Application of the semi-Lagrangian method to a multilevel spectral primitive-equations model

An efficient and accurate numerical method is implemented for solving the time-dependent Ginzburg-Landau equation and the Cahn-Hilliard equation. The time variable is discretized by using semi-implicit schemes which allow much larger time step sizes than explicit schemes; the space variables are dis

## Abstract As part of an attempt to implement more efficient integration procedures, a semi‐implicit time differencing procedure has been evaluated within the context of a southern hemisphere, six‐level primitive equations model. The model employs the flux form of the primitive equations and inclu

An application of the spectral multidomain method to the twodimensional, time-dependent, incompressible Navier-Stokes equations is presented. The governing equations are discretized on a nonstaggered, stretched mesh with a mixed finite difference/Chebyshev method and are integrated by a time-splitti

The multiple signal classitication method (MUSIC) for spectral estimation is applied to data generated for three cases of a simple model system, based on five harmonic frequencies. The results are compared to the exact spectrum as well as to the results obtained with the Fourier transform method. Th

Semi-Lagrangian methods are now perhaps the most widely researched algorithms in connection with atmospheric flow simulation codes. In order to investigate their applicability to hydraulic problems, cubic Hermite polynomials are used as the interpolant technique. The main advantage of such an approa