6533b7dcfe1ef96bd12720a6

RESEARCH PRODUCT

Jacobian of solutions to the conductivity equation in limited view

Hjørdis Amanda SchlüterMikko Salo

subject

Applied Mathematicscurrent density imagingconductivity equationacousto-electric tomographyinversio-ongelmatComputer Science ApplicationsTheoretical Computer ScienceFunctional Analysis (math.FA)Mathematics - Functional Analysisnon-vanishing Jacobianhybrid inverse problemsSignal Processingcoupled physics imagingFOS: MathematicsMathematical Physics

description

Abstract The aim of hybrid inverse problems such as Acousto-Electric Tomography or Current Density Imaging is the reconstruction of the electrical conductivity in a domain that can only be accessed from its exterior. In the inversion procedure, the solutions to the conductivity equation play a central role. In particular, it is important that the Jacobian of the solutions is non-vanishing. In the present paper we address a two-dimensional limited view setting, where only a part of the boundary of the domain can be controlled by a non-zero Dirichlet condition, while on the remaining boundary there is a zero Dirichlet condition. For this setting, we propose sufficient conditions on the boundary functions so that the Jacobian of the corresponding solutions is non-vanishing. In that regard we allow for discontinuous boundary functions, which requires the use of solutions in weighted Sobolev spaces. We implement the procedure of reconstructing a conductivity from power density data numerically and investigate how this limited view setting affects the Jacobian and the quality of the reconstructions.

yearjournalcountryeditionlanguage
2022-01-01
10.1088/1361-6420/aca904http://arxiv.org/abs/2207.03849