Locally closed subset
In topology, a branch of mathematics, a subset of a topological space is said to be locally closed if any of the following equivalent conditions are satisfied:[1][2][3][4]
- is the intersection of an open set and a closed set in
- For each point there is a neighborhood of such that is closed in
- is open in its closure
- The set is closed in
- is the difference of two closed sets in
- is the difference of two open sets in
The second condition justifies the terminology locally closed and is Bourbaki's definition of locally closed.[1] To see the second condition implies the third, use the facts that for subsets is closed in if and only if and that for a subset and an open subset
Examples
[edit]The interval is a locally closed subset of For another example, consider the relative interior of a closed disk in It is locally closed since it is an intersection of the closed disk and an open ball.
On the other hand, is not a locally closed subset of .
Recall that, by definition, a submanifold of an -manifold is a subset such that for each point in there is a chart around it such that Hence, a submanifold is locally closed.[5]
Here is an example in algebraic geometry. Let U be an open affine chart on a projective variety X (in the Zariski topology). Then each closed subvariety Y of U is locally closed in X; namely, where denotes the closure of Y in X. (See also quasi-projective variety and quasi-affine variety.)
Properties
[edit]Finite intersections and the pre-image under a continuous map of locally closed sets are locally closed.[1] On the other hand, a union and a complement of locally closed subsets need not be locally closed.[6] (This motivates the notion of a constructible set.)
Especially in stratification theory, for a locally closed subset the complement is called the boundary of (not to be confused with topological boundary).[2] If is a closed submanifold-with-boundary of a manifold then the relative interior (that is, interior as a manifold) of is locally closed in and the boundary of it as a manifold is the same as the boundary of it as a locally closed subset.[2]
A topological space is said to be submaximal if every subset is locally closed. See Glossary of topology#S for more of this notion.
See also
[edit]- Countably generated space – topological space in which the topology is determined by its countable subsets
Notes
[edit]- ^ Jump up to: a b c Bourbaki 2007, Ch. 1, § 3, no. 3.
- ^ Jump up to: a b c Pflaum 2001, Explanation 1.1.2.
- ^ Ganster, M.; Reilly, I. L. (1989). "Locally closed sets and LC -continuous functions". International Journal of Mathematics and Mathematical Sciences. 12 (3): 417–424. doi:10.1155/S0161171289000505. ISSN 0161-1712.
- ^ Engelking 1989, Exercise 2.7.1.
- ^ Mather, John (2012). "Notes on Topological Stability". Bulletin of the American Mathematical Society. 49 (4): 475–506. doi:10.1090/S0273-0979-2012-01383-6.section 1, p. 476
- ^ Bourbaki 2007, Ch. 1, § 3, Exercise 7.
References
[edit]- Bourbaki, Nicolas (2007). Topologie générale. Chapitres 1 à 4. Berlin: Springer. doi:10.1007/978-3-540-33982-3. ISBN 978-3-540-33982-3.
- Bourbaki, Nicolas (1989) [1966]. General Topology: Chapters 1–4 [Topologie Générale]. Éléments de mathématique. Berlin New York: Springer Science & Business Media. ISBN 978-3-540-64241-1. OCLC 18588129.
- Engelking, Ryszard (1989). General Topology. Heldermann Verlag, Berlin. ISBN 3-88538-006-4.
- Pflaum, Markus J. (2001). Analytic and geometric study of stratified spaces. Lecture Notes in Mathematics. Vol. 1768. Berlin: Springer. ISBN 3-540-42626-4. OCLC 47892611.
External links
[edit]- locally closed set at the nLab