Timeline for Rigorous numerics for maxima and minima (one variable)
Current License: CC BY-SA 3.0
6 events
| when toggle format | what | by | license | comment | |
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| Dec 4, 2019 at 21:30 | comment | added | Steve Huntsman | See also arxiv.org/abs/1609.00061 | |
| Mar 24, 2013 at 21:16 | comment | added | H A Helfgott | Thanks for the comments below. I've been using the bisection method (as described in, e.g., Tucker) on compact intervals. I end up doing truncated Taylor expansions around infinity, and also around zero, since otherwise I get division-by-zero problems with the functions I am considering (and also because I am interested in getting exact minima precisely when these are reached at the origin). Of course, working out truncated Taylor expansions (and the radii within which the main terms do dominate) can be tiring. Are there standard programs for doing this as well? | |
| Mar 19, 2013 at 13:15 | history | edited | H A Helfgott |
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| Mar 19, 2013 at 1:30 | answer | added | Dima Pasechnik | timeline score: 4 | |
| Mar 19, 2013 at 0:12 | answer | added | Steve Huntsman | timeline score: 4 | |
| Mar 18, 2013 at 21:27 | history | asked | H A Helfgott | CC BY-SA 3.0 |