Non-separable lattices, Gabor orthonormal bases and Tilings

Abstract

Let K⊂ Rd be a set with positive and finite Lebesgue measure. Let =M( Z2d) be a lattice in R2d with density dens()=1. It is well-known that if M is a diagonal block matrix with diagonal matrices A and B, then G(|K|-1/2K, ) is an orthonormal basis for L2( Rd) if and only if K tiles both by A( Zd) and B-t( Zd). However, there has not been any intensive study when M is not a diagonal matrix. We investigate this problem for a large class of important cases of M. In particular, if M is any lower block triangular matrix with diagonal matrices A and B, we prove that if G(|K|-1/2K, ) is an orthonormal basis, then K can be written as a finite union of fundamental domains of A( Zd) and at the same time, as a finite union of fundamental domains of B-t( Zd). If AtB is an integer matrix, then there is only one common fundamental domain, which means K tiles by a lattice and is spectral. However, surprisingly, we will also illustrate by an example that a union of more than one fundamental domains is also possible. We also provide a constructive way for forming a Gabor window functions for a given upper triangular lattice. Our study is related to a Fuglede's type problem in Gabor setting and we give a partial answer to this problem in the case of lattices.