Continuity set

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} is the (topological) 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.[1]

Similarly, for a random variable X, a set B is called continuity set if

Pr [ X B ] = 0. {\displaystyle \Pr[X\in \partial B]=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

  1. ^ Cuppens, R. (1975) Decomposition of multivariate probability. Academic Press, New York.
  • v
  • t
  • e