Is the sum of two measurable set measurable? I think it is not...
3 Answers
Evidently, there are measure zero sets with a non measurable sum. The article begins as follows:
Krzysztof Ciesielski, Hajrudin Fejzi´c, Chris Freiling,
Measure zero sets with non-measurable sum
Abstract
For any C ⊆ R there is a subset A ⊆ C such that A + A has inner measure zero and outer measure the same as C + C. Also, there is a subset A of the Cantor middle third set such that A+A is Bernstein in [0, 2]. On the other hand there is a perfect set C such that C + C is an interval I and there is no subset A ⊆ C with A + A Bernstein in I.
1 Introduction.
It is not at all surprising that there should be measure zero sets, A, whose sum A+A = {x+y : x ∈ A, y ∈ A} is non-measurable. Ask a typical mathematician why this should be so and you are likely to get the following response:
The Cantor middle-third set, when added to itself gives an entire interval, [0, 2]. So certainly there exists a measure zero set that when added to itself gives a non-measurable set.
The intuition being that an interval has much more content than is needed for a non-measurable set. Indeed such sets do exist (in ZFC). Sierpi´nski (1920) seems to be the first to address this issue. Actually, he shows the existence of measure zero sets X, Y such that X+Y is non-measurable (see [7]). The paper by Rubel (see [6]) in 1963 contains the first proof that we could find for the case X = Y (see also [5]). Ciesielski [3] extends these results to much greater generality, showing that A can be a measure zero Hamel basis, or it can be a (non-measurable) Bernstein set and that A+A can also be Bernstein. He also establishes similar results for multiple sums, A + A + A etc.
This paper is mainly about the statement above and the intuition behind it. Below we list four conjectures, each of which seems justified by extending this line of reasoning.
Not only does such a set exist, but it can be taken to be a subset of the Cantor middle-third set, C. (This does not seem to immediately follow from any of the above proofs. Thomson [9, p. 136] claims this to be true, but without proof.)
The intuition really has nothing to do with the precise structure of the Cantor set, which might lead one to conjecture the following. Suppose C is any set with the property that C + C contains a set of positive measure. Then there must exist a subset A ⊆ C such that A + A is non-measurable.
The intuition relies on the fact that non-measurable sets can have far less content than an entire interval. Therefore, the claim should also hold when non-measurable is replaced by other similar qualities. Recall that if I is a set then a set S is called Bernstein in I if and only if both S and its complement intersect every non-empty perfect subset of I. Constructing a set that is Bernstein in an interval is one of the standard ways of establishing non-measurability. Certainly, any set that is Bernstein in an interval has far less content than the interval itself. Therefore, we might conjecture that there is a subset A ⊆ C with A+A Bernstein in [0,2].
Combining the reasoning behind the Conjectures 2 and 3, let C be any set with the property that C + C contains an interval, I. We might conjecture that there must exist a subset A ⊆ C such that A + A is Bernstein in I.
We will settle these four conjectures in the next four sections.
The paper goes on to show that conjectures 1, 2 and 3 are true, but 4 is false.
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$\begingroup$ "The Cantor middle-third set, when added to itself gives an entire interval, [0, 2]. So certainly there exists a measure zero set that when added to itself gives a non-measurable set." -- If I am not mistaken, is this claiming that the closed interval [o,2] is not Lebesgue measurable? $\endgroup$ Commented Mar 26, 2010 at 23:04
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$\begingroup$ @Regenbogen: I think the measure zero set is going to be a proper subset of the Cantor middle-third set :-) $\endgroup$ Commented Mar 26, 2010 at 23:07
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$\begingroup$ Regenbogen, I believe that the idea is to pass to subsets to get the counterexample. $\endgroup$ Commented Mar 26, 2010 at 23:08
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3
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5$\begingroup$ Here is a construction of two Borel sets whose sum is not Borel: P. Erdõs, A. H. Stone: On the sum of two Borel sets, Proc. Amer. Math. Soc. 25 (1970), 304--306 available here: renyi.hu/~p_erdos/1970-15.pdf $\endgroup$ Commented Jun 13, 2010 at 12:48
Note that the problem is trivial if you talk about subsets of the plane $\mathbb R\times \mathbb R$. Let $A\subseteq \mathbb R$ be non-measurable, then $A\times \{0\}$ and $\{0\}\times \mathbb R$ both have Lebesgue measure 0 in the plane, but their sum $A\times \mathbb R$ is not measurable.
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$\begingroup$ I stole this argument from gowers Borel plus Borel = Borel?. (Who probably stole it from Sierpinski, or Euclid.) $\endgroup$ Commented May 27, 2011 at 16:06
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1$\begingroup$ why is $A\times \mathbb R$ non measurable? $\endgroup$ Commented Mar 1, 2015 at 20:32
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$\begingroup$ Replace $\mathbb R$ by $I:=[0,1]$. Let $B:=I\setminus A$. If $A\times I$ and $B\times I$ are measurable with measure $a$ and $b:=1-a$ respectively, then find closed sets $C_n\subseteq A\times I$ with measure $\ge a-1/n$, similarly $D_n\subseteq B\times I$. Their (analytic, hence measurable) projections $C'_n\subseteq A$, $D'_n\subseteq B$ are disjoint and have a combined 1-dimensional measure $\ge 1-2/n$. Hence $A=\bigcup_n C'_n$ up to a measure zero set. (There must be a simpler argument...) $\endgroup$ Commented Oct 26, 2021 at 20:05
I think the sum of 2 Borel sets is analytic, hence measurable.