Digitizing Elementary Reflectances by Bilinear Transform

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Physical Audio Signal Processing

A Physical Derivation of Wave Digital Elements

Choosing Impedance to Simplify Element Reflectance

Summary of Wave Digital Elements

The wave impedance in a propagation medium is the force variable (such as pressure for acoustic waves) divided by the velocity variable. In ideal plane waves and traveling waves, the wave impedance is a real, positive number. For spherical waves in air, the wave impedance is different at each frequency. — Click for https://ccrma.stanford.edu/~jos/OnePorts/Impedance.html

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Wave Digital Filters (WDF) digitize analog circuits element-by-element using the bilinear transform and virtual traveling waves. — Click for https://ccrma.stanford.edu/~jos/pasp/Wave_Digital_Filters.html

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Physical Audio Signal Processing

A Physical Derivation of Wave Digital Elements

Choosing Impedance to Simplify Element Reflectance

Summary of Wave Digital Elements

Digitizing Elementary Reflectances by Bilinear Transform

Going to discrete time via the bilinear transform means making the substitution

$\displaystyle s = c \frac{1-z^{-1}}{1+z^{-1}}$

(F.8)

where

is an arbitrary real constant, usually taken to be

Solving for $z^{-1}$ gives us the inverse bilinear transform:

$\displaystyle z^{-1}= \frac{1-s/c}{1+s/c} \protect$

(F.9)

In this case, we see that setting further simplifies our universal reflectances in the digital domain:

For the ``wave digital capacitor'' (or spring), Eq.(F.5) becomes

$\displaystyle \fbox{$\displaystyle \hat{\rho}_C\left(\frac{z-1}{z+1}\right) = z^{-1}$}$
For the ``wave digital inductor'' (or mass), Eq.(F.6) becomes

$\displaystyle \fbox{$\displaystyle \hat{\rho}_L\left(\frac{z-1}{z+1}\right) = - z^{-1}$}$
And for the ``wave digital resistor'' (or dashpot), Eq.(F.7) becomes

$\displaystyle \fbox{$\displaystyle \hat{\rho}_R\left(\frac{z-1}{z+1}\right) = 0$}$

as before in the continuous-time case.

Note that this choice of is also the only one that eliminates delay-free paths in the fundamental elements. This allows them to be used as building blocks for explicit finite difference schemes.

We may still obtain the above results using the more typical value (instead of ) in the bilinear transform. From Eq.(F.9), it is clear that changing amounts to a linear frequency scaling of $s=j\omega$ . Such a scaling may be compensated by choosing the waveguide (port) impedances to be (instead of ) for the inductor, and (instead of ) for the capacitor.

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``Physical Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2010, ISBN 978-0-9745607-2-4
Copyright © 2024-06-28 by Julius O. Smith III
Center for Computer Research in Music and Acoustics (CCRMA), Stanford University

Digitizing Elementary Reflectances by Bilinear Transform

``Physical Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2010, ISBN 978-0-9745607-2-4 Copyright © 2024-06-28 by Julius O. Smith III Center for Computer Research in Music and Acoustics (CCRMA), Stanford University

``Physical Audio Signal Processing'', by Julius O. Smith III, W3K Publishing, 2010, ISBN 978-0-9745607-2-4
Copyright © 2024-06-28 by Julius O. Smith III
Center for Computer Research in Music and Acoustics (CCRMA), Stanford University