Stabilizing coefficient matrix of inverse problem by using wavelet transformation

被引:0
|
作者
Enokizono, M [1 ]
Shimoji, H [1 ]
机构
[1] Oita Univ, Fac Engn, Dept Elect & Elect Engn, Oita 8701192, Japan
来源
NON-LINEAR ELECTROMAGNETIC SYSTEMS - ISEM '99 | 2000年
关键词
D O I
暂无
中图分类号
TM [电工技术]; TN [电子技术、通信技术];
学科分类号
0808 ; 0809 ;
摘要
In inverse problems, usually the coefficient matrix becomes unstable. It is therefore impossible to solve the problems with the standard methods. In this paper, we have investigated the stabilization of the coefficient matrix of a dynamic boundary element method by means of the wavelet transformation. The result shows that we can transform it into a well-posed one by using the wavelet transformation.
引用
收藏
页码:479 / 482
页数:4
相关论文
共 50 条
  • [41] A numerical method for an inverse source problem for parabolic equations and its application to a coefficient inverse problem
    Phuong Mai Nguyen
    Loc Hoang Nguyen
    JOURNAL OF INVERSE AND ILL-POSED PROBLEMS, 2020, 28 (03): : 323 - 339
  • [42] Inverse eigenvalue problem for Jacobi matrix
    Feng, Lichao
    Yan, Shaohong
    He, Yali
    Yang, Yanmei
    Li, Ping
    International Journal of Digital Content Technology and its Applications, 2012, 6 (16) : 395 - 402
  • [43] Stabilizing of an ill-posed inverse problem by using smoothing splines and hyperbolic heat equation
    Masood, Khalid
    Mustafa, M. T.
    INVERSE PROBLEMS IN SCIENCE AND ENGINEERING, 2008, 16 (02) : 233 - 247
  • [44] Power quality problem classification using wavelet transformation and artificial neural networks
    Kanitpanyacharoean, W
    Premrudeepreechacharn, S
    2004 IEEE PES POWER SYSTEMS CONFERENCE & EXPOSITION, VOLS 1 - 3, 2004, : 1496 - 1501
  • [45] Power quality problem classification using wavelet transformation and artificial neural networks
    Kanitpanyacharoean, W
    Premrudeepreechacharn, S
    TENCON 2004 - 2004 IEEE REGION 10 CONFERENCE, VOLS A-D, PROCEEDINGS: ANALOG AND DIGITAL TECHNIQUES IN ELECTRICAL ENGINEERING, 2004, : C252 - C255
  • [46] Solving inverse nodal problem with frozen argument by using second Chebyshev wavelet method
    Wang, Yu Ping
    Kiasary, Shahrbanoo Akbarpoor
    Yilmaz, Emrah
    APPLICATIONS OF MATHEMATICS, 2024, 69 (03) : 339 - 354
  • [47] EFFECTIVENESS OF INVERSE RICCATI TRANSFORMATION IN MATRIX CASE
    NELSON, P
    RAY, AK
    WING, GM
    JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 1978, 65 (01) : 201 - 210
  • [48] Wavelet based method for electromagnetic inverse scattering problem using extended Born approximation
    Yang, Y
    Basir, OA
    Liu, YX
    IGARSS 2003: IEEE INTERNATIONAL GEOSCIENCE AND REMOTE SENSING SYMPOSIUM, VOLS I - VII, PROCEEDINGS: LEARNING FROM EARTH'S SHAPES AND SIZES, 2003, : 4220 - 4222
  • [49] A NEW MATRIX FORMULA FOR INVERSE LAPLACE TRANSFORMATION
    CHEN, CF
    YATES, RE
    JOURNAL OF BASIC ENGINEERING, 1967, 89 (02): : 269 - &
  • [50] A NEW MATRIX FORMULA FOR INVERSE LAPLACE TRANSFORMATION
    CHEN, CF
    MECHANICAL ENGINEERING, 1967, 89 (01) : 56 - &
12345