References
- Smith , KT , Solmon , D.C. and Wagner , SL . 1977 . Practical and mathematical aspects of the problem of reconstructing objects from radiographs . American Mathematical Society , 83 : 1227 – 1270 .
- Miller , K . 1964 . Three circle theorems in partial differential equations and applications to improperly posed problems . Archive for Rational Mechanics and Analysis , 16 : 126 – 154 .
- Miller , K . 1965 . An eigenfunction expansion method for problems with over-specified data . Annali della Scuola Normale Superiore di Pisa , 19 : 397 – 405 . Series 3
- Miller , K . An optimal method for the X-ray reconstruction problem, preliminary report . AMS Notices . January 1978 , Atlanta, GA. A-161: paper delivered at AMS meeting ,
- Lakshminarayanan , AV . 1975 . Reconstruction from divergent ray data . 1975 . SUNY Technical Report Number 92 , Buffalo, NY : Computer Science Department .
- Shepp , LA and Kruskal , JB . 1978 . Computerized tomography: the new medical X-ray technology . American Mathematical Monthly , 85 : 420 – 439 .
- Natterer , F and Wubbeling , F . 2001 . Mathematical methods in image reconstruction . Soc. Indus. Appl. Math. ,
- Katsevich , A . 2003 . A general scheme for constructing inversion algorithms for cone-beam CT . International Journal of Mathematics and Mathematical Sciences , 21 : 1305 – 1321 .
- Heusman , RH , ed. Proceedings of the Sixth International Meeting on Fully Three-Dimensional Reconstruction in Radiology and Nuclear Medicine . The papers for this meeting were published in Physics in Medicine and Biology . October 30–November 2 2001 , Pacific Grove, CA. Vol. 47 , Asilomar Conference Grounds . (Ed.), No. 15
- Yves Bizais , ed. Proceedings of the 2003 International Meeting on Fully Three-Dimensional Reconstruction in Radiology and Nuclear Medicine . The papers for this meeting were published in Physics in Medicine and Biology . June 29–July 4 2003 , Saint Malo, France. Vol. 49 , (Ed.), No. 11
- Davison , ME . June 1979 . “ Filtered back-projection methods for reconstructing a function from an arbitrary finite set of its projections ” . Ph.D. Thesis in Mathematics 125 pages Berkeley : University of California .
- Miller , K . 1970 . Least squares methods for ill-posed problems with a prescribed bound . SIAM Journal of Numerical Analysis , 1 : 52 – 73 .