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Abstract
The problem of phase retrieval, i.e., the problem of recovering a function from the magnitudes of its Fourier transform, naturally arises in various fields of physics, such as astronomy, radar, speech recognition, quantum mechanics, and, perhaps most prominently, diffraction imaging. The mathematical study of phase retrieval problems possesses a long history with a number of beautiful and deep results drawing from different mathematical fields, such as harmonic analysis, complex analysis, and Riemannian geometry. The present paper aims to present a summary of some of these results with an emphasis on recent activities. In particular we aim to summarize our current understanding of uniqueness and stability properties of phase retrieval problems.
Original language | English |
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Pages (from-to) | 301-350 |
Number of pages | 50 |
Journal | SIAM Review |
Volume | 62 |
Issue number | 2 |
DOIs | |
Publication status | Published - 2020 |
Austrian Fields of Science 2012
- 101032 Functional analysis
- 101002 Analysis
- 101008 Complex analysis
Keywords
- ALGORITHMS
- AMBIGUITY
- CRYSTALLOGRAPHY
- DIFFRACTION
- Fourier transform
- GABOR
- GUARANTEES
- INJECTIVITY
- RECONSTRUCTION
- RECOVERY
- ZAK TRANSFORM
- frame theory
- phase retrieval
- Frame theory
- Phase retrieval
Projects
- 1 Active