# Time Domain / Spectrum / DSP

I perform an iFFT on a complex-valued spectrum and change the corresponding time domain-signal by lets say nulling the first sample. Finally I transform it back to frequency domain via FFT.

I wonder where is the (physically) difference between using the two-sided (symmetric) spectrum, or only the one-sided spectrum (positive frequencies only) here, since the two results are different (while comparing the positive frequencies)?

Version 1 (two-sided spectrum): ```fft( nulling( ifft( [0, 1+1j, 2+j, 2-2j, 1-1j] ) ) )```

Output: [-1.2, -0.2+1j, 0.8+2j, 0.8-2j, -0.2-1j]

Version 2 (one-sided spectrum): ```fft( nulling( ifft( [0, 1+1j, 2+j] ) ) )```

Output: [ -1-1j, 0+0j, 1+1j]

-

## 1 Answer

Since your IFFT routine doesn't know that you are supplying a one-sided spectrum (ie. that there are implicit complex conjugate symmetric negative frequency bins) it can only (mis-)interpret this as a normal N point complex frequency domain input with both positive and negative frequency bins.

Some FFT libraries (e.g. FFTW, vDSP) do support real-to-complex FFT and complex-to-real IFFT, where the number of complex frequency domain bins is N / 2 and the redundant complex conjugate symmetric terms are omitted, but they typically have a separate API for this which is different from the more general complex-to-complex case with N inputs and N outputs.

-
this means one should always extend a one-sided spectrum to a two-sided spectrum prior to iFFT for the purposes of performing time-domain manipulations? – user1177816 Jan 30 '12 at 13:33
Yes - if you only have the more common complex-to-complex IFFT available then you will need to take care of the negative frequency bins yourself. – Paul R Jan 30 '12 at 14:10
And as a side note, the relevant function to return/operate on a one-sided spectrum in numpy is `np.fft.rfft` and `np.fft.irfft`. – Joe Kington Jan 30 '12 at 14:28
@Joe: good catch - docs.scipy.org/doc/numpy/reference/generated/… appears to be a more convenient solution for complex-to-real IFFT – Paul R Jan 30 '12 at 14:30