Timeline for If $G$ is a paracompact topological group, then is $G \times G$ paracompact?
Current License: CC BY-SA 4.0
4 events
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| Jul 20, 2018 at 17:44 | comment | added | Tim Campion | I just realized that Gepner and Henriques (my motivating context) are working in compactly-generated spaces, which might change the answer. Perhaps I will ask this as a separate question... | |
| Jul 20, 2018 at 17:23 | comment | added | Tim Campion | Thanks! I see— you explain why G is paracompact. On the other hand from the title I see that GxG is not normal. But it is Hausdorff and every paracompact Hausdorff space is normal. So GxG is not paracompact. | |
| Jul 20, 2018 at 17:17 | vote | accept | Tim Campion | ||
| Jul 20, 2018 at 16:10 | history | answered | Will Brian | CC BY-SA 4.0 |