[-]

bet	19/40
Sana	02.07.2020
Hajmi	1.57 Mb.
	#122746

1 ... 15 16 17 18 19 20 21 22 ... 40

Bog'liq
funksional analiz misol va masalalar yechish 1 qism

A → R

"

!

x
∈ A

|f(x)| ≤ ϕ(x)

f

Z
(

!

!
"#

<

-
ϕ
(x) ≡ 2

f
(x) =
⎧
⎨
⎩
−1, agar x ∈ Q
1,
agar
x
∈ R\Q.
(7.12)
'!

x
∈ [0, 2]

!

|f(x)| ≤ ϕ(x)

ϕ
: [0, 2] → R

[0, 2]

Z
(

"
!

/
f

[0, 2]

Z
(

"

!

'

D

Z
(

!

"

&/
7

(
A
!

&
;
ϕ

c >
0

μ
{x ∈ A : ϕ(x) ≥ c} ≤
1
c
$
A
ϕ
(x)dμ
(7.13)

38#`5
7

!
"#

*

A
c
= { x ∈ A : ϕ(x) ≥ c}

,

$
A
ϕ
(x) dμ =
$
A
c
ϕ
(x) dμ +
$
A
\A
c
ϕ
(x) dμ ≥
$
A
c
ϕ
(x) dμ ≥ c · μ (A
c
) .
'

38#`5

!

&
f
(x) = 3x
2
+ 2, x ∈ [0, 1]

(

X

Z

/

"

8b"

!
"#

'
f
(x) = 3x
2
+ 2, x ∈ [0, 1]

'

!

[0, 1]

!

!

!

f

!

!

{f
n
}

"

n
∈ N

f
n

lim
n
→∞
+
A
f
n
(x) dμ

2

!

[0, 1]

0 <
1
n
<
2
n
<
· · · <
n
− 1
n
<
n
n
= 1

n

A
k
=

k
− 1
n
,
k
n

, k
= 1, 2, . . . , n − 1, A
n
=

n
− 1
n
,
1

1

&
+ "+

n
k
=1
A
k
= [0, 1]

f
n

[0, 1]

"
!

-
f
n
(x) = f

k
n

= 3
k
2
n
2
+ 2,
x
∈ A
k
, k
= 1, 2, . . . , n.

1

"

[0, 1]

f

max
0≤ x ≤1
|f
n
(x) − f(x)| = max
1≤ k ≤n
max
x
∈A
k
|f
n
(x) − f(x)| =
= max
1≤ k ≤n
max
x
∈A
k
|f(k/n) − f(x)| = max
1≤ k ≤n
3(2k − 1)
n
2
=
3(2n − 1)
n
2
.
\

"

[0, 1]

f

[
f
n

[0, 1]
&

!

/

$
[0,1]
f
n
(x) dμ =
n

k
=1
f

k
n

μ
(A
k
) =
n

k
=1

3k
2
n
2
+ 2

1
n
=
3
n
3
n

k
=1
k
2
+
+
2
n
n

k
=1
1 =
3
n
3
n
(n + 1)(2n + 1)
6
+ 2 =
(n + 1)(2n + 1)
2 n
2
+ 2.
(7.14)
_

!

n
∈ N

!

1
2
+ 2
2
+ 3
2
+ · · · + n
2
=
n
(n + 1)(2n + 1)
6

38#b5

n
→ ∞

lim
n
→∞
$
[0,1]
f
n
(x) dμ = lim
n
→∞

(n + 1)(2n + 1)
2 n
2
+ 2

= 1 + 2 = 3

.
+
Z

/

8b"

$
1
0
(3x
2
+ 2) dx = (x
3
+ 2x)
##
1
0
= 1 + 2 − 0 = 3.
\
(

()
*
+,
*

*+-
+

#

-

&
*
f
: A → R
!

g
(x) = [f(x)]

A

'

[a]

a

&
. !

