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How can I add a harmonic of the input signal ?

  • without making frequency estimations ( frequency is provided )
  • by making frequency estimations

input : vectorized form of signal output : same format as input

NOTE : If you know answer, can you give me algorithm or link which will help me to solve this problem.

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That's not a question about programmation. More like theory of the signal. – Vincent Apr 8 '12 at 7:01
Candidate moving to for ? – MPD Apr 12 '12 at 13:32
up vote 1 down vote accepted

If the frequency is known, then you can presumably add a harmonic just by adding a sine wave of the appropriate frequency (i.e. double the known frequency) to the signal. Something like:

result = signal .* sin((0:(1/sample_rate):length_of_signal) * freq));

When the frequency is unknown you could use an FFT (@L7ColWinters linked to the docs for that) to find the frequencies. Since you can convert a signal from the frequency domain back to the time domain (ifft for the inverse), it might be easier to do the FFT, add the harmonic and then do an inverse FFT, or once you know the frequency from the FFT you could add the sine wave to the original input as in the first case.

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  • Suppose your input is the time domain signal with amplitude array A with interval [0, t0]. Then loop over i with

    A[i] = A[i] + A0 * sin (2 pi f dt)

where dt is the time difference between each array element, i.e. dt = N/t0.

  • If you do the Fourier transform first, you just need to add the A0 at the location corresponding to frequency f, and then do inverse Fourier transform, following link by @L7ColWinters
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If you look through the trig identities, you will see that

cos(2x) = 2 * (cos(x))^2 -1

Since the first harmonic is double the fundamental frequency, you can simply square your input, scale as needed and remove DC offset. Frequency doen't need to be known or estimated.

Keep in mind that Nyquist still applies, so you may have to low-pass your input to prevent aliasing.

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