• Title of article

    A multiscale finite element method for the incompressible Navier–Stokes equations Original Research Article

  • Author/Authors

    A. Masud، نويسنده , , R.A. Khurram، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2005
  • Pages
    28
  • From page
    1750
  • To page
    1777
  • Abstract
    This paper presents a new multiscale finite element method for the incompressible Navier–Stokes equations. The proposed method arises from a decomposition of the velocity field into coarse/resolved scales and fine/unresolved scales. Modeling of the unresolved scales corrects the lack of stability of the standard Galerkin formulation and yields a method that possesses superior properties like that of the streamline upwind/Petrov–Galerkin (SUPG) method and the Galerkin/least-squares (GLS) method. The multiscale method allows arbitrary combinations of interpolation functions for the velocity and the pressure fields, specifically the equal order interpolations that are easy to implement but violate the celebrated Babuska–Brezzi condition. A significant feature of the present method is that the structure of the stabilization tensor τ appears naturally via the solution of the fine-scale problem. A family of 2-D elements comprising 3 and 6 node triangles and 4 and 9 node quadrilaterals has been developed. Convergence studies for the method on uniform, skewed as well as composite meshes are presented. Numerical simulations of the nonlinear steady and transient flow problems are shown that exhibit the good stability and accuracy properties of the method.
  • Keywords
    Navier–Stokes equations , Stabilized methods , HVM formulation , Arbitrary pressure–velocity interpolations , Multiscale finite elements
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Serial Year
    2005
  • Journal title
    Computer Methods in Applied Mechanics and Engineering
  • Record number

    893470