Locally Hausdorff not implies Hausdorff: Difference between revisions

This article gives the statement and possibly, proof, of a non-implication relation between two topological space properties. That is, it states that every topological space satisfying the first topological space property need not satisfy the second topological space property
View a complete list of topological space property non-implications | View a complete list of topological space property implications |Get help on looking up topological space property implications/non-implications
|

Statement

A locally Hausdorff space need not be Hausdorff.

Example

An example is the line with two origins, which illustrates the more general fact that a locally Euclidean space need not be Hausdorff, and hence need not be a manifold.