Definition:Intersection Measure/Signed Measure
Jump to navigation
Jump to search
Definition
Let $\struct {X, \Sigma}$ be a measurable space.
Let $\mu$ be a signed measure on $\struct {X, \Sigma}$.
Let $F \in \Sigma$.
Then the intersection (signed) measure (of $\mu$ by $F$) is the mapping $\mu_F: \Sigma \to \overline \R$, defined by:
- $\map {\mu_F} E = \map \mu {E \cap F}$
for each $E \in \Sigma$.
Also see
- Results about intersection signed measures can be found here.