A semi-implicit method for two-phase fluid dynamics

We describe a finite volume semi-Lagrangian method for the numerical approximation of conservation laws arising in fluid-dynamic applications. A discrete conservation relation is satisfied by using conservative interpolation for the material (or property) being conserved. The method was developed wi

A multigrid semi-implicit ®nite difference method is presented to solve the two-dimensional shallow water equations which describe the behaviour of basin water under the in¯uence of the Coriolis force, atmospheric pressure gradients and tides. The semi-implicit ®nite difference method discretizes im

A one-dimensional scalar transport method which is appropriate for simulations over a wide range of Courant number is described. Von Neumann stability and matrix invertibility are guaranteed for all Courant numbers and the method has less diffusive and dispersive error than simpler implicit methods.

We propose a finite-difference algorithm for solving the time-dependent Ginzburg-Landau (TDGL) equation coupled to the appropriate Maxwell equation. The time derivatives are discretized using a second-order semi-implicit scheme which, for intermediate values of the Ginzburg-Landau parameter , allows