Chaotic intermittency of patterns in symmetric systems
نویسنده
چکیده
We examine some properties of attractors for symmetric dynamical systems that show what we refer to as`chaotic intermittency'. These are attractors that contain points with several diierent symmetry types, with the consequence that attracted trajectories come arbitrarily close to possessing a variety of diierent symmetries. Such attractors include heteroclinic attractors, on-oo and in-out intermittency and cycling chaos. We indicate how they can be created at bifurcation, some open problems and further reading.
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