christianrhiley
Mar31-08, 09:47 PM
Problem:
Let X be a locally compact Hausdorff space, Y a subspace. Show that the quotient space X/Y is a Hausdorff space.
My attempt at a solution:
I don't have a solution. I cannot connect a Hausdorff space with a quotient space.
Since X is compact Hausdorff x,y \in X s.t. x and y can be seperated by neighborhoods if \exists a neighborhood U of x and V of y s.t. U /\ V = \phi. Now, somehow this implies that, for open sets U, the \bigcup U \subset X are disjoint.
Let X be a locally compact Hausdorff space, Y a subspace. Show that the quotient space X/Y is a Hausdorff space.
My attempt at a solution:
I don't have a solution. I cannot connect a Hausdorff space with a quotient space.
Since X is compact Hausdorff x,y \in X s.t. x and y can be seperated by neighborhoods if \exists a neighborhood U of x and V of y s.t. U /\ V = \phi. Now, somehow this implies that, for open sets U, the \bigcup U \subset X are disjoint.