Spectral measures associated with the factorization of the Lebesgue measure on a set via convolution

Abstract

Let Q be a fundamental domain of some full-rank lattice in Rd and let μ and be two positive Borel measures on Rd such that the convolution μ is a multiple of Q. We consider the problem as to whether or not both measures must be spectral (i.e. each of their respective associated L2 space admits an orthogonal basis of exponentials) and we show that this is the case when Q = [0,1]d. This theorem yields a large class of examples of spectral measures which are either absolutely continuous, singularly continuous or purely discrete spectral measures. In addition, we propose a generalized Fuglede's conjecture for spectral measures on R1 and we show that it implies the classical Fuglede's conjecture on R1.