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Talk:Uniform space

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Revision as of 20:56, 22 May 2012 by Boris Tsirelson (talk | contribs) (more)
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I is said: "The topology induced by product of uniform spaces is the Tychonoff product of topologies induced by the uniform spaces." How to prove it? --VictorPorton 21:49, 22 May 2012 (CEST)

The product topology is the weakest topology that makes all projections continuous.
The product uniformity is the weakest uniformity that makes all projections uniformly continuous.
The topology generated by the product uniformity makes all projections continuous, since it makes them uniformly continuous. Thus, it is stronger than the product topology. It remains to check that it is weaker...
--Boris Tsirelson 22:33, 22 May 2012 (CEST)
Or maybe fix a point in the product set (not space yet) and consider the correspondence between entourages and neighborhoods; then between filters of entourages and filters of neighborhoods; then between products of the former and products of the latter.
--Boris Tsirelson 22:56, 22 May 2012 (CEST)
How to Cite This Entry:
Uniform space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Uniform_space&oldid=26782