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Applicable Analysis
An International Journal
Volume 100, 2021 - Issue 8
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Articles

Spectral properties of exterior transmission problem for spherically stratified anisotropic media

Yalin ZhangDepartment of Mathematics, Tianjin University of Technology, Tianjin, People's Republic of ChinaCorrespondence[email protected]
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Pages 1668-1692 | Received 02 Apr 2019, Accepted 14 Aug 2019, Published online: 04 Sep 2019

References

  • Cakoni F, Colton D. A qualitative approach to inverse scattering theory. Springer; 2014.
  • Cakoni F, Haddar H. Special issue on transmission eigenvalues. Inverse Probl. 2013;29:100201.
  • Colton D, Meng S. Spectral properties of the exterior transmission eigenvalue problem. Inverse Probl. 2014;30:105010.
  • Meng S, Haddar H, Cakoni F. The factorization method for a cavity in an inhomogeneous medium. Inverse Probl. 2014;30:045008. doi: 10.1088/0266-5611/30/4/045008
  • Cakoni F, Colton D, Meng S. The inverse scattering problem for a penetrable cavity with internal measurements. Inverse Probl Appl. 2014;615:71–78.
  • Aktosun T, Gintides D, Papanicolaou V. The uniqueness in the inverse problem for transmission eigenvalues for the spherically symmetric variable-speed wave equation. Inverse Probl. 2011;27:115004. doi: 10.1088/0266-5611/27/11/115004
  • Cakoni F, Gintides D, Haddar H. The existence of an infinite discrete set of transmission eigenvalues. SIAM J Math Anal. 2010;42:237–255. doi: 10.1137/090769338
  • Sun M, Yan G. Discreteness of the exterior transmission eigenvalues. Acta Math Sci. 2018;38:110–124. doi: 10.1016/S0252-9602(17)30120-0
  • Colton D, Meng Y, Meng S. The inverse spectral problem for exterior transmission eigenvalues. Inverse Probl. 2014;30:055010.
  • Xu X, Yang C, Buterin A. Inverse spectral problems of transmission eigenvalue problem for anisotropic media with spherical symmetry assumptions. J Inverse Ill-Posed Probl. 2016;25:175–183.
  • Xu X, Yang C, Buterin S, et al. Estimates of complex eigenvalues and an inverse spectral problem for the transmission eigenvalue problem, arXiv: 1703.01709v2.
  • Gel'fand I, Levitan B. On the determination of a differential equation from its spectral function. Am Math Soc Transl. 1951;1:253–304.
  • Fedoryuk M. Asymptotics: integrals and series. Moscow: Nauka; 1987 (Russian).
  • McLaughlin J, Polyakov P. On the uniqueness of a spherically symmetric speed of sound from transmission eigenvlaues. J Differ Equ. 1994;107:351–382. doi: 10.1006/jdeq.1994.1017
  • Rundell W, Sacks P. Reconstruction techniques for classical inverse Sturm–Liouville problems. Math Comput. 1992;58:161–183. doi: 10.1090/S0025-5718-1992-1106979-0

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