Convergence of a numerical solver for an \(\mathbb R\)-linear Beltrami equation (Q766228)
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scientific article; zbMATH DE number 6018292
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Convergence of a numerical solver for an \(\mathbb R\)-linear Beltrami equation |
scientific article; zbMATH DE number 6018292 |
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Convergence of a numerical solver for an \(\mathbb R\)-linear Beltrami equation (English)
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23 March 2012
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The author investigates the convergence of a numerical solver for an \({\mathbb R}\)-linear Beltrami equation. First he provides discretization set up in \(L^{p}\)-spaces by applying the discrete convergence theory of \textit{G. Vainikko} [Math. Nachr. 78, 165--183 (1977; Zbl 0369.65016)]. Later he provides a convergence analysis. Numerical experiments are detailed and the results are discussed.
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Beltrami equation
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electrical impedance tomography
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discretization
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convergence
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numerical experiments
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0.9324535
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0.90240955
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0.89204115
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0.8915617
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0.89092976
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0.88706064
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0.88481987
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0.88435495
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