Preprint
Inserted: 11 apr 2025
Last Updated: 12 apr 2025
Pages: 27
Year: 2025
Abstract:
Motivated by a classical correspondence between magnetic flows and sub-Riemannian geometry, first established by R.Montgomery in Mon90,Mon95 , we undertake a systematic study of magnetic flows on sub-Riemannian manifolds.
We focus on three-dimensional contact manifolds, and we show that magnetic fields are naturally defined through Rumin differential forms. We provide a geometric interpretation of the sub-Riemannian magnetic geodesic flow, demonstrating that it can be understood as a geodesic flow on a suitably defined lifted sub-Riemannian structure, which is of Engel type when the magnetic field is non-vanishing.
In the general case, when the magnetic field might be vanishing, we investigate the geometry of this lifted structure, characterizing properties such as its step and the abnormal trajectories in terms of the analytical features of the magnetic field.
Download: