Magnetic trajectories on Heisenberg nilmanifolds
| Autor: | Ovando, Gabriela P., Subils, Mauro |
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| Rok vydání: | 2024 |
| Předmět: | |
| Druh dokumentu: | Working Paper |
| Popis: | By fixing the usual metric on the Heisenberg Lie group $H_3$, we consider any left-invariant Lorentz force for which we write the corresponding magnetic equations. The aim of this work is twofold: the study of closed magnetic trajectories on Heisenberg nilmanifolds of dimension three and the inverse problem for this system, which consists in proving the existence of a Lagrangian. The last goal is achieved on $H_3$. By using symmetries coming from convenient actions, we compute the magnetic trajectories through the identity in $H_3$. We determine the closed magnetic trajectories on $H_3$ and consider the existence question on compact quotients $\Lambda\backslash H_3$ for any cocompact lattice $\Lambda\subset H_3$. We prove that the existence of closed magnetic geodesics is not guaranteed on every homotopy class. We give examples of compact quotients $\Gamma_k\backslash H_3$ with infinite many closed magnetic trajectories and compact quotients with no closed non-contractible magnetic trajectory for a given Lorentz force. Comment: 37 pages including two pages of appendix |
| Databáze: | arXiv |
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