Inverse Potential Problems for Divergence of Measures with Total Variation Regularization

Abstract

We study inverse problems for the Poisson equation with source term the divergence of an R3-valued measure, that is, the potential satisfies = div μ, and μ is to be reconstructed knowing (a component of) the field grad on a set disjoint from the support of μ. Such problems arise in several electro-magnetic contexts in the quasi-static regime, for instance when recovering a remanent magnetization from measurements of its magnetic field. We develop methods for recovering μ based on total variation regularization. We provide sufficient conditions for the unique recovery of μ, asymptotically when the regularization parameter and the noise tend to zero in a combined fashion, when it is uni-directional or when the magnetization has a support which is sparse in the sense that it is purely 1-unrectifiable. Numerical examples are provided to illustrate the main theoretical results.