Multidimensional inverse-scattering and clifford analysis

We prove that the high velocity limit of the scattering operator of a two-body system in an external constant electric field determines uniquely the potential. In the case of an N-body system we prove that the high velocity limit of any one of the Dollard scattering operators determines uniquely the

## Abstract The Schrödinger equation is one of the most important equations in mathematics, physics and also engineering. We outline some connections between transformations of non‐linear equations, the Schrödinger equation and the inverse scattering transform. After some remarks on generalizations

## Abstract We generalize the classical limiting absorption method. This generalization is applied to the study of the Faddeev–Lippmann–Schwinger equations in the Faddeev–Newton approach to multidimensional inverse scattering theory. In particular, we give a new proof, under more general conditions

In soliton system design studies, many important properties pertaining to the propagation of optical pulses in a transmission fiber can be investigated using the results of inverse scattering theory. Although the theory is well established, it is highly intricate and its application is therefore res