Bernstein - von Mises theorems for statistical inverse problems I: Schrödinger equation

Abstract

The inverse problem of determining the unknown potential f>0 in the partial differential equation Δ2 u - fu =0 on O ~~s.t. u = g on ∂ O, where O is a bounded C∞-domain in Rd and g>0 is a given function prescribing boundary values, is considered. The data consist of the solution u corrupted by additive Gaussian noise. A nonparametric Bayesian prior for the function f is devised and a Bernstein - von Mises theorem is proved which entails that the posterior distribution given the observations is approximated in a suitable function space by an infinite-dimensional Gaussian measure that has a `minimal' covariance structure in an information-theoretic sense. As a consequence the posterior distribution performs valid and optimal frequentist statistical inference on f in the small noise limit.