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Description
AbstractA space X is said to have property (USC) (resp. (LSC)) if whenever {fn:n∈ω} is a sequence of upper (resp. lower) semicontinuous functions from X into the closed unit interval [0,1] converging pointwise to the constant function 0 with the value 0, there is a sequence {gn:n∈ω} of continuous functions from X into [0,1] such that fn⩽gn (n∈ω) and {gn:n∈ω} converges pointwise to 0. In this paper, we study spaces having these properties and related ones. In particular, we show that (a) for a subset X of the real line, X has property (USC) if and only if it is a σ-set; (b) if X is a space of non-measurable cardinal and has property (LSC), then it is discrete. Our research comes of Scheepers' conjecture on properties S1(Γ,Γ) and wQN.
Journal
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- Topology and its Applications
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Topology and its Applications 156 (17), 2683-2691, 2009-11-01
Elsevier
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Keywords
Details 詳細情報について
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- CRID
- 1050282677778808576
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- NII Article ID
- 120001662293
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- NII Book ID
- AA00459572
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- ISSN
- 01668641
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- HANDLE
- 10297/3939
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- Web Site
- http://hdl.handle.net/10297/3939
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- Text Lang
- en
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- Article Type
- journal article
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- Data Source
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- IRDB
- CiNii Articles
- KAKEN
- OpenAIRE