LebesgueMaßheit

LebesgueMaßheit, often translated as Lebesgue measure, is a fundamental concept in measure theory and real analysis. It is a way to assign a size or volume to subsets of Euclidean space, generalizing the intuitive notions of length, area, and volume. The Lebesgue measure is defined on a sigma-algebra of sets called the Lebesgue measurable sets, which includes all intervals and many more complex sets.

The construction of the Lebesgue measure involves outer measures and the Carathéodory criterion. Initially, a measure

A key property of the Lebesgue measure is its translation invariance, meaning that if a set is

Despite its power, the Lebesgue measure reveals that not all subsets of Euclidean space are measurable. The