This paper is devoted to the numerical computation and continuation of families of heteroclinic connections between hyperbolic periodic orbits (POs) of a Hamiltonian system. We describe a method that requires the numerical continuation of a nonlinear system that involves the initial conditions of the two POs, the linear approximations of the corresponding manifolds and a point in a given Poincaré section where the unstable and stable manifolds match. The method is applied to compute families of heteroclinic orbits between planar Lyapunov POs around the collinear equilibrium points of the restricted three-body problem in different scenarios. In one of them, for the Sun-Jupiter mass parameter, we provide energy ranges for which the transition...
We present an extension of the theory known as Lin's method to heteroclinic chains that connect hype...
AbstractThis article concerns arbitrary finite heteroclinic networks in any phase space dimension wh...
In this paper we apply dynamical systems techniques to the problem of heteroclinic connections and r...
This paper is devoted to the numerical computation and continuation of families of heteroclinic conn...
The goal of this paper is the numerical computation and continuation of homoclinic connections of t...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
This paper applies dynaanical system techniques to the problem of heteroclic con-nections and resons...
Abstract. The dynamics occurring near a heteroclinic cycle between a hyperbolic equilibrium and a hy...
In this paper we apply dynamical systems techniques to the problem of heteroclinic connections and r...
Many astrodynamical systems exhibit both ordered and chaotic motion. The invariant manifold structur...
This paper concerns heteroclinic connections and resonance transitions in the planar circular restr...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
Homoclinic and heteroclinic connections between planar Lyapunov orbits of the Sun-Earth and Earth-M...
A heteroclinic orbit is generally a trajectory which connects one saddle point to another saddle poi...
We present an extension of the theory known as Lin's method to heteroclinic chains that connect hype...
AbstractThis article concerns arbitrary finite heteroclinic networks in any phase space dimension wh...
In this paper we apply dynamical systems techniques to the problem of heteroclinic connections and r...
This paper is devoted to the numerical computation and continuation of families of heteroclinic conn...
The goal of this paper is the numerical computation and continuation of homoclinic connections of t...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
In this paper a method for finding homoclinic and heteroclinic connections between Lyapunov orbits u...
This paper applies dynaanical system techniques to the problem of heteroclic con-nections and resons...
Abstract. The dynamics occurring near a heteroclinic cycle between a hyperbolic equilibrium and a hy...
In this paper we apply dynamical systems techniques to the problem of heteroclinic connections and r...
Many astrodynamical systems exhibit both ordered and chaotic motion. The invariant manifold structur...
This paper concerns heteroclinic connections and resonance transitions in the planar circular restr...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
Homoclinic and heteroclinic connections between planar Lyapunov orbits of the Sun-Earth and Earth-M...
A heteroclinic orbit is generally a trajectory which connects one saddle point to another saddle poi...
We present an extension of the theory known as Lin's method to heteroclinic chains that connect hype...
AbstractThis article concerns arbitrary finite heteroclinic networks in any phase space dimension wh...
In this paper we apply dynamical systems techniques to the problem of heteroclinic connections and r...