西尔皮斯基地毯上的显式动力系统

Pub Date : 2024-05-01 DOI:10.1016/j.indag.2024.02.003

Worapan Homsomboon

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引用次数: 0

摘要

我们通过使用 n-Chamanara 曲面的初始系统及其 n-baker 变换（n≥2），应用 Boroński 和 Oprocha 对 Sierpiński 地毯上动力系统的逆极限构造。我们证明，所有正实数都可以作为地毯上动力系统的度量熵值来实现。我们还简化了博罗斯基和奥普洛查的证明，证明地毯上的动力系统不具有鲍恩规范属性。

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Explicit dynamical systems on the Sierpiński carpet

We apply Boroński and Oprocha’s inverse limit construction of dynamical systems on the Sierpiński carpet by using the initial systems of $n$ -Chamanara surfaces and their $n$ -baker transformations, $n \geq 2$ . We show that all positive real numbers are realized as metric entropy values of dynamical systems on the carpet. We also produce a simplification of Boroński and Oprocha’s proof showing that dynamical systems on the carpet do not have the Bowen specification property.

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