Source: J. Integral Equations Appl.
Volume 21, Number 2
Full-text: Access denied (no subscription
We're sorry, but we are unable to provide
you with the full text of this article because we are not able to identify
you as a subscriber.
If you have a personal subscription to
this journal, then please login. If you are already logged in, then you
may need to update your profile to register your subscription. Read more about accessing full-text
H. Ammari, M. S. Vogelius, and D. Volkov, Asymptotic formulas for perturbations in the electromagnetic fields due to the presence of inhomogeneities of small diameter II. The full Maxwell equations, J. Math. Pures Appl., 80, (2001), pp. 769--814.
P. Anselone and J. Davis, Collectively compact operator approximation theory and applications to integral equations, Prentice-Hall, (1971).
Mathematical Reviews (MathSciNet): MR443383
T. Arens, Why linear sampling works, Inverse Problems, 20, (2004), pp. 163-173.
F. Cakoni and D. Colton, Qualitative Methods in Inverse Scattering Theory: An Introduction, Springer, Berlin, (2006).
D. Colton and A. Kirsch, A simple method for solving inverse scattering problems in the resonance region, Inverse Problems, 12, (1996), pp. 383-393.
D. Colton, M. Piana, and R. Potthast, A simple method using Morozov's discrepancy principle for solving inverse scattering problems, Inverse Problems, 13 (1997), pp. 1477--1493.
D. L. Colton and R. Kress, Inverse acoustic and electromagnetic scattering theory, Springer, 2nd ed., (1998).
P. Hähner, An inverse problem in electrostatics, Inverse Problems, 15, (1999), pp. 961-975.
T. Kato, Perturbation theory for linear operators, Springer, repr. of the 1980 ed., (1995).
A. Kirsch, Characterization of the shape of a scattering obstacle using the spectral data of the far field operator, Inverse Problems, 14 (1998), pp. 1489-1512.
A. Kirsch and N. Grinberg, The Factorization Method for Inverse Problems, Oxford Lecture Series in Mathematics and its Applications 36, Oxford University Press, (2008).
A. Lechleiter, A regularization technique for the factorization method, Inverse Problems, 22, (2006), pp. 1605--1625.
G. Vainikko, The discrepancy principle for a class of regularization methods, U.S.S.R. Comput. Maths. Math. Phys., 21, (1982), pp. 1-19.
Mathematical Reviews (MathSciNet): MR747313
M. Vogelius and D. Volkov, Asymptotic formulas for perturbations in the electromagnetic fields due to the presence of inhomogeneities of small diameter, $\rm M^2$AN, 79 (2000), pp. 723-748.