arXiv:0911.0332 Abstract | arXiv Analytics

arXiv:0911.0332 [math.GN]Abstract References Reviews Resources

The Banach-Alaoglu theorem is equivalent to the Tychonoff theorem for compact Hausdorff spaces

Published 2009-11-02, updated 2009-11-25Version 2

In this brief note we provide a simple approach to give a new proof of the well known fact that the Banach-Alaoglu theorem and the Tychonoff product theorem for compact Hausdorff spaces are equivalent.

Comments: 4 pages

Categories: math.GN

Keywords: compact hausdorff spaces, banach-alaoglu theorem, tychonoff theorem, equivalent, tychonoff product theorem

Related articles: Most relevant | Search more

arXiv:0801.0170 [math.GN] (Published 2007-12-30)

Orders of $π$-bases

Isaac Gorelic

arXiv:1310.4035 [math.GN] (Published 2013-10-15, updated 2015-04-25)

Chains of functions in $C(K)$-spaces

Tomasz Kania, Richard J. Smith

arXiv:1904.08669 [math.GN] (Published 2019-04-18)

Spaces of max-min measures on compact Hausdorff spaces

Viktoriya Brydun, Mykhailo Zarichnyi

Toolbox

Post your review for this article
Attach supplementary resources
Edit our extended metadata
FacebookGoogle+LinkedInRedditTwitterVK

arXiv:0911.0332 [math.GN]AbstractReferencesReviewsResources

The Banach-Alaoglu theorem is equivalent to the Tychonoff theorem for compact Hausdorff spaces

Links

Toolbox

arXiv:0911.0332 [math.GN]Abstract References Reviews Resources