| タイトル | The stability of pseudospectral-Chebyshev methods |
| 著者(英) | Gottlieb, D. |
| 著者所属(英) | Tel-Aviv Univ.|NASA Langley Research Center |
| 発行日 | 1981-01-01 |
| 言語 | eng |
| 内容記述 | The pseudospectral-Chebyshev methods are shown to be convergent in variable coefficient problems and, in some cases, hyperbolic problems. The analysis demonstrates that the rate of convergence is greater for finite difference methods or the finite element method. For a single first-order hyperbolic equation, the method is seen as remaining stable even when the coefficient changes sign, although in this case it is specified that care must be taken to have adequate spatial resolution. It is noted that this fact, combined with the fact that collocation methods are easy to apply in the nonlinear case, shows that the pseudospectral method is in general preferable to the Galerkin or Tau methods. |
| NASA分類 | NUMERICAL ANALYSIS |
| レポートNO | 81A24858 |
| 権利 | Copyright |
| URI | https://repository.exst.jaxa.jp/dspace/handle/a-is/417768 |
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