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1.
正规弱θ空间的无限Tychonoff积 总被引:1,自引:1,他引:0
本文证明:(1)如果X=∏σ∈∑Xσ是|∑|-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是可效仿紧的,则下列三条等价:是正规弱θ-可加的;?F∈[ω]<ω,∏i∈FXi是正规弱θ-可加的;?n∈ω;∏i≤n 相似文献
2.
讨论在C*-凸理论下C*-代数A的广义态空间SCn(A)中的Krein-Milman型问题.证明了SCn(A)的任意一个BW-紧的C*-凸子集K都具有一个C*-端点,而且K是其C*-端点的C*-凸包. 相似文献
3.
引进了 σω(σκ)的定义 ,利用它刻划了 Fréchet空间 (κ′-空间 )的仿紧性 .主要结果是 :一个 Fréchet空间 (κ′-空间 )是仿紧的 它是正则的弱θ可加细空间且有性质σω(σκ) 相似文献
4.
若φ 为单位圆盘D上的解析自映射, X为D上解析函数全体构成的Banach空间.定义X上复合算子Cφ: Cφ (f)=fοφ, 对任意 f∈X. 该文研究了从双曲α-Bloch 空间到双曲QK型空间上复合算子的有界性的特征. 另外, 还给出了从Dp,α 到QK(p, q) 空间上复合算子的有界性和紧性的特征. 相似文献
5.
给出空间弱(K1, K2) -拟正则映射的定义, 并以Hodge分解及弱逆Hölder不等式为工具, 得到了其正则性结果:对任意满足 的q1, 都存在可积指数 使得对任意弱 (K1, K2) -拟正则映射 都有 即f为通常意义下的(K1, K2) -拟正则映射. 相似文献
6.
设H(D) 表示单位圆盘D上的解析函数空间,u ∈ H(D). 该文研究了从混合模空间到Bloch -型空间微分算子与乘子的积DMu 的有界性与紧性. 相似文献
7.
几个覆盖性质与分离性 总被引:5,自引:0,他引:5
<正> 本文讨论了拟仿紧(狭义拟仿紧)、次拟仿紧(狭义次拟仿紧)、θ-可加细、弱θ-可加细以及弱θ-可加细空间等之间的关系.这些空间都是弱仿紧和次仿紧空间的弱化.联系上述覆盖性质,对[1]、[2]中的δ-集体正规性作了进一步探讨.对不可约空间也作 相似文献
8.
本文证明了如下结果:设X=lin←{Xσ,πρ^σ∧},|∧|=λ,并且每个投身πσ:X→Xσ是开满射,(a).若X是λ-仿紧的并且每个Xσ是正规弱δθ-可加空间,则X是正规弱δθ-可加空间;(b).若X是λ-仿紧的并且每个Xσ是遗传正规的遗传弱δθ-可加,则X是遗传正规的遗传弱δθ-可加空间。 相似文献
9.
10.
本文研究了弱(序列式)紧正则诱导极限与凸弱(序列式)紧正则诱导极限.满足Retakh条件(M0)的(LF)-空间必为凸弱(序列式)紧正则的,但未必为弱(序列式)紧正则的.对于弱序列式完备Frechet空间的可数诱导极限,Retakh条件(M0)蕴涵弱(序列式)紧正则性.特别地,对于Kothe(LF)-序列空间Ep(1≤p<∞),Retakh条件(M0)等价于弱(序列式)紧正则性.对于这类空间,利用Vogt的有关结论,给出了弱(序列式)紧正则性的特征. 相似文献
11.
Juan Carlos Martínez 《Topology and its Applications》2011,158(2):223-228
We show that the product of a subparacompact C-scattered space and a Lindelöf D-space is D. In addition, we show that every regular locally D-space which is the union of a finite collection of subparacompact spaces and metacompact spaces has the D-property. Also, we extend this result from the class of locally D-spaces to the wider class of D-scattered spaces. All the results are shown in a direct way. 相似文献
12.
