- categories: Measure Theory, Definition
A measure is a function that assigns a non-negative value, representing size, length, area, or volume, to subsets of a given space. Formally, a measure on a set is defined on a -algebra of subsets of , satisfying the following properties:
Key Properties:
- Non-negativity: For any , .
- Null empty set: .
- Countable additivity (σ-additivity): If is a countable collection of disjoint sets in , then:
Common Examples:
- Lebesgue measure: The standard measure on , assigning the usual notion of length, area, and volume to intervals and other sets.
- Counting measure: A measure that assigns to each finite set the number of elements it contains.
- Dirac measure: Given a point , the Dirac measure is defined by if , and otherwise.
Formal Definition:
A measure on a measurable space is a function such that:
- ,
- For any countable collection of disjoint sets ,