A function (or ) defined on a measurable space is called measurable if for every Borel Set , the preimage of under is in , i.e.,

Intuition:

A measurable function is one that “preserves” the structure of the -algebra on its domain. It ensures that applying the function to measurable sets gives measurable results.

Key Properties:

  1. Preservation of Measure: For any Borel Set , the preimage is measurable.
  2. Composition with Measurable Functions: If and are measurable, then , , and (for any constant ) are also measurable.
  3. Examples:
    • Continuous functions on a measurable space are measurable.
    • Indicator functions of measurable sets are measurable.