Gabor Frames and Totally Positive Functions

Abstract

Let g be a totally positive function of finite type. Then the Gabor set \e2π i β l t g(t-α k), k,l ∈ Z \ is a frame for L2(R), if and only if α β <1. This result is a first positive contribution to a conjecture of I.\ Daubechies from 1990. So far the complete characterization of lattice parameters α, β that generate a frame has been known for only six window functions g. Our main result now provides an uncountable class of functions. As a byproduct of the proof method we derive new sampling theorems in shift-invariant spaces and obtain the correct Nyquist rate.