Absolute Continuity

In measure theory, absolute continuity describes a specific relationship between two measures. Intuitively, a measure is absolutely continuous with respect to another measure if “follows” in the sense that assigns no “weight” to any set where has zero measure.

Definition

Let be a measurable space, and let and be two measures on . The measure is said to be absolutely continuous with respect to (written ) if:

In other words, “inherits” the null sets of .

Examples

  1. Lebesgue Measure and Weighted Measures: Let be the Lebesgue measure on , and let be defined by for a non-negative function . Then , because any set of Lebesgue measure zero will also have zero measure under .

  2. Discrete vs. Continuous Measures: If is the Lebesgue measure and is the Dirac delta measure at some point (defined by if and otherwise), then is not absolutely continuous with respect to , as assigns weight to a set (the single point ) that has Lebesgue measure zero.

Properties

  1. Preservation of Null Sets: Absolute continuity implies that assigns zero measure to every -null set, but not necessarily vice versa.
  2. Total Variation: If is absolutely continuous with respect to , then the total variation of is also absolutely continuous with respect to .
  3. Implication for Functions: In the context of real analysis, if a function is absolutely continuous on an interval , then it has a derivative almost everywhere, and can be represented as an integral of its derivative.