Category:Definitions/Set Closures
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This category contains definitions related to Set Closures in the context of Topology.
Related results can be found in Category:Set Closures.
The closure of $H$ (in $T$) is defined as:
- $H^- := H \cup H'$
where $H'$ is the derived set of $H$.
Pages in category "Definitions/Set Closures"
The following 12 pages are in this category, out of 12 total.
C
- Definition:Closure (Metric Space)
- Definition:Closure (Topology)
- Definition:Closure (Topology)/Definition 1
- Definition:Closure (Topology)/Definition 2
- Definition:Closure (Topology)/Definition 3
- Definition:Closure (Topology)/Definition 4
- Definition:Closure (Topology)/Definition 5
- Definition:Closure (Topology)/Definition 6
- Definition:Closure (Topology)/Metric Space
- Definition:Closure in Normed Vector Space
- Definition:Closure Operator/Notation
- Definition:Closure/Normed Vector Space