Inverse scattering on conformally compact manifolds

Abstract

We study inverse scattering for g+V on (X,g) a conformally compact manifold with metric g, with variable sectional curvature -2(y) at the boundary and V∈ C∞(X) not vanishing at the boundary. We prove that the scattering matrix at a fixed energies (λ1, λ2) in a suitable subset of , determines , and the Taylor series of both the potential and the metric at the boundary.