Bohr Almost Periodic Sets of Toral Type

Abstract

A locally finite multiset (,c), ⊂ Rn, c : → \1,...,b\ defines a Radon measure μ := Σλ ∈ c(λ)\, δλ that is Bohr almost periodic in the sense of Favorov if the convolution μ*f is Bohr almost periodic every f ∈ Cc( Rn). If it is of toral type: the Fourier transform F μ equals zero outside of a rank m < ∞ subgroup, then there exists a compactification : Rn → Tm of Rn, a foliation of Tm, and a pair (K,) where K := () and is a measure supported on K such that F = ( F μ) where : Tm → Rn is the Pontryagin dual of . If (,c) is uniformly discrete Bohr almost periodic and c = 1, we prove that every connected component of K is homeomorphic to Tm-n embedded transverse to the foliation and the homotopy of its embedding is a rank m-n subgroup S of Zm, and we compute the density of as a function of and the homotopy of comonents of K. For n = 1 and K a nonsingular real algebraic variety, this construction gives all Fourier quasicrystals (FQ) recently characterized by Olevskii and Ulanovskii and suggest how to characterize FQ for n > 1.