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Main Author: Aazami, Amir Babak
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2408.16139
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author Aazami, Amir Babak
author_facet Aazami, Amir Babak
contents It is well known in general relativity that trajectories of Hamiltonian systems lift to geodesics of pp-wave spacetimes, an example of a more general phenomenon known as the "Eisenhart lift." We review and expand upon the benefits of this correspondence for dynamical systems theory. One benefit is the use of curvature and conjugate points to study the stability of Hamiltonian systems. Another benefit is that this lift unfolds a Hamiltonian system into a family of ODEs akin to a moduli space. One such family arises from the conformal invariance of lightlike geodesics, by which any Hamiltonian system unfolds into a "conformal class" of non-diffeomorphic ODEs with solutions in common. By utilizing higher-index versions of pp-waves, a similar lift and conformal class are shown to exist for certain second-order complex ODEs. Another such family occurs by lifting to a Riemannian metric that is dual to a pp-wave, a process that in certain cases yields a "square root" for the Hamiltonian. We prove a two-point boundary result for the family of ODEs arising from this lift, as well as the existence of a constant of the motion generalizing conservation of energy.
format Preprint
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institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The Eisenhart Lift and Hamiltonian Systems
Aazami, Amir Babak
Differential Geometry
Dynamical Systems
It is well known in general relativity that trajectories of Hamiltonian systems lift to geodesics of pp-wave spacetimes, an example of a more general phenomenon known as the "Eisenhart lift." We review and expand upon the benefits of this correspondence for dynamical systems theory. One benefit is the use of curvature and conjugate points to study the stability of Hamiltonian systems. Another benefit is that this lift unfolds a Hamiltonian system into a family of ODEs akin to a moduli space. One such family arises from the conformal invariance of lightlike geodesics, by which any Hamiltonian system unfolds into a "conformal class" of non-diffeomorphic ODEs with solutions in common. By utilizing higher-index versions of pp-waves, a similar lift and conformal class are shown to exist for certain second-order complex ODEs. Another such family occurs by lifting to a Riemannian metric that is dual to a pp-wave, a process that in certain cases yields a "square root" for the Hamiltonian. We prove a two-point boundary result for the family of ODEs arising from this lift, as well as the existence of a constant of the motion generalizing conservation of energy.
title The Eisenhart Lift and Hamiltonian Systems
topic Differential Geometry
Dynamical Systems
url https://arxiv.org/abs/2408.16139