تقرير
Liouville-Arnold theorem for contact Hamiltonian systems
العنوان: | Liouville-Arnold theorem for contact Hamiltonian systems |
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المؤلفون: | Colombo, Leonardo, de León, Manuel, Lainz, Manuel, López-Gordón, Asier |
سنة النشر: | 2023 |
المجموعة: | Mathematics Mathematical Physics |
مصطلحات موضوعية: | Mathematics - Symplectic Geometry, Mathematical Physics, Mathematics - Dynamical Systems, primary: 37J35, 37J55, 70H06, secondary: 53D10, 53E50, 53Z05 |
الوصف: | A Hamiltonian system is completely integrable (in the sense of Liouville) if there exist as many independent integrals of motion in involution as the dimension of the configuration space. Under certain regularity conditions, Liouville-Arnold theorem states that the invariant geometric structure associated with Liouville integrability is a fibration by Lagrangian tori (or, more generally, Abelian groups), on which the motion is linear. In this paper, a Liouville-Arnold theorem for contact Hamiltonian systems is proven. In particular, it is shown that, given a $(2n+1)$-dimensional completely integrable contact system, one can construct a foliation by $(n+1)$-dimensional Abelian groups and induce action-angle coordinates in which the equations of motion are linearized. One important novelty with respect to previous attempts is that the foliation consists of $(n+1)$-dimensional coisotropic submanifolds given by the preimages of rays by the functions in involution. In order to prove the theorem, we first develop a version of Liouville-Arnold theorem for homogeneous functions in exact symplectic manifolds (which is of independent interest), and then apply symplectization to obtain the contact case. Comment: 30 pages. Substantial changes have been made on the proof of Theorem 4 and an example has been added. Preprint submitted to a journal. Comments are welcome! |
نوع الوثيقة: | Working Paper |
URL الوصول: | http://arxiv.org/abs/2302.12061 |
رقم الأكسشن: | edsarx.2302.12061 |
قاعدة البيانات: | arXiv |
الوصف غير متاح. |