The development of the DFT: Difference between revisions

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How do we put it into computer?
How do we put it into computer?


We can use A/D converter and a low pass filter to sample the signal that is wanted instead of from <math>t = -\infty to \infty</math>:
We can use A/D converter and a low pass filter to sample the signal that is wanted instead of from <math>t = -\infty\,\, to\,\, \infty</math>:


[[Image:DFT2.jpg|1000px]]
[[Image:DFT2.jpg|1000px]]
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So <math>\sum_{m=0}^{N-1}X(m)\, e^{j2\pi\frac{lm}{N}}=\sum_{n=0}^{N-1}x(n)N\delta_{n,l}=Nx(l)</math>
So <math>\sum_{m=0}^{N-1}X(m)\, e^{j2\pi\frac{lm}{N}}=\sum_{n=0}^{N-1}x(n)N\delta_{n,l}=Nx(l)</math>


<math>x(l) = \frac{1}{N}\sum_{m=0}^{N-1}X(m)\, e^{j2\pi\frac{lm}{N}}\equiv\, IDFT(X(n)) </math>
<math>x(l) = \frac{1}{N}\sum_{m=0}^{N-1}X(m)\, e^{j2\pi\frac{lm}{N}}\equiv\, IDFT(X(m)) </math>


Key points to note:
Key points to note:

Latest revision as of 16:19, 30 November 2008

If we have a signal, such as following:

DFT1.jpg

How do we put it into computer?

We can use A/D converter and a low pass filter to sample the signal that is wanted instead of from :

DFT2.jpg

But then we have to make it periodic, so we convolve it with impulse function with NT apart to have impulse function in both time and frequency domain:

DFT3.jpg

From the equations of final signal in both time and frequency domain, we can see that in the computer we have x(n) and in the frequency domain:

Then the areas of the impulse functions is:

Which is the definition of the .

Property of the DFT

  • DFT is periodic.

Proof:

Inverse DFT

Let's try to get back x(l) if we have X(m)

Let's try do some trick to this DFT, let's sum it up and with exponents tag along.

Note: will be N if .

Let then

So we know the sum of

Therefore, we can divide r at both side of equation and get

Think about this, if , since for any integer of l and n.

So

Key points to note:

  • By doing the DFT, we make the signal periodic in both time domain and frequency domain.

  • corresponds to

Approximation of Fourier integral

We can kind of see the DFT as an approximation to the Fourier integral.