National Instruments 370760B-01 Manual

A SERVICE OF

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106 CHAPTER 3. FUNCTIONAL DESCRIPTION OF Xµ

Bounds on the H

∞

norm are returned as out. An estimate of the frequency where the

norm is achieved is returned as omega. Further control of the iteration is available via

keywords.

The following example calculates the H

2

and H

∞

norms of each of the closed loop

systems arising from the previous example. Notice that G2 has the minimum

H

2

norm and Ginf has the minimum H

∞

norm. We can also see that the Ginf has a

slightly lower norm than the bound guaranteed from the hinfsyn function call.

# Calculate the norms of each closed loop system.

Ginf = starp(p,Kinf)

G2 = starp(p,K2)

hinfnorm(Ginf)?

ans (a column vector) =

1.17032

1.16915

hinfnorm(G2)?

ans (a column vector) =

36.2138

36.1776

h2norm(Ginf)?

ans (a scalar) = 2.86197

h2norm(G2)?

ans (a scalar) = 2.78655