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Alexandroff extension
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== The one-point compactification == In particular, the Alexandroff extension <math>c: X \rightarrow X^*</math> is a Hausdorff compactification of ''X'' if and only if ''X'' is Hausdorff, noncompact and locally compact. In this case it is called the '''one-point compactification''' or '''Alexandroff compactification''' of ''X''. Recall from the above discussion that any Hausdorff compactification with one point remainder is necessarily (isomorphic to) the Alexandroff compactification. In particular, if <math>X</math> is a compact Hausdorff space and <math>p</math> is a [[limit point]] of <math>X</math> (i.e. not an [[isolated point]] of <math>X</math>), <math>X</math> is the Alexandroff compactification of <math>X\setminus\{p\}</math>. Let ''X'' be any noncompact [[Tychonoff space]]. Under the natural partial ordering on the set <math>\mathcal{C}(X)</math> of equivalence classes of compactifications, any minimal element is equivalent to the Alexandroff extension (Engelking, Theorem 3.5.12). It follows that a noncompact Tychonoff space admits a minimal compactification if and only if it is locally compact.
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