Beppo-Levi Theorem: Difference between revisions

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The Beppo-Levi theorem is a result in measure theory that gives us conditions wherein we may then pass the integral through an infinite series of functions. That is to say, this theorem provides conditions under which the (possibly infinite) sum of the integrals is equal to the integral of the sums.
The Beppo-Levi theorem is a result in measure theory that gives us conditions wherein we may then pass the integral through an infinite series of functions. That is to say, this theorem provides conditions under which the (possibly infinite) sum of the integrals is equal to the integral of the sums.
==Statement==
Let <math>(X,\Sigma, \mu)</math> be the underlying measure space and let <math>\{f_{n}\}_{n=1}^{\infty}</math> be a sequence of non-negative functions with <math>f_{n}: X \rightarrow [0, +\infty]</math>.

Revision as of 22:13, 3 December 2020

The Beppo-Levi theorem is a result in measure theory that gives us conditions wherein we may then pass the integral through an infinite series of functions. That is to say, this theorem provides conditions under which the (possibly infinite) sum of the integrals is equal to the integral of the sums.

Statement

Let be the underlying measure space and let be a sequence of non-negative functions with .