A Forward-Backward Time Integration Scheme to Treat Internal Gravity Waves

W. Y. Sun Geophysicai Fluid Dynamics Program, Princeton University, Princeton. NJ 08540

Search for other papers by W. Y. Sun in
Current site
Google Scholar
PubMed
Close
Restricted access

Abstract

A forward time difference in the momentum equations and a backward time difference in the thermodynamic equation is conditionally stable according to von Neumann’s stability analysis of linearized anelastic equations. In an anelastic-hydrostatic system, this scheme is also conditionally stable in a staggered coordinate, but it is unstable for a two-grid-interval wave in a non-staggered coordinate. This unstable two-grid-interval wave can he avoided by applying the trapezoidal rule to calculate the pressure field from the hydrostatic equation.

Abstract

A forward time difference in the momentum equations and a backward time difference in the thermodynamic equation is conditionally stable according to von Neumann’s stability analysis of linearized anelastic equations. In an anelastic-hydrostatic system, this scheme is also conditionally stable in a staggered coordinate, but it is unstable for a two-grid-interval wave in a non-staggered coordinate. This unstable two-grid-interval wave can he avoided by applying the trapezoidal rule to calculate the pressure field from the hydrostatic equation.

Save