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 50 条
  • [31] A quasi-reversibility regularization method for the Cauchy problem of the Helmholtz equation
    Zhang, H. W.
    Qin, H. H.
    Wei, T.
    INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2011, 88 (04) : 839 - 850
  • [32] Adaptive Runge-Kutta regularization for a Cauchy problem of a modified Helmholtz equation
    Jday, Fadhel
    Omri, Haithem
    JOURNAL OF INVERSE AND ILL-POSED PROBLEMS, 2023, 31 (03): : 351 - 374
  • [33] On the Regularization Cauchy Problem for Matrix Factorizations of the Helmholtz Equation in a Multidimensional Bounded Domain
    Juraev, D. A.
    Gasimov, Y. S.
    AZERBAIJAN JOURNAL OF MATHEMATICS, 2022, 12 (01): : 142 - 161
  • [34] The Landweber Iterative Regularization Method for Solving the Cauchy Problem of the Modified Helmholtz Equation
    Chen, Yong-Gang
    Yang, Fan
    Ding, Qian
    SYMMETRY-BASEL, 2022, 14 (06):
  • [35] Non-Iterative Solution Methods for Cauchy Problems for Laplace and Helmholtz Equation in Annulus Domain
    Tadi, Mohsen
    Radenkovic, Miloje
    MATHEMATICS, 2021, 9 (03) : 1 - 14
  • [36] Boundary Problems for Helmholtz Equation and the Cauchy Problem for Dirac Operators
    Shlapunov, Alexander A.
    JOURNAL OF SIBERIAN FEDERAL UNIVERSITY-MATHEMATICS & PHYSICS, 2011, 4 (02): : 217 - 228
  • [37] Cauchy problem for the Helmholtz equation
    Yarmukhamedov, S
    Yarmukhamedov, I
    ILL-POSED AND NON-CLASSICAL PROBLEMS OF MATHEMATICAL PHYSICS AND ANALYSIS, PROCEEDINGS, 2003, : 143 - 172
  • [38] The Weighted Generalized Solution Tikhonov Regularization Method for Cauchy Problem for the Modified Helmholtz Equation
    You, Lei
    ADVANCES IN INFORMATION TECHNOLOGY AND EDUCATION, PT I, 2011, 201 : 343 - 350
  • [39] Method of Fundamental Solutions With an Optimal Regularization Technique for the Cauchy Problem of the Modified Helmholtz Equation
    Yuan, DaMing
    Cheng, XiaoLiang
    JOURNAL OF COMPUTATIONAL ANALYSIS AND APPLICATIONS, 2012, 14 (01) : 54 - 66
  • [40] An Energy Regularization for Cauchy Problems of Laplace Equation in Annulus Domain
    Han, Houde
    Ling, Leevan
    Takeuchi, Tomoya
    COMMUNICATIONS IN COMPUTATIONAL PHYSICS, 2011, 9 (04) : 878 - 896
12345