A NEW RECURSIVE SCHEME FOR SOLVING THE GENERAL DISPERSIVE FRACTIONAL PARTIAL DIFFERENTIAL EQUATION

被引:0
|
作者
Mennouni, Abdelaziz [1 ]
Bougoffa, Lazhar [2 ]
机构
[1] Univ Batna 2, Dept Math, LTM, Batna 05078, Algeria
[2] Imam Mohammad Ibn Saud Islamic Univ, Fac Sci, Dept Math, POB 90950, Riyadh 11623, Saudi Arabia
来源
ROMANIAN REPORTS IN PHYSICS | 2023年 / 75卷 / 02期
关键词
Fractional differential equations; nonlinear dispersive equation; Adomian decomposition method; BOUNDARY-VALUE-PROBLEMS; ADOMIAN DECOMPOSITION METHOD; INTEGRAL-EQUATIONS; NUMERICAL-METHODS; 3RD-ORDER;
D O I
暂无
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
The purpose of this research is to use an intriguing variant of the Adomian decomposition method to resolve an initial-value problem for the general dispersive fractional partial differential equation. By combining the Adomian decomposition method with a stunning recurrence formula and using the solutions of the wellestablished generalized Abel equation, a novel recursive strategy is developed. It has been demonstrated that our approach may be advantageous for computing the components vn, n = 1, 2, ... in a formula that is easily computed.
引用
收藏
页数:15
相关论文
共 50 条
  • [31] A new numerical method for solving semilinear fractional differential equation
    Yufen Wei
    Ying Guo
    Yu Li
    Journal of Applied Mathematics and Computing, 2022, 68 : 1289 - 1311
  • [32] A new numerical method for solving semilinear fractional differential equation
    Wei, Yufen
    Guo, Ying
    Li, Yu
    JOURNAL OF APPLIED MATHEMATICS AND COMPUTING, 2022, 68 (02) : 1289 - 1311
  • [33] An approximate method for solving fractional partial differential equation by using an embedding process
    Ziaei, E.
    Farahi, M. H.
    Ahmadian, A.
    Senu, N.
    Salahshour, S.
    3RD INTERNATIONAL CONFERENCE ON MATHEMATICAL SCIENCES AND STATISTICS, 2018, 1132
  • [34] Numerical study of fractional model of multi-dimensional dispersive partial differential equation
    Verma, Vijay
    Prakash, Amit
    Kumar, Devendra
    Singh, Jagdev
    JOURNAL OF OCEAN ENGINEERING AND SCIENCE, 2019, 4 (04) : 338 - 351
  • [35] Block pulse operational matrix method for solving fractional partial differential equation
    Yi, Mingxu
    Huang, Jun
    Wei, Jinxia
    APPLIED MATHEMATICS AND COMPUTATION, 2013, 221 : 121 - 131
  • [36] Fibonacci wavelets-based numerical method for solving fractional order (1+1)-dimensional dispersive partial differential equation
    Kumbinarasaiah, S.
    Mulimani, Mallanagoud
    INTERNATIONAL JOURNAL OF DYNAMICS AND CONTROL, 2023, 11 (05) : 2232 - 2255
  • [37] A NEW NUMERICAL SCHEME FOR SOLVING THE TWO DIMENSIONAL FRACTIONAL DIFFUSION EQUATION
    Koc, Dilara Altan
    Gulsu, Mustafa
    JOURNAL OF APPLIED MATHEMATICS AND COMPUTATIONAL MECHANICS, 2021, 20 (02) : 5 - 16
  • [38] A new fractional sub-equation method for fractional partial differential equations
    Wen, Chuanbao
    Zheng, Bin
    WSEAS Transactions on Mathematics, 2013, 12 (05) : 564 - 571
  • [39] From stochastic processes to numerical methods: A new scheme for solving reaction subdiffusion fractional partial differential equations
    Angstmann, C. N.
    Donnelly, I. C.
    Henry, B. I.
    Jacobs, B. A.
    Langlands, T. A. M.
    Nichols, J. A.
    JOURNAL OF COMPUTATIONAL PHYSICS, 2016, 307 : 508 - 534
  • [40] Numerical Methods for Solving a Riesz Space Partial Fractional Differential Equation: Applied to Fractional Kinetic Equations
    Lateef Saeed I.
    Javidi M.
    Saedshoar Heris M.
    International Journal of Applied and Computational Mathematics, 2024, 10 (1)
12345