• categories: Measure Theory, Real Analysis, Theorem

  • Statement: Let be a measurable function on the product space .

    1. If , then:

      In other words, the order of integration can be interchanged.

    2. For non-negative measurable functions , the integrals may not be finite, but the result still holds:

  • Intuition: Fubini’s theorem allows us to compute double integrals by integrating iteratively, first over one variable and then over the other. It ensures that for functions that are either integrable or non-negative, the order of integration can be swapped without affecting the result.

  • Key Conditions:

    1. Integrability: guarantees that the integrals are finite and the theorem applies.
    2. Non-negative functions: For non-negative measurable functions, even if the function is not integrable, the double integral can still be computed iteratively.
  • Applications: Fubini’s theorem is used in various contexts, such as probability theory, multivariable calculus, and measure theory, where changing the order of integration simplifies calculations.