In this paper, chaotic dynamics of a mixed Rayleigh–Liénard oscillator driven by parametric periodic damping and external excitations is investigated analytically and numerically. The equilibrium points and their stability evolutions are analytically analyzed, and the transitions of dynamical behaviors are explored in detail. Furthermore, from the Melnikov method, the analytical criterion for the appearance of the homoclinic chaos is derived. Analytical prediction is tested against numerical simulations based on the basin of attraction of initial conditions. As a result, it is found that for ω=ν, the chaotic region decreases and disappears when the amplitude of the parametric periodic damping excitation increases. Moreover, increasing of F1...
Motion of a biharmonic system under action of small periodic force and small damped force is studied...
One of the most important discoveries in the study of nonlinear dynamical systems in the last decade...
A global symmetric period-1 approximate solution is analytically constructed for the non-resonant pe...
The regular and chaotic behavior of modified Rayleigh-Duffing oscilla-tor is studied. We consider in...
AbstractInteractions between two parametrically coupled self-excited oscillators are analysed in the...
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecew...
The chaotic motions of the Duffing-Van der Pol oscillator with external and parametric excitations a...
In this paper, the nonlinear dynamics of certain damped and forced versions of velocity-dependent po...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
The present study considers the nonlinear dynamics of a Duffing oscillator under a symmetric potenti...
In this work the strange behavior of an impact oscillator with a one-sided elastic constraint discov...
Finding chaotic oscillators with unique properties is a hot topic. In this paper, a symmetric oscill...
The nonlinear dynamics of a single-degree-of-freedom oscillator with an external excitation and comp...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
The bifurcation structure of coupled periodically driven double-well Duffing oscillators is investig...
Motion of a biharmonic system under action of small periodic force and small damped force is studied...
One of the most important discoveries in the study of nonlinear dynamical systems in the last decade...
A global symmetric period-1 approximate solution is analytically constructed for the non-resonant pe...
The regular and chaotic behavior of modified Rayleigh-Duffing oscilla-tor is studied. We consider in...
AbstractInteractions between two parametrically coupled self-excited oscillators are analysed in the...
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecew...
The chaotic motions of the Duffing-Van der Pol oscillator with external and parametric excitations a...
In this paper, the nonlinear dynamics of certain damped and forced versions of velocity-dependent po...
In this paper, bifurcation trees of periodic motions in a periodically forced, time-delayed, hardeni...
The present study considers the nonlinear dynamics of a Duffing oscillator under a symmetric potenti...
In this work the strange behavior of an impact oscillator with a one-sided elastic constraint discov...
Finding chaotic oscillators with unique properties is a hot topic. In this paper, a symmetric oscill...
The nonlinear dynamics of a single-degree-of-freedom oscillator with an external excitation and comp...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
The bifurcation structure of coupled periodically driven double-well Duffing oscillators is investig...
Motion of a biharmonic system under action of small periodic force and small damped force is studied...
One of the most important discoveries in the study of nonlinear dynamical systems in the last decade...
A global symmetric period-1 approximate solution is analytically constructed for the non-resonant pe...