Let . For almost every point , the following holds:

where is the ball of radius centered at and is its Lebesgue measure.

Intuition: The theorem asserts that for functions integrable in the Lebesgue sense, the local average of the function over shrinking balls converges to the value of the function at almost every point.

Key Properties:

  1. This result generalizes the notion of pointwise differentiation to the setting of Lebesgue integrable functions.
  2. The limit is valid almost everywhere; it does not hold necessarily at every point but at almost every point in .

Proof Outline:

  1. Maximal function: Define the Hardy–Littlewood Maximal Function . The boundedness of on spaces (for ) is key.
  2. Dominated convergence: Using properties of the maximal function and Dominated Convergence Theorem, show that the averages of converge to almost everywhere.