H
∞
CONTROL THEORY ON THE INFINITE DIMENSIONAL
SPACE
Chuan-Gan Hu
School of Mathematical Sciences, Nankai University
94 Weijin Rd., Tianjin 300071, China
Keywords:
Infinite dimensional algebra, Vector modulus, Vector norm, Control theory.
Abstract:
In this paper, the V H
∞
control theory on an infinite dimensional algebra to itself is presented. In order to
establish the V H
∞
control theory, the concept and the properties of a meromorphic mapping and the theory
of V H
∞
spaces on an infinite dimensional algebra to itself are founded.
1 INTRODUCTION
The theory of H
p
-spaces and the H
∞
control theory
on finite dimensional spaces have been summarized
by C. G. Hu and C. C. Yang (Hu and Yang, 1992), and
B. A. Francis and J. C. Doyle ((Francis, 1987), (Fran-
cis and Doyle, 1987)) respectively. In 1993, B. V.
Keulen extended the H
∞
control theory on finite di-
mensional spaces to range in the infinite dimensional
Hilbert space (Keulen, 1993). In 2002, C. G. Hu and
L. X. Ma extended the result of Keulen to the locally
convex space containing the Hilbert space (Hu and
Ma, 2002). In this article, the V H
∞
control theory on
an infinite dimensional algebra to itself is presented in
Section 4. For this aim, the meromorphic mapping (in
Section 2) and the theory of V H
p
spaces on an infi-
nite dimensional algebra without appearance in books
((Dineen, 1981) and (Mujica, 1986)) respectively, are
given (in Section 3). The V H
∞
control theory can
enlarge the scope of solutions in the control theory.
So the research on these problems can develop and
complete the control theory.
2 MEROMORPHIC MAPPINGS
Let S be the sequence space of all complex vari-
ables. Here z = (z
1
, z
2
,. . . , z
j
, . . .) ∈ S and z
j
is in the complex plane C
j
for any j. If z =
(z
1
,z
2
, . . . ,z
j
, . . .) ∈ S, then the quasinorm over S
is defined by
|||z||| =
∞
X
j=1
µ
2
3
¶
j
|z
j
|
1 + |z
j
|
.
The multiplication of z and w in S can be defined
by
zw = (z
1
w
1
, z
2
w
2
, . . . , z
j
w
j
, . . .).
From the definition of the multiplication we may
derive
|||zw||| ≤ |||z||||||w|||, z
k
= (z
k
1
, . . . , z
k
j
, . . .)
for any k > 0. Thus S is a Fr´echet algebra.
Assume for simplicity, that L =
Q
∞
j=1
L
j
is a
manifold over S, where each L
j
⊂ C
j
is a simple
path, and that f(t) = (f
1
(t), . . . , f
j
(t), . . .) : L → S,
where t is over L and t = (t
1
, t
2
, . . . , t
j
,
. . .) ∈ S. Let D
s
=
Q
∞
j=1
D
sj
be a domain over S,
where D
sj
is a domain over C
j
.
Theorem 2.1. A mapping f : D
s
→ S is holomor-
phic if and only if f can be denoted by
f(z) = (f
1
(z
1
), f
2
(z
2
), . . . , f
j
(z
j
), . . .) ∈ S,
where z = (z
1
, z
2
, . . . , z
j
, . . .) ∈ S and
f
j
(z
j
) : C
j
→ C
j
is a holomorphic function.
Proof. If f is a holomorphic mapping in D
s
, then for
any z
0
= (z
01
, z
02
, . . . , z
0j
, . . .) ∈ D
s
, there exists a
358
Hu C. (2004).
H ∞ CONTROL THEORY ON THE INFINITE DIMENSIONAL SPACE.
In Proceedings of the First International Conference on Informatics in Control, Automation and Robotics, pages 358-366
DOI: 10.5220/0001125103580366
Copyright
c
SciTePress
neighborhood U(z
0
) ⊂ D
s
such that
f(z) =
P
∞
k=0
α(k)(z − z
0
)
k
=
P
∞
k=0
(α
k1
, α
k2
, . . . , α
kj
, . . .)
((z
1
− z
01
)
k
, . . . , (z
j
− z
0j
)
k
, . . .)
¢
=
¡
P
∞
k=0
α
k1
(z
1
− z
01
)
k
, . . . ,
P
∞
k=0
α
kj
(z
j
− z
0j
)
j
, . . .
¢
=
¡
f
01
(z
1
− z
01
), f
02
(z
2
− z
02
), . . . ,
f
0j
(z
j
− z
0j
), . . .
