• Title of article

    The Effect of Fractional-Order Derivative for Pattern Formation‎ ‎of Brusselator‎ ‎Reaction–Diffusion Model Occurring in Chemical Reactions

  • Author/Authors

    Abbaszadeh ، Mostafa Department of Applied Mathematics - Faculty of Mathematics and Computer Sciences - Amirkabir University of Technology (Tehran Polytechnic) , Bagheri Salec ، Alireza Department of Mathematics - Faculty of Basic Scince - University of Qom Alghadir Blvd. , Abd Al-Khafaji ، Shurooq Kamel Department of Mathematics - Faculty of Basic Scince - University of Qom Alghadir Blvd.

  • From page
    243
  • To page
    269
  • Abstract
    ‎The space fractional PDEs (SFPDEs) have attracted a lot of attention‎. ‎Developing high-order and stable numerical algorithms for them is the main aim of most researchers‎. ‎This research work presents a fractional spectral collocation method to solve the fractional models with space fractional derivative which is defined based upon the Riesz derivative‎. ‎First‎, ‎a second-order difference formulation is used to approximate the time derivative‎. ‎The stability property and convergence order of the semi-discrete scheme are analyzed‎. ‎Then‎, ‎the fractional spectral collocation method based on the fractional Jacobi polynomials is employed to discrete the spatial variable‎. ‎In the numerical results‎, ‎the effect of fractional order is studied‎.
  • Keywords
    Fractional calculus , Brusselator model , Spectral method , Error estimate
  • Journal title
    Iranian Journal of Mathematical Chemistry
  • Journal title
    Iranian Journal of Mathematical Chemistry
  • Record number

    2757622