Outer measure
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Jihye
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Definition.
Let
X
{\displaystyle X}
be a nonempty set. An outer measure
[1]
on the set
X
{\displaystyle X}
is a function
μ
∗
:
2
X
→
[
0
,
∞
]
{\displaystyle \mu ^{*}:2^{X}\to [0,\infty ]}
such that
μ
∗
(
∅
)
=
0
{\displaystyle \mu ^{*}(\emptyset )=0}
,
μ
∗
(
A
)
≤
μ
∗
(
B
)
{\displaystyle \mu ^{*}(A)\leq \mu ^{*}(B)}
if
A
⊆
B
{\displaystyle A\subseteq B}
,
μ
∗
(
∪
j
=
1
∞
A
j
)
≤
∑
j
=
1
∞
μ
∗
(
A
j
)
.
{\displaystyle \mu ^{*}(\cup _{j=1}^{\infty }A_{j})\leq \sum _{j=1}^{\infty }\mu ^{*}(A_{j}).}
Definition.
A set
A
⊂
X
{\displaystyle A\subset X}
is
μ
∗
{\displaystyle \mu ^{*}}
-measurable if
μ
∗
(
E
)
=
μ
∗
(
E
∩
A
)
+
μ
∗
(
E
∖
A
)
{\displaystyle \mu ^{*}(E)=\mu ^{*}(E\cap A)+\mu ^{*}(E\setminus A)}
for all
E
⊂
X
{\displaystyle E\subset X}
.
References
↑
Gerald B. Folland,
Real Analysis: Modern Techniques and Their Applications, second edition
, Section 1.4
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