This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecewise-linearity. The Chen–Langford (C–L) method is used to obtain the averaged system of the oscillator. Using this method, the local bifurcation and the stability of the steady-state solutions are studied. A Runge–Kutta method, Poincaré map and the largest Lyapunov’s exponent are used to detect the complex dynamical phenomena of the system. It is found that the system with piecewise-linearity exhibits periodic oscillations, period-doubling, period-3 solution and then chaos. When chaos is found, it is detected by examining the phase plane, bifurcation diagram and the largest Lyapunov’s exponent. The results obtained in this paper show that the ...
The bifurcation structure of coupled periodically driven double-well Duffing oscillators is investig...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
A global symmetric period-1 approximate solution is analytically constructed for the non-resonant pe...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
In this paper, nonlinear frequency-amplitude characteristics of periodic motions in a periodically f...
In this paper, chaotic dynamics of a mixed Rayleigh–Liénard oscillator driven by parametric periodic...
. In this paper, a double pendulum system is studied for analyzing the dynamic behaviour near a crit...
In the paper, a fractal nonlinear oscillator was investigated with the aim of identifying its chaoti...
A study is made of the free and forced oscillations in dynamic systems with hysteresis, on the basis...
We present a detailed investigation of the rich variety of bifurcations and chaos associated with a ...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
A simple driven piecewise-linear circuit, which exhibits an immense variety of bifurcation sequences...
International audienceAbstract This paper deals with the dynamics of a single-degree-of-freedom unil...
Abstract Bifurcation characteristics of a fractional non-smooth oscillator containing clearance cons...
The bifurcation structure of coupled periodically driven double-well Duffing oscillators is investig...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
A global symmetric period-1 approximate solution is analytically constructed for the non-resonant pe...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
In this paper, nonlinear frequency-amplitude characteristics of periodic motions in a periodically f...
In this paper, chaotic dynamics of a mixed Rayleigh–Liénard oscillator driven by parametric periodic...
. In this paper, a double pendulum system is studied for analyzing the dynamic behaviour near a crit...
In the paper, a fractal nonlinear oscillator was investigated with the aim of identifying its chaoti...
A study is made of the free and forced oscillations in dynamic systems with hysteresis, on the basis...
We present a detailed investigation of the rich variety of bifurcations and chaos associated with a ...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
A simple driven piecewise-linear circuit, which exhibits an immense variety of bifurcation sequences...
International audienceAbstract This paper deals with the dynamics of a single-degree-of-freedom unil...
Abstract Bifurcation characteristics of a fractional non-smooth oscillator containing clearance cons...
The bifurcation structure of coupled periodically driven double-well Duffing oscillators is investig...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...