Cube tilings with linear constraints

Abstract

We consider tilings (Q,) of Rd where Q is the d-dimensional unit cube and the set of translations is constrained to lie in a pre-determined lattice A Zd in Rd. We provide a full characterization of matrices A for which such cube tilings exist when is a sublattice of AZd with any d ∈ N or a generic subset of AZd with d≤ 7. As a direct consequence of our results, we obtain a criterion for the existence of linearly constrained frequency sets, that is, ⊂eq AZd, such that the respective set of complex exponential functions E () is an orthogonal Fourier basis for the space of square integrable functions supported on a parallelepiped BQ, where A, B ∈ Rd × d are nonsingular matrices given a priori. Similarly constructed Riesz bases are considered in a companion paper.