Development (topology)

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In the mathematical field of topology, a development is a countable collection of open covers of a topological space that satisfies certain separation axioms.

Let $X$ be a topological space. A development for $X$ is a countable collection $F_1, F_2, \ldots$ of open coverings of $X$ , such that for any closed subset $C \subset X$ and any point $p$ in the complement of $C$ , there exists a cover $F j$ such that no element of $F j$ which contains $p$ intersects $C$ . A space with a development is called developable.

A development $F_1, F_2,\ldots$ such that $F_{i+1}\subset F_i$ for all $i$ is called a nested development. A theorem from Vickery states that every developable space in fact has a nested development. If $F i + 1$ is a refinement of $F i$ , for all $i$ , then the development is called a refined development.

Vickery's theorem implies that a topological space is a Moore space if and only if it is regular and developable.

[edit] References

Steen, Lynn Arthur and Seebach, J. Arthur, Counterexamples in Topology, Dover Books, 1995.
Vickery, C.W. Axioms for Moore spaces and metric spaces. Bull. Amer. Math. Soc., 46 (1940), 560-564.
This article incorporates material from Development on PlanetMath, which is licensed under the GFDL.

Development (topology)

From Wikipedia, the free encyclopedia

[edit] References

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