Pinning Control of Spatiotemporal Chaos
- 13 October 1997
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 79 (15) , 2795-2798
- https://doi.org/10.1103/physrevlett.79.2795
Abstract
Linear control theory is used to develop an improved localized control scheme for spatially extended chaotic systems, which is applied to a coupled map lattice as an example. The optimal arrangement of the control sites is shown to depend on the symmetry properties of the system, while their minimal density depends on the strength of noise in the system. The method is shown to work in any region of parameter space and requires a significantly smaller number of controllers compared to the method proposed earlier by Hu and Qu [Phys. Rev. Lett. 72, 68 (1994)]. A nonlinear generalization of the method for a 1D lattice is also presented.Keywords
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This publication has 14 references indexed in Scilit:
- Stabilizing chaotic vortex trajectories: an example of high-dimensional controlPhysics Letters A, 1996
- Controlling chaos in high dimensions: Theory and experimentPhysical Review E, 1996
- Stabilizing and characterizing unstable states in high-dimensional systems from time seriesPhysical Review E, 1995
- Controlling hyperchaos in a multimode laser modelPhysical Review E, 1994
- Synchronization of spatiotemporal chaotic systems by feedback controlPhysical Review E, 1994
- Ternary coherent phase diagram on the FCC latticeJournal de Physique I, 1994
- Tracking unstable periodic orbits in the Belousov-Zhabotinsky reactionPhysical Review Letters, 1994
- Controlling extended systems of chaotic elementsPhysical Review Letters, 1994
- Multiparameter Control of High-Dimensional Chaotic SystemsEurophysics Letters, 1994
- Period-Doubling of Kink-Antikink Patterns, Quasiperiodicity in Antiferro-Like Structures and Spatial Intermittency in Coupled Logistic Lattice: Towards a Prelude of a "Field Theory of Chaos"Progress of Theoretical Physics, 1984