1617-257/TUT-R-3

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On 9/29/16, we discussed three notions of compactness in $\mathbb {R} ^{n}$ 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 $\mathbb {R} ^{n}$ 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 around for the sake of counterexample. There is an abundance of examples arising from basic objects of study in functional analysis.).

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