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All the FFT implementations we have come across result in complex values (with real and imaginary parts), even if the input to the algorithm was a discrete set of real numbers (integers).

Is it not possible to represent frequency domain in terms of real numbers only?

Steve

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What about moving this question to DSP SX: dsp.stackexchange.com? –  petrichor Apr 25 '12 at 8:19
    
You should pick one answer as being correct. –  Jonathan Apr 23 at 19:59
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6 Answers

The FFT is fundamentally a change of basis. The basis into which the FFT changes your original signal is a set of sine waves instead. In order for that basis to describe all the possible inputs it needs to be able to represent phase as well as amplitude; the phase is represented using complex numbers.

For example, suppose you FFT a signal containing only a single sine wave. Depending on phase you might well get an entirely real FFT result. But if you shift the phase of your input a few degrees, how else can the FFT output represent that input?

edit: This is a somewhat loose explanation, but I'm just trying to motivate the intuition.

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It helps answer a lot. If the FFT result only contains frequency and phase, how does it capture the amplitude information in the time domain sample? That is, how does it re-create the correct amplitudes in the iFFT? –  steve landiss Apr 24 '12 at 19:36
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Well, each value in the FFT corresponds to a different frequency component. The magnitude of that value is the amplitude of the component and the complex angle is the phase of that component. –  zmccord Apr 25 '12 at 2:26
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The FFT provides you with amplitude and phase. The amplitude is encoded as the magnitude of the complex number (sqrt(x^2+y^2)) while the phase is encoded as the angle (atan2(y,x)). To have a strictly real result from the FFT, the incoming signal must have even symmetry (i.e. x[n]=conj(x[N-n])).

If all you care about is intensity, the magnitude of the complex number is sufficient for analysis.

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Yes, it is possible to represent the FFT frequency domain results of strictly real input using only real numbers.

Those complex numbers in the FFT result are simply just 2 real numbers, which are both required to give you the 2D coordinates of a result vector that has both a length and a direction angle (or magnitude and a phase). And every frequency component in the FFT result can have a unique amplitude and a unique phase (relative to some point in the FFT aperture).

One real number alone can't represent both magnitude and phase. If you throw away the phase information, that could easily massively distort the signal if you try to recreate it using an iFFT (and the signal isn't symmetric). So a complete FFT result requires 2 real numbers per FFT bin. These 2 real numbers are bundled together in some FFTs in a complex data type by common convention, but the FFT result could easily (and some FFTs do) just produce 2 real vectors (one for cosine coordinates and one for sine coordinates).

There are also FFT routines that produce magnitude and phase directly, but they run more slowly than FFTs that produces a complex (or two real) vector result. There also exist FFT routines that compute only the magnitude and just throw away the phase information, but they usually run no faster than letting you do that yourself after a more general FFT. Maybe they save a coder a few lines of code at the cost of not being invertible. But a lot of libraries don't bother to include these slower and less general forms of FFT, and just let the coder convert or ignore what they need or don't need.

Plus, many consider the math involved to be a lot more elegant using complex arithmetic.

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If your FFT coefficient for a given frequency f is x + i y, you can look at x as the coefficient of a cosine at that frequency, while the y is the coefficient of the sine. If you add these two waves for a particular frequency, you will get a phase-shifted wave at that frequency; the magnitude of this wave is sqrt(x*x + y*y), equal to the magnitude of the complex coefficient.

The Discrete Cosine Transform (DCT) is a relative of the Fourier transform which yields all real coefficients. A two-dimensional DCT is used by many image/video compression algorithms.

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  1. The discrete Fourier transform is fundamentally a transformation from a vector of complex numbers in the "time domain" to a vector of complex numbers in the "frequency domain" (I use quotes because if you apply the right scaling factors, the DFT is its own inverse). If your inputs are real, then you can perform two DFTs at once: Take the input vectors x and y and calculate F(x + i y). I forget how you separate the DFT afterwards, but I suspect it's something about symmetry and complex conjugates.

  2. The discrete cosine transform sort-of lets you represent the "frequency domain" with the reals, and is common in lossy compression algorithms (JPEG, MP3). The surprising thing (to me) is that it works even though it appears to discard phase information, but this also seems to make it less useful for most signal processing purposes (I'm not aware of an easy way to do convolution/correlation with a DCT).

I've probably gotten some details wrong ;)

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I think by definition a Fourier transformation is a complex conjugate, so the result will always be expressed with a real and imaginary part.

Also, FFT is actually DTFT

http://en.wikipedia.org/wiki/Discrete-time_Fourier_transform

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