Roundoff-induced coalescence of chaotic trajectories
- 1 September 1996
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review E
- Vol. 54 (3), R2201-R2204
- https://doi.org/10.1103/physreve.54.r2201
Abstract
Numerical experiments recently discussed in the literature show that identical nonlinear chaotic systems linked by a common noise term (or signal) may synchronize after a finite time. We study the process of synchronization as a function of the precision of calculations. Two generic behaviors of the average coalescence time are identified: exponential or linear. In both cases no synchronization occurs if iterations are done with infinite precision.Keywords
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This publication has 12 references indexed in Scilit:
- Stock exchange: A statistical modelChaos, Solitons, and Fractals, 1995
- Dynamical renormalization of anharmonic lattices at the onset of fracture: Analytical results for scaling, noise, and memoryPhysical Review B, 1995
- Maritan and Banavar ReplyPhysical Review Letters, 1994
- Comment on "Chaos, Noise, and Synchronization"Physical Review Letters, 1994
- Chaos, noise, and synchronizationPhysical Review Letters, 1994
- Transition from chaotic to nonchaotic behavior in randomly driven systemsPhysical Review Letters, 1992
- Statistics of trajectory separation in noisy dynamical systemsPhysics Letters A, 1992
- Synchronization in chaotic systemsPhysical Review Letters, 1990
- ITÉRATIONS D'ENDOMORPHISMES ET GROUPE DE RENORMALISATIONLe Journal de Physique Colloques, 1978
- Simple mathematical models with very complicated dynamicsNature, 1976