Math, asked by bhavnad1507, 1 year ago

Countable intersection of dense open subsets in complete metric space is uncountable

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Answered by siya113

Answer:

In a complete metric space X that has no isolated points, any countable intersection of open dense sets isuncountable. Proof: Let S be thecountable intersection of open dense sets {Un}. By Baire's Theorem S isdense thus Un are open and dense.

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