Timeline for Is it true that every uniformly continuous strictly convex function on convex compact subset of a finite-dim normed vector space has unique minimizer? [closed]
Current License: CC BY-SA 4.0
6 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Nov 5, 2020 at 18:44 | history | closed |
Pietro Majer Amir Sagiv Tyrone Chris Gerig Mikael de la Salle |
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| Nov 3, 2020 at 0:09 | comment | added | dohmatob | Makes sense. Thanks. | |
| Nov 3, 2020 at 0:05 | review | Close votes | |||
| Nov 5, 2020 at 18:44 | |||||
| Nov 2, 2020 at 23:42 | comment | added | Pietro Majer | The set of minimizers of a convex function is convex, because it is a sublevel set. So you may assume wlog that your function is constant... | |
| Nov 2, 2020 at 23:27 | answer | added | Dieter Kadelka | timeline score: 3 | |
| Nov 2, 2020 at 21:57 | history | asked | dohmatob | CC BY-SA 4.0 |