Laminar unsteady flows of Bingham fluids:: a numerical strategy and some benchmark results

We propose a numerical method to calculate unsteady flows of Bingham fluids without any regularization of the constitutive law. The strategy is based on the combination of the characteristic/Galerkin method to cope with convection and of the Fortin-Glowinsky decomposition/coordination method to deal with the non-differentiable and nonlinear terms that derive from the constitutive law. For the spatial discretization, we use low order finite elements, with, in particular, linear discretization for the velocity and the pressure, stabilized by a Brezzi-Pitkaranta perturbation term. We illustrate this numerical strategy through two well-known problems, namely the hydrodynamic benchmark of the lid-driven cavity and the natural convection benchmark of the differentially heated cavity. For both, we assess our numerical scheme against previous publications, for Newtonian flow or in the creeping flow regime, and propose novel results in the case of Bingham fluid non-creeping flows. (C) 2003 Elsevier Science B.V. All rights reserved.