Add to ORKGHénon [8] used an inclined billiard to investigate aspects of chaotic scattering which occur in satellite encounters and in other situations. His model consisted of a piecewise mapping which described the motion of a point particle bouncing elastically on two disks. A one parameter family of orbits, named h-orbits, was obtained by starting the particle at rest from a given height. We obtain an analytical expression for the escape distribution of the h-orbits, which is also compared with results from numerical simulations. Finally, some discussion is made about possible applications of the h-orbits in connection with Hill’s problem
In this thesis we consider mathematical problems related to different aspects of hard sphere systems...
Abstract. We consider open circular billiards with one and with two holes. The exact formulas for es...
The concept of closest approach is analyzed in Hill’s problem, resulting in a partitioning of the po...
This thesis consists of four works in dynamical systems with a focus on billiards. In the first part...
In the thesis we describe the dynamics of two variations of the Fermi acceleration models. The firs...
The aim of this paper is to investigate the escape dynamics in a Hamiltonian system describing the m...
AbstractDynamical properties are studied for escaping particles, injected through a hole in an oval ...
In this paper, we have performed a numerical investigation of the escape of a particle from two diff...
In the context of a star cluster moving on a circular galactic orbit, a “potential escaper” is a clu...
Many physical systems can be modeled as scattering problems. For example, the motions of stars escap...
We investigate the shape of the windows through which stars may escape from a galaxy modeled by a bi...
The dissolution process of star clusters is rather intricate for theory. We investigate it in the co...
A two-dimensional annular billiard consisting of a region confined within two concentric circumferen...
The Hill problem models the motion of two gravitationally interacting small masses perturbed by a la...
In this paper we show an infinite measure set of exponentially escaping orbits for a resonant Fermi ...
In this thesis we consider mathematical problems related to different aspects of hard sphere systems...
Abstract. We consider open circular billiards with one and with two holes. The exact formulas for es...
The concept of closest approach is analyzed in Hill’s problem, resulting in a partitioning of the po...
This thesis consists of four works in dynamical systems with a focus on billiards. In the first part...
In the thesis we describe the dynamics of two variations of the Fermi acceleration models. The firs...
The aim of this paper is to investigate the escape dynamics in a Hamiltonian system describing the m...
AbstractDynamical properties are studied for escaping particles, injected through a hole in an oval ...
In this paper, we have performed a numerical investigation of the escape of a particle from two diff...
In the context of a star cluster moving on a circular galactic orbit, a “potential escaper” is a clu...
Many physical systems can be modeled as scattering problems. For example, the motions of stars escap...
We investigate the shape of the windows through which stars may escape from a galaxy modeled by a bi...
The dissolution process of star clusters is rather intricate for theory. We investigate it in the co...
A two-dimensional annular billiard consisting of a region confined within two concentric circumferen...
The Hill problem models the motion of two gravitationally interacting small masses perturbed by a la...
In this paper we show an infinite measure set of exponentially escaping orbits for a resonant Fermi ...
In this thesis we consider mathematical problems related to different aspects of hard sphere systems...
Abstract. We consider open circular billiards with one and with two holes. The exact formulas for es...
The concept of closest approach is analyzed in Hill’s problem, resulting in a partitioning of the po...