The Paley--Wiener Theorem for the Generalized Radon Transform on the Plane |
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| Authors: | D. A. Popov |
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| Affiliation: | (1) Belozerskii Institute of Physical-Chemical Biology, Moscow State University, Russia |
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| Abstract: | We consider the problem of reconstructing a function on the disk  from its integrals over curves close to straight lines, i.e., the inversion problem for the generalized Radon transform. Necessary and sufficient conditions on the range of the generalized Radon transform are obtained for functions supported in a smaller disk  under the additional condition that the curves that do not meet  coincide with the corresponding straight lines. |
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| Keywords: | Paley– Winer theorem Radon transform Fourier integral operator Zernike polynomial |
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