| Document Date: 2014-12-09 10:13:49
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/ Facility University of Central Florida / / IndustryTerm reconstruction algorithms / improved exact filtered backprojection algorithm / inversion algorithms / triple product / circle+line algorithm / 1PI algorithm / inversion algorithm / reconstruction algorithm / / Organization National Science Foundation / University of Central Florida / Orlando / Department of Mathematics / / Person Alexander Katsevich / Jiang Hsieh / A. Katsevich / M. Kapralov / Samit Basu / / ProgrammingLanguage FL / / ProvinceOrState Florida / Connecticut / / PublishedMedium Physics in Medicine and Biology / International Journal of Mathematics and Mathematical Sciences / / Region Central Florida / / Technology shift-invariant FBP algorithms / 1PI algorithm / reconstruction algorithms / tomography / 1PI FBP reconstruction algorithm / slow-FBP algorithms / filtered backprojection algorithm / circle+line algorithm / FBP algorithms / FBP algorithm / corresponding reconstruction algorithm / universal FBP algorithm / FBP reconstruction algorithms / section II-A. The inversion algorithm / BPF algorithms / constructing inversion algorithms / C. The algorithm / Medical Imaging / /
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Theoretically exact FBP reconstruction algorithms for two general classes of curves Alexander Katsevich, Michael Kapralov Abstract— We report on two extensions of exact FBP inversion formulas to more general classes of