@inproceedings{83d41552e36d4eab9dd81014700362a9,
title = "On the periodic solutions of discrete hamiltonian systems",
abstract = "Almost all numerical methods for solving conservative problems cannot avoid a more or less perceptible drift phenomenon. Considering that the drift would be absent on a periodic or quasi-periodic solution, one way to eliminate such unpleasant phenomenon is to look for discrete periodic or quasi-periodic solutions. It is quite easy to show that only symmetric methods are able to provide solutions having such behavior. The open problem is to find the suitable stepsize and to be sure that the obtained periodic solution is stable. In the preliminary results here presented we show that this problem is strongly connected with a classical problem of evolution of planar polygons already discussed by Schoenberg in [5, 6] and more recently treated in [2].",
keywords = "Boundary Value Methods, Circulant matrice, Hamiltonian problems, Periodic orbits",
author = "Lidia Aceto and Donato Trigiante",
year = "2009",
doi = "10.1063/1.3241564",
language = "English",
isbn = "9780735407091",
series = "AIP Conference Proceedings",
pages = "707--710",
booktitle = "Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009",
note = "International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009 ; Conference date: 18-09-2009 Through 22-09-2009",
}