Locally finite space

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In the mathematical field of topology, a locally finite space is a topological space in which every point has a finite neighborhood, that is, a neighborhood consisting of finitely many elements.

Background

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The conditions for local finiteness were created by Jun-iti Nagata and Yury Smirnov while searching for a stronger version of the Urysohn metrization theorem. The motivation behind local finiteness was to formulate a new way to determine if a topological space X is metrizable without the countable basis requirement from Urysohn's theorem.[1]

Definitions

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Let T=(S,τ) be a topological space and let be a set of subsets of S Then is locally finite if and only if each element of S has a neighborhood which intersects a finite number of sets in .[2]

A locally finite space is an Alexandrov space.[1]

A T1 space is locally finite if and only if it is discrete.[3]

References

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