\[\quad -\frac{M-1}{2} \leq n \leq \frac{M-1}{2},\]
where \(I_0\) is the modified zeroth-order Bessel function.
The Kaiser was named for Jim Kaiser, who discovered a simple
approximation to the DPSS window based on Bessel functions. The Kaiser
window is a very good approximation to the Digital Prolate Spheroidal
Sequence, or Slepian window, which is the transform which maximizes the
energy in the main lobe of the window relative to total energy.
The Kaiser can approximate many other windows by varying the beta
parameter.
beta
Window shape
0
Rectangular
5
Similar to a Hamming
6
Similar to a Hanning
8.6
Similar to a Blackman
A beta value of 14 is probably a good starting point. Note that as beta
gets large, the window narrows, and so the number of samples needs to be
large enough to sample the increasingly narrow spike, otherwise NaNs will
get returned.
Most references to the Kaiser window come from the signal processing
literature, where it is used as one of many windowing functions for
smoothing values. It is also known as an apodization (which means
"removing the foot", i.e. smoothing discontinuities at the beginning
and end of the sampled signal) or tapering function.
References
[1]
J. F. Kaiser, "Digital Filters" - Ch 7 in "Systems analysis by
digital computer", Editors: F.F. Kuo and J.F. Kaiser, p 218-285.
John Wiley and Sons, New York, (1966).
[2]
E.R. Kanasewich, "Time Sequence Analysis in Geophysics", The
University of Alberta Press, 1975, pp. 177-178.
plt.figure()A=fft(window,2048)/25.5mag=np.abs(fftshift(A))freq=np.linspace(-0.5,0.5,len(A))response=20*np.log10(mag)response=np.clip(response,-100,100)plt.plot(freq,response)plt.title("Frequency response of Kaiser window")plt.ylabel("Magnitude [dB]")plt.xlabel("Normalized frequency [cycles per sample]")plt.axis('tight')plt.show()