¢
,
for z ∈ U(z
0
), where α(k) = (α
k1
, α
k2
, . . . , α
kj
,
. . .) ∈ S and
f
0j
(z
j
− z
0j
) =
∞
X
k=0
α
kj
(z
j
− z
0j
)
k
.
Analytic continuation and the Uniqueness Theorem
of holomorphic mappings in complex analysis yield
that f(z) can be written as
f(z) =
¡
f
1
(z
1
), f
2
(z
2
), . . . , f
j
(z
j
), . . .
¢
∈ S.
This is just required conclusion.
Conversely, because the above each step is invert-
ible, f is holomorphic in D
s
.
This proof is ended.
A meromorphic mapping on S without appearance
in books ((Dineen, 1981) and (Mujica, 1986)) respec-
tively, may be defined as follows:
Definition 2.1. A mapping f on S is called meromor-
phic if its each component f
j
(z
j
) is a meromorphic
mapping of z
j
over C
j
for each j.
Remark. Using the similar method to Definition 2.1
we may define a meromorphic mapping on a domain
D
s
=
Q
∞
j=1
D
sj
, where D
sj
in C
j
is a domain.
Let
n
z(k)
(0)
o
∞
k=1
=
n
(z
(0)
k1
, . . . , z
(0)
kj
, . . .)
o
∞
k=1
(2.1)
be an increasing sequence with distinct complex
elements tending to the infinity ∞ = (∞, . . . , ∞,
. . .) in the sense of the quasinorm. From the above
definition for convenience sake, without loss gener-
ality we may assume that every f
j
is a meromorphic
function of z
j
which can be written for any j as
∞
X
k=1
∞
X
ı
k%j
= −m
kj
α
k%j
(z
j
− z
(0)
kj
)
ı
k%j
,
where −∞ < −m = inf{ı
k%j
: k, %, j = 1, 2, . . .}
< 0 and the following conditions are satisfied:
(α){z
(0)
kj
} for any k, j has no any finite limit point;
(β)−∞ < inf{−m
kj
}.
Under the preceding conditions z(k)
(0)
is ca-
lled a pole of f.
On a meromorphic mapping f(z) on S there is the
following conclusion.
Theorem 2.2. Let
©
z(k)
(0)
ª
∞
k=1
satisfy (α)–(β), and
let
n
~
(k)
(z − z(k)
(0)
)
o
∞
k=1
=
n
(h
k1
(z
1
− z
(0)
k1
), . . . , h
kj
(z
j
− z
(0)
kj
), . . .)
o
∞
k=1
be a sequence, where
h
kj
(z
j
− z
(0)
kj
) =
−1
X
−m
k
α
k%j
(z
j
− z
(0)
kj
)
ı
k%j
,
and the coefficient of the first term after the equal-
sign in the above formula is not 0. Then there exists a
meromorphic mapping
f(z) =
∞
X
k=1
∞
X
ı
k%
=−m
k
α(k%)(z − z(k)
(0)
)
ı
k%
,
its poles coincide with (2.1), and its principal part at
the pole z(k)
(0)
equals ~
(k)
, for each k = 0, 1, 2, . . .
and α(k%) = (α
k%1
, . . . , α
k%j
, . . .) ∈ S.
Proof. In the proof of Theorem 2.1 we replace the
power series
P
∞
k=0
α
kj
(z
j
− z
0j
)
k
by the Laurent
series
P
∞
−m
k
α
k%j
(z
j
− z
(0)
kj
)
ı
k%j
. And using the
famous Mittag–Leffler’s theorem in complex analysis
for each component we may obtain required result.
This proof is finished.
Next, integrals can be defined on a manifold L in
S as follows.
Definition 2.2. Let L
j
be any closed rectifiable
Jordan curve contained in a simply connected subdo-
main of a domain G
j
in C
j
and L =
Q
∞
j=1
L
j
. Let
D
+
j
be the interior of L
j
and D
+
=
Q
∞
j=1
D
+
j
. Then
D
+
is called the interior of L, and
Z
L
f(z)dz :=
Ã
Z
L
1
f
1
(z
1
)dz
1
, ...,
Z
L
j
f
j
(z
j
)dz
j
, ...
!
in S, where f = (f
1
, ..., f
j
, ...) is defined on S.
H8 CONTROL THEORY ON THE INFINITE DIMENSIONAL SPACE
359
Theorem 2.3. Let f(z) be a single S-valued holo-
morphic mapping on G. Then
(A)(Cauchy’s integral theorem).
Z
L
f(z)dz = 0,
where G =
Q
∞
j=1
G
j
;
(B)(Cauchy’s integral formula).
1
2πi
Z
L
f(t)(t − z)
−1
dz = f(z),
where z ∈ D
+
⊂ G, and (t − z)
−1
exists.
