A Finite element discretization of the streamfunction formulation of the stationary quasi-geostrophic equations of the ocean

Journal Article (2013)
Author(s)

E.L. Foster (Virginia Tech)

Traian Iliescu (Virginia Tech)

Zhu Wang (University of South Carolina)

Affiliation
External organisation
DOI related publication
https://doi.org/10.1016/j.cma.2013.04.008
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Publication Year
2013
Language
English
Affiliation
External organisation
Volume number
261–262
Pages (from-to)
105-117

Abstract

This paper presents a conforming finite element discretization of the streamfunction formulation of the one-layer stationary quasi-geostrophic equations, which are a commonly used model for the large scale wind-driven ocean circulation. Optimal error estimates for this finite element discretization with the Argyris element are derived. To the best of the authors’ knowledge, these represent the first optimal error estimates for the finite element discretization of the quasi-geostrophic equations. Numerical tests for the finite element discretization of the quasi-geostrophic equations and two of its standard simplifications (the linear Stommel model and the linear Stommel–Munk model) are carried out. By benchmarking the numerical results against those in the published literature, we conclude that our finite element discretization is accurate. Furthermore, the numerical results have the same convergence rates as those predicted by the theoretical error estimates.

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