• Title of article

    A new Bernstein-reproducing kernel method for solving forced Duffing equations with integral boundary conditions

  • Author/Authors

    Ghasemi ، Azam Department of Applied Mathematics - Faculty of Mathematical Sciences - University of Kashan , Saadatmandi ، Abbas Department of Applied Mathematics - Faculty of Mathematical Sciences - University of Kashan

  • From page
    329
  • To page
    337
  • Abstract
    In the current work, a new reproducing kernel method (RKM) for solving nonlinear forced Duffing equations with integral boundary conditions is developed. The proposed collocation technique is based on the idea of RKM and the orthonormal Bernstein polynomials (OBPs) approximation together with the quasi-linearization method. In our method, contrary to the classical RKM, there is no need to use the Gram-Schmidt orthogonalization procedure and only a few nodes are used to obtain efficient numerical results. Three numerical examples are included to show the applicability and efficiency of the suggested method. Also, the obtained numerical results are compared with some results in the literature.
  • Keywords
    Duffing equations , Integral boundary conditions , Reproducing kernel method , Bernstein polynomials , quasi , linearization method
  • Journal title
    Computational Methods for Differential Equations
  • Journal title
    Computational Methods for Differential Equations
  • Record number

    2777681