We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimensional parameter in mildly ill-posed inverse problems. We consider a class of prior distributions indexed by a hyperparameter that quantifies regularity. We prove that both methods we consider succeed in automatically selecting this parameter optimally, resulting in optimal convergence rates for truths with Sobolev or analytic “smoothness”, without using knowledge about this regularity. Both methods are illustrated by simulation examples
In the Bayesian approach to inverse problems, data are often informative, relative to the prior, onl...
Published in at http://dx.doi.org/10.1214/07-EJS115 the Electronic Journal of Statistics (http://www...
These lecture notes highlight the mathematical and computational structure relating to the formulati...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We consider the problem of estimating the mean of an infinite-break dimensional normal distribution ...
We obtain rates of contraction of posterior distributions in inverse problems defined by scales of s...
SIIMS 2020 - 30 pagesThis paper presents a detailed theoretical analysis of the three stochastic app...
We consider the problem of constructing Bayesian based confidence sets for linear functionals in the...
Abstract: We study the Bayesian solution of a signal-noise problem stated in infinite dimensional Hi...
We consider statistical linear inverse problems in Hilbert spaces of the type ˆ Y = Kx + U where we ...
We consider a problem of recovering a high-dimensional vector µ observed in white noise, where the u...
We study the Bayesian solution of a linear inverse problem in a separable Hilbert space setting with...
Regularization is typically based on the choice of some parametric family of nearby solutions, and t...
In the Bayesian approach to inverse problems, data are often informative, relative to the prior, onl...
Published in at http://dx.doi.org/10.1214/07-EJS115 the Electronic Journal of Statistics (http://www...
These lecture notes highlight the mathematical and computational structure relating to the formulati...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We study empirical and hierarchical Bayes approaches to the problem of estimating an infinite-dimens...
We consider the problem of estimating the mean of an infinite-break dimensional normal distribution ...
We obtain rates of contraction of posterior distributions in inverse problems defined by scales of s...
SIIMS 2020 - 30 pagesThis paper presents a detailed theoretical analysis of the three stochastic app...
We consider the problem of constructing Bayesian based confidence sets for linear functionals in the...
Abstract: We study the Bayesian solution of a signal-noise problem stated in infinite dimensional Hi...
We consider statistical linear inverse problems in Hilbert spaces of the type ˆ Y = Kx + U where we ...
We consider a problem of recovering a high-dimensional vector µ observed in white noise, where the u...
We study the Bayesian solution of a linear inverse problem in a separable Hilbert space setting with...
Regularization is typically based on the choice of some parametric family of nearby solutions, and t...
In the Bayesian approach to inverse problems, data are often informative, relative to the prior, onl...
Published in at http://dx.doi.org/10.1214/07-EJS115 the Electronic Journal of Statistics (http://www...
These lecture notes highlight the mathematical and computational structure relating to the formulati...