The linear sampling method in inverse electromagnetic scattering
- Fioralba Cakoni, David Colton, Peter Monk.
- Philadelphia, PA : Society for Industrial and Applied Mathematics, c2011.
- Physical description
- x, 138 p. : ill. ; 26 cm.
- CBMS-NSF regional conference series in applied mathematics 80.
At the library
Science Library (Li and Ma)
|QC20.7 .S3 C35 2011||Unknown|
- Includes bibliographical references (p. 129-136) and index.
- 1. Inverse scattering in two dimensions--
- 2. Maxwell's equations--
- 3. The inverse problem for obstacles--
- 4. The inverse scattering problem for anisotropic media--
- 5. The inverse scattering problem for thin objects--
- 6. The inverse scattering problem for buried objects-- Bibliography-- Index.
- (source: Nielsen Book Data)
The linear sampling method is the oldest and most developed of the qualitative methods in inverse scattering theory. It is based on solving a linear integral equation and then using the equation's solution as an indicator function for the determination of the support of the scattering object. This book describes the linear sampling method for a variety of electromagnetic scattering problems. It presents uniqueness theorems and the derivation of various inequalities on the material properties of the scattering object from a knowledge of the far field pattern of the scattered wave. Also covered are: the approximation properties of Herglotz wave functions; the behavior of solutions to the interior transmission problem, a novel interior boundary value problem; and numerical examples of the inversion scheme.
(source: Nielsen Book Data)
- Supplemental links
Contributor biographical information
Table of contents only
- Publication date
- CBMS-NSF regional conference series in applied mathematics ; 80
- "Sponsored by Conference Board of the Mathematical Sciences [and] supported by National Science Foundation"--Cover.
- 9780898719390 (pbk.)
- 0898719399 (pbk.)
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