Category:Separation axioms
Here is a list of articles in the Separation axioms category of the Computing portal that unifies foundations of mathematics and computations using computers. In general topology, the separation axioms are a set of topological properties that describe the extent to which various sets can be "separated" or distinguished by the topology.
Pages in category "Separation axioms"
The following 17 pages are in this category, out of 17 total.
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- Separation axiom (computing)
C
- Collectionwise normal space (computing)
D
- Dowker space (computing)
H
- Hausdorff space (computing)
- History of the separation axioms (computing)
K
- Kolmogorov space (computing)
M
- Monotonically normal space (computing)
N
- Normal space (computing)
P
- Paracompact space (computing)
R
- Regular space (computing)
S
- Semiregular space (computing)
- Sober space (computing)
T
- T1 space (computing)
- Topological indistinguishability (computing)
- Tychonoff space (computing)
U
- Urysohn and completely Hausdorff spaces (computing)
- Urysohn's lemma (computing)
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