Motion of a biharmonic system under action of small periodic force and small damped force is studied. The biharmonic oscillator is a physical system acting under a biharmonic force like asinθ+bsin2θ. The article contains biharmonic oscillator analysis, phase space research, and analytic solutions for separatrixes. The biharmonic oscillator performs chaotic motion near separatrixes under small perturbations. Melnikov method gives analytical criterion for heteroclinic chaos in terms of system parameters. A transition from chaotic to regular motion of the biharmonic oscillator was found as the heteroclinic chaos can be removed by increasing the coefficient of a damping force. The analytical results obtained using Melnikov method have been co...
The nonlinear dynamics of a single-degree-of-freedom oscillator with an external excitation and comp...
Melnikov-method-based theoretical results are demonstrated concerning the relative effectiveness of ...
This paper deals with forced vibrations of two-DOF systems with more than one equilibrium positions....
In this paper, chaotic dynamics of a mixed Rayleigh–Liénard oscillator driven by parametric periodic...
In this study, the critical conditions for generating chaos in a Duffing oscillator with nonlinear d...
[[abstract]]This paper investigates the chaotic motion in forced Duffing oscillator due to linear an...
The homoclinic bifurcation and transition to chaos in gear systems are studied both analytically and...
The achieved result is the elaboration of the basic theory for searching chaotic oscillations and no...
Introduction. Modern methods of stabilizing a frequency of self-oscillations use an improvement of t...
Chaotic oscillations of a harmonically excited mass on a non-linear isolator are investigated. The m...
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecew...
Abstract The Duffing-Van der Pol equation with fifth nonlinear-restoring force and one external forc...
The dissipative chaotic dynamics of a particle subjected to a horizontally vibrating periodic potent...
Chaotic vibration is a new nonlinear vibration phenomenon where a periodic input to a nonlinear syst...
International audienceThis paper deals with forced vibrations of two-DOF systems with more than one ...
The nonlinear dynamics of a single-degree-of-freedom oscillator with an external excitation and comp...
Melnikov-method-based theoretical results are demonstrated concerning the relative effectiveness of ...
This paper deals with forced vibrations of two-DOF systems with more than one equilibrium positions....
In this paper, chaotic dynamics of a mixed Rayleigh–Liénard oscillator driven by parametric periodic...
In this study, the critical conditions for generating chaos in a Duffing oscillator with nonlinear d...
[[abstract]]This paper investigates the chaotic motion in forced Duffing oscillator due to linear an...
The homoclinic bifurcation and transition to chaos in gear systems are studied both analytically and...
The achieved result is the elaboration of the basic theory for searching chaotic oscillations and no...
Introduction. Modern methods of stabilizing a frequency of self-oscillations use an improvement of t...
Chaotic oscillations of a harmonically excited mass on a non-linear isolator are investigated. The m...
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecew...
Abstract The Duffing-Van der Pol equation with fifth nonlinear-restoring force and one external forc...
The dissipative chaotic dynamics of a particle subjected to a horizontally vibrating periodic potent...
Chaotic vibration is a new nonlinear vibration phenomenon where a periodic input to a nonlinear syst...
International audienceThis paper deals with forced vibrations of two-DOF systems with more than one ...
The nonlinear dynamics of a single-degree-of-freedom oscillator with an external excitation and comp...
Melnikov-method-based theoretical results are demonstrated concerning the relative effectiveness of ...
This paper deals with forced vibrations of two-DOF systems with more than one equilibrium positions....