Variational integrator for the rotating shallow-water equations on the sphere
Provides a structure-preserving numerical method for geophysical fluid dynamics simulations on the sphere.
Developed a variational integrator for rotating shallow-water equations on a sphere, achieving excellent conservation properties and verified accuracy through standard numerical tests.
We develop a variational integrator for the shallow-water equations on a rotating sphere. The variational integrator is built around a discretization of the continuous Euler-Poincaré reduction framework for Eulerian hydrodynamics. We describe the discretization of the continuous Euler-Poincaré equations on arbitrary simplicial meshes. Standard numerical tests are carried out to verify the accuracy and the excellent conservational properties of the discrete variational integrator.