Two regularization methods for the Cauchy problems of the Helmholtz equation

被引:41
作者
Qin, H. H. [1 ]
Wei, T. [1 ]
机构
[1] Lanzhou Univ, Sch Math & Stat, Lanzhou 730000, Peoples R China
来源
APPLIED MATHEMATICAL MODELLING | 2010年 / 34卷 / 04期
关键词
Cauchy problems; Helmholtz equation; Two regularization methods; Convergence estimates; BOUNDARY KNOT METHOD; FUNDAMENTAL-SOLUTIONS; HEAT-EQUATION;
D O I
10.1016/j.apm.2009.07.008
中图分类号
T [工业技术];
学科分类号
08 ;
摘要
In this paper, the Cauchy problems for the Helmholtz equation are investigated. We propose two regularization methods to solve them. Convergence estimates are presented under an a-priori bounded assumption for the exact solution. Finally, the numerical examples show that the proposed numerical methods work effectively. (C) 2009 Elsevier Inc. All rights reserved.
引用
收藏
页码:947 / 967
页数:21
相关论文
共 28 条
[11]  
Isakov V., 1998, APPL MATH SCI, V127
[12]   The plane wave method for inverse problems associated with Helmholtz-type equations [J].
Jin, Bangti ;
Marin, Liviu .
ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2008, 32 (03) :223-240
[13]   Boundary knot method for the Cauchy problem associated with the inhomogeneous Helmholtz equation [J].
Jin, BT ;
Zheng, Y .
ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2005, 29 (10) :925-935
[14]   Boundary knot method for some inverse problems associated with the Helmholtz equation [J].
Jin, BT ;
Zheng, Y .
INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING, 2005, 62 (12) :1636-1651
[15]  
Kirsch A., 1996, APPL MATH SCI, DOI [10.1007/978-1-4612-5338-9, DOI 10.1007/978-1-4612-5338-9]
[16]   A meshless method for the numerical solution of the Cauchy problem associated with three-dimensional Helmholtz-type equations [J].
Marin, L .
APPLIED MATHEMATICS AND COMPUTATION, 2005, 165 (02) :355-374
[17]   The method of fundamental solutions for the Cauchy problem associated with two-dimensional Helmholtz-type equations [J].
Marin, L ;
Lesnic, D .
COMPUTERS & STRUCTURES, 2005, 83 (4-5) :267-278
[18]   BEM solution for the Cauchy problem associated with Helmholtz-type equations by the Landweber method [J].
Marin, L ;
Elliott, L ;
Heggs, PJ ;
Ingham, DB ;
Lesnic, D ;
Wen, X .
ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS, 2004, 28 (09) :1025-1034
[19]   Comparison of regularization methods for solving the Cauchy problem associated with the Helmholtz equation [J].
Marin, L ;
Elliott, L ;
Heggs, PJ ;
Ingham, DB ;
Lesnic, D ;
Wen, X .
INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING, 2004, 60 (11) :1933-1947
[20]   Conjugate gradient-boundary element solution to the Cauchy problem for Helmholtz-type equations [J].
Marin, L ;
Elliott, L ;
Heggs, PJ ;
Ingham, DB ;
Lesnic, D ;
Wen, X .
COMPUTATIONAL MECHANICS, 2003, 31 (3-4) :367-377
123