Invariant sets and nilpotency of endomorphisms of algebraic sofic shifts

Pub Date : 2024-02-15 DOI:10.1017/etds.2023.120

TULLIO CECCHERINI-SILBERSTEIN, MICHEL COORNAERT, XUAN KIEN PHUNG

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Abstract

Let G be a group and let V be an algebraic variety over an algebraically closed field K. Let A denote the set of K-points of V. We introduce algebraic sofic subshifts

${\Sigma \subset A^G}$

and study endomorphisms

$\tau \colon \Sigma \to \Sigma $

. We generalize several results for dynamical invariant sets and nilpotency of

$\tau $

that are well known for finite alphabet cellular automata. Under mild assumptions, we prove that

$\tau $

is nilpotent if and only if its limit set, that is, the intersection of the images of its iterates, is a singleton. If moreover G is infinite, finitely generated and

$\Sigma $

is topologically mixing, we show that

$\tau $

is nilpotent if and only if its limit set consists of periodic configurations and has a finite set of alphabet values.

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代数索非平移的不变集和内态的无势性

让 G 是一个群，让 V 是一个代数封闭域 K 上的代数簇，让 A 表示 V 的 K 点集合。我们引入代数的 sofic 子转移 ${Sigma \subset A^G}$ 并研究 $\tau \colon \Sigma \to \Sigma $ 的内同构。我们对有限字母蜂窝自动机中众所周知的动力学不变集和 $\tau $ 的无势性的几个结果进行了归纳。在温和的假设条件下，我们证明当且仅当 $\tau $ 的极限集（即其迭代的图像的交集）是单子时，它才是无穷的。此外，如果 G 是无限的、有限生成的，并且 $\Sigma $ 是拓扑混合的，那么我们证明，只有当其极限集由周期性配置组成，并且具有有限的字母值集时，$\tau $ 才是无穷的。

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