Steinhaus theorem
Encyclopedia
Steinhaus theorem is a theorem
in real analysis
, first proved by H. Steinhaus, concerning the difference set of a set of positive measure
.
The theorem states that if
is a translation-invariant regular measure
defined on the Borel set
s of the real line
, and
is a Borel measurable set with 
then the difference set
contains an open
neighborhood of the origin. Here, a measure
is called translation-invariant if
for all real numbers
and all Borel measurable sets 
, where 
is the set of all points of the form 
with 
in 
that is, 
is obtained by shifting 
to the right by 
.
The theorem extends easily to any Borel-measurable set of positive measure in a locally compact group
.
Analogous theorem for nonmeagre
sets with Baire property also holds, and is sometimes called Steinhaus theorem, proof of which is almost identical to the one below.
If
is a regular measure and 
is a measurable set with positive finite measure 
, then for every 
there are a compact set 
and an open set 
such that
and 
For our purpose it is enough to choose
and 
such that 
Since
, there is an open cover of 
that is contained in 
. 
is compact, hence one can choose a small neighborhood 
of 
such that 
Let
and suppose 
Then,
contradicting our choice of
and 
. Hence for all 
there exist 
such that 
which means that
. Q.E.D.
Theorem
In mathematics, a theorem is a statement that has been proven on the basis of previously established statements, such as other theorems, and previously accepted statements, such as axioms...
in real analysis
Real analysis
Real analysis, is a branch of mathematical analysis dealing with the set of real numbers and functions of a real variable. In particular, it deals with the analytic properties of real functions and sequences, including convergence and limits of sequences of real numbers, the calculus of the real...
, first proved by H. Steinhaus, concerning the difference set of a set of positive measure
Measure (mathematics)
In mathematical analysis, a measure on a set is a systematic way to assign to each suitable subset a number, intuitively interpreted as the size of the subset. In this sense, a measure is a generalization of the concepts of length, area, and volume...
.
The theorem states that if
is a translation-invariant regular measureRegular measure
In mathematics, a regular measure on a topological space is a measure for which every measurable set is "approximately open" and "approximately closed".-Definition:...
defined on the Borel set
Borel set
In mathematics, a Borel set is any set in a topological space that can be formed from open sets through the operations of countable union, countable intersection, and relative complement...
s of the real line
Real line
In mathematics, the real line, or real number line is the line whose points are the real numbers. That is, the real line is the set of all real numbers, viewed as a geometric space, namely the Euclidean space of dimension one...
, and
is a Borel measurable set with then the difference set
contains an open
Open set
The concept of an open set is fundamental to many areas of mathematics, especially point-set topology and metric topology. Intuitively speaking, a set U is open if any point x in U can be "moved" a small amount in any direction and still be in the set U...
neighborhood of the origin. Here, a measure
is called translation-invariant iffor all real numbers
and all Borel measurable sets , where is the set of all points of the form with in that is, is obtained by shifting to the right by .The theorem extends easily to any Borel-measurable set of positive measure in a locally compact group
Locally compact group
In mathematics, a locally compact group is a topological group G which is locally compact as a topological space. Locally compact groups are important because they have a natural measure called the Haar measure. This allows one to define integrals of functions on G.Many of the results of finite...
.
Analogous theorem for nonmeagre
Meagre set
In the mathematical fields of general topology and descriptive set theory, a meagre set is a set that, considered as a subset of a topological space, is in a precise sense small or negligible...
sets with Baire property also holds, and is sometimes called Steinhaus theorem, proof of which is almost identical to the one below.
Proof
The following is a simple proof due to Karl Stromberghttp://www.jstor.org/sici?sici=0002-9939(197211)36%3A1%3C308%3ASNAEPO%3E2.0.CO%3B2-L.If
is a regular measure and is a measurable set with positive finite measure , then for every there are a compact set and an open set such that and For our purpose it is enough to choose
and such that Since
, there is an open cover of that is contained in . is compact, hence one can choose a small neighborhood of such that Let
and suppose Then,contradicting our choice of
and . Hence for all there exist such that which means that
. Q.E.D.Q.E.D.
Q.E.D. is an initialism of the Latin phrase , which translates as "which was to be demonstrated". The phrase is traditionally placed in its abbreviated form at the end of a mathematical proof or philosophical argument when what was specified in the enunciation — and in the setting-out —...