Combinatorial embedding of chain transitive zero-dimensional systems into chaos
Abstract
We show that a zero-dimensional chain transitive dynamical system can be embedded into a densely uniformly chaotic system, with dense uniformly chaotic set K. We concretely construct a Mycielski set K that is also invariant. Furthermore, every point in K is positively and negatively transitive. The uniform proximality and recurrence of K are also bidirectional.
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