Lebesgue's decomposition theorem
- Lebesgue's decomposition theorem
In mathematics, more precisely in measure theory, Lebesgue's decomposition theorem is a theorem which states that given and two σ-finite signed measures on a measurable space there exist two σ-finite signed measures and such that:
*
* (that is, is absolutely continuous with respect to )
* (that is, and are singular).
These two measures are uniquely determined.
Refinement
Lebesgue's decomposition theorem can be refined in a number of ways.
First, the decomposition of the singular part can refined:: where
* "μ"cont is the absolutely continuous part
* "μ"sing is the singular continuous part
* "μ"pp is the pure point part (a discrete measure).
Second, absolutely continuous measures are classified by the Radon–Nikodym theorem, and discrete measures are easily understood. Hence (singular continuous measures aside), Lebesgue decomposition gives a very explicit description of measures. The Cantor measure (the probability measure on the real line whose cumulative distribution function is the Cantor function) is an example of a singular continuous measure.
ee also
* Decomposition of spectrum
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