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A study of an inverse problem for finite range potentials

  • C. Coudray
Part II: Five Lectures on Special Applications and One Theoretical Lecture on Solutions of Inverse Problems
Part of the Lecture Notes in Physics book series (LNP, volume 85)

Keywords

Inverse Problem Imaginary Axis Fundamental Equation Complex Potential Real Potential 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.

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Bibliography

  1. Agranovich Z.S. and Marchenko V.A. (1963): The inverse problem of scattering theory, English transl., Gordon and Breach, New York.Google Scholar
  2. Bertero M. and Dillon G. (1971): An outline of scattering theory for absorptive potentials, Nuovo Cimento, 2A, 1024–1038.Google Scholar
  3. Di Salvo E. and Viano G.A. (1976): Uniqueness and stability in the inverse problem of scattering theory, Nuovo Cimento, 33B, 547–565.Google Scholar
  4. Ljance V.E. (1966): The inverse problem for a non self-adjoint operator English transl., Soviet Math. Dokl. 7, 27–30 [Dokl. Akad. Nauk.SSSR 166, 30–33]Google Scholar
  5. Ljance V.E. (1967): An analog of the inverse problem of scattering theory for a non self-adjoint operator, English transl. Math. USSR Sbornik 1, 485–504 [Mat. Sbornik 72, 114].Google Scholar
  6. Ljance V.E. (1968) The non self-adjoint differential operator of the second order on the real axis: Appendix II of: Naimark M.A., Linear differential operators, part II, English transl. Frederick Ungar Publishing Co., New York.Google Scholar
  7. Loeffel J.J. (1968): On an inverse problem in potential scattering theory, Ann. Inst. Henri Poincaré A8, 339–447.Google Scholar
  8. Newton (1960): Analytic properties of radial wave functions, J. Math. Phys. 1, 319–347.Google Scholar
  9. Sergent P. and Coudray C.: the inverse problem at fixed energy for finite range complex potentials, Preprint Orsay IPNO/TH 77-51.Google Scholar

Copyright information

© Springer-Verlag 1978

Authors and Affiliations

  • C. Coudray
    • 1
  1. 1.Division de Physique ThéoriqueInstitut de Physique NucléaireOrsay CedexFrance

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