### Some articles on *uniformizable*:

**Uniformizable**Space

... In mathematics, a topological space X is

**uniformizable**if there exists a uniform structure on X which induces the topology of X ... Equivalently, X is

**uniformizable**if and only if it is homeomorphic to a uniform space (equipped with the topology induced by the uniform structure) ... Any (pseudo)metrizable space is

**uniformizable**since the (pseudo)metric uniformity induces the (pseudo)metric topology ...

Topology of Uniform Spaces -

... A topological space is called

**Uniformizable**Spaces... A topological space is called

**uniformizable**if there is a uniform structure compatible with the topology ... Every**uniformizable**space is a completely regular topological space ... Moreover, for a**uniformizable**space X the following are equivalent X is a Kolmogorov space X is a Hausdorff space X is a Tychonoff space for any compatible uniform structure, the intersection ...Main Site Subjects

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