Vitali set

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Revision as of 10:48, 9 February 2007 by imported>Aleksander Halicz (→‎Formal construction: minor technicality)
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The term Vitali set describes any set obtained by a particular mathematical construction. In fact, the construction uses the axiom of choice and the result given by an existence theorem is not uniquely determined. Vitali sets have many important applications in pure mathematics, most notable being a proof of existence of Lebesgue non-measurable sets in the measure theory. The name was given after the Italian mathematician Giuseppe Vitali.

Formal construction

We begin by defining the following relation on the real line. Two real numbers x and y are said to be equivalent if and only if the difference x-y is rational. In symbols,

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It is easy to verify that it is in fact an equivalence relation. Thus, it yields the partition the set of reals into its equivalence classes. By the axiom of choice we can select a representative of each single class. The Vitali set V is defined to be the union all selected representatives.

Since for any real x the elements of the set are in the same equivalence class, me may (and do) additionaly require that (indeed, x+i belong to [0,1] for some i).

Application to measure theory

A Vitali set can not be included in the family of measurable sets for any translation invariant measure. In particular it is not Lebesgue measurable.

More precisely, suppose that a measure μ defined over a σ-algebra Σ of subsets of the real line satisfies

In particular, this presumes that any translation of any measurable set is measurable. We will show that

Observe that for any rational the sets V+q and V are disjoint. Indeed, if there is any then at the same time and . In other words V contains two distinct representatives of the same equivalence class, which contradicts the definition of V.

Let be an enumeration of the rationals from [-1,1] and define

Then, clearly

Indeed, the second inclusion follows directly from the fact that and For the first one, observe that for any , the class of equivalence of x has its uniqe representative y in V. Therefore x-y is rational and, by the fact that we have . In other words, for some n and so .

Now suppose that the set V is measurable (and so are ). Recall that by definition any measure is supposed to be countably additive. It follows that

since is a family of pairwise disjoint sets. Further, by tranlation invariance of μ this is equal to Since W contains the interval [0,1] we clearly have which implies that is strictly positive. At the same time, the infinite sum is bounded by , which is a contradiction. Consequently,