The Calder\'on problem is an inverse source problem

Abstract

We prove that uniqueness for the Calder\'on problem on a Riemannian manifold with boundary follows from a hypothetical unique continuation property for the elliptic operator +V+(1t-q) (2t-q) defined on ∂M2× [0,1] where V and q are potentials and it is a Dirichlet-Neumann operator at depth t. This is done by showing that the difference of two Dirichlet-Neumann maps is equal to the Neumann boundary values of the solution to an inhomogeneous equation for said operator, where the source term is a measure supported on the diagonal of ∂M2.