The Borel -algebra on a topological space (typically with its standard topology) is the smallest -algebra that contains all open sets in . Denoted by , it includes all sets that can be constructed from open sets using countable unions, countable intersections, and complements. Sets in this -algebra are called Borel Sets

Properties:

  1. Contains open and closed sets: Since the Borel -algebra is generated by open sets, it contains all open sets and their complements (i.e., all closed sets).
  2. Closed under countable operations: If are Borel sets, then:
    • The countable union is a Borel set.
    • The countable intersection is a Borel set.
    • The complement of any Borel set is also a Borel set.
  3. Contains intervals: In , all common intervals (open, closed, half-open) such as , , , and are Borel sets because they can be expressed as open or closed sets.
  4. Generated by a base: For example, in , the Borel -algebra can be generated by:
    • The collection of all open intervals .
    • Equivalently, by all closed intervals .