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Elementary recirculating filter

The simplest recirculating filter is the recirculating comb filter of Figure 7.7 with a complex-valued feedback gain $P$ as shown in Figure 8.11, part (a). By the same analysis as before, feeding this network a sinusoid whose $n$th sample is $Z^n$ gives an output of:

\begin{displaymath}
{{1} \over {1 - P {Z^{-1}}}} {Z^n}
\end{displaymath}

so the transfer function is

\begin{displaymath}
H(Z) = {{1} \over {1 - P {Z^{-1}}}}
\end{displaymath}

The recirculating filter is stable when $\vert P\vert < 1$; when, instead, $\vert P\vert> 1$ the output grows exponentially as the delayed sample recirculates.

Figure 8.11: The elementary recirculating filter: (a) block diagram; (b) frequency response.
\begin{figure}\psfig{file=figs/fig08.11.ps}\end{figure}

The transfer function is thus just the inverse of that of the non-recirculating filter (first form). If you put the two in series, using the same value of $P$, the output would theoretically be exactly equal to the input. (This analysis only demonstrated that for sinusoidal inputs; that it follows for other signals as well won't be evident until we have the background developed in chapter 9.)


next up previous contents index
Next: Compound filters Up: Designing filters Previous: Non-recirculating filter, second form   Contents   Index
Miller Puckette 2006-03-03