Abstract
In this paper we consider the existence and stability of chaotic patterns (periodic in space and chaotic in time) in coupled map lattice with local map f(x)= sin x . This is equivalent to investigating the stable chaotic set of some high-dimensional dynamical system. It is not easy in high-dimensional space to apply horseshoe technique or the theory of transversal homoclinic point and transversal cycles to show the existence of chaotic set. Motivated by the concept of anti-integrability (Aubry S. Physica D 1995;86:284–96), we prove the corresponding finite-dimensional system F α possesses stable chaotic set Λ α in phase space R N for the nonlinearity strength α appropriately large and the coupling strength small. Consequently, there exist stable chaotic patterns in CML system.
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