Book chapter
Inverse Born series
The Radon Transform, pp 273-295
01 Jan 2019
Featured in Collection : UN Sustainable Development Goals @ Drexel
Abstract
We present a survey of recent results on the inverse Born series. The convergence and stability of the method are characterized in Banach spaces. Applications to inverse problems in various physical settings are described.
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Details
- Title
- Inverse Born series
- Creators
- Shari Moskow - Drexel UniversityJohn C. Schotland - Univ Michigan, Dept Math, Ann Arbor, MI 48109 USA
- Contributors
- R Ramlau (Editor)O Scherzer (Editor)
- Publication Details
- The Radon Transform, pp 273-295
- Series
- Radon Series on Computational and Applied Mathematics
- Publisher
- Walter De Gruyter; BERLIN
- Number of pages
- 23
- Resource Type
- Book chapter
- Language
- English
- Academic Unit
- Mathematics
- Web of Science ID
- WOS:000618576800013
- Scopus ID
- 2-s2.0-85123340892
- Other Identifier
- 991019167968904721
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- Collaboration types
- Domestic collaboration
- Web of Science research areas
- Mathematics, Applied