Symmetry Reduction by Lifting for Maps
Chaotic Dynamics
2012-06-21 v2 Exactly Solvable and Integrable Systems
Abstract
We study diffeomorphisms that have one-parameter families of continuous symmetries. For general maps, in contrast to the symplectic case, existence of a symmetry no longer implies existence of an invariant. Conversely, a map with an invariant need not have a symmetry. We show that when a symmetry flow has a global Poincar\'{e} section there are coordinates in which the map takes a reduced, skew-product form, and hence allows for reduction of dimensionality. We show that the reduction of a volume-preserving map again is volume preserving. Finally we sharpen the Noether theorem for symplectic maps. A number of illustrative examples are discussed and the method is compared with traditional reduction techniques.
Keywords
Cite
@article{arxiv.1111.3887,
title = {Symmetry Reduction by Lifting for Maps},
author = {H. R. Dullin and H. E. Lomeli and J. D. Meiss},
journal= {arXiv preprint arXiv:1111.3887},
year = {2012}
}
Comments
laTeX, 31 pages, 5 figures