Efficient Bayesian Inference in Strictly Semi-parametric Linear Inverse Problems

Abstract

We consider the efficient inference of finite dimensional parameters arising in the context of inverse problems. Our setup is the observation of a transformation of an unknown infinite dimensional signal f corrupted by statistical noise, with the transformation Kθ being linear but unknown up to a scalar θ. We adopt a Bayesian approach and put a prior on the pair (θ,f) and prove a Bernstein-von Mises theorem for the marginal posterior of θ under regularity conditions on the operators Kθ and on the prior. We apply our results to the recovery of location parameters in semi-blind deconvolution problems and to the recovery of attenuation constants in X-ray tomography.