华东师范大学学报(自然科学版) >

2022 , Vol. 2022 >Issue 6: 38 - 43

DOI: https://doi.org/10.3969/j.issn.1000-5641.2022.06.005

数学

一类非线性离散动力系统反周期解的存在性

  • 孟鑫
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  • 吉林师范大学 数学学院, 吉林 四平 136000
孟 鑫, 男, 博士, 副教授, 研究方向为动力系统. E-mail: xinmeng@jlnu.edu.cn

收稿日期: 2021-03-23

  网络出版日期: 2022-11-22

基金资助

国家自然科学基金(10971084)

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Existence of anti-periodic solutions for a class of nonlinear discrete dynamical systems

  • Xin MENG
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  • College of Mathematics, Jilin Normal University, Siping, Jilin 136000, China

Received date: 2021-03-23

  Online published: 2022-11-22

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摘要

本文研究了一类具有可求和二分性的非线性离散动力系统反周期解的存在性问题. 应用Banach不动点定理, 给出了非线性离散动力系统存在唯一反周期解的一些充分条件. 最后通过实例说明了主要结论在实际问题中的应用.

关键词: 可求和二分性; 反周期解; Banach不动点定理

本文引用格式

孟鑫 . 一类非线性离散动力系统反周期解的存在性[J]. 华东师范大学学报(自然科学版), 2022 , 2022(6) : 38 -43 . DOI: 10.3969/j.issn.1000-5641.2022.06.005

Abstract

This paper explores the existence of anti-periodic solutions for a class of nonlinear discrete dynamical systems with summable dichotomy. Using the Banach fixed-point theorem, sufficient conditions for the existence and uniqueness of anti-periodic solutions for nonlinear discrete dynamical systems are established. Lastly, an example is presented to illustrate the main results.

Key words: summable dichotomy; anti-periodic solution; Banach fixed-point theorem

参考文献

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