Zak transforms and Gabor frames of totally positive functions and exponential B-splines

We study totally positive (TP) functions of finite type and exponential Bsplines as window functions for Gabor frames. We establish the connection of the Zak transform of these two classes of functions and prove that the Zak transforms have only one zero in their fundamental domain of quasi-periodicity. Our proof is based on the variation-diminishing property of shifts of exponential B-splines. For the exponential B-spline Bm of order m, we determine a large set of lattice parameters α, β > 0 such that the Gabor family G(Bm, α, β) of time-frequency shifts eBm(· − kα), k, l ∈ Z, is a frame for L(R). By the connection of its Zak transform to the Zak transform of TP functions of finite type, our result provides an alternative proof that TP functions of finite type provide Gabor frames for all lattice parameters with αβ < 1. For even two-sided exponentials g(x) = λ 2 e and the related exponential B-spline of order 2, we find lower frame-bounds A, which show the asymptotically linear decay A ∼ (1 − αβ) as the density αβ of the time-frequency lattice tends to the critical density αβ = 1.