Li–Yorke chaos of linear differential equations in a finite-dimensional space with a weak topology

Xu Zhang; Nan Jiang; Qigui Yang; Guanrong Chen

doi:10.1063/5.0163463

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Li–Yorke chaos of linear differential equations in a finite-dimensional space with a weak topology

Chaos An Interdisciplinary Journal of Nonlinear Science 33(8)

Article 2023 English

Abstract

1 min read

Li–Yorke chaos of linear differential equations in a finite-dimensional space with a weak topology is introduced. Based on this topology on the Euclidean space, a flow generated from a linear differential equation is proved to be Li–Yorke chaotic under certain conditions, which is in sharp contract to the well-known fact that linear differential equations cannot be chaotic in a finite-dimensional space with a strong topology.

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