Topological space: Difference between revisions

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== References ==
1. K. Yosida, <i>Functional Analysis</i> (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980
2. D. Wilkins, Lecture notes for Course 212 - Topology, Trinity College Dublin, URL: http://www.maths.tcd.ie/~dwilkins/Courses/212/ 


[[Category:Mathematics Workgroup]]
[[Category:Mathematics Workgroup]]
[[Category:CZ Live]]
[[Category:CZ Live]]

Revision as of 17:15, 1 September 2007

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 is an ordered pair where is a set and is a collection of subsets of (i.e. ) with the following three properties:

1. and (the empty set) are in

2. The union of any number (countable or uncountable) of elements of is again in

3. The intersection of any finite number of elements of is again in

Elements of the set are called open sets (of ).

Note that as shorthand a topological space is often simply written as once the particular topology on is understood.

Examples

1. Let where denotes the set of real numbers. Define an open ball of radius around a point by:

Then a topology can be defined on to consist of all sets of the form:

where is any arbitrary index set, and and for all . This topology is precisely the familiar topology induced on by the Euclidean distance 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 Zariski topology.

See also

Topology

Analysis

References

1. K. Yosida, Functional Analysis (6 ed.), ser. Classics in Mathematics, Berlin, Heidelberg, New York: Springer-Verlag, 1980

2. D. Wilkins, Lecture notes for Course 212 - Topology, Trinity College Dublin, URL: http://www.maths.tcd.ie/~dwilkins/Courses/212/