Geometric models for Lie--Hamilton systems on $\mathbb{R}^2$
Abstract
This paper provides a geometric description for Lie--Hamilton systems on with locally transitive Vessiot--Guldberg Lie algebras through two types of geometric models. The first one is the restriction of a class of Lie--Hamilton systems on the dual of a Lie algebra to even-dimensional symplectic leaves relative to the Kirillov-Kostant-Souriau bracket. The second is a projection onto a quotient space of an automorphic Lie--Hamilton system relative to a naturally defined Poisson structure or, more generally, an automorphic Lie system with a compatible bivector field. These models give rise to a natural framework for the analysis of Lie--Hamilton systems on while retrieving known results in a natural manner. Our methods may be extended to study Lie--Hamilton systems on higher-dimensional manifolds and provide new approaches to Lie systems admitting compatible geometric structures.
Keywords
Cite
@article{arxiv.1911.01094,
title = {Geometric models for Lie--Hamilton systems on $\mathbb{R}^2$},
author = {J. Lange and J. de Lucas},
journal= {arXiv preprint arXiv:1911.01094},
year = {2019}
}
Comments
15 pages, 1 figure