| タイトル | Linear iterative solvers for implicit ODE methods |
| 本文(外部サイト) | http://hdl.handle.net/2060/19900019070 |
| 著者(英) | Saylor, Paul E.; Skeel, Robert D. |
| 著者所属(英) | Institute for Computer Applications in Science and Engineering |
| 発行日 | 1990-08-01 |
| 言語 | eng |
| 内容記述 | The numerical solution of stiff initial value problems, which lead to the problem of solving large systems of mildly nonlinear equations are considered. For many problems derived from engineering and science, a solution is possible only with methods derived from iterative linear equation solvers. A common approach to solving the nonlinear equations is to employ an approximate solution obtained from an explicit method. The error is examined to determine how it is distributed among the stiff and non-stiff components, which bears on the choice of an iterative method. The conclusion is that error is (roughly) uniformly distributed, a fact that suggests the Chebyshev method (and the accompanying Manteuffel adaptive parameter algorithm). This method is described, also commenting on Richardson's method and its advantages for large problems. Richardson's method and the Chebyshev method with the Mantueffel algorithm are applied to the solution of the nonlinear equations by Newton's method. |
| NASA分類 | NUMERICAL ANALYSIS |
| レポートNO | 90N28386
NAS 1.26:182074
NASA-CR-182074
AD-A227189
ICASE-90-51 |
| 権利 | No Copyright |
| URI | https://repository.exst.jaxa.jp/dspace/handle/a-is/136390 |
