IFFT of Convolution equivalence

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JOB
JOB le 18 Déc 2019
Commenté : JOB le 19 Déc 2019
I was trying out the equation IFFT(x*y) = IFFT(x).IFFT(y), where both 'x' and 'y' are complex numbers. The 'x' and 'y' are 1x8 matrices. The result was different for both sides of the equation. However i was able to prove that x*y = IFFT[ FFT(x).FFT(y)] and FFT(x*y)=FFT(x).FFT(y). What did I miss out when I tried to solve the IFFT relation? Please let me know of any source that has helpful content regarding this relationship

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Ridwan Alam
Ridwan Alam le 18 Déc 2019
Modifié(e) : Ridwan Alam le 18 Déc 2019
Sorry for the confusion. Here is what I tried:
a1 = randi(50,8,1);
b1 = randi(50,8,1);
x = complex(a1,b1)
a2 = randi(50,8,1);
b2 = randi(50,8,1);
y = complex(a2,b2)
xifft = ifft(x)
yifft = ifft(y)
mifft = xifft.*yifft
z = cconv(x,y,length(x))
zifft = ifft(z)./length(z)
% zifft-mifft is almost zero
Summary: you need circular convolution in frequency domain instead of linear convulation.
More details:
  2 commentaires
JOB
JOB le 18 Déc 2019
Thanks again, I equated it by using linear convolution with zero padding.
Ridwan Alam
Ridwan Alam le 18 Déc 2019
sure. glad to help.

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David Goodmanson
David Goodmanson le 18 Déc 2019
Modifié(e) : David Goodmanson le 19 Déc 2019
Hi JOB/Ridwan
Here is a small example where a and b are padded with zeros, so that regular convolution can be compared with convolution by fft and ifft. (The zeros ensure that for fft and ifft, which do circular convolution, the nonzero parts can't overlap by going 'the other way around the circle.'
a = [(1:3)+i*(2:4) zeros(1,4)]
b = [(3:5)+i*(4:6) zeros(1,4)]
n = length(a)
convab = conv(a,b)
convab1 = ifft(fft(a).*fft(b))
convab2 = n*fft(ifft(a).*ifft(b))
All of these results agree (not counting that the conv result is a longer vector and contains more zeros than the other two). For the convab2 result you have to multiply by an extra factor of n. This is because the Matlab ifft algorithm contains an overall factor of (1/n) and the fft does not.
  3 commentaires
David Goodmanson
David Goodmanson le 19 Déc 2019
HI Ridwan,
what you say is true, but it's because a &b have different length than convab. One could do a circular convolution of a and b by a method other than ifft and then compare, but this example just pads out a and b to simulate a linear convolution as before, then pads them out again to be the same length as convab:
a = [(1:3)+i*(2:4) zeros(1,4)];
b = [(3:5)+i*(4:6) zeros(1,4)];
n = length(a);
convab = conv(a,b)
nconvab = length(convab);
apad = [a zeros(1,nconvab-n)]
bpad = [b zeros(1,nconvab-n)]
% the following two expressions are the same
ifft(convab)
nconvab*ifft(apad).*ifft(bpad)
JOB
JOB le 19 Déc 2019
Thanks for the lucid explanation.

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