Long line: Difference between revisions

Latest revision as of 19:48, 11 May 2008

This article is about a particular topological space (uniquely determined up to homeomorphism)|View a complete list of particular topological spaces

This article describes a standard counterexample to some plausible but false implications. In other words, it lists a pathology that may be useful to keep in mind to avoid pitfalls in proofs
View other standard counterexamples in topology

Definition

The long line is defined as follows: Let $S_{Ω}$ denote the minimal uncountable well-ordered set. Then $L = S_{Ω} \times [0, 1)$ , in the dictionary order, is the long line.

Topological space properties

Properties it does not satisfy

Second-countable space: The long line is not second-countable
Sub-Euclidean space: The long line cannot be embedded inside any Euclidean space

Properties it does satisfy

Linearly orderable space: It is defined using a linear order, so it is clearly linearly orderable
Locally Euclidean space: It is in fact locally homeomorphic to $R^{1}$
Normal space

Thus the long line fails to satisfy only the second condition for a manifold; it is simply too long.

@@ Line 5: / Line 5: @@
 ==Definition==
-The '''long line''' is defined as follows: Let <math>S_\Omega</math> denote the minimal uncountable well-ordered set. Then <math>L = S_\Omega \times [0,1)</math>, in the [[dictionary order]], is the long line.
+The '''long line''' is defined as follows: Let <math>S_\Omega</math> denote the [[minimal uncountable well-ordered set]]. Then <math>L = S_\Omega \times [0,1)</math>, in the [[dictionary order]], is the long line.
 ==Topological space properties==