Two-dimensional Calderon problem and flat metrics

Abstract

For a compact Riemannian manifold (M,g) with boundary ∂ M, the Diri\-chl\-et-to-Neumann operator g:C∞(∂ M) C∞(∂ M) is defined by gf=.∂ u∂|∂ M, where is the unit outer normal vector to the boundary and u is the solution to the Dirichlet problem gu=0,\ u|∂ M=f. Let g∂ be the Riemannian metric on ∂ M induced by g. The Calderon problem is posed as follows: To what extent is (M,g) determined by the data (∂ M,g∂,g)? We prove the uniqueness theorem: A compact connected two-dimensional Riemannian manifold (M,g) with non-empty boundary is determined by the data (∂ M,g∂,g) uniquely up to conformal equivalence.