Encyclopedia > One-point compactification

  Article Content

Compactification

Redirected from One-point compactification

It is very useful to embed topological spaces in compact spaces, because of the strong properties compact spaces have. An embedding of a topological space X as a dense subset of a compact space is called a compactification of X.

Of particular interest are Hausdorff compactifications, i.e., compactifications in which the compact space is Hausdorff. A topological space has a Hausdorff compactification if and only if it is Tychonoff. Moreover, there is a unique (up to homeomorphism) "most general" compactification, the Stone-Čech compatification of X, denoted by βX. The space βX is characterized by the universal property that any continuous function from X to a compact Hausdorff space K can be extended to a continuous function from βX to K in a unique way.

Any non-compact space X has a one-point compactification obtained by adding an extra point ∞ (often called a point at infinity) and defining the open sets of the new space to be the open sets of X together with the sets of the form G U {∞}, where G is open and X \ G is compact. The one-point compactification of X is Hausdorff if and only if X is Hausdorff and locally compact.

In the String theory context, Compactification refers to "curling" up the extra dimensions ( six in the superstring theory) usually on Calabi-Yau spaces or on Orbifolds[?]



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Shoreham, New York

... (0.4 mi²) of it is land and none of the area is covered with water. Demographics As of the census of 2000, there are 417 people, 145 households, and 126 ...

 
 
 
This page was created in 36.2 ms