Mixing (mathematics)

In mathematics and signal processing, the advanced Z-transform is an extension of the Z-transform, to incorporate ideal delays that are not multiples of the sampling time. It takes the form

F (z, m) = \sum_{k = 0}^{\infty} f (k T + m) z^{- k}

where

It is also known as the modified Z-transform.

The advanced Z-transform is widely applied, for example to accurately model processing delays in digital control.

Properties

If the delay parameter, m, is considered fixed then all the properties of the Z-transform hold for the advanced Z-transform.

𝒵 {\sum_{k = 1}^{n} c_{k} f_{k} (t)} = \sum_{k = 1}^{n} c_{k} F (z, m) .

𝒵 {u (t - n T) f (t - n T)} = z^{- n} F (z, m) .

𝒵 {f (t) e^{- a t}} = e^{- a m} F (e^{a T} z, m) .

𝒵 {t^{y} f (t)} = {(- T z \frac{d}{d z} + m)}^{y} F (z, m) .

\lim_{k \to \infty} f (k T + m) = \lim_{z \to 1} (1 - z^{- 1}) F (z, m) .

Consider the following example where $f (t) = \cos (ω t)$

\begin{aligned} F (z, m) = & 𝒵 {\cos (ω (k T + m))} \\ = & 𝒵 {\cos (ω k T) \cos (ω m) - \sin (ω k T) \sin (ω m)} \\ = & \cos (ω m) 𝒵 {\cos (ω k T)} - \sin (ω m) 𝒵 {\sin (ω k T)} \\ = & \cos (ω m) \frac{z (z - \cos (ω T))}{z^{2} - 2 z \cos (ω T) + 1} - \sin (ω m) \frac{z \sin (ω T)}{z^{2} - 2 z \cos (ω T) + 1} \\ = & \frac{z^{2} \cos (ω m) - z \cos (ω (T - m))}{z^{2} - 2 z \cos (ω T) + 1} \end{aligned}

.

F (z, 0) = \frac{z^{2} - z \cos (ω T)}{z^{2} - 2 z \cos (ω T) + 1}

which is clearly just the Z-transform of $f (t) .$

Eliahu Ibraham Jury, Theory and Application of the Z-Transform Method, Krieger Pub Co, 1973. ISBN 0-88275-122-0.