Gabor frames for rational functions

Abstract: We study the frame properties of the Gabor systems $$\begin{aligned} {\mathfrak {G}}(g;\alpha ,\beta ):=\{e^{2\pi i \beta m x}g(x-\alpha n)\}_{m,n\in {\mathbb {Z}}}. \end{aligned}$$ G ( g ; α , … Show more

“…In [39,40] the problem of generating a Gabor frame is solved for Gaussian functions, in [37] for the hyperbolic secant, in [31,32] the problem is discussed for Hermite functions. In [15] the Gabor frames are investigated for linear combinations of Cauchy kernels. Finally in [33] the authors proved that for totally positive functions of finite type there exists a characterization to be a Gabor frame.…”

Superoscillations and Fock spaces

“…In [39,40] the problem of generating a Gabor frame is solved for Gaussian functions, in [37] for the hyperbolic secant, in [31,32] the problem is discussed for Hermite functions. In [15] the Gabor frames are investigated for linear combinations of Cauchy kernels. Finally in [33] the authors proved that for totally positive functions of finite type there exists a characterization to be a Gabor frame.…”

Superoscillations and Fock spaces

Frame set for shifted sinc-function

Frame set for Gabor systems with Haar window