A Fully Discrete Fast Fourier–Galerkin Method Solving a Boundary Integral Equation for the Biharmonic Equation

被引:0
作者
Ying Jiang
Bo Wang
Yuesheng Xu
机构
[1] Sun Yat-sen University,Guangdong Province Key Laboratory of Computational Science, School of Mathematics and Computational Science
[2] University of Electronic Science and Technology of China,School of Mathematical Sciences
[3] Old Dominion University,Department of Mathematics
来源
Journal of Scientific Computing | 2018年 / 76卷
关键词
Biharmonic equation; Boundary integral equation; Fast Fourier–Galerkin method; 31A30; 74S25; 45E05;
D O I
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中图分类号
学科分类号
摘要
We develop a fully discrete fast Fourier–Galerkin method for solving a boundary integral equation for the biharmonic equation by introducing a quadrature scheme for computing the integrals of non-smooth functions that appear in the Fourier–Galerkin method. A key step in developing the fully discrete fast Fourier–Galerkin method is the design of a fast quadrature scheme for computing the Fourier coefficients of the non-smooth kernel function involved in the boundary integral equation. We prove that with the proposed quadrature algorithm, the total number of additions and multiplications used in generating the compressed coefficient matrix for the proposed method is quasi-linear (linear with a logarithmic factor), and the resulting numerical solution of the equation preserves the optimal convergence order. Numerical examples are presented to demonstrate the approximation accuracy and computational efficiency of the proposed method.
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页码:1594 / 1632
页数:38
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