The stationary and highly non-stationary resonant dynamics of the harmonically forced pendulum are described in the framework of a semi-inverse procedure combined with the Limiting Phase Trajectory concept. This procedure, implying only existence of slow time scale, permits one to avoid any restriction on the oscillation amplitudes. The main results relating to the dynamical bifurcation thresholds are represented in a closed form. The small parameter defining the separation of the time scales is naturally identified in the ana- lytical procedure. Considering the pendulum frequency as the control parameter we reveal two qualitative tran- sitions. One of them corresponding to stationary instability with formation of two additional stationa...
The trivial equilibrium of a controlled van der Pol-Duffing oscillator with nonlinear feedback contr...
This paper is concerned with the global coherent (i.e., non-chaotic) dynamics of the parametrically ...
Well-behaved dynamical properties have been found in a parametrically damped pendulum. For various d...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
In this letter we fill the gap in understanding the non-stationary Hamiltonian dynamics of the weakl...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Nonstationary (NS) processes or NS dynamical systems (DS) are characterized by the appearance of the...
AbstractVibrations of an autoparametric system, composed of a nonlinear mechanical oscillator with a...
The semi-inverse method based on using an internal small parameter of the nonlinear problems is disc...
International audienceA single-degree of freedom non-linear oscillator is considered. The non-linear...
In this thesis, the dynamics of weakly nonlinear multi degree-of-freedom systems under resonant exci...
Nonlinearly coupled, damped oscillators at 1:1 frequency ratio, one oscillator being driven coherent...
We discuss new phenomena of energy localization and transition to chaos in the finite system of coup...
Coherently driven, dissipative nonlinear oscillators,(driving kept permanently in phase with the osc...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
The trivial equilibrium of a controlled van der Pol-Duffing oscillator with nonlinear feedback contr...
This paper is concerned with the global coherent (i.e., non-chaotic) dynamics of the parametrically ...
Well-behaved dynamical properties have been found in a parametrically damped pendulum. For various d...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
In this letter we fill the gap in understanding the non-stationary Hamiltonian dynamics of the weakl...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Nonstationary (NS) processes or NS dynamical systems (DS) are characterized by the appearance of the...
AbstractVibrations of an autoparametric system, composed of a nonlinear mechanical oscillator with a...
The semi-inverse method based on using an internal small parameter of the nonlinear problems is disc...
International audienceA single-degree of freedom non-linear oscillator is considered. The non-linear...
In this thesis, the dynamics of weakly nonlinear multi degree-of-freedom systems under resonant exci...
Nonlinearly coupled, damped oscillators at 1:1 frequency ratio, one oscillator being driven coherent...
We discuss new phenomena of energy localization and transition to chaos in the finite system of coup...
Coherently driven, dissipative nonlinear oscillators,(driving kept permanently in phase with the osc...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
The trivial equilibrium of a controlled van der Pol-Duffing oscillator with nonlinear feedback contr...
This paper is concerned with the global coherent (i.e., non-chaotic) dynamics of the parametrically ...
Well-behaved dynamical properties have been found in a parametrically damped pendulum. For various d...