Talk:Dominated convergence theorem

Let ${\displaystyle f_{k}}$ be the difference of a fixed non-negative function ${\displaystyle g}$ of integral ${\displaystyle +\infty }$ and a non-negative fuunction ${\displaystyle g_{k}}$ of integral -n. Thus

${\displaystyle f_{k}=g-g_{k}}$

Then ${\displaystyle f_{k}}$ is monotone, each integral

${\displaystyle \int f_{k}}$

is defined (its value is ${\displaystyle +\infty }$,) but Lebesgue's monotone convergence theorem fails. In fact, ${\displaystyle \lim _{k}\int f_{k}=+\infty }$ but ${\displaystyle \int \lim _{k}f_{k}}$ can be chosen to be any value. --CSTAR 01:30, 22 July 2006 (UTC)

ok, "...a non-negative fuunction ${\displaystyle g_{k}}$ of integral -n." ---that's interesting. Mct mht 04:32, 22 July 2006 (UTC)

OK a negative ${\displaystyle g_{k}}$ of integral -k. Do you need an example? --CSTAR 04:34, 22 July 2006 (UTC)

Hell, let me just it it to you: Consider R with Lebesgue measure and let g_k be -1 on [0,k]. Take g to to be some non-negstive non-integrable function on [-∞, 0]. For example g(x)=1/|x| for x in [-1,0] and 0 elsewhere.--CSTAR 04:41, 22 July 2006 (UTC)

my apology to User:Loisel for the revert. he's right, monotone increasing and positive is needed. i believe the positive assumption can be weakened to real valued if the elements of a sequence all have support in some set of finite measure and the first element f₁ is integrable. monotone decreasing is taken care of by DCT. as for the above e.g., the point seems to be (?) one needs the elements of a sequence to be integrable. well, f₁ is not integrable, so it's a sequence of non integrable functions. so the convergence theorems either don't apply (DCT) or the LHS and RHS both diverge (monotone conv. thm.), trivially. (what is meant by "...${\displaystyle \int \lim _{k}f_{k}}$ can be chosen to be any value"? that's not true for the sequence given.) Mct mht 05:52, 22 July 2006 (UTC)

What is meant is, given C an arbitrary finite value, then by appropriately choosing ${\displaystyle g_{k}}$, the resulting sequence can be chosen so that

${\displaystyle \int \lim _{k}f_{k}}$

is defined and has the value C. No it isn't true for the example I gave, since the pointwise limit ${\displaystyle \lim _{k}f_{k}}$ doesn't have a well-defined integral.

However, define

${\displaystyle g(x)=1/x\quad {\mbox{ if }}x\in [0,1],\quad g(x)=0{\mbox{ otherwise }}}$

and

${\displaystyle g_{k}(x)=-1/x+C\quad {\mbox{ if }}x\in [1/k,1],\quad g_{k}(x)=0{\mbox{ otherwise }}}$

Then

${\displaystyle f_{k}(x)=g(x)+g_{k}(x)}$

converges a.e to C, whereas

${\displaystyle \forall k,\int f_{k}(x)dx=+\infty }$

--CSTAR 06:14, 22 July 2006 (UTC)

There seems to be an inconsistency in the last statement of this article, that either theorem, dominated convergence theorem or monotone convergence theorem, can be shown as a corollary of the Fatou lemma. In the Wikipedia article on the Fatou lemma one reads:

Fatou's lemma is proved using the monotone convergence theorem, and can be used to prove the dominated convergence theorem.

If indeed Fatou's lemma is proved on the basis of the monotone convergence theorem, it follows that the latter theorem cannot have been proved on the basis of Fatou's lemma. It is important to clarify the matter; it may be that the word or is meant to be significant here, however the message, if indeed there, does not come out very well.

--BF 14:19, 8 December 2006 (UTC)

either monotone convergence OR fatou lemma, must first be proved by itself. then it is possible to easily prove the other using the first one (it goes both ways). personally i think it is more natural to prove monotone convergence first (the proof is more intuitive). then use fatou lemma to prove dominated convergence. --itaj 19:16, 30 March 2007 (UTC)

${\displaystyle L^{p}}$ Dominated Convergence Theorem is not generally true for ${\displaystyle p=+\infty }$.

It should be noted that ${\displaystyle L^{p}}$ DCT is not hold for ${\displaystyle p=\infty }$ and the measure of integral region is infinite.

For example take ${\displaystyle f_{n}=\chi _{Q_{n}}}$, ${\displaystyle Q_{n}\subset R^{d}}$is the cube centered at the origin.

The theorem in the section "Dominated convergence in Lp-spaces (corollary)", stated there (now explicitely) for 1 ≤ p < ∞, is completely false for p = ∞ even in finite measure spaces: modify the preceding example to be ${\displaystyle f_{n}=\chi _{[1/n,1]}}$ in the Lebesgue space on [0, 1]. This sequence is not Cauchy in L^∞. Bdmy (talk) 08:28, 27 May 2013 (UTC)

Error in proof?

The proof in the article states that since (f_n) converges pointwise to f, the following holds:

${\displaystyle \limsup _{n\to \infty }|f-f_{n}|=0.}$

But this is in general true only if (f_n) converges uniformly to f.

E.g. take:

f_n = 1 for x<1/n, 0 otherwise.

This converges pointwise but not uniformly to ${\displaystyle f\equiv 0}$, and the limit above is 1 rather than 0. Dan Gluck (talk) 15:16, 30 August 2020 (UTC)

What is the other primary advantage?

From the page:

Its power and utility are two of the primary theoretical advantages of Lebesgue integration over Riemann integration.

What's the other advantage? handling non-nice functions? DMH43 (talk) 15:24, 27 December 2023 (UTC)