• Title of article

    Proper intrinsic scales for a-posteriori multiscale error estimation Original Research Article

  • Author/Authors

    Guillermo Hauke، نويسنده , , Mohamed H. Doweidar، نويسنده , , Mario Miana، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2006
  • Pages
    19
  • From page
    3983
  • To page
    4001
  • Abstract
    Recently the multiscale a-posteriori error estimator has been introduced, showing excellent robustness for fluid mechanics problems. In this paper, a theoretical analysis for element edge exact solutions is conducted, in which case, the error constant is the norm of a Green’s function or a residual-free bubble. This finds application when the solution is computed with a stabilized method. One of the features of the technique is that it gives the proper scales for a-posteriori error estimation in any norm of interest, such as the L2, H1, energy and L∞ norms. For fluid transport problems it is shown that the constant for predicting the error in the H1 seminorm is unbounded as the element Peclet number tends to infinity, making Lp norms more suitable for this type of problems. Furthermore, it is shown that the flow intrinsic time scale parameter represents the L1 norm of the error as a function of the L∞ norm of the residual. When these scales are employed for one-dimensional nodally-exact solutions, piecewise linear finite element spaces and piecewise constant residuals, the multiscale error estimator is shown to be exact.
  • Keywords
    Stabilized methods , Fluid mechanics , Advection–diffusion–reaction equation , Variational multiscale method , A-posteriori error estimation
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Serial Year
    2006
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Record number

    893577