Response Function Method for Solving Dirichlet Problems. : III. The Case of a Parallelepiped
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概要
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To solve a Dirichlet problem of the Laplace equation, the response function method is applied to the interior of a rectangular parallelepiped. The expression for the response functions which generate a solution is given by a two-dimensional array. Hence, they can be obtained by applying the one-dimensional complex FFT algorithm two times. Before applying FFT, the series to be transformed must be modified as in the two-dimensional case. This method is suitable for finding accurate solutions within a restricted region in a medium, and for computing rapidly many solutions for different boundary values.
- 社団法人応用物理学会の論文
- 1979-12-05
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