Convergence of natural adaptive least squares finite element methods (Q2407473)
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| Language | Label | Description | Also known as |
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| English | Convergence of natural adaptive least squares finite element methods |
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Convergence of natural adaptive least squares finite element methods (English)
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29 September 2017
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This paper analyses the convergence of natural adaptive mesh-refining first-order div least squares finite element methods. The authors prove a \(Q\)-linear convergence of the associated adaptive mesh-refining strategy for a sufficiently fine initial mesh with some sufficiently large bulk parameter for piecewise constant right-hand sides in a Poisson model problem. The proof is based mainly on some modifications of known supercloseness results to non-convex polygonal domains plus the flux representation formula. For the sake of simplicity, the analysis is performed for the lowest-order case in two-dimensions.
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finite element methods
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natural adaptive least squares
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convergence
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adaptive mesh-refining strategy
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Poisson model problem
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