We study the topology of metric spaces which are definable in o-minimal expansions of ordered fields. We show that a definable metric space either contains an infinite definable discrete set or is definably homeomorphic to a definable set equipped with its euclidean topology. This implies that a separable metric space which is definable in an o-minimal expansion of the real field is definably homeomorphic to a definable set equipped with its euclidean topology. We show that almost every point in a definable metric space has a neighborhood which is definably homeomorphic to an open definable subset of euclidean space.
The Hausdorff dimension of metric spaces definable in o-minimal expansions of the real field
On O-Minimal Expansions of $(\mathbb{Q},<,+,0)$
Definable Tietze extension property in o-minimal expansion of ordered group
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