Effacer les filtres
Effacer les filtres

ifft output is complex?

23 vues (au cours des 30 derniers jours)
ben howey
ben howey le 31 Août 2018
Modifié(e) : Matt J le 31 Août 2018
I have a time series (x). I have taken the fft of the time series (X). I want to shift the entire series, or in the future only certain frequency components, by phase shift (theta). I have changed the complex numbers of X to alter the angle whilst conserving the abs(X). I then ifft the output (X2) and I get a complex output and im not sure why?
Thanks
if true
for m=2:length(X)
n=X(m);
r=real(n);
im=imag(n);
a=angle(n);
a2=a+pi/2;
r2=(r*cos(a2))/cos(a);
im2=tan(a2)*r2;
z=complex(r2,im2);
X2(m,1)=z;
end
output=ifft(X2);

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Réponses (2)

Dimitris Kalogiros
Dimitris Kalogiros le 31 Août 2018
After the manipulations of fft values X , If abs(X) exhibits even symmetry and angle(X) odd symmetry, then ifft should give back a real value time sequence. Otherwise, ifft results to a complex time series.
Matt J
Matt J le 31 Août 2018
Modifié(e) : Matt J le 31 Août 2018
Shifting the angle by a constant amount for every frequency component will not translate the signal. The translation t0 has to be linearly weighted by frequency.
Also, it is much easier to implement what you have done just by doing,
output=ifft( X.*exp(-j*2*pi*f*t0) )
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ben howey
ben howey le 31 Août 2018
*sorry z=sin(wt+pi/2) = sin(2*pi*0.3+pi/2) , where w is omega frequency in rad/s
Matt J
Matt J le 31 Août 2018
Modifié(e) : Matt J le 31 Août 2018
That is the same as
z=sin(2*pi*0.3*(t+1/1.2))
So yes, it is possible. You would add +/- 1/1.2 to the phase angle of the spectral components at +/- 0.3 Hz.

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