An alternating direction implicit method for solving the shallow water equations

THIS PAPER IS DEDICATED TO PROFESSOR A. R. MITCHELL ON THE EVENT OF HIS 75TH BIRTHDAY ## 2. PHYSICAL BACKGROUND AND MOTIVATION An alternating direction implicit (ADI) scheme is introduced which ### 2.1. Problem Formulation is capable of solving a general parabolic equation in two space dimension

When the s-stage fully implicit Runge}Kutta (RK) method is used to solve a system of n ordinary di!erential equations (ODE) the resulting algebraic system has a dimension ns. Its solution by Gauss elimination is expensive and requires 2sn/3 operations. In this paper we present an e$cient algorithm,

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

The gasdynamic equations are solved by using an implicit Lagrangian algorithm in one and two dimensions. The evolution equation of energy is replaced by the algebraic isentropic condition for each Lagrangian computational cell. The algorithm is essentialiy developed for isentropic flows but is also