Zero-dimensional space
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Template:Short description Template:AboutTemplate:General geometry
In mathematics, a zero-dimensional topological space (or nildimensional space) is a topological space that has dimension zero with respect to one of several inequivalent notions of assigning a dimension to a given topological space.<ref>Template:Cite book</ref> A graphical illustration of a zero-dimensional space is a point.<ref>Template:Cite conference</ref>
Definition
Specifically:
- A topological space is zero-dimensional with respect to the Lebesgue covering dimension if every open cover of the space has a refinement that is a cover by disjoint open sets.
- A topological space is zero-dimensional with respect to the finite-to-finite covering dimension if every finite open cover of the space has a refinement that is a finite open cover such that any point in the space is contained in exactly one open set of this refinement.
- A topological space is zero-dimensional with respect to the small inductive dimension if it has a base consisting of clopen sets.
The three notions above agree for separable, metrisable spaces (see Template:Slink).
Properties of spaces with small inductive dimension zero
- A zero-dimensional Hausdorff space is necessarily totally disconnected, but the converse fails. However, a locally compact Hausdorff space is zero-dimensional if and only if it is totally disconnected. (See Template:Harv for the non-trivial direction.)
- Zero-dimensional Polish spaces are a particularly convenient setting for descriptive set theory. Examples of such spaces include the Cantor space and Baire space.
- Hausdorff zero-dimensional spaces are precisely the subspaces of topological powers <math>2^I</math> where <math>2=\{0,1\}</math> is given the discrete topology. Such a space is sometimes called a Cantor cube. If Template:Mvar is countably infinite, <math>2^I</math> is the Cantor space.
Manifolds
All points of a zero-dimensional manifold are isolated.