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In mathematics and physics, the inverse scattering problem is the problem of determining characteristics of an object, based on data of how it scatters incoming radiation or particles.[1] It is the inverse problem to the direct scattering problem, which is to determine how radiation or particles are scattered based on the properties of the scatterer.
Soliton equations are a class of partial differential equations which can be studied and solved by a method called the inverse scattering transform, which reduces the nonlinear PDEs to a linear inverse scattering problem. The nonlinear Schrödinger equation, the Korteweg–de Vries equation and the KP equation are examples of soliton equations. In one space dimension the inverse scattering problem is equivalent to a Riemann-Hilbert problem.[2] Inverse scattering has been applied to many problems including radiolocation, echolocation, geophysical survey, nondestructive testing, medical imaging, and quantum field theory.[3][4]
Citations
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edit- Ablowitz, Mark J.; Fokas, A. S. (2003). Complex Variables: Introduction and Applications. Cambridge University Press. pp. 609–613. ISBN 978-0-521-53429-1.
- Bao, Gang (2023). "Mathematical analysis and numerical methods for inverse scattering problems". In Beliaev, D.; Smirnov, S. (eds.). ICM International Congress of Mathematics 2022 July 6-14. EMS Press. pp. 5034–5055. ISBN 9783985470587. Retrieved 19 March 2024.Reprint
- Colton, David; Kress, Rainer (2013). Inverse Acoustic and Electromagnetic Scattering Theory. Springer Science & Business Media. ISBN 978-3-662-02835-3.
- Dunajski, Maciej (2010). Solitons, Instantons, and Twistors. OUP Oxford. ISBN 978-0-19-857062-2.
- Grinev, A. Y.; Chebakov, I. A.; Gigolo, A. I. (2003). "Solution of the inverse problems of subsurface radiolocation". 4th International Conference on Antenna Theory and Techniques (Cat. No.03EX699). Vol. 2. Sevastopol, Ukraine. pp. 523–526. doi:10.1109/ICATT.2003.1238792. ISBN 0-7803-7881-4.
{{cite book}}: CS1 maint: location missing publisher (link)
- Marchenko, V. A. (2011), Sturm-Liouville operators and applications (revised ed.), Providence: American Mathematical Society, ISBN 978-0-8218-5316-0, MR 2798059
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