Advertisement

Inverse boundary value problems

  • John Sylvester
  • Gunther Uhlmann
Conference paper
Part of the Lecture Notes in Mathematics book series (LNM, volume 1324)

Keywords

Inverse Problem Quadratic Form Pseudodifferential Operator Boundary Measurement Electrical Tomography 
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.

Preview

Unable to display preview. Download preview PDF.

Unable to display preview. Download preview PDF.

References

  1. Calderón, A. P. [1980] On an inverse boundary value problem, Seminar on Numerical Analysis and its Applications to Continuum Physics, Soc. Brasileira de Matemática, Rio de Janeiro, 1980, 65–73.Google Scholar
  2. Friedman, A. and Gustafsson, B. [1986] Identification of the conductivity coefficient in an elliptic equation, to appear.Google Scholar
  3. Kohn, R. and Vogelius, M. [1984] Determining conductivity by boundary measurements, CPAM 37 (1984), 289–298.MathSciNetzbMATHGoogle Scholar
  4. Kohn, R. and Vogelius, M. [1985] Determining conductivity by boundary measurements II, CPAM 38 (1985), 643–667.MathSciNetzbMATHGoogle Scholar
  5. Langer, R. E. [1933] An inverse problem in differential equations, Bull. Amer. Math. Soc. 39 (1933), 814–820.MathSciNetCrossRefzbMATHGoogle Scholar
  6. Sylvester, J. and Uhlmann, G. [1986] A uniqueness theorem for an inverse boundary value problem in electrical prospection, CPAM 39 (1986), 91–112.MathSciNetzbMATHGoogle Scholar
  7. Sylvester, J. and Uhlmann, G. [1986b] A global uniqueness theorem for an inverse boundary value problem, Annals of Math., to appear.Google Scholar

Copyright information

© Springer-Verlag 1988

Authors and Affiliations

  • John Sylvester
    • 1
  • Gunther Uhlmann
    • 2
  1. 1.Duke UniversityUSA
  2. 2.University of WashingtonUSA

Personalised recommendations