Packing near the tiling density and exponential bases for product domains

Abstract

A set in a locally compact abelian group is called spectral if L2() has an orthogonal basis of group characters. An important problem, connected with the so-called Spectral Set Conjecture (saying that is spectral if and only if a collection of translates of can partition the group), is the question of whether the spectrality of a product set = A × B, in a product group, implies the spectrality of the factors A and B. Recently Greenfeld and Lev proved that if I is an interval and ⊂eq Rd then the spectrality of I × implies the spectrality of . We give a different proof of this fact by first proving a result about packings of high density implying the existence of tilings by translates of a function. This allows us to improve the result to a wider collection of product sets than those dealt with by Greenfeld and Lev. For instance when A is a union of two intervals in R then we show that the spectrality of A × implies the spectrality of both A and .