What could cause fast Fourier transform to give complex conjugate of the intended result?

Question

I have 2 real time series $x(t)$ and $y(t)$, after fft it should become $tilde{X}(f)$ and $tilde{Y}(f)$. Then I need to normalize $tilde{X}(f)$ with $tilde{Y}(f)$ : $tilde{X}(f)/tilde{Y}(f)=tilde{Z}(f)$
However fft gives me $tilde{Z}^*(f)$ instead (the sign of the imaginary part is inverted).
What could have caused this ? I know $x(-t)$ and $y(-t)$ can cause $tilde{Z}^*(f)$, but $x(t)$ and $y(t)$ have the correct physical meaning.

BigBrownBear00 · Answer

Taking the inverse FFT (IFFT) instead of FFT would cause a phase inversion.

graille · Answer

If we assume that the Fourrier Transform formula is :
$${{hat {x}}(nu )=int _{-infty }^{+infty }x(t),mathrm {e} ^{-2{rm {i}}pinu t},mathrm {d} t}.$$
Are you sure you didn't forget the minus (-) sign in the exponential ? In this case, because $x(t)$ is real, You will effectively find the conjugate of ${hat {x}}(nu )$ at the end.

What could cause fast Fourier transform to give complex conjugate of the intended result?

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