Partially ordered space

In mathematics, a partially ordered space (or pospace) is a topological space X equipped with a closed partial order \leq, i.e. a partial order whose graph \{(x, y) \in X^2 | x \leq y\} is a closed subset of X^2.

From pospaces, one can define dimaps, i.e. continuous maps between pospaces which preserve the order relation.

Equivalences

For a topological space X equipped with a partial order \leq, the following are equivalent:

The order topology is a special case of this definition, since a total order is also a partial order. Every pospace is a Hausdorff space. If we take equality = as the partial order, this definition becomes the definition of a Hausdorff space.

See also

External link


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