The asymptotic formulae in the problem on constructing hyperbolicity and stability regions of dynamical systems

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2016-01-01 DOI:10.13108/2016-8-3-58
L. S. Ibragimova, I. Mustafina, M. Yumagulov
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引用次数: 4

Abstract

The paper proposes a new general method allowing us to study the problem on constructing hyperbolicity and stability regions for nonlinear dynamical systems. The method is based on a modification of the method by M. Rozo for studying the stability of linear systems with periodic coefficients depending on a small parameter and on the asymptotic formulae in the perturbation theory of linear operators. We obtain approximate formulae describing the boundary of hyperbolicity and stability regions. As an example, we provide the scheme for constructing the stability regions for Mathieu equation.
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构造动力系统双曲域和稳定域问题的渐近公式
本文提出了一种新的通用方法来研究非线性动力系统的双曲域和稳定域的构造问题。该方法是基于M. Rozo研究周期系数线性系统依赖于小参数稳定性的方法和线性算子摄动理论中的渐近公式的改进。我们得到了描述双曲和稳定区域边界的近似公式。作为一个例子,我们给出了构造Mathieu方程稳定区域的格式。
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