Neumann method for solving conformable fractional Volterra integral equations

被引:5
|
作者
Ilie, Mousa [1 ]
Biazar, Jafar [2 ]
Ayati, Zainab [3 ]
机构
[1] Islamic Azad Univ, Rasht Branch, Dept Math, Rasht, Iran
[2] Univ Guilan, Fac Math Sci, Dept Appl Math, POB 41335-1914, Guilan, Rasht, Iran
[3] Univ Guilan, Fac Technol & Engn, Dept Engn Sci, Rudsar Vajargah 4489163157, Iran
来源
COMPUTATIONAL METHODS FOR DIFFERENTIAL EQUATIONS | 2020年 / 8卷 / 01期
关键词
Volterra integral equations; Conformable fractional derivative; Neumann method; Existence; uniqueness; sufficient condition of convergence; KLEIN-GORDON EQUATIONS; CALCULUS;
D O I
10.22034/cmde.2019.9498
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This paper deals with the solution of a class of Volterra integral equations in the sense of the conformable fractional derivative. For this goal, the well-organized Neumann method is developed and some theorems related to existence, uniqueness, and sufficient condition of convergence are presented. Some illustrative examples are provided to demonstrate the efficiency of the method in solving conformable fractional Volterra integral equations.
引用
收藏
页码:54 / 68
页数:15
相关论文
共 50 条
  • [31] IMPROVEMENTS IN A METHOD FOR SOLVING FRACTIONAL INTEGRAL EQUATIONS WITH SOME LINKS WITH FRACTIONAL DIFFERENTIAL EQUATIONS
    Cao Labora, Daniel
    Rodriguez-Lopez, Rosana
    FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2018, 21 (01) : 174 - 189
  • [32] The first integral method applied to the Bogoyavlenskii equations by means of conformable fractional derivative
    Mostafa Eslami
    Farid Samsami Khodadad
    Fakhroddin Nazari
    Hadi Rezazadeh
    Optical and Quantum Electronics, 2017, 49
  • [33] A new recursive formulation of the Tau method for solving linear Abel–Volterra integral equations and its application to fractional differential equations
    Y. Talaei
    S. Shahmorad
    P. Mokhtary
    Calcolo, 2019, 56
  • [34] Operational matrix method for solving fractional weakly singular 2D partial Volterra integral equations
    Zamanpour, I.
    Ezzat, R.
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2023, 419
  • [35] A fractional version of the recursive Tau method for solving a general class of Abel-Volterra integral equations systems
    Talaei, Younes
    Shahmorad, Sedaghat
    Mokhtary, Payam
    Faghih, Amin
    FRACTIONAL CALCULUS AND APPLIED ANALYSIS, 2022, 25 (04) : 1553 - 1584
  • [36] A computational approach for solving fractional Volterra integral equations based on two-dimensional Haar wavelet method
    Abdollahi, Zohreh
    Moghadam, M. Mohseni
    Saeedi, H.
    Ebadi, M. J.
    INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2022, 99 (07) : 1488 - 1504
  • [37] A fractional version of the recursive Tau method for solving a general class of Abel-Volterra integral equations systems
    Younes Talaei
    Sedaghat Shahmorad
    Payam Mokhtary
    Amin Faghih
    Fractional Calculus and Applied Analysis, 2022, 25 : 1553 - 1584
  • [38] The first integral method applied to the Bogoyavlenskii equations by means of conformable fractional derivative
    Eslami, Mostafa
    Khodadad, Farid Samsami
    Nazari, Fakhroddin
    Rezazadeh, Hadi
    OPTICAL AND QUANTUM ELECTRONICS, 2017, 49 (12)
  • [39] A computational method for solving a class of two dimensional Volterra integral equations
    Berenguer, M. I.
    Gamez, D.
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2017, 318 : 403 - 410
  • [40] Modified Homotopy Perturbation Method for Solving the System of Volterra Integral Equations
    Saberi-Nadjafi, Jafar
    Tamamgar, Mohamadreza
    INTERNATIONAL JOURNAL OF NONLINEAR SCIENCES AND NUMERICAL SIMULATION, 2008, 9 (04) : 409 - 413
12345