[Date Prev][Date Next][Thread Prev][Thread Next][Date Index][Thread Index]
Re: primitive roots modulo p
From: |
David Bateman |
Subject: |
Re: primitive roots modulo p |
Date: |
Mon, 2 Aug 2004 16:54:37 +0200 |
User-agent: |
Mutt/1.4.1i |
Check the galois field stuff in octave-forge. If you have octave-forge
installed, type
comms info "galois"
in octave to read the manual on this package...
D.
According to Bart Vandewoestyne <address@hidden> (on 07/30/04):
> Hello,
>
> I am in the need of a function that gives me *all* primitive roots
> modulo a certain prime. After some googling, I've found that
> Mathematica has a PrimitiveRoot[n] function... Is there an
> Octave-analogue out there somewhere?
>
> If not, can anybody point me to a reference which lists an efficient
> algorithm to find all primitive roots modulo a certain prime so I can
> try to implement it myself (and share it with the community afterwards)?
>
> Regards,
> Bart
>
> --
> !!!!!!!!!!!!!!!!!!! email change !!!!!!!!!!!!!!!!!!!!!!!
> My email address is now Bart.Vandewoestyne AT telenet.be
> Please update your addressbook!
> !!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
>
>
>
> -------------------------------------------------------------
> Octave is freely available under the terms of the GNU GPL.
>
> Octave's home on the web: http://www.octave.org
> How to fund new projects: http://www.octave.org/funding.html
> Subscription information: http://www.octave.org/archive.html
> -------------------------------------------------------------
--
David Bateman address@hidden
Motorola CRM +33 1 69 35 48 04 (Ph)
Parc Les Algorithmes, Commune de St Aubin +33 1 69 35 77 01 (Fax)
91193 Gif-Sur-Yvette FRANCE
The information contained in this communication has been classified as:
[x] General Business Information
[ ] Motorola Internal Use Only
[ ] Motorola Confidential Proprietary
-------------------------------------------------------------
Octave is freely available under the terms of the GNU GPL.
Octave's home on the web: http://www.octave.org
How to fund new projects: http://www.octave.org/funding.html
Subscription information: http://www.octave.org/archive.html
-------------------------------------------------------------
[Prev in Thread] |
Current Thread |
[Next in Thread] |
- Re: primitive roots modulo p,
David Bateman <=