Fourier characterizations and non-triviality of Gelfand-Shilov spaces, with applications to Toeplitz operators

Abstract

We examine properties of Gelfand-Shilov spaces Ss, Sσ, Sσs, s, σ and σs. These are spaces of smooth functions where the functions or their Fourier transforms admit sub-exponential decay. It is determined that σs is nontrivial if and only if s+ σ > 1. We find growth estimates on functions and their Fourier transforms in the one-parameter spaces, and we obtain characterizations in terms of estimates of short-time Fourier transforms for these spaces and their duals. Additionally, we determine conditions on the symbols of Toeplitz operators under which the operators are continuous on one-parameter spaces.