Rotational shallow water equations with viscous damping and boundary control: structure-preserving spatial discretization
Résumé
This paper is dedicated to structure-preserving spatial discretization of shallow water
dynamics. First, a port-Hamiltonian formulation is provided for the two-dimensional
rotational shallow water equations with viscous damping. Both tangential and nor-
mal boundary port variables are introduced. Then, the corresponding weak form is
derived and a partitioned finite element method is applied to obtain a finite-dimensional
continuous-time port-Hamiltonian approximation. Four simulation scenarios are
investigated to illustrate the approach and show its effectiveness.
Domaines
Mathématiques [math]Origine | Fichiers produits par l'(les) auteur(s) |
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