Difference between revisions of "Topological manifold"
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| − | '''Note:''' This page refers to a '''Topological Manifold''' | + | '''Note:''' This page refers to a '''Topological Manifold''' a special kind of [[Manifold]] |
==Definition== | ==Definition== | ||
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# Let {{M|M}} be an {{M|n-}}manifold | # Let {{M|M}} be an {{M|n-}}manifold | ||
# Let {{M|M^n}} be a manifold | # Let {{M|M^n}} be a manifold | ||
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| + | ==See also== | ||
| + | * [[Chart]] | ||
| + | * [[Atlas]] | ||
| + | * [[Manifolds]] | ||
==References== | ==References== | ||
Latest revision as of 01:13, 6 April 2015
Note: This page refers to a Topological Manifold a special kind of Manifold
Contents
[hide]Definition
We say M is a topological manifold of dimension n or simply an n−manifold if it has the following properties[1]:
- M is a Hausdorff space - that is for every pair of distinct points p,q∈M ∃ U,V⊆M (that are open) such that U∩V=∅ and p∈U, q∈V
- M is Second countable - there exists a countable basis for the topology of M
- M is locally Euclidean of dimension n - each point of M has a neighbourhood that his homeomorphic to an open subset of Rn
- This actually means that for each p∈M we can find:
- an open subset U⊆M with p∈U
- an open subset ˆU⊆Rn
- and a Homeomorphism φ:U→ˆU
- This actually means that for each p∈M we can find:
Notations
The following are all equivalent (most common first):
- Let M be a manifold of dimension n
- Let M be an n−manifold
- Let Mn be a manifold
See also
References
- Jump up ↑ John M Lee - Introduction to smooth manifolds - Second Edition
