Inverse anisotropic diffusion from power density measurements in two dimensions

Abstract

This paper concerns the reconstruction of an anisotropic diffusion tensor γ=(γij)1≤ i,j≤ 2 from knowledge of internal functionals of the form γ∇ ui·∇ uj with ui for 1≤ i≤ I solutions of the elliptic equation ∇ · γ ∇ ui=0 on a two dimensional bounded domain with appropriate boundary conditions. We show that for I=4 and appropriately chosen boundary conditions, γ may uniquely and stably be reconstructed from such internal functionals, which appear in coupled-physics inverse problems involving the ultrasound modulation of electrical or optical coefficients. Explicit reconstruction procedures for the diffusion tensor are presented and implemented numerically.