Inverse Problems

Proceedings of the Conference held at the Mathematical Research Institute at Oberwolfach, Black Forest, May 18–24, 1986

  • John Rozier Cannon
  • Ulrich Hornung

Table of contents

  1. Front Matter
    Pages 1-9
  2. Margaret Cheney, James H. Rose, Brian DeFacio
    Pages 61-68
  3. John R. Cannon, Salvador Pérez Esteva
    Pages 133-137

About this book


The present volume contains manuscripts of lectures or topics related to the lectures which were given at the conference on "Inverse Problems" at the mathematical Research Institute at Oberwolfach. The conference took place during the week of May 18-24, 1986, and was managed by the editors. Recalling Professor Joseph Keller's paper entitled Inverse Problems, American Mathematical Monthly, 83 (1976), we give two direct quotes. "We call two problems inverses of one another if the formulation of each involves all or part of the solution of the other. Often, for historical reasons, one of the two problems has been studied extensively for some time, while the other is newer and not so well understood. In such cases, the former is called the direct problem, while the latter is called the inverse problem. " "The main sources of inverse problems are science and engineering. Often these problems concern the determination of the properties of some inaccess­ ible regions from observations on the boundary of that region. " Often, inverse problems are not well posed. This increases the difficulty in their analysis and numerical solution. As can be seen from the table of content of this volume, the conference covered inverse problems in scattering theory, seismology, tomography, estimation of coefficients and source terms in parabolic and elliptic differential equations, the inverse Sturm-Liouville problem, and numerical methods. The editors wish to thank Professor M. Barner and his co-workers of the Mathematical Research Institute for their help in creating the conference.


differential equation partial differential equation scattering theory science

Editors and affiliations

  • John Rozier Cannon
    • 1
  • Ulrich Hornung
    • 2
  1. 1.Dept. Pure & Appl. MathematicsWashington State UniversityPullmanWashingtonUSA
  2. 2.Sonderforschungsbereich 72Bonn 1Germany

Bibliographic information