Second-order convex splitting schemes for gradient flows with Ehrlich-Schwoebel type energy: Application to thin film epitaxy (Q2882335)
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scientific article; zbMATH DE number 6030207
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Second-order convex splitting schemes for gradient flows with Ehrlich-Schwoebel type energy: Application to thin film epitaxy |
scientific article; zbMATH DE number 6030207 |
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4 May 2012
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unconditional stability
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second order scheme
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convex-concave decomposition
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epitaxial growth
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Ehrlich-Schwoebel type energy
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0.8900201
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0.87004024
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0.8647128
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0.85851383
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0.85466284
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0.85421836
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0.85415727
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0.85097593
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0.85096246
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Second-order convex splitting schemes for gradient flows with Ehrlich-Schwoebel type energy: Application to thin film epitaxy (English)
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The authors construct unconditionally stable, unconditionally uniquely solvable as well as second-order accurate with respect to time schemes for gradient flows with energy for a well-defined functional. New results are obtained for a particular functional and numerical estimates are presented.
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