Timeline for Does every nontrivial sheaf of rings have a maximal ideal?
Current License: CC BY-SA 2.5
9 events
| when toggle format | what | by | license | comment | |
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| Aug 2, 2010 at 12:10 | answer | added | Peter Arndt | timeline score: 8 | |
| Aug 2, 2010 at 10:24 | vote | accept | Martin Brandenburg | ||
| Aug 2, 2010 at 10:06 | history | edited | Martin Brandenburg | CC BY-SA 2.5 |
edited title
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| Aug 2, 2010 at 9:54 | answer | added | user2035 | timeline score: 8 | |
| Aug 2, 2010 at 9:52 | comment | added | Martin Brandenburg | @Darij: No. If $X$ is quasi compact, the global sections of a sum is the sum of the global sections. Or use that the function above is bounded. | |
| Aug 2, 2010 at 9:33 | comment | added | darij grinberg | Back to topic, is the quasicompactness the thing that allows us to just take a maximal ideal in one stalk and the complete rings in the other stalks? | |
| Aug 2, 2010 at 9:27 | comment | added | darij grinberg | Fixed. (SCNR...) | |
| Aug 2, 2010 at 9:27 | history | edited | darij grinberg | CC BY-SA 2.5 |
edited title; added 1 characters in body
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| Aug 2, 2010 at 9:05 | history | asked | Martin Brandenburg | CC BY-SA 2.5 |