1) Paracompact
仿紧闭
2) |∑|-paracompact
|∑|-仿紧
1.
|∑|-paracompactI|∑|-paracompactt|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactp|∑|-paracompactr|∑|-paracompacto|∑|-paracompactv|∑|-paracompacte|∑|-paracompactd|∑|-paracompact |∑|-paracompacte|∑|-paracompactm|∑|-paracompactp|∑|-paracompacth|∑|-paracompacta|∑|-paracompacts|∑|-paracompacti|∑|-paracompactz|∑|-paracompacte|∑|-paracompactl|∑|-paracompacty|∑|-paracompact |∑|-paracompactt|∑|-paracompacth|∑|-paracompacta|∑|-paracompactt|∑|-paracompact:|∑|-paracompact |∑|-paracompactL|∑|-paracompacte|∑|-paracompactt|∑|-paracompact |∑|-paracompactX|∑|-paracompact=|∑|-paracompact∏|∑|-paracompactσ|∑|-paracompact∈|∑|-paracompact|∑|-paracompactX|∑|-paracompactσ|∑|-paracompact |∑|-paracompactb|∑|-paracompacte|∑|-paracompact |∑|-paracompact||∑|-paracompact∑|∑|-paracompact||∑|-paracompact-|∑|-paracompactp|∑|-paracompacta|∑|-paracompactr|∑|-paracompacta|∑|-paracompactc|∑|-paracompacto|∑|-paracompactm|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompactt|∑|-paracompact |∑|-paracompacts|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompacte|∑|-paracompact,|∑|-paracompactX|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactσ|∑|-paracompact-|∑|-paracompacto|∑|-paracompactr|∑|-paracompactt|∑|-paracompacth|∑|-paracompacto|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactm|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompactt|∑|-paracompact |∑|-paracompacts|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompacte|∑|-paracompact |∑|-paracompact|∑|-paracompact |∑|-paracompact∏|∑|-paracompactσ|∑|-paracompact∈|∑|-paracompactF|∑|-paracompact |∑|-paracompactX|∑|-paracompactσ|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactσ|∑|-paracompact-|∑|-paracompacto|∑|-paracompactr|∑|-paracompactt|∑|-paracompacth|∑|-paracompacto|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactm|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompactt|∑|-paracompact |∑|-paracompacts|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompacte|∑|-paracompact |∑|-paracompactf|∑|-paracompacto|∑|-paracompactr|∑|-paracompact |∑|-paracompacte|∑|-paracompactv|∑|-paracompacte|∑|-paracompactr|∑|-paracompacty|∑|-paracompact |∑|-paracompactF|∑|-paracompact∈|∑|-paracompact||∑|-paracompact∑|∑|-paracompact||∑|-paracompact〈|∑|-paracompactω|∑|-paracompact.|∑|-paracompact
主要研究了两部分内容:一是σ-ortho紧空间的Tychonoff乘积性;二是给出了基-可数仿紧空间的一系列性质;着重证明了:如果X=∏σ∈∑Xσ是|∑|-仿紧空间,则X是σ-ortho紧空间当且仅当F∈|∑|〈ω,∏σ∈FXσ是σ-ortho紧空间。
2.
