Implicit characteristic Galerkin method for convection–diffusion equations

The method of lines provides a ¯exible and general approach for solving time-dependent PDEs. However, the numerical solution of the resulting ODE system can present certain diculties depending on the method used. In particular, oscillations may appear in the solution when standard methods are applie

Some modi®ed AGE methods for the convection±diusion equation are developed in this paper. Firstly, there is a treatment on the convection term in the equation which is dierent from that in the AGE method by Evans and Abdullah (1985). Secondly, upwind-type schemes are used for the convection dominate

In this article we introduce a multilevel method in space and time for the approximation of a convectiondiffusion equation. The spatial discretization is of pseudo-spectral Fourier type, while the time discretization relies on the characteristics method. The approximate solution is obtained as the s

In this paper we analyze convergence of basic iterative Jacobi and Gauss-Seidel type methods for solving linear systems which result from finite element or finite volume discretization of convection-diffusion equations on unstructured meshes. In general the resulting stiffness matrices are neither M