Discrete space: Difference between revisions

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In topology, a discrete space is a topological space with the discrete topology, in which every subset is open.

A discrete space is metrizable, with the topology induced by the discrete metric.
A discrete space is a uniform space with the discrete uniformity.
A discrete space is compact if and only if it is finite.
A discrete space is connected if and only if it has at most one point.

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	In [[topology]], a '''discrete space''' is a [[topological space]] with the '''discrete topology''', in which every [[subset]] is open.		In [[topology]], a '''discrete space''' is a [[topological space]] with the '''discrete topology''', in which every [[subset]] is open.