Definition 2.3. A subset X
0
of X is called a base-real
subspace of X and ¯u is called the conjugate element
of u if following conditions hold:
a) X is a vector space on C.
b) X
0
is a vector subspace of X on R.
c) For every u ∈ X, there exists an ¯u(∈ X) such that
u + ¯u ∈ X
0
and i(u − ¯u) ∈ X
0
hold satisfying a
unique decomposition u = ξ + ηi for ξ, η ∈ X
0
.
d) X
0
∩ iX
0
= {0}, where 0 is the zero element.
Theorem 2.4. If X is a complex vector space,
then there exists a base-real subspace X
0
such that
X = X
0
+ iX
0
, i.e. a complex vector space can be
represented by a direct sum of two spaces which are
generated by some real vector space.
Proof. For any x
0
(6= θ) ∈ X, let M
0
= Rx
0
=
{tx
0
: t ∈ R}. Then M
0
is a vector subspace of X on
the restricted number field R, and M
0
∩ iM
0
= {θ}.
Setting CM
0
= {zm
0
: z ∈ C, m
0
∈ M
0
}, we have
that CM
0
is a complex vector subspace of X. For
any x
1
∈ X\CM
0
we know that M
1
= M
0
+ Rx
1
is also a vector subspace on a restricted number field
R of X and M
1
∩ iM
1
= {θ}. By induction we
obtain a sequence {M
n
} of vector subspaces with
M
n
∩ iM
n
= {θ}. Assume that M is the family
of all vector subspaces on R, that M
0
= {M
0
∈ M :
M
0
∩ iM
0
= {θ}} (clearly, M
0
is nonempty), and
that {M
α
}
α∈J
is the family of totally ordered sub-
sets of M
0
, where J is an indexing set. Consequently,
X
M
= ∪
α∈J
M
α
is a vector subspace on R and the
supremum of {M
α
}
α∈J
. Further we have
X
M
∩ iX
M
=
S
α∈J
M
α
∩ i
S
α∈J
M
α
=
S
α∈J
M
α
∩ i
S
β∈J
M
β
=
S
α∈J
S
β∈J
(M
α
∩ iM
β
).
Since {M
α
}
α∈J
is a family of totally ordered
subsets with M
α
∩ iM
α
= {θ} for any α ∈ J
and M
α
∩ iM
β
= {θ} for any α, β ∈ J, we get
X
M
∩ iX
M
= {θ}. Now Zorn’s lemma yields that
M
0
has the maximum element X
0
.
Next we shall show that X
0
is the required
subspace. Firstly, CX
0
= X, here CX
0
is the
smallest complex subspace containing X
0
. In fact,
if CX
0
6= X, then there exists an x ∈ X\CX
0
. It
follows that X
0
0
= X
0
+ Rx is a vector subspace on
R containing X
0
with X
0
0
∩ iX
0
0
= {θ}. This is in
contradiction with the maximality of X
0
. Obviously,
CX
0
= X
0
+ iX
0
. Since X
0
∩ iX
0
= {θ},
X = X
0
+ iX
0
. If u = x + iy ∈ X (here x, y ∈ X
0
),
then ¯u = x − iy is the conjugate element of u, i.e.
X
0
is a base real subspace of X.
This proof is finished.
Suppose that e ∈ S is the idempotent element. The-
orem 5.3.2 (Hille and Phillips, 1957) may be extended
to the Fr´echet algebra S containing the Banach alge-
bra. Then using the result after extending we can get
exp (Log)z = z, exp(z + 2πie) = exp z,
where exp z =
P
∞
j=1
z
j
/j!. If z and e commute, then
exp(z + 2πine) = exp z, for n = 0, ±1, ±2, ....
It follows that
Log[exp z] = z +2πine = z
0
+i(z
00
+2πne), (2.2)
for any integer n and z
0
, z
00
+ 2πne ∈ S
0
, where
S = S
0
+ iS
0
, S
0
is a base-real Fr´echet algebra.
From (2.2) we can define the argument of exp z be-
ing z
00
+ 2πine. Because
exp z
0
z
00
= (exp z
0
1
z
00
1
, ..., exp z
0
j
z
00
j
, ...),
Logz = (log |z
1
|, ..., log |z
j
|, ...)
+i(Argz
1
, ..., Argz
j
, ...).
