Lattice sub-tilings and frames in LCA groups

Abstract

Given a lattice in a locally compact abelian group G and a measurable subset with finite and positive measure, then the set of characters associated to the dual lattice form a frame for L2() if and only if the distinct translates by of have almost empty intersections. Some consequences of this results are the well-known Fuglede theorem for lattices, as well as a simple characterization for frames of modulates.