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.
Editors
Advisors
Supervisors
DOI
Document Type
Preprint
Metadata
Show full item recordCollections
License
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