It follows that the argument Argz of z may be defined
by
(Argz
1
, ..., Argz
j
, ...). (2.3)
3 THE V H
∞
SPACES
Let |f (z)| = (|f
1
(z
1
)|, . . . , |f
j
(z
j
)|, . . .) be the vec-
tor modulus of f and kfk = (kf
1
k, . . . , kf
j
k,
. . .) the vector norm of f. For any a, b ∈ S, a ≤ (<
)b is a
j
≤ (<)b
j
for each j. Let C
+
j
= {z ∈ C
j
:
<z > 0} and S
+
=
Q
∞
j=1
C
+
j
. The set V H
p
(S
+
)
consists of all holomorphic mappings f : S
+
→ S
satisfying
ICINCO 2004 - INTELLIGENT CONTROL SYSTEMS AND OPTIMIZATION
360
sup
<z>0
½
Z
I
|f(x + iy)|
p
dy
¾
1
p
(= kfk
p
) < ∞,
where I =
Q
∞
j=1
{(−∞, ∞)}, z = x + iy ∈ S
+
,
and 0 < p < ∞. The set V H
∞
(S
+
) consists of all
holomorphic mappings f : S
+
→ S satisfying
sup
<z>0
{|f(x + iy)|} (= kfk
∞
) < ∞.
Theorem 3.1. It f ∈ V H
p
(S
+
) with 1 ≤ p, then f
is written as
f(z) =
1
π
Z
I
xf(it)[x
2
+ (y − t)
2
]
−1
dt, z ∈ S
+
where f(it) ∈ V L
p
(I).
In order to show Theorem 3.1, the following two
lemmas are required.
Lemma 3.1. If f ∈ V H
p
(S
+
), then there exists a
constant element c such that
|f(z)| ≤ cx
−
1
p
, z = x + iy ∈ S
+
.
Proof. Let L =
Q
∞
j=1
{(0, 2π)} and R=
Q
∞
j=1
{(0, r)}. Let X =
Q
∞
j=1
{(x
j
− r
j
, x
j
+ r
j
)} and
Y =
Q
∞
j=1
{(y
j
− r
j
, y
j
+ r
j
)}. Because |f (z)|
p
is a
subharmonic mapping (Hoffman, 1962),
|f(z)|
p
≤
1
2π
Z
L
|f(z + ρe
iθ
)|
p
dθ, 0 < ρ < x.
Product the two sides of the above formula by ρ and
integrate on R with respect to ρ. It follows that
r
2
2
|f(z)|
p
≤
1
2π
Z
R
Z
L
|f(z + ρ e
iθ
)|
p
ρdθdρ
≤
1
2π
Z
X
Z
Y
|f(ξ + iη)|
p
dηdξ
≤
1
2π
Z
X
mdξ =
mr
π
.
Therefore |f(z)|
p
≤
c
p
r
where c
p
=
2m
π
. Lemma 3.1
is proved as r → x.
Lemma 3.2. If f ∈ V H
p
(S
+
)(p ≥ 1) and h > 0,
then
f(z + h) =
1
π
Z
I
xf(it + h)[x
2
+ (y − t)
2
]
−1
dt,
for z = x + iy.
Proof. Take Γ
R
=
Q
∞
j=1
Γ
Rj
, where Γ
Rj
⊂ C
j
is a closed lune path consisting of the line x
j
=
h
j
(> 0) and the circular arc with the center at the
origin and radius R sufficiently large in the right-
half plane C
+
j
. Let R cos θ
0j
= h
j
. Since exp ix =
(exp ix
1
, . . . , exp ix
j
, . . .), cos θ
0
=
(cos θ
01
, . . . , θ
0j
, . . .). So R cos θ
0
= h ∈ S. From
Cauchy’s integral formula we derive
f(z + h) =
1
2πi
Z
Γ
R
f(ξ)[ξ − (z + h)]
−1
dξ,
where z +h is in the interior of Γ
R
. Because h−
z lies
the exterior of Γ
R
, Cauchy’s integral theorem yields
1
2πi
Z
Γ
R
f(ξ)[ξ − (−
z + h)]
−1
dξ = 0.
It follows that
f(z + h)|
=
1
2πi
Z
Γ
R
f(ξ){[ξ − (z + h)]
−1
−[ξ − (−
z + h)]
−1
}dξ
=
1
πi
Z
Γ
R
xf(ξ)[(ξ − h − iy)
2
− x
2
]
−1
dξ
=
1
π
Z
T
xf(it + h)[x
2
+ (y − t)
2
]
−1
dt
+
1
π
Z
H
xRe
iθ
f(Re
iθ
)
{[Re
iθ
− h − iy]
2
− x
2
}
−1
= I
1
+ I
2
,
where T =
Q
∞
j=1
(−R sin θ
0j
, R sin θ
0j
), and H =
Q
∞
j=1
(−θ
0j
, θ
0j
). Obviously
lim
R→∞
I
1
=
1
π
Z
I
xf(it + h)[x
2
+ (y − t)
2
]
−1
dt.
Next we show lim
R→∞
I
2
= 0.
