Multivariable Zeros using Generalised Eigenvalue Problem

26 Jul. 2022
1 Respuesta
Actualizado a las 27 Jul. 2022
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So I have the following matrices which represent a state-space configuration:
A = [-3 5 -7 0; 0.5 -1.5 0.5 -7.5; -5 0 -3 0; -0.5 -5 0 -7];
B = [1 0; 0 -1; -2 0; 0 1];
C = [1 0 0 0; 0 -1 0 0];
D = [-1 0; 2 0];
As mentioned in the question, I need to find the multivariable zeros of the above system using generalised eigenvalue problem.
I understand that ideally, generealised Eigenvalues can be obtained from
[V,D] = eig(A,B)
However, if I try to input my matrices in this code, it does not run for the obvious reasons. I tried doing
[V,D] = eig(A,A)
and it works, but I am not sure if that is the right way. Even so, I am unable to figure out how I can calculate zeros from the V and D matrices.
Can anyone please suggest me how I can approach this problem at hand?

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Torsten
Torsten el 26 de Jul. de 2022
Editada: Torsten el 26 de Jul. de 2022
I don't know what you mean by "multivariable zeros".
Akshay Vivek Panchwagh
Akshay Vivek Panchwagh el 26 de Jul. de 2022
It refers to poles and zeros of MIMO systems.

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Respuestas (1)

Paul
Paul el 26 de Jul. de 2022

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Is tzero what you're looking for?

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Akshay Vivek Panchwagh
Akshay Vivek Panchwagh el 27 de Jul. de 2022
In a way, yes. But doesn't tzero return invariant zeros of a MIMO system? I believe I need to obtain transmission zeros.
Paul
Paul el 27 de Jul. de 2022
If using the definitions on the doc page tzero, the invariant zeros are the same as the transmission zeros when the realization is minimal. minreal to find the minimal realization, and then tzero() on the result. At least I think that's how it's supposed to work.
Akshay Vivek Panchwagh
Akshay Vivek Panchwagh el 27 de Jul. de 2022
The system I have is already in a minimal realisation. So, I believe the zeros I'll get by using tzero are indeed the transmission zeros. The task further mentions about simulating the system response but I think thats another question in itself. Thank you nevertheless.

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Preguntada:

Akshay Vivek Panchwagh
Akshay Vivek Panchwagh
el 26 de Jul. de 2022

Comentada:

Akshay Vivek Panchwagh
Akshay Vivek Panchwagh
el 27 de Jul. de 2022

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