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Numerical Integration of Nearly Integrable SystemsPerturbed Integrable Systems: Consider a dissipative perturbation of an arbitrary integrable Hamiltonian system, the smallness of the perturbation being described with the help of a perturbation parameter. Again the perturbed system is assumed to admit a (weakly) attractive torus. Assume that the system is integrated numerically using a symplectic integrator. Then the discrete system also admits an attractive invariant torus for sufficiently small step size. But how small? We show that it may be chosen remarkably large. Essentially the step size can be taken as large as the logarithm of the perturbation parameter. This means that the discrete system provides a faithful description of the qualitative behaviour of the underlying differential equation even for large step size. For details see D. Stoffer: "On the qualitative behaviour of symplectic integrators. II. Integrable systems, J. Math. Anal. Appl. 217 (1998), no. 2, 501--520. Contacts:PD Dr. D. Stoffer, Prof. U. KirchgraberElectronic Contacts:stoffer@math.ethz.chLast Update:04/07/97Responsible:Professor or Project Leader: : Prof. Dr. Urs Kirchgraber Institute or Independent Professorship : Independent Professorship of Mathematics Department : Department of Mathematics Comments to the ETH Research Report administration : Sat Jun 19 16:30:35 1999 |
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author ggass and design: Michele Marcionelli
author ggass and design: Michele Marcionelli