Lemma 3.1 implies |f (Re
iθ
)| ≤ c(R cos θ)
−
1
p
. It
follows that
¯
¯
xRe
iθ
[(Re
iθ
− h − iy)
2
− x
2
]
−1
¯
¯
= xR|Re
iθ
− h − iy + x|
−1
|Re
iθ
− h − iy − x|
−1
≤ xR|R − h − y − x|
−2
for R sufficiently large. Thus
|I
2
| ≤
1
π
Z
O
c(R cos θ)
−
1
p
xR|R − h − y − x|
−2
dθ,
where O =
Q
{(−
π
2
,
π
2
)}. Because the integral
R
L
(cos θ)
−
1
p
dθ converges and
H8 CONTROL THEORY ON THE INFINITE DIMENSIONAL SPACE
361
lim
R→∞
xR
1−
1
p
(R − h − y − x)
−1
= 0, lim
R→∞
I
2
= 0
if p ≥ 1.
Combining the above, letting R → ∞ we obtain
required conclusion.
Proof of Theorem 3.1 The following two cases are
discussed.
α) p > 1
Since f ∈ V H
p
(S
+
), there is an M > 0 such that
R
I
|f(it + h)|
p
dt ≤ M, where h > 0 is any element
in S. It follows that f(it + h) is weak convergence
to f (it) ∈ V L
p
(I). Lemma 3.2 yields f(z + h) =
1
π
R
I
xf(it + h)[x
2
+ (y − t)
2
]
−1
dt. Setting h → 0 in
the above formula we get the result of Theorem 3.1.
β) p = 1
From Cauchy’s integral theorem we derive
R
I
f(it + h)(it +
z)
−1
dt = 0 for any 0 < h ∈ S. The
mapping f(it + h)dt is weak* convergence to dµ(t),
where dµ(t) is a measure on I
0
=
Q
∞
j=1
{(−i∞, i∞)} satisfying
R
I
|µ(t)| < ∞ if h → 0.
It follows that for any 0 < x ∈ S,
R
I
(it + x −
iy)
−1
dµ(t) = 0. Letting y = 0 in the above for-
mula we get
R
I
(it + x)
−1
dµ(t) = 0. Finding the
Fr´echet derivatives of each order we obtain
R
I
(it +
x)
−n
dµ(t) = 0 for n = 0, 1, . . . . Specially there are
R
I
(it + I)
−n
dµ(t) = 0 for n = 0, 1, . . . as x = I,
where I is the unit element in S. Define a measure
dv(τ) = (it − I)
−1
dµ(t). The conformal mapping
w = (z − I)(z + I)
−1
implies
Z
L
e
inτ
dv(τ)
=
Z
I
(it − I)
n−1
(it + I)
n
dµ(t)
=
Z
I
[(it + I) − 2I]
n−1
(it + 1)
−n
dµ(t)
=
n
X
k=1
·
a
k
Z
I
(it + I)
−k
dµ(t)
¸
= 0.
From Riesz’s theorem (Garnett, 1980) and the
absolute continuity of v(τ) we derive that µ(t) is also
absolutely continuous and f(it) ∈ V L
1
(I) and that
dµ(t) = f (it)dt. Hence Lemma 3.2 yields
f(z) =
1
π
Z
I
xf(it)[x
2
+ (y − t)
2
]
−1
dt.
This proof is finished.
Theorem 3.2. Assume that F (z) ∈ V H
p
(S
+
), and
that f(w) = F (z), then f (w) ∈ V H
p
(D
s
) where
w = (z − I)(z + I)
−1
, D
s
= (D
s1
, . . . , D
sj
,
. . .) and D
sj
is a unit disk in C
j
for each j.
Proof. The following two cases are discussed.
1) p ≥ 1
From Theorem 3.1 we obtain
F (z) =
1
π
Z
I
xF (it)[x
2
+ (y − t)
2
]
−1
dt, z ∈ S
+
,
where F (it) ∈ V L
p
(I). Using F (it) = f(e
it
), we
can get
F (z)
=
1
2π
(1−r
2
)
Z
L
f(e
iτ
)[1+r
2
−2r cos(ϕ−τ)]
−1
dτ.
So
Z
L
|f(e
iτ
)|
p
dτ =
Z
I
2|F (it)|
p
(1 + t
2
)
−1
dt
≤ 2
Z
I
|F (it)|
p
dt < ∞.
Hence f(w) ∈ V H
p
(D
s
).
2) 0 < p < 1.
