Multicoherence of finite quotients and one-point compactifications (Q1109367)
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scientific article; zbMATH DE number 4069809
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Multicoherence of finite quotients and one-point compactifications |
scientific article; zbMATH DE number 4069809 |
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Multicoherence of finite quotients and one-point compactifications (English)
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1988
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[See the preceding review for definitions.] In the second paper the author proves that if X is a connected, locally connected, regular space and F is a finite n-elements subset of X, then \(r(X/F)=r(X)+n-1\). ``This will allow us to obtain some ways to calculate the multicoherence degree of the one-point compactification of X when X is locally compact''.
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multicoherence degree
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identifications
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connected, locally connected, regular space
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one-point compactification
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0.87614113
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0.8712126
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0.8685845
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0.86673427
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