A Proof of the HRT Conjecture for Widely Spaced Sets

Abstract

Given f ∈ C0(Rn) and ⊂ R2n a finite set we demonstrate the linear independence of the set of time-frequency translates G(f, ) = \π(λ)f\λ∈ when the time coordinates of points in are far apart relative to the decay of f. As a corollary, we prove that for any f ∈ C0(Rn) and finite ⊂ R2n there exist infinitely many dilations Dr such that G(Drf, ) is linearly independent. Furthermore, we prove that G(f, ) is linearly independent for functions like f(t) = cos(t)|t| which have a singularity and are bounded away from any neighborhood of the singularity.