关于两种混沌映射的有限乘积性质

首先在一般度量空间上给出有限积映射是Li-Yorke混沌的一个判据,并且用反倒展示:当有限积映射是Li-Yorke混沌时,未必一定存在因子映射是Li-Yorke混沌的.然后,利用上述判据,在[0,1]N上证明有限积映射有不可数scrsmbled集的一个充要条件.进而,推出关于有限积映射为Li-Yorke 混沌的一组等价...     

混沌与拓扑强混合

讨论了拓扑强混合、Li—Yorke混沌和修改的Devaney混沌三者之间的关系,我们得到:Li—Yorke混沌与修改的Devaney混沌无蕴涵关系;Li—Yorke混沌和修改的Devaney混沌均不能蕴涵着拓扑强混合,这解决了文献[1]中提出的两个问题.     

一类非本原代换与混沌

考虑由两个符号的非本原等长代换诱导的子移位.借助黄文、叶向东得到的一个结果,给出此子移位为Li-Yorke混沌的一个等价刻画.进而通过对点的渐近性态的探索,证明了任何这样的子移位都没有Schweizer-Smital对.     

广义Taylor映射与Hénon映射具有混沌条件的改进

本文进一步讨论了近年来动力系统中关于对具有混沌现象的Taylor映射,Henon映射等函数所做的研究,并着重分析了所讨论函数的参数.     

Smale横截同宿定理的推广与Lozi映射的混沌现象

该文首先将平面上的λ入引理及Ｓｍａｌｅ横截同宿定理推广到映射力局部不可微的情形，进而讨论了Ｌｏｚｉ映射的混沌现象，得到了一组保证该映射产生混沌的充分条件，详见图５．     

基于逻辑斯缔映射的三参数混沌动力学系统的行为研究

基于逻辑斯缔映射的三参数混沌动力学系统为 xn+1=μxn(1 -xλn+c) .本文讨论了参数λ∈ (0 ,5 .2 ) ,μ∈ (0 ,1 2 .8) ,0 <|c| 1 .1 5 条件下该系统的行为特性 .在用计算机模拟 0 >c -1 .1 5 条件下该系统的行为时 ,发现了嵌入周期 1 轨道中的混沌动力学过程 .该过程显现出一种通向混沌的新途径 ,混沌区内部具有特殊的秩序结构     

一类集值映射的传递性、混合性与混沌

考虑连续映射f: X→X以及f诱导的K(X)到自身的连续映射, 其中X为度量空间, K(X)为X的所有非空紧子集赋予Hausdorff 度量所得空间. 针对Román-Flores提出的f混沌是否蕴涵混沌以及Fedeli提出的什么时候f混沌蕴涵混沌的问题, 探讨f与的传递、弱混合和混合等相关动力性质之间的关系, 并应用所得结果对Román-Flores的问题和Fedeli的问题给出了满意的回答.     

一簇Lorenz映射的混沌行为与统计稳定性

该文研究一簇Ｌｏｒｅｎｚ映射犛犪：［０,１］→［０,１］（０＜犪＜１）犛犪（狓）＝狓＋犪　狓∈ ［０,１－犪）｛（狓＋犪－１）／犪　狓∈ ［１－犪,１］．从拓扑的角度考虑了犛犪的混沌行为,证明了：犛犪有稠密轨道;犛犪的周期的集合犘犘（犛犪）＝｛１,犿＋１,犿＋２,…｝,其中犿为使犪犿＜１－犪成立的最小正整数;犛犪的拓扑熵犺（犛犪）＞０;几乎所有（关于Ｌｅｂｅｓｇｕｅ测度）的点狓的Ｌｙａｐｕｎｏｖ指数λ（犛犪,狓）＝λ犪＞０．从统计的角度讨论了犛犪的稳定性．我们用下界函数方法证明了犛犪是统计稳定的,并且狌犵犪（犃）＝∫犃犵犪（狓）ｄ狓（犃∈犅）为犛犪的唯一绝对连续（关于Ｌｅｂｅｓｇｕｅ测度）不变概率测度．同时,不变密度犵犪在参数扰动和随机作用的随机扰动下是稳定的．     

Li-Yorke chaos in the system with impacts

The analogue of Li-Yorke chaos [T.Y. Li, J. Yorke, Period three implies chaos, Amer. Math. Monthly 87 (1975) 985-992] for a special initial value problem of a non-autonomous impulsive differential equation is developed.     

