An evolution Galerkin scheme for the shallow water magnetohydrodynamic equations in two space dimensions

In this paper we extend the linear transfer function analysis to the two-dimensional shallow water equations in A linear analysis of the shallow water equations in spherical coordinates for the Turkel-Zwas (T-Z) explicit large time-step scheme spherical coordinates for the Turkel-Zwas discretization

In this paper we consider a passive scalar transported in two-dimensional flow. The governing equation is that of the convection-diffusion-reaction equation. For purposes of computational efficiency, we apply an alternating-direction implicit scheme akin to that proposed by Polezhaev. Use of this im

We describe a locally one-dimensional (LOD) time integration scheme for the diffusion equation in two space dimensions: ut = u(uxx + uyy), based on the extended trapezoidal formula (ETF). The resulting LOD-ETF scheme is third order in time and is unconditionally stable. We describe the scheme for bo

This Note presents a new finite volume scheme for the Stokes equations on general non-structured meshes. A convergence result is presented, and an error estimate is given when the solution is regular enough.