References
- Ammari H, Kang H. Reconstruction of small inhomogeneities from boundary measurements. Vol. 1846, Lecture notes in mathematics. Berlin: Springer-Verlag; 2004.
- Ammari H, Kang H. Polarization and moment tensors. With applications to inverse problems and effective medium theory. New York (NY): Applied Mathematical Sciences, Springer; 2007.
- Colton D, Kress R. Inverse acoustic and electromagnetic scattering theory. 2nd ed. New York (NY): Springer; 1998.
- Isakov V. Inverse problems for partial differential equations. 2nd ed. Vol. 127, Applied mathematical sciences. New York (NY): Springer-Verlag; 2006.
- Pike R, Sabatier P, editors. Scattering: scattering and inverse scattering in pure and applied science. San Diego (CA): Academic Press; 2002.
- Uhlmann G,editor. Inside out: inverse problems and applications, MSRI publications. Vol. 47. Cambridge: Cambridge University Press; 2003.
- Liu HY, Shang Z, Sun H, Zou J. Singular perturbation of reduced wave equation and scattering from an embedded obstacle. J. Dyn. Differ. Equ. 2012;24:803–821.
- Bukhgeim AL, Klibanov MV. Uniqueness in the large of a class of multidimensional inverse problems. Soviet Math. Doklady. 1981;17:244–247.
- Klibanov MV. Carleman estimates for global uniqueness, stability and numerical methods for coefficient inverse problems. J. Inverse Ill-posed Probl. 2013;21:477–560.
- Liu HY, Zou J. On uniqueness in inverse acoustic and electromagnetic obstacle scattering problems. J. Phys. Conf. Series. 2008;124:012006.
- Uhlmann G. Developments in inverse problems since Calderón’s foundational paper, Chapter 19. In: Christ M, Kenig C, Sadosky C,editors. Harmonic analysis and partial differential equations. London: University of Chicago Press; 1999. p. 295–345.
- Sylvester J, Uhlmann G. A global uniqueness theorem for an inverse boundary value problem. Ann. of Math. (2). 1987;125:153–169.
- Nachman A. Reconstruction from boundary measurements. Ann. of Math. (2). 1988;128:531–576.
- Colton D, Monk P. The inverse scattering problem for time-harmonic acoustic waves in an inhomogeneous medium. Quart. J. Mech. Appl. Math. 1988;41:1472–1483.
- Cakoni F, Colton D. A qualitative approach to inverse scattering theory. Berlin: Springer-Verlag; 2014.
- Colton D, Kirsch A, Päivärinta L. Far-field patterns for acoustic waves in an inhomogeneous medium. SIAM J. Math. Anal. 1989;20:1472–1483.
- Päivärinta L, Sylvester J. The interior transmission eigenvalue problem. Inverse Probl. Imag. 2007;1:13–28.
- Sylvester J. Discreteness of transmission eigenvalues via upper triangular compact operators. SIAM J. Math. Anal. 2012;44:341–354.
- Bukhgeim AL. Recovering a potential from Cauchy data in the two dimensional case. J. Inverse Ill-posed Probl. 2008;16:19–33.
- Blasten E. The inverse problem of the Schrödinger equation in the plane: a dissection of Bukhgeim’s result. arXiv: 1103.6200. Available from: http://arxiv.org/abs/1103.6200
- Imanuvlilov OYu, Yamamoto M. Inverse boundary value problem for Schrödinger equation in two dimensions. SIAM J. Math. Anal. 2012;44:1333–1339.
- Lax P, Phillips R. Scattering theory. Revised ed. London: Academic Press; 1989.
- Klibanov MV. Inverse problems in the ‘large’ and Carleman bounds. Differ. Equ. 1984;20:755–760.
- Klibanov MV. Uniqueness of solutions of two inverse problems for the Maxwellian system. USSR J. Comput. Math. Math. Phys. 1986;26:1063–1071.
- Klibanov MV. Inverse problems and Carleman estimates. Inverse Probl. 1992;8:575–596.
- Klibanov MV. Uniqueness of an inverse problem with single measurement data generated by a plane wave in partial finite differences. Inverse Probl. 2011;27:115005.
- Colton D, Sleeman BD. Uniqueness theorems for the inverse problem of acoustic scattering. IMA J. Appl. Math. 1983;31:253–259.
- Cakoni F, Gintides D. New results on transmission eigenvalues. Inverse Probl. Imag. 2010;4:39–48.
- Alessandrini G, Rondi L. Determining a sound-soft polyhedral scatterer by a single far-field measurement. Proc. Am. Math. Soc. 2005;133:1685–1691.
- Cheng J, Yamamoto M. Uniqueness in an inverse scattering problem within non-trapping polygonal obstacles with at most two incoming waves. Inverse Probl. 2003;19:1361–1384.
- Liu H, Zou J. Uniqueness in an inverse acoustic obstacle scattering problem for both sound-hard and sound-soft polyhedral scatterers. Inverse Probl. 2006;22:515–524.
- Elschner J, Hu G. Uniqueness in inverse transmission scattering problems for multilayered obstacles. Inverse Probl. Imag. 2011;5:793–813.