Causal Holography in Application to the Inverse Scattering Problems

Abstract

For a given smooth compact manifold M, we introduce an open class G(M) of Riemannian metrics, which we call metrics of the gradient type. For such metrics g, the geodesic flow vg on the spherical tangent bundle SM M admits a Lyapunov function (so the vg-flow is traversing). It turns out, that metrics of the gradient type are exactly the non-trapping metrics. For every g ∈ G(M), the geodesic scattering along the boundary ∂ M can be expressed in terms of the scattering map Cvg: ∂1+(SM) ∂1-(SM). It acts from a domain ∂1+(SM) in the boundary ∂(SM) to the complementary domain ∂1-(SM), both domains being diffeomorphic. We prove that, for a boundary generic metric g ∈ G(M) the map Cvg allows for a reconstruction of SM and of the geodesic foliation F(vg) on it, up to a homeomorphism (often a diffeomorphism). Also, for such g, the knowledge of the scattering map Cvg makes it possible to recover the homology of M, the Gromov simplicial semi-norm on it, and the fundamental group of M. Additionally, Cvg allows to reconstruct the naturally stratified topological type of the space of geodesics on M.