Thanks, Xavier
List: I took the initial session of this course a couple of years ago
(already?), and highly recommend it.
(If I can spare the time, I’ll monitor this session and see what’s new.)
> On Sep 23, 2016, at 12:41 AM, Serra Xavier wrote:
>
> A new session of
Corrective grains are also called BLEP / BLAMP etc, so have a read about those.
If f(x) is your function then I'm defining:
C(0) = f(x) doesn't suddenly jump anywhere, i.e. is smooth in the 0th derivative
C(1) = f'(x) doesn't jump anywhere, i.e. is smooth in the 1st derivative
...
C(n) = f^n(x)
On 24 September 2016 at 12:06, Ross Bencina wrote:
> On 24/09/2016 1:28 PM, Andrew Simper wrote:
>>
>> Corrective grains are also called BLEP / BLAMP etc, so have a read about
>> those.
>
>
> Original reference:
>
> "Hard Sync Without Aliasing," Eli Brandt
>
On 24/09/2016 3:01 PM, Andrew Simper wrote:
> "Hard Sync Without Aliasing," Eli Brandt
> http://www.cs.cmu.edu/~eli/papers/icmc01-hardsync.pdf
>
>
But stick to linear phase as you can correct more easily for dc offsets.
What's your reasoning for saying that?
I'm guessing it depends on
On 24/09/2016 1:28 PM, Andrew Simper wrote:
Corrective grains are also called BLEP / BLAMP etc, so have a read about those.
Original reference:
"Hard Sync Without Aliasing," Eli Brandt
http://www.cs.cmu.edu/~eli/papers/icmc01-hardsync.pdf
___
A new session of the MOOC on Audio Signal Processing for Music Applications is
starting in Coursera on September 26th. To enrol go to
https://www.coursera.org/learn/audio-signal-processing
This is a 10 week long course that focuses on the spectral processing
techniques of relevance for the
Cheers Andy,
I'll look into that!
Von: music-dsp-boun...@music.columbia.edu
im Auftrag von Andy Farnell
Gesendet: Donnerstag, 15. September 2016 14:23
An: music-dsp@music.columbia.edu