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Fourier transform as additive synthesis

Now consider an arbitrary signal $X[n]$ that repeats every $N$ samples. (Previously we had assumed that $X[n]$ could be obtained as a sum of sinusoids, and we haven't yet found out whether every periodic $X[n]$ can be obtained that way.) Let $Y[k]$ denote the Fourier transform of $X$ for $k = 0, ..., N-1$:

\begin{displaymath}
Y[k] = {\cal FT}\left \{ X[n] \right \} (k)
\end{displaymath}


\begin{displaymath}
= {{\left [ {U^{-k}} \right ]} ^ {0}} X[0] +
{{\left [ {U^...
...X[1] +
\cdots +
{{\left [ {U^{-k}} \right ]} ^ {N-1}} X[N-1]
\end{displaymath}


\begin{displaymath}
= {{\left [ {U^{0}} \right ]} ^ {k}} X[0] +
{{\left [ {U^{...
...1] +
\cdots +
{{\left [ {U^{-(N-1)}} \right ]} ^ {k}} X[N-1]
\end{displaymath}

In the second version we rearranged the exponents to show that $Y[k]$ is a sum of complex sinusoids, with complex amplitudes $X[m]$ and frequencies $-m\omega$ for $m = 0, \ldots, N-1$. In other words, $Y[k]$ can be considered as a Fourier series in its own right, whose $m$th component has strength $X[-m]$. (The expression $X[-m]$ makes sense because $X$ is a periodic signal). We can also express the amplitude of the partials of $Y[k]$ in terms of its own Fourier transform. Equating the two gives:

\begin{displaymath}
{1 \over N} {\cal FT} \left \{ Y[k] \right \} (m) = X[-m]
\end{displaymath}

This means in turn that $X[-m]$ can be obtained by summing sinusoids with amplitudes $Y[k]/N$. Setting $n = -m$ gives:

\begin{displaymath}
X[n] = {1 \over N} {\cal FT} \left \{ Y[k] \right \} (-n)
\end{displaymath}


\begin{displaymath}
= {{\left [ {U^{0}} \right ]} ^ {n}} Y[0] +
{{\left [ {U^{...
...Y[1] +
\cdots +
{{\left [ {U^{N-1}} \right ]} ^ {n}} Y[N-1]
\end{displaymath}

This shows that any periodic $X[n]$ can indeed be obtained as a sum of sinusoids. Further, the formula explicitly shows how to reconstruct $X[n]$ from its Fourier transform $Y[k]$, if we know its value for the integers $k=0,
\ldots, N-1$.


next up previous contents index
Next: Properties of Fourier transforms Up: Fourier analysis of periodic Previous: Periodicity of the Fourier   Contents   Index
Miller Puckette 2006-12-30