Synthetic parametric model

Introduction

On this page you will find a purely synthetic parametric model. The goal is to have a simple parametric model which one can use to experiment with different system orders, parameter values etc.

System description

The parameter $ε$ scales the real part of the system poles, that is, $p_{i} = ε a_{i} + j b_{i}$ . For a system in pole-residue form

$H (s) = \sum_{i = 1}^{n} \frac{r_{i}}{s - p_{i}} = \sum_{i = 1}^{n} \frac{r_{i}}{s - (ε a_{i} + j b_{i})},$

we can then write down the state-space realisation

$\hat{A} = ε [\begin{array}{ccc} a_{1} \\ ⋱ \\ a_{n} \end{array}] + [\begin{array}{ccc} j b_{1} \\ ⋱ \\ j b_{n} \end{array}] = ε {\hat{A}}_{ε} + {\hat{A}}_{0},$

$\hat{B} = [1, \dots, 1]^{T}, \hat{C} = [r_{1}, \dots, r_{n}], D = 0 .$

Notice that the system matrices have complex entries.

For simplicity, assume that $n$ is even, $n = 2 k$ , and that all system poles are complex and ordered in complex conjugate pairs, i.e.

$p_{1} = ε a_{1} + j b_{1}, p_{2} = ε a_{1} - j b_{1}, \dots, p_{n - 1} = ε a_{k} + j b_{k}, p_{n} = ε a_{k} - j b_{k},$

which also implies that the residues form complex conjugate pairs $r_{1}, {\bar{r}}_{1}, \dots, r_{k}, {\bar{r}}_{k} .$

Then a realization with matrices having real entries is given by

$A = T \hat{A} T^{*}, B = T \hat{B}, C = \hat{C} T^{*}, D = 0,$

with $T = [\begin{array}{ccc} T_{0} \\ ⋱ \\ T_{0} \end{array}]$ , for $T_{0} = \frac{1}{\sqrt{2}} [\begin{array}{cc} 1 & - j \\ 1 & j \end{array}]$ .

Numerical values

The numerical values for the different variables are

$r_{i}$ equally spaced in $[1 0^{- 3}, 1]$ , with $r_{1} = 1$ and $r_{k} = 1 0^{- 3}$ .

$a_{i}$ equally spaced in $[1 0^{- 1}, 1 0^{3}]$ ,

$b_{i}$ equally spaced in $[10, 1 0^{3}]$ ,

$ε \in [1, 20]$ .

In MATLAB this is easily done as follows test