Lemma 3.1 yields |F (z)| ≤ cx
−
1
p
. Particularly
|F (z)| and |F(z)|
p
are bounded on the half space
Q
∞
j=1
{<z
j
≥ h
j
> 0}, thus |F (z + h)|
p
is a sub-
harmonic mapping on S
+
. It follows that
|F (z +h)|
p
≤
1
π
Z
I
x|F (it+h)|
p
|x
2
+(y−t)
2
|
−1
dt.
Since
R
I
|F (it + h)|
p
dt ≤ m for any h > 0, there is
a measure µ such that
R
I
|dµ(t)| < ∞ and
|F (z)|
p
≤
1
π
Z
I
x|x
2
+ (y − t)
2
|
−1
dµ(t).
Let dν(τ ) = −2(I + t
2
)
−1
dµ(t). Then
|f(re
iϕ
)|
p
≤
1
2π
Z
L
(1 − r
2
)|1 + r
2
− 2r cos(ϕ − τ)|
−1
dν(τ ).
Fubini’s theorem yields
Z
L
|f(re
iϕ
)|
p
dϕ ≤ 2
Z
I
|1 + t
2
|
−1
|dµ(t)| < ∞,
ICINCO 2004 - INTELLIGENT CONTROL SYSTEMS AND OPTIMIZATION
362
so f(w) ∈ V H
p
(D
s
).
Theorem 3.3. If F (z) ∈ V H
p
(S
+
), then F (z)
= F
[i]
(z)F
[o]
(z), where
F
[i]
(z) = e
iγ
B(z) exp
½
1
π
Z
I
$(t, z)dσ(t)
¾
e
iαz
is called the inner mapping of F , $(t, z) =
(itz − I)[(it − z)(I + t
2
)]
−1
, γ ∈ I, B(z) is the
Blaschke product of F, σ(t) is a singular measure,
Z
I
(I + t
2
)
−1
dσ(t) > −∞, α(∈ S) > 0
and the mapping
F
[o]
(z) = exp
½
1
π
Z
I
$(t, z) log |F (it)|dt
¾
is called the outer mapping of F .
Proof. By using the transform w = (z − I)(z + I)
−1
and Theorem 3.2 we obtain f(w)∈ VH
p
(D
s
),
where f(w) = F (z). Theorem 2.2.8 (Hu and Yang,
1992) implies f(w) = f
[i]
f
[o]
, where
f
[i]
(w) = e
iγ
B
f
(w) exp
µ
−
1
2π
Z
L
ϑ(τ, w)dν(τ)
¶
,
B
f
(w) =
Y
n
¡
|w
n]
|(w
n]
− w)[w
n]
(I −
w
n]
w)]
−1
¢
,
f
[o]
(w) = exp
µ
1
2π
Z
L
ϑ(τ, w) log |f(e
iτ
)|dτ
¶
,
ϑ(τ, w) = (e
iτ
+ w)(e
iτ
− w)
−1
, γ ∈ I, ν ≥ 0 is a
singular measure on L. It follows that
f
[i]
(w)=e
iγ
B
f
(w)exp
µ
−
1
π
Z
I
$(t, z)dσ(t)
¶
e
−αz
,
f
[o]
(w) = exp
µ
1
π
Z
I
$(t, z) log |F (it)|dt
¶
,
where α =
1
π
[ν(0) + ν(2π)], and dν(τ ) = −2(I +
t
2
)
−1
dσ(t). Let B(z) = B
f
(w), F
[i]
(z) = f
i]
(w),
and F
[o]
(z) = f
[o]
(w) via w = (z − I)(z + I)
−1
.
Then F(z) = F
[i]
(z)F
[o]
(z). By using Theorem 2.2.8
(Hu and Yang, 1992) we can check that F
[i]
(z) is the
inner mapping and F
[o]
(z) is the outer mapping. This
ends the proof.
Theorem 3.4. A mapping f ∈ V H
∞
(l
∞
) is outer if
and only if fV H
2
is dense in V H
2
Proof. Let £ is a shift operator on V H
2
, i.e. £(f ) =
zf(z). Assume that Υ is a closure of fV H
2
in V H
2
.
Obviously, Υ is an invariant subspace with respect to
£. By using Beurling’s Theoremin (Garnett, 1980),
we know that there is an inter mapping g such that
Υ = gV H
2
. Since f ∈ Υ, the mapping f can be
represented as f = gh, where h ∈ V H
2
.
Necessity. If f is an inner mapping, then g ≡ const
by f = gh. It follows that Υ = gV H
2
, namely,
fV H
2
is dense in V H
2
.
Sufficiency. Suppose that f is not outer, and that
f = f
[i]
f
[o]
, then f
[i]
6≡ const. We can check that
f
[i]
V H
2
is an invariant subspace with respect to £
and f
[i]
V H
2
⊃ fV H
2
. Thus fV H
2
is not dense in
V H
2
. This is in contradiction with the hypothesis.
