Let and be measure spaces. A map is -measurable if for all
Examples of measurable functions
- A function is called a Lebesgue measurable function if is - measurable, where is the class of Lebesgue measurable sets and is Borel -algebra.
- A function is called Borel measurable if is -measurable.
Theorem. Let and be measure spaces. Suppose that is generated by a set . A map is -measurable if for all Failed to parse (unknown function "\E"): {\displaystyle \E \in \epsilon.}