Return-Path: Received: (qmail 24190 invoked from network); 23 Jan 2002 14:15:15 -0000 Received: from unknown (HELO warrior.services.quay.plus.net) (212.159.14.227) by excalibur.plus.net with SMTP; 23 Jan 2002 14:15:15 -0000 X-Priority: 3 X-MSMail-Priority: Normal Received: (qmail 28420 invoked from network); 23 Jan 2002 14:15:15 -0000 Received: from unknown (HELO post.thorcom.com) (212.172.148.70) by warrior.services.quay.plus.net with SMTP; 23 Jan 2002 14:15:15 -0000 X-MimeOLE: Produced By Microsoft MimeOLE V6.00.2800.1106 Received: from majordom by post.thorcom.com with local (Exim 3.33 #2) id 16TO4V-0001Em-00 for rsgb_lf_group-outgoing@blacksheep.org; Wed, 23 Jan 2002 14:08:15 +0000 Received: from e1.ny.us.ibm.com ([32.97.182.101]) by post.thorcom.com with esmtp (Exim 3.33 #2) id 16TO4U-0001Ec-00 for rsgb_lf_group@blacksheep.org; Wed, 23 Jan 2002 14:08:14 +0000 Received: from northrelay01.pok.ibm.com (northrelay01.pok.ibm.com [9.117.200.21]) by e1.ny.us.ibm.com (8.9.3/8.9.3) with ESMTP id JAA98366 for ; Wed, 23 Jan 2002 09:03:51 -0500 Received: from usa.net (ss6.bld.socks.ibm.com [9.14.4.71]) by northrelay01.pok.ibm.com (8.11.1m3/NCO v5.01) with ESMTP id g0NE6qi25776 for ; Wed, 23 Jan 2002 09:06:52 -0500 Message-ID: <3C4EC368.1DDAF0AE@usa.net> Date: Wed, 23 Jan 2002 15:06:32 +0100 From: "Alberto di Bene" X-Mailer: Mozilla 4.79 [en] (Windows NT 5.0; U) X-Accept-Language: en MIME-Version: 1.0 To: rsgb_lf_group@blacksheep.org Subject: LF: Re: Digital Sine Generators References: Content-Type: text/plain; charset=us-ascii; format=flowed Content-Transfer-Encoding: 8bit Precedence: bulk Reply-To: rsgb_lf_group@blacksheep.org X-Listname: rsgb_lf_group Sender: Klaus von der Heide wrote: > Hello and thanks for the replies! > > As a lecturer, I never present all that can be said, and when > posting the idea of a DDS basing on the Chinese Remainder Theorem, > I hoped to get response. And it was my feeling, Alberto will ask, > how to get the phase increment. He did it, and Zim contributed the > example and a very useful link. Thanks! That is encouragement > to set my priorities new. > [...] Klaus, thanks for the explanations. Waiting for your promised post, as I happen to have Matlab 5.0, I would like to receive your interactive course on the subject. And please enclose also the Matlab routine to solve the diophantine equation (shades of Fermat, I do hope it won't require an homomorphism with the modular forms...:-) to find the base step generators for the sin/cos tables. Thanks 73 Alberto I2PHD