Determining potentials from the scattering map of the time-dependent Schrödinger equation
Abstract
For a time dependent Schrödinger equation, the scattering map is the map sending the asymptotic profile of a solution as t -∞ to its asymptotic profile as t+∞. In this paper we show that, for a certain class of metrics, the scattering maps and Poisson operators associated to two Schrödinger operators on the same curved space only differ by a compact operator on a critical level if and only if the two potentials are equal.
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