Urysohn is hereditary

From Topospaces

This article gives the statement, and possibly proof, of a topological space property (i.e., Urysohn space) satisfying a topological space metaproperty (i.e., subspace-hereditary property of topological spaces)
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Statement

Any subset of a Urysohn space, endowed with the subspace topology, is also a Urysohn space.

Related facts

Similar facts

Property Proof that it is hereditary
Hausdorff space Hausdorffness is hereditary
regular space regularity is hereditary
completely regular space complete regularity is hereditary
collectionwise Hausdorff space collectionwise Hausdorff is hereditary

Other similar facts:

Opposite facts

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