Wei, YuchuanYu, HengyongWang, Ge2017-09-182017-09-182010-10-26Yuchuan Wei, Hengyong Yu, and Ge Wang, “Inverse Fourier Transform in the Gamma Coordinate System,” International Journal of Biomedical Imaging, vol. 2011, Article ID 285130, 16 pages, 2011. doi:10.1155/2011/285130http://hdl.handle.net/10919/79030This paper provides auxiliary results for our general scheme of computed tomography. In 3D parallel-beam geometry, we first demonstrate that the inverse Fourier transform in different coordinate systems leads to different reconstruction formulas and explain why the Radon formula cannot directly work with truncated projection data. Also, we introduce a gamma coordinate system, analyze its properties, compute the Jacobian of the coordinate transform, and define weight functions for the inverse Fourier transform assuming a simple scanning model. Then, we generate Orlov's theorem and a weighted Radon formula from the inverse Fourier transform in the new system. Furthermore, we present the motion equation of the frequency plane and the conditions for sharp points of the instantaneous rotation axis. Our analysis on the motion of the frequency plane is related to the Frenet-Serret theorem in the differential geometry.application/pdfenCreative Commons Attribution 4.0 InternationalInverse Fourier Transform in the Gamma Coordinate SystemArticle - Refereed2017-09-18Copyright © 2011 Yuchuan Wei et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.International Journal of Biomedical Imaginghttps://doi.org/10.1155/2011/285130