Difference between revisions of "Upper bound of a family of topologies"
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− | The family of all possible topologies on the set | + | ''least upper bound, on a set $ S $'' |
+ | |||
+ | The topology $ \xi $ | ||
+ | which is the finest of all topologies on $ S $ | ||
+ | containing all topologies of the given family $ \mathfrak M $( | ||
+ | cf. [[Comparison of topologies|Comparison of topologies]]). A [[subbase]] of the topology $ \xi $ | ||
+ | is formed by the family of all subsets of $ S $ | ||
+ | which are open in at least one topology of the family $ \mathfrak M $. | ||
+ | |||
+ | The family of all possible topologies on the set $ S $ | ||
+ | with the operation defined above, which consists in taking the upper bound of any subfamily, and a minimal element — the trivial topology — is a [[Complete lattice|complete lattice]]. The upper bound of a family of topologies is also known as the inductive limit of a family of topologies. | ||
The following interpretation of the upper bound of a family of topologies is useful. Let | The following interpretation of the upper bound of a family of topologies is useful. Let | ||
− | + | $$ | |
+ | T = \prod \{ {( S, {\mathcal T} ) } : { {\mathcal T} \in \mathfrak M } \} | ||
+ | $$ | ||
− | be the [[Tikhonov product|Tikhonov product]] of all topological spaces which result from imparting the various topologies in the family | + | be the [[Tikhonov product|Tikhonov product]] of all topological spaces which result from imparting the various topologies in the family $ \mathfrak M $ |
+ | to the set $ S $. | ||
+ | Let $ S ^ {*} $ | ||
+ | be the diagonal of this product, i.e. the set of all constant mappings from $ \mathfrak M $ | ||
+ | into $ S $( | ||
+ | or, which is the same thing, the set of all threads (cf. [[Thread|Thread]]) $ \{ {S } : { {\mathcal T} \in \mathfrak M } \} $ | ||
+ | for which $ S _ {\mathcal T} = S _ { {\mathcal T} ^ \prime } $ | ||
+ | for all $ {\mathcal T} , {\mathcal T} ^ \prime \in \mathfrak M $). | ||
+ | The set $ S ^ {*} $ | ||
+ | is in a natural one-to-one correspondence with the set $ S $( | ||
+ | this can be seen by projecting the set $ T $ | ||
+ | onto any of its factors). If $ S ^ {*} $ | ||
+ | is equipped with the topology induced from the space $ T $, | ||
+ | and if this topology is transferred to $ S $ | ||
+ | using the correspondence mentioned above, one obtains the upper bound of the family $ \mathfrak M $. | ||
+ | This interpretation of the upper bound of a family of topologies makes it possible to understand that the upper bound of any family of Hausdorff topologies is a Hausdorff topology, and the upper bound of any family of (completely) regular topologies is a (completely) regular topology. Similar statements do not apply to families of normal and paracompact topologies. However, the upper bound of a countable family of metrizable topologies (with a countable base) is a metrizable topology (with a countable base). The diagonal $ S ^ {*} $ | ||
+ | is, as a rule, not closed in $ T $, | ||
+ | and for this reason the upper bound of two compact topologies is not necessarily compact. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> J.L. Kelley, "General topology" , Springer (1975)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> N. Bourbaki, "Elements of mathematics. General topology" , Springer (1989) (Translated from French)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> J.L. Kelley, "General topology" , Springer (1975)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> N. Bourbaki, "Elements of mathematics. General topology" , Springer (1989) (Translated from French)</TD></TR></table> |
Latest revision as of 08:27, 6 June 2020
least upper bound, on a set $ S $
The topology $ \xi $ which is the finest of all topologies on $ S $ containing all topologies of the given family $ \mathfrak M $( cf. Comparison of topologies). A subbase of the topology $ \xi $ is formed by the family of all subsets of $ S $ which are open in at least one topology of the family $ \mathfrak M $.
The family of all possible topologies on the set $ S $ with the operation defined above, which consists in taking the upper bound of any subfamily, and a minimal element — the trivial topology — is a complete lattice. The upper bound of a family of topologies is also known as the inductive limit of a family of topologies.
The following interpretation of the upper bound of a family of topologies is useful. Let
$$ T = \prod \{ {( S, {\mathcal T} ) } : { {\mathcal T} \in \mathfrak M } \} $$
be the Tikhonov product of all topological spaces which result from imparting the various topologies in the family $ \mathfrak M $ to the set $ S $. Let $ S ^ {*} $ be the diagonal of this product, i.e. the set of all constant mappings from $ \mathfrak M $ into $ S $( or, which is the same thing, the set of all threads (cf. Thread) $ \{ {S } : { {\mathcal T} \in \mathfrak M } \} $ for which $ S _ {\mathcal T} = S _ { {\mathcal T} ^ \prime } $ for all $ {\mathcal T} , {\mathcal T} ^ \prime \in \mathfrak M $). The set $ S ^ {*} $ is in a natural one-to-one correspondence with the set $ S $( this can be seen by projecting the set $ T $ onto any of its factors). If $ S ^ {*} $ is equipped with the topology induced from the space $ T $, and if this topology is transferred to $ S $ using the correspondence mentioned above, one obtains the upper bound of the family $ \mathfrak M $. This interpretation of the upper bound of a family of topologies makes it possible to understand that the upper bound of any family of Hausdorff topologies is a Hausdorff topology, and the upper bound of any family of (completely) regular topologies is a (completely) regular topology. Similar statements do not apply to families of normal and paracompact topologies. However, the upper bound of a countable family of metrizable topologies (with a countable base) is a metrizable topology (with a countable base). The diagonal $ S ^ {*} $ is, as a rule, not closed in $ T $, and for this reason the upper bound of two compact topologies is not necessarily compact.
References
[1] | J.L. Kelley, "General topology" , Springer (1975) |
[2] | N. Bourbaki, "Elements of mathematics. General topology" , Springer (1989) (Translated from French) |
Upper bound of a family of topologies. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Upper_bound_of_a_family_of_topologies&oldid=39443