For a measure space , if and , then there is a continuous embedding of into . This means that if , then , and for some constant depending on , , and .

Statement

Let and assume that . Then for any measurable function ,

Thus, if , then and the inclusion map from to is continuous.

Intuition

When , the norm penalizes larger values of less strongly than the norm does. Consequently, an function tends to have “more integrability” when viewed in the space, allowing for inclusion.

Proof Outline

  1. Power Mean Inequality: Using Hölder’s Inequality, observe that for any and , is integrable, so is also integrable since .
  2. Estimate: Apply Hölder’s inequality with exponents and to obtain: