Nonlinear Sciences – Chaotic Dynamics
Scientific paper
2001-04-18
CHAOS 11, 665-673 (2001)
Nonlinear Sciences
Chaotic Dynamics
10 pages including 12 postscript figures, revtex. Additional work in http://www.imedea.uib.es/Nonlinear . The paper with highe
Scientific paper
10.1063/1.1386397
We study the effect that the injection of a common source of noise has on the trajectories of chaotic systems, addressing some contradictory results present in the literature. We present particular examples of 1-d maps and the Lorenz system, both in the chaotic region, and give numerical evidence showing that the addition of a common noise to different trajectories, which start from different initial conditions, leads eventually to their perfect synchronization. When synchronization occurs, the largest Lyapunov exponent becomes negative. For a simple map we are able to show this phenomenon analytically. Finally, we analyze the structural stability of the phenomenon.
Hernandez-Garcia Emilio
Mirasso Claudio R.
Piro Oreste
Toral Raul
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