Compactly generated group

In mathematics, a compactly generated (topological) group is a topological group G which is algebraically generated by one of its compact subsets.[1] 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

So if K is symmetric, i.e. K = K 1, then

Locally compact case

This property is interesting in the case of locally compact topological groups, since locally compact compactly generated topological groups can be approximated by locally compact, separable metric factor groups of G. More precisely, for a sequence

Un

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).

gollark: Bees are spheres. QED.
gollark: I'm sure I read about the sphere packing thingy being investigated in higher dimensions, if not packing in general.
gollark: Can you do better if you can use multiple shapes together?
gollark: Space bees actually just use a sphere.
gollark: And SOME packing.

References

  1. Stroppel, Markus (2006), Locally Compact Groups, European Mathematical Society, p. 44, ISBN 9783037190166.
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