一维动力系统

IF 1.4 4区数学 Q1 MATHEMATICS

Russian Mathematical Surveys Pub Date : 2021-10-01 DOI:10.1070/RM9998

L. Efremova, E. Makhrova

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引用次数: 0

摘要

该综述致力于定义在一维连续体上的映射的拓扑动力学，如闭区间、圆、有限图（例如，有限树）或枝晶（没有同胚于圆的子集的局部连通连续体）。研究了轨迹的周期性行为、马蹄形和同宿轨迹的存在以及拓扑熵的正性之间的联系。给出了区间、圆或有限图的连续映射中熵混沌的充要条件，以及枝晶连续映射中的熵混沌的充分条件。分析了在所考虑的连续体上定义的地图的性质之间的相似性和差异性的原因。考虑了Sharkovsky定理对某些直线或区间的不连续映射和平面上的连续映射的推广。参考书目：207种。

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One-dimensional dynamical systems

The survey is devoted to the topological dynamics of maps defined on one-dimensional continua such as a closed interval, a circle, finite graphs (for instance, finite trees), or dendrites (locally connected continua without subsets homeomorphic to a circle). Connections between the periodic behaviour of trajectories, the existence of a horseshoe and homoclinic trajectories, and the positivity of topological entropy are investigated. Necessary and sufficient conditions for entropy chaos in continuous maps of an interval, a circle, or a finite graph, and sufficient conditions for entropy chaos in continuous maps of dendrites are presented. Reasons for similarities and differences between the properties of maps defined on the continua under consideration are analyzed. Extensions of Sharkovsky’s theorem to certain discontinuous maps of a line or an interval and continuous maps on a plane are considered. Bibliography: 207 titles.

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来源期刊

Russian Mathematical Surveys 数学-数学

CiteScore

1.70

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Russian Mathematical Surveys is a high-prestige journal covering a wide area of mathematics. The Russian original is rigorously refereed in Russia and the translations are carefully scrutinised and edited by the London Mathematical Society. The survey articles on current trends in mathematics are generally written by leading experts in the field at the request of the Editorial Board.