Salvato in:
Dettagli Bibliografici
Autori principali: Peterson, Luke T., Brown, Gavin, Jorba, Àngel, Scheeres, Daniel
Natura: Preprint
Pubblicazione: 2024
Soggetti:
Accesso online:https://arxiv.org/abs/2402.18081
Tags: Aggiungi Tag
Nessun Tag, puoi essere il primo ad aggiungerne!!
_version_ 1866917599965609984
author Peterson, Luke T.
Brown, Gavin
Jorba, Àngel
Scheeres, Daniel
author_facet Peterson, Luke T.
Brown, Gavin
Jorba, Àngel
Scheeres, Daniel
contents This paper investigates the motion of a small particle moving near the triangular points of the Earth-Moon system. The dynamics are modeled in the Hill restricted 4-body problem (HR4BP), which includes the effect of the Earth and Moon as in the circular restricted 3-body problem (CR3BP), as well as the direct and indirect effect of the Sun as a periodic time-dependent perturbation of the CR3BP. Due to the periodic perturbation, the triangular points of the CR3BP are no longer equilibrium solutions; rather, the triangular points are replaced by periodic orbits with the same period as the perturbation. Additionally, there is a 2:1 resonant periodic orbit that persists from the CR3BP into the HR4BP. In this work, we investigate the dynamics around these invariant objects by computing families of 2-dimensional invariant tori and their linear normal behavior. We identify bifurcations and relationships between families. Mechanisms for transport between Earth, L4, and Moon are discussed. Comparisons are made between the results presented here and in the bicircular problem (BCP).
format Preprint
id arxiv_https___arxiv_org_abs_2402_18081
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Dynamics Around the Earth-Moon Triangular Points in the Hill Restricted 4-Body Problem
Peterson, Luke T.
Brown, Gavin
Jorba, Àngel
Scheeres, Daniel
Dynamical Systems
This paper investigates the motion of a small particle moving near the triangular points of the Earth-Moon system. The dynamics are modeled in the Hill restricted 4-body problem (HR4BP), which includes the effect of the Earth and Moon as in the circular restricted 3-body problem (CR3BP), as well as the direct and indirect effect of the Sun as a periodic time-dependent perturbation of the CR3BP. Due to the periodic perturbation, the triangular points of the CR3BP are no longer equilibrium solutions; rather, the triangular points are replaced by periodic orbits with the same period as the perturbation. Additionally, there is a 2:1 resonant periodic orbit that persists from the CR3BP into the HR4BP. In this work, we investigate the dynamics around these invariant objects by computing families of 2-dimensional invariant tori and their linear normal behavior. We identify bifurcations and relationships between families. Mechanisms for transport between Earth, L4, and Moon are discussed. Comparisons are made between the results presented here and in the bicircular problem (BCP).
title Dynamics Around the Earth-Moon Triangular Points in the Hill Restricted 4-Body Problem
topic Dynamical Systems
url https://arxiv.org/abs/2402.18081