Beurling densities and frames of exponentials on the union of small balls

Abstract

If x1,…,xm are finitely many points in Rd, let Eε=i=1m\,xi+Qε, where Qε=\x∈ Rd,\,\,|xi| ε/2, \, i=1,...,d\ and let f denote the Fourier transform of f. Given a positive Borel measure μ on Rd, we provide a necessary and sufficient condition for the frame inequalities A\,\|f\|22 ∫Rd\,| f()|2\,dμ() B\,\|f\|22, f∈ L2(Eε), to hold for some A,B>0 and for some ε>0 sufficiently small. If m=1, we show that the limits of the optimal lower and upper frame bounds as ε→ 0 are equal, respectively, to the lower and upper Beurling density of μ. When m>1, we extend this result by defining a matrix version of Beurling density. Given a (possibly dense) subgroup G of R, we then consider the problem of characterizing those measures μ for which the inequalities above hold whenever x1,…,xm are finitely many points in G (with ε depending on those points, but not A or B). We point out an interesting connection between this problem and the notion of well-distributed sequence when G=a\,Z for some a>0. Finally, we show the existence of a discrete set such that the measure μ=Σλ\,δλ satisfy the property above for the whole group R.