We consider the planar restricted three-body problem and the collinear equilibrium point L3, as an example of a center×saddle equilibrium point in a Hamiltonian with two degrees of freedom.We explore numerically the existence of symmetric and non-symmetric homoclinic orbits to L3, when varying the mass parameter μ. Concerning the symmetric homoclinic orbits (SHO), we study the multi-round, m-round, SHO for m ≥ 2. More precisely, given a transversal value of μ for which there is a 1-round SHO, say μ1, we show that for any m ≥ 2, there are countable sets of values of μ, tending to μ1, corresponding to m-round SHO. Some comments on related analytical results are also made.Peer Reviewe
The equations of motion in the Circular Restricted Three-Body Problem (CR3BP) allow five equilibrium...
The goal of this paper is the numerical computation and continuation of homoclinic connections of t...
[eng] For a three-parametric family of continuous piecewise linear differential systems introduced b...
We consider the planar restricted three-body problem and the collinear equilibrium point L3, as an ...
In this paper, we consider horseshoe motion in the planar restricted three-body problem. On one hand...
Abstract We consider a real analytic two degrees of freedom Hamiltonian system possessing a homoclin...
AbstractUsing Melnikov′s method we are able to prove the existence of transverse homoclinic orbits a...
We consider the Restricted Three Body Problem (RTBP), and we restrict our attention to the equilibr...
We compute families of symmetric periodic horseshoe orbits in the restricted three-body problem. Bot...
We present a method for proving the existence of symmetric periodic, heteroclinic or homoclinic orbi...
We study the dynamics of the circular restricted 4-body problem with three primaries with equal mass...
This article extends a review in [9] of the theory and application of homoclinic orbits to equilibri...
We compute families of symmetric periodic horseshoe orbits in the restricted three-body problem. Bot...
AbstractWe prove the existence of transversal homoclinic points in the collinear three-body problem,...
We are interested in studying the motion in a (big) neighborhood of the collinear equilibrium point ...
The equations of motion in the Circular Restricted Three-Body Problem (CR3BP) allow five equilibrium...
The goal of this paper is the numerical computation and continuation of homoclinic connections of t...
[eng] For a three-parametric family of continuous piecewise linear differential systems introduced b...
We consider the planar restricted three-body problem and the collinear equilibrium point L3, as an ...
In this paper, we consider horseshoe motion in the planar restricted three-body problem. On one hand...
Abstract We consider a real analytic two degrees of freedom Hamiltonian system possessing a homoclin...
AbstractUsing Melnikov′s method we are able to prove the existence of transverse homoclinic orbits a...
We consider the Restricted Three Body Problem (RTBP), and we restrict our attention to the equilibr...
We compute families of symmetric periodic horseshoe orbits in the restricted three-body problem. Bot...
We present a method for proving the existence of symmetric periodic, heteroclinic or homoclinic orbi...
We study the dynamics of the circular restricted 4-body problem with three primaries with equal mass...
This article extends a review in [9] of the theory and application of homoclinic orbits to equilibri...
We compute families of symmetric periodic horseshoe orbits in the restricted three-body problem. Bot...
AbstractWe prove the existence of transversal homoclinic points in the collinear three-body problem,...
We are interested in studying the motion in a (big) neighborhood of the collinear equilibrium point ...
The equations of motion in the Circular Restricted Three-Body Problem (CR3BP) allow five equilibrium...
The goal of this paper is the numerical computation and continuation of homoclinic connections of t...
[eng] For a three-parametric family of continuous piecewise linear differential systems introduced b...