Timeline for When is a holomorphic submersion with isomorphic fibers locally trivial?
Current License: CC BY-SA 2.5
9 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| Feb 27, 2011 at 20:52 | vote | accept | Georges Elencwajg | ||
| Feb 27, 2011 at 19:09 | comment | added | Sándor Kovács | Georges, you are too kind to call this "returning the compliment". It's more like a gracious way to respond to a silly joke. On the other hand, I believe that a true tough-boiled algebraic geometer ought to know a little complex geometry and a little topology if for nothing else but motivation. | |
| Feb 27, 2011 at 12:52 | comment | added | Georges Elencwajg | To return the compliment, you seem to know a suspicious lot of holomorphic notions -like hyperbolic manifolds mentioned in your comment above- for a tough-boiled algebraic geometer :) | |
| Feb 27, 2011 at 1:15 | history | edited | Sándor Kovács | CC BY-SA 2.5 |
added 266 characters in body
|
| Feb 27, 2011 at 0:59 | history | edited | Sándor Kovács | CC BY-SA 2.5 |
deleted 4 characters in body
|
| Feb 27, 2011 at 0:56 | comment | added | Sándor Kovács | It's ad hoc. I tried to grasp the fact that the projection maps the complement of two lines and a single point to the complement of two points. If the map were algebraic one could argue many ways that this can't happen, but you seem to be hung up on holomorphic things. (wink-wink) :) | |
| Feb 27, 2011 at 0:28 | comment | added | Georges Elencwajg | This is an interestingly unexpected (by me) technique, Sándor. | |
| Feb 26, 2011 at 23:09 | history | edited | Sándor Kovács | CC BY-SA 2.5 |
added 104 characters in body
|
| Feb 26, 2011 at 23:03 | history | answered | Sándor Kovács | CC BY-SA 2.5 |