\(L^{2}\) error estimation of a quadratic finite volume element method for pseudo-parabolic equations in three spatial dimensions (Q434691)
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scientific article; zbMATH DE number 6056846
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(L^{2}\) error estimation of a quadratic finite volume element method for pseudo-parabolic equations in three spatial dimensions |
scientific article; zbMATH DE number 6056846 |
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\(L^{2}\) error estimation of a quadratic finite volume element method for pseudo-parabolic equations in three spatial dimensions (English)
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16 July 2012
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The author considers a quadratic finite volume element method based on the Barlow points for pseudo-parabolic equations in three spatial dimensions. Optimal order of convergence in the \(L^2\) norm is obtained by use of a symmetrization technique. The effectiveness of this approach is illustrated on a numerical example.
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Barlow points
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\(L^{2}\) error estimation
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pseudo-parabolic
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quadratic finite volume element method
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convergence
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numerical example
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0.92875093
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0.90767646
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0.9064605
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0.8944188
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0.8906349
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