关于局部紧空间的闭Lindel(o¨)f映象

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.     

关于局部紧空间的闭Lindelf映象

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 .     

几乎仿紧空间

主要证明了如下结果 :( 1 )如果 X =∏α∈ΛXα是 |Λ | -仿紧空间 ,则 X是几乎仿紧 (仿 - L indelof)空间当且仅当 F∈ [Λ ]<ω,∏α∈ FXα是几乎仿紧 (仿 - L indelof)空间 .( 2 )如果 X =∏i∈ωXi 是可数仿紧的 ,则下列三条等价 :X是几乎仿紧 (仿 - L indelof)的 : F∈ [ω]<ω,∏i∈ FXi是几乎仿紧 (仿 - L indelof)的 : n∈ω,∏i≤ nXi是几乎仿紧 (仿- Lindelof)的 .最后还给出了几乎仿紧 (仿 - L indelof)空间的一个刻划     

分形空间的局部紧性及网极限

对于完备度量空间 (X ,d) ,研究了X的局部紧性与相应分形空间 (H(X) ,h)的局部紧性之间的关系 ,得到结论 :(H(X) ,h)是局部紧的当且仅当X是局部紧的 .另一方面 ,给出了 (H(X) ,h)中收敛网的极限通过并、交及闭包运算的表示 .     

Fell-拓扑的伪紧性（英文）

设X是拓扑空间，CL（X）表示X的所有非空闭子集的族，本文得到了下述结果：在CL（X）上的Fell-拓扑是伪肾的当且仅当X是feebly-紧或者非局部紧或者非σ－紧，由此得到了对于伪紧性不是闭遗传的两类新的拓扑空间。     

点是Gδ-集的∑*-空间的构成定理

在林寿与我最近合作的一篇文章中指出了∑*-空间的构成定理需重新考虑.本文就是要证明在空间X的每个点是Gδ-集的条件下该构成定理是成立的,所得的结论是:X是T1且每个点是Gδ-集的∑*-空间,如果f:X→Y是闭的满连续映射,则在Y中有一σ-闭离散子空间Z,使得对每个y∈Y\Z,f-1(y)是X的w1-紧子空间.为得到该主要结果,本文证明了若空间X是每个点是Gδ-集的次亚紧空间.则X中的每个闭离散子集是X中的Gδ-集.     

正规可数仿紧空间的逆极限

得到了如下结果:设X是逆系统{Xα,παβ,Λ}的逆极限,|Λ|=λ,假设每个映射πα∶X→Xα是开的且到上的,X是λ-仿紧,每个Xα是正规可数仿紧的,则X是正规可数仿紧的.进一步得到了关于遗传正规且遗传可数仿紧空间的类似结果.     

再论集体次正规空间的逆极限

首先给出集体次正规空间的一组等价刻画.利用该组刻画证明:设X=lim{Xσ,πρσ,∑}并且每个投影映射πσ:X→Xσ是开满映射, (1)如果X是|∑|-仿紧的且每个Xσ是集体次正规空间,则X是正规集体次正规空间; (2)如果X是遗传|∑|-仿紧的且每个Xσ是遗传集体次正规空间,则X是遗传集体次正规空间.然后,在X=Ⅱα∈AXα是|A|-仿紧的条件下得到结果:X是集体次正规的当且仅当(?)F∈[A]<ω,Ⅱσ∈FXσ是集体次正规的,并且遗传集体次正规也有类似性质.     

正规弱空间的无限Tychonoff积

本文证明(1)如果X=∏σ∈∑Xσ是|Σ|-仿紧空间,则X是正规弱(-θ)-可加空间当且仅当 F∈[∑]＜ω,∏σ∈FXσ是正规弱(-θ)-可加空间.(2)设X=∏i∈ωXi是可数仿紧的,则下列三条等价X是正规弱(-θ)-可加的; F∈[ω]＜ω,∏i∈FXi是正规弱(-θ)-可加的; n∈ω,∏i≤nXi是正规弱(-θ)-可加的.     

集值映射空间上的(ξ)0特征

应用k-网的概念证明了:若X,Y为(ξ)0空间且Y为局部紧的,则X到Y上满足条件(G)的点紧致的族连续集值映射族依紧开拓扑是(ξ)0空间.     

