Convergence Theorem for a Numerical Method of a 1d Coefficient Inverse Problem
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Date
2014
Authors
Özbilge Kahveci, Ebru
Journal Title
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Volume Title
Publisher
Taylor & Francis Ltd
Open Access Color
Green Open Access
Yes
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Publicly Funded
No
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Abstract
An approximately globally convergent numerical method proposed by Beilina and Klibanov for a coefficient inverse problem related to the hyperbolic equation c(x)u(tt) = u(xx) is studied. While the global convergence of this method has been proved for the 3D case, in 1D case, it was proved only partially. The last case is of an interest, since it was demonstrated that the 1D version of this method works well for a set of experimental data. In this paper, a complete proof of convergence of this method in 1D is presented.
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ORCID
Keywords
coefficient inverse problem, hyperbolic equation, numerical method, convergence theorem
Fields of Science
0101 mathematics, 01 natural sciences
Citation
WoS Q
Q2
Scopus Q
Q2
OpenCitations Citation Count
2
Source
Applıcable Analysıs
Volume
93
Issue
8
Start Page
1611
End Page
1625
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CrossRef : 2
Scopus : 2
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