A
⊂ E
&
y
= χ
A
(x)

E

(

8#"

A
n
& "

!

&
y
= sign x

E
= [−1, 3]

(

"

8#"

&$
*
f
1
: A → R

f
2
: E\A → R

f
(x) =
⎧
⎨
⎩
f
1
(x),
x
∈ A
f
2
(x), x ∈ E\A

E

&%
=

&

K

[0, 1]\K

'

K
−
=

&
&&
K : K → R
=

'

K
−
=

&
&'
<

[0, 1]
&

!

/

a
) f(x) =
⎧
⎨
⎩
0, agar x ∈ K
n, agar x
∈ K
n
,
b
) g(x) =
⎧
⎨
⎩
1, x ∈ K
2
−n
,
x
∈ K
n
.
&.
2

&

"

&/
2

&
*
f

g

α f
+ β g

&
*
f
: A → R

g
: A → R

f
· g

&
f
: A → R

!

!

!

"

+

"

&
=

&

K

[0, 1]

!

!

!

"

&$
*
f

g

A
&

!

α f
+ β g

A
&

!

$
A
(α f(x) + β g(x) ) dμ = α
$
A
f
(x)dμ + β
$
A
g
(x)dμ

&%
f
(x) = [x], x ∈ [0, 5) = A

A
&

!

&&

!

A
⊂ E
!

+
E
χ
A
(x) dμ = μ(A)

&'
A
= {x ∈ [−π, π] : sin x < 0, 5}
!

+
[−π, π]
χ
A
(x) dμ

"

&.
\

(

,
A
= [0, 3]
&

!

&/
Z

A
=
[0, 1]
&

!

8`#"8`8"

f
: A → R

&
f
(x) = [2x], A = [0, 2)

&
f
(x) = sign x, A = [−1, 3]

&
f
(x) = χ
[0,1]\Q
(x),
A
= [−1, 3]

&
f
(x) = [x] + sign x, A = [−1, 2]

&$
f
(x) = sign x + χ
[1,2]
(x), A = [−1, 4]

&%
f
(x) = n, x ∈ A
n
=

1
3
n
,
1
3
n
−1

,
n
∈ N, A = (0, 1].
&&
f
(x) =
1
n
, x
∈ A
n
=

1
(n + 1)!
,
1
n
!

,
n
∈ N, A = (0, 1].
&'
f

!

A
&

!

"

!

38b5

+

&.
'
f

!

38b5

!

{f
n
}

"

& /
/

'

"

!

$
A
k
· f(x) dμ = k
$
A
f
(x) dμ, k ∈ R.
&
/

'

!

-
$
A
(f(x) + g(x)) dμ =
$
A
f
(x) dμ +
$
A
g
(x) dμ.
8b>

8b#"

36#9

5
/

&
/

A
&
!

!

f

!

&
/

3
5

A
& "

;
f
(x) ≥ 0

;
&
/

*
μ
(A) = 0

f
: A → R

& $
*

!

x
∈ A

!

f
(x) = g(x)

$
A
f
(x)dμ =
$
A
g
(x)dμ

(

'

/

8b7

8b8"

/

"

36#9

5
& %
*
ϕ

A
&

!

!

x
∈ A

!

|f(x)| ≤ ϕ (x)

f
!

A
&

!

& &
*
f
!

f

|f|

!

!

& '
*

n
∈ N
!

38##5

!

f
but
n

!

$
A
f
(x) dμ = lim
n
→∞
$
A
f
but
n
(x) dμ.
& .
/

Z

!

_
(

f
: A → R

g
: A → R

Z
(

!

!

!

A
= [0, 2]

\
D(x)

θ
(x) = 0

&$/
/

Z

!

_
(
Z
(

!

f
: A → R
"

|f|

Z
(

"

!

38#%5

Download 1.57 Mb.

Do'stlaringiz bilan baham:

1 ... 15 16 17 18 19 20 21 22 ... 40