An inverse scattering problem for the Schr\"odinger equation in a semiclassical process

Abstract

We study an inverse scattering problem for a pair of Hamiltonians (H(h), H\0 (h)) on L2 (n), where H\0 (h) = -h2 and H (h)= H\0 (h) +V, V is a short-range potential with a regular behaviour at infinity and h is the semiclassical parameter. We show that, in dimension n ≥ 3, the knowledge of the scattering operators S(h), h ∈ ]0, 1], up to O(h∞) in B (L2(n)), and which are localized near a fixed energy λ >0, determine the potential V at infinity.

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