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Bayesian posterior contraction rates for linear severely ill-posed inverse problems - MaRDI portal

Bayesian posterior contraction rates for linear severely ill-posed inverse problems

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Publication:2016479

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DOI10.1515/JIP-2012-0071zbMath1288.62036arXiv1210.1563OpenAlexW2075682935MaRDI QIDQ2016479

Yuan-Xiang Zhang, Sergios Agapiou, Andrew M. Stuart

Publication date: 20 June 2014

Published in: Journal of Inverse and Ill-Posed Problems (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1210.1563

zbMATH Keywords

posterior consistency rate of contraction Gaussian priors

Mathematics Subject Classification ID

Bayesian inference (62F15) Inverse problems for PDEs (35R30) Applications of functional analysis in probability theory and statistics (46N30) Inverse problems for integral equations (45Q05) Applications of operator theory in probability theory and statistics (47N30)

Related Items (16)

Probabilistic regularization of Fredholm integral equations of the first kind ⋮ Designing truncated priors for direct and inverse Bayesian problems ⋮ Posterior Contraction in Bayesian Inverse Problems Under Gaussian Priors ⋮ Bayesian inverse problems with unknown operators ⋮ Hyperparameter estimation in Bayesian MAP estimation: parameterizations and consistency ⋮ Bayesian inversion techniques for stochastic partial differential equations ⋮ Convergence Rates for Learning Linear Operators from Noisy Data ⋮ Bayesian Inverse Problems Are Usually Well-Posed ⋮ An improved quasi-reversibility method for a terminal-boundary value multi-species model with white Gaussian noise ⋮ Sparsity-promoting and edge-preserving maximum a posteriori estimators in non-parametric Bayesian inverse problems ⋮ Weak-norm posterior contraction rate of the 4DVAR method for linear severely ill-posed problems ⋮ Importance sampling: intrinsic dimension and computational cost ⋮ Bernstein--von Mises Theorems and Uncertainty Quantification for Linear Inverse Problems ⋮ On the Well-posedness of Bayesian Inverse Problems ⋮ Solving inverse problems using data-driven models ⋮ Analysis of a quasi-reversibility method for nonlinear parabolic equations with uncertainty data

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