Add to ORKGThe simple pendulum is a paradigm in the study of oscillations and other phenomena in physics and nonlinear dynamics. This explains why it has deserved much attention, from many viewpoints, for a long time. Here, we attempt to describe what we call a generalized perturbed pendulum, which comprises, in a single model, many known situations related to pendula, including different forcing and nonlinear damping terms. Melnikov analysis is applied to this model, with the result of general formulae for the appearance of chaotic motions that incorporate several particular cases. In this sense, we give a unified view of the pendulum
The motion of a particle subjected to simple inner (outer) periodic perturbations when it evolves ar...
Melnikov's method is an analytical way to show the existence of classical chaos generated by a Smale...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
We examine the nonlinear response of two planar pendula under external and kinematic excitations, wh...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
(Communicated by Àngel Jorba) Abstract. The standard Melnikov method for analyzing the onset of cha...
Pendulum is the simplest nonlinear system, which, however, provides the means for the description of...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
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...
In the paper, a new adequate theory of a simple mathematical pendulum is presented. This paper consi...
In this paper,we study the dynamics of a perturbation system. Firstly, we consider the unperturbatio...
The motion of a particle subjected to simple inner (outer) periodic perturbations when it evolves ar...
Melnikov's method is an analytical way to show the existence of classical chaos generated by a Smale...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
We examine the nonlinear response of two planar pendula under external and kinematic excitations, wh...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
(Communicated by Àngel Jorba) Abstract. The standard Melnikov method for analyzing the onset of cha...
Pendulum is the simplest nonlinear system, which, however, provides the means for the description of...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
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...
In the paper, a new adequate theory of a simple mathematical pendulum is presented. This paper consi...
In this paper,we study the dynamics of a perturbation system. Firstly, we consider the unperturbatio...
The motion of a particle subjected to simple inner (outer) periodic perturbations when it evolves ar...
Melnikov's method is an analytical way to show the existence of classical chaos generated by a Smale...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...