含参有理函数族M集的拓扑不变特性

利用Ｎｅｗｔｏｎ 法对应的有理函数族给出一系列新的广义Ｍａｎｄｅｌｂｒｏｔ 集和Ｊｕｌｉａ 集，通过计算机研究了它们与典型Ｍａｎｄｅｌｂｒｏｔ 集和Ｊｕｌｉａ 集之间的关系，并对Ｍａｎｄｅｌｂｒｏｔ 集与Ｊｕｌｉａ 集之间的关系进行了分析，解析分析了广义Ｍａｎｄｅｌｂｒｏｔ 集的有界性、芽苞周期和不同周期芽苞个数，为Ｍａｎｄｅｌｂｒｏｔ 集和Ｊｕｌｉａ 集的发展提供了新的思路·

基于拓扑不变性的深空背景暗弱目标检测方法

通过分析深空背景图像的特点,提出一种基于拓扑不变性的深空背景暗弱目标检测方法。首先,使用基于拓扑不变性的图像匹配方法以首帧图像为基准对序列图像进行匹配;然后,进行背景滤除;最后,利用基于Hough变换的方法对图像进行暗弱目标检测,从而获取目标信息。为验证提出算法的有效性,使用STK软件制作若干幅半仿真序列图像进行实验。结果表明:提出的算法对空间碎片的检测能力超过了SMP和SBV两种算法;算法的计算效率与SMP算法相当,比SBV算法高。

拓扑不变性质的简单应用

拓扑学的中心任务是研究拓扑不变性质,连通性、紧致性、可数性(可分性)和分离性是几种最常见的拓扑不变性质,如果能通过简单的例子来帮助初学者认识基本概念和方法,则有助于普及拓扑学的某些基本知识,还可以引起更多人对数学的兴趣。

多相开关电容网络Z域不变拓扑系统分析法——状态变量法

本文把开关视为固定支路,使开关电容网络变成不变拓扑网络,应用时不变网络的拓扑分析法,导出了多相开关电容网络Z域不变拓扑系统分析法——状态变量法。

拓扑学100年(1935年以前)

100年前,拓扑(topology)这个词,即使在数学家当中也是极为生僻的,而过了50年,拓扑学已逐步成为'数学的女王'。时至今日,一大半的数学领域以这样或那样的方式受到拓扑学的影响。

L^∞（G）中的一个闭凸不变集

设 G是局部紧群 ,f 是 G上的右一致连续函数 .本文讨论 L∞ (G)中一个闭凸不变集的关系式Co{ Lxf :x∈ G} 11· 11∞ ={* f∶∈ P′(G) } 11· 11∞ (f∈ R∪ C(G) ) .由此式易得出 R∪ C(G)上的左不变平均与拓扑左不变平均的等价关系 .

同胚映射在拓扑空间中的应用

给出了一些满足同胚映射的实例,以及应用同胚映射判断拓扑空间的某些性质是否是拓扑不变性质.

一种提高计算精度的类直流潮流算法

基于一个已知的初始稳态断面,提出了一种适用于拓扑不变而仅有注入量变化的提高计算精度的类直流潮流算法。该算法相比于标准直流潮流,只需在初始稳态断面基础上求解一组修正因子量,从而实现拓扑不变仅有注入量变化的新断面潮流计算。算例中多个IEEE标准系统和波兰实际电网的仿真结果表明,当网络注入量在-30%～60%范围内变化时,类直流潮流法比标准直流法在潮流计算精度上有70%以上的改进。

LF闭包空间的层紧性

在LF闭包空间中 ,引入层紧集概念 ,进一步 ,定义了层紧空间概念 .并用α渗透 ,M可达的等概念刻画了层紧集的性质 .给出了层紧集的几个等价刻画 .

LF闭包空间的Lindef性

在LF闭包空间中引入Lindef性的概念,研究了其等价刻画及其基本性质,证明了LF闭包空间Lindef性是弱拓扑不变的。

拟平移不变拓扑锥与局部β-凸空间的共轭锥

[1]中提出的局部β-凸分析问题从本质上来说是一种非线性凸分析问题 .为了刻画和研究局部β-凸空间 X的共轭锥 X*β ,本文在抽象凸锥上引进具有拟平移不变性质的拓扑结构 ,第一部分重点研究局部生成拓扑锥与赋范拓扑锥 .第二部分将这两种拓扑锥的一般理论应用于局部 β - 凸空间的共轭锥 X*β 的研究 ,得到 (X*β,U| A)与 (X*β ,‖‖ )的局部生成性与完备性定理等 .

