The goal of this paper is the numerical computation and continuation of homoclinic connections of the Lyapunov families of periodic orbits (p.o.) associated with the collinear equilibrium points, L1, L2 and L3, of the planar circular restricted three-body problem (RTBP).We describe the method used that allows us to follow individual families of homoclinic connections by numerical continuation of a system of (nonlinear) equations that has as unknowns the initial condition of the p.o., the linear approximation of its stable and unstable manifolds and a point in a given Poincar´e section in which the unstable and stable manifolds match. For the L3 case, some comments are made on the geometry of the manifold tubes and the possibility o...
Periodicity of motion around the collinear libration point associated with the Elliptic Restricted T...
Abstract: We consider the plane circular restricted three-body problem. It is described by...
We study the dynamics of the circular restricted 4-body problem with three primaries with equal mass...
The goal of this paper is the numerical computation and continuation of homoclinic connections of th...
This paper is devoted to the numerical computation and continuation of families of heteroclinic conn...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
We consider the Restricted Three Body Problem (RTBP), and we restrict our attention to the equilibr...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
AbstractThe linearization of the spatial restricted three–body problem at the collinear equilibrium ...
The present work studies the robustness of certain basic homoclinic motions in an equilateral restri...
We are interested in studying the motion in a (big) neighborhood of the collinear equilibrium point ...
Abstract: We consider the plane circular restricted three-body problem for small mass rati...
In this master thesis we will study the collinear four body problem from the numerical perspective. ...
Abstract: We consider the plane circular restricted three-body problem for μ=0. In §1, in ...
AbstractWe prove the existence of transversal homoclinic points in the collinear three-body problem,...
Periodicity of motion around the collinear libration point associated with the Elliptic Restricted T...
Abstract: We consider the plane circular restricted three-body problem. It is described by...
We study the dynamics of the circular restricted 4-body problem with three primaries with equal mass...
The goal of this paper is the numerical computation and continuation of homoclinic connections of th...
This paper is devoted to the numerical computation and continuation of families of heteroclinic conn...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
We consider the Restricted Three Body Problem (RTBP), and we restrict our attention to the equilibr...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
AbstractThe linearization of the spatial restricted three–body problem at the collinear equilibrium ...
The present work studies the robustness of certain basic homoclinic motions in an equilateral restri...
We are interested in studying the motion in a (big) neighborhood of the collinear equilibrium point ...
Abstract: We consider the plane circular restricted three-body problem for small mass rati...
In this master thesis we will study the collinear four body problem from the numerical perspective. ...
Abstract: We consider the plane circular restricted three-body problem for μ=0. In §1, in ...
AbstractWe prove the existence of transversal homoclinic points in the collinear three-body problem,...
Periodicity of motion around the collinear libration point associated with the Elliptic Restricted T...
Abstract: We consider the plane circular restricted three-body problem. It is described by...
We study the dynamics of the circular restricted 4-body problem with three primaries with equal mass...