Compactification: Difference between revisions
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The evaluation map ''e'' is a continuous map from ''X'' to the cube and we let β(''X'') denote the [[closure ( | The evaluation map ''e'' is a continuous map from ''X'' to the cube and we let β(''X'') denote the [[closure (topology)|closure]] of the image of ''e''. The Stone-Čech compactification is then the pair (''e'',β(''X'')). | ||
If we restrict attention to the [[partial order]] of [[Hausdorff space|Hausdorff]] compactifications, then the one-point compactification is the minimum and the Stone-Čech compactification is the maximum element for this order. The latter states that if ''X'' is a [[Tychonoff space]] then any continuous map from ''X'' to a compact space can be extended to a map from β(''X'') compatible with ''e''. This extension property characterises the Stone-Čech compactification. | If we restrict attention to the [[partial order]] of [[Hausdorff space|Hausdorff]] compactifications, then the one-point compactification is the minimum and the Stone-Čech compactification is the maximum element for this order. The latter states that if ''X'' is a [[Tychonoff space]] then any continuous map from ''X'' to a compact space can be extended to a map from β(''X'') compatible with ''e''. This extension property characterises the Stone-Čech compactification. |
Revision as of 14:31, 6 January 2009
In general topology, a compactification of a topological space is a compact space in which the original space can be embedded, allowing the space to be studied using the properties of compactness.
Formally, a compactification of a topological space X is a pair (f,Y) where Y is a compact topological space and f:X → Y is a homeomorphism from X to a dense subset of Y.
Compactifications of X may be ordered: we say that if there is a continuous map h of Y onto Z such that h.f = g.
The one-point compactification of X is the disjoint union where the neighbourhoods of ω are of the form for K a closed compact subset of X.
The Stone-Čech compactification of X is constructed from the unit interval I. Let F(X) be the family of continuous maps from X to I and let the "cube" IF(X) be the Cartesian power with the product topology. The evaluation map e maps X to IF(X),regarded as the set of functions from F(X) to I, by
The evaluation map e is a continuous map from X to the cube and we let β(X) denote the closure of the image of e. The Stone-Čech compactification is then the pair (e,β(X)).
If we restrict attention to the partial order of Hausdorff compactifications, then the one-point compactification is the minimum and the Stone-Čech compactification is the maximum element for this order. The latter states that if X is a Tychonoff space then any continuous map from X to a compact space can be extended to a map from β(X) compatible with e. This extension property characterises the Stone-Čech compactification.
References
- J.L. Kelley (1955). General topology. van Nostrand, 149-156.