Abstract. We consider the motion of point masses given by a natural extension of Newtonian gravitation to spaces of constant positive curvature, in which the gravitational attraction between the bodies acts along geodesics. We aim to explore the spectral stability of tetrahedral orbits of the corresponding 4-body problem in the 2-dimensional case, a situation that can be reduced to studying the motion of the bodies on the unit sphere. We first perform some extensive and highly precise numerical experiments to find the likely regions of stability and instability, relative to the values of the masses and to the latitude of the position of the three equal masses. Then we support the numerical evidence with rigorous analytic proofs in the vicin...
We outline some aspects of the dynamics of an infinitesimalmass under the Newtonian attraction of th...
: The stability of relative equilibrium solutions for the interaction of two massive bodies is explo...
In this paper the stability of a new class of exact symmetrical solutions in the Newtonian gravitat...
In the present work we study the lineal stability of a relative equilibrium for the problem of the ...
AbstractWe consider the motion of n point particles of positive masses that interact gravitationally...
In this paper the stability of a new class of exact symmetrical solutions in the Newtonian gravitati...
Abstract. We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = c...
Abstract We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = co...
We consider the two-body problem on surfaces of constant non-zero curvature and classify the relativ...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
The n-body problem models a system of n-point masses that attract each other via some binary interac...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
AbstractThis paper studies the dynamics of the four body problem as a limiting system with two of th...
We study the relative equilibria of the limit case of the planar Newtonian 4-body problem when three...
In this thesis we study two types of planar N-body problems: the motion of N point masses in a plane...
We outline some aspects of the dynamics of an infinitesimalmass under the Newtonian attraction of th...
: The stability of relative equilibrium solutions for the interaction of two massive bodies is explo...
In this paper the stability of a new class of exact symmetrical solutions in the Newtonian gravitat...
In the present work we study the lineal stability of a relative equilibrium for the problem of the ...
AbstractWe consider the motion of n point particles of positive masses that interact gravitationally...
In this paper the stability of a new class of exact symmetrical solutions in the Newtonian gravitati...
Abstract. We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = c...
Abstract We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = co...
We consider the two-body problem on surfaces of constant non-zero curvature and classify the relativ...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
The n-body problem models a system of n-point masses that attract each other via some binary interac...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
AbstractThis paper studies the dynamics of the four body problem as a limiting system with two of th...
We study the relative equilibria of the limit case of the planar Newtonian 4-body problem when three...
In this thesis we study two types of planar N-body problems: the motion of N point masses in a plane...
We outline some aspects of the dynamics of an infinitesimalmass under the Newtonian attraction of th...
: The stability of relative equilibrium solutions for the interaction of two massive bodies is explo...
In this paper the stability of a new class of exact symmetrical solutions in the Newtonian gravitat...