1617-257/TUT-R-3

From Drorbn
Revision as of 11:35, 30 September 2016 by Jeffim (talk | contribs)
Jump to navigationJump to search

On 9/29/16, we discussed three notions of compactness in equipped with the usual topology:

(1) closed and bounded

(2) subsequential compactness

(3) every open cover admits a finite subcover

We will tacitly assume that this is the topology we're giving for the remainder of this post.



  • We proved that (1) and (2) are equivalent.
  • Statements (2) and (3) are equivalent in general metric spaces.
  • (1) is not necessarily equivalent to (2) or (3) in other settings (and even non-contrived settings. That is, settings which are not just produced for the sake of counterexample. There is an abundance examples arising from basic objects of study in functional analysis.).