Warning: The model order was increased to handle real negative poles.

10 Ansichten (letzte 30 Tage)
Vladut Gabriel Escariu
Vladut Gabriel Escariu am 6 Jan. 2021
Beantwortet: Sarvani Panguluri am 15 Jan. 2021
Hi!
Why order of continuous transfer function increase when I apply 'zoh' to a discrete transfer function?
I know it writes that the reason is to handle the real negative poles, but that does not clarify me.
Te = 4.5e-4;
Hd_w_arx =
-2.145 z + 4.224
------------------------
z^2 - 0.9742 z - 0.01883
Hc_w_arx = d2c(Hd_w_arx,'zoh')
Hc_w_arx =
-3.183e04 s^2 - 4.419e08 s + 5.749e11
------------------------------------------
s^3 + 1.764e04 s^2 + 1.267e08 s + 1.919e09

Melden Sie sich an, um diese Frage zu beantworten.

Antworten (1)

Sarvani Panguluri
Sarvani Panguluri am 15 Jan. 2021
Hi,
As the documentation mentions, For discrete-time LTI models having negative real poles, ZOH d2c conversion produces a continuous system with higher order.
A negative real pole in the z domain maps to a pure imaginary value in the s domain. Such mapping results in a continuous-time model with complex data. So to avoid this issue, the interpolation algorithm maps the real negative pole in the z domain to pair of complex conjugate poles in the s domain thereby increasing the order.
For more detailed information, you can go through the References.
Hope this helps!

Kategorien

Mehr zu Dynamic System Models finden Sie in Help Center und File Exchange

Tags

Produkte

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by