Application of Natural Transform Method to Fractional Pantograph Delay Differential Equations

被引:7
|
作者
Valizadeh, M. [1 ]
Mahmoudi, Y. [1 ]
Saei, F. Dastmalchi [1 ]
机构
[1] Islamic Azad Univ, Tabriz Branch, Dept Math, Tabriz, Iran
来源
JOURNAL OF MATHEMATICS | 2019年 / 2019卷
关键词
RUNGE-KUTTA METHODS; CONVERGENCE;
D O I
10.1155/2019/3913840
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this paper, a new method based on combination of the natural transform method (NTM), Adomian decomposition method (ADM), and coefficient perturbation method (CPM) which is called "perturbed decomposition natural transform method" (PDNTM) is implemented for solving fractional pantograph delay differential equations with nonconstant coefficients. The fractional derivative is regarded in Caputo sense. Numerical evaluations are included to demonstrate the validity and applicability of this technique.
引用
收藏
页数:9
相关论文
共 50 条
  • [31] Application of Touchard wavelet to simulate numerical solutions to fractional pantograph differential equations
    Safavi, Mostafa
    Khajehnasiri, Amirahmad
    Ezzati, Reza
    Rezabeyk, Saeedeh
    [J]. JOURNAL OF APPLIED ANALYSIS, 2024, 30 (01) : 103 - 116
  • [32] Pathwise Estimation of Stochastic Differential Equations with Unbounded Delay and Its Application to Stochastic Pantograph Equations
    Meng, Xuejing
    Hu, Shigeng
    Wu, Ping
    [J]. ACTA APPLICANDAE MATHEMATICAE, 2011, 113 (02) : 231 - 246
  • [33] Application of the fractional differential transform method to fractional-order integro-differential equations with nonlocal boundary conditions
    Nazari, D.
    Shahmorad, S.
    [J]. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2010, 234 (03) : 883 - 891
  • [34] A numerical method to solve fractional pantograph differential equations with residual error analysis
    Gokmen, Elcin
    Isik, Osman Rasit
    [J]. MATHEMATICAL SCIENCES, 2022, 16 (04) : 361 - 371
  • [35] An Approximate Method for Solving Fractional Delay Differential Equations
    Pandey R.K.
    Kumar N.
    Mohaptra R.N.
    [J]. International Journal of Applied and Computational Mathematics, 2017, 3 (2) : 1395 - 1405
  • [36] A numerical method to solve fractional pantograph differential equations with residual error analysis
    Elcin Gokmen
    Osman Raşit Isik
    [J]. Mathematical Sciences, 2022, 16 : 361 - 371
  • [37] Taylor wavelet method for fractional delay differential equations
    Toan, Phan Thanh
    Vo, Thieu N.
    Razzaghi, Mohsen
    [J]. ENGINEERING WITH COMPUTERS, 2021, 37 (01) : 231 - 240
  • [38] Legendre wavelet method for fractional delay differential equations
    Yuttanan, Boonrod
    Razzaghi, Mohsen
    Vo, Thieu N.
    [J]. APPLIED NUMERICAL MATHEMATICS, 2021, 168 : 127 - 142
  • [39] Taylor wavelet method for fractional delay differential equations
    Phan Thanh Toan
    Thieu N. Vo
    Mohsen Razzaghi
    [J]. Engineering with Computers, 2021, 37 : 231 - 240
  • [40] Pathwise Estimation of Stochastic Differential Equations with Unbounded Delay and Its Application to Stochastic Pantograph Equations
    Xuejing Meng
    Shigeng Hu
    Ping Wu
    [J]. Acta Applicandae Mathematicae, 2011, 113 : 231 - 246
12345