Dynamically stable periodic rotations of a driven pendulum provide a unique mechanism for generating a uniform rotation from bounded excitations. This paper studies the effects of a small ellipticity of the driving, perturbing the classical parametric pendulum. The first finding is that the region in the parameter plane of amplitude and frequency of excitation where rotations are possible increases with the ellipticity. Second, the resonance tongues, which are the most characteristic feature of the classical bifurcation scenario of a parametrically driven pendulum, merge into a single region of instability. (C) 2010 Elsevier Ltd. All rights reserved
We present a mechanism for the generation of oscillations and nonlinear parametric amplification in ...
This paper investigates dynamics of double pendulum subjected to vertical parametric kinematic excit...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
NOTICE: this is the author’s version of a work that was accepted for publication in International Jo...
The authors consider the dynamics of the harmonically excited parametric pendulum when it exhibits r...
Two parametrically-induced phenomena are addressed in the context of a double pendulum subject to a ...
International audienceRotating solutions of a parametrically driven pendulum are studied via a pertu...
Well-behaved dynamical properties have been found in a parametrically damped pendulum. For various d...
Although parametric resonance occurs in areas disparate as quantum mechanics, cosmology, and the mec...
This work was supported by the Brazilian agencies FAPESP (JCS 2011/19296-1, FACP 2014/07043-0 and BM...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Resonance is the interaction between various oscillating subsystems of a given family of dynamical s...
We present a mechanism for the generation of oscillations and nonlinear parametric amplification in ...
This paper investigates dynamics of double pendulum subjected to vertical parametric kinematic excit...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
NOTICE: this is the author’s version of a work that was accepted for publication in International Jo...
The authors consider the dynamics of the harmonically excited parametric pendulum when it exhibits r...
Two parametrically-induced phenomena are addressed in the context of a double pendulum subject to a ...
International audienceRotating solutions of a parametrically driven pendulum are studied via a pertu...
Well-behaved dynamical properties have been found in a parametrically damped pendulum. For various d...
Although parametric resonance occurs in areas disparate as quantum mechanics, cosmology, and the mec...
This work was supported by the Brazilian agencies FAPESP (JCS 2011/19296-1, FACP 2014/07043-0 and BM...
The nonlinear dynamics of a parametrically excited pendulum is addressed. The proposed analytical ap...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
Numerical simulations have shown that a parametrically damped, but otherwise undriven pendulum posse...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Resonance is the interaction between various oscillating subsystems of a given family of dynamical s...
We present a mechanism for the generation of oscillations and nonlinear parametric amplification in ...
This paper investigates dynamics of double pendulum subjected to vertical parametric kinematic excit...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...