We show in a direct way that a space is D if it is a finite union of subparacompact scattered spaces. This result cannot be extended to countable unions, since it is known that there is a regular space which is a countable union of paracompact scattered spaces and which is not D. Nevertheless, we show that every space which is the union of countably many regular Lindelöf C-scattered spaces has the D-property. Also, we prove that a space is D if it is a locally finite union of regular Lindelöf C-scattered spaces. 相似文献
13.
14.
Liang-Xue Peng 《Topology and its Applications》2010,157(2):378-876
In this note, we comment on D-spaces, linearly D-spaces and transitively D-spaces. We show that every meta-Lindelöf space is transitively D. If X is a weak -refinable TD-scattered space, then X is transitively D, where TD is the class of all transitively D-spaces. If X is a weak -refinable -scattered space, then X is a D-space, where is the class of all D-spaces, and hence every weak -refinable (or submetacompact) scattered space is a D-space. This gives a positive answer to a question mentioned by Martínez and Soukup. In the last part of this note, we show that if X is a weak -refinable space then X is linearly D. 相似文献
15.
Liang-Xue Peng 《Topology and its Applications》2007,154(2):469-475
It is shown that the space Cp(τω) is a D-space for any ordinal number τ, where . This conclusion gives a positive answer to R.Z. Buzyakova's question. We also prove that another special example of Lindelöf space is a D-space. We discuss the D-property of spaces with point-countable weak bases. We prove that if a space X has a point-countable weak base, then X is a D-space. By this conclusion and one of T. Hoshina's conclusion, we have that if X is a countably compact space with a point-countable weak base, then X is a compact metrizable space. In the last part, we show that if a space X is a finite union of θ-refinable spaces, then X is a αD-space. 相似文献
16.
《Topology and its Applications》2004,135(1-3):73-85
Let be the class of all -scattered spaces having countable ranks. It is shown in this paper that if X is a regular θ-refinable space, then player one has a winning strategy in if and only if he has one in . This partly answers Y. Yajima's problem: By topological games, I prove that hereditary disconnectedness, zero-dimensionality and strong zero-dimensionality are equivalent in the realm of non-empty normal compact-scattered weak -refinable spaces. A collectionwise normal ultraparacompact-like space is an ultraparacompact space. 相似文献
17.
《Applied Mathematics Letters》2001,14(2):201-204
In this paper, we define the concept of C-scattered fuzzy topological spaces and obtain some properties about them. In particular, we study the relation between C-scattered spaces and its fuzzy extension, it is proved that C-scattered fuzzy topological spaces are invariant by fuzzy perfect maps, and that, in the realm of paracompact fuzzy topological spaces, the C-scattered spaces verify that their product by other fuzzy spaces is also paracompact fuzzy. 相似文献
18.
We show that every regular T1 submeta-Lindelöf space of cardinality ω1 is D under MA+¬CH, which answers a question posed by Gruenhage (2011) [9]. Borges (1991) [5] asked if every monotonically normal paracompact space is a D-space, we give a characterization of paracompactness for monotonically normal spaces, which may be of some use in solving this problem. 相似文献
19.
Liang-Xue Peng 《Topology and its Applications》2008,155(6):522-526
In this note, we show that if X is the union of a finite collection of strong Σ-spaces, then X is a D-space. As a corollary, we get a conclusion that if X is the union of a finite collection of Moore spaces, then X is a D-space. This gives a positive answer to one of Arhangel'skii's problems [A.V. Arhangel'skii, D-spaces and finite unions, Proc. AMS 132 (7) (2004) 2163-2170]. In the last part of the note, we show that if X is the union of a finite collection of DC-like spaces, then X is a D-space, where DC is the class of all discrete unions of compact spaces. As a corollary, we show that if X is the union of a finite collection of regular subparacompact C-scattered spaces, then X is a D-space. 相似文献
20.
S. M. Bates 《Israel Journal of Mathematics》1997,100(1):209-220
It is shown that (1) every infinite-dimensional Banach space admits aC
1 Lipschitz map onto any separable Banach space, and (2) if the dual of a separable Banach spaceX contains a normalized, weakly null Banach-Saks sequence, thenX admits aC
∞ map onto any separable Banach space. Subsequently, we generalize these results to mappings onto larger target spaces.
Supported by an NSF Postdoctoral Fellowship in Mathematics. 相似文献