Research Project:

Geometric Singular Perturbation Theory for Discrete Dynamical Systems

Researcher:  Prof.  K. Nipp

Date:  19. 12. 2005


Geometric singular perturbation theory is an important tool in the field of continuous dynamical systems making use of invariant manifold results for ordinary differential equations (ODEs). We want to derive similar results for maps as obtained when discretising systems of ODEs by numerical integration schemes. The objective is to prove geometric properties of numerical integration methods.

Prof. K. Nipp
Seminar für Angewandte Mathematik
ETH-Zentrum, HG E13.2
CH-8092 Zürich

Tel.: +41-1-632 34 07
FAX: +41-1-632 16 87

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