Grid stabilization of high-order one-sided differencing II: Second-order wave equations

Grid stabilization of high-order one-sided differencing II: Second-order wave equations

We demonstrate the stable boundary closure of difference methods of order up through 16 for the solution of wave equations in second order form. Our method combines the introduction of 1–2 judiciously placed subcell grid points near the boundary with minimal-stencil, one-sided difference operators o...

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Veröffentlicht in:Journal of computational physics 2012-10, Vol.231 (23), p.7907-7931
Hauptverfasser: Hagstrom, Thomas, Hagstrom, George
Format: Artikel
Sprache:eng
Schlagworte:
Boundaries
Closures
Computational techniques
Dynamical systems
Exact sciences and technology
Mathematical methods in physics
Mathematical models
One-sided differencing
Operators
Physics
Scalars
Stability
Stabilization
Wave equation
Wave equations
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Zusammenfassung:We demonstrate the stable boundary closure of difference methods of order up through 16 for the solution of wave equations in second order form. Our method combines the introduction of 1–2 judiciously placed subcell grid points near the boundary with minimal-stencil, one-sided difference operators of the same order as the interior scheme. The method is tested on a variety of problems including the scalar wave equation discretized on mapped grids and overlapping composite grids, as well as an integrable nonlinear system.
ISSN:0021-9991
1090-2716
DOI:10.1016/j.jcp.2012.07.033