Stability analysis for the Lienard equation with discontinuous coefficients

IF 0.6 Q3 MATHEMATICS
A. V. Platonov
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引用次数: 0

Abstract

A nonlinear mechanical system, whose dynamics is described by a vector ordinary differential equation of the Lienard type, is considered. It is assumed that the coefficients of the equation can switch from one set of constant values to another, and the total number of these sets is, in general, infinite. Thus, piecewise constant functions with infinite number of break points on the entire time axis, are used to set the coefficients of the equation. A method for constructing a discontinuous Lyapunov function is proposed, which is applied to obtain sufficient conditions of the asymptotic stability of the zero equilibrium position of the equation studied. The results found are generalized to the case of a nonstationary Lienard equation with discontinuous coefficients of a more general form. As an auxiliary result of the work, some methods for analyzing the question of sign-definiteness and approaches to obtaining estimates for algebraic expressions, that represent the sum of power-type terms with non-stationary coefficients, are developed. The key feature of the study is the absence of assumptions about the boundedness of these non-stationary coefficients or their separateness from zero. Some examples are given to illustrate the established results.
系数不连续Lienard方程的稳定性分析
考虑一个非线性力学系统,其动力学用Lienard型矢量常微分方程来描述。假设方程的系数可以从一组常数值转换到另一组常数值,并且这些常数值集合的总数通常是无限的。因此,使用在整个时间轴上具有无限个断点的分段常数函数来设置方程的系数。提出了一种构造不连续Lyapunov函数的方法,并应用该方法得到了所研究方程零平衡位置渐近稳定的充分条件。所得结果推广到具有不连续系数的非平稳Lienard方程的更一般形式。作为本工作的辅助成果,本文给出了一些符号确定性问题的分析方法和表示非平稳系数幂型项和的代数表达式的估计方法。该研究的关键特征是没有假设这些非平稳系数的有界性或它们与零的分离性。给出了一些算例来说明所建立的结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.20
自引率
40.00%
发文量
27
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