- Colton, D, and Kress, R, 1998. Inverse Acoustic and Electromagnetic Scattering Theory. Berlin. 1998. p. p. 334.
- Adams, R, 1975. Sobolev Spaces. New York. 1975. p. p. 268.
- Hohage, T, 2001. On the numerical solution of a three-dimensional inverse medium scattering problem, Inverse Problems 17 (2001), pp. 1743–1763.
- Tikhonov, AN, Leonov, AS, and Yagola, AG, 1998. Nonlinear Ill-posed Problems. V.1 and V.2. London. 1998. p. p. 387.
- Bakushinsky, A, and Goncharsky, A, 1994. Ill-posed Problems : Theory and Applications. Dordrecht. 1994. p. p. 258.
- Engl, H, Hanke, M, and Neubauer, A, 1996. Regularization of Inverse Problems. Dordrecht. 1996. p. p. 321.
- Hettlich, F, 1998. The Landweber iteration applied to inverse conductive scattering problems, Inverse Problems 14 (1998), pp. 931–947.
- Hettlich, F, and Rundell, W, 1996. Iterative methods for the reconstruction of an inverse potential problem, Inverse Problems 12 (1996), pp. 251–266.
- Hohage, T, and Schormann, C, 1998. A Newton-type method for a transmission problem in inverse scattering, Inverse Problems 14 (1998), pp. 1207–1227.
- Kozlov, AI, 2002. A class of stable iterative methods for solving nonlinear ill-posed operator equations, Advanced Computing. Numerical Methods and Programming 3 (2002), pp. 180–186, Sec. 1.
- Bazaraa, MS, and Shetty, CM, 1979. Nonlinear Programming. Theory and Algorithms. New York. 1979. p. p. 560.
- Dennis, JE, and Schnabel, RB, 1983. Numerical Methods for Unconstrained Optimization and Nonlinear Equations. New Jersey. 1983. p. p. 378.
- Bakushinsky, AB, and Kokurin, Yu., M, 2002. Iterative Methods for Solving Ill-posed Operator Equations with Smooth Operators. Moscow. 2002. p. p. 192.
- Kleinman, RE, and van den Berg, PM, 1992. A modified gradient method for two-dimensional problems in tomography, Journal of Computational and Applied Mathematics 42 (1992), pp. 17–35.
Inverse Problems in Science and Engineering
Volume 13, 2005 - Issue 3