Steinhaus theorem

E394469

The Steinhaus theorem is a fundamental result in measure theory stating that the difference set of any subset of the real numbers with positive Lebesgue measure contains an open interval around zero.

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Predicate Object
instanceOf result in measure theory
theorem
alsoKnownAs Steinhaus theorem
surface form: Steinhaus property of Lebesgue measure
appliesTo Lebesgue measurable subsets of R with positive measure
characterizes non-discrete locally compact groups with respect to Haar measure
conclusion 0 is an interior point of the difference set A − A
doesNotApplyTo sets of Lebesgue measure zero
domain real numbers
ensures existence of nontrivial open subset in A − A
field measure theory
real analysis
generalizationOf results about density points of measurable sets
hasGeneralization Steinhaus theorem self-linksurface differs
surface form: Steinhaus theorem for locally compact abelian groups

Steinhaus theorem self-linksurface differs
surface form: Steinhaus–Weil theorem
holdsIn Euclidean spaces R^n with Lebesgue measure
implies sets of positive Lebesgue measure are thick in the sense of containing many differences
the difference set of a set of positive Lebesgue measure is not meagre near 0
involvesConcept Lebesgue measure
difference set
open interval
sets of positive measure
mathematicalSubjectClassification 26A30
28A05
namedAfter Hugo Steinhaus
originalContext real line with Lebesgue measure
relatedTo Baire category theorem
Lebesgue differentiation theorem
surface form: Lebesgue density theorem

Ruzsa triangle inequality
sumset phenomena in additive number theory
requires positivity of measure
statement If A is a subset of the real numbers with positive Lebesgue measure, then the difference set A − A contains an open interval around 0.
symbolicForm If m(A) > 0 then ∃ε > 0 such that (−ε, ε) ⊂ A − A.
typeOfResult regularity theorem for measurable sets
usedIn additive combinatorics
ergodic theory
geometric measure theory
harmonic analysis
probability theory on the real line
yearProved 1920s

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Full triples — surface form annotated when it differs from this entity's canonical label.

Hugo Steinhaus notableWork Steinhaus theorem
Steinhaus theorem hasGeneralization Steinhaus theorem self-linksurface differs
this entity surface form: Steinhaus theorem for locally compact abelian groups
Steinhaus theorem hasGeneralization Steinhaus theorem self-linksurface differs
this entity surface form: Steinhaus–Weil theorem
Steinhaus theorem alsoKnownAs Steinhaus theorem
this entity surface form: Steinhaus property of Lebesgue measure