Some properties of Fourier quasicrystals and measures on a strip

Abstract

In our paper we extend some results of the theory of Fourier quasicrystals on the real line to a horizontal strip of finite width. For measures in a strip we use a natural generalization of the usual Fourier transform for measures on the line. We consider positive or translation bounded measures μ on a strip whose Fourier transform is a pure point measure μ=Σγ∈bγδγ (as usual, δγ is the unit mass at the point γ). We prove that the measure =Σγ∈|bγ|2δγ has the exponential growth. Moreover, if for some η>0 the points of in every interval of length η are linearly independent over integers, then the measure μ also has the exponential growth.