局部β-凸分析(综合研究报告)

本文综合报告作者在局部-b凸分析研究方面的一些工作,主要给出-b集的结构定理,-b凸泛函的连续性定理和延拓定理,局部-b凸空间中的第二分离性定理,Krein-Milman定理,共轭锥* bX中的共鸣定理以及* bX的拟平移不变性与完备性定理等。

A Note on a Misuirewicz's Theorem

In this paper,we improve a Misuirewicz's theorem and give a new proof of small conjecture on topological entropy.

次加β-正齐性算子空间的可分性定理

本文主要研究了赋β-范空间到赋范空间的次加β-正齐性算子空间的可分性问题,得到的结果:当算子空间可分时,相应的赋β-范空间是可分的.

Generalized Quasi-Variational Inequalities on Paracompact Sets

Taking advantage of result in [1], this paper studied generalized quasi variational inequalities on paracompact sets, unified and extended corresponding results in [4-6].

Estimating Topology of Discrete Dynamical Networks

In this paper,by applying Lasalle's in variance principle and some results about the trace of a matrix,we propose a method for estimating the topological structure of a discrete dynamical network based on the dynamicalevolution of the network.The network concerned can be directed or undirected,weighted or unweighted,and the localdynamics of each node can be nonidentical.The connections among the nodes can be all unknown or partially known.Finally,two examples,including a Henon map and a central network,are illustrated to verify the theoretical results.

Generalized Bi quasi variational Inequalities in Locally Convex Topological Vector Spaces

In this paper we investigate generalized bi quasi variational inequalities in locally convex topological vector spaces. Motivated and inspired by the recent research work in this field,we establish several existence theorems of solutions for generalized bi quasi variational inequalities,which are the extension and improvements of the earlier and recent results obtained previously by many authors including Sun and Ding [18],Chang and Zhang [23] and Zhang [24].

局部β-凸空间的共轭锥与Hahn-Banach定理

由 [1 ],局部β-凸空间 X的共轭锥 X*β 取代共轭空间在局部β-凸分析中扮演核心角色 .本文第一部分在局部β-凸空间上给出β-次半范的 Hahn-Banach定理 ,第二部分通过共轭锥 ( X*β ,‖‖ )得到赋β-范空间 ( X,‖‖β)的可分性定理 ,第三部分给出局部 β-凸空间的共轭锥 X*β 在一致收敛拓扑下的完备性定理等 .

Generalized Vector Quasi-Variational-Like Inequalities without Monotonity and Compactness

In this paper, some existence theorems of a solution for generalized vector quasivariational-like inequalities without any monotonity conditions in a noncompact topological space setting are proven by the maximal element theorem.

Non-Hermitian pseudo-gaps

The notion of a band gap is ubiquitous in the characterization of matter.Particularly interesting are pseudo-gaps,which are enigmatic regions of very low density of states that have been linked to novel phenomena like high temperature superconductivity.In this work,we discover a novel origin for pseudo-gaps when boundaries are introduced in a non-Hermitian lattice.It generically occurs due to the interference between two or more asymmetric pumping channels,and possess no analog in Hermitian systems.Mathematically,it can be visualized as being created by divergences of spectral flow in the complex energy plane,analogous to how sharp edges creates divergent electric fields near an electrical conductor.A non-Hermitian pseudo-gap can host symmetry-protected mid-gap modes like ordinary topological gaps,but the mid-gap modes are extended instead of edge-localized,and exhibit extreme sensitivity to symmetry-breaking perturbations.Surprisingly,pseudo-gaps can also host an integer number of edge modes even though the pseudo-bands possess fractional topological windings,or even no well-defined Chern number at all,in the marginal case of a phase transition point.Challenging conventional notions of topological bulk-boundary correspondences and even the very concept of a band,pseudo-gaps post profound implications that extend to many-body settings,such as fractional Chern insulators.