From: R. B. Love <rblove@airmail.net>
Subject: Re: Where I find Bessel function for Ada ?
Date: Tue, 2 Dec 2008 22:18:05 -0600
Date: 2008-12-02T22:18:05-06:00 [thread overview]
Message-ID: <2008120222180516807-rblove@airmailnet> (raw)
In-Reply-To: ff3gaje5z87t$.c8792s1r4nz3.dlg@40tude.net
On 2008-11-26 06:57:09 -0600, "Dmitry A. Kazakov"
<mailbox@dmitry-kazakov.de> said:
> Well, if there is no Ada code, then I would also consider to implement it
> from scrap. There is an excellent book "Mathematical Functions and Their
> Approximations" by Yudell L. Luke:
>
> http://www.amazon.com/Mathematical-Functions-Their-Approximations-Yudell/dp/0124599508
If
>
> I correctly remember it contains coefficients of Chebyshev polynomial
> approximations for various Bessel functions with a huge number of decimal
> places. Chebyshev polynomes are fairly simple and efficient to sum.
Do you work on comission? That's a $700 book.
next prev parent reply other threads:[~2008-12-03 4:18 UTC|newest]
Thread overview: 16+ messages / expand[flat|nested] mbox.gz Atom feed top
2008-11-26 8:40 Where I find Bessel function for Ada ? reinkor
2008-11-26 11:05 ` gautier_niouzes
2008-11-26 12:57 ` Dmitry A. Kazakov
2008-12-03 4:18 ` R. B. Love [this message]
2008-12-03 13:22 ` Dmitry A. Kazakov
2008-12-03 14:24 ` Hyman Rosen
2008-12-03 14:54 ` Dmitry A. Kazakov
2008-12-06 22:02 ` Nasser Abbasi
2008-12-06 22:37 ` Per Sandberg
2008-12-19 12:39 ` Colin Paul Gloster
2008-12-19 23:30 ` Jerry
2008-11-26 13:08 ` Paul Cole Gloster
2008-11-26 15:09 ` Ken Thomas
2008-11-26 16:12 ` Ludovic Brenta
2008-11-26 17:17 ` Dmitry A. Kazakov
2008-11-27 3:07 ` Jerry
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