Add to ORKGAbstract. We consider the N-body problem in spaces of constant curvature and study its rotopulsators, i.e. solutions for which the configuration of the bodies rotates and changes size during the motion. Rotopulsators fall naturally into five groups: positive elliptic, positive elliptic-elliptic, negative elliptic, neg-ative hyperbolic, and negative elliptic-hyperbolic, depending on the nature and number of their rotations and on whether they occur in spaces of positive or negative curvature. After obtaining existence criteria for each type of rotopul-sator, we derive their conservation laws. We further deal with the existence and uniqueness of some classes of rotopulsators in the 2- and 3-body case and prove two general results about the qu...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
Abstract. The kinematic separation of size, shape, and orientation of n-body systems is investigated...
AbstractIn the 2-dimensional curved 3-body problem, we prove the existence of Lagrangian and Euleria...
Abstract. We consider the N-body problem in spaces of constant curvature and study its rotopulsators...
We prove that positive elliptic-elliptic rotopulsator solutions of the n-body problem in spaces of c...
Abstract. We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = c...
Abstract. We consider the 4-body problem in spaces of constant curvature and study the existence of ...
AbstractWe consider the motion of n point particles of positive masses that interact gravitationally...
Abstract. We provide the differential equations that generalize the Newto-nian N-body problem of cel...
Abstract We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = co...
Abstract. We analyze the singularities of the equations of motion and several types of singular solu...
Abstract. By using, the Vlasov-Poisson equation defined in one Rie-mannian region of Rk and a Dirac ...
We prove the existence of a number of smooth periodic motions u(*) of the classical Newtonian N-body...
In this thesis we study two types of planar N-body problems: the motion of N point masses in a plane...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
Abstract. The kinematic separation of size, shape, and orientation of n-body systems is investigated...
AbstractIn the 2-dimensional curved 3-body problem, we prove the existence of Lagrangian and Euleria...
Abstract. We consider the N-body problem in spaces of constant curvature and study its rotopulsators...
We prove that positive elliptic-elliptic rotopulsator solutions of the n-body problem in spaces of c...
Abstract. We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = c...
Abstract. We consider the 4-body problem in spaces of constant curvature and study the existence of ...
AbstractWe consider the motion of n point particles of positive masses that interact gravitationally...
Abstract. We provide the differential equations that generalize the Newto-nian N-body problem of cel...
Abstract We extend the Newtonian n-body problem of celestial mechanics to spaces of curvature κ = co...
Abstract. We analyze the singularities of the equations of motion and several types of singular solu...
Abstract. By using, the Vlasov-Poisson equation defined in one Rie-mannian region of Rk and a Dirac ...
We prove the existence of a number of smooth periodic motions u(*) of the classical Newtonian N-body...
In this thesis we study two types of planar N-body problems: the motion of N point masses in a plane...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
We first provide a classification of the pure rotational motion of 2 particles on a sphere interacti...
Abstract. The kinematic separation of size, shape, and orientation of n-body systems is investigated...
AbstractIn the 2-dimensional curved 3-body problem, we prove the existence of Lagrangian and Euleria...