On Numerical Computation of the Tricomi Equation
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- IMAI Hitoshi
- Institute of Technology and Science, The University of Tokushima
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- SAKAGUCHI Hideo
- Institute of Technology and Science, The University of Tokushima
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- ISO Yuusuke
- Graduate School of Informatics, Kyoto University
説明
The Tricomi equation is solved numerically. Boundary value problems (BVPs) and ill-posed Cauchy problems (CPs) are considered. Problems are discretized by using the finite difference method (FDM) or the spectral collocation method (SCM). The numerical computation is carried out in the multiple-precision arithmetic. For BVPs both FDM and SCM work well. When the exact solution is a part of a global and analytic function accuracy of numerical results are expectable. They show that the maximum principle does not hold here. Some other BVPs are solved and numerical results are satisfactory. For CPs SCM works well but FDM does not. When the exact solution is a part of a global and analytic function accuracy of numerical results by SCM is expectable. Some other CPs are solved by SCM. Numerical results suggest that there exist some delicate problems as nonexsistence of the solution. They also show the effectiveness of SCM with the multiple-precision arithmetic in the numerical simulation for delicate problems.
収録刊行物
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- Theoretical and Applied Mechanics Japan
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Theoretical and Applied Mechanics Japan 59 (0), 359-372, 2011
日本学術会議 「機械工学委員会・土木工学・建築学委員会合同IUTAM分科会」
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詳細情報 詳細情報について
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- CRID
- 1390282680186072064
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- NII論文ID
- 130004463787
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- ISSN
- 13494244
- 13480693
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- 本文言語コード
- en
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- データソース種別
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- JaLC
- CiNii Articles
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- 抄録ライセンスフラグ
- 使用不可