Dimension estimates and approximation in non-uniformly hyperbolic systems

Pub Date : 2024-02-12 DOI:10.1017/etds.2024.3

JUAN WANG, YONGLUO CAO, YUN ZHAO

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引用次数: 0

Abstract

Let

$f: M\rightarrow M$

be a

$C^{1+\alpha }$

diffeomorphism on an

$m_0$

-dimensional compact smooth Riemannian manifold M and

$\mu $

a hyperbolic ergodic f-invariant probability measure. This paper obtains an upper bound for the stable (unstable) pointwise dimension of

$\mu $

, which is given by the unique solution of an equation involving the sub-additive measure-theoretic pressure. If

$\mu $

is a Sinai–Ruelle–Bowen (SRB) measure, then the Kaplan–Yorke conjecture is true under some additional conditions and the Lyapunov dimension of

$\mu $

can be approximated gradually by the Hausdorff dimension of a sequence of hyperbolic sets

$\{\Lambda _n\}_{n\geq 1}$

. The limit behaviour of the Carathéodory singular dimension of

$\Lambda _n$

on the unstable manifold with respect to the super-additive singular valued potential is also studied.

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非均匀双曲系统中的维度估计和近似值

让 $f：Mrightarrow M$ 是 $m_0$ -dimensional compact smooth Riemannian manifold M 上的 $C^{1+\alpha }$ diffeomorphism，而 $\mu $ 是双曲遍历 f-invariant 概率度量。本文得到了 $\mu $ 的稳定（不稳定）点维度的上界，该维度由涉及次正量度理论压力的方程的唯一解给出。如果 $\mu $ 是西奈-鲁埃尔-鲍文（SRB）度量，那么在一些附加条件下，卡普兰-约克猜想是真的，并且 $\mu $ 的李雅普诺夫维度可以逐渐被双曲集合序列 $\{Lambda _n\}_{n\geq 1}$ 的豪斯多夫维度近似。此外，还研究了不稳定流形上 $\Lambda _n$ 的卡拉瑟奥多里奇异维度相对于超加奇异值势能的极限行为。

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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