Timeline for Is there an Ax-Grothendieck result for entire functions?
Current License: CC BY-SA 3.0
7 events
| when toggle format | what | by | license | comment | |
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| May 27, 2017 at 8:45 | review | Close votes | |||
| May 27, 2017 at 12:47 | |||||
| Oct 7, 2016 at 16:20 | comment | added | Mohan Ramachandran | @Yoyo .The answer is no.The key words are Fatou-Bieberbach domains. | |
| Oct 7, 2016 at 15:58 | comment | added | Yoyo | @HeinrichD. Thx. | |
| Oct 7, 2016 at 15:53 | comment | added | Yoyo | @Julien: do you have an explicit counter example for $n=1$ ? | |
| Oct 7, 2016 at 15:53 | comment | added | HeinrichD | See math.stackexchange.com/questions/29758/entire-1-1-function for the case n=1. They are not only surjective, they are even linear. | |
| Oct 7, 2016 at 15:47 | comment | added | Sylvain JULIEN | I think Picard's theorem prevents such a result for $n=1$. | |
| Oct 7, 2016 at 15:42 | history | asked | Yoyo | CC BY-SA 3.0 |