> Yes, but only for n= 1 (what I mean but cannot type is that the exponent of
> cos is 2n
Ok, a whole window family defined by
w_n(t) = (0.5 - 0.5 Cos(t) )^n, 0 <= t <= 2 Pi
As you said, for n=1 this is the von Hann window. For n=2 you have
w_2(t) = 0.375 - 0.5 Cos(t) + 0.125 Cos(2 t)
this is close, but not equal to the Blackman window. For n=3
w_3(t) = 0.3125 - 0.46875 Cos(t) + 0.1875 Cos(2 t) - 0.03125 Cos(3 t)
which is not close to any window with a name. This means it is not
optimal in any sense (same for n=2). Look at the window link in
wikipedia to see the optimal third order cosine windows. Another good
link:
A H Nuttall:
"Some Windows with Very Good Sidelobe Behavior"
IEEE Transactions on Acoustics, Speech, and Signal Processing. Vol.
ASSP-29 (February 1981).
Regards,
Andor
Reply by Jens Hee●May 10, 20062006-05-10
Yes, but only for n= 1 (what I mean but cannot type is that the exponent of
cos is 2n
Jens
"Andor" <andor.bariska@gmail.com> wrote in message
news:1147287886.754334.51150@j73g2000cwa.googlegroups.com...
>
> Jens Hee wrote:
>> Does anybody know if the FTT window cos2n(t) have an official name.
>
> It's called the "Von Hann" window:
> http://en.wikipedia.org/wiki/Window_function#Hann_window
>
>> I call
>> it the Moriat window because one of my frinds started a discussion abot
>> this
>> window.
>
> This friend's name is Moriat? He must be pretty old to claim precedence
> over Julius von Hann. Check out
>
> http://en.wikipedia.org/wiki/Julius_von_Hann
>
> Regards,
> Andor
>>
>> Jens Hee
>> www.jenshee.dk
>
Reply by Andor●May 10, 20062006-05-10
Jens Hee wrote:
> Does anybody know if the FTT window cos2n(t) have an official name.
Does anybody know if the FTT window cos2n(t) have an official name. I call
it the Moriat window because one of my frinds started a discussion abot this
window.
Jens Hee
www.jenshee.dk