Nonlinearly coupled, damped oscillators at 1:1 frequency ratio, one oscillator being driven coherently for efficient excitation, are exemplified by a spherical swing with some phase-mismatch between drive and response. For certain damping range, excitation is found to succeed if it lags behind, but to produce a chaotic attractor if it leads the response. Although a period-doubhng sequence, for damping increasing, leads to the attractor, this is actually born as a hard (as regards amplitude) bifurcation at a zero growth-rate parametric line; as damping decreases, an unstable fixed point crosses an invariant plane to enter as saddle-focus a phase-space domain of physical solutions. A second hard bifurcation occurs at the zero mismatch line,...
We investigate the possibility of period doubling transition to temporal chaos of a coherent structu...
For certain flow regimes, the nonlinear differential equation Y¨=F(Y)−G, Y≥0, G\u3e0 and constant, m...
Bonhöffer-van der Pol(BVP) oscillator is one of classic model exhibiting typical nonlinear phenomena...
Coherently driven, dissipative nonlinear oscillators,(driving kept permanently in phase with the osc...
his paper addresses the amplitude and phase dynamics of a large system of nonlinearly coupled, non-i...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
PhDIn the case of certain nonlinear oscillators, both elapsed time t and the system’s primary state ...
A novel method to control multistability of nonlinear oscillators by applying dual-frequency driving...
International audienceA single-degree of freedom non-linear oscillator is considered. The non-linear...
Usually oscillators with periodic excitations show a periodic motion with frequency equal to the for...
The goal of this research is to explore criteria sufficient to produce oscillations, sample some dyn...
Phase oscillators are a common starting point for the reduced description of many single neuron mode...
We investigate numerically parametrically driven coupled nonlinear Schrödinger equations modeling th...
One of the most important discoveries in the study of nonlinear dynamical systems in the last decade...
Fluctuational transitions between the stationary states of periodically-driven nonlinear oscillators...
We investigate the possibility of period doubling transition to temporal chaos of a coherent structu...
For certain flow regimes, the nonlinear differential equation Y¨=F(Y)−G, Y≥0, G\u3e0 and constant, m...
Bonhöffer-van der Pol(BVP) oscillator is one of classic model exhibiting typical nonlinear phenomena...
Coherently driven, dissipative nonlinear oscillators,(driving kept permanently in phase with the osc...
his paper addresses the amplitude and phase dynamics of a large system of nonlinearly coupled, non-i...
Non-linear oscillators have seen intense research interest over recent decades.Throughout this time ...
PhDIn the case of certain nonlinear oscillators, both elapsed time t and the system’s primary state ...
A novel method to control multistability of nonlinear oscillators by applying dual-frequency driving...
International audienceA single-degree of freedom non-linear oscillator is considered. The non-linear...
Usually oscillators with periodic excitations show a periodic motion with frequency equal to the for...
The goal of this research is to explore criteria sufficient to produce oscillations, sample some dyn...
Phase oscillators are a common starting point for the reduced description of many single neuron mode...
We investigate numerically parametrically driven coupled nonlinear Schrödinger equations modeling th...
One of the most important discoveries in the study of nonlinear dynamical systems in the last decade...
Fluctuational transitions between the stationary states of periodically-driven nonlinear oscillators...
We investigate the possibility of period doubling transition to temporal chaos of a coherent structu...
For certain flow regimes, the nonlinear differential equation Y¨=F(Y)−G, Y≥0, G\u3e0 and constant, m...
Bonhöffer-van der Pol(BVP) oscillator is one of classic model exhibiting typical nonlinear phenomena...