圣彼得堡大学微分方程定性理论研究综述。I. 具有同轴点的微分方程稳定周期点和具有弱双曲不变集的系统

N. A. Begun, E. V. Vasil’eva, T. E. Zvyagintseva, Yu. A. Iljin
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引用次数: 0

摘要

Abstarct 本文是专门介绍圣彼得堡大学微分方程系过去 30 年科研成果的系列评论出版物中的第一篇。该系教职员工目前的科研兴趣可分为以下几个方向和主题:研究具有同轴点的差分变形的稳定周期点、研究具有弱双曲不变集的系统、本质上非线性系统的局部定性理论、立方系统家族的相位肖像分类、具有滞后非线性的系统和具有广义 Routh-Hurwitz 条件下非线性的系统(Aizerman 问题)的稳定条件。本文介绍了上述前两个课题的最新成果。在双曲点的稳定流形和不稳定流形相切于同曲(异曲)点,且同曲(异曲)点不是有限阶相切点的假设下,对具有同曲点的衍射稳定周期点进行了研究。针对中性、稳定和不稳定线性空间不满足 Lipschitz 条件的情况,对具有弱双曲不变集的系统进行了研究。
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Review of Research on the Qualitative Theory of Differential Equations at St. Petersburg University. I. Stable Periodic Points of Diffeomorphisms with Homoclinic Points and Systems with Weakly Hyperbolic Invariant Sets

Abstarct

This paper is the first in a series of review publications devoted to the results of scientific research that has been carried out in the Department of Differential Equations of St. Petersburg University over the past 30 years. The current scientific interests of the department staff can be divided into the following directions and topics: studying stable periodic points of diffeomorphisms with homoclinic points, the study of systems with weakly hyperbolic invariant sets, local qualitative theory of essentially nonlinear systems, classification of phase portraits of a family of cubic systems, and the stability conditions for systems with hysteretic nonlinearities and systems with nonlinearities under the generalized Routh–Hurwitz conditions (Aizerman problem). This paper presents recent results on the first two topics outlined above. The study of stable periodic points of diffeomorphisms with homoclinic points is carried out under the assumption that the stable and unstable manifolds of hyperbolic points are tangent at a homoclinic (heteroclinic) point, and the homoclinic (heteroclinic) point is not a point with a finite order of tangency. The research of systems with weakly hyperbolic invariant sets is conducted for the case when neutral, stable, and unstable linear spaces do not satisfy the Lipschitz condition.

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来源期刊
CiteScore
0.70
自引率
50.00%
发文量
44
期刊介绍: Vestnik St. Petersburg University, Mathematics  is a journal that publishes original contributions in all areas of fundamental and applied mathematics. It is the prime outlet for the findings of scientists from the Faculty of Mathematics and Mechanics of St. Petersburg State University. Articles of the journal cover the major areas of fundamental and applied mathematics. The following are the main subject headings: Mathematical Analysis; Higher Algebra and Numbers Theory; Higher Geometry; Differential Equations; Mathematical Physics; Computational Mathematics and Numerical Analysis; Statistical Simulation; Theoretical Cybernetics; Game Theory; Operations Research; Theory of Probability and Mathematical Statistics, and Mathematical Problems of Mechanics and Astronomy.
期刊最新文献
Solution of the Local-Boundary-Value Problem of Control for a Nonlinear Stationary System Taking into Account Computer System Verification On the Approximation of the Attraction Field of a Rigid Body by the Attraction Field of Four Material Points of the Same Mass Rigid-Body Dynamics from the Euler Equations to the Attitude Control of Spacecraft in the Works of Scientists from St. Petersburg State University. Part 2 Regression Models for Calculating State-to-State Coefficients of the Rate of Vibrational Energy Exchanges Astronomical Research at the Mathematics Faculty of St. Petersburg University, I
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