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2011-01-28, 19:02
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#1 |
Nov 2004
22×33×5 Posts |
Math News Note
An interesting article, in case you missed it-
http://www.sciencedaily.com/releases...0120090950.htm Norm |
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2011-01-28, 19:45
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#2 |
Aug 2006
10111011001002 Posts |
Yes, I saw that last week. Has anyone implemented their formula?
Personally (as much as I admire the mathematicians involved, esp. Ono) I find the hype overblown. The "finite formula" the article mentions is a sum of finitely many infinite sums, as far as I can tell. As to computational efficiency (theoretical or practical), I don't know. Last fiddled with by CRGreathouse on 2011-01-28 at 19:46 |
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2011-01-28, 20:10
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#3 |
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Einyen
Dec 2003
Denmark
22×863 Posts |
Also P==NP ?
http://science.slashdot.org/story/11...T-Released-PNP And in Physics, cold fusion? http://www.physorg.com/news/2011-01-...ion-video.html |
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2011-01-28, 21:00
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#4 | |
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(loop (#_fork))
Feb 2006
Cambridge, England
144668 Posts |
Quote:
It looks as if the Euler recurrence takes about O(n^1.5) time to compute P(n); the partition numbers don't grow all that fast and all you need for the recurrence is addition and subtraction, but I'd still rather take my chances with the theta functions for PartitionNumber(10^10), which is of no more than about a hundred thousand digits. |
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2011-01-28, 21:24
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#5 | |
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Aug 2006
22·3·499 Posts |
Quote:
What practical importance it will have remains to be seen. |
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2011-01-28, 23:16
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#6 |
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(loop (#_fork))
Feb 2006
Cambridge, England
2×7×461 Posts |
I think the important result is that it doesn't intrinsically require inexact computation; if I read it correctly, you're evaluating modular functions at a finite number of special points where their values are exact algebraic numbers, and you can in principle work out the algebraic numbers by pure computational Galois theory, rather than (as Ono does in http://www.aimath.org/news/partition/brunier-ono) by calculating them to enough precision and doing lattice reduction to work out what the minimal polynomials are.
I'll admit that the Hilbert class field is a difficult object to work in, but there's a lot of work on computing efficiently with such objects that appeared in the nineties as a consequence of point-counting on elliptic curves. Last fiddled with by fivemack on 2011-01-28 at 23:28 |
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2011-01-29, 00:34
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#7 | |
"Bob Silverman"
Nov 2003
North of Boston
5×17×89 Posts |
Quote:
http://www.jstor.org/pss/2153690 On the use of Weber modular forms. The Weber polynomials (as generators of the class group) are very useful as well. |
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2011-01-29, 00:46
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#8 |
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(loop (#_fork))
Feb 2006
Cambridge, England
11001001101102 Posts |
Thanks very much for pointing me at that.
http://www.ams.org/journals/mcom/199...97-00854-5.pdf is a more useful reference since that's the whole text rather than the first page |
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