A spectral element basin model for the shallow water equations
Journal of Computational Physics
The spectral element method for the shallow water equations on the sphere
Journal of Computational Physics
Terascale spectral element dynamical core for atmospheric general circulation models
Proceedings of the 2001 ACM/IEEE conference on Supercomputing
Nodal high-order discontinuous Galerkin methods for the spherical shallow water equations
Journal of Computational Physics
A three-dimensional spectral element model for the solution of the hydrostatic primitive equations
Journal of Computational Physics
Towards an Efficient and Scalable Discontinuous Galerkin Atmospheric Model
IPDPS '05 Proceedings of the 19th IEEE International Parallel and Distributed Processing Symposium (IPDPS'05) - Workshop 13 - Volume 14
International Journal of High Performance Computing Applications
A compatible and conservative spectral element method on unstructured grids
Journal of Computational Physics
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The spectral element method offers distinct advantages for geophysical simulations, including geometric flexibility, accuracy, and scalability. Developers of atmospheric and oceanic models are capitalizing on these properties to create new models that can accurately and effectively simulate multiscale flows in complex geometries.