Generalized Analytical Results on n-Ejection–Collision Orbits in the RTBP. Analysis of Bifurcations

In the planar circular restricted three-body problem and for any value of the mass parameter μ ∈ (0, 1) and n ≥ 1, we prove the existence of four families of nejection–collision (n-EC) orbits, that is, orbits where the particle ejects from a primary, reaches n maxima in the (Euclidean) distance with...

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Bibliographic Details
Authors: Seara, T.M., Ollé, M., Rodríguez, Ó.
Format: article
Status:Published version
Publication Date:2022
Country:España
Institution:Varias* (Consorci de Biblioteques Universitáries de Catalunya, Centre de Serveis Científics i Acadèmics de Catalunya)
Repository:Recercat. Dipósit de la Recerca de Catalunya
OAI Identifier:oai:recercat.cat:2072/537061
Online Access:http://hdl.handle.net/2072/537061
Access Level:Open access
Keyword:RTBP · Hill problem · Ejection-Collision orbits · Bifurcations
Description
Summary:In the planar circular restricted three-body problem and for any value of the mass parameter μ ∈ (0, 1) and n ≥ 1, we prove the existence of four families of nejection–collision (n-EC) orbits, that is, orbits where the particle ejects from a primary, reaches n maxima in the (Euclidean) distance with respect to it and finally collides with the primary. Such EC orbits have a value of the Jacobi constant of the form C = 3μ + Ln2/3(1 − μ)2/3, where L > 0 is big enough but independent of μ and n. In order to prove this optimal result, we consider Levi-Civita’s transformation to regularize the collision with one primary and a perturbative approach using an ad hoc small parameter once a suitable scale in the configuration plane and time has previously been applied. This result improves a previous work where the existence of the n-EC orbits was stated when the mass parameter μ > 0 was small enough. Moreover, for decreasing values of C, there appear some bifurcations which are first numerically investigated and afterward explicit expressions for the approximation of the bifurcation values of C are discussed. Finally, a detailed analysis of the existence of n-EC orbits when μ → 1 is also described. In a natural way, Hill’s problem shows up. For this problem, we prove an analytical result on the existence of four families of n-EC orbits, and numerically, we describe them as well as the appearing bifurcations