Inverse obstacle scattering with non-over-determined data

Abstract

It is proved that the scattering amplitude A(β, α0, k0), known for all β∈ S2, where S2 is the unit sphere in R3, and fixed α0∈ S2 and k0>0, determines uniquely the surface S of the obstacle D and the boundary condition on S. The boundary condition on S is assumed to be the Dirichlet, or Neumann, or the impedance one. The uniqueness theorem for the solution of multidimensional inverse scattering problems with non-over-determined data was not known for many decades. A detailed proof of such a theorem is given in this paper for inverse scattering by obstacles for the first time. It follows from our results that the scattering solution vanishing on the boundary S of the obstacle cannot have closed surfaces of zeros in the exterior of the obstacle different from S. To have a uniqueness theorem for inverse scattering problems with non-over-determined data is of principal interest because these are the minimal scattering data that allow one to uniquely recover the scatterer.