On the local and global properties of the ...
Type de document :
Compte-rendu et recension critique d'ouvrage
DOI :
Titre :
On the local and global properties of the gravitational spheres of influence
Auteur(s) :
Souami, Damya [Auteur]
Laboratoire d'études spatiales et d'instrumentation en astrophysique = Laboratory of Space Studies and Instrumentation in Astrophysics [LESIA]
Cresson, Jacky [Auteur]
Laboratoire de Mathématiques et de leurs Applications [Pau] [LMAP]
Biernacki, Christophe [Auteur]
MOdel for Data Analysis and Learning [MODAL]
Pierret, Frédéric [Auteur]
Institut de Mécanique Céleste et de Calcul des Ephémérides [IMCCE]
Laboratoire d'études spatiales et d'instrumentation en astrophysique = Laboratory of Space Studies and Instrumentation in Astrophysics [LESIA]
Cresson, Jacky [Auteur]
Laboratoire de Mathématiques et de leurs Applications [Pau] [LMAP]
Biernacki, Christophe [Auteur]
MOdel for Data Analysis and Learning [MODAL]
Pierret, Frédéric [Auteur]
Institut de Mécanique Céleste et de Calcul des Ephémérides [IMCCE]
Titre de la revue :
Monthly Notices of the Royal Astronomical Society
Pagination :
4287–429
Éditeur :
Oxford University Press (OUP): Policy P - Oxford Open Option A
Date de publication :
2020-06-02
ISSN :
0035-8711
Mot(s)-clé(s) en anglais :
Celestial mechanics
Gravitation
Planetary systems
Gravitation
Planetary systems
Discipline(s) HAL :
Statistiques [stat]/Méthodologie [stat.ME]
Planète et Univers [physics]/Astrophysique [astro-ph]/Astrophysique stellaire et solaire [astro-ph.SR]
Physique [physics]
Physique [physics]/Astrophysique [astro-ph]
Planète et Univers [physics]/Astrophysique [astro-ph]/Astrophysique stellaire et solaire [astro-ph.SR]
Physique [physics]
Physique [physics]/Astrophysique [astro-ph]
Résumé en anglais : [en]
We revisit the concept of sphere of gravitational activity, to which we give both a geometrical and physical meaning. This study aims to refine this concept in a much broader context that could, for instance, be applied ...
Lire la suite >We revisit the concept of sphere of gravitational activity, to which we give both a geometrical and physical meaning. This study aims to refine this concept in a much broader context that could, for instance, be applied to exo-planetary problems (in a Galactic stellar disc-Star-Planets system) to define a first order "border" of a planetary system. The methods used in this paper rely on classical Celestial Mechanics and develop the equations of motion in the framework of the 3-body problem (e.g. Star-Planet-Satellite System). We start with the basic definition of planet's sphere of activity as the region of space in which it is feasible to assume a planet as the central body and the Sun as the perturbing body when computing perturbations of the satellite's motion. We then investigate the geometrical properties and physical meaning of the ratios of Solar accelerations (central and perturbing) and planetary accelerations (central and perturbing), and the boundaries they define. We clearly distinguish throughout the paper between the sphere of activity, the Chebotarev sphere (a particular case of the sphere of activity), Laplace sphere, and the Hill sphere. The last two are often wrongfully thought to be one and the same. Furthermore, taking a closer look and comparing the ratio of the star's accelerations (central/perturbing) to that of the planetary acceleration (central/perturbing) as a function of the planeto-centric distance, we have identified different dynamical regimes which are presented in the semi-analytical analysis.Lire moins >
Lire la suite >We revisit the concept of sphere of gravitational activity, to which we give both a geometrical and physical meaning. This study aims to refine this concept in a much broader context that could, for instance, be applied to exo-planetary problems (in a Galactic stellar disc-Star-Planets system) to define a first order "border" of a planetary system. The methods used in this paper rely on classical Celestial Mechanics and develop the equations of motion in the framework of the 3-body problem (e.g. Star-Planet-Satellite System). We start with the basic definition of planet's sphere of activity as the region of space in which it is feasible to assume a planet as the central body and the Sun as the perturbing body when computing perturbations of the satellite's motion. We then investigate the geometrical properties and physical meaning of the ratios of Solar accelerations (central and perturbing) and planetary accelerations (central and perturbing), and the boundaries they define. We clearly distinguish throughout the paper between the sphere of activity, the Chebotarev sphere (a particular case of the sphere of activity), Laplace sphere, and the Hill sphere. The last two are often wrongfully thought to be one and the same. Furthermore, taking a closer look and comparing the ratio of the star's accelerations (central/perturbing) to that of the planetary acceleration (central/perturbing) as a function of the planeto-centric distance, we have identified different dynamical regimes which are presented in the semi-analytical analysis.Lire moins >
Langue :
Anglais
Vulgarisation :
Non
Collections :
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