656 C H A P T E R 11: Introduction to the Design of Discrete Filters
FIGURE 11.10
Bilinear transformation mapping ofs-plane into
z-plane.ABB'σjΩ
s-planeCD B A
B'Cz-planeDIn general, by lettingK=T^2 s,z=rejωands=σ+jin Equation (11.21), we obtainr=√
( 1 +σ/K)^2 +(/K)^2
( 1 −σ/K)^2 +(/K)^2ω=tan−^1(
/K
1 +σ/K)
+tan−^1(
/K
1 −σ/K)
(11.23)
From this we have that:n In thejaxis of thes-plane (i.e., whenσ=0 and−∞< <∞), we obtainr=1 and−π≤
ω < π, which correspond to the unit circle of thez-plane.
n On the open left-hands-plane, or equivalently whenσ <0 and−∞< <∞, we obtainr< 1
and−π≤ω < π, or the inside of the unit circle in thez-plane.
n Finally, on the open right-hands-plane, or equivalently whenσ >0 and−∞< <∞, we
obtainr>1 and−π≤ω < π, or the outside of the unit circle in thez-plane.The above transformation can be visualized by thinking of a giant who puts a nail in the origin of the
s-plane and then grabs the plus and minus infinity extremes of thejaxis and pulls them together
to make them agree into one point, getting a magnificent circle, keeping everything in the left plane
inside, and keeping out the rest. If our giant lets go, we get back the originals-plane!
RemarksThe bilinear transformation maps the whole s-plane into the whole z-plane, differently from the
transformation z=esTsthat only maps a slab of the s-plane into the z-plane (see Chapter 9 on the Z-
transform). Thus, a stable analog filter with poles in the open left-hand s-plane will generate a discrete filter
that is also stable as it has poles inside the unit circle.Frequency Warping
A minor drawback of the bilinear transformation is the nonlinear relation between the analog and the
discrete frequencies. Such a relation creates a warping that needs to be taken care of when specifying
the analog filter using the discrete filter specifications.The analog frequencyand the discrete frequencyωaccording to the bilinear transformation are related by=Ktan(ω/ 2 ) (11.24)