Product topology: Difference between revisions
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The product topology on a product of two topological spaces (''X'',''T'') and (''Y'',''U'') is the topology with [[Sub-basis (topology)|sub-basis]] for open sets of the form ''G''×''H'' where ''G'' is open in ''X'' (that is, ''G'' is an element of ''T'') and ''H'' is open in ''Y'' (that is, ''H'' is an element of ''U''). So a set is open in the product topology if is a union of products of open sets. | The product topology on a product of two topological spaces (''X'',''T'') and (''Y'',''U'') is the topology with [[Sub-basis (topology)|sub-basis]] for open sets of the form ''G''×''H'' where ''G'' is open in ''X'' (that is, ''G'' is an element of ''T'') and ''H'' is open in ''Y'' (that is, ''H'' is an element of ''U''). So a set is open in the product topology if is a union of products of open sets. | ||
By iteration, the | By iteration, the product topology on a finite Cartesian product ''X''<sub>1</sub>×...×''X''<sub>''n''</sub> is the topology with sub-basis of the form ''G''<sub>1</sub>×...×''G''<sub>''n''</sub>. | ||
The product topology on an arbitrary product <math>\prod_{\lambda \in \Lambda} X_\lambda</math> is the topology with sub-basis <math>\prod_{\lambda \in \Lambda} G_\lambda</math> where each ''G''<sub>λ</sub> and where all but finitely many of the ''G''<sub>λ</sub> are equal to the whole of the corresponding ''X''<sub>λ</sub>. | The product topology on an arbitrary product <math>\textstyle\prod_{\lambda \in \Lambda} X_\lambda</math> is the topology with sub-basis <math>\textstyle\prod_{\lambda \in \Lambda} G_\lambda</math> where each ''G''<sub>λ</sub> is open in ''X''<sub>λ</sub> and where all but finitely many of the ''G''<sub>λ</sub> are equal to the whole of the corresponding ''X''<sub>λ</sub>. | ||
The product topology has a [[universal property]]: if there is a topological space ''Z'' with [[continuous map]]s <math>f_\lambda:Z \rightarrow X_\lambda</math>, then there is a continuous map <math>h : Z \rightarrow \prod_{\lambda \in \Lambda} X_\lambda</math> such that the compositions <math>h \cdot \mathrm{pr}_\lambda = f_\lambda</math>. This map ''h'' is defined by | The product topology has a [[universal property]]: if there is a topological space ''Z'' with [[continuous map]]s <math>f_\lambda:Z \rightarrow X_\lambda</math>, then there is a continuous map <math>h : Z \rightarrow \prod_{\lambda \in \Lambda} X_\lambda</math> such that the compositions <math>h \cdot \mathrm{pr}_\lambda = f_\lambda</math>. This map ''h'' is defined by | ||
Revision as of 16:35, 6 February 2010
In general topology, the product topology is an assignment of open sets to the Cartesian product of a family of topological spaces.
The product topology on a product of two topological spaces (X,T) and (Y,U) is the topology with sub-basis for open sets of the form G×H where G is open in X (that is, G is an element of T) and H is open in Y (that is, H is an element of U). So a set is open in the product topology if is a union of products of open sets.
By iteration, the product topology on a finite Cartesian product X1×...×Xn is the topology with sub-basis of the form G1×...×Gn.
The product topology on an arbitrary product is the topology with sub-basis where each Gλ is open in Xλ and where all but finitely many of the Gλ are equal to the whole of the corresponding Xλ.
The product topology has a universal property: if there is a topological space Z with continuous maps , then there is a continuous map such that the compositions . This map h is defined by
The projection maps prλ to the factor spaces are continuous and open maps.
References
- Wolfgang Franz (1967). General Topology. Harrap, 52-55.
- J.L. Kelley (1955). General topology. van Nostrand, 90-91.