Add to ORKGWe study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems. The asymptotic normal form is derived and it is shown that in the presence of a reflection symmetry it is equivalent to the set of real Lorenz equations. Near the critical point an analytical condition for the persistence of an homoclinic curve is calculated and chaotic behavior is then predicted and its existence veri ed by direct numerical simulation. A simple mechanical pendulum is shown to be an example of the instability, and preliminary experimental results agree with the theoretical predictions
Abstract. Parametric excitations are capable of stabilizing an unstable state, but they can also des...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems....
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems. ...
We describe the two generic instabilities which arise in quasireversible systems and show that their...
We characterize the three generic quasi-reversible instabilities of closed orbits: the quasi-reversi...
We study from the point of view of quasi-reversible instabilities the onset of chaos in the one dime...
Nonideal systems are those in which one takes account of the influence of the oscillatory system on ...
In this paper, we suggest some sufficient conditions for the existence of homoclinic orbits of the o...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
A generic stationary instability that arises in quasi-reversible systems is studied. It is char-acte...
A generic stationary instability that arises in quasi-reversible systems is studied. It is character...
In this paper, we suggest some sufficient conditions for the existence of homoclinic orbits of the o...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Abstract. Parametric excitations are capable of stabilizing an unstable state, but they can also des...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems....
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems. ...
We describe the two generic instabilities which arise in quasireversible systems and show that their...
We characterize the three generic quasi-reversible instabilities of closed orbits: the quasi-reversi...
We study from the point of view of quasi-reversible instabilities the onset of chaos in the one dime...
Nonideal systems are those in which one takes account of the influence of the oscillatory system on ...
In this paper, we suggest some sufficient conditions for the existence of homoclinic orbits of the o...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
A generic stationary instability that arises in quasi-reversible systems is studied. It is char-acte...
A generic stationary instability that arises in quasi-reversible systems is studied. It is character...
In this paper, we suggest some sufficient conditions for the existence of homoclinic orbits of the o...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
Abstract. Parametric excitations are capable of stabilizing an unstable state, but they can also des...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...