>Huang Andy wrote:
>> As I studied, p equals the number of vanishing points of Daubeshies
Wavelet
>> in pi, which means p-1 degree order polynomial that can be put in
scaling
>> function. I am trying to find out what those h0, h1, h2...h22 are as I
am
>> trying to program Daubeshies with 22 vanishing points.
>>
>> Does anyone have any idea what are they? Thank you very much.
>
>Anyone? Yes, Burrus, Gopinath, and Guo do. See, for instance, chapter 5
>of _Introduction to Wavelets and Wavelt Transforms_ by them. They have
>some source code available for their wavelet work here:
>http://dsp.rice.edu/software
>
>Also look into Wavelab:
>
>http://www-stat.stanford.edu/~wavelab/
>
>Cheers! --M
>
>Thank you very much
Reply by mlimber●July 3, 20062006-07-03
Huang Andy wrote:
> As I studied, p equals the number of vanishing points of Daubeshies Wavelet
> in pi, which means p-1 degree order polynomial that can be put in scaling
> function. I am trying to find out what those h0, h1, h2...h22 are as I am
> trying to program Daubeshies with 22 vanishing points.
>
> Does anyone have any idea what are they? Thank you very much.
Anyone? Yes, Burrus, Gopinath, and Guo do. See, for instance, chapter 5
of _Introduction to Wavelets and Wavelt Transforms_ by them. They have
some source code available for their wavelet work here:
http://dsp.rice.edu/software
Also look into Wavelab:
http://www-stat.stanford.edu/~wavelab/
Cheers! --M
Reply by Huang Andy●July 1, 20062006-07-01
As I studied, p equals the number of vanishing points of Daubeshies Wavelet
in pi, which means p-1 degree order polynomial that can be put in scaling
function. I am trying to find out what those h0, h1, h2...h22 are as I am
trying to program Daubeshies with 22 vanishing points.
Does anyone have any idea what are they? Thank you very much.