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1.
本利用林寿引入的Frechet拟基的概念,获得了度量空间的确定闭映象和局部可度量空间的确定闭映象的一些新的刻画。  相似文献   

2.
本文用度量空间的mssc-映象给出了N-空间一些刻画,证明了空间X是N-空间当且仅当X是度量空间的序列覆盖(序列商)mssc-映象,肯定地回答了关于N-空间的一个猜想。  相似文献   

3.
度量空间的序列商,k-映象   总被引:1,自引:1,他引:0  
葛英 《数学杂志》2004,24(3):275-279
本文给出了度量空间序列商.肛映象的-些内部刻画。证明了空间X是度量空间的序列商。肛映象当且仅当X具有紧有限k-闭cs*-覆盖列的点星sn-网,当且仅当X具有紧有限k-闭覆盖列的点星网.作为上述结果的-个推论.不仅得到了空间X是度量空间序列商,k-映象当且仅当X是度量空间的k-映象,而且还证明了空间X是度量空间当且仅当X具有局部有限(紧有限)闭(肛闭)覆盖列的点星弱邻域网.这里“闭”(“k闭”)不能省略.  相似文献   

4.
本文给出了两类局部紧空间闭 L (Lindelof)映象的内部特征 ,证明了空间 X是仿紧局部紧空间的闭 L映象当且仅当 X是具有σ-局部有限 k系的 k′空间 ,由此得到在 k′空间类中 ,仿紧局部紧空间的闭 L映象等价于仿紧局部紧空间的商 SL映象 .同时还证明了空间 X是局部紧度量空间的闭 L映象当且仅当 X是具有σ-局部有限紧 k网的 Fréchet空间 .  相似文献   

5.
本文给出了两类局部紧空间闭L(Lindelf)映象的内部特征,证明了空间X是仿紧局部紧空间的闭L映象当且仅当X是具有σ-局部有限k系的k′空间,由此得到在k′空间类中,仿紧局部紧空间的闭L映象等价于仿紧局部紧空间的商SL映象.同时还证明了空间X是局部紧度量空间的闭L映象当且仅当X是具有σ-局部有限紧k网的Fréchet空间.  相似文献   

6.
该文讨论局部可分度量空间闭s映象的分解定理, 证明了正则的Fréchet空间是局部可分度量空间的闭s映象当且仅当满足如下条件: 具有点可数的cs*网, 第一可数的闭子空间是局部可分的, 且Lindelof的闭子空间是可分的.  相似文献   

7.
葛英 《数学杂志》2000,20(3):289-292
本文给出了两类局部紧空间闭L(Lindelof)映象的内部特征,证明了空间X是仿紧局部紧空间的闭L映象当且发X是具有σ-局部有限k系的k空间,由此得到在k′空间类中,偏紧局部紧空间的闭L映象等价于偏紧局部紧空间的商SLJ央象,同时不证明了空间X是局部紧度量空间的闭L映象当且X是具有σ-局部有限紧k网的Frechet空间。  相似文献   

8.
本用度量空间的mssc-映象给出了N-空间一些刻画,证明了空间X是N-空间当且仅当X是度量空间的序列覆盖(序列商)mssc-映象,肯定地回答了关于N-空间的一个猜想.  相似文献   

9.
林寿 《数学学报》1997,40(4):585-590
度量空间的连续闭映象称为Lasnev空间。T.Miwa曾问一类特殊的Lasnev空间是否由度量空间族控制.本文建立了Lasnev空间是由度量空间族控制的充要条件,进而获得了使其任一连续闭映象是由度量空间族控制的度量空间的刻画,完满地回答了Miwa问题。  相似文献   

10.
蔡伟元  李进金 《数学研究》2000,33(2):204-207
证明了在空间具有星可数k网的条件下,度量空间的1(2)序列覆盖s映象是局部可分度量空间的1(2)序列覆盖、紧覆盖s映象。  相似文献   

11.
Weak convergence of Markov processes is studied by means of Dirichlet forms and two theorems for weak convergence of Hunt processes on general metric spaces are established. As applications, examples for weak conver gence of symmetric or non-symmetric Dirichlet processes on finite and infinite spaces are given. Project partially supported by the National Natural Science Foundation of China and Tianyuan Mathematics Foundation.  相似文献   

12.
In this paper, the author first introduces the concept of generalized algebraic cone metric spaces and some elementary results concerning generalized algebraic cone metric spaces. Next, by using these results, some new fixed point theorems on generalized (complete) algebraic cone metric spaces are proved and an example is given. As a consequence, the main results generalize the corresponding results in complete algebraic cone metric spaces and generalized complete metric spaces.  相似文献   

13.
本文证明了(1)具有点可数基空间的商s-像X有点可数基的充要条件是X是q-空间;(2)度量空间的伪开s-像若满足条件(*),则它在伪开s-映射下是保持的,(3)给出反例否定地回答了[1]和[2]中的问题.  相似文献   

14.
孟晓青 《数学进展》1996,25(4):305-310
广义度量空间和偏序集都具有函数空间.而函数空间的存在为数学构造和计算提供了很大方便.本文还讨论了广义度量空间和偏序集之间的相互转化问题.  相似文献   

15.
本文定义了George和Veeramani意义下的模糊度量空间的强嵌入,证明了可强嵌入的模糊度量空间能够粗嵌入到Hilbert空间.另外还证明了强嵌入在模糊度量空间的粗范畴下是不变的,并给出了模糊度量空间强嵌入的一些等价刻画.  相似文献   

16.
We continue the investigation of the L 2-geometry of moduli spaces of conformal structures, where the L 2-metric is induced from the canonical metrics for conformal structures that supports a positive scalar curvature metric introduced in previous papers.  相似文献   

17.
给出了度量空间和锥度量空间中的若干不动点定理.利用这些不动点定理,统一并推广了度量空间和锥度量空间中的若干经典的不动点定理.  相似文献   

18.
It is well known that the property of additivity of pythagorean orthogonality characterizes real inner product spaces among normed linear spaces. In the present paper, a natural concept of additivity is introduced in metric spaces, and it is shown that a weakened version of this additivity of metric pythagorean orthogonality characterizes real inner product spaces among complete, convex, externally convex metric spaces, providing a generalization of the earlier characterization.  相似文献   

19.
Cone metric spaces are generalizations of metric spaces, where the metric is Banach space-valued. Weak contractions are generalizations of the Banach’s contraction mapping, which have been studied by several authors. In the present work, we establish a unique fixed point result for weak contractions in cone metric spaces. Our result is supported by an example.  相似文献   

20.
We consider the space of complete and separable metric spaces which are equipped with a probability measure. A notion of convergence is given based on the philosophy that a sequence of metric measure spaces converges if and only if all finite subspaces sampled from these spaces converge. This topology is metrized following Gromov’s idea of embedding two metric spaces isometrically into a common metric space combined with the Prohorov metric between probability measures on a fixed metric space. We show that for this topology convergence in distribution follows—provided the sequence is tight—from convergence of all randomly sampled finite subspaces. We give a characterization of tightness based on quantities which are reasonably easy to calculate. Subspaces of particular interest are the space of real trees and of ultra-metric spaces equipped with a probability measure. As an example we characterize convergence in distribution for the (ultra-)metric measure spaces given by the random genealogies of the Λ-coalescents. We show that the Λ-coalescent defines an infinite (random) metric measure space if and only if the so-called “dust-free”-property holds.  相似文献   

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