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{{Unreferenced|date=April 2008}}
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In [[mathematics]], a '''compactly generated (topological) group''' is a [[topological group]] ''G'' which is [[generating set of a group|algebraically generated]] by one of its [[compact space|compact]] subsets. This should not be confused with the unrelated notion (widely used in [[algebraic topology]]) of a [[compactly generated space]] -- one whose [[topology]] is generated (in a suitable sense) by its compact subspaces.
 
== Definition ==
 
A [[topological group]] ''G'' is said to be '''compactly generated''' if there exists a compact subset ''K'' of ''G'' such that
 
:<math>\langle K\rangle = \bigcup_{n \in \mathbb{N}} (K \cup K^{-1})^n = G.</math>
 
So if ''K'' is symmetric, i.e. ''K'' = ''K''<sup> &minus;1</sup>, then
 
:<math>G = \bigcup_{n \in \mathbb{N}} K^n.</math>
 
== Locally compact case ==
 
This property is interesting in the case of [[Locally compact space|locally compact]] topological groups, since locally compact compactly generated topological groups can be approximated by locally compact, [[separable space|separable]] [[metric space|metric]] factor groups of ''G''. More precisely, for a sequence
 
:''U''<sub>''n''</sub>
 
of open identity neighborhoods, there exists a [[normal subgroup]] ''N'' contained in the intersection of that sequence, such that
 
:''G''/''N''
 
is locally compact metric separable (the [[Kakutani-Kodaira-Montgomery-Zippin theorem]]).
 
[[Category:Topological groups]]
{{topology-stub}}

Latest revision as of 04:04, 29 December 2014

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