The d-bar approach to approximate inverse scattering at fixed energy in three dimensions
Abstract
We develop the d-bar approach to inverse scattering at fixed energy in dimensions d 3 of [Beals, Coifman 1985] and [Henkin, Novikov 1987]. As a result we propose a stable method for nonlinear approximate finding a potential v from its scattering amplitude f at fixed energy E>0 in dimension d=3. In particular, in three dimensions we stably reconstruct n-times smooth potential v with sufficient decay at infinity, n>3, from its scattering amplitude f at fixed energy E up to O(E-(n-3-ε)/2) in the uniform norm as E +∞ for any fixed arbitrary small ε >0 (that is with almost the same decay rate of the error for E +∞ as in the linearized case near zero potential).
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