https://orcid.org/0000-0003-4529-5837
References
- Kak AC, Slaney M. Principles of computerized tomographic imaging. New York (NY): IEEE Press; 2009.
- Bertero M, Boccacci P. Introduction to inverse problems in imaging. Boca Raton: CRC Press; 1998.
- Buzug TM. Computed tomography: from photon statistics to modern cone-beam CT. Berlin: Springer; 2008.
- Herman GT. Fundamentals of computerized tomography: image reconstruction from projections. London: Springer; 2009.
- Vogel CR. Computational methods for inverse problems. Philadelphia: SIAM; 2002.
- Kazantsev D, Van Eyndhoven G, Lionheart WRB, et al. Employing temporal self-similarity across the entire time domain in computed tomography reconstruction. Philos Trans Roy Soc London A. 2015;373(2043):20140389
- Rudin L, Osher S, Fatemi E. Nonlinear total variation based noise removal algorithms. Physica D. 1992;60(1–4):259–268.
- Kazantsev D, Ovtchinnikov E, Withers PJ, et al. Sparsity seeking total generalized variation for undersampled tomographic reconstruction. Proceedings of 13th International Symposium on Biomedical Imaging (ISBI IEEE); Prague; 2016. p. 731–734.
- Matej S, Fessler JA, Kazantsev IG. Iterative tomographic image reconstruction using Fourier-based forward and back-projectors. IEEE Trans Med Imaging. 2004;23(4):401–412.
- O’Connor YZ, Fessler J. Fourier-based forward and back-projectors in iterative fan-beam tomographic image reconstruction. IEEE Trans Med Imaging. 2006;25(5):582–589.
- Fahimian BP, Yu M, Cloetens P, Jianwei M. Low-dose X-ray phase-contrast and absorption CT using equally sloped tomography. Phys Med Biol. 2010;55(18):5383–5400.
- Mao Y, Fahimian BP, Osher SJ, Miao J. Development and optimization of regularized tomographic reconstruction algorithms utilizing equally-sloped tomography. IEEE Trans Image Process. 2010;19(5):1259–1268.
- Lim J, Lee K, Jin KH, et al. Comparative study of iterative reconstruction algorithms for missing cone problems in optical diffraction tomography. Opt Express. 2015;23(13):16933–16948.
- Sato T, Norton SJ, Linzer M, Ikeda O, Hirama M. Tomographic image reconstruction from limited projections using iterative revisions in image and transform spaces. Appl Opt. 1981;20(3):395–399.
- Fienup JR. Iterative method applied to image reconstruction and to computer-generated holograms. Opt Eng. 1980;19(3):297–305.
- Pickalov V, Kazantsev D. Iterative Gerchberg-Papoulis algorithm for fan-beam tomography. Proceedings of 8th IEEE Region International Conference on Biomedical Engineering and Computational Technologies, SIBIRCON; Novosibirsk; 2008. p. 218–222.
- Defrise M, De Mol C. A regularized iterative algorithm for limited-angle inverse Radon transform. J Mod Opt. 1983;30(4):403–408.
- Gerchberg RW. Super-resolution through error energy reduction. J Mod Opt. 1974;21(9):709–720.
- Papoulis A. A new algorithm in spectral analysis and band-limited extrapolation. IEEE Trans Circuits Syst. 1975;22(9):735–742.
- Chatterjee P, Mukherjee S, Chaudhuri S, Seetharaman G. Application of Papoulis-Gerchberg method in image super-resolution and inpainting. Comput J. 2009;52(1):80–89.
- Salari E, Bao G. Super-resolution using an enhanced Papoulis-Gerchberg algorithm. Image Process, IET. 2012;6(7):959–965.
- Pickalov V, Kazantzev D, Ayupova NB, et al.. Considerations on iterative algorithms for fan-beam tomography scheme. Proceedings of 4-th World Congress on Industrial Process Tomography. Vol. 2. Aizu, Japan; 2005. p. 687–690.
- Chen GH. Shuai Leng S, Mistretta CA. A novel extension of the parallel-beam projection-slice theorem to divergent fan-beam and cone-beam projections. Med Phys. 2005;32(3):654–665.
- Zhao S, Yang K. Fan beam image reconstruction with generalized Fourier slice theorem. J X-ray Sci Technol. 2014;22(4):415–436.
- Likhachev AV, Pikalov VV. Three-dimensional emission tomography of optically thick plasma for the known absorption. Opt Spectrosc. 2000;88(5):667–675.
- Pikalov VV, Chugunova NV. Wide-aperture tomography of emissive objects. Opt Spectrosc. 2000;88(2):286–90.
- Stewart GW. Matrix algorithms: basic decompositions. Philadelphia (PA): SIAM; 1998.
- Press WH. Discrete Radon transform has an exact, fast inverse and generalizes to operations other than sums along lines. Proc Nat Acad Sci. 2006;103(51):19249–19254.
- Keys R. Cubic convolution interpolation for digital image processing. IEEE Transactions on Acoustics, Speech, and Signal Processing. 1981;29(6):1153–1160.
- MATLAB and statistics toolbox release 2012b. Natick (MA): The MathWorks Inc.
- Morozov VA. Methods for solving incorrectly posed problems. New York (NY): Springer; 1984.
- Wagner JM, Noo F, Clackdoyle R. 3-D image reconstruction from exponential X-ray projections using Neumann series. Proceedings of Acoustics, Speech, and Signal Processing (ICASSP 01). Vol. 3; Salt Lake City; 2001. p. 2017–2020.
- Paleo P, Mirone A. Ring artifacts correction in compressed sensing tomographic reconstruction. J Synchrotron Radiat. 2015;22(5):1268–1278.
- Baranov VA. A variational approach to non-linear backprojection. Proceedings of 4th International Symposium on Computerized Tomography. Novosibirsk, Russia; 1995. p. 82–97.