Category:Closed Sets (Normed Vector Spaces)
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This category contains results about Closed Sets in the context of Normed Vector Spaces.
Let $V = \struct {X, \norm {\,\cdot\,} }$ be a normed vector space.
Let $F \subset X$.
Definition 1
$F$ is closed in $V$ if and only if its complement $X \setminus F$ is open in $V$.
Definition 2
$F$ is closed (in $V$) if and only if every limit point of $F$ is also a point of $F$.
That is: if and only if $F$ contains all its limit points.
Pages in category "Closed Sets (Normed Vector Spaces)"
The following 7 pages are in this category, out of 7 total.