Difference between revisions of "Box topology"

From Maths
Jump to: navigation, search
(Created page with "{{Stub page|grade=B|msg=Not that important because we have the product topology page, however it should be a slightly bigger stub page!}} ==Definition== Let {{M|\big((X_\alpha...")
 
(No difference)

Latest revision as of 10:19, 26 September 2016

Stub grade: B
This page is a stub
This page is a stub, so it contains little or minimal information and is on a to-do list for being expanded.The message provided is:
Not that important because we have the product topology page, however it should be a slightly bigger stub page!

Definition

Let [ilmath]\big((X_\alpha,\mathcal{J}_\alpha)\big)_{\alpha\in I} [/ilmath] be an arbitrary family of topological spaces. The box topology is the topology generated by the following basis[1]:

  • [ilmath]\mathcal{B}:=\{\prod_{\alpha\in I}U_\alpha\ \vert\ (U_\alpha)_{\alpha\in I}\in\prod_{\alpha\in I}\mathcal{J}_\alpha\}[/ilmath] - the basis consisting of all Cartesian products of all open sets from [ilmath]\big((X_\alpha,\mathcal{J}_\alpha)\big)_{\alpha\in I} [/ilmath][Note 1]

TODO: Check this expression


Notes

  1. Badly phrased, it should mean all tuples of the form [ilmath](U_\alpha)_{\alpha\in I} [/ilmath] where [ilmath]\forall\alpha\in I[U_\alpha\in\mathcal{J}_\alpha][/ilmath]

References

  1. Introduction to Topological Manifolds - John M. Lee