关于树木的分街道和更多信息

Pub Date : 2024-04-08 DOI:10.1017/etds.2023.108

ALEXANDRE BARAVIERA, RENAUD LEPLAIDEUR

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引用次数: 0

摘要

我们定义了有色二叉树上的一种替换概念，称之为子街垒。我们将证明，由substreetution固定的点可能是（也可能不是）几乎周期性的，因此在$\mathbb {F}_{2}^{+}$ 作用下的轨道闭合可能是（也可能不是）最小的。我们研究了一个特殊的例子：我们证明了它属于极小的情况，而且极小集合中的前像数只是以指数级的速度增长，而这本可以是超指数级的增长。我们还举例说明了在其轨道上没有不变度量的周期树。我们利用我们的构造得到了双曲盘的准周期彩色倾斜。

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Substreetutions and more on trees

We define a notion of substitution on colored binary trees that we call substreetution. We show that a point fixed by a substreetution may (or not) be almost periodic, and thus the closure of the orbit under the

$\mathbb {F}_{2}^{+}$

-action may (or not) be minimal. We study one special example: we show that it belongs to the minimal case and that the number of preimages in the minimal set increases just exponentially fast, whereas it could be expected a super-exponential growth. We also give examples of periodic trees without invariant measures on their orbit. We use our construction to get quasi-periodic colored tilings of the hyperbolic disk.

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