Kolmogorov quotient: Difference between revisions
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The '''Kolmogorov quotient''' of a [[topological space]] is defined as its quotient by the equivalence relation of [[topological indistinguishability]], equipped with the [[quotient topology]]. Equivalently, it is the image of the initial object with respect to quotient maps to [[Kolmogorov space]]s (which are <math>T_0</matH> topological spaces). | The '''Kolmogorov quotient''' of a [[topological space]] is defined as its quotient by the equivalence relation of [[topological indistinguishability]], equipped with the [[quotient topology]]. Equivalently, it is the image of the initial object with respect to quotient maps to [[Kolmogorov space]]s (which are <math>T_0</matH> topological spaces). | ||
The Kolmogorov quotient of any topological space is a [[Kolmogorov space]], and every Kolmogorov space is its own Kolmogorov quotient. | |||
==Relation between properties and Kolmogorov quotients== | |||
{| class="sortable" border="1" | |||
! Property of topological spaces !! Meaning !! Property of being topological space whose [[Kolmogorov quotient]] satisfies the other property !! Meaning | |||
|- | |||
| [[Kolmogorov space]] || any two points are topologically distinguishable || any topological space || any topological space | |||
|- | |||
| [[T1 space]] || points are closed || [[symmetric space]] || given any two [[topologically distinguishable points]], there is an open subset containing the first but not the second. | |||
|- | |||
| [[Hausdorff space]] || distinct points can be separated by disjoint open subsets || [[preregular space]] || any two [[topologically distinguishable points]] can be separated by disjoint open subsets | |||
|- | |||
| [[regular Hausdorff space]] || || [[regular space]] || | |||
|} | |||
Latest revision as of 15:52, 28 January 2012
Definition
The Kolmogorov quotient of a topological space is defined as its quotient by the equivalence relation of topological indistinguishability, equipped with the quotient topology. Equivalently, it is the image of the initial object with respect to quotient maps to Kolmogorov spaces (which are topological spaces).
The Kolmogorov quotient of any topological space is a Kolmogorov space, and every Kolmogorov space is its own Kolmogorov quotient.
Relation between properties and Kolmogorov quotients
| Property of topological spaces | Meaning | Property of being topological space whose Kolmogorov quotient satisfies the other property | Meaning |
|---|---|---|---|
| Kolmogorov space | any two points are topologically distinguishable | any topological space | any topological space |
| T1 space | points are closed | symmetric space | given any two topologically distinguishable points, there is an open subset containing the first but not the second. |
| Hausdorff space | distinct points can be separated by disjoint open subsets | preregular space | any two topologically distinguishable points can be separated by disjoint open subsets |
| regular Hausdorff space | regular space |