Meyer set Meyer set or almost lattice is a set relatively dense X of points in the Euclidean plane or a higher-dimensional Euclidean space such that its Minkowski difference with itself is uniformly discrete . Meyer sets have several equivalent characterizations; they are named after Yves Meyer , who introduced and studied them in the context of diophantine approximation . Nowadays Meyer sets are best known as mathematical model for quasicrystals. However, Meyer's work precedes the discovery of quasicrystals by more than a decade and was entirely motivated by number theoretic questions.Definition and characterizations A subset X of a metric space is relatively dense if there exists a number r such that all points of X are within distance r of X , and it is uniformly discrete if there exists a number ε such that no two points of X are within distance ε of each other. A set that is both relatively dense and uniformly discrete is called a Delone set . When X is a subset of a vector space , its Minkowski difference X − X is the set of differences of pairs of elements of X .relatively dense set X for which X − X is uniformly discrete. Equivalently, it is a Delone set for which X − X is Delone, or a Delone set X for which there exists a finite set F with X − X ⊂ X + F X and ε , and approximating the definition of the reciprocal lattice of a lattice. A relatively dense set X is a Meyer set if and only if For all ε > 0, X ε There exists an ε with 0 < ε < 1/2 for which X ε character of an additively closed subset of a vector space is a function that maps the set to the unit circle in the plane of complex numbers , such that the sum of any two elements is mapped to the product of their images. A set X is a harmonious set if, for every character χ on the additive closure of X and every ε > 0, there exists a continuous character on the whole space that ε -approximates χ . Then a relatively dense set X is a Meyer set if and only if it is harmonious.Examples Meyer sets include
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