Taylor wavelet method for fractional delay differential equations

被引:0
|
作者
Phan Thanh Toan
Thieu N. Vo
Mohsen Razzaghi
机构
[1] Ton Duc Thang University,Fractional Calculus, Optimization and Algebra Research Group, Faculty of Mathematics and Statistics
[2] Mississippi State University,Department of Mathematics and Statistics
来源
Engineering with Computers | 2021年 / 37卷
关键词
Taylor wavelet; Delay differential equation; Numerical solution; Fractional integral; Collocation method;
D O I
暂无
中图分类号
学科分类号
摘要
We present a new numerical method for solving fractional delay differential equations. The method is based on Taylor wavelets. We establish an exact formula to determine the Riemann–Liouville fractional integral of the Taylor wavelets. The exact formula is then applied to reduce the problem of solving a fractional delay differential equation to the problem of solving a system of algebraic equations. Several numerical examples are presented to show the applicability and the effectiveness of this method.
引用
收藏
页码:231 / 240
页数:9
相关论文
共 50 条
  • [1] 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
  • [2] Legendre wavelet method for fractional delay differential equations
    Yuttanan, Boonrod
    Razzaghi, Mohsen
    Vo, Thieu N.
    [J]. APPLIED NUMERICAL MATHEMATICS, 2021, 168 : 127 - 142
  • [3] A fractional-order generalized Taylor wavelet method for nonlinear fractional delay and nonlinear fractional pantograph differential equations
    Yuttanan, Boonrod
    Razzaghi, Mohsen
    Vo, Thieu N.
    [J]. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2021, 44 (05) : 4156 - 4175
  • [4] Numerical solutions of fractional delay differential equations using Chebyshev wavelet method
    Umar Farooq
    Hassan Khan
    Dumitru Baleanu
    Muhammad Arif
    [J]. Computational and Applied Mathematics, 2019, 38
  • [5] Numerical solutions of fractional delay differential equations using Chebyshev wavelet method
    Farooq, Umar
    Khan, Hassan
    Baleanu, Dumitru
    Arif, Muhammad
    [J]. COMPUTATIONAL & APPLIED MATHEMATICS, 2019, 38 (04):
  • [6] 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)
  • [7] MODIFIED LAGUERRE WAVELET BASED GALERKIN METHOD FOR FRACTIONAL AND FRACTIONAL-ORDER DELAY DIFFERENTIAL EQUATIONS
    Secer, Aydin
    Ozdemir, Neslihan
    [J]. THERMAL SCIENCE, 2019, 23 : S13 - S21
  • [8] On the applicability of Genocchi wavelet method for different kinds of fractional-order differential equations with delay
    Dehestani, Haniye
    Ordokhani, Yadollah
    Razzaghi, Mohsen
    [J]. NUMERICAL LINEAR ALGEBRA WITH APPLICATIONS, 2019, 26 (05)
  • [9] Hermite Wavelet Method for Nonlinear Fractional Differential Equations
    Dincel, Arzu Turan
    Polat, Sadiye Nergis Tural
    Sahin, Pelin
    [J]. FRACTAL AND FRACTIONAL, 2023, 7 (05)
  • [10] The Legendre wavelet method for solving fractional differential equations
    Rehman, Mujeeb Ur
    Khan, Rahmat Ali
    [J]. COMMUNICATIONS IN NONLINEAR SCIENCE AND NUMERICAL SIMULATION, 2011, 16 (11) : 4163 - 4173
12345