NUMERICAL SIMULATION OF THE GENERALIZED BURGER’S-HUXLEY EQUATION VIA TWO MESHLESS METHODS

被引:2
|
作者
Ahmad I. [1 ]
Abdel-Khalek S. [2 ]
Alghamdi A.M. [3 ]
Inc M. [4 ,5 ]
机构
[1] Department of Mathematics, University of Swabi, Khyber Pakhtunkhwa, Swabi
[2] Department of Mathematics, College of Science, Taif University, Taif
[3] Department of Software Engineering, College of Computer Science and Engineering, University of Jeddah, Jeddah
[4] Firat University, Science Faculty, Department of Mathematics, Elazig
[5] Department of Medical Research, China Medical University, Taichung
来源
Thermal Science | 2022年 / 26卷 / Special Issue 1期
关键词
Generalized burger’s-huxley equation; Meshless differential quadrature method; Meshless method of line; Radial basis function;
D O I
10.2298/TSCI22S1463A
中图分类号
学科分类号
摘要
Numerical solution of the generalized Burger’s-Huxley equation is established utilizing two effective meshless methods namely: local differential quadrature method and global method of line. Both the proposed meshless methods used radial basis functions to discretize space derivatives which convert the given model equation system of ODE and then we have utilized the Euler method to get the required numerical solution. Numerical experiments are carried out to check the efficiency and accuracy of the suggested meshless methods. © 2022,Revista Fitotecnia Mexicana. All Rights Reserved.
引用
收藏
页码:S463 / S468
页数:5
相关论文
共 50 条
  • [31] A newly constructed numerical approximation and analysis of Generalized fractional Burger-Huxley equation using higher order method
    Akram, Tayyaba
    Iqbal, Azhar
    Kumam, Poom
    Sutthibutpong, Thana
    [J]. RESULTS IN PHYSICS, 2023, 54
  • [32] CAS Wavelet Picard Technique for Burger’s–Huxley and Burgers Equation
    Gilani K.
    Saeed U.
    [J]. International Journal of Applied and Computational Mathematics, 2018, 4 (5)
  • [33] Generalized solutions of the fractional Burger's equation
    Syam, Muhammed, I
    Abu Obayda, Dana
    Alshamsi, Wadima
    Al-Wahashi, Nawal
    Alshehhi, Muna
    [J]. RESULTS IN PHYSICS, 2019, 15
  • [34] A Meshless Method for the Numerical Solution of the Generalized Burgers Equation
    Sun, Fengxin
    Wang, Jufeng
    [J]. ADVANCES IN ENGINEERING DESIGN AND OPTIMIZATION II, PTS 1 AND 2, 2012, 102-102 : 275 - +
  • [35] Improved numerical solution of Burger's equation
    Chakrone, Omar
    Diyer, Okacha
    Sbibih, Driss
    [J]. BOLETIM SOCIEDADE PARANAENSE DE MATEMATICA, 2010, 28 (02): : 9 - 14
  • [36] NUMERICAL SIMULATION OF 3-D SOBOLEV EQUATION VIA LOCAL MESHLESS METHOD
    Ahmad, Imtiaz
    Ahsan, Muhammad
    Elamin, Abd Elmotaleb A. M. A.
    Abdel-Khalek, Sayed
    Inc, Mustafa
    [J]. THERMAL SCIENCE, 2022, 26 (Special Issue 1): : 457 - 462
  • [37] NUMERICAL SIMULATION OF 3-D SOBOLEV EQUATION VIA LOCAL MESHLESS METHOD
    Ahmad, Imtiaz
    Ahsan, Muhammad
    Elamin, Abd Elmotaleb A. M. A.
    Abdel-Khalek, Sayed
    Inc, Mustafa
    [J]. THERMAL SCIENCE, 2022, 26 : S457 - S462
  • [38] Modal Shifted Chebyshev Spectral Collocation Technique for Solving Burger’s–Fisher, Burger’s–Huxley and Two-dimensional Burger’s Equations
    Hammad D.A.
    [J]. International Journal of Applied and Computational Mathematics, 2024, 10 (1)
  • [39] Comparison of Some Numerical Methods for the Burgers-Huxley Equation
    Appadu, Appanah Rao
    Inan, Bilge
    Olatunji, Tijani Yusuf
    [J]. INTERNATIONAL CONFERENCE ON NUMERICAL ANALYSIS AND APPLIED MATHEMATICS ICNAAM 2019, 2020, 2293
  • [40] Numerical simulation of aneurysms with Finite Element and Meshless Methods
    Silva, J. L.
    Belinha, J.
    Neves, J. M. P. R.
    Vilaca, I. R. S. B. S.
    Natal Jorge, R. M.
    [J]. 2019 6TH IEEE PORTUGUESE MEETING IN BIOENGINEERING (ENBENG), 2019,
12345