Entropy, virtual Abelianness and Shannon orbit equivalence

Pub Date : 2024-04-02 DOI:10.1017/etds.2024.26

DAVID KERR, HANFENG LI

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Abstract

We prove that if two free probability-measure-preserving (p.m.p.) Abstract Image ${\mathbb Z}$-actions are Shannon orbit equivalent, then they have the same entropy. The argument also applies more generally to yield the same conclusion for free p.m.p. actions of finitely generated virtually Abelian groups. Together with the isomorphism theorems of Ornstein and Ornstein–Weiss and the entropy invariance results of Austin and Kerr–Li in the non-virtually-cyclic setting, this shows that two Bernoulli actions of any non-locally-finite countably infinite amenable group are Shannon orbit equivalent if and only if they are measure conjugate. We also show, at the opposite end of the stochastic spectrum, that every Abstract Image ${\mathbb Z}$-odometer is Shannon orbit equivalent to the universal ${\mathbb Z}$-odometer.

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熵、虚拟阿贝尔性和香农轨道等价性

我们证明，如果两个自由概率-度量保留（p.m.p. ）${/mathbb Z}$作用是香农轨道等价的，那么它们具有相同的熵。这个论证也适用于有限生成的虚拟阿贝尔群的自由p.m.p.作用。结合奥恩斯坦和奥恩斯坦-韦斯的同构定理，以及奥斯汀和克尔-李在非虚拟循环背景下的熵不变性结果，这表明任何非局部有限可数无限可调和群的两个伯努利作用，只有当且仅当它们是度量共轭的时候，才是香农轨道等价的。我们还证明，在随机频谱的另一端，每个 ${\mathbb Z}$-odometer 都与通用的 ${\mathbb Z}$-odometer 是香农轨道等价的。

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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