Affiliation:
1. College of Mathematics and Statistics, Sichuan University of Science and Engineering, Zigong 643000, China
2. South Sichuan Applied Mathematics Research Center, Zigong 643000, China
Abstract
This paper focuses on the relationship between a non-autonomous discrete dynamical system (NDDS) (H,f1,∞) and its induced set-valued discrete dynamical systems (K(H),f¯1,∞). Specifically, it explores the chaotic properties of these systems. The main finding is that f1,∞ is Devaney chaotic if and only if f¯1,∞ is Devaney chaotic in we-topology. The paper also provides similar conclusions for weak mixing, mixing, mild mixing, chain-transitivity, and chain-mixing in non-autonomous set-valued discrete dynamical systems (NSDDSs). Additionally, the paper proves that weak mixing implies sensitivity in NSDDSs.
Funder
Natural Science Foundation of Sichuan Province
Scientific Research and Innovation Team Program of Sichuan University of Science and Engineering
Subject
Geometry and Topology,Logic,Mathematical Physics,Algebra and Number Theory,Analysis
Cited by
1 articles.
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