities for perturbed measures with applications to log-concave measures and to some Bayesian problems

Résumé

We study functional inequalities (Poincar\'e, Cheeger, log-Sobolev) for probability measures obtained as perturbations. Several explicit results for general measures as well as log-concave distributions are given. The initial goal of this work was to obtain explicit bounds on the constants in view of statistical applications for instance. These results are then applied to the Langevin Monte-Carlo method used in statistics in order to compute Bayesian estimators.

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Probabilités [math.PR] Statistiques [math.ST]
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https://uca.hal.science/hal-03120626

Soumis le : mardi 26 janvier 2021-17:06:56

Dernière modification le : jeudi 18 avril 2024-16:40:09

Archivage à long terme le : mardi 27 avril 2021-18:12:23

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hal-03120626 , version 1 (26-01-2021)

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Patrick Cattiaux, Arnaud Guillin. Functional inequalities for perturbed measures with applications to log-concave measures and to some Bayesian problems. Bernoulli, 2022, 28 (4), ⟨10.3150/21-BEJ1419⟩. ⟨hal-03120626⟩

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