Timeline for Optimal Diophantine approximation of $\pi$
Current License: CC BY-SA 3.0
9 events
| when toggle format | what | by | license | comment | |
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| Dec 28, 2019 at 2:18 | comment | added | River Li | Recently, I encountered a relevant problem: whether or not there are integers $p, q$ with $q > 2$ such that $|\pi - \frac{p}{q}| < \frac{1}{q^4}$? | |
| Sep 21, 2016 at 6:14 | history | edited | Aidan Rocke | CC BY-SA 3.0 |
deleted 14 characters in body
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| S Jul 8, 2016 at 12:10 | history | suggested | Martin Sleziak | CC BY-SA 3.0 |
\log, diophantine -> Diophnatine
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| Jul 8, 2016 at 12:09 | review | Suggested edits | |||
| S Jul 8, 2016 at 12:10 | |||||
| Jul 8, 2016 at 6:34 | comment | added | Aidan Rocke | Interesting. Are there any papers on the subject that you would recommend? | |
| Jul 8, 2016 at 6:34 | review | First posts | |||
| Jul 8, 2016 at 7:18 | |||||
| Jul 8, 2016 at 6:31 | comment | added | Noam D. Elkies | Not the same question. The answer here is almost surely the $3.429288+$ obtained from the approximation $22/7$, though $355/113$ is an impressive also-ran at about $3.202$ (further approximations should converge rapidly to $2$, but we have no technique for proving this). | |
| Jul 8, 2016 at 6:13 | comment | added | Felipe Voloch | mathoverflow.net/questions/210509/… | |
| Jul 8, 2016 at 6:09 | history | asked | Aidan Rocke | CC BY-SA 3.0 |