A+ CATEGORY SCIENTIFIC UNIT

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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