Strong orbit equivalence and residuality

Autor

  • Brett M. Werner

Słowa kluczowe

Ergodic theory, topological dynamics

Abstrakt

We consider a class of minimal Cantor systems that up to conjugacy contains all systems strong orbit equivalent to a given system. We define a metric on this strong orbit equivalence class and prove several properties about the resulting metric space including that the space is complete and separable but not compact. If the strong orbit equivalence class contains a finite rank system, we show that the set of finite rank systems is residual in the metric space. The final result shown is that the set of systems with zero entropy is residual in every strong orbit equivalence class of this type.

Pobrania

Opublikowane

2012-04-23

Jak cytować

1.
WERNER, Brett M. Strong orbit equivalence and residuality. Topological Methods in Nonlinear Analysis [online]. 23 kwiecień 2012, T. 39, nr 2, s. 285–310. [udostępniono 4.7.2025].

Numer

Vol 39, No 2 (June 2012)

Dział

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