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You are here: Course Notes » Math 104: Introduction to Real Analysis (2022 Spring) » Lecture Notes » Lecture 13: Continuous function.
math104-s22:notes:lecture_13

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math104-s22:notes:lecture_13 [2022/02/28 15:19]
pzhou 		math104-s22:notes:lecture_13 [2022/03/02 21:52] (current)
pzhou
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 Topologically, we cannot distinguish spaces that are homeomorphic. Topologically, we cannot distinguish spaces that are homeomorphic.
  
-===== Compactness ===== 
-There are two notions of compactness, they turns out to be equivalent for metric spaces.  
  
-Let $X$ be a metric space, $K \In X$ a subset.  
-  * sequential compactness: we say $K$ is compact, if every sequence in $K$ has a convergent subseq.  
-  * compactness: any open cover of $K$ admits a finite subcover.  
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-The two notions turns out are equivalent, see https://courses.wikinana.org/math104-f21/compactness We will follow Pugh to give a proof. See also Rudin Thm 2.41 
  
math104-s22/notes/lecture_13.1646090383.txt.gz · Last modified: 2022/02/28 15:19 by pzhou

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