Fast reconstruction approaches for photoacoustic tomography with smoothing Sobolev/Mat\'ern priors

Abstract

In photoacoustic tomography (PAT), the computation of the initial pressure distribution within an object from its time-dependent boundary measurements over time is considered. This problem can be approached from two well-established points of view: deterministically using regularisation methods, or stochastically using the Bayesian framework. Both approaches frequently require the solution of a variational problem. In the paper we elaborate the connection between these approaches by establishing the equivalence between a smoothing Mat\'ern class of covariance operators and Sobolev embedding operator Es: Hs L2. We further discuss the use of a Wavelet-based implementation of the adjoint operator Es* which also allows for efficient evaluations for certain Mat\'ern covariance operators, leading to efficient implementations both in terms of computational effort as well as memory requirements. The proposed methods are validated with reconstructions for the photoacoustic problem.