Point transitivity, $\Delta$-transitivity and multi-minimality
Abstract
Let be a topological dynamical system and be a Furstenberg family (a collection of subsets of with hereditary upward property). A point is called an -transitive point if for every non-empty open subset of the entering time set of into , , is in ; the system is called -point transitive if there exists some -transitive point. In this paper, we first discuss the connection between -point transitivity and -transitivity, and show that weakly mixing and strongly mixing systems can be characterized by -point transitivity, completing results in [Transitive points via Furstenberg family, Topology Appl. 158 (2011), 2221--2231]. We also show that multi-transitivity, -transitivity and multi-minimality can also be characterized by -point transitivity, answering two questions proposed by Kwietniak and Oprocha [On weak mixing, minimality and weak disjointness of all iterates, Erg. Th. Dynam. Syst., 32 (2012), 1661--1672].
Keywords
Cite
@article{arxiv.1307.4138,
title = {Point transitivity, $\Delta$-transitivity and multi-minimality},
author = {Zhijing Chen and Jian Li and Jie Lü},
journal= {arXiv preprint arXiv:1307.4138},
year = {2016}
}
Comments
19 pages, the final version. Change the title to "Point transitivity, $\Delta$-transitivity and multi-minimality"