Locally Closed Subset
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In
topology In mathematics, topology (from the Greek language, Greek words , and ) is concerned with the properties of a mathematical object, geometric object that are preserved under Continuous function, continuous Deformation theory, deformations, such ...
, a branch of mathematics, a subset E of a
topological space In mathematics, a topological space is, roughly speaking, a geometrical space in which closeness is defined but cannot necessarily be measured by a numeric distance. More specifically, a topological space is a set whose elements are called points ...
X is said to be locally closed if any of the following equivalent conditions are satisfied: * E is the intersection of an open set and a closed set in X. * For each point x\in E, there is a neighborhood U of x such that E \cap U is closed in U. * E is an open subset of its closure \overline. * The set \overline\setminus E is closed in X. * E is the difference of two closed sets in X. * E is the difference of two open sets in X. The second condition justifies the terminology ''locally closed'' and is Bourbaki's definition of locally closed. To see the second condition implies the third, use the facts that for subsets A \subseteq B, A is closed in B if and only if A = \overline \cap B and that for a subset E and an open subset U, \overline \cap U = \overline \cap U.


Examples

The interval (0, 1] = (0, 2) \cap
, 1 The comma is a punctuation mark that appears in several variants in different languages. It has the same shape as an apostrophe or single closing quotation mark () in many typefaces, but it differs from them in being placed on the baseline (t ...
/math> is a locally closed subset of \Reals. For another example, consider the relative interior D of a closed disk in \Reals^3. It is locally closed since it is an intersection of the closed disk and an open ball. Recall that, by definition, a submanifold E of an n-manifold M is a subset such that for each point x in E, there is a chart \varphi : U \to \Reals^n around it such that \varphi(E \cap U) = \Reals^k \cap \varphi(U). Hence, a submanifold is locally closed. 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, Y = U \cap \overline where \overline denotes the closure of ''Y'' in ''X''. (See also
quasi-projective variety In mathematics, a quasi-projective variety in algebraic geometry is a locally closed subset of a projective variety, i.e., the intersection inside some projective space of a Zariski-open and a Zariski-closed subset. A similar definition is used in s ...
and
quasi-affine variety In mathematics, a quasi-projective variety in algebraic geometry is a locally closed subset of a projective variety, i.e., the intersection inside some projective space of a Zariski-open and a Zariski-closed subset. A similar definition is used in s ...
.)


Properties

Finite intersections and the pre-image under a continuous map of locally closed sets are locally closed. On the other hand, a union and a complement of locally closed subsets need not be locally closed. (This motivates the notion of a constructible set.) Especially in
stratification theory In mathematics, especially in topology, a stratified space is a topological space that admits or is equipped with a stratification, a decomposition into subspaces, which are nice in some sense (e.g., smooth or flat). A basic example is a subset of ...
, for a locally closed subset E, the complement \overline \setminus E is called the boundary of E (not to be confused with
topological boundary In topology and mathematics in general, the boundary of a subset of a topological space is the set of points in the closure of not belonging to the interior of . An element of the boundary of is called a boundary point of . The term bound ...
). If E is a closed submanifold-with-boundary of a manifold M, then the relative interior (that is, interior as a manifold) of E is locally closed in M and the boundary of it as a manifold is the same as the boundary of it as a locally closed subset. A topological space is said to be if every subset is locally closed. See Glossary of topology#S for more of this notion.


See also

*


Notes


References

* Bourbaki, ''Topologie générale'', 2007. * * *


External links

* {{nlab, id=locally+closed+set, title=locally closed set General topology