Coupling stabilized finite element methods with finite difference time integration for advection–diffusion–reaction problems

Stabilized FEM of streamline-diffusion type for advection-diffusion problems may exhibit local oscillations in crosswind direction(s). As a remedy, a shock-capturing variant of such stabilized schemes is considered as an additional consistent (but nonlinear) stabilization. We prove existence of disc

A procedure to derive stabilized space-time finite element methods for advective -diffusive problems is presented. The starting point is the stabilized balance equation for the transient case derived by On ˜ate [Comput. Methods Appl. Mech. Eng., 151, 233-267 (1998)] using a finite increment calculus

Numerical methods for advection-diffusion equations are discussed based on approximating advection using a high-resolution upwind finite difference method, and incorporating diffusion using a mixed finite element method. In this approach, advection is approximated explicitly and diffusion implicitly

The aim of thla paper is to present some monotone iterative schemes for computing the solution of a system of nonlinear difference equations which arme from a clam of nonlinear reactiondiffusion equations with time delays. The iterative schemes lead to computational algorithms as well as existence,