Comparison of spectral methods for flows on spheres for flows on spheres

An accurate Fourier -Chebyshev spectral collocation method has been developed for simulating flow past prolate spheroids. The incompressible Navier-Stokes equations are transformed to the prolate spheroidal co-ordinate system and discretized on an orthogonal body fitted mesh. The infinite flow domai

A full spectral model for the stream-function-vorticity formulation is developed for the solution of unsteady flow past a rigid sphere. To convert the governing partial differential equations to discrete form, Chebyshev and Legendre polynomials are employed to expand the vorticity and stream functio

In this paper we describe the foundation of a spectral/hp method suitable for simulating viscous compressible flows with shocks on standard unstructured meshes. It is based on a discontinuous Galerkin formulation for the hyperbolic contributions combined with a mixed Galerkin formulation for the dif

## Abstract A unified approach to the normal mode instability study of steady solutions to the vorticity equation governing the motion of an ideal incompressible fluid on a rotating sphere is considered. The four types of well‐known solutions are considered, namely, the Legendre‐polynomial (LP) flo

any potential climate model should perform well on these tests. In this paper we will present the results from these The spectral element method is implemented for the shallow water equations in spherical geometry and its performance is com-test cases after first comparing and contrasting the spect