Subexponential decay and regularity estimates for eigenfunctions of localization operators

Abstract

We consider time-frequency localization operators Aa1,2 with symbols a in the wide weighted modulation space M∞w(R2d), and windows 1, 2 in the Gelfand-Shilov space S(1)(Rd). If the weights under consideration are of ultra-rapid growth, we prove that the eigenfunctions of Aa1,2 have appropriate subexponential decay in phase space, i.e. that they belong to the Gefand-Shilov space S(γ) (Rd) , where the parameter γ ≥ 1 is related to the growth of the considered weight. An important role is played by τ-pseudodifferential operators Opτ(σ). In that direction we show convenient continuity properties of Opτ(σ) when acting on weighted modulation spaces. Furthermore, we prove subexponential decay and regularity properties of the eigenfunctions of Opτ(σ) when the symbol σ belongs to a modulation space with appropriately chosen weight functions. As a tool we also prove new convolution relations for (quasi-)Banach weighted modulation spaces.