Superintegrable Bertrand magnetic geodesic flows
Dynamical Systems
2021-12-06 v1 Mathematical Physics
Differential Geometry
math.MP
Abstract
The problem of description of superintegrable systems (i.e., systems with closed trajectories in a certain domain) in the class of rotationally symmetric natural mechanical systems goes back to Bertrand and Darboux. We describe all superintegrable (in a domain of slow motions) systems in the class of rotationally symmetric magnetic geodesic flows. We show that all sufficiently slow motions in a central magnetic field on a two-dimensional manifold of revolution are periodic if and only if the metric has a constant scalar curvature and the magnetic field is homogeneous, i.e. proportional to the area form.
Cite
@article{arxiv.2001.05067,
title = {Superintegrable Bertrand magnetic geodesic flows},
author = {Elena A. Kudryavtseva and Sergey A. Podlipaev},
journal= {arXiv preprint arXiv:2001.05067},
year = {2021}
}
Comments
11 pages; Engl. transl. of the published version; Engl. transl. will be published in J. Math. Sci