Unimodal mappings and Li-Yorke chaos

Conditions for unimodal mappings to have domains with a Li-Yorke chaotic behavior of trajectories are found. Translated fromMatematicheskie Zametki, Vol. 63, No. 5, pp. 679–689, May, 1998.     

Noncontinuous maps and Devaney’s chaos

Vu Dong Tô has proven in [1] that for any mapping f: X → X, where X is a metric space that is not precompact, the third condition in the Devaney’s definition of chaos follows from the first two even if f is not assumed to be continuous. This paper completes this result by analysing the precompact case. We show that if X is either finite or perfect one can always find a map f: X → X that satisfies the first two conditions of Devaney’s chaos but not the third. Additionally, if X is neither finite nor perfect there is no f: X → X that would satisfy the first two conditions of Devaney’s chaos at the same time.     

From a Floyd-Auslander minimal system to an odd triangular map

In 1989 A.N. Sharkovsky asked the question which of the properties characterizing continuous maps of the interval with zero topological entropy remain equivalent for triangular maps of the square. The problem is difficult and only partial results are known. However, in the case of triangular maps with nondecreasing fibres there are only few gaps in a classification (given by Z. Ko?an) of a set of 24 of these conditions. In the present paper we remove these gaps by giving an example of a triangular map in the square with the following properties:

(1)

all fibre maps are nondecreasing,

(2)

all recurrent points of the map are uniformly recurrent, and

(3)

the restriction of the map to the set of recurrent points has an uncountable scrambled set (and so is Li-Yorke chaotic).

The example is obtained by taking an appropriate Floyd-Auslander minimal system and then taking its appropriate continuous extension to a triangular map of the square.     

Recent development of chaos theory in topological dynamics

We give a summary on the recent development of chaos theory in topological dynamics,focusing on Li–Yorke chaos, Devaney chaos, distributional chaos, positive topological entropy, weakly mixing sets and so on, and their relationships.     

Chaos among self-maps of the Cantor space

Glasner and Weiss have shown that a generic homeomorphism of the Cantor space has zero topological entropy. Hochman has shown that a generic transitive homeomorphism of the Cantor space has the property that it is topologically conjugate to the universal odometer and hence far from being chaotic in any sense. We show that a generic self-map of the Cantor space has zero topological entropy. Moreover, we show that a generic self-map of the Cantor space has no periodic points and hence is not Devaney chaotic nor Devaney chaotic on any subsystem. However, we exhibit a dense subset of the space of all self-maps of the Cantor space each element of which has infinite topological entropy and is Devaney chaotic on some subsystem.     

An elementary approach to dynamics and bifurcations of skew tent maps

In this paper, the dynamics of skew tent maps are classified in terms of two bifurcation parameters. In time series analysis such maps are usually referred to as continuous threshold autoregressive models (TAR(1)-models) after Tong (Non-Linear Time Series, Clarendon Press, Oxford, UK, 1990). This study contains results simplifying the use of TAR(1)-models considerably, e.g. if a periodic attractor exists it is unique. On the other hand, we also claim that care must be exercised when TAR models are used. In fact, they possess a very special type of dynamical pattern with respect to the bifurcation parameters and their transition to chaos is far from standard.     

On the error-sum function of tent map base series

We first introduce tent map base series. The tent map base series is special case of generalized Lüroth series which has the tent map as a base map. Then we study some elementary properties of its error-sum function, and show that the function is continuous.