In measure theory , a branch of mathematics , a continuity set of a measure μ is any Borel set B such that
μ
(
∂
B
)
=
0
,
{\displaystyle \mu (\partial B)=0\,,}
where
∂
B
{\displaystyle \partial B}
boundary of B . For signed measures , one asks that
|
μ
|
(
∂
B
)
=
0
.
{\displaystyle |\mu |(\partial B)=0\,.}
The class of all continuity sets for given measure μ forms a ring .
Similarly, for a random variable X , a set B is called continuity set if
Pr
[
X
∈
∂
B
]
=
0.
{\displaystyle \Pr=0.}
Continuity set of a function
The continuity set C (f ) of a function f is the set of points where f is continuous .
References
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