Compact non-uniformizable Li-Yorke chaotic dynamical systems via an example
Abstract
The main aim of this paper is extending the concept of scambled pair and Li--Yorke chaos to non--uniform compact dynamical systems. We show for finite (compact Alexandroff) topological space X with at least two elements the following statements are equivalent: one--sided shift σ:XN XN is Li--Yorke chaotic, one--sided shift σ:XN XN has at least one scrambled pair, one--sided shift σ:XN XN has at least one non--asymptotic pair, there exists a,b∈ X such that \a\\b\=, \\a\:a∈ X\=.
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