Syndetically proximal pairs

Abstract. To any continuous eigenvalue of a Cantor minimal system (X, T ), we associate an element of the dimension group K 0 (X, T ) associated to (X, T ). We introduce and study the concept of irrational miscibility of a dimension group. The main property of these dimension groups is the absence of irrational values in the additive group of continuous spectrum of their realizations by Cantor minimal systems. The strong orbit equivalence (respectively orbit equivalence) class of a Cantor minimal system associated to an irrationally miscible dimension group (G, u) (resp. with trivial infinitesimal subgroup) with trivial rational subgroup, have no non-trivial continuous eigenvalues.

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Shadowing, entropy and minimal subsystems

Moothathu

Oprocha

2013

Monatsh Math

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We consider non-wandering dynamical systems having the shadowing property, mainly in the presence of sensitivity or transitivity, and investigate how closely such systems resemble the shift dynamical system in the richness of various types of minimal subsystems. In our excavation, we do discover regularly recurrent points, sensitive almost 1-1 extensions of odometers, minimal systems with positive topological entropy, etc. We also show that transitive semi-distal systems with shadowing are in fact minimal equicontinuous systems (hence with zero entropy) and, in contrast to systems with shadowing, the entropy points do not have to be densely distributed in transitive systems.

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Syndetically proximal pairs

Cited by 18 publications

References 16 publications

Strong Proximality for Discontinuous Skew-Product Actions of Amenable Semigroups

Strong Proximality for Discontinuous Skew-Product Actions of Amenable Semigroups

Orbit equivalence of Cantor minimal systems and their continuous spectra

Shadowing, entropy and minimal subsystems

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