In order to numerically solve the interior and the exterior Dirichlet problems for the Laplacian operator, we present here a method which consists in inverting, on a finite element space, a non-singular integral operator. This operator is a geometrical perturbation of the Steklov operator, and we precisely define the relation between the geometrical perturbation and the dimension of the finite element space, in order to obtain a stable and convergent scheme. Furthermore, this numerical scheme does not give rise to any singular integral. The scheme can also be considered as a special quadrature formula method for the standard piecewise linear Galerkin approximation of the weakly singular single layer potential, the special quadrature formula being defined by the introduction of a neighbouring curve. In the present paper, we prove stability and we give error estimates of our numerical scheme when the Laplace problem is set on a disk. We will extend our results to any domains by using compact perturbation arguments, in a second paper. Copyright 2001 John Wiley & Sons, Ltd. [References: 21]
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机译:为了从数值上解决拉普拉斯算子的内部和外部Dirichlet问题,我们在这里提出一种方法,该方法包括在有限元空间上对非奇异积分算子进行求逆。该算子是Steklov算子的几何扰动,我们精确地定义了几何扰动与有限元空间维数之间的关系,以获得稳定且收敛的方案。此外,该数值方案不会产生任何奇异积分。对于弱奇异单层电势的标准分段线性Galerkin逼近,该方案也可以视为一种特殊的正交公式方法,该特殊的正交公式是通过引入相邻曲线来定义的。在本文中,我们证明了稳定性,并给出了在磁盘上放置拉普拉斯问题时数值方案的误差估计。在第二篇论文中,我们将通过使用紧凑的扰动参数将结果扩展到任何领域。版权所有2001 John Wiley&Sons,Ltd. [参考文献:21]
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