Consistency of Bayesian inference with Gaussian process priors in an elliptic inverse problem

Abstract

For O a bounded domain in Rd and a given smooth function g:O, we consider the statistical nonlinear inverse problem of recovering the conductivity f>0 in the divergence form equation ∇·(f∇ u)=g\ on\ O, u=0\ on\ ∂O, from N discrete noisy point evaluations of the solution u=uf on O. We study the statistical performance of Bayesian nonparametric procedures based on a flexible class of Gaussian (or hierarchical Gaussian) process priors, whose implementation is feasible by MCMC methods. We show that, as the number N of measurements increases, the resulting posterior distributions concentrate around the true parameter generating the data, and derive a convergence rate N-λ, λ>0, for the reconstruction error of the associated posterior means, in L2(O)-distance.