Hermite collocation solution of partial differential equations via preconditioned Krylov methods (Q2712970)
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scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Hermite collocation solution of partial differential equations via preconditioned Krylov methods |
scientific article |
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18 September 2001
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Hermite collocation
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linear second order equation
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preconditioning
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Krylov methods
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preconditioned Krylov
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numerical experiments
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Hermite collocation solution of partial differential equations via preconditioned Krylov methods (English)
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The author makes use of Hermite collocation in order to solve second order partial differential equations along with Dirichlet and/or Neumann boundary conditions. To solve efficiently the resulting linear algebraic systems he introduces two preconditioners and provide results of numerical experiments.
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