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I'm trying to generate some synthetic data from en experiment. I got the theoretical PSD in the positive frequency domain and calculate some timeseries out of. Than C do some manipulation on my data, do an FFT and make a fit in the frequency domain. I will first show you some code, than explain the main problem:

The bins at which I evaluate the theoretical PSD are my bins given by:

bins = np.linspace(1,1e3,2**13)

From that I calculate my timerseries by:

for i in range(bins.shape[0]):
    signal += dataCOS[i] * np.cos(2*np.pi* t * bins[i] + random.uniform(0,2*np.pi))

where dataCOS is the value of the PSD and the corresponding bins and t is given by

t_full = np.linspace(0,1,2**13, endpoint = False)

My Problem is, I need an FFT of my timeseries that does not smear out. Okay, usually not possible, BUT, if I'm correct and add exactly one frequency bins per time bin in a way that they match in frame (highest and lowest frequency are still visible), it should work. So, my question is, how have bins and t_full to be shaped??

Here are my thoughts: Both need to have the same amount of points, and the highest and lowest frequency must be visible from the time domain. But I'm not sure, hope you can help me out.

EDIT ********************** First, to illustrate my problem a bit more see the pictures attached:enter image description here In the first you have the classic result of a backtransformation with too many points in the time domain, but with all the bins being periodic.enter image description here In the second its the same, but now they are not periodic anymore and one gets the expected smearing. Of course, one could improve here with a filter, but if you want to fit the inital red function, you run into major problem. Last picture is the result i wanted: All functions are periodic within the timeframe, so there is no smearing out. Second, every pair of t_bins holds exactly one frequency i added before, so the cloud at the computational limit vanishes. enter image description here

To get that, here is the needed spacing of bins and t

bins = np.linspace(0,2**14,2**14, endpoint = False)
t_full = np.linspace(0,1,2*bins.shape[0], endpoint = False)
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1 Answer 1

You probably just need to apply a suitable window function prior to the FFT to prevent spectral leakage. I'm not a Python user, so I can't give code, but the formula is quite simple to apply. Try a von Hann or Hamming window (they are similar, but give slightly different shaped peaks).

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i already thought about that, but this cannot work, as it just changes the width peak. A Fitting afterwards doesnt make sense. –  user2003965 Oct 15 '13 at 10:32
OK - I don't really understand what you're trying to achieve (maybe add some plots of your data and its PSD to the question?) but normally the discontinuity in the time domain (due to the assumption of periodicity) is a problem, and a window function fixes this. –  Paul R Oct 15 '13 at 10:41
To avoid overshooting at the ends, it might be helpful to append zeros or just the old data vice versa, to move this smearing away. A window function makes sense, if you have a good reasoning for the cutoff frequency. Could you maybe post some pictures to make the problems more clear? –  Faultier Oct 15 '13 at 11:06

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