This contradiction shows the sufficiency.
Therefore the result of this theorem holds.
4 THE V H
∞
CONTROL
In this section, we replace S by the complex bounded
sequence space l
∞
. The subset of V H
∞
consisting
of all elements with every component being real-
rational function, is denoted by V RH
∞
. We call f
to be strong proper if f ∈ V RH
∞
and kfk
∞
< ∞,
strictly strong proper if f(∞) = 0. We call f to be
stable if f ∈ V RH
∞
and f has no poles in the do-
main D
+
(=
Q
∞
j=1
D
+
j
), where D
+
j
= {<(s
j
) ≥ 0}.
From the above definitions and the correspond-
ing conclusion (Hu and Ma, 2002) we derive
f ∈ V RH
∞
if and only if f is strong proper and
stable.
The space (l
∞
)
n×m
consists of all n × m com-
plex matrices with each element being in l
∞
. If
f(z) ∈ (l
∞
)
n×m
, then f can be written as
f =
f
11
· · · f
1n
f
21
· · · f
2n
.
.
.
.
.
.
.
.
.
f
m1
· · · f
mn
= (f
1
, . . . , f
j
, . . .),
where
f
j
=
f
11j
. . . f
1nj
f
21j
. . . f
2nj
.
.
.
.
.
.
.
.
.
f
m1j
. . . f
mnj
.
H8 CONTROL THEORY ON THE INFINITE DIMENSIONAL SPACE
363
Let %
j
be the maximal singular value of f
j
. Then
( %
1
, . . . , %
j
, . . . ) is called the maximal singular
value vector of f . Let V L
∞
be a space consisting
of all mapping matrices f(iω) with
sup{¯σ[f(iω)] : ω ∈ (−∞, ∞)} < ∞.
Here ¯σ[f(iω)] is its maximal singular value
vector for any fixed ω. The vector norm of f ∈ V L
∞
is defined by
kfk
∞
= sup{¯σ[f(iω)] : ω ∈ (−∞, ∞)}.
The spaceV RL
∞
consists of all real-rational mapping
matrices in V L
∞
.
The space V L
2
consists of all mapping matrices
{x(iω)} which are in (l
∞
)
n
and satisfy
Z
I
x
∗
(iω)x(iω)dω < ∞,
where x
∗
is the complex-conjugate transpose of x.
The space V H
∞
consists of all holomorphic mapping
matrices {F (s)} satisfying
sup{¯σ[F (s)] : <(s) > 0} < ∞
and this sup is denoted by kF k
∞
being the vector
norm of F ∈ V H
∞
.
Three transfer matrices
T
[l]
= (T
[l]
1
, . . . , T
[l]
j
, . . .), l = 1, 2, 3
are controllers. Similar to the classical method in [2],
we define the transfer mapping matrix
G(s) :=
·
T
[1]
(s) T
[2]
(s)
T
[3]
(s) 0
¸
, K(s) = −Q(s)
where T
[l]
∈ V H
∞
for l = 1, 2, 3 are given. Let
T
[i]
= [
T
i1
· · · T
ij
· · ·
]
for i = 1, 2, 3. Then G can be written as
··
T
11
T
21
T
31
0
¸
· · ·
·
T
1j
T
2j
T
3j
0
¸
· · ·
¸
.
For simplicity we only discuss under
T
[l]
∈ V RH
∞
(l
∞
), l = 1, 2, 3.
In V H
∞
control theory, the model-matching prob-
lem is to find an element Q ∈ V RH
∞
or a matrix
Q ∈ V RH
∞
to minimize
°
°
°
T
[1]
− T
[2]
QT
[3]
°
°
°
∞
,
Q is the controller to be designed. Let
α := inf
n
°
°
°
T
[1]
− T
[2]
QT
[3]
°
°
°
∞
o
be infimal model-matching error. The linear time
invariant system ß in V RH
∞
is defined by
˙x(t) = Ax(t) + Bu(t)
y(t) = Cx(t).
Completely controllable (c.c.) and completely
observable (c.o.) concepts and symbols (A, B) and
(A, C) are similar to Definition 2.3 (Hu and Ma,
2002). The concept of the minimal realization is
similar to Definition 2.4 (Hu and Ma, 2002). A
matrix A ∈ V RH
∞
is said to be antistable if all the
generalized eigenvalue vectors consisting of its all
eigenvalues, of A, are in
Q
∞
j=1
{<(s
j
) > 0}.
From the H
∞
-control theory we derive the follow-
ing result.
Theorem 4.1. (i) A realization [A, B, C, 0] of a given
transfer matrix G(s) ∈ V RH
∞
is minimal if (A, B)
is completely controllable and (A, C) is completely
observable respectively.
