Timeline for Average rank of elliptic curves over $\mathbb{Q}$
Current License: CC BY-SA 3.0
7 events
| when toggle format | what | by | license | comment | |
|---|---|---|---|---|---|
| May 9, 2012 at 18:36 | answer | added | Eugene | timeline score: 4 | |
| May 9, 2012 at 7:09 | vote | accept | Eugene | ||
| May 8, 2012 at 3:40 | answer | added | stankewicz | timeline score: 12 | |
| May 8, 2012 at 3:26 | comment | added | Eugene | Noted. I've edited my question to reflect your comment. | |
| May 8, 2012 at 3:26 | history | edited | Eugene | CC BY-SA 3.0 |
deleted 58 characters in body; added 58 characters in body
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| May 8, 2012 at 3:25 | comment | added | Noam D. Elkies | I think the general expectation is still (or again) in favor of the "minimalist"conjecture of average rank $1/2$, i.e. asymptotically 100% of curves have the smallest rank consistent with their parity, which is even or odd with equal probability. Meanwhile, last I heard Manjul Bhargava together with his student Arul Shankar have pushed the upper bound on the average rank down to $0.99$ . | |
| May 8, 2012 at 3:08 | history | asked | Eugene | CC BY-SA 3.0 |