Baire category theorem: Difference between revisions

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In general topology, the Baire category theorem states that a non-empty complete metric space is a second category space: that is, it is not a countable union of nowhere dense sets (sets whose closure have empty interior).

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	==References==		==References==
	* {{cite book \| author=J.L. Kelley \| authorlink=John L. Kelley \| title=General topology \| publisher=van Nostrand \| year= 1955 \| pages=200-201 }}		* {{cite book \| author=J.L. Kelley \| authorlink=John L. Kelley \| title=General topology \| publisher=van Nostrand \| year= 1955 \| pages=200-201 }}[[Category:Suggestion Bot Tag]]