动力学系统的同源性和 K 理论 IV.类群同源性的进一步结构性结果

Pub Date : 2024-05-15 DOI:10.1017/etds.2024.37

VALERIO PROIETTI, Makoto Yamashita

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引用次数: 0

摘要

我们考虑的是 Crainic 和 Moerdijk 引入的 étale 子群的同调理论[A homology theory for étale groupoids.J. Reine Angew.Math.521 (2000)，25-46]，特别关注拓扑动力学系统中产生的群集。我们证明了群集乘积的库奈特公式，以及轨道为欧几里得空间副本的主群集的波恩卡列对偶类型结果。最后，我们举例说明了与自相似作用等零能群相关的系统的计算，并推广了伯克和普特南之前对代数数产生的类似孤子的系统进行的同调计算。对于后一种系统，我们证明了HK猜想，即使所得到的群集不是充裕的。

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Homology and K-theory of dynamical systems IV. Further structural results on groupoid homology

We consider the homology theory of étale groupoids introduced by Crainic and Moerdijk [A homology theory for étale groupoids. J. Reine Angew. Math.521 (2000), 25–46], with particular interest to groupoids arising from topological dynamical systems. We prove a Künneth formula for products of groupoids and a Poincaré-duality type result for principal groupoids whose orbits are copies of an Euclidean space. We conclude with a few example computations for systems associated to nilpotent groups such as self-similar actions, and we generalize previous homological calculations by Burke and Putnam for systems which are analogues of solenoids arising from algebraic numbers. For the latter systems, we prove the HK conjecture, even when the resulting groupoid is not ample.

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