Add to ORKGWe study the use of Gaussian process emulators to approximate the parameter-to-observation map or the negative log-likelihood in Bayesian inverse problems. We prove error bounds on the Hellinger distance between the true posterior distribution and various approximations based on the Gaussian process emulator. Our analysis includes approximations based on the mean of the predictive process, as well as approximations based on the full Gaussian process emulator. Our results show that the Hellinger distance between the true posterior and its approximations can be bounded by moments of the error in the emulator. Numerical results confirm our theoretical findings
In certain applications involving the solution of a Bayesian inverse problem, it may not be possible...
International audienceWe propose a dimension reduction technique for Bayesian inverse problems with ...
Approximate Bayesian computation (ABC) methods are used to approximate posterior distributions using...
We study the use of Gaussian process emulators to approximate the parameter-to-observation map or th...
We consider the use of randomized forward models and log-likelihoods within the Bayesian approach to...
Gaussian processes are powerful nonparametric distributions over continuous functions that have beco...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
Inverse problems are often ill posed, with solutions that depend sensitively on data. In any numeric...
We consider the statistical non-linear inverse problem of recovering the absorption term f > 0 in...
Gaussian processes are distributions over functions that are versatile and mathematically convenient...
In recent years there has been an increased interest in applying non-parametric methods to real-worl...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
In statistical inference, a discrepancy between the parameter-to-observable map that generates the d...
In computational inverse problems, it is common that a detailed and accurate forward model is approx...
In certain applications involving the solution of a Bayesian inverse problem, it may not be possible...
International audienceWe propose a dimension reduction technique for Bayesian inverse problems with ...
Approximate Bayesian computation (ABC) methods are used to approximate posterior distributions using...
We study the use of Gaussian process emulators to approximate the parameter-to-observation map or th...
We consider the use of randomized forward models and log-likelihoods within the Bayesian approach to...
Gaussian processes are powerful nonparametric distributions over continuous functions that have beco...
The posterior distribution in a nonparametric inverse problem is shown to contract to the true param...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
Inverse problems are often ill posed, with solutions that depend sensitively on data. In any numeric...
We consider the statistical non-linear inverse problem of recovering the absorption term f > 0 in...
Gaussian processes are distributions over functions that are versatile and mathematically convenient...
In recent years there has been an increased interest in applying non-parametric methods to real-worl...
We consider a Bayesian nonparametric approach to a family of linear inverse problems in a separable ...
In statistical inference, a discrepancy between the parameter-to-observable map that generates the d...
In computational inverse problems, it is common that a detailed and accurate forward model is approx...
In certain applications involving the solution of a Bayesian inverse problem, it may not be possible...
International audienceWe propose a dimension reduction technique for Bayesian inverse problems with ...
Approximate Bayesian computation (ABC) methods are used to approximate posterior distributions using...