On convergence of the method of fundamental solutions for solving the Dirichlet problem of Poisson’s equation

被引:0
作者
Xin Li
机构
[1] University of Nevada,Department of Mathematical Sciences
[2] Las Vegas,undefined
来源
Advances in Computational Mathematics | 2005年 / 23卷
关键词
method of fundamental solutions; Poisson’s equation;
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摘要
In this paper the convergence of using the method of fundamental solutions for solving the boundary value problem of Laplace’s equation in R2 is established, where the boundaries of the domain and fictitious domain are assumed to be concentric circles. Fourier series is then used to find the particular solutions of Poisson’s equation, which the derivatives of particular solutions are estimated under the L2 norm. The convergent order of solving the Dirichlet problem of Poisson’s equation by the method of particular solution and method of fundamental solution is derived.
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页码:265 / 277
页数:12
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  • [1] Aleksidze M.A.(1966)On approximate solutions of a certain mixed boundary value problem in the theory of harmonic functions Diff. Equations 2 515-518
  • [2] Chen C.S.(1995)The method of fundamental solutions for nonlinear thermal explosion Comm. Numer. Methods Engrg. 11 675-681
  • [3] Fairweather G.(1998)The method of fundamental solutions for elliptic boundary value problems Adv. Comput. Math. 9 69-95
  • [4] Karageorghis A.(1981)A constructive approximation theorem for the oblique derivative problem in potential theory Math. Methods Appl. Sci. 3 104-114
  • [5] Freeden W.(1995)The method of fundamental solutions for Poisson’s equation Engrg. Anal. Boundary Elem. 16 205-213
  • [6] Kersten H.(1989)The method of fundamental solutions for the solution of nonlinear plane potential problems IMA J. Numer. Anal. 9 231-242
  • [7] Golberg M.A.(1989)A mathematical study of the charge simulation method II J. Fac. Sci. Univ. Tokyo, Sect. 1A Math. 36 135-162
  • [8] Karageorghis A.(1990)Asymptotic error analysis of the charge simulation method in a Jordan region with an analytic boundary J. Fac. Sci. Univ. Tokyo, Sect. 1A Math. 37 635-657
  • [9] Fairweather G.(1994)Charge simulation method using exterior mapping functions Japan J. Industr. Appl. Math. 11 47-61
  • [10] Katsurada M.(1988)A mathematical study of the charge simulation method I J. Fac. Sci. Univ. Tokyo, Sect. 1A Math. 35 507-518
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