Weakly Implicit Numerical Schemes for a Two-Fluid Model

In this paper two implicit numerical difference schemes for mixed problems for a delay diffusion model are proposed. Consistence, convergence and some properties of stability for these schemes are studied. Illustrative examples of numerical results are also included.

The nonlinear partial differential equations of atmospheric dynamics govern motion on two time scales, a fast one and a slow one. Only the slow-scale motions are relevant in predicting the evolution of large weather patterns. Implicit numerical methods are therefore attractive for weather prediction

## Abstract A numerical scheme is developed to study the stability of the linearized vorticity equations. The linear growth rates of Kelvin‐Helmholtz instabilities resulting from a velocity shear are calculated numerically. The theory of neutrally stable waves, in two dimensions, is extended to inc

Two algorithms are described [Ferris D. H. (fixed time-step method) and Gupta and Kumar (variable timestep method)] that solve a mathematical model for the study of the one-dimensional moving boundary problem with implicit boundary conditions. Landau's transformation is used, in order to work with a