local compactness is hereditary for locally closed subspaces


Theorem - Let X be a locally compact space and YX a subspaceMathworldPlanetmath. If Y is locally closed in X then Y is also locally compact.

The converseMathworldPlanetmath of this theorem is also true with the additional assumptionPlanetmathPlanetmath that X is HausdorffPlanetmathPlanetmath.

Theorem 2 - Let X be a locally compact Hausdorff spacePlanetmathPlanetmath (http://planetmath.org/LocallyCompactHausdorffSpace) and YX a subspace. If Y is locally compact then Y is locally closed in X.

Title local compactness is hereditary for locally closed subspaces
Canonical name LocalCompactnessIsHereditaryForLocallyClosedSubspaces
Date of creation 2013-03-22 17:36:33
Last modified on 2013-03-22 17:36:33
Owner asteroid (17536)
Last modified by asteroid (17536)
Numerical id 5
Author asteroid (17536)
Entry type Theorem
Classification msc 54D45
Related topic LocallyCompactHausdorffSpace