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 fast accurate Kneser sexp algorithm sheldonison Long Time Fellow Posts: 664 Threads: 23 Joined: Oct 2008 08/08/2010, 06:46 PM (This post was last modified: 08/08/2010, 07:17 PM by sheldonison.) (08/08/2010, 03:54 PM)bo198214 Wrote: Wow this sounds to be a great thing! But before continuing, please explain what you mean by "unit length segment"? In Quote:1) generate the Riemann mapping of the unit length segmentThanks Henryk. I think this could be an important development that I have stumbled upon. I finally had to expand to something more powerful than an excel spreadsheet (and perl programs) though! Its really neat that pari-GP is available on the web as shareware. Hopefully, my thid post in the Mathematical discussion forum helps a little in explaining the theta(z) funciton and the Riemann mapping. The fourier series for theta(z) can be developed from any arbitrary unit length on the real axis of sexp(z), where z>-2. $\theta(z)=\operatorname{isuperf}(\operatorname{sexp}(z))-z$ - Sheldon Quote:Also , his name is "Kneser", not "Knesser"! ps. I fixed the pari-GP code to spell Kneser's name correctly! « Next Oldest | Next Newest »

 Messages In This Thread fast accurate Kneser sexp algorithm - by sheldonison - 08/07/2010, 06:53 AM The pari-GP code - by sheldonison - 08/07/2010, 09:17 PM RE: fast accurate Knesser sexp algorithm - by bo198214 - 08/08/2010, 03:54 PM RE: fast accurate Knesser sexp algorithm - by sheldonison - 08/08/2010, 06:46 PM RE: fast accurate Kneser sexp algorithm - by nuninho1980 - 08/15/2010, 12:09 AM updated kneser.gp code - by sheldonison - 08/19/2010, 02:35 AM RE: updated kneser.gp code - by nuninho1980 - 08/19/2010, 12:08 PM RE: updated kneser.gp code - by sheldonison - 08/20/2010, 01:05 AM RE: fast accurate Kneser sexp algorithm - by sheldonison - 10/14/2010, 10:00 PM RE: fast accurate Kneser sexp algorithm - by nuninho1980 - 10/15/2010, 04:03 PM RE: fast accurate Kneser sexp algorithm - by sheldonison - 10/15/2010, 09:20 PM kneser.gp modified for large bases - by sheldonison - 10/19/2010, 03:33 AM small update to allow more flexibility, faster - by sheldonison - 10/30/2010, 09:47 PM update to support B

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