A stabilized Galerkin method for convection dominated diffusion problems

The spectral Lagrange-Galerkin method is a numerical technique for time-dependent convection-diffusion problems based on combining a Lagrangian formulation of the equations with the spectral method. The resulting scheme can be shown to be unconditionally stable for linear advection-diffusion equatio

In this paper, a new Petrov-Galerkin formulation for solving convection-dominated problems is presented. The method developed achieves the quasi-optimal convergence rates when the solution is regular and provides the necessary stability to avoid spurious oscillations when strong gradients are presen

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