Definition:Distribution Function of Finite Signed Borel Measure

Definition
Let $\mu$ be a finite signed Borel measure on $\R$.

We define the distribution function of $\mu$, $F_\mu : \R \to \R$ by:


 * $\map {F_\mu} x = \map \mu {\hointl {-\infty} x}$

for each $x \in \R$.

Also see

 * Definition:Cumulative Distribution Function - a notable special case where $\mu$ is the probability distribution of a real-valued random variable
 * Definition:Distribution Function of Finite Borel Measure - an instantiation where $\mu$ is more specifically a finite measure.