Vector (mathematics and physics)

In measure theory, a continuity set of a measure μ is any Borel set B such that

${\displaystyle \mu (\partial B)=0.}$

where ${\displaystyle \partial B}$ is the boundary set of B. For signed measures, one asks that

${\displaystyle \left|\mu \right|(\partial B)=0.}$

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

${\displaystyle \mathrm{Pr}[X\in \partial B]=0,}$

otherwise B is called the discontinuity set. The collection of all discontinuity sets is sparse. In particular, given any collection of sets {B_α} with pairwise disjoint boundaries, all but at most countably many of them will be the continuity sets.^[2]

The continuity set C(f) of a function f is the set of points where f is continuous.

References

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