Topological space
In mathematics, a topological space is an ordered pair where is a set and is a certain collection of subsets of called the open sets or the topology of . The topology of introduces a structure on the set which is useful for defining some important abstract notions such as the "closeness" of two elements of and convergence of sequences of elements of .
Formal definition
A topological space of open sets is an ordered pair where is a set and is a collection of subsets of (i.e., any element is a subset of X) with the following three properties:
- and (the empty set) are in
- The union of any family (infinite or otherwise) of elements of is again in
- The intersection of finitely many elements of is again in
Elements of the set are called open sets of . We often simply writte instead of once the topology is established.
Once we have a topology of open sets on , we define the closed sets of to be the compliments (in ) of the open sets; the closed sets of have the properties that
- and (the empty set) are closed
- The intersection of any family of closed sets is closed
- The union of finitely many closed sets is closed
Alternatively, notice that we could have defined a topology of closed sets (having the properties above as axioms) and defined the open sets relative to that topology as compliments of closed sets. The set of opens relative to a topology of closed sets then obeys the axioms for a topology of opens, and therefore closed and these two kinds of topologies occur simultaneously. Similarly, the axioms for a topology of neighborhoods (described below) give rise to a collection of "open sets" verifying the axioms for a topology of opens, and conversely. Thus, the notion of topology is a relative one, and these equivalences allow one to study the same topological structure from a number of different viewpoints simultaneously.
Examples
1. Let where denotes the set of real numbers. The open interval ]a, b[ (where a < b) is the set of all numbers between a and b:
Then a topology can be defined on to consist of and all sets of the form:
where is any arbitrary index set, and and are real numbers satisfying for all . This is the familiar topology on and probably the most widely used in the applied sciences. However, in general one may define different inequivalent topologies on a particular set and in the next example another topology on , albeit a relatively obscure one, will be constructed.
2. Let as before. Let be a collection of subsets of defined by the requirement that if and only if or contains all except at most a finite number of real numbers. Then it is straightforward to verify that defined in this way has the three properties required to be a topology on . This topology is known as the cofinite topology or Zariski topology.
3. Every metric on gives rise to a topology on . The open ball with centre and radius is defined to be the set
A set is open if and only if for every , there is an open ball with centre contained in . The resulting topology is called the topology induced by the metric . The standard topology on , discussed in Example 1, is induced by the metric .
Neighborhoods
Given a topological space of opens, we say that a subset of is a neighborhood of a point if contains an open set containing the point [1]
If denotes the system of neighborhoods of relative to the topology , then the following properties hold:
- is not empty for any
- If is in then
- The intersection of two elements of is again in
- If is in and contains , then is again in
- If is in then there exists a such that is a subset of and for all
Conversely, if we define a topology of neighborhoods on via the above properties, then we can recover a topology of opens whose neighborhoods relative to that topology give rise to the neighborhood topology we started from: is open if it is in for all . Conversely, the opens relative to a topology of neighborhoods form a topology of opens whose neighborhoods are the same as those we started from. All this just means that a given topological spaces is the same, regardless of which axioms we choose to start from.
The neighborhood axioms lend themselves especially well to the study of topological abelian groups and topological rings because knowing the neighborhoods of any point is equivalent to knowing the neighborhoods of 0 (since the operations are presumed continuous). For example, the -adic topology on a ring is Hausdorff if and only if , thus a topological property is equivalent to an algebraic property which becomes clear when thinking in terms of neighborhoods.
Some topological notions
This section introduces some important topological notions. Throughout, X will denote a topological space with the topology O.
- Partial list of topological notions
- Limit point
- A point is a limit point of a subset A of X if any open set in O containing x also contains a point with . An equivalent definition is that is a limit point of A if every neighbourhood of x contains a point different from x.
- Open cover
- A collection of open sets of X is said to be an open cover for X if each point belongs to at least one of the open sets in
- Path
- A path is a continuous function . The point is said to be the starting point of and is said to be the end point. A path joins its starting point to its end point
- Hausdorff/separability property
- X has the Hausdorff (or separability) property if for any pair there exist disjoint sets U and V with and
- Connectedness
- X is connected if given any two disjoint open sets U and V such that , then either X=U or X=V
- Path-connectedness
- X is path-connected if for any pair there exists a path joining x to y
- Compactness
- X is said to be compact if any open cover of X has a finite sub-cover. That is, any open cover has a finite number of elements which again constitute an open cover for X
A topological space with the Hausdorff, connectedness, path-connectedness property is called, respectively, a Hausdorff (or separable), connected, path-connected topological space. A path connected topological space is also connected, but the converse need not be true.
Induced topologies
A topological space can be used to define a topology on any particular subset or on another set. These "derived" topologies are referred to as induced topologies. Descriptions of some induced topologies are given below. Throughout, will denote a topological space.
- Some induced topologies
- Relative topology
- If A is a subset of X then open sets may be defined on A as sets of the form where O is any open set in . The collection of all such open sets defines a topology on A called the relative topology of A as a subset of X
- Quotient topology
- If Y is another set and q is a surjective function from X to Y then open sets may be defined on Y as subsets U of Y such that . The collection of all such open sets defines a topology on Y called the quotient topology induced by q
See also
Notes
- ↑ Some authors use a different definition, in which a neighborhood N of x is an open set containing x.
References
- K. Yosida, Functional Analysis (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980
- D. Wilkins, Lecture notes for Course 212 - Topology, Trinity College Dublin, URL: [1]