(ii) If A is antistable, then the Lyapunov equations
AL
c
+ L
c
A
T
= BB
T
A
T
L
o
+ L
o
A = C
T
C
have the unique solutions respectively, where
L
c
:=
Z
Ω
e
−At
B B
T
e
−A
T
t
dt,
L
o
:=
Z
Ω
e
−A
T
t
C
T
Ce
−At
dt,
where Ω =
Q
∞
j=1
Ω
j
, Ω
j
= [0, ∞).
Theorem 3.3 and Theorem 2.1 yield that a map-
ping T in V RH
∞
is inner if T (−s)T (s) = I, and
outer if it has no zeros in
Q
∞
j=1
{<(s
j
) > 0}, that
T (−s)T (s) = I if and only if each component
T
j
(−s
j
)T
j
(s
j
) = 1 for any j,
that every mapping T in V RH
∞
has a factoriza-
tion T = T
[i]
T
[o]
with T
[i]
inner, T
[o]
outer, and
°
°
T
[i]
(iω)
°
°
∞
ICINCO 2004 - INTELLIGENT CONTROL SYSTEMS AND OPTIMIZATION
364
= I (the unit element), and that if T
[o]
(iω) 6= 0 for
all ω ∈ Ω, then T
−1
[o]
exists and T
−1
[o]
∈ V RH
∞
.
Returning to the model-matching problem,
without loss generality we may assume T
[3]
= I
and bring in an inner-outer factorization of
T
[2]
: T
[2]
= T
[2]
[i]
T
[2]
[o]
. It follows that for Q in
V RH
∞
we have
kT
[1]
− T
[2]
Qk
∞
= kT
[2]
[i]
−1
T
[1]
− T
[2]
[o]
Qk
∞
= kR − Xk
∞
,
where R = T
[2]
[i]
−1
T
[1]
, X = T
[2]
[o]
Q.
Let λ
2
be a generalized largest eigenvalue vector
of L
c
L
o
and w a corresponding vector matrix respec-
tively. Define
f(s)=[A, w, C, 0], g(s)=[−A
T
, λ
−1
L
o
w, B
T
, 0]
and
X(s) = R(s) − λf(s)[g(s)]
−1
.
Let F (s) ∈ V L
∞
and g(s) ∈ V L
2
. Then the operator
Λ
F (s)
: Λ
F (s)
g(s) = F (s)g(s)
is called the Laurent operator. For F (s) in V L
∞
, the
Hankel operator with symbol F (s), denoted by Γ
F (s)
,
maps V H
2
to V H
2
⊥
and is defined as
Γ
F (s)
:= Π
1
Λ
F (s)
|V H
2
,
where Π
1
is the projection from V L
2
onto V H
2
⊥
.
Let {s
j
: <(s
j
) = 0, =(s
j
) ≥ 0} = Θ
j
and
Q
∞
j=1
Θ
j
= Θ.
By using the preceding method we may obtain the
following conclusions.
Theorem 4.2.
(a) If the ranks of T
[2]
and T
[3]
are constant on Θ,
then the optimal Q exists.
(b) There exists a closest V RH
∞
-mapping X(s)
to a given V RL
∞
-mapping R(s), and
kR − Xk
∞
= kΓ
R
k, where
kΓ
R
k = (kΓ
1R
1
k, . . . , kΓ
jR
j
k, . . .).
(c)The infimal model-matching error α equals
kΓ
R
k and the unique optimal X equals
R(s) − λf(s)[g(s)]
−1
.
The optimal controller
Q = (Q
1
, . . . , Q
j
, . . .) =
³
T
[2]
[o]
´
−1
X ∈ V RH
∞
is found via this theorem. Therefore the V H
∞
-
control theory is solved.
5 CONCLUSIONS
1) Theorem 4.2 gives the optimal solution Q and
the infimal model-matching error α of the V H
∞
control theory on the Banach algebra being isometric
isomorphism l
∞
. Section 2, Section 3 and Theorem
4.1 are the foundation of Theorem 4.2.
2) The concepts and the property of meromorphic
mappings in Definition 2.1 and Theorem 2.2 are
breakthroughs on infinite dimensional complex anal-
ysis. The argument on infinite dimensional spaces
are defined in formula (2.3) being very important
concept in the geometry.
3) All control theory on finite dimensional spaces
can be extended that on infinite dimensional spaces to
infinite dimensional spaces by using methods in this
paper.
ACKNOWLEDGEMENT
I would like to acknowledge the Organizing Commit-
tee of 1st International Conference on Informatics in
Control, Automation and Robotics for its support and
help.
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