Consistent Inversion of Noisy Non-Abelian X-Ray Transforms

Abstract

For M a simple surface, the non-linear statistical inverse problem of recovering a matrix field : M so(n) from discrete, noisy measurements of the SO(n)-valued scattering data C of a solution of a matrix ODE is considered (n≥ 2). Injectivity of the map C was established by [Paternain, Salo, Uhlmann; Geom.Funct.Anal. 2012]. A statistical algorithm for the solution of this inverse problem based on Gaussian process priors is proposed, and it is shown how it can be implemented by infinite-dimensional MCMC methods. It is further shown that as the number N of measurements of point-evaluations of C increases, the statistical error in the recovery of converges to zero in L2(M)-distance at a rate that is algebraic in 1/N, and approaches 1/ N for smooth matrix fields . The proof relies, among other things, on a new stability estimate for the inverse map C . Key applications of our results are discussed in the case n=3 to polarimetric neutron tomography, see [Desai et al., Nature Sc.Rep. 2018] and [Hilger et al., Nature Comm. 2018]