References
- Norton SJ. Compton scattering tomography. J Appl Phys. 1994;76(4):2007–2015. doi: 10.1063/1.357668
- Nguyen MK, Truong TT. Inversion of a new circular-arc Radon transform for Compton scattering tomography. Inv Prob. 2010;26:065005. doi: 10.1088/0266-5611/26/9/099802
- Rigaud G, Nguyen MK, Louis AK. Novel numerical inversions of the two circular-arc Radon transforms in Compton scattering tomography. Inv Probl Sci Eng. 2012;20(6):809–839. doi: 10.1080/17415977.2011.653008
- Rigaud G, Lakhal A, Louis AK. Series expansions of the reconstruction kernel of the Radon transform over a Cormack-type family of curves with applications in tomography. SIAM J Imaging Sci. 2014;7(2):924–943. doi: 10.1137/130942784
- Cormack AM. The Radon transform on a family of curves in the plane. Proc Amer Math Soc. 1981;83(2):325–330. doi: 10.1090/S0002-9939-1981-0624923-1
- Eisberg RM. Fundamentals of modern physics. New York: Wiley; 1961. p. 503.
- Battista JJ, Santon LW, Bronskill MJ. Compton scatter imaging of transverse sections: corrections for multiple scatter and attenuation. Phys Med Biol. 1977;22(2):229–244. doi: 10.1088/0031-9155/22/2/004
- Chighvinadze T, Pistorius S. The effect of detector size and energy resolution on image quality in multi-projection Compton scatter tomography. J X-Ray Sci Tech. 2014;22:113–128.
- Chighvinadze T, Pistorius S. The impact of the number of projections on image quality in Compton scatter tomography. J X-Ray Sci Tech. 2015;23:745–758. doi: 10.3233/XST-150525
- Webber JW, Lionheart WRB. Three dimensional Compton scattering tomography. Inverse Probl. 2018;34:084001. doi: 10.1088/1361-6420/aac51e
- Brateman L, Jacobs AM, Fitzgerald LT. Compton scatter axial tomography with x-rays: SCAT-CAT. Phys Med Biol. 1984;29(11):1353–1370. doi: 10.1088/0031-9155/29/11/004
- Arendtsz NV, Hussein EMA. Energy-spectral Compton scatter imaging - part I: theory and mathematics. IEEE Trans Nucl Sci. 1995;42(6):2155–2165. doi: 10.1109/23.489441
- Wang J, Huang X, Zhong X. The convergence condition of the successive approximation process in Compton scattering tomography. J Appl Phys. 2002;92(4):2149–2152. doi: 10.1063/1.1494112
- Brunetti A, Golosio B, Cesareo R. A correction procedure for the self-absorption artifacts in Compton scatter tomography. X-Ray Spectrom. 2002;31:377–382. doi: 10.1002/xrs.592
- Golosio B, Brunetti A, Cesareo R. Algorithmic techniques for quantitative Compton tomography. Nucl Instr Meth Phys Res B. 2004;213:108–111. doi: 10.1016/S0168-583X(03)01542-8
- Uytven EV, Pistorius S, Gordon R. An iterative three-dimensional electron density imaging algorithm using uncollimated Compton scattered x rays from a polyenergetic primary pencil beam. Med Phys. 2007;34(1):256–265. doi: 10.1118/1.2400835
- Rigaud G, Regnier R, Nguyen MK, et al. Combined modalities of Compton scattering tomography. IEEE Trans Nucl Sci. 2013;60(3):1570–1577. doi: 10.1109/TNS.2013.2252022
- Desmal A, Tracey BH, Rezaee H, et al. Sparse view Compton scatter tomography with energy resolved data: experimental and simulation results. In: Proceedings of SPIE, vol. 10187; 2017. p. 1018707.