| σ-满正规空间的逆极限 |
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| 引用本文: | 熊朝晖.σ-满正规空间的逆极限[J].数学学报,2004,47(4):819-824. |
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| 作者姓名: | 熊朝晖 |
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| 作者单位: | 浙江理工大学理学院,杭州,310018 |
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| 摘 要: | 本文证明:设X是逆系统(X_απ_β~α,A}的逆极限,|A|=λ,假设每个投射π_α:X→X_α是开且到上的。X是λ-仿紧和λ-可遮的,如果每个X_α是σ-满正规的(可遮的,σ-集体正规的),则X是σ-满正规的(可造的,σ-集体正规的)。作为这一结果的推论,我们还将证明正规σ-满正规性满足如文1]中的通常形式的逆极限定理及遗传σ-满正规性的类似结果。
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| 关 键 词: | 逆极限 σ-满正规 遗传σ-满正规 |
| 文章编号: | 0583-1431(2004)04-0819-06 |
Inverse Limit of σ-Fully Normal Spaces |
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| Zhao Hui XIONG College of Sciences,Zhejiang University of Sciences,Hangzhou ,P. R. China.Inverse Limit of σ-Fully Normal Spaces[J].Acta Mathematica Sinica,2004,47(4):819-824. |
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| Authors: | Zhao Hui XIONG College of Sciences Zhejiang University of Sciences Hangzhou P R China |
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| Institution: | Zhao Hui XIONG College of Sciences, Zhejiang University of Sciences, Hangzhou 310018, P. R. China |
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| Abstract: | In this paper, we shall prove the following theorem: Let X be the inverse
limit of an inverse system {X_α,π_β~α, } and || = λ. Suppose that each projeetion
π_α: X→X_α is an open and onto map and X is λ-paracompact and λ-Screenable. If
each X_α is σ-fully normal (resp., screenab1e, σ-collectionwise normal), then X is σ-full
normal (resp., screenable, σ-collectionwise normal). As a corollary of the result the
normal σ-fully normality satisfies the inverse limit theorem in the usual type as in 1].
Moreover, we shall obtain the anologous result for hereditarily σ-fully normality. |
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| Keywords: | Inverse limit σ-fully normal Hereditanily σ-fully normal |
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