Two-level finite element discretization of viscoelastic fluid flow

It is known that for the numerical approximation of Oldroyd's B model for viscoelastic ¯uid ¯ows some upwinding is needed for the convection of the extra-stress tensor. In this paper we make the numerical analysis of such an approximation with upwinding by the method of characteristics in a ®nite el

We present a theoretical study of a creeping, steady-state, isothermal flow of a viscoelastic fluid obeying an Oldroyd-type constitutive law with slip boundary condition. The slip boundary condition is appropriate for problems that involve free boundaries and other examples where the usual no-slip c

We consider a system with three unknowns in a two-dimensional bounded domain which models the ow of a grade-two non-Newtonian uid. We propose to compute an approximation of the solution of this problem in two steps: addition of a regularization term, ÿnite element discretization of the regularized p