Bishop–Jones’ theorem and the ergodic limit set

Pub Date : 2024-09-09 DOI:10.1017/etds.2024.49
NICOLA CAVALLUCCI
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Abstract

For a proper, Gromov-hyperbolic metric space and a discrete, non-elementary, group of isometries, we define a natural subset of the limit set at infinity of the group called the ergodic limit set. The name is motivated by the fact that every ergodic measure which is invariant for the geodesic flow on the quotient metric space is concentrated on geodesics with endpoints belonging to the ergodic limit set. We refine the classical Bishop–Jones theorem proving that the packing dimension of the ergodic limit set coincides with the critical exponent of the group.
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毕晓普-琼斯定理和遍历极限集
对于一个适当的格罗莫夫双曲度量空间和一个离散的非元素等轴群,我们定义了等轴群无穷远处极限集的一个自然子集,称为遍历极限集。这个名称的由来是,商度量空间上的大地流不变的每个遍历度量都集中在端点属于遍历极限集的大地流上。我们完善了经典的毕肖普-琼斯定理,证明了遍历极限集的堆积维度与群的临界指数重合。
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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