Timeline for A generalization of Liouvilles Theorem for entire functions
Current License: CC BY-SA 3.0
11 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Mar 16, 2017 at 8:26 | vote | accept | Erfan Salavati | ||
| Mar 16, 2017 at 8:24 | vote | accept | Erfan Salavati | ||
| Mar 16, 2017 at 8:26 | |||||
| Mar 16, 2017 at 8:24 | vote | accept | Erfan Salavati | ||
| Mar 16, 2017 at 8:24 | |||||
| Mar 16, 2017 at 8:22 | vote | accept | Erfan Salavati | ||
| Mar 16, 2017 at 8:24 | |||||
| Mar 16, 2017 at 3:01 | answer | added | Alexandre Eremenko | timeline score: 4 | |
| Mar 15, 2017 at 10:31 | answer | added | Lasse Rempe | timeline score: 5 | |
| Mar 15, 2017 at 4:25 | comment | added | Erfan Salavati | @Gerhard Paseman I edited the question so that it excludes constant functions. | |
| Mar 15, 2017 at 4:21 | history | edited | Erfan Salavati | CC BY-SA 3.0 |
added 13 characters in body
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| Mar 15, 2017 at 3:46 | comment | added | Lasse Rempe | The answer is positive. You can e.g. use Arakelyan's theorem to construct entire functions that are large only on a very thin half-strip (say). Just use three pairwise disjoint half strips. | |
| Mar 15, 2017 at 3:02 | comment | added | Gerhard Paseman | Yes, but I doubt that there are three such where two of them are not constant. Gerhard "Is That All There Is?" Paseman, 2017.03.14. | |
| Mar 15, 2017 at 2:57 | history | asked | Erfan Salavati | CC BY-SA 3.0 |