- categories: Measure Theory, Definition
A Borel set is any set that can be constructed from open sets in a topological space (typically with its standard topology) through countable operations, such as unions, intersections, and complements.
Key Properties:
- Closed under countable operations:
- If are Borel sets, then , , and the complement are also Borel sets.
- Generation from open sets:
- The Borel -algebra is generated by open sets, meaning that any Borel set can be expressed in terms of open (or equivalently, closed) sets via countable unions, intersections, and complements.
- Includes many common sets:
- All open and closed sets are Borel sets.
- Countable unions and intersections of open (or closed) sets are Borel sets.
- Intervals such as , , and are Borel sets.
Intuition:
Borel sets form a broad class of sets that include many “well-behaved” subsets of (such as intervals), but they also include much more complex sets that are still describable in terms of open sets through countable processes.
Importance:
Borel sets are fundamental in measure theory because they are the sets for which the Lebesgue measure is defined. The Borel -algebra allows us to extend the notion of measure beyond simple geometric objects like intervals to more complicated sets.