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Chapter 28 The Multiple Cauchy Integral and the Cauchy Inequalities
CHAPTER 28
THE MULTIPLE CAUCHY INTEGRAL AND THE CAUCHY INEQUALITIES
(The Multiple Cauchy Integral).
PROPOSITION 28.1 separated,
f E #(U;F),
nl,
N,
...,nk E
that j
m = nl
+...+
+...+hkxk
5 + hLxl
= l,,..,k.
5 E
k
nk
and
E U
xl,.
E,
> 0, such
P 1 , ...,pk
for every
..,xk E
be
lhjl
E 6,
P j
Then n
..%!
1
nl!.
-
N",
E
U,
F
Let
dmf(g)xl
f(5+hlX1+.
1
(2ni)
k
...xkn .
l
x1
-
-
.
.+hkXk)
nl+l
*/hjl"Pj
k
nk+ 1
dh l...dXk
"'h,
1sj s k REMARK 28.1: The proof of Proposition 28.1 is similar to the
proof of Proposition 25.2, the single integral in the latter case being replaced by a multiple integral.
Alternatively,
Proposition 28.1 can be obtained by repeated application of Proposition 25.2.
Proposition 25.2
Proposition 28.1 in which where
nl =...=
k = m,
COROLLARY 28.1 m E N*,
x1
,...,xm E
g + xlxl +...+ j = l,...,m.
Let
xmxmE Then
k
is the extreme case of
= 1. The other extreme case,
nm = 1
is as follows:
F
be separated,
E
and
u
p1
,...,pm
for every
xj
5
f E a(U;F),
E U,
> 0 such that E C,
IxjI
4
p j
9
9
2 30
CHAPTER 2 8
Xx = XIXl and if
+...+
IX,I
...,nk) E
n = (nl,
If we write
REMARK 2 8 . 2 :
'kXk
= pl,
Xn+l
'
...,I
hkl
nl+l
= X,
= pk
...Iknk+l ,
i s written
k
N
,
d ( n ) = k,
dX = dX,.
1x1
= p ,
..dx,
,
then
integral formula given in Proposition 2 8 . 1 becomes f
a form similar to Proposition 2 5 . 2 . REMARK 2 8 . 3 :
sition 2 8 . 1 ,
Cauchy inequalities can be derived from Propoo r from Remark 2 8 . 2 ,
in the same way as the
Cauchy inequalities of Chapter 2 5 were derived from Proposition 2 2 . 2 . REMARK 2 8 . 4 : A E Ss(%;F),
If we apply Corollary 28.1 to
5 =
with
larization formula:
A(xl,
...,xm) =
and
0
f1
1
m!(2ni)m
U = E,
f =
i
(XI*
where
we obtain a new po-
m xm )
2(X1Xl+...+h
.$ jl=l
i,
-__ 2
*Xm)
dX1. .dX,
1s j 4 m
where we have taken
p1
=...=
P,
= 1;
in this case, it can
be shown easily by a change o f variable that any choice of
t
THE MULTIPLE CAUCHY INTEGRAL AND THE CAUCHY INEQUALITIES
> 0 gives the same value for the integral.
p l , ...,pm
231
Like
the original polarization formula (Lemma 15.1), we can use this formula to obtain an estimate f o r a(xj)
r;
1
REMARK 28.5:
to
f =
i,
j = l,...,m,
for
BIA(xl,
...,xm)];
then
More generally, if we apply Proposition 28.1 where
A E Xs(%;F),
m E N",
5
= 0
U = E,
and
we obtain another new polarization formula:
n
k k -
. -
if
1
k
m! ( m i )
!Ixjl=l 1sjsk
n +1 1
1,
"'1,
nk+ 1
dX l...dXk
.
THE MULTIPLE CAUCHY INTEGRAL AND THE CAUCHY INEQUALITIES
(The Multiple Cauchy Integral).
PROPOSITION 28.1 separated,
f E #(U;F),
nl,
N,
...,nk E
that j
m = nl
+...+
+...+hkxk
5 + hLxl
= l,,..,k.
5 E
k
nk
and
E U
xl,.
E,
> 0, such
P 1 , ...,pk
for every
..,xk E
be
lhjl
E 6,
P j
Then n
..%!
1
nl!.
-
N",
E
U,
F
Let
dmf(g)xl
f(5+hlX1+.
1
(2ni)
k
...xkn .
l
x1
-
-
.
.+hkXk)
nl+l
*/hjl"Pj
k
nk+ 1
dh l...dXk
"'h,
1sj s k REMARK 28.1: The proof of Proposition 28.1 is similar to the
proof of Proposition 25.2, the single integral in the latter case being replaced by a multiple integral.
Alternatively,
Proposition 28.1 can be obtained by repeated application of Proposition 25.2.
Proposition 25.2
Proposition 28.1 in which where
nl =...=
k = m,
COROLLARY 28.1 m E N*,
x1
,...,xm E
g + xlxl +...+ j = l,...,m.
Let
xmxmE Then
k
is the extreme case of
= 1. The other extreme case,
nm = 1
is as follows:
F
be separated,
E
and
u
p1
,...,pm
for every
xj
5
f E a(U;F),
E U,
> 0 such that E C,
IxjI
4
p j
9
9
2 30
CHAPTER 2 8
Xx = XIXl and if
+...+
IX,I
...,nk) E
n = (nl,
If we write
REMARK 2 8 . 2 :
'kXk
= pl,
Xn+l
'
...,I
hkl
nl+l
= X,
= pk
...Iknk+l ,
i s written
k
N
,
d ( n ) = k,
dX = dX,.
1x1
= p ,
..dx,
,
then
integral formula given in Proposition 2 8 . 1 becomes f
a form similar to Proposition 2 5 . 2 . REMARK 2 8 . 3 :
sition 2 8 . 1 ,
Cauchy inequalities can be derived from Propoo r from Remark 2 8 . 2 ,
in the same way as the
Cauchy inequalities of Chapter 2 5 were derived from Proposition 2 2 . 2 . REMARK 2 8 . 4 : A E Ss(%;F),
If we apply Corollary 28.1 to
5 =
with
larization formula:
A(xl,
...,xm) =
and
0
f1
1
m!(2ni)m
U = E,
f =
i
(XI*
where
we obtain a new po-
m xm )
2(X1Xl+...+h
.$ jl=l
i,
-__ 2
*Xm)
dX1. .dX,
1s j 4 m
where we have taken
p1
=...=
P,
= 1;
in this case, it can
be shown easily by a change o f variable that any choice of
t
THE MULTIPLE CAUCHY INTEGRAL AND THE CAUCHY INEQUALITIES
> 0 gives the same value for the integral.
p l , ...,pm
231
Like
the original polarization formula (Lemma 15.1), we can use this formula to obtain an estimate f o r a(xj)
r;
1
REMARK 28.5:
to
f =
i,
j = l,...,m,
for
BIA(xl,
...,xm)];
then
More generally, if we apply Proposition 28.1 where
A E Xs(%;F),
m E N",
5
= 0
U = E,
and
we obtain another new polarization formula:
n
k k -
. -
if
1
k
m! ( m i )
!Ixjl=l 1sjsk
n +1 1
1,
"'1,
nk+ 1
dX l...dXk
.