Imaginary axis zeros (including zeros at ∞), Imaginary axis zeros (including zeros at – National Instruments NI MATRIXx Xmath User Manual

Chapter 3

Multiplicative Error Reduction

Xmath Model Reduction Module

3-10

ni.com

which also can be relevant in finding a reduced order model of a plant.
The procedure requires G again to be nonsingular at

ω = ∞, and to have no

j

ω-axis poles. It is as follows:

1.

Form H = G

–1

. If G is described by state-variable matrices A, B, C, D,

then H is described by A – BD

–1

C, BD

–1

, –D

–1

C, D

–1

. H is square,

stable, and of full rank on the j

ω-axis.

2.

Form H

r

of the desired order to minimize approximately:

3.

Set G

r

= H

–1

r

.

Observe that

The reduced order G

r

will have the same poles in Re[s] > 0 as G, and

be minimum phase.

Imaginary Axis Zeros (Including Zeros at

∞

)

We shall now explain how to handle the reduction of G(s) which has a rank
drop at s =

∞ or on the jω-axis. The key is to use a bilinear transformation,

[Saf87]. Consider the bilinear map defined by

where 0 < a < b

–1

and mapping G(s) into

through:

H

1

–

H H

r

–

(

)

∞

H

1

–

H H

r

–

(

)

I H

1

–

H

r

–

=

I GG

r

1

–

–

=

G

r

G

–

(

)G

r

1

–

=

s

z a

–

bz

–

1

+

-------------------

=

z

s a

+

bs 1

+

---------------

=

G˜ s

( )

G˜ s

( )

G

s a

–

bs

–

1

+

-------------------

⎝

⎠

⎛

⎞

=

G s

( )

G˜

s a

+

bs 1

+

---------------

⎝

⎠

⎛

⎞

=