Heteroclinic points of multi-dimensional dynamical systems

Date

2003-04-15

Authors

Cheban, David N.
Duan, Jinqiao
Gherco, Anatoly

Journal Title

Journal ISSN

Volume Title

Publisher

Southwest Texas State University, Department of Mathematics

Abstract

The authors investigate dynamical behavior of multi-dimensional dynamical systems. These are the systems with a multi-dimensional independent ``time" variable. Especially they consider the problem of concordance, in the sense of Shcherbakov, of limit points and heteroclinic or homoclinic points for multi-dimensional dynamical systems and solutions of the multi-dimensional non-autonomous differential equations.

Description

Keywords

Topological dynamics, Transformation semigroup, Nonautonomous dynamical system, Limit set, Heteroclinic point, Almost periodicity, Concordance, Multi-dimensional differential equations

Citation

Cheban, D. N., Duan, J., & Gherco, A. (2003). Heteroclinic points of multi-dimensional dynamical systems. <i>Electronic Journal of Differential Equations, 2003</i>(41), pp. 1-21.

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Attribution 4.0 International

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