Gel'fand-Calder\'on's inverse problem for anisotropic conductivities on bordered surfaces in R3

Abstract

Let X be a smooth bordered surface in 3 with smooth boundary and σ a smooth anisotropic conductivity on X. If the genus of X is given, then starting from the Dirichlet-to-Neumann operator σ on ∂ X, we give an explicit procedure to find a unique Riemann surface Y (up to a biholomorphism), an isotropic conductivity σ on Y and the boundary values of a quasiconformal diffeomorphism F: X Y which transforms σ into σ. As a corollary we obtain the following uniqueness result: if σ1, σ2 are two smooth anisotropic conductivities on X with σ1= σ2, then there exists a smooth diffeomorphism : X X which transforms σ1 into σ2.