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Designing filters

We saw in chapter 7 how to predict the frequency and phase response of delay networks. The art of filter design lies in finding a delay network whose transfer function (which controls the frequency and phase response) has a desired shape. We will devalop an approach to designing such delay networks by using the two types of comb filters developed in chapter 7: recirculating and non-recirculating. Here we will be interested in the special case where the delay is only one sample in length. In this situation, the frequency responses shown in Figures 7.6 and 7.10 no longer look like combs; the second peak recedes all the way to the sample rate, $2\pi $ radians, when $d=1$. Since only frequencies between 0 and the Nyquist frequency ($\pi $ radians) are audible, in effect there is only one peak when $d=1$.

In the comb filters shown in Chapter 7, the peaks are situated at DC (zero frequency), and we will now want to be able to place them at other, nonzero frequencies. We will be able to do this by using delay networks--comb filters--with complex-valued gains.



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next up previous contents index
Next: Elementary non-recirculating filter Up: Filters Previous: Equalizing filters   Contents   Index
Miller Puckette 2006-03-03