Search for dissertations about: "coefficient inverse problem"
Showing result 1 - 5 of 11 swedish dissertations containing the words coefficient inverse problem.
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1. Efficient Adaptive Algorithms for an Electromagnetic Coefficient Inverse Problem
Abstract : This thesis comprises five scientific papers, all of which are focusing on the inverse problem of reconstructing a dielectric permittivity which may vary in space inside a given domain. The data for the reconstruction consist of time-domain observations of the electric field, resulting from a single incident wave, on a part of the boundary of the domain under consideration. READ MORE
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2. A Two-stage Numerical Procedure for an Inverse Scattering Problem
Abstract : In this thesis we study a numerical procedure for the solution of the inverse problem of reconstructing location, shape and material properties (in particular refractive indices) of scatterers located in a known background medium. The data consist of time-resolved backscattered radar signals from a single source position. READ MORE
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3. Inverse scattering and distribution of resonances on the real line
Abstract : We study aspects of scattering theory for the Schrödinger operator on the real line. In the first part of the thesis we consider potentials supported by a half-line, and we are interested in the inverse problem of reconstruction of the potential from the knowledge of values of the reflection coefficient at equidistributed points on the positive imaginary axis. READ MORE
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4. Computer-Assisted Proofs and Other Methods for Problems Regarding Nonlinear Differential Equations
Abstract : This PhD thesis treats some problems concerning nonlinear differential equations. In the first two papers computer-assisted proofs are used. The differential equations there are rewritten as fixed point problems, and the existence of solutions are proved. READ MORE
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5. Numerical algorithms for nonlinear eigenproblems with eigenvector nonlinearities
Abstract : Eigenproblems and their nonlinear generalizations appear as important problems in a wide variety of fields, ranging from quantum chemistry and vibration analysis to macroeconomics and data science. Hence, the development and analysis of numerical algorithms to solve such problems has a broad multiplicative effect on our ability to answer several crucial scientific questions. READ MORE