We prove the existence of chaotic dynamics in a simple periodically perturbed Hamiltonian system of the form x''+q(t)f(x) = 0, where q(t) is a periodic function of constant sign. Applications are given to a pendulum equation with variable length
The dynamics of realistic Hamiltonian systems has unusual microscopic features that are direct conse...
We investigate the possibility of inducing transitions between periodic orbits in two-dimensional Ha...
We consider two forced dissipative pendulum systems, the pendulum with vertically oscillating suppor...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
We prove the existence of complex dynamics for a generalized pendulum type equation with variable le...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7 Rome / CNR - Consiglio ...
It is well known that a second order, pendulum-like, Hamiltonian systems exhibits, under a slowly os...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
Chaotic behavior of a physical system is characterized by its unpredictability and extreme sensitivi...
Abstract. The main purpose of this investigation is to show that a pendu-lum, whose pivot oscillates...
International audienceWe present a technique to control chaos in Hamiltonian systems which are close...
In the past hundred years investigators have learned the significance of complex behavior in determi...
Pendulum is the simplest nonlinear system, which, however, provides the means for the description of...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
We give a review of the most well-known examples of dynamical systems with chaotic dynamics, After a...
The dynamics of realistic Hamiltonian systems has unusual microscopic features that are direct conse...
We investigate the possibility of inducing transitions between periodic orbits in two-dimensional Ha...
We consider two forced dissipative pendulum systems, the pendulum with vertically oscillating suppor...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
We prove the existence of complex dynamics for a generalized pendulum type equation with variable le...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7 Rome / CNR - Consiglio ...
It is well known that a second order, pendulum-like, Hamiltonian systems exhibits, under a slowly os...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
Chaotic behavior of a physical system is characterized by its unpredictability and extreme sensitivi...
Abstract. The main purpose of this investigation is to show that a pendu-lum, whose pivot oscillates...
International audienceWe present a technique to control chaos in Hamiltonian systems which are close...
In the past hundred years investigators have learned the significance of complex behavior in determi...
Pendulum is the simplest nonlinear system, which, however, provides the means for the description of...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
We give a review of the most well-known examples of dynamical systems with chaotic dynamics, After a...
The dynamics of realistic Hamiltonian systems has unusual microscopic features that are direct conse...
We investigate the possibility of inducing transitions between periodic orbits in two-dimensional Ha...
We consider two forced dissipative pendulum systems, the pendulum with vertically oscillating suppor...