Inverse anisotropic conductivity from internal current densities

Abstract

This paper concerns the reconstruction of an anisotropic conductivity tensor γ from internal current densities of the form J = γ∇ u, where u solves a second-order elliptic equation ∇·(γ∇ u) = 0 on a bounded domain X with prescribed boundary conditions. A minimum number of such functionals equal to n + 2, where n is the spatial dimension, is sufficient to guarantee a local reconstruction. We show that γ can be uniquely reconstructed with a loss of one derivative compared to errors in the measurement of J. In the special case where γ is scalar, it can be reconstructed with no loss of derivatives. We provide a precise statement of what components may be reconstructed with a loss of zero or one derivatives.