Advanced z-transform

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

${\displaystyle F(z,m)=\sum _{k=0}^{\infty }f(kT+m)z^{-k}}$

where

• T is the sampling period
• m (the "delay parameter") is a fraction of the sampling period ${\displaystyle [0,T).}$

It is also known as the modified Z-transform.

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

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

${\displaystyle Z\left[\sum _{k=1}^{m}c_{k}f_{k}(t)\right]=\sum _{k=1}^{m}c_{k}F(z,m).}$

${\displaystyle Z\left[u(t-nT)f(t-nT)\right]=z^{-n}F(z,m).}$

${\displaystyle Z\left[f(t)e^{-a\,t}\right]=e^{-a\,m}F(e^{a\,T}z,m).}$

${\displaystyle Z\left[t^{y}f(t)\right]=\left(-Tz{\frac {d}{dz}}+m\right)^{y}F(z,m).}$

${\displaystyle \lim _{k=\infty }f(kT+m)=\lim _{z=1}(1-z^{-1})F(z,m).}$

Consider the following example where ${\displaystyle f(t)=\cos(\omega t)}$

${\displaystyle F(z,m)=Z\left[\cos \left(\omega \left(kT+m\right)\right)\right]}$

${\displaystyle F(z,m)=Z\left[\cos(\omega kT)\cos(\omega m)-\sin(\omega kT)\sin(\omega m)\right]}$

${\displaystyle F(z,m)=\cos(\omega m)Z\left[\cos(\omega kT)\right]-\sin(\omega m)Z\left[\sin(\omega kT)\right]}$

${\displaystyle F(z,m)=\cos(\omega m){\frac {z\left(z-\cos(\omega T)\right)}{z^{2}-2z\cos(\omega T)+1}}-\sin(\omega m){\frac {z\sin(\omega T)}{z^{2}-2z\cos(\omega T)+1}}}$

${\displaystyle F(z,m)={\frac {z^{2}\cos(\omega m)-z\cos(\omega (T-m))}{z^{2}-2z\cos(\omega T)+1}}.}$

If ${\displaystyle m=0}$ then ${\displaystyle F(z,m)}$ reduces to the Z-transform

${\displaystyle F(z,m)={\frac {z^{2}-z\cos(\omega T)}{z^{2}-2z\cos(\omega T)+1}}}$

which is clearly just the Z-transform of ${\displaystyle f(t).}$

• Z-transform

wiki

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