Liftings for ultra-modulation spaces, and one-parameter groups of Gevrey type pseudo-differential operators

Abstract

We deduce one-parameter group properties for pseudo-differential operators Op (a), where a belongs to the class (ω 0)* of certain Gevrey symbols. We use this to show that there are pseudo-differential operators Op (a) and Op (b) which are inverses to each others, where a∈ (ω 0)* and b∈ (1/ω 0)*. We apply these results to deduce lifting property for modulation spaces and construct explicit isomorpisms between them. For each weight functions ω ,ω 0 moderated by GRS submultiplicative weights, we prove that the Toeplitz operator (or localization operator) Tp (ω 0) is an isomorphism from Mp,q(ω ) onto Mp,q(ω /ω 0) for every p,q ∈ (0,∞ ].