The Limit Cycles for a Class of Non-autonomous Piecewise Differential Equations

IF 1.9 3区 数学 Q1 MATHEMATICS
Renhao Tian, Yulin Zhao
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Abstract

In this paper, we study a class of non-autonomous piecewise differential equations defined as follows: \(dx/dt=a_{0}(t)+\sum _{i=1}^{n}a_{i}(t)|x|^{i}\), where \(n\in \mathbb {N}^{+}\) and each \(a_{i}(t)\) is real, 1-periodic, and smooth function. We deal with two basic problems related to their limit cycles \(\big (\text {isolated solutions satisfying} x(0) = x(1)\big )\). First, we prove that, for any given \(n\in \mathbb {N}^{+}\), there is no upper bound on the number of limit cycles of such equations. Second, we demonstrate that if \(a_{1}(t),\ldots , a_{n}(t)\) do not change sign and have the same sign in the interval [0, 1], then the equation has at most two limit cycles. We provide a comprehensive analysis of all possible configurations of these limit cycles. In addition, we extend the result of at most two limit cycles to a broader class of general non-autonomous piecewise polynomial differential equations and offer a criterion for determining the uniqueness of the limit cycle within this class of equations.

Abstract Image

一类非自治片断微分方程的极限循环
本文研究一类定义如下的非自治片断微分方程:\dx/dt=a_{0}(t)+sum_{i=1}^{n}a_{i}(t)|x|^{i}\),其中\(n\in \mathbb {N}^{+}\) and each \(a_{i}(t)\) is real, 1-periodic, and smooth function.我们要解决两个与它们的极限循环相关的基本问题((text {isolated solutions satisfying} x(0) = x(1)\big ))。首先,我们证明,对于任何给定的 \(n\in \mathbb {N}^{+}\),这类方程的极限循环数是没有上限的。其次,我们证明了如果 \(a_{1}(t),\ldots , a_{n}(t)\) 在区间 [0, 1] 内不改变符号且符号相同,那么方程最多有两个极限循环。我们对这些极限循环的所有可能配置进行了全面分析。此外,我们还将最多两个极限循环的结果扩展到更广泛的一般非自治片断多项式微分方程类别,并提供了在该类方程中确定极限循环唯一性的准则。
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来源期刊
Qualitative Theory of Dynamical Systems
Qualitative Theory of Dynamical Systems MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
2.50
自引率
14.30%
发文量
130
期刊介绍: Qualitative Theory of Dynamical Systems (QTDS) publishes high-quality peer-reviewed research articles on the theory and applications of discrete and continuous dynamical systems. The journal addresses mathematicians as well as engineers, physicists, and other scientists who use dynamical systems as valuable research tools. The journal is not interested in numerical results, except if these illustrate theoretical results previously proved.
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