Open mapping theorem for morphisms of topological groups #
We prove that a continuous surjective group morphism from a sigma-compact group to a locally compact
group is automatically open, in MonoidHom.isOpenMap_of_sigmaCompact
.
We deduce this from a similar statement for the orbits of continuous actions of sigma-compact groups
on Baire spaces, given in isOpenMap_smul_of_sigmaCompact
.
Note that a sigma-compactness assumption is necessary. Indeed, let G
be the real line with
the discrete topology, and H
the real line with the usual topology. Both are locally compact
groups, and the identity from G
to H
is continuous but not open.
Consider a sigma-compact additive group acting continuously and transitively on a
Baire space. Then the orbit map is open around zero. It follows in
isOpenMap_vadd_of_sigmaCompact
that it is open around any point.
Consider a sigma-compact group acting continuously and transitively on a Baire space. Then
the orbit map is open around the identity. It follows in isOpenMap_smul_of_sigmaCompact
that it
is open around any point.
Consider a sigma-compact additive group acting continuously and transitively on a Baire space. Then the orbit map is open. This is a version of the open mapping theorem, valid notably for the action of a sigma-compact locally compact group on a locally compact space.
Consider a sigma-compact group acting continuously and transitively on a Baire space. Then the orbit map is open. This is a version of the open mapping theorem, valid notably for the action of a sigma-compact locally compact group on a locally compact space.
A surjective morphism of topological groups is open when the source group is sigma-compact and the target group is a Baire space (for instance a locally compact group).