Standard vector calculus formulas of Cartesian three space are projected onto the surface of a sphere. This produces symmetric equations with three nonindependent horizontal velocity components. Each orthogonal axis has a velocity component that rotates around its axis (eastward velocity rotates around the northsouth axis) and a specific angular momentum component that is the product of the velocity component multiplied by the cosine of axis latitude. Angular momentum components align with the fixed axes and simplify several formulas, whereas the rotating velocity components are not orthogonal and vary with location. Three symmetric coordinates allow vector resolution and calculus operations continuously over the whole spherical surface, wh...
L’enjeu de la simulation de la dynamique atmosphérique et océanographique a pris ces dernières année...
Aims. Three dimensional explicit hydrodynamic codes based on spherical polar coordinates using a sin...
It is shown that the solution of the semi-geostrophic equations for shallow-water flow can be found ...
Standard vector calculus formulas of Cartesian three space are projected onto the surface of a sphe...
The shallow water equations in a spherical geometry are solved using a 3-dimensional Cartesian metho...
Copyright © 2012 Society for Industrial and Applied MathematicsAccurate simulation of atmospheric fl...
International audienceConsistent shallow-water equations are derived on the rotating sphere with top...
In this paper we derive an exact solution to the governing equations for geophysical fluid dynamics ...
The shallow water equations in spherical geometry provide a first prototype for developing and testi...
We examine the late-time evolution of an inviscid zonally symmetric shallow-water flow on the surfac...
Steady state, axisymmetric motions of a Boussineaq fluid continued in rotating spherical anmulus are...
Starting from Hamilton's principle on a rotating sphere, we derive a series of successively more acc...
A new algorithm is presented for the solution of the shallow water equations on quasi-uniform sphe...
Two generation methods were developed for three dimensional flows where the computational domain nor...
The quasi-geostrophic omega-equation in flux form is developed as an example of a Poisson problem ov...
L’enjeu de la simulation de la dynamique atmosphérique et océanographique a pris ces dernières année...
Aims. Three dimensional explicit hydrodynamic codes based on spherical polar coordinates using a sin...
It is shown that the solution of the semi-geostrophic equations for shallow-water flow can be found ...
Standard vector calculus formulas of Cartesian three space are projected onto the surface of a sphe...
The shallow water equations in a spherical geometry are solved using a 3-dimensional Cartesian metho...
Copyright © 2012 Society for Industrial and Applied MathematicsAccurate simulation of atmospheric fl...
International audienceConsistent shallow-water equations are derived on the rotating sphere with top...
In this paper we derive an exact solution to the governing equations for geophysical fluid dynamics ...
The shallow water equations in spherical geometry provide a first prototype for developing and testi...
We examine the late-time evolution of an inviscid zonally symmetric shallow-water flow on the surfac...
Steady state, axisymmetric motions of a Boussineaq fluid continued in rotating spherical anmulus are...
Starting from Hamilton's principle on a rotating sphere, we derive a series of successively more acc...
A new algorithm is presented for the solution of the shallow water equations on quasi-uniform sphe...
Two generation methods were developed for three dimensional flows where the computational domain nor...
The quasi-geostrophic omega-equation in flux form is developed as an example of a Poisson problem ov...
L’enjeu de la simulation de la dynamique atmosphérique et océanographique a pris ces dernières année...
Aims. Three dimensional explicit hydrodynamic codes based on spherical polar coordinates using a sin...
It is shown that the solution of the semi-geostrophic equations for shallow-water flow can be found ...