Numerical solution of the two dimensional Poincar´e equation

Publication date

2005-02-28

Authors

Swart, A.
Sleijpen, G.L.G.
Maas, L.R.M.
Brandts, J.

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Document Type

Preprint
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Abstract

This paper deals with numerical approximation of the two dimensional Poincar´e equation that arises as a model for internal wave motion in enclosed containers. Inspired by the hyperbolicity of the equation we propose a discretisation particularly suited for this problem, which results in matrices whose size varies linearly with the number of grid points along the coordinate axes. Exact solutions are obtained, defined on a perturbed boundary. Furthermore, the problem is seen to be ill-posed and there is need for a regularisation scheme, which we base on a minimal-energy approach.

Keywords

Poincar´e equation, regularisation, Ill-posed problems, internal waves

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