Existence of wave operators with time-dependent modifiers for the Sch\"odinger equations with long-range potentials on scattering manifolds

Abstract

We construct time-dependent wave operators for Schr\"odinger equations with long-range potentials on a manifold M with asymptotically conic structure. We use the two space scattering theory formalism, and a reference operator on a space of the form R × ∂ M, where ∂ M is the boundary of M at infinity. We construct exact solutions to the Hamilton-Jacobi equation on the reference system R × ∂ M, and prove the existence of the modified wave operators.