References
- Natterer F. Inversion of the attenuated Radon transform. Inverse Probl. 2001;17:113–119.
- Novikov RG. An inversion formula for the attenuated X-ray transform. Ark. Mat. 2002;40:145–167.
- Tretiak OJ, Metz C. The exponential Radon transform. SIAM J. Appl. Math. 1980;39:341–354.
- Gullberg GT, Budinger TF. The use of filtering methods to compensate for constant attenuation in single-photon emission computed tomography. IEEE Trans. Biomed. Eng. 1981;28:142–157.
- Natterer F. The mathematics of computerized tomography [M]. New York (NY): Wiley; 1986.
- Hazou I, Solmon D. Inversion of the exponential Radon transform I. Analysis. Math. Meth. Appl. Sci. 1988;10:561–574.
- Rullgard H. An explicit inversion formula for the exponential Radon transform using data from 180 degrees. Ark. Mat. 2004;42:353–362.
- Wang JP. Inversion and property characterization on generalized transform of Radon type. Acta Math. Sci. 2011;31:636–643. Chinese.
- Kunyansky LA. A new SPECT reconstruction algorithm based on the Novikov’s explicit inversion formula. Inverse Probl. 2001;17:293–306.
- Wang JP, Du JY. A note on singular value decomposition for Radon transform in ℝn. Acta Math. Sci. 2002;22B:311–318.
- Boman J, Stromberg JO. Novikov’s inversion formula for the attenuated Radon transform – a new approach. J. Geo. Anal. 2004;14:185–198.
- Arzubov EV, Bukhgeim AL, Kazantsev SG. Two dimensional tomography problem and the theory of A-analytic functions. Siberian Adv. Math. 1998;8:1–20.
- You JS. The attenuated Radon transform with complex coefficients. Inverse Probl. 2007;23:1963–1971.
- Ljunggren S. A simple graphical representation of Fourier-based imaging methods. J. Magn. Reson. 1983;54:338–343.
- Lu JK. Boundary value problems for analytic functions[M]. Singapore: World Scientific; 1993.