Lebesgue convergence theorems

The Lebesgue Convergence Theorems

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last updates: 2 April 2011

The Lebesgue Convergence Theorems

(Lebesgue's monotone convergence theorem)
Let $(X, ℳ)$ be a measurable space and let $μ : ℳ \to [0, \infty]$ be a positive measure on $(X, ℳ)$ .
Let $f_{n} : X \to [0, \infty]$ , $n \in ℤ_{> 0}$ , be a sequence of measurable functions such that

(a) If $x \in X$ then $0 \leq f_{1} (x) \leq f_{2} (x) \leq \dots \leq \infty$ , and

(b) If $x \in X$ then $\lim_{n \to \infty} f_{n} (x)$ exists.

Let $f : X \to [0, \infty]$ be given by $f (x) = \lim_{n \to \infty} f_{n} (x)$ .
Then $f$ is measurable and
$\int_{X} (\lim_{n \to \infty} f_{n}) d μ = \lim_{n \to \infty} (\int_{X} f_{n} d μ)$ .

(Fatou's lemma)
Let $(X, ℳ)$ be a measurable space and let $μ : ℳ \to [0, \infty]$ be a positive measure on $(X, ℳ)$ .
Let $f_{n} : X \to [0, \infty]$ , $n \in ℤ_{> 0}$ , be a sequence of measurable functions. Then

\int_{X} (\underset{n \to \infty}{liminf} f_{n}) d μ \leq \underset{n \to \infty}{liminf} (\int_{X} f_{n} d μ)

(Lebesgue's dominated convergence theorem)
Let $(X, ℳ)$ be a measurable space and let $μ : ℳ \to [0, \infty]$ be a positive measure on $(X, ℳ)$ .
Let $f_{n} : X \to ℂ$ , $n \in ℤ_{> 0}$ , be a sequence of measurable functions such that

if $x \in X$ then $\lim_{n \to \infty} f_{n} (x)$ exists.

Assume that there exists

g \in L^{1} (μ)

such that

if $n \in ℤ_{> 0}$ and $x \in X$ then $| f_{n} (x) | \leq g (x)$ .

Then

(a) $f \in L^{1} (μ)$ ,

(b) $\lim_{n \to \infty} (\int_{X} | f_{n} - f | d μ) = 0$ ,

Notes and References

These notes were written for a course in "Measure Theory" at the Masters level at University of Melbourne. This presentation follows [Ru, Chapters 1-6].

References

[Ru] W. Rudin, Real and complex analysis, Third edition, McGraw-Hill, 1987. MR0924157.

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