• Title of article

    Bad behavior of Godunov mixed methods for strongly anisotropic advection–dispersion equations

  • Author/Authors

    Mazzia، نويسنده , , Annamaria and Manzini، نويسنده , , Gianmarco and Putti، نويسنده , , Mario، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    17
  • From page
    8410
  • To page
    8426
  • Abstract
    We study the performance of Godunov mixed methods, which combine a mixed-hybrid finite element solver and a Godunov-like shock-capturing solver, for the numerical treatment of the advection–dispersion equation with strong anisotropic tensor coefficients. It turns out that a mesh locking phenomenon may cause ill-conditioning and reduce the accuracy of the numerical approximation especially on coarse meshes. This problem may be partially alleviated by substituting the mixed-hybrid finite element solver used in the discretization of the dispersive (diffusive) term with a linear Galerkin finite element solver, which does not display such a strong ill conditioning. To illustrate the different mechanisms that come into play, we investigate the spectral properties of such numerical discretizations when applied to a strongly anisotropic diffusive term on a small regular mesh. A thorough comparison of the stiffness matrix eigenvalues reveals that the accuracy loss of the Godunov mixed method is a structural feature of the mixed-hybrid method. In fact, the varied response of the two methods is due to the different way the smallest and largest eigenvalues of the dispersion (diffusion) tensor influence the diagonal and off-diagonal terms of the final stiffness matrix. One and two dimensional test cases support our findings.
  • Keywords
    Time-splitting , Advection–dispersion equation , Anisotropy , Mesh locking , finite volume , Mixed hybrid finite element
  • Journal title
    Journal of Computational Physics
  • Serial Year
    2011
  • Journal title
    Journal of Computational Physics
  • Record number

    1483925