A note on monotonically metacompact spaces

We show that any metacompact Moore space is monotonically metacompact and use that result to characterize monotone metacompactness in certain generalized ordered (GO) spaces. We show, for example, that a generalized ordered space with a σ-closed-discrete dense subset is metrizable if and only if it is monotonically (countably) metacompact, that a monotonically (countably) metacompact GO-space is hereditarily paracompact, and that a locally countably compact GO-space is metrizable if and only if it is monotonically (countably) metacompact. We give an example of a non-metrizable LOTS that is monotonically metacompact, thereby answering a question posed by S.G. Popvassilev. We also give consistent examples showing that if there is a Souslin line, then there is one Souslin line that is monotonically countable metacompact, and another Souslin line that is not monotonically countably metacompact.     

几乎局部紧空间在什么条件下是超完全空间（英文）

It is proved in this paper that(1) the topological sum of a family of supercomplete spaces is supercomplete;(2) if X is a metacompact and almost locally compact space then X is supercomplete. Moreover, some questions on supercomplete spaces are posed in the paper.     

关于单调亚紧空间

In the first part of this note, we mainly prove that monotone metacompactness is hereditary with respect to closed subspaces and open Fó-subspaces. For a generalized ordered (GO)-space X, we also show that X is monotonically metacompact if and only if its closed linearly ordered extension X* is monotonically metacompact. We also point out that every non-Archimedean space X is monotonically ultraparacompact. In the second part of this note, we give an alternate proof of the result that McAuley space is paracompact and metacompact.     

When is an Almost Lo cally Compact Space Sup ercomplete?

It is proved in this paper that (1) the topological sum of a family of supercomplete spaces is supercomplete; (2) if X is a metacompact and almost locally compact space then X is supercomplete. Moreover, some questions on supercomplete spaces are posed in the paper.     

The NZ property and D-spaces

We introduce a property which we denote by NZ\({(\kappa)}\), where \({\kappa}\) is a cardinal. We show that chain neighborhood (F) spaces and monotonically metacompact spaces satisfy NZ(1), and that NZ\({(\kappa)}\) implies D if \({\kappa \leq \omega}\). Also, NZ\({(\kappa)}\) is closed under arbitrary subspaces and finite products, and countable products if \({\kappa}\) is infinite. It follows that any countable product of chain neighborhood (F) spaces and monotonically metacompact spaces is hereditarily a D-space. This provides a strong positive answer to a question of X. Yuming. We also prove that spaces satisfying NZ\({(\kappa)}\) are metacompact if \({\kappa}\) is finite, and meta-Lindelöf if \({\kappa = \omega}\).     

On base-cover metacompact products

Generalizing results of Yang Gao, Lei Mou and Shangzhi Wang, as well as a result of the author, we prove that a topological space is locally compact and metacompact if and only if its product with every compact space is base-cover metacompact.     

遗传σ-亚紧空间及其乘积性质

本文首先获得遗传σ 亚紧空间的一组等价刻划．然后，利用这组刻划得到了这类空间的两个Ｔｙｃｈｏｎｏｆ乘积定理以及关于σ 积的定理．最后指出：本文得到的遗传σ 亚紧空间的两个Ｔｙｃｈｏｎｏｆ乘积定理在σ 亚紧的情形下不成立．     

亚紧空间的可数乘积

In this paper,we present that if Y is a hereditarily metacompact space and{Xn:n∈ω}is a countable collection of Cech-scattered metacompact spaces,then the followings are∏equivalent:(1)Y×∏n∈ωXn is metacompact,(2)Y×∏n∈ωXn is countable metacompact,(3)Y×n∈ωXn is orthocompact.Thereby,this result generalizes Theorem 5.4 in[Tanaka,Tsukuba.J.Math.,1993,17:565–587].In addition,we obtain that if Y is a hereditarilyσ-metacompact space and{Xn:n∈ω∏}is a countable collection of Cech-scatteredσ-metacompact spaces,then the product Y×n∈ωXn isσ-metacompact.     

Insertion of semi-continuous functions and sequences of sets

We investigate the relations between decreasing sequences of sets and the insertion of semi-continuous functions, and give some characterizations of countably metacompact spaces, countably paracompact spaces, monotonically countably paracompact spaces (MCP), monotonically countably metacompact spaces (MCM), perfectly normal spaces and stratifiable spaces.     

Local compactness and Hewitt realcompactifications of products II

We generalize and refine results from the author's paper [18]. For a completely regular Hausdorff space X, υX denotes the Hewitt realcompactification of X. It is proved that if υ(X×Y)=υX×υY for any metacompact subparacompact (or m-paracompact) space Y, then X is locally compact. A P(n)-space is a space in which every intersection of less than n open sets is open. A characterization of those spaces X such that υ (X×Y = υX×υY for any (metacompact) P(n)-space Y is also obtained.