metrizable

A topological space $(X,\mathcal{T})$ is said to be metrizable if there is a metric $d\colon X\to [0,\infty)$ such that the topology induced by $d$ is $\mathcal{T}$ .

metrizable is owned by Cam McLeman, Matt Piatkus.

How to Cite This Entry

Cam McLeman, Matt Piatkus. "metrizable" (version 2). PlanetMath.org. Freely available at http://planetmath.org/Metrizable.html.

Classification

AMS MSC:	54-00 (General topology :: General reference works (handbooks, dictionaries, bibliographies, etc.))
	55-00 (Algebraic topology :: General reference works (handbooks, dictionaries, bibliographies, etc.))
	22-00 (Topological groups, Lie groups :: General reference works (handbooks, dictionaries, bibliographies, etc.))

Pending Errata and Addenda

None. [ View all 1 ]

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