Add to ORKGWe describe the two generic instabilities which arise in quasireversible systems and show that their normal forms are the well-known real Lorenz equations and the Maxwell-Bloch equations. We present for the first time analytic predictions for the appearance of Lorenz chaos and we describe a simple mechanical system which experimentally displays this chaotic behavior
In this study basic principles of Chaos in Dynamics will be presented in the context of Lorenz Equat...
AbstractThis study compares the dynamic behaviors of the Lorenz system with complex variables to tha...
AbstractWe describe a computerized proof, using methods of interval arithmetic and recent results of...
The theory of deterministic chaos has generated a lot of interest and continues to be one of the muc...
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 study from the point of view of quasi-reversible instabilities the onset of chaos in the one dime...
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems. ...
We characterize the three generic quasi-reversible instabilities of closed orbits: the quasi-reversi...
The mechanism responsible for the emergence of chaotic behavior has been singled out analytically wi...
SIGLEAvailable from British Library Document Supply Centre- DSC:D41075/82 / BLDSC - British Library ...
This research introduces and analyzes the famous Lorenz equations which are a classical example of a...
We investigate the Hopf bifurcation of the synchronous chaos in coupled Lorenz oscillators. We find ...
It is found that Lorenz systems can be unidirectionally coupled such that the chaos expands from the...
The complex Lorenz equations are a nonlinear fifth-order set of physically derived differential equa...
In this study basic principles of Chaos in Dynamics will be presented in the context of Lorenz Equat...
AbstractThis study compares the dynamic behaviors of the Lorenz system with complex variables to tha...
AbstractWe describe a computerized proof, using methods of interval arithmetic and recent results of...
The theory of deterministic chaos has generated a lot of interest and continues to be one of the muc...
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 study from the point of view of quasi-reversible instabilities the onset of chaos in the one dime...
We study the resonance at zero frequency in presence of a neutral mode in quasi-reversible systems. ...
We characterize the three generic quasi-reversible instabilities of closed orbits: the quasi-reversi...
The mechanism responsible for the emergence of chaotic behavior has been singled out analytically wi...
SIGLEAvailable from British Library Document Supply Centre- DSC:D41075/82 / BLDSC - British Library ...
This research introduces and analyzes the famous Lorenz equations which are a classical example of a...
We investigate the Hopf bifurcation of the synchronous chaos in coupled Lorenz oscillators. We find ...
It is found that Lorenz systems can be unidirectionally coupled such that the chaos expands from the...
The complex Lorenz equations are a nonlinear fifth-order set of physically derived differential equa...
In this study basic principles of Chaos in Dynamics will be presented in the context of Lorenz Equat...
AbstractThis study compares the dynamic behaviors of the Lorenz system with complex variables to tha...
AbstractWe describe a computerized proof, using methods of interval arithmetic and recent results of...