Solving fractional integral equations by the Haar wavelet method

被引:111
|
作者
Lepik, Ue. [1 ]
机构
[1] Univ Tartu, Dept Appl Math, EE-50409 Tartu, Estonia
来源
APPLIED MATHEMATICS AND COMPUTATION | 2009年 / 214卷 / 02期
关键词
Fractional calculus; Haar wavelets; Integral equations; Fractional vibrations; NUMERICAL-SOLUTION; DYNAMICS;
D O I
10.1016/j.amc.2009.04.015
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
Haar wavelets for the solution of fractional integral equations are applied. Fractional Volterra and Fredholm integral equations are considered. The proposed method also is used for analysing fractional harmonic vibrations. The efficiency of the method is demonstrated by three numerical examples. (C) 2009 Elsevier Inc. All rights reserved.
引用
收藏
页码:468 / 478
页数:11
相关论文
共 50 条
  • [41] Regularization wavelet method for solving integral equations of the first kind
    Ling, J
    Li, YS
    [J]. ADVANCES IN COMPUTATIONAL MATHEMATICS, 1999, 202 : 339 - 352
  • [42] Wavelet Collocation Method for Solving Multiorder Fractional Differential Equations
    Heydari, M. H.
    Hooshmandasl, M. R.
    Ghaini, F. M. Maalek
    Mohammadi, F.
    [J]. JOURNAL OF APPLIED MATHEMATICS, 2012,
  • [43] VARIOUS WAVELET METHODS FOR SOLVING FRACTIONAL FREDHOLM-VOLTERRA INTEGRAL EQUATIONS
    Shi, Peng-Peng
    Li, Xiu
    Li, Xing
    [J]. INTEGRAL EQUATIONS, BOUNDARY VALUE PROBLEMS AND RELATED PROBLEMS: DEDICATED TO PROFESSOR CHIEN-KE LU ON THE OCCASION OF HIS 90TH BIRTHDAY, 2013, : 275 - 285
  • [44] Discretization algorithm for fractional order integral by Haar wavelet approximation
    Gao, Zhe
    Liao, Xiaozhong
    [J]. APPLIED MATHEMATICS AND COMPUTATION, 2011, 218 (05) : 1917 - 1926
  • [45] Neumann method for solving conformable fractional Volterra integral equations
    Ilie, Mousa
    Biazar, Jafar
    Ayati, Zainab
    [J]. COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS, 2020, 8 (01): : 54 - 68
  • [46] A Numerical Method for Fractional Pantograph Delay Integro-Differential Equations on Haar Wavelet
    Ahmad I.
    Amin R.
    Abdeljawad T.
    Shah K.
    [J]. International Journal of Applied and Computational Mathematics, 2021, 7 (2)
  • [47] A numerical method for fractional variable order pantograph differential equations based on Haar wavelet
    Alrabaiah, Hussam
    Ahmad, Israr
    Amin, Rohul
    Shah, Kamal
    [J]. ENGINEERING WITH COMPUTERS, 2022, 38 (03) : 2655 - 2668
  • [48] NUMERICAL SOLUTION OF NONLINEAR FRACTIONAL DIFFERENTIAL EQUATIONS USING HAAR WAVELET COLLOCATION METHOD
    Deshi, A. B.
    Gudodagi, G. A.
    [J]. FRACTALS-COMPLEX GEOMETRY PATTERNS AND SCALING IN NATURE AND SOCIETY, 2021, 29 (06)
  • [49] A numerical method for fractional variable order pantograph differential equations based on Haar wavelet
    Hussam Alrabaiah
    Israr Ahmad
    Rohul Amin
    Kamal Shah
    [J]. Engineering with Computers, 2022, 38 : 2655 - 2668
  • [50] Haar wavelet method for solution of distributed order time-fractional differential equations
    Amin, Rohul
    Alshahrani, B.
    Mahmoud, Mona
    Abdel-Aty, Abdel-Haleem
    Shah, Kamal
    Deebani, Wejdan
    [J]. ALEXANDRIA ENGINEERING JOURNAL, 2021, 60 (03) : 3295 - 3303
12345