| タイトル | A spectral multidomain method for the solution of hyperbolic systems |
| 本文(外部サイト) | http://hdl.handle.net/2060/19860017518 |
| 著者(英) | Kopriva, D. |
| 著者所属(英) | NASA Langley Research Center |
| 発行日 | 1986-05-01 |
| 言語 | eng |
| 内容記述 | A multidomain Chebyshev spectral collocation method for solving hyperbolic partial differential equations were developed. Though spectral methods are global methods, an attractive idea is to break a computational domain into several domains, and a way to handle the interfaces is described. The multidomain approach offers advantages over the use of a single Chebyshev grid. It allows complex geometries to be covered, and local refinement can be used to resolve important features. For steady state problems it reduces the stiffness associated with the use of explicit time integration as a relaxation scheme. Furthermore, the proposed method remains spectrally accurate. Results showing performance of the method on one dimensional linear models and one and two dimensional nonlinear gas dynamics problems are presented. |
| NASA分類 | NUMERICAL ANALYSIS |
| レポートNO | 86N26990
NAS 1.26:178105
ICASE-86-28
NASA-CR-178105 |
| 権利 | No Copyright |
| URI | https://repository.exst.jaxa.jp/dspace/handle/a-is/153950 |
