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Parameter identification for Laplace equation and approximation in Hardy classes
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S. Chaabane
Published/Copyright:
2003
We consider the inverse problem of identifying a Robin coefficient on some part of the boundary of a smooth 2D domain from overdetermined data available on the other part of the boundary, for Laplace equation in the domain. Using tools from complex analysis and analytic functions theory, we provide a constructive and convergent identification scheme for this inverse problem, together with numerical experiments.
Published Online: --
Published in Print: 2003-03-01
Copyright 2003, Walter de Gruyter
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Articles in the same Issue
- Inverse problems and classes of solutions of evolution equations
- Planar crack identification for the transient heat equation
- Parameter identification for Laplace equation and approximation in Hardy classes
- Determination of the memory kernel from boundary measurements on a finite time interval
- Parabolic integro-differential identification problems related to memory kernels with special symmetries
- Iteration methods for solving a two dimensional inverse problem for a hyperbolic equation
Articles in the same Issue
- Inverse problems and classes of solutions of evolution equations
- Planar crack identification for the transient heat equation
- Parameter identification for Laplace equation and approximation in Hardy classes
- Determination of the memory kernel from boundary measurements on a finite time interval
- Parabolic integro-differential identification problems related to memory kernels with special symmetries
- Iteration methods for solving a two dimensional inverse problem for a hyperbolic equation