|∑|-paracompactB|∑|-paracompacty|∑|-paracompact |∑|-paracompactu|∑|-paracompacts|∑|-paracompacti|∑|-paracompactn|∑|-paracompactg|∑|-paracompact |∑|-paracompactt|∑|-paracompacth|∑|-paracompacti|∑|-paracompacts|∑|-paracompact,|∑|-paracompact |∑|-paracompactt|∑|-paracompacth|∑|-paracompacte|∑|-paracompact |∑|-paracompactf|∑|-paracompacto|∑|-paracompactl|∑|-paracompactl|∑|-paracompacto|∑|-paracompactw|∑|-paracompacti|∑|-paracompactn|∑|-paracompactg|∑|-paracompact |∑|-paracompacta|∑|-paracompactr|∑|-paracompacte|∑|-paracompact |∑|-paracompactp|∑|-paracompactr|∑|-paracompacto|∑|-paracompactv|∑|-paracompacte|∑|-paracompactd|∑|-paracompact:|∑|-paracompact |∑|-paracompact(|∑|-paracompact1|∑|-paracompact)|∑|-paracompact |∑|-paracompactL|∑|-paracompacte|∑|-paracompactt|∑|-paracompact |∑|-paracompactX|∑|-paracompact |∑|-paracompact=|∑|-paracompact |∑|-paracompactl|∑|-paracompacti|∑|-paracompactm|∑|-paracompact{|∑|-paracompactX|∑|-paracompactσ|∑|-paracompact,|∑|-paracompactπ|∑|-paracompactρ|∑|-paracompactσ|∑|-paracompact,|∑|-paracompact |∑|-paracompact∑|∑|-paracompact}|∑|-paracompact |∑|-paracompacta|∑|-paracompactn|∑|-paracompactd|∑|-paracompact |∑|-paracompacte|∑|-paracompactv|∑|-paracompacte|∑|-paracompactr|∑|-paracompacty|∑|-paracompact |∑|-paracompactπ|∑|-paracompactσ|∑|-paracompact |∑|-paracompactb|∑|-paracompacte|∑|-paracompact |∑|-paracompacto|∑|-paracompactp|∑|-paracompacte|∑|-paracompactn|∑|-paracompact |∑|-paracompacta|∑|-paracompactn|∑|-paracompactd|∑|-paracompact |∑|-paracompacto|∑|-paracompactn|∑|-paracompactt|∑|-paracompacto|∑|-paracompact |∑|-paracompactm|∑|-paracompacta|∑|-paracompactp|∑|-paracompactp|∑|-paracompacti|∑|-paracompactn|∑|-paracompactg|∑|-paracompact,|∑|-paracompact |∑|-paracompacti|∑|-paracompactf|∑|-paracompact |∑|-paracompactX|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompact||∑|-paracompact∑|∑|-paracompact||∑|-paracompact-|∑|-paracompactp|∑|-paracompacta|∑|-paracompactr|∑|-paracompacta|∑|-paracompactc|∑|-paracompacto|∑|-paracompactm|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompactt|∑|-paracompact |∑|-paracompacta|∑|-paracompactn|∑|-paracompactd|∑|-paracompact |∑|-paracompacte|∑|-paracompactv|∑|-paracompacte|∑|-paracompactr|∑|-paracompacty|∑|-paracompact |∑|-paracompactX|∑|-paracompactσ|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactl|∑|-paracompactl|∑|-paracompacte|∑|-paracompactc|∑|-paracompactt|∑|-paracompacti|∑|-paracompacto|∑|-paracompactn|∑|-paracompactw|∑|-paracompacti|∑|-paracompacts|∑|-paracompacte|∑|-paracompact |∑|-paracompacts|∑|-paracompactu|∑|-paracompactb|∑|-paracompactn|∑|-paracompacto|∑|-paracompactr|∑|-paracompactm|∑|-paracompacta|∑|-paracompactl|∑|-paracompact,|∑|-paracompact |∑|-paracompactt|∑|-paracompacth|∑|-paracompacte|∑|-paracompactn|∑|-paracompact |∑|-paracompactX|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactl|∑|-paracompactl|∑|-paracompacte|∑|-paracompactc|∑|-paracompactt|∑|-paracompacti|∑|-paracompacto|∑|-paracompactn|∑|-paracompactw|∑|-paracompacti|∑|-paracompacts|∑|-paracompacte|∑|-paracompact |∑|-paracompacts|∑|-paracompactu|∑|-paracompactb|∑|-paracompactn|∑|-paracompacto|∑|-paracompactr|∑|-paracompactm|∑|-paracompacta|∑|-paracompactl|∑|-paracompact;|∑|-paracompact |∑|-paracompact(|∑|-paracompact2|∑|-paracompact)|∑|-paracompact |∑|-paracompactL|∑|-paracompacte|∑|-paracompactt|∑|-paracompact |∑|-paracompactX|∑|-paracompact |∑|-paracompact=|∑|-paracompact |∑|-paracompactⅡ|∑|-paracompactα|∑|-paracompactε|∑|-paracompactX|∑|-paracompactα|∑|-paracompact |∑|-paracompactb|∑|-paracompacte|∑|-paracompact |∑|-paracompact||∑|-paracompactA|∑|-paracompact||∑|-paracompact-|∑|-paracompactp|∑|-paracompacta|∑|-paracompactr|∑|-paracompacta|∑|-paracompactc|∑|-paracompacto|∑|-paracompactm|∑|-paracompactp|∑|-paracompacta|∑|-paracompactc|∑|-paracompactt|∑|-paracompact,|∑|-paracompact |∑|-paracompactX|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactl|∑|-paracompactl|∑|-paracompacte|∑|-paracompactc|∑|-paracompactt|∑|-paracompacti|∑|-paracompacto|∑|-paracompactn|∑|-paracompactw|∑|-paracompacti|∑|-paracompacts|∑|-paracompacte|∑|-paracompact |∑|-paracompacts|∑|-paracompactu|∑|-paracompactb|∑|-paracompactn|∑|-paracompacto|∑|-paracompactr|∑|-paracompactm|∑|-paracompacta|∑|-paracompactl|∑|-paracompact |∑|-paracompacti|∑|-paracompactf|∑|-paracompactf|∑|-paracompact |∑|-paracompactⅡ|∑|-paracompactα|∑|-paracompactε|∑|-paracompactF|∑|-paracompactX|∑|-paracompactα|∑|-paracompact |∑|-paracompacti|∑|-paracompacts|∑|-paracompact |∑|-paracompactc|∑|-paracompacto|∑|-paracompactl|∑|-paracompactl|∑|-paracompacte|∑|-paracompactc|∑|-paracompactt|∑|-paracompacti|∑|-paracompacto|∑|-paracompactn|∑|-paracompactw|∑|-paracompacti|∑|-paracompacts|∑|-paracompacte|∑|-paracompact |∑|-paracompacts|∑|-paracompactu|∑|-paracompactb|∑|-paracompactn|∑|-paracompacto|∑|-paracompactr|∑|-paracompactm|∑|-paracompacta|∑|-paracompactl|∑|-paracompact |∑|-paracompactf|∑|-paracompacto|∑|-paracompactr|∑|-paracompact |∑|-paracompacte|∑|-paracompactv|∑|-paracompacte|∑|-paracompactr|∑|-paracompacty|∑|-paracompact |∑|-paracompactF|∑|-paracompact |∑|-paracompactε|∑|-paracompact[|∑|-paracompactA|∑|-paracompact]|∑|-paracompact&|∑|-paracompactl|∑|-paracompactt|∑|-paracompact;|∑|-paracompactω|∑|-paracompact.|∑|-paracompact
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。
3) Paracompact
仿紧
1.
This paper mainly proves following : (1) Let X=∏ σ∈ X σ be ||-paracompact,X is normal weak θ-refinable iff ∏ σ∈ X σ is normal weak θ-refinable for every F∈|| <ω .
主要证明了如下结果 :(1)如果是X =∏σ∈ Xσ 是 | |-仿紧空间 ,则X是正规弱θ -可加细空间当且仅当 F∈ [ ]<ω,∏σ∈FXσ 是正规弱θ -可加细空间 。
2.
In this paper, two kinds of topological~* -algebra were defined, they are noncommutative versions of paracompact k_R-space and normal k_R-Space respectively.
本文定义两类拓朴~*-代数,称为p~*-代数和n~*-代数,并且证明p~*-代数和n~*-代数分别是仿紧k_R-空间和正规k_R-空间的非交换类比。
3.
The main result is that C〈X〉is a Cech--complet and paracompact, space if and only if X is a Cech--comlplet and para- compact space.
本文利用紧子集空间上的诱导映射来研究紧子集空间的完备仿紧性。
4) |∧|-paracompact
|∧|-仿紧
5) || paracompact
||-仿紧
6) |Λ|-paracompactness
|Λ|仿紧
参考词条
补充资料:T74式(仿mag)7.62毫米排用机枪
中文名称: t74式(仿mag)7.62毫米排用机枪
研制国别: 中国
研制时间: 1985
分类: e922.14
关键词: 机枪 枪械 陆军装备
简介
为台湾1985年仿比利时fn—mag机枪自行研制的一种排用机枪。性能、外形与mag机枪十分相似。目前,该枪已开始全面装备部队,以汰换现用的t57式排用机枪。
口 径 7.62毫米
初 速 810—850米/秒
有效射程 1200米
射 速 600—1000发/分
射击方式 连发
枪 重 12.06公斤
枪 长 1260毫米
供弹方式 弹链
脚 架 m60机枪折叠式双脚架
说明:补充资料仅用于学习参考,请勿用于其它任何用途。