First and second derivative of the function using fft?

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Feruz
Feruz il 7 Dic 2011
Hi
Could anybody help me with derivative of function with fft, ifft, fftshift
Thanks!

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David Young
David Young il 7 Dic 2011
See my answer to this question.
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David Young
David Young il 7 Dic 2011
Yes, you can do that. But you don't need the bsxfun if you're working in 1-D - you just multiply. In addition, you can do both multiplications before transforming back. So something like this:
F = fft(f);
FD = F .* ftdiff;
FDD = FD .* ftdiff;
fd = ifft(FD);
fdd = ifft(FDD);
where uppercase variables are in the frequency domain, and d or D means differentiated.

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Dr. Seis
Dr. Seis il 7 Dic 2011
I have another example, here
In that case I am converting acceleration data to displacement, which is (double) integration in the time domain and division in the frequency domain. In the frequency domain, this is essentially done by dividing the complex acceleration amplitude at frequency 'f' by (sqrt(-1)*2*pi*f)^2.
To go from displacement to velocity, you would multiply the displacement amplitude at frequency 'f' by sqrt(-1)*2*pi*f
To go from displacement to acceleration you would multiply the displacement amplitude at frequency 'f' by (sqrt(-1)*2*pi*f)^2
This is what David was referring to when he says the second derivative is "simply a matter of multiplying again."
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Feruz
Feruz il 7 Dic 2011
I see, but I am doing numerical approximation, and exact, as I understood, my numerical approx is by fft, so in a sense multiplying again, doesn't mean multiply as I wrote???

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