Uniqueness of a Potential from Boundary Data in Locally Conformally Transversally Anisotropic Geometries

Abstract

Let (3,g) be a compact smooth Riemannian manifold with smooth boundary and suppose that U is a an open set in such that g|U is the Euclidean metric. Let = U ∂ be connected and suppose that U is the convex hull of . We will study the uniqueness of an unknown potential for the Schr\"odinger operator -g + q from the associated Dirichlet to Neumann map, q. We will prove that if the potential q is a priori explicitly known in Uc, then one can uniquely reconstruct q over the convex hull of from q. We will also outline a reconstruction algorithm. More generally we will discuss the cases where is not connected or g|U is conformally transversally anisotropic and derive the analogous result.