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Autores principales: Lin, Wanshan, Tian, Xueting
Formato: Preprint
Publicado: 2024
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Acceso en línea:https://arxiv.org/abs/2409.03310
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author Lin, Wanshan
Tian, Xueting
author_facet Lin, Wanshan
Tian, Xueting
contents In this paper, we pay attention to a weaker version of Walters's question on the existence of non-uniform cocycles for uniquely ergodic minimal dynamical systems on non-degenerate connected spaces. We will classify such dynamical systems into three classes: not totally uniquely ergodic; totally uniquely ergodic but not topological weakly mixing; totally uniquely ergodic and topological weakly mixing. We will give an affirmative answer to such question for the first two classes. Also, we will show the existence of such dynamical systems in the first class with arbitrary topological entropy.
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spellingShingle Non-uniform Cocycles for Some Uniquely Ergodic Minimal Dynamical Systems on Connected Spaces
Lin, Wanshan
Tian, Xueting
Dynamical Systems
In this paper, we pay attention to a weaker version of Walters's question on the existence of non-uniform cocycles for uniquely ergodic minimal dynamical systems on non-degenerate connected spaces. We will classify such dynamical systems into three classes: not totally uniquely ergodic; totally uniquely ergodic but not topological weakly mixing; totally uniquely ergodic and topological weakly mixing. We will give an affirmative answer to such question for the first two classes. Also, we will show the existence of such dynamical systems in the first class with arbitrary topological entropy.
title Non-uniform Cocycles for Some Uniquely Ergodic Minimal Dynamical Systems on Connected Spaces
topic Dynamical Systems
url https://arxiv.org/abs/2409.03310