Use of Partial Knowledge of the Potential in the Phase Problem of Inverse Scattering

## Abstract We consider the scattering of plane, time‐harmonic electromagnetic waves by a perfect conductor D. We first show that the set ℱ~λ~ consisting of the span of a fixed linear combination of the electric and magnetic far‐field patterns is dense in the space of square‐integrable tangential v

## Abstract The one‐dimensional Schrödinger equation is considered when the potential is real valued, integrable, has a finite first moment, and contains no bound states. From either of the two reflection coefficients of such a potential the right and left reflection coefficients are extracted corr

## Abstract The problem of determining the shape of perfectly conducting cylindrical structures with arbitrary cross sections from electromagnetic scattering data is considered. Applying the method of lines, an efficient procedure is found for determining the shape of a cylinder from its electromag

Our recent inverse scattering work has been to derive inverse scattering theory and algorithms that can be used to process practical experimental data. The theory makes use of computation of the forward scattering solution. Therefore, an efficient forward solver is instrumental to the rapid solution

## A numerical method using matrix in¨ersion has been ( ) generalized to sol¨e the Gel'fand᎐Le¨itan᎐Marchenko GLM in¨erse scattering problem for arbitrary forms of reflection coefficient data for plasma medium. An accurate representation of the reflection transient was calculated using the Gauss᎐L