An answer to Furstenberg’s problem on topological disjointness

Author:

HUANG WEN,SHAO SONG,YE XIANGDONG

Abstract

In this paper we give an answer to Furstenberg’s problem on topological disjointness. Namely, we show that a transitive system $(X,T)$ is disjoint from all minimal systems if and only if $(X,T)$ is weakly mixing and there is some countable dense subset $D$ of $X$ such that for any minimal system $(Y,S)$, any point $y\in Y$ and any open neighbourhood $V$ of $y$, and for any non-empty open subset $U\subset X$, there is $x\in D\cap U$ such that $\{n\in \mathbb{Z}_{+}:T^{n}x\in U,S^{n}y\in V\}$ is syndetic. Some characterization for the general case is also given. By way of application we show that if a transitive system $(X,T)$ is disjoint from all minimal systems, then so are $(X^{n},T^{(n)})$ and $(X,T^{n})$ for any $n\in \mathbb{N}$. It turns out that a transitive system $(X,T)$ is disjoint from all minimal systems if and only if the hyperspace system $(K(X),T_{K})$ is disjoint from all minimal systems.

Publisher

Cambridge University Press (CUP)

Subject

Applied Mathematics,General Mathematics

Cited by 4 articles. 订阅此论文施引文献 订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献

1. Parallels Between Topological Dynamics and Ergodic Theory;Encyclopedia of Complexity and Systems Science Series;2023

2. Characterizations of relativized distal points of topological dynamical systems;Topology and its Applications;2021-10

3. Bernoulli disjointness;Duke Mathematical Journal;2021-03-15

4. Parallels Between Topological Dynamics and Ergodic Theory;Encyclopedia of Complexity and Systems Science;2020

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