connected topological group is generated by any neighborhood of identity


Theorem - Let G be a connected topological groupMathworldPlanetmath and e its identity elementMathworldPlanetmath. If U is any open neighborhood of e, then G is generated by U.

Proof: Let U be an open neighborhood of e. For each n we denote by Un the set of elements of the form u1un, where each uiU. Let W:=nUn.

Since each Un is open (see this entry (http://planetmath.org/BasicResultsInTopologicalGroups) - 3), we have that W is an open set. We now see that it is also closed.

Let gW¯, the closure of W. Since gU-1 is an open neighborhood of g, it must intersect W. Thus, let hWgU-1.

  • Since hgU-1, then h=gu-1 for some element uU.

  • Since hW, then hUn for some n, i.e. h=u1un with each uiU.

We then have g=u1unu, i.e. gUn+1W. Hence, W is closed.

Since G is connected and W is open and closed, we must have W=G. This means that G is generated by U.

Title connected topological group is generated by any neighborhood of identity
Canonical name ConnectedTopologicalGroupIsGeneratedByAnyNeighborhoodOfIdentity
Date of creation 2013-03-22 18:01:45
Last modified on 2013-03-22 18:01:45
Owner asteroid (17536)
Last modified by asteroid (17536)
Numerical id 7
Author asteroid (17536)
Entry type Theorem
Classification msc 22A05