• Title of article

    One-dimensional two-phase generalized Forchheimer flows of incompressible fluids

  • Author/Authors

    Hoang، نويسنده , , Luan T. and Ibragimov، نويسنده , , Akif and Kieu، نويسنده , , Thinh T.، نويسنده ,

  • Issue Information
    دوهفته نامه با شماره پیاپی سال 2013
  • Pages
    18
  • From page
    921
  • To page
    938
  • Abstract
    We derive a nonlinear system of parabolic equations to describe the one-dimensional two-phase generalized Forchheimer flows of incompressible, immiscible fluids in porous media, with the presence of capillary forces. Under relevant constraints on relative permeabilities and capillary pressure, non-constant steady state solutions are found and classified into sixteen types according to their monotonicity and asymptotic behavior. For a steady state whose saturation can never attain either value 0 or 1, we prove that it is stable with respect to a certain weight. This weight is a function comprised of the steady state, relative permeabilities and capillary pressure. The proof is based on specific properties of the steady state, weighted maximum principle and Bernstein’s estimate.
  • Keywords
    Two-phase ows , Forchheimer , Porous media , stability
  • Journal title
    Journal of Mathematical Analysis and Applications
  • Serial Year
    2013
  • Journal title
    Journal of Mathematical Analysis and Applications
  • Record number

    1563496