Bayesian Linear Inverse Problems in Regularity Scales with Discrete Observations

Dong Yan; Shota Gugushvili; Aad van der Vaart

doi:10.1007/s13171-024-00342-0

Bayesian Linear Inverse Problems in Regularity Scales with Discrete Observations

Dong Yan, Shota Gugushvili, Aad van der Vaart^*

^*Corresponding author for this work

Mathematical and Statistical Methods - Biometris

Research output: Contribution to journal › Article › Academic › peer-review

1 Citation (Scopus)

Abstract

We obtain rates of contraction of posterior distributions in inverse problems with discrete observations. In a general setting of smoothness scales we derive abstract results for general priors, with contraction rates determined by discrete Galerkin approximation. The rate depends on the amount of prior concentration near the true function and the prior mass of functions with inferior Galerkin approximation. We apply the general result to non-conjugate series priors, showing that these priors give near optimal and adaptive recovery in some generality, Gaussian priors, and mixtures of Gaussian priors, where the latter are also shown to be near optimal and adaptive.

Original language	English
Pages (from-to)	228-254
Journal	Sankhya A
Volume	86
Issue number	S1
Early online date	7 Mar 2024
DOIs	https://doi.org/10.1007/s13171-024-00342-0
Publication status	Published - 2024

Keywords

35R30
62G20
Adaptive estimation
Fixed design
Galerkin
Gaussian prior
Hilbert scale
Interpolation
Linear inverse problem
Nonparametric Bayesian estimation
Posterior contraction rate
Random series prior
Regression
Regularity scale

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title = "Bayesian Linear Inverse Problems in Regularity Scales with Discrete Observations",

abstract = "We obtain rates of contraction of posterior distributions in inverse problems with discrete observations. In a general setting of smoothness scales we derive abstract results for general priors, with contraction rates determined by discrete Galerkin approximation. The rate depends on the amount of prior concentration near the true function and the prior mass of functions with inferior Galerkin approximation. We apply the general result to non-conjugate series priors, showing that these priors give near optimal and adaptive recovery in some generality, Gaussian priors, and mixtures of Gaussian priors, where the latter are also shown to be near optimal and adaptive.",

keywords = "35R30, 62G20, Adaptive estimation, Fixed design, Galerkin, Gaussian prior, Hilbert scale, Interpolation, Linear inverse problem, Nonparametric Bayesian estimation, Posterior contraction rate, Random series prior, Regression, Regularity scale",

author = "Dong Yan and Shota Gugushvili and {van der Vaart}, Aad",

year = "2024",

doi = "10.1007/s13171-024-00342-0",

language = "English",

volume = "86",

pages = "228--254",

journal = "Sankhya A",

issn = "0976-836X",

publisher = "Springer",

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TY - JOUR

T1 - Bayesian Linear Inverse Problems in Regularity Scales with Discrete Observations

AU - Yan, Dong

AU - Gugushvili, Shota

AU - van der Vaart, Aad

PY - 2024

Y1 - 2024

N2 - We obtain rates of contraction of posterior distributions in inverse problems with discrete observations. In a general setting of smoothness scales we derive abstract results for general priors, with contraction rates determined by discrete Galerkin approximation. The rate depends on the amount of prior concentration near the true function and the prior mass of functions with inferior Galerkin approximation. We apply the general result to non-conjugate series priors, showing that these priors give near optimal and adaptive recovery in some generality, Gaussian priors, and mixtures of Gaussian priors, where the latter are also shown to be near optimal and adaptive.

AB - We obtain rates of contraction of posterior distributions in inverse problems with discrete observations. In a general setting of smoothness scales we derive abstract results for general priors, with contraction rates determined by discrete Galerkin approximation. The rate depends on the amount of prior concentration near the true function and the prior mass of functions with inferior Galerkin approximation. We apply the general result to non-conjugate series priors, showing that these priors give near optimal and adaptive recovery in some generality, Gaussian priors, and mixtures of Gaussian priors, where the latter are also shown to be near optimal and adaptive.

KW - 35R30

KW - 62G20

KW - Adaptive estimation

KW - Fixed design

KW - Galerkin

KW - Gaussian prior

KW - Hilbert scale

KW - Interpolation

KW - Linear inverse problem

KW - Nonparametric Bayesian estimation

KW - Posterior contraction rate

KW - Random series prior

KW - Regression

KW - Regularity scale

U2 - 10.1007/s13171-024-00342-0

DO - 10.1007/s13171-024-00342-0

M3 - Article

AN - SCOPUS:85186900690

SN - 0976-836X

VL - 86

SP - 228

EP - 254

JO - Sankhya A

JF - Sankhya A

IS - S1

ER -

Bayesian Linear Inverse Problems in Regularity Scales with Discrete Observations

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Keywords

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