Beppo-Levi Theorem: Difference between revisions

Latest revision as of 01:06, 18 December 2020

The Beppo-Levi theorem is a result in measure theory which gives a sufficient condition for interchanging an integral with an infinite series. The setting and result is essentially a particular case of the monotone convergence theorem, though one needs to be careful that all intermediary functions in the proof remain measurable so that monotone convergence may be applied.

Statement

Let $(X,\Sigma ,\mu )$ be the underlying measure space and let $\{f_{n}\}_{n=1}^{\infty }$ be a sequence of measurable functions with $f_{n}:X\rightarrow [0,+\infty ]$ for each $n\in \mathbb {N}$ . Then, $\sum _{n=1}^{\infty }\int f_{n}d\mu =\int \sum _{n=1}^{\infty }f_{n}d\mu$

Proof

We know for any two non-negative measurable functions $f,g:X\to [0,+\infty ]$ that

\int f+\int g=\int f+g.

Iterating this formula inductively, we find for all

N\in \mathbb {N}

that

\int \sum _{n=1}^{N}f_{n}=\sum _{n=1}\int f_{n}.

In addition, we know that the sum of two nonnegative measurable functions is again nonnegative and measurable, and induction implies that each

\sum _{n=1}^{N}f_{n}

is again measurable and nonnegative.

The sequence of functions $\left\{\sum _{n=1}^{N}f_{n}\right\}_{n\in \mathbb {N} }$ is monotonically nondecreasing since each $f_{n}$ is nonnegative. By the monotone convergence theorem, we thus deduce

\lim _{N\to \infty }\int \sum _{n=1}^{N}f_{n}=\int \lim _{N\to \infty }\sum _{n=1}^{N}f_{n}=\int \sum _{n=1}^{\infty }f_{n}.

References

1. Folland, Gerald. B; "Real Analysis: Modern Techniques and Their Applications." Wiley. 2007.

@@ Line 1: / Line 1: @@
-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 which gives a sufficient condition for interchanging an integral with an infinite series. The setting and result is essentially a particular case of the monotone convergence theorem, though one needs to be careful that all intermediary functions in the proof remain measurable so that monotone convergence may be applied.
 ==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, measurable functions with <math>f_{n}: X \rightarrow [0, +\infty]</math>. Then, <math> \sum_{n=1}^{\infty}\int f_{n}d\mu = \int \sum_{n=1}^{\infty}f_{n} d\mu </math>
+Let <math>(X,\Sigma, \mu)</math> be the underlying measure space and let <math>\{f_{n}\}_{n=1}^{\infty}</math> be a sequence of measurable functions with <math>f_{n}: X \rightarrow [0, +\infty]</math> for each <math> n \in \mathbb{N} </math>. Then, <math> \sum_{n=1}^{\infty}\int f_{n}d\mu = \int \sum_{n=1}^{\infty}f_{n} d\mu </math>
 ==Proof==
-First, the result is proved for finite sums. Take <math>f, g: X\rightarrow [0, +\infty]</math> measurable functions. As such, take sequences <math> \{\phi_{j}\}_{j=1}^{\infty}</math> and <math> \{\psi_{j}\}_{j=1}^{\infty}</math> so that they converge pointwise to <math>f</math> and <math>g</math> respectively.
+We know for any two non-negative measurable functions <math>f,g:X \to [0,+\infty]</math> that <math display="block"> \int f + \int g = \int f+g. </math>
+Iterating this formula inductively, we find for all <math> N \in \mathbb{N}</math> that <math display="block"> \int \sum_{n=1}^N f_n = \sum_{n=1} \int f_n.  </math> In addition, we know that the sum of two nonnegative  measurable functions is again nonnegative and measurable, and induction implies that each <math> \sum_{n=1}^N f_n </math> is again measurable and nonnegative.
+The sequence of functions <math> \left\{\sum_{n=1}^N f_n\right\}_{n\in \mathbb{N}} </math> is monotonically nondecreasing since each <math> f_n </math> is nonnegative. By the monotone convergence theorem, we thus deduce
+<math display="block"> \lim_{N\to\infty} \int \sum_{n=1}^N f_n = \int \lim_{N\to \infty} \sum_{n=1}^N f_n =\int \sum_{n=1}^\infty f_n. </math>
+==References==
+. Folland, Gerald. B; "Real Analysis: Modern Techniques and Their Applications." Wiley. 2007.

Beppo-Levi Theorem: Difference between revisions

Latest revision as of 01:06, 18 December 2020

Statement

Proof

References

Navigation menu

Search