Distributional chaos of time-varying discrete
 dynamical systems

Lidong Wang; Yingnan Li; Yuelin Gao; Heng Liu

doi:10.4064/ap107-1-3

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Distributional chaos of time-varying discrete dynamical systems

Volume 107 / 2013

Lidong Wang, Yingnan Li, Yuelin Gao, Heng Liu Annales Polonici Mathematici 107 (2013), 49-57 MSC: Primary 54H20; Secondary 37F99. DOI: 10.4064/ap107-1-3

Abstract

This paper is concerned with distributional chaos of time-varying discrete systems in metric spaces. Some basic concepts are introduced for general time-varying systems, including sequentially distributive chaos, weak mixing, and mixing. We give an example of sequentially distributive chaos of finite-dimensional linear time-varying dynamical systems, which is not distributively chaotic of type $i$ ($DCi$ for short, $i=1, 2$). We also prove that two uniformly topological equiconjugate time-varying systems have simultaneously sequentially distributive chaos and weak topological mixing.

Authors

Lidong WangSchool of Science
Dalian Nationalities University
Dalian, 116600, Liaoning, China
and
School of Information and Computing, Science
Beifang University of Nationalities
Yinchuan 750021, Ningxia, China
e-mail
Yingnan LiMathematical Department
Liaoning Normal University
Dalian 116029, Liaoning, China
e-mail
Yuelin GaoSchool of Information and Computing Science
Beifang University of Nationalities
Yinchuan 750021, Ningxia, China
e-mail
Heng LiuSchool of Science
Dalian Nationalities University
Dalian 116600, Liaoning, China
e-mail

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