戴克平移和异相贝克图的周期点分布

arXiv - MATH - Dynamical Systems Pub Date : 2024-09-02 DOI:arxiv-2409.01261

Hiroki Takahasi

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引用次数: 0

摘要

异相贝克映射是正方形或立方体上的片断仿射映射，是最简单的部分双曲系统之一。戴克平移是一个著名的子平移例子，它有两个完全支持的最大熵的遍历度量（MMEs）。我们证明，戴克平移的两个遍历最大熵（MME）表现为不同乘数的周期点集合的渐近分布。我们将这一结果转移到异相贝克映射，并证明它们的两个遍历最大熵（MME）表示为不同不稳定维数的周期点集的渐近分布。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Distributions of periodic points for the Dyck shift and the heterochaos baker maps

The heterochaos baker maps are piecewise affine maps on the square or the cube that are one of the simplest partially hyperbolic systems. The Dyck shift is a well-known example of a subshift that has two fully supported ergodic measures of maximal entropy (MMEs). We show that the two ergodic MMEs of the Dyck shift are represented as asymptotic distributions of sets of periodic points of different multipliers. We transfer this result to the heterochaos baker maps, and show that their two ergodic MMEs are represented as asymptotic distributions of sets of periodic points of different unstable dimensions.

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arXiv - MATH - Dynamical Systems

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