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I have data and a time 'value' associated with it (Tx and X).

How can I perform a fast Fourier transform on my data.

Tx is an array I have and X is another array I have. The length of both arrays are of course the same and they are associated by Tx[i] with X[i] , where i goes from 0 to len(X).

How can I perform a fft on such data to ultimately achieve a Power Spectral Density plot frequency against |fft|^2.

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Look at numpy.fft. –  mgilson Nov 29 '12 at 23:39
Its simply not possible. You could interpolate to a given frequency maybe, there are also other methods though I guess. –  seberg Nov 30 '12 at 0:58
Are the time values uniformly spaced ? –  Paul R Nov 30 '12 at 6:38
no they are not, that is the problem effectively. –  Sameer Patel Nov 30 '12 at 12:30
This problem might be better suited for dsp.stackexchange.com Anybody have enough moderator points to move it? –  Mark Borgerding Nov 30 '12 at 12:47

1 Answer 1

If the data is not uniformly sampled (i.e. Tx[i]-Tx[i-1] is constant), then you cannot do an FFT on it.

Here's an idea: If you have a pretty good idea of the bandwidth of the signal, then you could create a resampled version of the DFT basis vectors R. I.e. the complex sinusoids evaluated at the Tx times. Then solve the linear system x = A*z: where x is your observation, z is the unknown frequency content of the signal, and A is the resamapled DFT basis. Note that A may not actually be a basis depending on the severity of the non-uniformity. It will almost certainly not be an orthogonal basis like the DFT.

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